id stringlengths 13 17 | image_filename stringlengths 34 34 | original_image stringlengths 22 22 | question stringclasses 1 value | answer stringlengths 1.25k 1.4k | answer_letter stringclasses 5 values | answer_type stringclasses 1 value | num_points int64 3 5 | point_labels listlengths 3 5 | depth_token stringlengths 970 1.05k | point_A_x int64 10 324 | point_A_y int64 95 224 | point_B_x int64 10 324 | point_B_y int64 95 224 | point_C_x int64 10 324 | point_C_y int64 95 224 | point_D_x int64 10 324 ⌀ | point_D_y int64 95 224 ⌀ | point_E_x int64 10 324 ⌀ | point_E_y int64 95 224 ⌀ | point_A_depth float64 1 254 | point_B_depth float64 1 254 | point_C_depth float64 1 254 | point_D_depth float64 1 254 ⌀ | point_E_depth float64 1 254 ⌀ | image dict |
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
depth_point_100 | images/3pts_ADE_train_00017977.jpg | ADE_train_00017977.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 53 y = 103),Point B is located at (x = 79 y = 181),Point C is located at (x = 48 y = 216).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_59><DEPTH_29><DEPTH_74><DEPTH_29><DEPTH_64><DEPTH_74><DEPTH_59><DEPTH_74><DEPTH_49><DEPTH_31><DEPTH_3><DEPTH_29><DEPTH_49><DEPTH_74><DEPTH_64><DEPTH_3><DEPTH_3><DEPTH_25><DEPTH_69><DEPTH_49><DEPTH_70><DEPTH_3><DEPTH_31><DEPTH_36><DEPTH_29><DEPTH_3><DEPTH_49><DEPTH_44><DEPTH_36><DEPTH_49><DEPTH_17><DEPTH_5><DEPTH_70><DEPTH_30><DEPTH_40><DEPTH_59><DEPTH_70><DEPTH_31><DEPTH_69><DEPTH_3><DEPTH_17><DEPTH_49><DEPTH_59><DEPTH_70><DEPTH_60><DEPTH_38><DEPTH_25><DEPTH_3><DEPTH_70><DEPTH_31><DEPTH_59><DEPTH_82><DEPTH_77><DEPTH_3><DEPTH_59><DEPTH_38><DEPTH_78><DEPTH_19><DEPTH_38><DEPTH_43><DEPTH_36><DEPTH_74><DEPTH_74><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_49><DEPTH_29><DEPTH_58><DEPTH_38><DEPTH_44><DEPTH_19><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_44><DEPTH_44><DEPTH_25><DEPTH_41><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_41><DEPTH_42><DEPTH_16><DEPTH_94><DEPTH_94><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"A",
"B",
"C"
] | <DEPTH_START><DEPTH_59><DEPTH_29><DEPTH_74><DEPTH_29><DEPTH_64><DEPTH_74><DEPTH_59><DEPTH_74><DEPTH_49><DEPTH_31><DEPTH_3><DEPTH_29><DEPTH_49><DEPTH_74><DEPTH_64><DEPTH_3><DEPTH_3><DEPTH_25><DEPTH_69><DEPTH_49><DEPTH_70><DEPTH_3><DEPTH_31><DEPTH_36><DEPTH_29><DEPTH_3><DEPTH_49><DEPTH_44><DEPTH_36><DEPTH_49><DEPTH_17><DEPTH_5><DEPTH_70><DEPTH_30><DEPTH_40><DEPTH_59><DEPTH_70><DEPTH_31><DEPTH_69><DEPTH_3><DEPTH_17><DEPTH_49><DEPTH_59><DEPTH_70><DEPTH_60><DEPTH_38><DEPTH_25><DEPTH_3><DEPTH_70><DEPTH_31><DEPTH_59><DEPTH_82><DEPTH_77><DEPTH_3><DEPTH_59><DEPTH_38><DEPTH_78><DEPTH_19><DEPTH_38><DEPTH_43><DEPTH_36><DEPTH_74><DEPTH_74><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_49><DEPTH_29><DEPTH_58><DEPTH_38><DEPTH_44><DEPTH_19><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_44><DEPTH_44><DEPTH_25><DEPTH_41><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_41><DEPTH_42><DEPTH_16><DEPTH_94><DEPTH_94><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_END> | 53 | 103 | 79 | 181 | 48 | 216 | null | null | null | null | 10 | 38 | 64 | null | null | {
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",
"path": "images/3pts_ADE_train_00017977.jpg"
} |
depth_point_101 | images/4pts_ADE_train_00017528.jpg | ADE_train_00017528.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 237 y = 124),Point B is located at (x = 10 y = 224),Point C is located at (x = 279 y = 210),Point D is located at (x = 62 y = 100).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_15><DEPTH_20><DEPTH_6><DEPTH_30><DEPTH_80><DEPTH_70><DEPTH_67><DEPTH_22><DEPTH_29><DEPTH_31><DEPTH_38><DEPTH_35><DEPTH_58><DEPTH_45><DEPTH_44><DEPTH_58><DEPTH_69><DEPTH_19><DEPTH_36><DEPTH_74><DEPTH_85><DEPTH_20><DEPTH_36><DEPTH_74><DEPTH_29><DEPTH_29><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_29><DEPTH_31><DEPTH_82><DEPTH_69><DEPTH_74><DEPTH_74><DEPTH_29><DEPTH_49><DEPTH_74><DEPTH_74><DEPTH_29><DEPTH_31><DEPTH_59><DEPTH_3><DEPTH_31><DEPTH_29><DEPTH_31><DEPTH_31><DEPTH_3><DEPTH_3><DEPTH_3><DEPTH_3><DEPTH_49><DEPTH_31><DEPTH_31><DEPTH_49><DEPTH_49><DEPTH_31><DEPTH_31><DEPTH_76><DEPTH_49><DEPTH_36><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_29><DEPTH_19><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_0><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_16><DEPTH_16><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 4 | [
"D",
"A",
"C",
"B"
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dI4EZZGD4XcO+Tg9PT0pZwYT58bquGEbDJYlsgDHpx2rk5m99wMfP/FRSxxxCNtwLsvI7cCpJZlX7Pvc7VlbCqe2evH1zRf6xHafuvs6xXA+/OyfMx/PPrzVWyVLpHmEJeGDBlnyVzk4A646d67Z1HUgrq1h9TQtylzLPp8TO373MhUAe2O+PT3qO60/yppb62twOQhMgDlwxCYU/UZ9qq6TaQy68z20srA7siPk8HqOh9+avxat9jklVnCXMaHzY1h4DcEcg9c/5FYO8Ze6Bj3vhi1sZJJ2Sc2xDLv5Yq2489uMevv6VQSOB1dHmZZYQSmDnOOx/+tXS3JM9kIJ5lJlUSK4yQPmzyOhPb2FYMkk++STDSOPnUoQFVtvcfpj0FdEaspRXM9QZBp8V1I/2xGQIo5TcMgHvg9ulaulXgvgYL+Im3c7MoccKc5wCM9AMVoaPaRJZ283nHZKpSZRH948/L2+lVzDHbGWSzs5kWM5GWBbryBxkH/Gs3Ui7q2vQFofR6cDABxXFfFSQx+ElcKMi4UjcMjoa7WMMFxkVxPxXDf8ACHf9vCdPoa9PoM5P4YYfSPEBIHMTdB7V2Otu6eCrYx7c4jyG9Nlcj8LAf7I1w+sTf+giuq18lfBNmR1Hl/8AoFTMpHPaBufWoTIqgl8AjvXpVcJppL6nYNhAFIGV43cd/eu7FbUfhMXq2FY/iVpItKM0EBklR15VAxCk4b6cGtmsrWUu2+zmFlFukga4LOF+Qdea0lqrCOXt9QWO9Fw8MkULRkxxRv8AM5DdV4+7xj3xWhe6s9ki3VnIoju48RRvxhwcMe5zz371lG3bUob6RbZh5k7eRM25ECsOWAGfTrj+fHLXM2tsbdohDcx2Z3lt4CdcHAyPQe/PFcdRypq0VuVuSMssmtn7RLHvbOJGXIkO7oD9fUfl1q1PLHBGXklmaOQACQAAfLxgr/KqjazJZbp5QyxTIA+Fz5Z4PJ9z/Ksc3SXErRyzCJPvfMvHOckYrgqTdWK0LSszbOsxC+tE+0AhWw0fU4z19ce1LcPLGm1A0kDZBBHzDcOOg6ZI96y3uLK1ge4WBGkT5U+Ykc9euMD/AOvWNdanbyR2zpMTv3CZQp/d8nA56nvxWUad9im7GlPDZPqMO4Ay+YRI0YIA4zjHp16dsVevriKTTwTtjcENCvPI4BJPt+dZUcsbQF4w0zIMBpARlecH8OeM1r6U0c93PPLEJlQqqZbOAeoyD0x9eKbi92CIFu2u9PSVZRE8XyBI85fJJyc/SrVnbR3NxBLJJgI3zr/ETg8qAeeh/QVBYGOB54oFcKx2GEx7yATwcnoa0youpXa3DINzBkdfmR8c4bnjvWctNholuUlidzaB3MkZDnhiTjoMcdMfrVnWDsex8uN3le1jwqk8/IAOMevv2qizmaKIs3ytnlXO5WxwB6GpfEN2sX2OMBi32WHcxB4ynGPrjHrVQTdKS81+o3uY1zibVGuNjRKxUyDHXg8DH5j6VJNcIzbJEw5z8rkZXnGPp7e9UtNQteTBw7L824R8fT8M4/IVq6UkUlxLcSR/eG0vx+7bHBGcd/8APIpS8xG3cXhTSLdILdFBcfccdN3TAHT61Sv9Ra4u1hKKYGdVDj72AM8n2PcenepgDHmK38mOYOOWkIDEDvn15GM8fjTxC0kshukQFCd/y4yCexOPX8+/an7ZvR7IpaEc5khtJphNthiUBk2bSy+uR/j1rL0oRanfTTPIZFWNmWN+CB2/HFXNUmjNuVdYwyZAQNwy4I+bBx6H+tN0UQWOltceS892yMInzgKcdM5x26daIz5ldibbZ6Rol/p9nbw2qyYLE5d8Ak9ySPX+lcR421O50+8SzZQ1oSxgmByMse5HPHPHTpVSO4aCya4c/Ovz+USdxHIP1xjoK57VtXi1XV4fKkEkrr5b7x1Gfy6AVtCo5LlktETInmmeTT1ZroKwBYsONoPOAO/A/rVa11O3ltnjlKkKoOwkjOMHj8qivZJdOtxDFEBOW4nAPIycKK54l5ZXy6o4Jzz3/DvSjTUkZ7GvBqo+1xyz7WiQE4OCT7Z79uvpVWO7uLicx4fABRQzcLnJzz9aY9pPZRPPcysrE/KhQgsOmc9voau6bFe66mWGyGNWEWRjkDp9McfhVNRWq2EaFoPMIG1itqxAgjPDEAgncehPUZqW0unuZlgltvMaPgMV547fhz+tWtOsvscSgOGLBH80ghTn+EH0Gfz61aksdkVxcEBpgd4mwACnTBxntXLOUbtFWOJ1XSZp9SllLgAsTjGDyT2/KoZBLp8i2Ts4M2GKE/IxBxWmEnurtVM6pCACnmN3HT8ff3pNSSK4uYnWAi7UBVXO7nOORz6/pXVGo9IvYVjNtdXli1BZ4I1hIOHYAHvjpgD0+tWoomm1uZCYI1XLSbWOx27gfXnpWbZzXk94CiqkkbM3IwRgdCK6sTWklms8No1o/mDzGUcPxySM4696KjUXsM52/u2lvpI7aN44ogVjj5bAAz3/ABqfQoJpI2EkxS2n/dGQKzCMnOd2On/162ntbS9mM0S24WMAOG3DeP7zH+93460ye4FpPN9muDBBOvlLGq43EdOAenP6d6nnVrJAWrlzpFvgANbxnc5dlyTk4we/QdPeuafWnMzFJMRLkgoACCc8E/pUmrXLTWxztZcgsuO3Y4FR6XbWeoXf2aeZxACuIs4IXPYnv/OiEElzSG9XofU4X6/nWZrej2ut2X2O9QyQbg23cRyOnIpI9OvJAZG1OdGYk7UAKr7DNPGn6gp41ZyPRoVNenq0PQztI8K6fokF1DYK8aXKlXBfdjjHGRTNfslTw/FahwqRMgDyNjOBj0rV+zaqvS/gb2aD/A1Q1GW7hi8nUVsjBKMLLuKgN6EH8amSdrspWOW0Lw/eSXcGqrcQNDnfgsQR+mK7wjAByCD3FRaPbImg20IWMrsz+7OVPuDU7oI40QDAAxitqemhnJIZUFzaRXYRZhujU5KHox9/Wp64f4oatrumaPo8Xh2+Szv9Q1eGxEskauuJFfruVsDIU5AzxWtybHYSPDbqkA2rkYRAOK8p1G5s9PXVnTbd3LTjKwIUXZjkMD0AYdQOPeuA03xV4yudb0hx4lh1Gzu9RitJZLaELtZ2HykPGrDIzg4xwcHg113ivRLvTtSAvXylw/MiMTkHkjHGT7H8648RKXLZrQdrDtPWO4jm3KytJtfJAIDDHH/6/wAaqalaRTyRXCthyPmAGQcfT0/rXRbbX7B5yyNsfDAA7CeB09Mkjisq7sIpYYYLZike/aIwDz65bnP4V46l710XY5e9jlhtRMIt0JPzSDnn296rCKW2tkumQOjqxTaBkYP3jXazPaw2rxraqY2J4MW8gnPr7/lVNNOgsLkPb5+zI6sULBgXK5PPfouPyraNXTULE+n6RHLpUTyXbxxEM/yMBtbI6g+3b9amsrIQBkM8EgVSwjLFcL6fh9atSW8DWUZkuJBE2WG4bNwA4z2BGT161k2MyX95xGiW6jBO75ZONp9/SsXJyvqUTXtvH5i3UJlVX4lUjIlcenryTipYry1tZT5wJt5H3I/UsOnOO/r+FLcJcKWmMmDACW8kHBwD157/AIZqvdwmaGIeXIyrhi2MBep4HXB6/wCRT5W9GBPZTW9rJLAGcwzKXO/JK445H65pfE2Wmt1UszCwh+UMBtGw5OKw5JWhffCdzu21izAMB/StzxEJGurNIpWjL2VvkqOfu4Pv0rpjC0JfIm+pm6JasyCAzRgOCTvYdMevbv16VoidpyWCtsjLKzFwQ+Ac4x1/UZxVG2RGlLXETuCzHLOeR33Hvnn8ake4uYZFFvC8qqCqDILEHOc9+Bx+HvWE4u4xjXRuZ4wdyMW8ySTePmXHHTgHArUS83sqW2crIxIk6AAfePFVnubRIoisQJ3kkhsEMVPJoitNlyJLd/L6HbIQAxx0/wDr1noMfcqLiGA3du/zrvLoCFC5HUj15/E1atJD5Qg8nzuCzNIccg9M9z0qBgk95bmO2JDRrGoyxVSCflIHPQcCpb3SsQi4jjEaoBuPmEjHcgZ/THSqlJNWGPngMchSeMPbOCFJPCg5J57ncTXPX+mqkRu7UoGEuJmbAKjg4Az7g/8A6q2Lh55NNeB5ARDkNI3Vwee4yD0OKpzm1060LWsKpazYyznJY4wRn8OM8URk0S2Zt/YXLWcEUOJJWdS77slBg5/DjrmsmXSnsJBK0oaJGHIPLc9gO/tmutXULa9ia3BYRRgPuwCrEDnOfeuW1u9a5t4mhld8uWKkEbB7VtSlNvlIZTvLlp5Nqs8kaf3jz9av6XqElo0JcEWwBZsKGLN6Z6jOQOtZMkE8SEGIsxcKXUEjp0+tTwwTQCRsI3lBlaMsMjI64reUFy2BHS2usSXFwWgQFSP9X06c5PfPT862pHk+yRyKZ2jcFhGgBzkYPr39a4iATWUltIjnO8MpIx82c13Ul7JaQpL9nXPT90R94DuPTn69K4qsEnoMy7u0SJd8zeU+QwYDLLjjOPfOOMY96529SY3SXdvCYFV8idc7T6Dpg9P1Nb2p286EXNq4w0Zdoy2Tj0+mDn8DTtOujNZ3EDTFfMjDj7QQExkgDnII71VNuKvuBQtNKhg3ndPZ3W3zVlc85OAyjgdffp+tTLbh7iGJBM0LqSxnO1GZQcqp6E8jj+laFzeLPHAF/cxGJo5mLkq5HTJGfw6fWnQXFrFbwIyujS/MEkQLxjAYDGCeOT9fWhybV2BVnhhtraCOKaciSUKy7CUQAZA3Y6jpjnpWBq8Yj8QBZpH+zK4ZHkXbvAIziuwv0fyZsTIY9odQPkYZycg9wCBwfTvXI6rNLPaQyXdoTcNwJWUYVQeoOOck/pVUZXYMnmsnlSGzggK2sjiV3dQCT3PzH04qCXTH0jUQguUa4DkLtO8MuMDoOOKvaNK9qFSWF1CSKZJgxzyCR7Y9u9VfEd3A0/nrGN0y7o2kPIHQqcc5znrWibvyiR9MxY2Dj9KSaWGCF5pXVI0G5mY4AFOiJ2VyPxLmEXhGQO8kaPKqs0fJxz7j0r1NkM6q1u7a9gE9rOk0R6OjZFc145Ed34bBRhIgmGdjdxkda474XXjHR9chhmkaGNCyEjBU49M+9aGqPqOifDVZba6f7TLIjl4xyAy8/wAhUyd1Ypaakuj634ieJUt7aSS3hQAbAoCjGB1A9K3dL1m9ubkW93bNCpBKl4tuT7EMQR17VyGgeI9Wk+H2q6lGWN/E/kghPvtwRJj1wcH1wD1rodE1ObUrDRbu6G2aRGMgxjLZIzj3x+eaULqSIqytG68jqc15x8Y9Rh0jSPDWp3Cu0Fn4htbiRYwCxVFkYgZIGcD1Fdtdatb2t1Dbsw3yHHXoKg8RW+n3ekSLf6faagE/exQXMSyguBjIVu+Cfz966OZO6XQR8ueG9V0zT9a0OxsJLqaJtatLu5nuIViP7tiFVVVm6CRyTnnI4459k8Z38V/DZyiExh5HYrL1cBuPoOGHbqKcnhDT5rq1v30TTbRvPUARWiQmEZ4yoXlu+eo4qLxLdLfahLBbxmG3iJDCNQdgUnBwOmW7e9c2IklCzGtWY6ytPCFAVCcNGA2OAdxGOgGO3tWjDfwXkhtriZXkHzucEEHHr7VjeGr9Y7i+uXlCzxx5VMYGO4qGC3lfUrm8tk3xoC8pBJGD2+nB5ryXFaplply7lhknnEISVvKODOCVbA6Y4Gfft+NLZQPJCcRwgkLKqZyuePlPI9eaLqUs8ErzSrG5VQWQOEDDDcfhwKsWzxtDbFRuwoVSEwGXB7Y6kYo2iJszdYvypezYqHABPy4AGcAYB989ulXlaAaXbGBWiEjeWWK7Wxuz37Yzgj0rO16aG9v4dPUxIoby2ZRypHAJNarK87JZtNa+QqeYyPHy5TKnA7jk4IxT2SEWpLpZLXyQZo3GVBc4ULjgjHI702A28NkLYvGzNEiPJEcvuHPXg9+Rz0qeWOyisWUtiIoAjRoSD2HPUbs96x7q4t7W7kW5cTxMQsaxoV246+xHTnr82amCvoiiG+huP7XYqEfKNyg2ll5yfy/nWz4gMhns8QboV0+ImRVG5G2HHPXHt0rDuLm1ur2OQKywGIsjSHnJbJ3Hnvu/D0ro9bNxHJpclsqkyWVur5OOBk9x9f5V1xv7J/L9RdTOmjjZYp3I2EhTGmeMdSfxJqVrr7IJ4nKLLuVg2DuHHIAP/wCupbto0t4LiSNBI4ZSjDbzknJBPfP14qlc32Yibg5AwAuQMgegrCMObcexHfQNMY1sbdVQMMfMOFPXP5j9aiurq4lvrR3hd2Vl2xjlcc4HPfj9MVIqyecWA2xnCqfrk9qlgmhcuzp/q84WQnBGDnP54qpQS1C5f3qJJXVlbexVCUOS3Hbk57VdZY/s5aNZXKsHBjcEnndj0zn0rnJpZLW7VSJXUHcyqwYqMHJ68ggk8YqzbzSS2aIYljR5AJlPueM+hz15rncNLod0WzqiS/u2AVHV1cFQc+zY6Dg81Umhh1CzI83zYySAEOxRzxjpnH1rH8Qz3Fqhjh2GF2bc8Yxnkgrkew/z0rJe7njs/JMhCoAXiYAZ9On1raNG6TRPMGrl7e9+yxToUjABaNSoJ/mfrXTaIl5axRW9zdmYdFghGSMgHOe2PX2PpXMTXCTWsGY4i0S7VdTgnJB5GecZPagXl3HAfs0nl7QDJh8bv/1e3rWsoc0UhG1d6Nd3Zm33AdpJFMbRsFRjjqVHRsA8+1Kul2dnaot2kYbeUEhB3MMfLwp7nkGpIdQkvdNaeTUoImMeJl8sK64yABjuc9evSmS3dhD5Fv8AZy9y8flpcT5U4LYAIzgfLzntWactgsQR77ZESeGNk3bondS3mEZyRjoOf1rVmmmuYGjEBSQhTK0f3YyOx6YA/HpiudmjhtVZZme5uG+5iUlUPGSwHJPXv71qWl3LbzBJHUkKCkjvmNhuwDnHTrwSO1KceoIrzwQxXEU1pcP5WCCkxyYzj+HHb09qtS3zqsUUpjmmiQbAm0gqSCQcj37DvWNr11JZSwiON4Yw/wC6eI/u5Fxk8euSB9Kghkn1RXn3xQTJhyCcF8nsO4Fa+zvFSewHQ3moahaie3nRI0KF/IDqNpY9D6nJGfoaqR6v9hYXFyXmuZxsLyNny+xK/hjr3rGurq4VRBd7QxwQGTnHbP1p0LwlrQ3tqrRKxDEvgyEngk98VKpq2oXO409oUyxPnyOEBkVgxdT1wvT8P/1VxN3cRy2spREXypX3cEjnoB6AY4HvXVwpAZI0HktblFKyEkMW6gBSemO4x1B+uWY7G6hu7GBJZBPL5y3DjJjODnf6gHPH41FOyYGJpNwzbrQvKyuMlFbClhwGPOOBWzo9raS22pQ6lJiSViI7gwkhB/ewMEZ9DxWNoFsZ7tVYNEXwyvIThR0znuOMfpXXapZQ3DuirDDKJCri3k8tXAGDgdMYA/PFa1ZKMrIdup77Dkxgg8VyfxKUHwmdwyPOXj862/D9zHNotirSo032eMuobJ+6OorD+JW3/hE25/5bL3+tel0sKXU474Wrix8QBcAbH4/Cuq1hwngK0Z8BQIuT/u1y3wsANjr/ADjKv/IVteMGK/DK2IJ/5Y8evy1MtGPocZfyed4W1eSOeQKtxDEQjcEFWJGPqBXQaS81p4V0eQylnEbSHceM7z/hXHaUS3w/1nd3vYP/AEFq6W4kb/hDdOj5Mf2KRiCOD87d6iWidv60M6nwa+Q6SSS8l+1yKxcnJyflB9KfLfaXrPiGaHxS4S1htoxaQmdo4z13OeRl8/L247HGaxtPuPs8IYyRtsAYk5UY5+hPHcVqskOo2x83Yy5GRKquM46j25OO/vXle0lGV9zuwWIVCbk76q107Nap3T+VvRsoDWLh9POy5knhS5kW2uJjl5k3fKzseSee+OAOKy7q2ubS+ijuMvvJKcMcNwOg9OTmtmNY7e4u4LqXzFmcFR95hn5egHXk8fjVu1CxuiSrCuwHbKgPAxkc0vau+upFeoq1WVRK13e39f15I46awt7bWJ4ym3gAkZ2uD/Fx26VpaY8EV4sZjXDj5sfdXg4z0yO/r+tZ+upcJdR/Zi0kywlty4XC9+ayYLue4hD/AD+aGIkOM/Qn3/wrZQlON7nOzavUSEPbo0csX3lyMADsQeoOc+v44qtFdC08u2UJlpSqgyAgdlPXGeefzqK5gnuLeH7TN9md8v5pG5ivoefUHH/16bD5ktsZw8flMxjWSbh2Xsep6g9O1HLZajNLQIY5buS8nCu8T4DMQfXnPqf84rZcxy3TJHCkmEcI4Y/Lzjg9fQ9ue9Ymj+ZDEsdr5SkLvYsSCCBk/lkcVpJYJPeTTNKIyyeV8jgbvcccfj/9espr3tREE15ZxwwXB3bQAdmPl8wcnIyM8/zqraXu+eK8vFb7OZD5cqja0b7frkgY79cGta60uCRrlMQtJ5W9ZycoqjocD+Ibevv3qjPp1mbeJo97I6MXByfm5ySPqQc8d+KpNAMjayu2aQssjQy4Zd2BIh/3ccYz09OeK6nU7hUXTMnKrp8bEEZC8H5vY8daxLW0t7uOG9S2We5G0SKwwzJgjgDI4+gq34q1L+z7DSF2bhJYIuxSBlTkEN39Mc8c1tFKVNxXkGxS1G8imY3Zh8tEk2SDJJHOC2MHk+nFYl7pVxcebNBLHOQdwhB+YHOOp4x7Uss88NvMxDq0EgZ0DZXB2jJOcdai04pHcTm6nKuXX5d2CARkEYxx0q6atG6L3V2T6fq0McqQzTlcKCuRuwcZx9ec1s/aN0yOkbsrAcjng+v5VlzSql4Rbxwlw+QzKBuODkiltdXjLI+Q+3cCTyNv+PBx9abSethKxduLKO5WYqSskoMm5wpwQOQMnj/61Zc2ozrYpJNIsskdwpVXUZwARjjtgDj9a2ZriIQgiMiJQNsiLkqehH0/xrk9SuBcEJC7tGWxs3dwOTjr1/SsowvoJskvdRkuppJRbiJjlUKj5VzyevGf/rVEJYXiljRWaXaFJIHDE4J4/n71FHHbmAj7YAp+8pB3cew/DFZ9wzfapNmNvQsBgfh+tbRgnohA0jI5VcNGGx83cA9M1U1GfU21Gys7BljkvJTbxnaNrZKgcke/WrW1JCsTMVAyWbrzVS41lNNvbS8ZWaW3hnFupUSASsoVSwbjAzu6HkDit4JOQFzRn1Jdfu9DvbqCby0DxNEqhZTlCrK20MQyHIz1yOKv3hiubu7ZlTksU2E5GenBxwPwOaydG1ODXPEdldzkQXEViI7qRUSJNyPtRkC4AAj8sYwPumustrCOSNVkZVEi7GkGXKE98deufpx61lWahPQaMT7Xc3f2XT2wCn7tIxGQQeM9OucYzXf2cNre6b+8LQwiI7txDKoxgn1HODz6/jXlt2ZLa+Zorh5JUb/XKCpz3IzyK6zT/FMf9kxWEyTCPyWhYMdyk5689OCfzqMRSbinESZH4n09LHR4JYJYZIWckbHLnd9W56EcZPeuUikdArMOCeCeD+dbGq30RQwBVaFPmgAIJAJOck8nufbisXc9zIqZ/cgjKhuAM9B71tRTULSA05ke2jhuJHRpJU3IFIbjp26dKTz31C5jWR3AwqZC7iB6/wCcUajIfLVBbgtDlV8sgbeOMjv2+tRMsyXSgxlSY8qu724IPrSUdAuWZbu6CDT7effAWPJAGSCcEd+mK39PvrmOwt3vJytssm0/u8HngdR83T8vxrB0fT21G9jtXd1QnHmJHuPPTuM9fUVsarLDZWcdvNDdPHEoiSWRNmXIzwM8446etYySb5QOhvr6J4SA3kfZ1b93G2N599pAI6HJqjf2sk+jSalebZIij+WsSnKNwMk9AAAOmc9/WuXurzzohgAS+XiUbsB8f1zjioptcnhgSIrvUKEXdnCEHoPTk1KoPSwI+jvDcEcF+DEjAPASeeOo6VP420251fQDaWqBpjIrAMQOBmquh3tsJmu4odTlVlKBniyoGRwMfStptVhc8292MesBruT90qSuzivAnhzUdCt9Yivrfa1wG8vawYNkVa8W26w+ArWC7QqytErr34XBGa6kanZgn5Zx7fZ2/wAKw/FP9m65pLad9s+zyM4cb4yucZ4+bA71Lk92Fuh5zbWsNv4H18RjMZlicZ57MM/yrRvJhb+CdMO4FjathMj++a6LRPCBu9Av7SS5XZcPt3ABxhQRng++fbFR+JtAj0bwdFbbvOeCNkWXBHUgnjmk3pf+tjOrBtNeh5zbSi7jR5x+6J2hxj5Sc8jvjnH4VNLrAt4I4UWNdmYyAm1yA3QkH9awzLJtcwykochsnkAf0qOExqgiTa0i/MzkdvWuJ00yzof7RPmyyQNseQZdgDwAc5+vGOPU+lP1PV5Fto1nkJJyC4wCxwOQB2561zdqz/bDIu5gjcPggY9/yq3PzNFcXAUgMflD9/Xj8KcaSvcdy+Jw9oHndQkqZYEYdVyBgZ696qvbRrMY4EjxnJZZBkAjjBPfoPw5qC7mJukt3kGGcHbuxjnoSeBSwae0ty9y7pkPueJssAcnAPtj0zwDTinF3kLcvyMbfScyR+YkW4M3BwSep7jgY9OeorGiis5I5nSTAji37ZP7+fugdD6846V018trf/Kkw8tT+6hELHGRnAY4J7jrXH3tvcWDKZYW8t+U5+XJGOfQjIpU/eWgM2tMGyBLx1ljCknzY0JwegBzwQcevrVltTCZDYLyEsxZQRlc47cc/nis2ymmTTJUGHlkceUuzcXz6d+v+Tmrp0m/uILVp5VjtpULvNGFOwge+AXyMbc59uKThrdks0LW9UW4lNyfK3eVPIpXKZH3cZz90/8A6qmsZ7P7OY2fbPMw8uXG1AQBwQBycHuf1ridWvrcX9usMglVIslnQnLcnGPTP5ZI7VrWeo2U+jsgiAumKsQqEeVjjdnBJDZGcHinKg0rrqNF6a+NpdKLeWONRIqBQx6M2MnA6AnH8s0vxFt5ZodEeFGLLp8QcqOxLYrjtUvQT5EKFAj5IznkdweuO9ejeJ5EWPQwcGV9MjxuOAAGY9fXOK66cPZwuLqecaVd3sN8pWRxk4ck49uc0andkSXdu0ZWVbgkuzc4HG3+v411B0W0ub0XUDsXZQHhQgEueAcngfjXH3lldrqMxmzGWc7/ADDyAT/FVQcZO5V3Y6XTJZbq9LFzMiR4U7cDJUZGMVqR6dH9gaJFtxdOoPcgE98/j71yum31xa2zzIxwCYxz90Hmuj06VnSKaF2E2P3ik8bQ2cj8xWNSLWw0XrGVZYUt1PllDlw2RjA6dO+a5/U7ef8AtuXKOwJLDc+CV7Hj/PSp9NvLh5riTd5aB23FyMJ1PTuelaa3Nrdr5jqF3/KpIwX7g+vbNTrFiZz135+nujqrp5oKkSKMuOxx/Wq4tk8tXCuBjliMLmtXVPsskkcIEiybfkcH5WY9f6fSsW4uNlsEZY90XG/Jy2fb/PWtYK5LI0XaHSQDfjKkE1WmSB5SZYI5cfdBG7HT1ot5X2+ZIBg8LyM/gPwq+pKxhYog28cufX0NOpLkZ2YPC/WHK7dkuiu97bXXfVlIiKGd5o4oY/ORtwhjVNpJ5UY7dPwrfsLvbYu0zHb5QRQBncT/AAnpxgHNUEEcry2biMM7K0chBBRhjAyB0IJH457Vp6UqLOqSsFiRdhC4Pyklhz9azqSjKCdjGrSdKrKm3eza+4rQR2c13fSicMFOA7LhSp5+6ec9R6VR1DUVvZGwMAE9FAB9zWhr1/B5r2trGLeBXYhNudinHfrziuYJ2sepQnBYDFa0o3XMzFjXGZwBkLkDrWikVoirG5CsOWdWyOvb8KJoLWC380MDcMnCMcj61j+aVVWbqW/KtfiWgHRzx24gEqNtDkIGZt3YHv0OPSnXd4Z7JEjhjWBpMM27LKcdf8+lc6xnmJzv2rzj9M1I0zIkYYBgP1qFT7gXNPu5rW+EbNlPMGSCccdBwRxW/qEF8GFxJeokMxDbC4LA5PTHX6jrmuRTZJdODIoUZIbnHFalwqLZ20wlB87Py9SAOMD8/bpUzguZNDK8ke7eJN3mAgqB3yece9QxXioBA0Ssm/fk/e+gPaobgyQyGNtwK9vw4P5UyPax3Mo3HnJ/nWqjpqI+zNIWRbBY3YZjJT5VxwOKuswRGdnCqoySeABVZ5Bb29xKsZdlYnavU1y/jq9kPgGaeNjG82wMFPYnpU86Xu9S2up10E8V1EJYJ45Yz0aMhh+Yrn/GNjFquh+W0i7VmGXUZKnoelcd8KLqeLStXiaQlY18xPY4Na2hxz2fhFmlm815rnzAM885/wAKctrMmV0m0UrQXOj+RDDdyvbmMlF3vGB+Gah1nVrq+0a7gzKVKqGBmZweQehHvT9UxFD9quZCCq7tvUgZ9PrVBbpPs82JWjkXBPylSncA+p461jVajHQxozqVJtPY8x1TztPk2MgG6Mkbhg4OPWpNKiQWUtzKvlzfMrNuwCpGRjnnHBq949mkjksoLn7QXAZ8zIVJBIwRnqOKxtP1CKR3EgLOx+XLfLk8c1FuandGz0ZHPIkMwKl/IOCyqf1pkt0JLVTGx3xHrntVi9naSNnZVEcOELIvU9hWVZxzXExEIGVJYhh29fpWsVdXYXFnu5bloQWfKjYzE5BPX8O35V1cc9xHp0k2oRRtcRzo3zYyI2B6AY46EZ7jgda5PVIRDeTCLBD/ADBU5C5Gf613OiXMUmiIcFwVC7XXJLKvOfb/AAqa1uVOw0TXV2yG3eWLy4Q7bccHOOSQenTNSrLY6raPFOm6NRuZiSD1xnj61hSXwcm1FnJNco5ZduW+XHH+HrWnHIy6c8sscJjiYMiquWCHqPUDnp7fjXPyWQXOfCSW2pSkXJDRHYXXjB3cYI9gOmKbdSTgvYXDSpa58wxlgAWIBY/p16/nWobZBcNKsMrgEPtMeSG6Dg4rA1Qyz3kr+XcCGLtKnIHGc9uCcV0JczEyW/EV4yuluIFSMRoifN3zknueear28D2ieesw8zBDDrgehHfrUK3Loj4JKxjue9RSztJHueRycZznrVqL2ER3jyXFwXCk4GTtGfxr0nxtP5Ol6KxtvMA0tGWTOCh3MP6ivLoLh1u49obrgAd816h41R/7P0CXIMUelgupB5G8j+orSS92wdTltJ8RyW0sZTAbG12Y5zk/p/nNP8WxC7aC6tA2yRfmKjKlhgdRx1B/zisTT7E3d+UALDBY+wyOT+ddC+5dEhhjIaRXK5AywyCOB2+737GsZJRkmi09LMraHZi90xo/MKu6lXVRyw7f/r68gVoWFrLBeyZJjES7BEzjd2yfoeevtXMaVcyWtw8hOdrFWHT5e5roXvJHhMsYIRztJU4I6ZOf8ilNO4kyvp92xumQxxxLuYNgbQw7dzj6VBd+Vb2rfNJG6YKFgCpI5Ix6cio7uOEMhSSSWVxmUqCcPnPXvx/WmeIXkthEj3CSyHIdNvK/h2pqN2rCIW1IXlgpkKx3ELAqqjqpzz14xx+dZE0rTNnqfrSMQNzr3GOe9JGhIMgycHA966FFLYRetzGWCKMbRwdoJz71tGQARQxeWgiVpNzHHmdOAv8ATvmsZDCsYjlQpjHAODUIvnikTyThYiWQgcg9eTWc4c44ycXeLNRdPmkmhuY5I4oJJCAyvuMbD+8o5H41dW6vG2bV+a3lG4q+QF5z7AdcmuSF1LHOZVkYOxJZlOCc9a1J7pDCZ45VLSrgjHzA8Z/rz70pU23qCLfiK5t7iXzbZycnLp1w3f8AlWMszrbAnGVbgY5P+cVMt3GIwrRA8cnGe1UJJsnbnIBq4RsrCGtK8s2WY89yadKyNsVEHy9T61KYxO0a5AyPx9DUV2iJO6w5CA4UEc8etWA8uCMLwSO3evTNC8K+G7rQ7e/ns725LTLGY0kKu5KMSBjp8yjHtXlQY8HvXs3hy9tk8HQPNqbIBcpuliH7wfu3GFHr2rmxLlFLlNaSTep5VqkENrq93DbxzRwxysoSb76YPQnAyauwXQuY4YediSbto+UAfy5qnrN0JtVvcXEk0ZmO1pBhiMn73J5plgPNLDaMId2Seg9K1krxTZD3LV6LdhPKsTI7uSgXoOeV+mPSqDSJICCAGxwasM0f2l0YIyhTtKk7QT3HrVBztfPX8KqKJZ9pX8ippd47mVUUEkx8t26Vwdvew3vg2DT75XvEmZmQQsd6IGIAb/aU5HvgV6LCNyyA4KliMEe1edxm+8NQarqaqttYiUxAoozIwJAbGPz965qsXzRkjswqhKXLP87fiQ/DmD7INegwSEUryMdM0/XZJIfhc8kQ+dJFI4z/ABGmfDm8e/8A7euj96VS3P41fnLf8IDFhwgMyBifTec/pWkm7K5jUUVJqOxxE6vG00q5WSfy4IwDgLnBOM/QD/gVVdV02/ttL81ruRx5m2RWf5c7v/1frS+O5Z7PVLCRBtitgrKCf+Whwfw4AqlqHimPVbV4reKSJC2+bcwGDnIANKyauZap6F34vxk2uiu9tKsvk7GlY/KcAfKv07/WvMLWcRJIdvzYwD6V6n8V5bK+/stIb8STJDlo9wKIOMYx3PPf0ry1YlkcxJG2/B49SBmssFZUEjSrrMdDdhUMJfKFic45rWjuoIbNLm3lEYkIjdjgupUAH/gJ61hxLEiyeYpBKgKwPTpn68ZouNrQQlQFyCcfjXU4pmaNG8miOryPMW8hQrsIsAsCAcDP/wBetLS3QT+V52zfmXep4Qen5df5Vz92VEiOGJZolUj3Cik0twLpYypOchSD04NRKF4j6nb295ZXeoJJEu0+TtdFcqST1wwPpjr+FQ6TDta+AmLxKvysz8hduec+h9fSuQmDx3zNF1V+AO9dh4Yh+0R3bMFZ5lYb9/3cg/l/9auetDkhe5pSs5amvpt+skbPIym3Lq8mz5hnGMZxk8Buv64qtDqVl/bUcWo22NOUTCeAHaJmGHVcjrk44rV0e0t7HwrNGikBtQWFyDycIwIz3XdzWXq2mfalt5fOMa2jAK+MkruOAen070Rtz2IOdEUU+mTEwqHe9cBFB+U7QcD25rLv7drd2iIIA7Ed+9d9c25OnBWRN3kKcjG4sTtyAOScY/KuX1KGa8CwCPdMvAC9ST7V0u8ZWJ3OXgdo7mN1HKsGA+hr0/x9eNBpXhr5FZJdPIYEZP3u1cJYWIXV0hnDIUJ3joykHGPrmvU/GnhGefw1Z3ElxBKbUIkKxSbmVG6jH6/WqlJbM2pUHUi5XSt+J5HFcy2s1tNay+W6j7y9Rz3HT8K29d1CeNrrT7cuhjkZZztxuwMd+mcnIpsGjW6lWu2ZQsnllQhwT9fX2rDlSVBukJbI+8Tkk55yfWp92TMWWNMAZmPyeYi5+Y43V017pOo2miQatKI0tLz5rcj5mJUcg+mfWs3R9EeWxkvGk8ssv7oYyDzg5/WvQjY3eo/CoWVtcxQyJF9rkMh2/ImQUB9Tj8axxFRU5Rvs3YuEeZO3Q8m/tN0neRgGYjAK/Lj34/nVfU737dfyXGDhsAbuoAGOaix97Ktz909Mc02SExkhlIOcc8ciutRSdzMVsKhUMGPtVu3Ei6cWUgIZNrce3Gf1qD7PJ5aOc/OOD2I6f0p4ilC55A6/jQ1cCF3yjDIOPQVEWATjIJ7VYZBHbuSoLHj6VXkbJGeeMcCmBC3XHarA+W2RvVjVduTUr5EcKc8jNADGfBbGcGo2YGpG9OlRkDNAEtvJ8wVvu9eOuaWQEnC52hjgelRRKWkAX8ankTZIqZ/iOaQETDhTjjArY02N30LV5A5UQxI4HqS6r/I1UtLRLm9t4pGZI3ZVLAZIB6nFe6p4G0efRW0iIBYrmNCbmGMK7D5SDnnPK5/wrKrXjTaUi4wctj5567uMZq5prwLexrdCRoDw4Q4Yj27ZqbXLCHTtXvrWymee2hlaOOZl2lwDjOO1VjhWiYnAK88VruiSZ/Ltwm8biF2j3qCV1Jby1Kp1Csc4p9/Edynr8u6q6qWj6jj3oEfbsIK78An5/X2FcT47WSP4c3u7creeSAe4MhIrtY5oN0n7xM7+eR6Cuc8W2Da54Un0+zeHz5HBG9wowGzWfQo4r4RtnTNXZ22/ujk9PWukV7aPwKjXflmPzAP3smwA7jg59RWH4Q8Kajot2tneXkKRTbvMjhkDeYDwO3Y5/Sui8VaXbz+E5dOtHYqZQ24DcQAxLf1qJvW5ajc88+IViXWK4EqLGYyxJbcXIOMD3x6+leeWml3EsDXBfy4G3bXYcMwxx/49+hr1bU9LsdR0y2iv9V+yGTZt3QmTdk8dOmd1Zur+H9KTQba3tvEdjcparJOyKdruzDIIB69OlKldQBr3jlNe0O4vdcuIoYyscdvDIXwdqjy16/WuYuoHtbrYSHcNg7e+DXqet30diI7VYo/Nv7JBI23LFdgB57DAFc3faBqD+IfNt0JkFzJ5bNHwGWQAA/Xj8Kq8+d32Ismc54jtFSSweJCI5rONsgdSFBP9PzqJLBpnaIlQILXcdpH1/rXS3OnXSXE8l9ZvBHp9mLWYPwSxU9PfC1hapEtrZxMu8m8iIB9vMA/9BUVaTQ7K1ylbaVf6wbdLOzuJjtC5hiZs+vI78gVoaFoM0viSOxMLrMJvJZXBBQ9DkdsZ5rfa9u9I0G0SCJFjuJSANzLjaOB8pGepq14EQtdaddrGXnnuisr85UFs9c98fpTb0bF1Ofm0W5sdZvPPtpXjS88qJtp2yEOQQp6H0rbs1vLRZ/ItWVrXzGZTICFwdzD6da7HxDZ/b5dHlGI91+ziPaRyJRn88k1ztqv2bxV4htST5atOzc4HQ8ZI9M1lbnsmPYg1Vls/htEYmMIuL4sgBJ2nYTjP41Qsb1G0fWIlDO8NsCjZyABIPm/DPf1rV8UFYPA3hhNzYN8zAkZwAR+eBTtF0mEf27Fcy+QsVu8NwEG5m/eFjgewA79/akorlv5j3ZhjWLm8ubK2d0ieSGMFlGMglyc89MgVoeH0t5tY06MGYXTyLmQjj1OT61V1vTYh8Q7OzsR8h/dxqBjGGYf41q+FIJLLXbGVjLMolYG3RfuqFwG5PJ74FXVV1dCjuch4ouoV8Z3l3YgqsrspbPV+7fnXoCw6pE2hmyllkuLyCaVRbrhwVGBg89jn8K4HVbPyxFdBflW82uxHGTzXsttf20ereD7oRMkYjuQQgzx5eCfbmqSTSubOpUouVOL0e5534rtrhbS1kiN0p+13C3KuMt5m4He3A52kD8O1c74k0WbSdYe2lZG85ydzLtC88HA7H+lem+LfLWwS5hEn7+9u2Y7cn72BnA9q4nx7Mo8RXSBMkIoyR6ouPqOv50RXu6HO9zM0fWx9ga0aA4t1O1geMZzg/iTW9F4nttL8JzW91YGd7yJ4IkmAKKRjLfUbgRx1FcZZRHy5VYIA8ZlDOecqOg+ua63W9P06Lwbp0gwI1u5QH5LLleQf+BKKzq0oVGoy6alQk43scGjMxKJuP48Y7/0rtdIt459bN06RSbg7YdFbqc9CMVzDeSViWENhYfmLKPvZycY7fWtjwtK41JN+SqIw6dM4z/StZbMSWp7ro1ppA0DT7i+0rT55ZpCu82qDauTknA/zmr90NKgnWOx0PTp0K5LCJFwfTG2uS0rXEW1trWXeUjilZfLIz8uW7+tbthqccweaOCQiJDIwaUDgdvu1K52tA91PU574reHtO/4RK21CHSra1kWdTM1vCisFIIPOORkivBI7dJZWVTlckKcda+kPH15/b3w31V44TH5KqwGc5+YV4Xo1vHPeTYCnCKw4/StHdbi32ObEeYHATLBuuO2P/rUTkx+XgDIQYPpWpqcYj1Z0xgE8r6cVUvUUQntgj+VPcRS5OD7VGUyCTx6A96nVeF+maiYthsdjQBPbIBavIELHOG9vSpJT/o0GPvFyDnrUMHmJgZKhgfxo8x/NUbzgnFIDSspvI1CykEvllZFO/Gdvv+FfSen38cus2tqZVkm+wJMWQfK4JIyPxBr5oiit5APOm2EFcfTvXoGgtA3g7WFa7MwkXy0fd8yYBIwe3ODisK1D2rTuaQnyo5/xK/m+KdQkNyLlmuJWMyjAc56gc8enPSuc1QfLGOfvH+VRC+uDsIK5VRj5fanXM09yYfMIIzngAVutFYgsXESvMiFwpaL+Ie5qncWotoVXcCScE9M8E1v+KYDpuo2aRIjE2UTEY7nJ/OsjVELWsRxyWBP5UR1VxM+woGy0p2gfP2HsKW0b9wPTJ/mahhmjTf8AMfmbd93p0pkEyiBfmwcnsfU1zdDXqZWpm4k8QiSxOZYI1jkU8Aq2TjPbtzVXxzNOng2/liMkDApsbO44JGT+prl/FFk+s3WpeIrF5UXT0RYWRiPtDRvlz/ujGPqK7W7jTWfDccEUjKs0SkMyHOCPT6VVrK4XPNrm+jjtLOK5t2eXZvDrGXw3HHTg/wD16XSNY8LxTNpviXTJftFqrRlTFlYfm4AIPTBOSfSunl0TV7W32WWpGPbn5RD1/H1rnbHS/EGnXd7Mm/ddyB3yqsWIGMnIPvTppJJhJ7ruZHiu2s7rxrbGw86WEWyZUqSqjaMAEdsYNXxc3i6mDJCVhD83EnDe5Jz6+1XdZl1OCUMsrxReTHyQNoO0Z/rXFXWpzSW0sEvlq2AR87EtgjjuM966YTSk7mTWmhs+I0utT0y4vprptrRqUjAYiTHyqcngE9xxXKSwXDXelafMoEMQIDcHLgEnn6jGK7Sa8W3t4NPtRBc3JQS7uoXau7aQVA6gZ5NcxFcatLqFjJBvkks5JicKDsLZ+bnjnOOvarlC8eZf10HGX2TYvbmy07SrBtTg84OJQqOCWjfCHOPxP6U7wDqtwYrDT4LaMILxXeZm4ZhuOwj2znr6VTvvEusLpl35sokWVArBoo8DIIyD26dR6VX8FLdR3mmC4SdbQz7oyUxGxPcHPXiuPltFs29o2lDodRC1pD8Q7uW/lf7PFBLdlnO0BkO1cAHoDjHqak1OGwl+13ukTI6T203miOQ/O5Q7W2sAeeea5TWrk3muaxc2/kQoybVjAO5o24P07Ej16VZ0+7TkQODNDYTgOqEbWUZPXr061pBaqRlK1mjS8ctHa+C9Bt5Iw7JLKVfJ7Ouf6+tUPA96mo+JNfLytILi0mYF+p+UEflg10viS7itfC/hyOeK5ZVEd27Q/NgqQxB54ye/1rA+H6Q6Xe3GtXsflRXCso3kKSWY8DJ6Y79+fSoUrxdx21M/X7ySw8cWN9AVUxSuUYglT87Y+vWovDmoXVzdrOlx5cqsxRix55AAyeB1rV8TaWup6nZzR3dsbeMBi5lRSRls4Gfp/kU3w7YWy6tYalAlrcadBcl5iqMrFUyPu4wQODnAJ70+eKjuCTuQeM7SSzu9XtJIyh+0tcKFcEDLgqRjsVP8q6q5mihsfCck0jJGkdw0jDAyuzoc/WovHuj6Pr+ojXLCQzQoiJcR2si7lc/dDL24x+tN1K10fXPD+m2U7ajDMLeUQLDsctkqcsoORyBx35pxtYJNt3Y3UNQtrnwvplrA6rcTtPJBEsRPCtkjjp8rd+Pl61z/AIrFjL4nvPtnJUKApLKH/docAjPr14qdrNV0nw6xlZJLOS4COvBbDL29MhvzpfE0cN349minCRwsItzKDmJTEnI7YGR+VTF8sbjkubYw59GS08hBMzB7MfvVRimXUkgE45HTHqDWvcWA1Lw3b6bHMY5ZLuWby3jzvYKpwCDnPJwMHOfatjxR4SvNA0tGgv0ksJSjRbuB5gGAQc7QSOc4HSsu1ihXw1baldN5TW+oyQXtyjBskgbSMZDcAjj61cZXSaFJLm0Kmq+F7ay0mOe4vIrZ0jVvKCg4V/unkgnJByOSD65rC0SO4uJpvIP74wOQFbG3AHPPTpXc648fiDS7u5WxkZo4YIoreIhmkCu3zLtJyuMc+mPWuAtre90edpZ7S7tleN4mMsTBW3cAc4/z9KVO7TTLqpKV0d/oTm8luLuOO4KsjKFdMFS6bSAo/wBroB2rY+xXFomZ4ZgjgrvUMpBxxwV5qIazaaXBoUsIjMsbuuHOXPQjnJ4GCuf9nitfxP4si1Hw+8skLR/ZiJRIuWQODhQw9D0/GtU2tEYuz1LGrNJD4IvrAW7f8g1pJJHYksQCeRjA+ua8X0G8W88QEv0aDZnH9wDnj2Feva54iM3gvVreKW3ne6tJCdh2hT5fRQfw9a8o+HlvYyapc/2hGXTysBFJDHJGcdPT9amT01GdLF4b0e+1l7KS1nW+IzO0sy7V+UEhRt4bsPeud8SeHtLOny3Gjtd7oiWZbjaQyDqVIAOcc4Ir0GK70qO9srq3tEmea4REl3MWn3DHJPoAe2TgV6FD4X0SW2kSOwMabiChBGSO+M1pFxCUWkn6nyQ6bVBIwCDgnvVZcgkg9wfrWx4ntns/EeoWsm4tDcOmWGDgE4yB3xWQEzIqcgHv1qbCLbykzmRmXJJ+6vA+gqxFpF5et59tauYkOSxIUfmf6VrR+BpZ9BjkupRb3l/PBb2UJ7l5UXe3oME1x+pLoRt3OmNepNHMEC3LK4mjwfnG1RsIIHykt97rwaLW3EnfY6l/DN5exI0XkRFeGEkoUk+3tWxbaJqMOjXtsssC70QxpGSdzfdbJxx8pJ+oroLGxmt7O1N6VjF3L+5VlG5iB+ff9a3I2g0u9nsdQRi6cgEY3BhwwPcfStXGCVzPnlex47JpF5aSxfa4WRQQu7qPbkVoy2kAQhYgCCMH3yK9CnaxniYRxyybywwse7GO/HWud1Dw/cwvE8UBEUkgGZMoMAjJGcZ+h9ayly3913NI3e6sbENso+KulQTRJKphhiZZFDAjyx2r0+40jTEnfEdlCBglDbIccDpxXl9ze2tv8U7G8lukW2V4j55b5MBFBOenBzXoN9408Nht39v6c3bPmBj+lRHRL0Q2tTIma4lZ5otUvomdi2xZiAM+grCb4l6Ppk8lnc6/O0kLtHKrxSkhgcEcLg85rbBAOcV5tZWVpc6kkch0dWu/Et/BJHfWu97pB5G2NZBGxj5dhnK4L5pKKKueq6J4ns77SoZLJI5tNlVlTClFIyQw2kDHINbNpr9rawrbpZiOOMbUVXG0D0HFeafDkf8AFB6bx/z1/wDRr11JBosB1i+KbAx5Nu+R1Bcf5NDeJtLdBmGUD/ZYA/lXIEewpu0HqKOVAdDqs/hfV7NrS8sXeN8cq+CcdOQa4yfwxpMp2QrBGicINgBA7ZYfeP1zWlsX3ppQelNIDK1DwnDf+cVvmhRznMbDeOemfT/CpW0Gxe5gkcQMqReWUduG/wBo+h/xrSX5R3pcB6pyk+orIpN4O0i5ztSMZ5KmVXT8jz+tJH4fbT3jlsrLS5mhbeu2V4m47YYlf1q2Uwc804OMYYZFZuNyk7Fc+FdHtbc6lKk6zKoleMneNwO7HBAPNaC+G7K/02S/hhhjE8LjzAnzbWBB+WoNkZ5GQakSV4jw2QKXJZ3HzaWJ9TtNO1vSorX7eYIrZPKwyOpxnnrjPHsagh8J215JFDJceZaQK4hZGZS2QAFYdgCPU9e3SrX9pOoMbSGSM9VbJB/kaelzaM+4wxxj0jiTr9SM/wA6FFpWQrmXP8PIpkQSQ2nyLsBM0i9CenB9ayNP0PWrXUtT0y1UIipy24hGBGFAYgZzwT9OcV3EV3DtG2SMEnAG/B/9AFXlnkiRWfKAjgyHGfzcUnFtWY0zgv7GvLqaNNHhgR4oFWUswJjIwoD5HDfL0z69O9mz0LU7TStPvNMjV53SQ3CuwVt38AUkcc5rthq208XUY/4Gpz+TGp49UuWG5cyL6hGP8ko5dLCOTPhuS/WX7TAbZTAhRgFY+YSWY8Y6NwfXmue8W+HGS0g1Fld7yYJDLFnKEBTgdc/wj9K9UGpXMmCttnHrE3P5gVHLqPmArNDaBT1EuzB/DdSUWtg0PGZItX1HRLPSorW7+wTRlreGWRWML8ghScEpwcA8jPcYqC9jvpPDi6Na219bS2imQRiHDTszYLEdcYxzz92vaV1G3lYKbSzk2jC4K9PYUiXNqkoaHTLVJEBAYIARnGcEfQflVK0VZILHnfheWKLQbe3YSQEWpL5hZk3o+08YJzgdMZ4rO8Xf6foU0StcMiOsjERSKoCnngrxxXqs7288QX7JFC4bIZFxjPX8+aq/ZYsbTIQD/dyP61S3EzwtLK7mjSz+zXau/luhEJZ9g4BC454J+uDRd6derb+Uj30zyDEkTQNEpxjnGMfzr2o2s9vn7JIEGOSp25+uapTXWoQt+8i3Z7nIJq02Jo4K00vVdSuLEG2lttO+yEOSjMGbGPmGM8gdvWo7nw1d6fND/Z1jI6ytsndLWT5Ex1x3/CvQk1yIjZeaeXH94SEH/D9KU3unytiKSaBfR0DD9OaNQPIPsHieO7jki068+z2cu6JWt2XAzjOMZ7/hmu0tvFHjcQXBS5vQY03Rxm2HzdflGVJyMd66tFJP7iWzkPYkhG/8exTpFvIU3SWUgTrvVdyn8elK7Lc/c5TyjVbGGLVVu/ECzPc3/wC+MZHlAE9dx5xg/Sp9LvraRyuleHVcKcGRF3f+PVh6zqlvJrt2mrS3BaOQiMLyoXrjH9KmTxY4s7LS9Au79JRKSQX2hifc89QPyreNRR0sYuNzr/Gena/b+Bn1BII4ZTJE0MUOGmDrIjDAHcYz+FeRa1Pqk6yWc2gJprPN588cVtIjSSAEAkOTtxubAXA+Y8dK7q68SPq1rFFdi9fUIH+aeS53oCD/AHcY7evYda0fEPhvTV8N2+rWF1HPOzAloxltwALBzjIOSBg5z14rOpVUpWvqaxw9SNP2nK+V9baX9T2DT9F0i9ttOvpLUTBbceWkx3KucNkA8A5rZlSIsjJa27MCAWkXkL7cVzGlak58N6YsN1DbutuofzIt/bt8wqVr6b+PxBGn+5bxj+ZNfCTxtbmacvzOn2MnqdQJdvCooHsK8u+Letva29jaQ3EMt55zyGMAbkj28ZGc8+vfFb15rFtp1tLe3PiWWVYFL+UpiG/HRcAZ56cVwviTwxFf+Fm1tpbdtQlJmeTz13sxAOAOucnGM9BXpZRCrWq+0ctI/mZ1I8mjOEN5casgimSNWD/K/IxkEY/UflVNtMmsVW4kSKZd2FVDnce1dP4U8O6tqtxCZLeU6dvCyME464PT0ruNR+GECWpl0hpBdIQyJIWCMQehz/OvpZT13Ml3sXtpz9yvM7/wP4we/wBS+wa2ltYXl1LP9nW7lRTvPO5QuMkYB69K9GuLkWlrLcySL5USlj2J9hnuelVYNRvGuYIriwe3W6bbA7OpDHGQG5+Vj2B5J47VDqRi7NnRTwdapBzjHRenTV2W707XKvhPSbjQfDNnpt00bzQ79zRElTl2YYyB2IrZ346rSymeFyksLKw6giojOT/AKs5iTcD/AA0u1fSofObslC3WAcoDn36UwJwo9DR5ZPRTUIuT/dpwuvVaBDjGfSk2fhSi4P8AdpTPk8DI9xTAACO9LsB60wze1KJvagBfK9CKXyyPSk832pRLQAgjyORil8gHpS+Z9KN5oATymHQmpVaWMYQ7V7qDwfw6VHvYUvnHPQUAXP7RvSoXeygDjZ8n/oOKBfzniRBL/wBdJJD/AOzVU84ntR5pPpSAufbW28WlqD/1yz/PNJ/aF2BhQif7kaj+Qqp5h9KPMYUAaEeqXXAZpmHf98w/lUo1RlX/AI848/7Ujv8AzNZQnbPNHnn0NFgNJdVmDEmCL8FxRJrCEfvIUHuJMfzBrN+0H1pfPbtiiwFv+3LVeAY19/MUn+QqWPWbMqx+0x7ugV+VI9+T/Ks/z2PbNNMiHrHGfqopgaL/AGG5IVEtZCf4o7kJ+jAVQm0t977beUKvcfN+o4phEJ58iE/8AFIFhA4giH0QUAQ+RtOFY/SnR3N3ZndB5yn1ifbn9aeBCAR9mhIPXMYNIFtgObGA/wDASP5EU9AOV8Z6Y/iDTZfL0tv7RLB1uBCgZiOoZge9cbofgq4E8v8AbljqCRbfk+yKrMW988Yr1sJYc77Fue6TsuKaYLA42rcJ9ZGP/s1GgjzW78LTW8SrpcGqEB9/7+3AOR0Hyk5H4cV0oa+uNPv0urPUlN+6GSGFdsagAFnxwCzEDtkY6kmulNrbt9y5b8ZXH8+KRbF3z5cszY/uzbqy9mufmv5nc8dJ0PZcqva1/JO60236/wDBvwd14bSa2lEdprnnlTsdypAbsSM81k6J4S1EXpbWNPuzbhThYtuWP13DFeotZXCfekulPuB/hTDBN/z8yj/vn/4mr5UcdzkJ/COmvZypDpuoJMVOx3YHae3G6t7SbrUG0O30690topIwAZdyFODneAOd5Hy/Sr/lS/8AP1J+KIf6U0pcdrlvxjFOwrl2O42Hd9mhLf3tpB/nTjfyhsoCnsjYrO2XQ6XSfjF/9ekK3n/PxF/35P8A8VRyoLs2NQ0+LUtPns5CAJVwDj7p6g/gcGodM0XUr3VbRtUuLWS3s5POjEMbBpWAIVm5+Ug4OBweRWpt9quabhboMzEDaRxXHKCbuz1oYqpSpuEfPptfR27XX9XNS706C7jUyqNwGA3INcffW/2S7aHcCB0OOtdwki+WfmZsHuOlc94itV/dTrjPIOK0i7M81owOCMc1GQP7tSYb2ppDeorYkjPA4WjgjkU5sgkZHFMMgGAeRTuINwFKGU0xmU9KbxnrQIl6HqDSbhjpSEqCPmz7iggGmAu4UufpTMc81IF4yDmgBu7FP3+9NI4ycGk/GmA/zCKXf61Hik5oAmDZ70b8VCCc9aA5FFgJvNpd/vUHB6GjaSOv5UgJ/M5o3ZPaqpycDJ+ooyV/iJoAtZoyf7tVxKfSnCU0ATbyOMfrTS9M8w+xoLZoAf5v+zmjzBnuKiPXpSHNAEvm+9Bf3qHJFN3/AI0ATl/ak8wVD5mPUUnmccigCbcD3FJ8pqLePpT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"path": "images/4pts_ADE_train_00017528.jpg"
} |
depth_point_102 | images/4pts_ADE_train_00005924.jpg | ADE_train_00005924.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 283 y = 208),Point B is located at (x = 98 y = 118),Point C is located at (x = 319 y = 197),Point D is located at (x = 75 y = 183).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_1><DEPTH_94><DEPTH_57><DEPTH_1><DEPTH_1><DEPTH_57><DEPTH_57><DEPTH_1><DEPTH_57><DEPTH_94><DEPTH_63><DEPTH_68><DEPTH_80><DEPTH_61><DEPTH_63><DEPTH_63><DEPTH_61><DEPTH_63><DEPTH_61><DEPTH_63><DEPTH_11><DEPTH_6><DEPTH_6><DEPTH_17><DEPTH_22><DEPTH_20><DEPTH_7><DEPTH_7><DEPTH_7><DEPTH_69><DEPTH_34><DEPTH_77><DEPTH_72><DEPTH_0><DEPTH_33><DEPTH_46><DEPTH_57><DEPTH_85><DEPTH_38><DEPTH_56><DEPTH_35><DEPTH_4><DEPTH_40><DEPTH_72><DEPTH_15><DEPTH_36><DEPTH_74><DEPTH_2><DEPTH_77><DEPTH_75><DEPTH_65><DEPTH_65><DEPTH_71><DEPTH_60><DEPTH_74><DEPTH_76><DEPTH_36><DEPTH_75><DEPTH_4><DEPTH_50><DEPTH_42><DEPTH_119><DEPTH_37><DEPTH_43><DEPTH_44><DEPTH_76><DEPTH_11><DEPTH_7><DEPTH_119><DEPTH_65><DEPTH_57><DEPTH_42><DEPTH_8><DEPTH_76><DEPTH_61><DEPTH_45><DEPTH_78><DEPTH_2><DEPTH_65><DEPTH_121><DEPTH_39><DEPTH_1><DEPTH_12><DEPTH_58><DEPTH_15><DEPTH_25><DEPTH_83><DEPTH_94><DEPTH_121><DEPTH_57><DEPTH_38><DEPTH_78><DEPTH_2><DEPTH_62><DEPTH_78><DEPTH_61><DEPTH_40><DEPTH_1><DEPTH_33><DEPTH_44><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 4 | [
"B",
"D",
"C",
"A"
] | <DEPTH_START><DEPTH_1><DEPTH_94><DEPTH_57><DEPTH_1><DEPTH_1><DEPTH_57><DEPTH_57><DEPTH_1><DEPTH_57><DEPTH_94><DEPTH_63><DEPTH_68><DEPTH_80><DEPTH_61><DEPTH_63><DEPTH_63><DEPTH_61><DEPTH_63><DEPTH_61><DEPTH_63><DEPTH_11><DEPTH_6><DEPTH_6><DEPTH_17><DEPTH_22><DEPTH_20><DEPTH_7><DEPTH_7><DEPTH_7><DEPTH_69><DEPTH_34><DEPTH_77><DEPTH_72><DEPTH_0><DEPTH_33><DEPTH_46><DEPTH_57><DEPTH_85><DEPTH_38><DEPTH_56><DEPTH_35><DEPTH_4><DEPTH_40><DEPTH_72><DEPTH_15><DEPTH_36><DEPTH_74><DEPTH_2><DEPTH_77><DEPTH_75><DEPTH_65><DEPTH_65><DEPTH_71><DEPTH_60><DEPTH_74><DEPTH_76><DEPTH_36><DEPTH_75><DEPTH_4><DEPTH_50><DEPTH_42><DEPTH_119><DEPTH_37><DEPTH_43><DEPTH_44><DEPTH_76><DEPTH_11><DEPTH_7><DEPTH_119><DEPTH_65><DEPTH_57><DEPTH_42><DEPTH_8><DEPTH_76><DEPTH_61><DEPTH_45><DEPTH_78><DEPTH_2><DEPTH_65><DEPTH_121><DEPTH_39><DEPTH_1><DEPTH_12><DEPTH_58><DEPTH_15><DEPTH_25><DEPTH_83><DEPTH_94><DEPTH_121><DEPTH_57><DEPTH_38><DEPTH_78><DEPTH_2><DEPTH_62><DEPTH_78><DEPTH_61><DEPTH_40><DEPTH_1><DEPTH_33><DEPTH_44><DEPTH_END> | 283 | 208 | 98 | 118 | 319 | 197 | 75 | 183 | null | null | 235 | 78 | 201 | 150 | null | {
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",
"path": "images/4pts_ADE_train_00005924.jpg"
} |
depth_point_103 | images/5pts_ADE_train_00008597.jpg | ADE_train_00008597.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 34 y = 221),Point B is located at (x = 53 y = 202),Point C is located at (x = 92 y = 154),Point D is located at (x = 212 y = 205),Point E is located at (x = 262 y = 220).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_17><DEPTH_67><DEPTH_35><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_75><DEPTH_30><DEPTH_50><DEPTH_84><DEPTH_17><DEPTH_22><DEPTH_67><DEPTH_17><DEPTH_67><DEPTH_67><DEPTH_74><DEPTH_26><DEPTH_50><DEPTH_84><DEPTH_68><DEPTH_63><DEPTH_26><DEPTH_67><DEPTH_6><DEPTH_5><DEPTH_71><DEPTH_52><DEPTH_78><DEPTH_2><DEPTH_41><DEPTH_9><DEPTH_57><DEPTH_53><DEPTH_76><DEPTH_49><DEPTH_69><DEPTH_50><DEPTH_64><DEPTH_76><DEPTH_44><DEPTH_44><DEPTH_45><DEPTH_2><DEPTH_41><DEPTH_50><DEPTH_40><DEPTH_77><DEPTH_31><DEPTH_31><DEPTH_31><DEPTH_31><DEPTH_31><DEPTH_69><DEPTH_60><DEPTH_40><DEPTH_14><DEPTH_14><DEPTH_1><DEPTH_1><DEPTH_14><DEPTH_14><DEPTH_39><DEPTH_39><DEPTH_39><DEPTH_39><DEPTH_END><DEPTH_END>. Since point D has a higher pixel value on the depth map, the answer is that point D is closer to the camera. | D | long | 5 | [
"C",
"A",
"B",
"E",
"D"
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"path": "images/5pts_ADE_train_00008597.jpg"
} |
depth_point_104 | images/3pts_ADE_train_00016371.jpg | ADE_train_00016371.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 216 y = 125),Point B is located at (x = 229 y = 186),Point C is located at (x = 27 y = 216).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_67><DEPTH_6><DEPTH_80><DEPTH_23><DEPTH_1><DEPTH_46><DEPTH_17><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_53><DEPTH_1><DEPTH_66><DEPTH_33><DEPTH_6><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_3><DEPTH_17><DEPTH_80><DEPTH_1><DEPTH_2><DEPTH_32><DEPTH_17><DEPTH_70><DEPTH_5><DEPTH_56><DEPTH_6><DEPTH_5><DEPTH_85><DEPTH_57><DEPTH_2><DEPTH_1><DEPTH_17><DEPTH_67><DEPTH_5><DEPTH_55><DEPTH_75><DEPTH_6><DEPTH_80><DEPTH_1><DEPTH_2><DEPTH_1><DEPTH_17><DEPTH_67><DEPTH_67><DEPTH_1><DEPTH_50><DEPTH_6><DEPTH_34><DEPTH_57><DEPTH_2><DEPTH_1><DEPTH_6><DEPTH_5><DEPTH_6><DEPTH_41><DEPTH_98><DEPTH_6><DEPTH_34><DEPTH_23><DEPTH_2><DEPTH_1><DEPTH_6><DEPTH_85><DEPTH_41><DEPTH_94><DEPTH_18><DEPTH_4><DEPTH_62><DEPTH_23><DEPTH_19><DEPTH_1><DEPTH_12><DEPTH_55><DEPTH_98><DEPTH_94><DEPTH_9><DEPTH_33><DEPTH_41><DEPTH_81><DEPTH_19><DEPTH_44><DEPTH_66><DEPTH_66><DEPTH_41><DEPTH_57><DEPTH_1><DEPTH_57><DEPTH_16><DEPTH_45><DEPTH_0><DEPTH_94><DEPTH_1><DEPTH_94><DEPTH_42><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"B",
"A",
"C"
] | <DEPTH_START><DEPTH_17><DEPTH_67><DEPTH_6><DEPTH_80><DEPTH_23><DEPTH_1><DEPTH_46><DEPTH_17><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_53><DEPTH_1><DEPTH_66><DEPTH_33><DEPTH_6><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_3><DEPTH_17><DEPTH_80><DEPTH_1><DEPTH_2><DEPTH_32><DEPTH_17><DEPTH_70><DEPTH_5><DEPTH_56><DEPTH_6><DEPTH_5><DEPTH_85><DEPTH_57><DEPTH_2><DEPTH_1><DEPTH_17><DEPTH_67><DEPTH_5><DEPTH_55><DEPTH_75><DEPTH_6><DEPTH_80><DEPTH_1><DEPTH_2><DEPTH_1><DEPTH_17><DEPTH_67><DEPTH_67><DEPTH_1><DEPTH_50><DEPTH_6><DEPTH_34><DEPTH_57><DEPTH_2><DEPTH_1><DEPTH_6><DEPTH_5><DEPTH_6><DEPTH_41><DEPTH_98><DEPTH_6><DEPTH_34><DEPTH_23><DEPTH_2><DEPTH_1><DEPTH_6><DEPTH_85><DEPTH_41><DEPTH_94><DEPTH_18><DEPTH_4><DEPTH_62><DEPTH_23><DEPTH_19><DEPTH_1><DEPTH_12><DEPTH_55><DEPTH_98><DEPTH_94><DEPTH_9><DEPTH_33><DEPTH_41><DEPTH_81><DEPTH_19><DEPTH_44><DEPTH_66><DEPTH_66><DEPTH_41><DEPTH_57><DEPTH_1><DEPTH_57><DEPTH_16><DEPTH_45><DEPTH_0><DEPTH_94><DEPTH_1><DEPTH_94><DEPTH_42><DEPTH_END> | 216 | 125 | 229 | 186 | 27 | 216 | null | null | null | null | 135 | 22 | 176 | null | null | {
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"path": "images/3pts_ADE_train_00016371.jpg"
} |
depth_point_105 | images/4pts_ADE_train_00009694.jpg | ADE_train_00009694.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 187 y = 135),Point B is located at (x = 294 y = 211),Point C is located at (x = 30 y = 220),Point D is located at (x = 44 y = 178).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_67><DEPTH_17><DEPTH_6><DEPTH_17><DEPTH_6><DEPTH_5><DEPTH_70><DEPTH_67><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_31><DEPTH_76><DEPTH_16><DEPTH_63><DEPTH_5><DEPTH_6><DEPTH_6><DEPTH_67><DEPTH_67><DEPTH_6><DEPTH_98><DEPTH_42><DEPTH_41><DEPTH_94><DEPTH_121><DEPTH_14><DEPTH_77><DEPTH_17><DEPTH_17><DEPTH_80><DEPTH_1><DEPTH_25><DEPTH_19><DEPTH_44><DEPTH_44><DEPTH_14><DEPTH_17><DEPTH_5><DEPTH_6><DEPTH_22><DEPTH_94><DEPTH_41><DEPTH_2><DEPTH_2><DEPTH_78><DEPTH_14><DEPTH_7><DEPTH_17><DEPTH_34><DEPTH_82><DEPTH_32><DEPTH_1><DEPTH_32><DEPTH_0><DEPTH_41><DEPTH_55><DEPTH_59><DEPTH_49><DEPTH_45><DEPTH_81><DEPTH_41><DEPTH_41><DEPTH_19><DEPTH_45><DEPTH_45><DEPTH_63><DEPTH_18><DEPTH_73><DEPTH_29><DEPTH_49><DEPTH_0><DEPTH_41><DEPTH_19><DEPTH_58><DEPTH_58><DEPTH_58><DEPTH_72><DEPTH_81><DEPTH_19><DEPTH_58><DEPTH_44><DEPTH_64><DEPTH_64><DEPTH_23><DEPTH_23><DEPTH_33><DEPTH_0><DEPTH_81><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_94><DEPTH_57><DEPTH_94><DEPTH_14><DEPTH_14><DEPTH_14><DEPTH_55><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 4 | [
"D",
"C",
"B",
"A"
] | <DEPTH_START><DEPTH_17><DEPTH_67><DEPTH_17><DEPTH_6><DEPTH_17><DEPTH_6><DEPTH_5><DEPTH_70><DEPTH_67><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_31><DEPTH_76><DEPTH_16><DEPTH_63><DEPTH_5><DEPTH_6><DEPTH_6><DEPTH_67><DEPTH_67><DEPTH_6><DEPTH_98><DEPTH_42><DEPTH_41><DEPTH_94><DEPTH_121><DEPTH_14><DEPTH_77><DEPTH_17><DEPTH_17><DEPTH_80><DEPTH_1><DEPTH_25><DEPTH_19><DEPTH_44><DEPTH_44><DEPTH_14><DEPTH_17><DEPTH_5><DEPTH_6><DEPTH_22><DEPTH_94><DEPTH_41><DEPTH_2><DEPTH_2><DEPTH_78><DEPTH_14><DEPTH_7><DEPTH_17><DEPTH_34><DEPTH_82><DEPTH_32><DEPTH_1><DEPTH_32><DEPTH_0><DEPTH_41><DEPTH_55><DEPTH_59><DEPTH_49><DEPTH_45><DEPTH_81><DEPTH_41><DEPTH_41><DEPTH_19><DEPTH_45><DEPTH_45><DEPTH_63><DEPTH_18><DEPTH_73><DEPTH_29><DEPTH_49><DEPTH_0><DEPTH_41><DEPTH_19><DEPTH_58><DEPTH_58><DEPTH_58><DEPTH_72><DEPTH_81><DEPTH_19><DEPTH_58><DEPTH_44><DEPTH_64><DEPTH_64><DEPTH_23><DEPTH_23><DEPTH_33><DEPTH_0><DEPTH_81><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_94><DEPTH_57><DEPTH_94><DEPTH_14><DEPTH_14><DEPTH_14><DEPTH_55><DEPTH_END> | 187 | 135 | 294 | 211 | 30 | 220 | 44 | 178 | null | null | 134 | 113 | 93 | 16 | null | {
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3SRXO7XOyF7anU7ANB0UFQf3Tkcf9NDVUwRNjdEpOO9X8A6FofvAx6/8ATQ1XVc/r/Su6HwnBN+8XJ0C+F9M28D7RN9cVn+Wp6xrzkfyrYuI/+KX0wY/5bzVSMQ4/H+lNaktl4yTW3hexMEzR755VYjqQC1UDeXpOPtQx2zGD+ZzWhcr/AMUtpwx/y8zfzaqUdsZFY7sY7UuVCbZS1qNbq20m6kjiE7+erOq7dwUiskk4QEMQoUKFb7vtW7q8e3TtEQEjDXPJOOciscKEIVcFjgswZa5Km53UX7pDLGXJJA3EEABRj+fWkSLY/KAE8McYzUrKArEIFXBJfZ1/Kua1Pxnp2j6pLZzx3kjx7SSqjHKgjGWB71CTeiNZSS1Z0JRucPlQASdxyeenStJtAgaOIy3sSPKgcRnOVB9eK5/RNYt9d06S7tBOqpJ5e2UgHcADngnjkV6ELZJre3dkVmNsnPB7GtqUOZ2Zz1Z2V0csfCT3TeXbT28p7APg1Sm8KTJKw8yE4JBBbkEcVvWMcbarYttjDfa4cELjHzip7vCahcjaMrO4PHX5jWnsUZe2ZyLeFbwcJEJGPQIc5qpN4Zu0DZtX3D/Zr0LSxtnujGzIVtyQw6g56j0qETXG0f6VMQefmIP/ANel7LsHte55tJo/lMBJCVYjgHgmoX0xGUNGhVj0Fd34jL3NnpUkiK0wuZ4g6rg7Qgx0+tYPkElfmXPTBJ4OO9YyTizeKUlc0YfD0QgR4pyjlQfkfvjpXZeFfCl5eW/myavcx2qOUAich2xjPPYe/tXGeH1Q6ykdwyiMhjtLcZA9a9k8MrFHpGyEqY1kYKV9P/11pDU56mhp2dnFY24ghLlR/E7ZY/U1Z70wGlzVsyHZpC1ITTc0WAUtSZpOtGKdgAmjNGKTFAFiiiipAKKKKACiiigBD0rm/GeoPZaG8UXM9ywjQemTXRt0rzvxXd/b/EYgDEw2a88/xkf4UDjqzl53UNa2kRLbzsU+wH9a6zSbLyI1XHJ5J9656wh+163b3DD5It+38P8A9f612dvHtUYPPPP1pLU1lsZlwt1Je3jWrRx4kRGlcZCYXP8AWs/VdM1DUtPMH223UlgRJgr0z71qyicSah9liV3N0vyltoHy1nX+pXWlwCa7swULhcxyZ6jNEgicrfaVcaY0EckqM0oJVw3XHX+dUUWUsfIQ7gRuKEH+lams6pDq4t5ESWLYpBBwc8D39jWPJaMk21lOSQBhBn+dc73OyHwnWlCdG0TklhbnOf8AfNRogXPsP8Kt28Z/sXRlbORbdCMY+ZqaIvbqP6Cu6Hwnnz+ItXCEeHNNH/TaU1nlGz+J/pWzLGX0KwU/wyy1WFvjGR3P9KaJFmT/AIpzTge1xMf1aobSIlZ+P4h/KtGWLOiWQPaeb+ZpbOIBJuB94ULYGc/r/wAum6UOf9ZcdvcVziEMoA38gAfJmuo8SIPs2mrwWEtxtyM9xXObFTK+WpkCrldn3cnrxXHU3O2j8IOr87k5GQCEOPyzXIfaLDRvFWs6tqbzRW0rwWOIYRIXR0VpRgsuBsXaTk8SdDXWSN5YOB5n3gWGeK43WfBZ1nVp79tRMZl2/KYd2MKB13D0pQaT1FVTlGyNDwVZzaRaarYOy+dbX8kLnsdoUZH5V61b82do3raJz7815h4a0YeHtPe2a5eZZJDIG2BMHAHTJ/u16ha/vLSzZjybZc/rW9B3m7GNVWppM56zP/ExsT6XcP8A6MWreojGr3w9LmT/ANCNVrFQdRtM8AXEZ/J1q7qa/wDE6vxj/l5k/wDQjXR1MSTR1zNej/p1b+tVQPkH4Ve0QZvLsdvszf1qBEGAMUk9Qexma3tGmaZu4H9oSjPp+7HNYz4WN/KcBxgFtwPmfhit/XsRaXYMcgLqT9PeGucRRv8AmU7y2VOeAK5Kr947KXwnf2sunSWUAd7c4RQwwNwOK6/w6UGnOkezakpA2dB0rybQyg1mF5VYIFKkyfdPHevVvDhh/s1ltyhhSQhdgwOeTVwMKu5s0ZppOKA2asyHZozSZoyKAHA0hNGQaMimAZpN1NLUm4UAW6KKKgAooooAKKKKAKuo3BtNOnuFRnaNCyqoySe1eQtPM5csf9ImYllP3lJ9foK9nNc1rmi2KpFcRWyJOZtxcdT60FQdmc9ptmtu9omP+Wbn6nit1VwOD9Kq7ALyEY6Rv/MVcU4AHrxTRbZjTXP2e7um8iSUvcthEGT90VieI5JrrTo1tbCcukqttaMkFcMCePrW7JdwWVteSTFtpu2RcDJPAqv/AGtYpjfdmInjL8ds1MlcqLscC8MkKDzofLYKQqsjKW/z/WojIXbkksME/MQa3fFVxHftZvbTxyhFfeyv0JxWDbNEb+3hmcwxyOFebcMKMdTxWFrHVF6XO7tllfRdHcRu/wDovJUFhnc3enKjAcpIDz1Q+gq/pV/bWNhDaW2owyxxLtU+av8AhWkuqO4yJFf/AHWU/wBK6oz0OKUXe5TithPpNmhfbhpDkjHehtPYHiVT9Afb/Cr/ANqaUASWxlAHGGApWaEjmynH+64/wp86JsZk6FNJtFJAInl6j3NFrjbJgg8g8VpbrVUWJrRmjRmZRJnIJ60i/YlHFmAD6Zppiscd4qA+z6buKgGa4G4547/w81zTMwBWORVwAPMDMC2K6/xXaTXZsRYWMsiwu7MI25O4Y7j1ri2LxsYWWVSuVdCwJBB+lctTc7aO1hv2xoFkDsxQBt2O5qt9suAiXE8UYtW25CsC6g9/f6VdGZEKSKzyNkKMDGD68VRbT3j8uKWeUxKQfLaLsPU9/pXPNT+yeng5YaKftrbre+3VK2z83p+N7bBE3BnJJGCcDAFd/py50yxI5/0defbmvPigkTKPlSMYK45r0vQbdZdD0+QXMagQhCGGMYJrroaSueRidY6HNQR4uoeOk6c+nzitLU4CdZvj/wBPD/zq9/wjzh0Zb61OHViC+OjA/wBKkvrO5fULqVbaUxtKWD7eCCa6b6nKU9Ii2Xk3vbP+maijUbc46CtHToJTfsvkupaB1G5ccnOKZ/ZeoInNnL6ZC0roOhzviYAaVZk9BqRz+MWK5li+GAkDAjp6ius8URPDo8BnieMnUV2hhjP7uuVJXeG27GUAZJ4FctX4jso6wsegWF1YNYW6NLasRGBtZVz0966jQWQ2coiEflCTClAAOntXk2jJGNYtpZcHHBc9DkHt+VeqeHZInspfJkR0D/wdAcc1pTMKqszaJpM03cKNw9a1SMR2aM0wsKN4p2AkBxSFqZvpN1FgH0mKbvFHmCiwGhRSZozWQxaKTNGaAFopM188/HCxsLvx3cXWoJcyRWHh2K4WO3mWMsxvPKwWKtxiQnp2FAH0OazdYx9miz/f/pXgvwM0+3sviI1xZtKbS+0F7mJZSC6D7QkbKxAAOGjbnAyMHA6V71q3MEfIHzdT9KBrcwXH+mx/9c2/mKsJ94etUHuJv7fgtlt2FubZ3eY9Cd4wo+nOa0EJ3DnByKZZmPcRWpJaRY1aUk7u5rnPF08VzptqBOr7bgFimOm01vSQRTwGSeNHeO4cIXUECofs9qyYaxt2GB/yzGM1Ey4uzPOF+WDeqv5eznIB/rVae3Eo2lSUfoGXtXTeJY4be9hWGFY1MRyqrgNyPSsiJLlgWjhZ9hyxCkhfSsbO50qSsYf9lWWCTGuc9StT/wBixJFvTggZCg4rdlWysI/tNxKsxfjy2QjB6nH4fzpljot14jvxNp1pJBbls/aZMhAvoAeprWNN7mEpq5htZrAebiWN26KsuMVKsV4o+S+v1XGcCY16zZeBdHt7M28ls0zyfeeTlicevauS1zw3eaDL5tvvlsunmDrH7Gm4MXtF1RzEUusRgCPWtQTuMTmnrqfiQcJr18c9NxzTW1CO2cpIcFuQ23OTSf2lbyg5ZkI9eh/Gn7PzD2kexZTX/FaOrJrczAY4ZQc8j39aUpJPISx3s2WL7cEkmoTcWocASgr1ztPFXIdUs4ImMkgZjgLIuOB/jQ6TKjVSDaIwVABwR95eelRGKQx53BgGBwx5xmrsWq6UGBaVsZ+bcRyfWpzqeiMOCmQSOD2pKkyvbIyw8scZKqhKt5ijcev5VsR/EudRtfQHAHTyrjgfhiq63Wjyt8zoDghvm+99KaiaJNISyOB6h6fs5LYiVSLNFPiRbscy6He474cH+tW0+KFj8u621WP0UAED9aw9mjuB++dRjGR3qGS204O3zS4zwaOWRPunTP8AE3SZEKzNqe1jzmEcfrTk+I3hsH5r24Q/9NLc4H61yZsrQugjuXwwAw1INNt3J33SLzjnnPvRaYWgzp9S8U+Eteiiiu9cwscgkXCMOQMelc5ffYo7mRbCR57cEFJwT84PXiozotnswt5HlRx8vvWnDocklpuiv7bYMYJIUA1LjJ7ouDitmdPpOqWKafbwvdIXVBlCvI4rp9Elilgm8h1aMMPujAzivMNMie21+3Lrvjjn/eTbcptwR1r07SJ4p4ZTA6tGG/gXAzV09zOsaZUmjbjqaQH3owfWtjAQ4FISKUr6mk2CgBN1IXxTjGDShABT0Aj35o3GnFQDSYpAamaM1HmlzWQDt1G6mUhbrx0HJpgSbq8H+Mtnr8njjztM8M3GsWd1osdpPttZ5Ixi4aXG6IghgUQ9eh6c17TqGqWWk2putQuUt4Mhd7Hgk9MVmSeM/Dkd+lk+s2omcZzv+RcZyC/3VPHQkH8xUylGO7saUqNWq2qcW7dlc8k+C+neIoviFdXusaFe6barpLW0CyWkkMUYEkZCKXHsx5JJ5Jzya9v1M5gT6/0qwp6dckZqrqB/dR/U/wAqZC3Mls7/AMKVfvA57012+akQguAfWg0Mma3iuofKniMiLK7gZIwc47VzHii0itILY2yvEzOwOyQjIAHXJ7V0l1atcxI/2qe3AdwRF/Fz35rIvdIhuYQl1e3bKpJUtzjj61Ey4uzOdtdPlvrbzjfxhY84Vny3QHiifU1hvFsdLsXuL2cAuiZ246c+9ZiWWrajq7aLpgeKwE6LLcEYfB4O2vZNF8NaZ4dtjBYQKufvyvy7n1Jq47E1JanJ6P4Elu5kvdflDkcpbJ91R713ipDaRLGiKq8AIowMeuKVpwJBGoy4J3e3HXNPiRU5Y+Y/98jnrTM7jDAZCC74dT8rDgD60mROWt5kUSBfmXsw7YqyMEcsPxpskcco2tt3dVbHINDC55/4o8CCVXutMTcDy1v6H/Z968uurW4smKNK6qM53qPlPoa+jRPiTyZ2AkwTvxgNz/8AXrn/ABR4RtdctnZdkN2R8shXIPsw9KBpng+JFYH7QuSemKdGLjblJY93UhlrqZvh7LKP3d3p0c/8cckp4/HFRP8ADfUz/q30+QADG25P+FO4zmAsxyW8tsn0pNkpGSiA+gro2+HWuYIW2iP+7cimH4e+IlHFg5PtOv8AjRcRgRrI2QY0GOnzdKlMkxUJ5Y+Xphutax8BeI9m4afdj1IlXP8AOoz4K8SgfLZ3w47Ff8aadwsZIklwQYmGO2+lWaUqSY5F9fm5rQbwp4mjGDZX4Puin/2ao28PeI4gQ1leAjr+4B/rTAqi8ZlAKzYXoM0ovpFIbbPleM47VI2la2gJeC5HsbY1ELPVVOTFKOO9s1FxMeNWlXDBpVxzkp1HpUn9sSI2XeUeuEOGqubbUQASHCnsbdufpxTlF+oUeav4wt/hQBs6F4sbTLzD/aJrWYhZozH0B43D0I/xr2fQZY5lnMUqyRjbyg4z7fhivAguo5UrcwEZGQYzXqXwz1dmsZdJvLsyXcbs8KngGPj5R9P60ktbgz0LOKN5qLd+nB+tJvq7Ek280bqh30obNFgJgSR1pefWod+KUPwTxx+tTYCQDkZzycUpGAKqXuo2+n2r3E7bUXOT6e+PSqWmeIrLUF8pZw06/K2OjNgnC+o4pXtoB0uaX8ajzUdxPDbQPPPKkUMaku7nAA96mwXJywB9/T1rA1rxVY6RN9iiZrzVSv7uzgG5ie27H3R7nFc/qXi281lWXw7cw22mxgm61m4XCIM4xHngn35rz2/8Wx2MlxaeFd3mSMTc6zON0tw3fZ6Ck2kXCFzb1/Wba1n+0eMJjqmoE/u9GsmAjtVP94jgtj1OaxdJ1rULXw9qunWlh/a2i3CSfvRB80J5CudoO1sqrbX5G0YPSuVjh+8zAszHLu55Zj6nvVrT7/UNC1D7bptwYJgP3i7cxyD+6w7/AM6wmlPqelhq7w6fu31T67q9trd9j6N8P3lreaFZNaakuoxpEkbXIOTIwGCTySCT1B5qXUziOP6n+VeS+Htde6aa58MtDpmtswe60acfuLsgctH3BP1rvbHxHaa/abYxJBeWx23NnKMPCSPT0z0NbLbQ8+Sk5Nse7ck0qffA468E0wn5vxpqTxC6igZgJJMsin+7TQGXMZ5rZEt50jdZXLtIhIIz2x71zHiDV9T0poo3kt5RKG+4hGAMc/rXQSXFxDZRtFbiVWklB3Ptx8xrlfEVnfawYWEEUOxSpzMDknGO3tUSKiafgu9S6jmu59kTidUYscAHHBrrbzxrokN1cQvdSBIW2TuIywz7YHP4V4bd6bcW90lpcMwywcqk3BOcf0rW8b2aWVtZRReYhaaQlVb7wAAFJS0G4XPW4/HXhdFCrqMuB62zkn8cU4+P/CysqvqpQsON9u4/pXzcFlBwZZs/79I3mD77OwAyATk9ulPnYvZn0pH498KysVTWAxHXbE3H6VN/wmnhrB/4mqcesTD+lfNIaRGLRM8Ybrxj86kE9ypP7+bA9QDRzh7M+kX8XeGZF2nVYCD/AHkOR9OKSLxXockyWn9r28nmHCMerZONp96+b2vLwHi4k/75H+FN+2X2c/aX6jB2Dj9KOcXsz6UuPDVjcSuWtYnd2IJX26iox4YsAgIthtIGMMce3/1q+eLfX9ftYJILfWLtIZOWVX6/ieRU9r4p8TWcu+31u7jbYsZyQQFX7o5B6U+ZByM+gD4WtAD+5Zfoxpp8KwYyI5vwds14DF4u8S2ksckOt3QKbgMkNkNye3PNTjxn4sabzjr1z5nmiboMb9uB26Y4o5kHKz3RfC6A7le5+buJGI4/GpP+EeyPlubz8JGNeEy+MfFlzK0j67dB32jaigAbWyAOP/19KuXHjTxfcuzSa5cL8hjPlIAAp53dOuRT50HIz2hvD05Q7dRvYx3IkJxS/wBjagMgatfj13Oe1eNy+PPGcvlBtXKeUhRdkYAfIxlvfHT3pW+IPjUw26f2qqtDj5hDhpcDA3Z6++Mc0c6DkZ7H/ZmqLkDVr3I7Fs/zpG07V8f8hebPPLKDXkUfxE8aR28Ef9pKwiIYyvDy/s/r+GKcnxJ8aCCKE38LFHXM3kfNIASdp5xg5wcdsUc6DkZ6v/ZutEIo1YnBBO+FSP5UHTdUJybm3bd/ftkx/KvKh8TPGf2dYftVqfm3GUw/MVznB56dvpTH+LvjEbod9hmNg5k8khiM8r1xjt0oUkyXBo9UfTNQC52aee+XtE/wpkVpc2c0LX01hbkuUheK2UMW9AcccZyfauW0Dxv4ouLOOTUXgByrhlgJeQZztIzwMHGfQVN4t8V3lrpVqILpDcvMeZI/nYbW5HYdQD7CnzWFY6m38X6O90LQ3ke4Jlpy42txng1ei1vS55Ejgug++PzAxUgFeMkZ+or5tS6cPsZicEgr0AzXR2PiQwx2ww0rQlREGOFA7/y6d6ftBNHvcbJLGskTb0bow6Ht/SnlSOxrz/4hi6PhfwxZ6Pqt1px1LWLa3FzbuysFlV8khSCeSDtz1FcB8P8AWNQk8c+HpX8W6tf6fdvdRyQX0joQY4SQSnmOCpLDBz1U+lXza2Foe/Hjrx9ay9b1yDRLQyTRyMW+WMgfLuOQOa2Ekt2/1dwjN7EV5B8TNYu5NXXS85ht23wgfKWJOOfX2/GiUrK4IzNd8WalrCi1vHDQxSERlPvY6YbHXPH5VmWF3faVJ5lnK8UitkbckAnjIzx3PSs9bgxssjLtXPfuaW51a5U7l2xhSoww45rkc3J3GfSmr65ZaJAr3Tu8snEMEK7pJDxwP/r4rzfxHqztH9r8XXOy2f5rXQbVstKM5Uy/1rsbqRm1Xz18jzGi2BtwO3n+E/w8V4/4vg8vxbfSyI+WKkSSAncMdAT2raTaKhFMp654hv8AxFIi3C/ZrCE/6PYQn93GB0J9TWFqMd862tvphWOeaYLlsbQu1iSSeAABknsAa0VSR/mWFmXrlV71R1K+/sg211c20zW7O8EqgbSY5IpI32k/xbXOPes077m8rKLsYzXWqW11p7f2ta31ndT+V5lumASCu5SHRWBwynp34NdPtXp+Arhk/soalpcGmfapmFyDJPPGI2fLLtUIrMABg85ySx9BXeeTKOkEv4oaJomlJ21Ks0OXVwzJJGco6cMp7EV6j4C1681iK+GopG93bLGhvAPmuEPTd7j1rzZ4Z8f6qQEHOQpruPhqMHVwRtP7rjGD0NKDZpO1js2nc6m9sMbEt1k6d9xH8hTGUt4jsuchbeUsT7soxS4zqc7Dr5SA/TmnIf8AiaqT2h/rWyMGZ1xL5Om24S3lkDSykCMdMMetc7qGp29oP9IjlhJ+ZSy9f85rpTexWsMfm3Hk7gxHPB+Y1wvjLUIZmt3SX7RGkbFyM8cjiomOJkarPFc67avGwMQ8tmbHXDZxV3xvfW+o6tGlu+6OJWxxgZLdBXOS3EQYzqzKcgIp6dyf8+9Sfa5NRk8yRVygy2OOpz0FZ7FRepkvP5UjL5YbBOCT70faQw5iT65Of5VN9nM1zMA4QKSxJ9OelXEsYQG2KSfKZizNjoRg/rVW0KcrOxQEwJAMQ/EmpIStwzhOigcr+NW7nTliR3gkZVUZ2Sf0NU9MHFwflX2/Ok1YE7krRYGcDGeoqugE0rEHCgYH1q5O6Rgs2MHAwKgt4Z1sZZvLBijfaWz3PQn2pBKSTE8hc5HAHc08QjqCGx121aljglsgsU377diVGHCDsQe+aS0tHt9+7bhv7pzjFIa1IE08XDsXkaOKNTKxC546VYjtdIHzNf3WBz8tqPQ+/tWjpsYaW4+X5fKyR7b1rX8uN45Qg29R+jVrCN0Yzk4spaF4c07WbxrS3vrpZo4/MYy246Zx/e966CfwXpNpOIptaZHA5UQev41Z8IwAeJp+P+WDD/x5aseIPM/4SyRd37oRqSMexq/Zon2jM2PwZpM9xFBFrp3y4WNZIOWOO3PWq0nhCyQPv1Sc7SQT9nXgk9/m9av2TG68ZaHKw/dx3KqimqM0bLdXg3Nh5n3c9cPxR7NB7Rktv4JtpZzCupTR5VjukgAG0de9M/4RDSHUY8QLt6AiE4GeuDXTabfxalqU6IjIyWcpO7oflPSsewv4E0tYHhwwQDpwelHs0HtGZ8/gmyh0q41OPXFltbdd0jiInb3/AK1w+p6ekF5OsUyTxPAskcqrjepHX2r1DRoy3w68SqxyN7jHsI1rz/WYyYLPHH/EtTcM4zy1ROKRcZXPQNNu7SystPSe5VJpLOFgjZyflrN8e6laLo9kpcu32sNhkIONrAnJ+tV760maXRp4bWSRV0+2JkVScY+ldhqv2HWLRYJ7Nb0JIHCXCsgBx1B4/KluJo8NuJ7XzQ0EmFUgKSeW9aWOdZXBi8t2RGZlzgAD+L8M5r2FNKsYh+78PaQp7ZjDEfnUgs/JXbHp2kR/7tnGc/8AjtCJ5WcR4w8Vix0jwpc3Qur2+tL221AGX92rRrvOwHnBJwM46AfSuc8N+OFn8YeH3vIL+8tNPa5YLeXf2iZjJFgjeVXCgqCBjgluea7LxZNO+qW5upEOLcKu1Qu0BjwKo2e1oA3JbnqBt/Wh1FexqsO7KT2OzfxppFzazTW1jcW9xHt2wXEgAcE4JGDXnN/PcXeoTXUwLOz5XJ3EAdMH0xRr6pmACMeY4OAenB9fxNZUTSwy489VGSoXPPHFKU3JGEo2di2L1AoMzbm79uaou4kvt0gd2zgHPBp4uYyzOLYPIow7MeCfb3qMvHLcQ7E8nDA8/Ws4rWyEmeyf2ZZldpiOPQO3+Ncp4wgitbjTxFuUOrgjdnofeuyyfWuK8dMRdaaP9hyfzrZ6o3jozc8J2yTaBbyEDLFic49TWtd6LYX0QivLWC5jVgwSWNXUH1wR7ms/wif+KbsyAucHr9TVe/Fnd+ILi21qZI7dIUa2iacpG/XLHB+8DkduOx61M58sUdGHw/1ibTbSSvorvdLRXV9++12X08KaFBKksWj6ekiMGR0towVI6EHHBq81og6r/KszQrz/AIlStcXBeJ7l4rSaRizSrk43d89RyB0rYYt328ccVcGpxUu5jiKMqFWVJvZ2KzW0YBbav6VU8LfJreuoBgDyf5Grzkn+7j9aoeGD/wATzXif70I/8dNOyM02dArZvZiP+ea/1p8fOphs/wDLP+pqBTi8mz/cUVLGSL4Y5/djp9aa3Aoz7U02DeFDb3xuxnqfWub1MRTWktuSmyRSGxgE810c8UF5ZRLPbpKFDMN4yQckVwni6ygguoFhiEAeNidvH8VRN2Glc4a5DwXBtpDlY2IGR1Gau6bAvD5O7oOeop/2fdIXfDgHGTVuGFUaNVHGeuKycjSFPW5Rto/MurlXGTnt261aYSEOVhaQeUd+P4F3Dk/pVaAmO7uiOoat7SP+PfXvfSJc8/8ATRK1+yZy+NmdeOzWlwP4MdP5VlWHEc/Jzkf1q7cMFt5scDBG2qulpujn54GOfzpVCqZHcjzBhmzk8CodwZTCZMKRhlzw56jNaZg/eckgdjiljgAbc0fTJ6DNZ3KdO7uLaW6wxn597bRwe1W41XPOAfXNLGp2rtPPfIqRI8k5JwCdwxU3NYxsW9MXc91725JP/A1rShh/dufr/JqqaXH+8usDCi3P/oa1qxIRG+ff+T11UtjkrfEa/hVceIpD6wN/6EtSeIFx4lnPfyEP6Gk8MjHiF/8Arg381qXxAP8Aio5veBP5GtDJ7GVpYA8UaQ3f7Wn9P8aZdoBe3akZAmkH/j1P03jxLpGf+fyP+a0Xg/4mF5/18S/+hGkyb6Frw0o/t25GP+XKUfTg1lQr+4X8P6Vr+GBnxDOPWzl/kazIh+6A9v8AChBfQ2NCTPgTxKvq8n/oFefawMwacQuS2mA/kTXo+gLnwn4mXtuY/wDjhrz/AFdd1hpRVgD/AGafxG81FTY3pHdW+oWtppWlR3FyUc2EThVGeMVeWaN5GCeZtHTcuK5HVYme10Voon3HTIRuVSe54rspr+GeyCxyF2XBK7SOg96hMpjC5AIJyPelJ2nI/GqX2k7vNCkQ+Xu59fSpYGZlJY8nnHpRcVzifFodNfLXDBomiHk8dADyOnrk/iKraadtkA2fmdtq5wAPetTxizC7syuMbHzx/tVn6eh+zY6Zcg5OOa5fZ2m5f1qevLG+0oKlbt1091WVlbR93fX5sz9csbvUWt3twvlx5DZbocjp+BrEg0G8uoh5O8IznG77zN/+rFdmN21okkKFXDHdzkdeKjmz+8KSqjNgnHc4oc7Ox4tZ++cvoulPqN7Pa3FxDYNDFISZhkbl42AZHzH17elVpba6s71beaGWORGTdG6/MATXrNz4B0wOmuuzmW5CLcRF8RqGQK7D8s1zus6FYyG+1WdCbiWeSRUkbhFXoBjPJNa+9zaAo3R1u+uK8cPnUbBfSBs/99V1+eK4bxtIDq9p7W//ALNW0tjSO51/hYr/AMI3Y7lBGw8D61qTw21yoSe2jkQHIV1DDP41jeGW/wCKdsvmEbeWOWrXLEjG9Sf73ana61DmcZXi7MldYm4MQ4IYZPQikJGOFKnnJ3VFu5+aRW9wp4/Wm7uDmZG9BtxTJHSMuzpz61R8Muf7W17HQyxD/wAdqZ3BXAlU/SqXhhj/AGrruD1niAPp8lIpbHTj/j5lPqFqaDm+Hf5AOuKoQmZtQuNzg27IhSMjo3O4/wAqngu4Dqf2XcftGwsFx2FNMRSeDztNtpDJOkmXBEbYz8xrPudDsrwBrpbiYoCFzKeMn6+1auyWWzt445/IdAzNlN2ck1ga9qV9ozwxxzrKZgx+aIjHP1rOe+o15GFrOmwWV2YrdCIljVhufOCSf8KzSojIO8gbulXLq9uNQneedUL7QG2qegJ96gbA/wBWWJY9GXpWEnqdMNjGgA+2XRHc9Ku29+1hHfRiDzftdo1u2TjaCynI/KqMI/0u4Hfd1/OnSMAVA67a3+wYNXkJPgwyjngd+tM0Qbo7kgA4I49uaeypL8kjYUsAx2k8ZFWrWFF1bV4oU2otyVVQeABnipmx0iYxqTnHJPShYSBnjjParAygKfKuSM5Pfj+lJ0B559KyR0WFVCy/N90juvvTwxAGUw3TG3qBTcbhkegJ9qHbLKSxZuh/pQBf0wDzrsngm3PG3/aWttQNjnvg8f8AAXrntPnjjuJQ8iRk2xALHjIYE/oDTpPF2nmeRLdTLDgjd/tYbn9a66bsjjqq8zsvDeD4gbH/ADwf+a1Jr/8AyMp9GgQfoar+Crkalq73MEX7kQkCU9CWIA4/A/iK19ciV9X+dc/u1xj8a0WrMpKxzenj/io9J9ryP/0JaW+GNTvf+viX+ZrQgsIk1nTZUd0ZbqI7fX5lqnqA/wCJrqH/AF8y/wAzSe5HQn8Lf8jJJ/16TfyNZcPMf0H9K1vCwA8Tjjrby/yNZUQxDn0B/rQgWxveHAf+Ea8TD3P/AKA3+Fefalk2Gj4Gf+JeR/4+a9A8PypD4d8UySNtRcknGcDY1eYXur2sumWcQZ5pYYxEHQ4VQxJIJ79jkYrOb6G9Pa56lpOo2tjoWkR3N2kEjWMRVGPJGSP5ik1nUraWwkSKfdyGYEYyM84NcnqkedO8OnYSw05MMB6O1bHiS4+0IstvLHKsUeQowMtz/jWcm0UyrJqSXNuI9jR7Y1JlQ5A55rUsZopIGMPChuT655zXERKkqQxCSWOeOEyMD9zBIOPfOMV1OmS7BJGQFBVWQdx2x+GKzjK7J6mZ4uIE1i+P4XB/Ss22YmKWQRqIw+SQAVBPqa0/FTfvbPI3KRJuA644rnRfCFgm5xBtOCvQED070p3ua89kdPp+k3d7cNaQiJsEB5GkUrGWGFGc9yentVe5tL6KaORbNJI2yqGJDIMH1HOPUfWsWfVU8nfCzKsjggKcZIOMmujsLmC3sokSPLFMMxkPbp3qHZaswqNN3NCOS7u7cPeJ83lqnlGQjaoHGVzwcVxTL9m0K4C3VyTJeSksSRuAwNvPQAg11Au4Uc4tU5O45c5JqjPa2V2ArRlV+Y7QeOTmn7VISqpG/wCZjsPwNcP4zcHWYMjgW45H1q//AG1qIXInjX/tmv8AhXN63ezXuomS4cO6xhR2GK6ZO5rFWZ6B4dcJoVkWCsPKA+f6Vp+Z0bagGfwrltK8R6JaaTbQ3F/AJEjAKHJPQelWh4v8O5/5CUQH93Y2P5VS2E9zeaQHptA9FpHmBAxs4/ujGKwG8ZeHV6ahGPpEx/pUT+NfDw+7eD/gMDf4UwN95gU2gofXA5qn4WfOoa2eMfaUH/jgrEk8c6BkhZnzjjFuwP8AKrvg2/t7yfV5reXKtOjgEEHGzGeaQ0dgj7WJyeQBmrMEYN8s5GWCFd3fBqmh2sdw6dquWzASZJwO319KFuDK0v2xEiMEcUu5fm8xyuOfoax9Y0e+1qSN/NtYPLU8eYTnke1bF3O0Kwr5Es7sCD5Y+79azLvXbfT3Vbu1uIyy7gNo5GcVEwi7HKanpn9mXzWzzB3VFYlScEEniq7HcVwNo3dCauaxqUOp6j50CyCPYq4YYOQTVORmWZXkPBbkAisHHU6YvS7OfiOZ52zk7ucfWnuckewx+tRxqWnudo/j4/OpME54Odvp71rf3bGNnzXGSN+7YnBA+bn1Bq3otz9onv7iZctI4Zgq8ZOelUpUJhc44xzVjw8pMd2dmTleMnnrSnZjgmbcnl+YxcMq8YGKiVXD4X5vlJ5FSygN83ckAjnik2ESZUgrtIzzWSN7EZf5jkcDsO9Lk7W4HGc57/SnCMKvOcA8Y/nSNjHDAqAQMmqEc5rM7lhBl9rAj0rNEbKhRQVGcAA9q7Qx+GGgSPUzKtxjO4Kx6+mKjXSvBDj5dUuEPurVsnpY5KkW5XE8Eapq8GuWUFncFWaQBvM5BXODx/u17BqWkX9/ei5t3gEZjUfO+DkZ7V5v4ftvCOj6gLyDWEllH3fOk+5z2rsh4x0BThtXtzz1KsTVxmkRyPqXLfw3qUd/aXD3Fp5cMySOA5JIBUnHHXiobjwxqdxqF5KsDFJZ5GUkgcFj71Vbxx4dX/mKIxI7Qv8A4VG3xE0OMn/iYzNjjasEn+FNzQ/ZmtpHh2907W0vJ4hHB5Tozb843cDj8ajj8GQxgibVlbH8Kx1jt8SNDBwHvpM8jbA39RUR+JOk8iO31Fu3+rA9fWp50NUzdv8ASItI8I+Iktbr7RJcW7ybdmOQp4Hr1NeIWkCzJ5YilyoDKnlnI46V6U3xJtgNyaTfyLnuyAAVXu/HtwYJJrLQoYJ2B3STbc4P+77UpSTD2bNTw7ex2vhPSPNuVhZ7bcdxwT8zdBUOvXEV3YiIPuO1thPHzEH9cVzF1+88P+GmZWZhZtkhen71q6PVLi0u9MTEyvMu04VcYwMH9KmRVtDlMGG/ubcQsLeJBtcHcc101kzulsH2j90WwD156n3rDln/ANOmcK2/aGXGOR0NaOlv8m4bsMq/Kw6D/IrOK1Je5V8VSfvLTglo95K+ucf4Vx0j5DE5LK2SSM8EdK7DxU2RZnPzbn2+3SubMUU0G19yOG4kH8jTluVKN0UopN5gUA8NkA+ua6yFo2VYvNHyAAhe9cxbxuj+SWCTqSV7qO39K37CMWkBUkSHqWArCqc01Yv4R5CzFg3YinFgijBZuozioTIrkA5xjqDgil3KFAUsR6k1z2IRgpLcFgCgOSAB7npWZqEDXN8RwNnyYXkZHetlJEtoprjO5sFIVP8Afbqfw5P5VVhgCReoHY+teqdjMkaeqtzHFn1K+1TDTgP4Fz/u1blH7wYOafvbqOtUIqeVtI/dRn/gFTCBmTeYk2eoWn4ZqsWz71aNug5ApAUmYiBoPIRSTnzAvzA07StQm0zUElVwjr0cjjPuO4NSzICc9CKrTRMy5EZI9R2oBaHq2m6jDqdoLqLjs6E5KN6fT0NasJw8QxzvBH515D4f1m40zUFfcAAgGxujjPQ+9eqabeQX8VvdWrboXYAqfvRtn7po6j6CzXkFk4E9wIlkQBGb+LFc34mmF7dW7Wi/aMRFSVBPO6urMwRIf3iAbDt3kDv70gvNocpdRrkdpF4rOWo46HmzB4WKTQNG55wwxTW2LKjKS3z/ADArWz4jlafV2Ik8yPykwysOvOayt4EkYw5O8YyegrI6FqjnI2YTzgLubee+B1p7CV8ZwoH+1VfOLqfcCf3jcde9T4yM/N9AKhs0UUMuGfymyY+B2arPhoZjuirYPy9T9apXJ/dsAp6dTVvw4SsF2ckAAcj6Gqi9CZKzsje2sdykjIPXd1pjIwyufm6kZ7VFd3CWgzMzLuOVIAOaS7vNPiW2NtqKzbkLXI2EiBj/AAgkc54pakSqKLJFkTPB5/3utNJB+ZcFPpTklWRQ6FnXI59/Splhkk3osR5BIGfetIU5PVFKV1cpXLDenAfjGPT3qs8anjy1yO5HWtG4geOPeQMZx8rdD6U2G0ed1RQzyHoqnI7euKfK2yVG+xQNtbttZoY9vsnNaJs7ZUUpFG+TzswcVLFZTGYKBh+uc8f5yKukLsaUkhyc7R2z0qoUZy2BIy44IWiykcYGAN4wfwNK6IvzmNeCQcCtUWKvdHylBBBVlPA46mryWMRXeEAZMmQhs9Dj86l05qfINLU50QgDIOAeQNvNL5OCWKnPH4Vdv0FrOwJKDjaG+bH1NU/LkuMCJRvJxtHJbiiVOUdxtJEbLGBsdtjHoSe9JcvBNYuYmJXhfx71PJpck9yYWVgFVfkA6DHGD+dPvbR7ez+zvCYyU4B5DY/rQqcrJslp2N3R72G28K6P5s0UZ+zHb5gHTzGqK+1WxNpJ/pEbEf3AMkn0rIlUHw7oCgAslvKuAOn7xutXdU1OGTw88TSpI6xjEQXvTk+hz2KK3Fvcai8gdFjaMKrMcZPfFaWnxuIwq/MAABg5rmkmi+zBnSMbsgRsucY7D+dRvtht1MVxIkgkHyoCuAR+tZpivrqbfiYMEtNykYdqy9PRZRMrf3xn0PHSoZJ7u5ijSaeR0UnZ5jZq7p0ZEEikcFlOe9Emrmi1Q7yIGikLqFfzCcjt2x+lEMIRflldj1INSlHW02ru2+cckdeppqAybRsKFBhix5NY1Fqc1bclBaQHjYMdcZFOVQF5b6cdaUwyk4AJA469RUiwMBksQQemazaJ5UY2pqv25LKMgparteQfxynlz9AcL+FLtwmPQUkUBkbPJ9TjrVv7OAhwCM+or1DdmRLnOe9MGSeuKuPCBJ94MO+KaIlxnkg/mKAK+SBlefXNLEXSRcgZz2qeNEXLENj6dalSYo/yAH146UAI67gSygH1xVNxg7N7AdO+DW3bzCZfmCk4zg8Us9t5gHCqw5wB2pAcvNEc8AsMjp3NdV4K1Cb+3LeCN1xO4WVCfvYHDD3Hr9aoTIMbSrZzwBV7w9eaNp2qx3V9BKgiBKSRNyre4x0IyPxpgi14i8WLA8Kw29tcrE4X99yCCCePoa5+fX7S/eRri3hjkQDyzEu1WPcEfliq3iO90e/vt+jQzwwoSSLgg/MepXgcVhBAQwkkBB6cikkuonKzOxsJ7O/iLLcLFKF3LEU6sAMKcdjV57IRadFqQu4ZEZgojVCW3ZOc9sDrXE2UgthtIVhuDBgeg6H+ld3pfiG0l8HxWeqtD9ijudpaPHm7uoOPQVjKNtTaE7mBZ6FqU4a6ht5TFKSysBgH6HpVoeHtTzzEye7SqP61NKuiJL+5up7mJnKq6uyj8s8U9ZNGVeLWaT0zMaz5Ua8zSKU/h66aNlkubaPIx811EP61W0eE2f26JnicxyBSEkyHGOgI4Ocn8q05JdOC/LZxITxl3zVZmiXzTCYlBH+rQjJNNJWsTz9y34u0JYJorVJJ13QmZS65LnnacDoCAODXOrp16yhcgsOGHODXS3vimPUN1jMs07krJHdPHt+baAwI9jkfhUUU0YkGMjnpmpldOxTpxkrsNLtLmw06RpI0cKQyqep6EYrVHmQyRLKkQuo/mkw3VMHH49CfSsrTWkh1BtQn8p7MbnMLPycZCnH+9jI9KVJNyuTGkkizfPEHy20gbh+Ax+dezh4RhDml1CKSWuxdvtW0m1Kx7nDuwYkqcE5wMe/QVaSI3a28lqjpMHw3yjGO+fbOATWVJIhKTzDzmt8iMbRsGefxIHT61HFbzLaXNo+o+VHcRgxRO2ADuzweuM4/lXavZxT00KUoxXkbkVpdy4edYcOqgOhwAD/Dj1zyT6GnyQNeWqzWwit8lDGsuAxwPm/I54PWi1dboShd8fmZZVz0LA5A9M4P0wBVuXyzIoitDKUiW92MpVfJcf3s8MOp9u1eD7aarWgcvPJy0IJodSstURks2mBIbeAPLdVBYjHXJGfwFSK8aW8MkEPlW6p8+c7pH3AA+2Ruz7020El1aRSWLSS2aPsUGXgEleB3IA+bPopqtcCOUwwBWFvJCj+ZE2HIaSRd8YOd7Nt3D2Ir20oyld7pHUt9TKuriC2mu4rhpWZQqnb9xCe4PsOT61c0W4s/sSCK62PCvmZWFm4UjLggZ6sB9PpUF8CLO1tp7NnkSNJlydq7gOQT64rRhsLC3ji8i6lmzco8kYwodNuQje+D0Hp71lUdN/MHKOxenlvH1NIiAQwedJgy7WRcABSOp5PHUAisU3R1COaKV5RczPvRCD+7BPc9BnGePereoTR3V1a3AhnVUjKoOkSluGA9GG1Qc56CqOy5WW5NyYpbnIVdn3TgY2/lWNeyiojm0lYdIGktrBTDlVjbcB93BPXj1IP50ktuojKCPaw+V9qjaR6Z/LmpYJyILpYy0UbJudlO7Ax83H9PamwXbLapI7sHUhfLC9F5xn864MZh7LmTOOtBrZkMdjBLN5Vxu8xBtb5T8pHb6Y70o0+HULiMQiRpiufLPy9BzjPUfT0rVxBI4YyXG9AiuiABN3Y7sc5rJlhmNzK93GxYyjb5T7TA7crt9SQeR0wa86MrGL0kkydtGjtplSSLf8zBFRgegzg+4yKcsMisVCBZFYB1ZcbPYZ6/StUy2scuSmwKgJw2WGSQcewOaEkjWCEiPzlILNOwPXOB/Q1esnc7FRvqjPntVijWFvN83Jx8p4HJGccjPr2zWMsnmbmef5vdTz+VdMLsS2xQOxWN2LqzDkH5cjjOOdvJPauecy92+oC0pN7GOKio2Gjz+WE8ZUdiSDS7pmG5Yi4P91uKVJXiIz+q8GpJJllbLQAH+8gIH061Nzl5ie3tHVSFjbn3oMDZxyO3JrXgt4fL3K/PY0ixhSFZwPrXpnSc5NbfOYyg6de9Qm2ZQNw68V08trGULZQsDxxVCWFlyRLGPqKYFfSfDt1rt5JbWk0McqJuxM+Nw9sA1ux/DHWA/wA93YoPaU5/lWAIWiYSxTGNzwGQkEfjRI9xg/6Vc5P/AE2Y5/WgDqY/hzPCVabWbZMdQCDxWbf6TLp121uzROoGVkRwQwrBKysuJHlb/ecmrFoxjIUrkHqTyf8A61FgsTPAM9AT2Jqq0MBGCi/QrWvtY8Hbs9hTJdPDoMbT6MexoA5+fT7KUljCvHfGCah/sO0fBVBz7VsSWssRJOxuMMcdR7U1IZFUbF465X+tFhWMkaHajJ4BHIG2rX9iR25VmgVGfJDFeXH9K0gTgFic+mOtWI7uaS3FpNL5lruzjpInsrVMlpoP0MNxbxcIw68ELT0ntiCTaqMfxHvWtfaVFbqbi38y6gbBBjX5k/3wO/vWZPYsIlcLuiPQrzk1xzlJMhzkthBewucC1VMd9oNRStE7q6Aow5OOn1xTPJIXlW5pBEGPcHOKn2kkZupLqQMksrZeV2BwST3p4QZcbCOOee1PEQyF3Ag9qkWAt1G0joQacajck2ONSRHLdJptoNiJJuBRRIm8K2QN2OxB6H60sUs7XVvNk+WSoDEYVn5DMvueBn0WmSL9mczXGWH3VK8555/lVW4u4fPikRJWEMkZjLtlVGfuhT3/AKV69atGpTUUdc6nNFWNCNYltJIfmW4tDuGP+WhY/r2qVmsreO6kumB/cyR/MMguEBwo7NnvT/tEkSutparNJDHmNsjBIbg49h29q5i4je/jZ2mUPvyxYYDlskkD8On4VyVas/gbOec2lY7DSL+zN80NhOzSTxpMtuo24O0FiD/f9aaQyIHjiuZpYCGt0zhDwfmdTx3OfWsbw7YmK5DC8jgmZdq5XLIOMkdsmt68S5RpI5pnlClZA2dpJx39vSsqNSNOWoqcnHUhZbmW/cWthLaxNbeXJNCoUzszZYbgeFxgfhU0F2zyTXILp5cZRJUYqbdVOBsPUBBkY7beM5pYJbgqoW4DK4IIBx5ZOABgcZ96ri4meJ/OKs0jHhB8ncAAegwR+tdFTF++zeU23cnUNqRCqn2hlMRd5CGEiq29pFJx83Ynrg1bNvbpJdhLRBGJBOlvEgBCYRXCtnkHYCScdKxEPlXSYLMVjYEDHDHhunGMelW185oFlDsFiXb8x+Yrg8En3xiuVVZLUlT5dWR3FzNLDBHp8cUkEbY8xl+Z84JyfyqRblVsW+1y8gH96oySOnH41JaWiTxR+YzpDPujjSE/MHGTkD045rKv7e5t1eQIZkT5BsbIc9jxwD/s9faplXbfMzGU5c3MaKtDbrGEdMt95Bk7ckfMfz/M1etbeSdFk3/u9ocLj5icYA+o29e+K5exvHbeqo8AZSZWIGWTOML27nPvz2rrYLh2i8qQkF9owwC8jAI49h29azqVZydpPclz5pakscDbRHGu4qMM7t19G/2e/POKy0s43M9zqBKwB/lERPIZeSe+Dx9OfWpIr0W8So/mh2ZgykMQoJPf07Y96dJfj7QJYZ03DKj5OgIxkqOg6g/T6Vk1Y1mldWF1R7k3cTWokie3yV5G0EDIH04xio1vr6OZZDMUOcGONdpXnJyvQAE8c8Ut80n2aN2uI8Mqt+6++ODyPxIznt9DWc13cuk2VcmVQpcL787s8nvW8WkjsjUUYmosM72hWAgBtoBznr8w564H6Vmq8SLy2QO6nrSBXIARmLYxkHH8qlRvIGw2kfI49qym7nDiKntGRmZXQlPmbsCaiEkhHG9SOMdj71cEysjLLaR5xgMpIx/SoFWMrzIRs9OKjlMLHTRFAPL24BH5GnCKPg5wvvUKwSHJweeferK28hQjHHrXqnWRyQ5UsvUcioZrKKRMuhII9e9TC1m4JOBThExQAHOPWgDMa1AiIAVfaq6xFSTxu7VqvGdrCQkmq4iQ4BXPPT1pgZ2ZCu4qOTSqrE5I2kdx3q5Jbl5CFU4P6U77KUj4U46cGi4x9vJGwCM2auLsjIVuVNZwj4yEQKD1zyaux/KuGwRjOc9KALUkUMqcAAdqoS24ickPhMYOKvw4DBcdenepjEAu44yD0xSEZBEfAU8YxyKa8AK/Kw9K1DbkMxUByecHsKqyoY2OV5PfHai4FGJ5bOUSwzFJVx84Pv09K10a31EgyeXY3JP3wuYpG9SP4D79Paoo0hYAgncOhC96iaORMjaAPcUpxTGUdS8P3dq2J9u88/K2Q3oQe4rIdNhI2tuXg5rtrG9eOEQzolzbc4jk/hPt6VnX9rA9sJg2y6yW8nBO9RjgH1xXFOlYznG+xzO31BA7ACo/LWQ5MrD2rQFhvXzDMu9h8wPQfQVUZE4zhgOeBWLi0ZOLREx3rzEp284J+tQXFtHcE7k2c5OPUVaEoZNojYA8nCElvyFSrbTSIAlrcvyBgRE5ppyWwalHzAu6RW2SNt6e3+f1qXUfI1BI2eKOOSLIYpwHPv6c1uxeE9cnRSmmy/MMruAGB+dWU8CeIZMsbBFHbcwzWj52h8rMdporiUyiBfMcDr/EwI54/Hp60rztPB5ToSW6b3yQfqMVtDwD4gP3orcDGPmk/wDrVNH8OtfY/wCuskB7+af8KXLNhZo54zxJCUjs1iQpgndyx9ahE7rJ5zRlSDgIq9DgZP19frXXr8NNRbIl1azjz0CoTj6VcX4bxKTv1qb3EcOAf1pqnNlKUkcO0hEoaNen3iw560tvJ5UEsSJGzzdWkz37Dn6V36fD3SypWXULyTuQBtI/WrkXgHQIwGkgnuG65eWq9lPYGpSPNt7JzO6748qHQ4z9ff6VGs0UIKglEf52PUZ9cepr1aLwn4ej4TR4F5ydx3E1bXRNIQgDSbPA6fuhT9jIXJI8VU2waRkcMr5zxwo5yPx5/OpkvJJGGEd2GANqk9P/AK2K9sSxsIsBLC1Qf7MQxU64jGFARc8BVxij2PcfI+p4iv2+7cIljdkEf88zzViDQNauSWt9GvDnhlZdvFez73BGJMr/ADpCzHhicehpqih8p5TF4I8RzscWkMCgY/fSYI/xrSh+G+ptxNqNpEfQKW/rXoZVcAbcD1puD2bI96tUkNROHi+HAiOZNYcY/uQf1zViH4d6YPnl1W+lz2G0D+Vdju4wwx7npSFASCOPTFV7KAciObi8EeHYmBeKec+skv8AQCtSLQ9GhjEaaTbbM57n+tXd6pn50Hqc4NAdXz8y49jT9nAOVHnscw+bLMCTgU17x1O2Ft/9K76HSdOhwFsYiR/Ec/41aEECD93bwIf73lir5izz2KSaUYctnPTbU0cMuAFgmJB7Rnmu856bUA9lGaeHIA5I/KlzAefvY3kjMVsLhge2w0qaLqJOV06cehIxxXoPmNnG4n9KducgkucdhntTuBwP/CP6o3KWTZ92ApW8NauVA+zrHnGR5gP9a7rHfLfnS4BGCMmi4zhE8I6mxY7LdQfVqnj8IXw+WSa3HrnNdexVSTIVUZ281LsGPvHnqeoNLmA5mLwrPGAGu7f/AHlBqb/hGm53XinIwdq1v4AGMnHsKQjdnOaGxHOJ4WkjJZL/AHEAgLipB4YgYYnuZGJ6hQBXQAEYOOaa2eTSuxmPF4Y0wH5llbH+0R/KrB0PTR1tSw/2nJq+P50480rgUV0vTk6WaZ9yanjsrNVCi2iU9mC8rUu2nAHGOnbND1Apppenq3ktY224DO4xg7h6ipF06yiHy2Nqv0hU/wBKstGJk2g7ZFOY29DTY3MyncMOp2sPehRQmhqxwRfctrdP92JR/SneYwXg4914OaGGDTeh9qdkKyHrKznDs2fqRQ2cg5OfrTWwVFMVyJFRu/3WpjJO/IBHpikKFQSpP0pSMGl7daAEVgw5xupx443HFRsoPK8H19aRGKttbrQA4gdeSBSDgkjv6U89eO9JgduDTAPvfe5PalGRwTim4w3cH1pTIR1/OkFhpLpkEHB7rQG3DjBA4zmpAcjp9aa0S5yDg9vSgBAeMDBFOHPQjPoe9RnIPzDB9R0pwI7jNFgDO5irqUb36GgoR7CpM7hz09KN20EDlfQ0hEXQ4x/WmlepGR7inkL0GQT2NNb5Tjo3rTQWRC9vG3MsSuD1YU+OG3UYQqB6UpYg0uFPO0ZoA//Z",
"path": "images/4pts_ADE_train_00009694.jpg"
} |
depth_point_106 | images/3pts_ADE_train_00003781.jpg | ADE_train_00003781.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 39 y = 138),Point B is located at (x = 208 y = 158),Point C is located at (x = 89 y = 211).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_16><DEPTH_23><DEPTH_81><DEPTH_78><DEPTH_50><DEPTH_82><DEPTH_69><DEPTH_66><DEPTH_64><DEPTH_31><DEPTH_0><DEPTH_58><DEPTH_119><DEPTH_24><DEPTH_60><DEPTH_121><DEPTH_46><DEPTH_83><DEPTH_36><DEPTH_3><DEPTH_19><DEPTH_78><DEPTH_65><DEPTH_119><DEPTH_11><DEPTH_119><DEPTH_12><DEPTH_22><DEPTH_69><DEPTH_67><DEPTH_25><DEPTH_58><DEPTH_65><DEPTH_10><DEPTH_69><DEPTH_37><DEPTH_37><DEPTH_83><DEPTH_31><DEPTH_17><DEPTH_33><DEPTH_63><DEPTH_53><DEPTH_83><DEPTH_76><DEPTH_11><DEPTH_11><DEPTH_35><DEPTH_22><DEPTH_5><DEPTH_9><DEPTH_44><DEPTH_58><DEPTH_72><DEPTH_31><DEPTH_75><DEPTH_11><DEPTH_44><DEPTH_66><DEPTH_44><DEPTH_69><DEPTH_69><DEPTH_30><DEPTH_85><DEPTH_82><DEPTH_17><DEPTH_19><DEPTH_57><DEPTH_2><DEPTH_73><DEPTH_14><DEPTH_5><DEPTH_33><DEPTH_25><DEPTH_64><DEPTH_84><DEPTH_49><DEPTH_57><DEPTH_76><DEPTH_74><DEPTH_42><DEPTH_75><DEPTH_94><DEPTH_9><DEPTH_9><DEPTH_55><DEPTH_82><DEPTH_78><DEPTH_94><DEPTH_1><DEPTH_39><DEPTH_7><DEPTH_66><DEPTH_24><DEPTH_66><DEPTH_63><DEPTH_17><DEPTH_77><DEPTH_41><DEPTH_121><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 3 | [
"B",
"C",
"A"
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",
"path": "images/3pts_ADE_train_00003781.jpg"
} |
depth_point_107 | images/3pts_ADE_train_00005184.jpg | ADE_train_00005184.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 12 y = 169),Point B is located at (x = 302 y = 191),Point C is located at (x = 162 y = 160).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_19><DEPTH_2><DEPTH_2><DEPTH_19><DEPTH_78><DEPTH_78><DEPTH_25><DEPTH_9><DEPTH_0><DEPTH_66><DEPTH_29><DEPTH_74><DEPTH_64><DEPTH_69><DEPTH_9><DEPTH_9><DEPTH_58><DEPTH_36><DEPTH_63><DEPTH_31><DEPTH_15><DEPTH_76><DEPTH_59><DEPTH_3><DEPTH_72><DEPTH_72><DEPTH_72><DEPTH_60><DEPTH_20><DEPTH_34><DEPTH_49><DEPTH_58><DEPTH_11><DEPTH_70><DEPTH_70><DEPTH_67><DEPTH_5><DEPTH_30><DEPTH_6><DEPTH_47><DEPTH_3><DEPTH_69><DEPTH_58><DEPTH_6><DEPTH_67><DEPTH_74><DEPTH_17><DEPTH_45><DEPTH_28><DEPTH_94><DEPTH_74><DEPTH_74><DEPTH_9><DEPTH_22><DEPTH_70><DEPTH_40><DEPTH_36><DEPTH_76><DEPTH_85><DEPTH_57><DEPTH_72><DEPTH_69><DEPTH_64><DEPTH_29><DEPTH_29><DEPTH_3><DEPTH_38><DEPTH_36><DEPTH_62><DEPTH_119><DEPTH_49><DEPTH_74><DEPTH_38><DEPTH_36><DEPTH_64><DEPTH_64><DEPTH_74><DEPTH_64><DEPTH_20><DEPTH_98><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_62><DEPTH_98><DEPTH_19><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_19><DEPTH_25><DEPTH_25><DEPTH_82><DEPTH_98><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 3 | [
"C",
"A",
"B"
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"path": "images/3pts_ADE_train_00005184.jpg"
} |
depth_point_108 | images/3pts_ADE_train_00002594.jpg | ADE_train_00002594.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 309 y = 114),Point B is located at (x = 236 y = 211),Point C is located at (x = 142 y = 172).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_59><DEPTH_60><DEPTH_40><DEPTH_60><DEPTH_31><DEPTH_38><DEPTH_9><DEPTH_78><DEPTH_29><DEPTH_49><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_67><DEPTH_59><DEPTH_76><DEPTH_67><DEPTH_17><DEPTH_5><DEPTH_6><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_59><DEPTH_67><DEPTH_69><DEPTH_70><DEPTH_66><DEPTH_22><DEPTH_11><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_70><DEPTH_59><DEPTH_41><DEPTH_94><DEPTH_1><DEPTH_42><DEPTH_59><DEPTH_70><DEPTH_59><DEPTH_70><DEPTH_5><DEPTH_59><DEPTH_85><DEPTH_9><DEPTH_45><DEPTH_2><DEPTH_3><DEPTH_70><DEPTH_67><DEPTH_5><DEPTH_29><DEPTH_11><DEPTH_11><DEPTH_81><DEPTH_52><DEPTH_51><DEPTH_49><DEPTH_36><DEPTH_38><DEPTH_5><DEPTH_44><DEPTH_2><DEPTH_81><DEPTH_82><DEPTH_15><DEPTH_45><DEPTH_59><DEPTH_69><DEPTH_78><DEPTH_66><DEPTH_29><DEPTH_66><DEPTH_1><DEPTH_41><DEPTH_78><DEPTH_57><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_31><DEPTH_64><DEPTH_19><DEPTH_94><DEPTH_94><DEPTH_19><DEPTH_31><DEPTH_59><DEPTH_3><DEPTH_70><DEPTH_67><DEPTH_3><DEPTH_74><DEPTH_44><DEPTH_1><DEPTH_121><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 3 | [
"C",
"B",
"A"
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",
"path": "images/3pts_ADE_train_00002594.jpg"
} |
depth_point_109 | images/4pts_ADE_train_00019798.jpg | ADE_train_00019798.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 193 y = 204),Point B is located at (x = 12 y = 214),Point C is located at (x = 246 y = 180),Point D is located at (x = 221 y = 203).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_63><DEPTH_61><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_22><DEPTH_66><DEPTH_45><DEPTH_35><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_17><DEPTH_29><DEPTH_44><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_25><DEPTH_45><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_70><DEPTH_49><DEPTH_3><DEPTH_17><DEPTH_19><DEPTH_61><DEPTH_67><DEPTH_59><DEPTH_67><DEPTH_5><DEPTH_20><DEPTH_6><DEPTH_11><DEPTH_73><DEPTH_40><DEPTH_69><DEPTH_60><DEPTH_20><DEPTH_49><DEPTH_5><DEPTH_12><DEPTH_9><DEPTH_14><DEPTH_57><DEPTH_63><DEPTH_63><DEPTH_9><DEPTH_85><DEPTH_38><DEPTH_83><DEPTH_1><DEPTH_1><DEPTH_0><DEPTH_41><DEPTH_41><DEPTH_66><DEPTH_78><DEPTH_66><DEPTH_44><DEPTH_81><DEPTH_25><DEPTH_58><DEPTH_72><DEPTH_36><DEPTH_74><DEPTH_15><DEPTH_74><DEPTH_29><DEPTH_69><DEPTH_69><DEPTH_57><DEPTH_57><DEPTH_57><DEPTH_57><DEPTH_94><DEPTH_57><DEPTH_1><DEPTH_94><DEPTH_55><DEPTH_16><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 4 | [
"C",
"D",
"A",
"B"
] | <DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_63><DEPTH_61><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_22><DEPTH_66><DEPTH_45><DEPTH_35><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_17><DEPTH_29><DEPTH_44><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_25><DEPTH_45><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_70><DEPTH_49><DEPTH_3><DEPTH_17><DEPTH_19><DEPTH_61><DEPTH_67><DEPTH_59><DEPTH_67><DEPTH_5><DEPTH_20><DEPTH_6><DEPTH_11><DEPTH_73><DEPTH_40><DEPTH_69><DEPTH_60><DEPTH_20><DEPTH_49><DEPTH_5><DEPTH_12><DEPTH_9><DEPTH_14><DEPTH_57><DEPTH_63><DEPTH_63><DEPTH_9><DEPTH_85><DEPTH_38><DEPTH_83><DEPTH_1><DEPTH_1><DEPTH_0><DEPTH_41><DEPTH_41><DEPTH_66><DEPTH_78><DEPTH_66><DEPTH_44><DEPTH_81><DEPTH_25><DEPTH_58><DEPTH_72><DEPTH_36><DEPTH_74><DEPTH_15><DEPTH_74><DEPTH_29><DEPTH_69><DEPTH_69><DEPTH_57><DEPTH_57><DEPTH_57><DEPTH_57><DEPTH_94><DEPTH_57><DEPTH_1><DEPTH_94><DEPTH_55><DEPTH_16><DEPTH_END> | 193 | 204 | 12 | 214 | 246 | 180 | 221 | 203 | null | null | 64 | 157 | 13 | 43 | null | {
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",
"path": "images/4pts_ADE_train_00019798.jpg"
} |
depth_point_110 | images/4pts_ADE_train_00014709.jpg | ADE_train_00014709.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 198 y = 122),Point B is located at (x = 51 y = 185),Point C is located at (x = 19 y = 107),Point D is located at (x = 299 y = 224).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_85><DEPTH_43><DEPTH_30><DEPTH_17><DEPTH_26><DEPTH_22><DEPTH_22><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_81><DEPTH_19><DEPTH_56><DEPTH_57><DEPTH_20><DEPTH_77><DEPTH_62><DEPTH_50><DEPTH_78><DEPTH_78><DEPTH_29><DEPTH_31><DEPTH_11><DEPTH_119><DEPTH_39><DEPTH_4><DEPTH_54><DEPTH_70><DEPTH_74><DEPTH_49><DEPTH_76><DEPTH_67><DEPTH_39><DEPTH_81><DEPTH_42><DEPTH_23><DEPTH_14><DEPTH_5><DEPTH_74><DEPTH_49><DEPTH_31><DEPTH_38><DEPTH_12><DEPTH_41><DEPTH_60><DEPTH_8><DEPTH_39><DEPTH_50><DEPTH_5><DEPTH_40><DEPTH_35><DEPTH_14><DEPTH_33><DEPTH_66><DEPTH_20><DEPTH_45><DEPTH_12><DEPTH_55><DEPTH_60><DEPTH_49><DEPTH_64><DEPTH_23><DEPTH_69><DEPTH_64><DEPTH_80><DEPTH_60><DEPTH_121><DEPTH_1><DEPTH_23><DEPTH_85><DEPTH_9><DEPTH_19><DEPTH_2><DEPTH_14><DEPTH_0><DEPTH_58><DEPTH_63><DEPTH_12><DEPTH_94><DEPTH_25><DEPTH_0><DEPTH_0><DEPTH_57><DEPTH_1><DEPTH_33><DEPTH_39><DEPTH_81><DEPTH_42><DEPTH_33><DEPTH_9><DEPTH_16><DEPTH_42><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_42><DEPTH_16><DEPTH_94><DEPTH_16><DEPTH_42><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 4 | [
"C",
"D",
"B",
"A"
] | <DEPTH_START><DEPTH_85><DEPTH_43><DEPTH_30><DEPTH_17><DEPTH_26><DEPTH_22><DEPTH_22><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_81><DEPTH_19><DEPTH_56><DEPTH_57><DEPTH_20><DEPTH_77><DEPTH_62><DEPTH_50><DEPTH_78><DEPTH_78><DEPTH_29><DEPTH_31><DEPTH_11><DEPTH_119><DEPTH_39><DEPTH_4><DEPTH_54><DEPTH_70><DEPTH_74><DEPTH_49><DEPTH_76><DEPTH_67><DEPTH_39><DEPTH_81><DEPTH_42><DEPTH_23><DEPTH_14><DEPTH_5><DEPTH_74><DEPTH_49><DEPTH_31><DEPTH_38><DEPTH_12><DEPTH_41><DEPTH_60><DEPTH_8><DEPTH_39><DEPTH_50><DEPTH_5><DEPTH_40><DEPTH_35><DEPTH_14><DEPTH_33><DEPTH_66><DEPTH_20><DEPTH_45><DEPTH_12><DEPTH_55><DEPTH_60><DEPTH_49><DEPTH_64><DEPTH_23><DEPTH_69><DEPTH_64><DEPTH_80><DEPTH_60><DEPTH_121><DEPTH_1><DEPTH_23><DEPTH_85><DEPTH_9><DEPTH_19><DEPTH_2><DEPTH_14><DEPTH_0><DEPTH_58><DEPTH_63><DEPTH_12><DEPTH_94><DEPTH_25><DEPTH_0><DEPTH_0><DEPTH_57><DEPTH_1><DEPTH_33><DEPTH_39><DEPTH_81><DEPTH_42><DEPTH_33><DEPTH_9><DEPTH_16><DEPTH_42><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_42><DEPTH_16><DEPTH_94><DEPTH_16><DEPTH_42><DEPTH_END> | 198 | 122 | 51 | 185 | 19 | 107 | 299 | 224 | null | null | 164 | 142 | 64 | 106 | null | {
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",
"path": "images/4pts_ADE_train_00014709.jpg"
} |
depth_point_111 | images/4pts_ADE_train_00006685.jpg | ADE_train_00006685.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 89 y = 206),Point B is located at (x = 181 y = 121),Point C is located at (x = 164 y = 158),Point D is located at (x = 27 y = 184).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_70><DEPTH_3><DEPTH_70><DEPTH_70><DEPTH_67><DEPTH_31><DEPTH_29><DEPTH_40><DEPTH_60><DEPTH_69><DEPTH_40><DEPTH_40><DEPTH_29><DEPTH_40><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_85><DEPTH_15><DEPTH_59><DEPTH_29><DEPTH_49><DEPTH_3><DEPTH_31><DEPTH_49><DEPTH_49><DEPTH_69><DEPTH_29><DEPTH_60><DEPTH_56><DEPTH_35><DEPTH_31><DEPTH_64><DEPTH_74><DEPTH_74><DEPTH_76><DEPTH_73><DEPTH_0><DEPTH_66><DEPTH_12><DEPTH_55><DEPTH_32><DEPTH_11><DEPTH_25><DEPTH_36><DEPTH_44><DEPTH_44><DEPTH_61><DEPTH_98><DEPTH_94><DEPTH_94><DEPTH_121><DEPTH_44><DEPTH_25><DEPTH_25><DEPTH_2><DEPTH_44><DEPTH_42><DEPTH_1><DEPTH_0><DEPTH_57><DEPTH_57><DEPTH_19><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_0><DEPTH_19><DEPTH_0><DEPTH_41><DEPTH_2><DEPTH_2><DEPTH_0><DEPTH_1><DEPTH_57><DEPTH_94><DEPTH_16><DEPTH_16><DEPTH_94><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_42><DEPTH_121><DEPTH_42><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 4 | [
"B",
"C",
"D",
"A"
] | <DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_70><DEPTH_3><DEPTH_70><DEPTH_70><DEPTH_67><DEPTH_31><DEPTH_29><DEPTH_40><DEPTH_60><DEPTH_69><DEPTH_40><DEPTH_40><DEPTH_29><DEPTH_40><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_85><DEPTH_15><DEPTH_59><DEPTH_29><DEPTH_49><DEPTH_3><DEPTH_31><DEPTH_49><DEPTH_49><DEPTH_69><DEPTH_29><DEPTH_60><DEPTH_56><DEPTH_35><DEPTH_31><DEPTH_64><DEPTH_74><DEPTH_74><DEPTH_76><DEPTH_73><DEPTH_0><DEPTH_66><DEPTH_12><DEPTH_55><DEPTH_32><DEPTH_11><DEPTH_25><DEPTH_36><DEPTH_44><DEPTH_44><DEPTH_61><DEPTH_98><DEPTH_94><DEPTH_94><DEPTH_121><DEPTH_44><DEPTH_25><DEPTH_25><DEPTH_2><DEPTH_44><DEPTH_42><DEPTH_1><DEPTH_0><DEPTH_57><DEPTH_57><DEPTH_19><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_0><DEPTH_19><DEPTH_0><DEPTH_41><DEPTH_2><DEPTH_2><DEPTH_0><DEPTH_1><DEPTH_57><DEPTH_94><DEPTH_16><DEPTH_16><DEPTH_94><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_42><DEPTH_121><DEPTH_42><DEPTH_END> | 89 | 206 | 181 | 121 | 164 | 158 | 27 | 184 | null | null | 170 | 28 | 54 | 80 | null | {
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",
"path": "images/4pts_ADE_train_00006685.jpg"
} |
depth_point_112 | images/5pts_ADE_train_00006425.jpg | ADE_train_00006425.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 223 y = 220),Point B is located at (x = 289 y = 187),Point C is located at (x = 313 y = 120),Point D is located at (x = 244 y = 117),Point E is located at (x = 307 y = 217).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_74><DEPTH_76><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_13><DEPTH_21><DEPTH_79><DEPTH_54><DEPTH_29><DEPTH_74><DEPTH_58><DEPTH_73><DEPTH_17><DEPTH_5><DEPTH_25><DEPTH_14><DEPTH_72><DEPTH_34><DEPTH_36><DEPTH_49><DEPTH_49><DEPTH_49><DEPTH_38><DEPTH_75><DEPTH_66><DEPTH_45><DEPTH_94><DEPTH_75><DEPTH_74><DEPTH_74><DEPTH_3><DEPTH_29><DEPTH_29><DEPTH_49><DEPTH_38><DEPTH_40><DEPTH_31><DEPTH_81><DEPTH_74><DEPTH_74><DEPTH_49><DEPTH_31><DEPTH_60><DEPTH_3><DEPTH_59><DEPTH_3><DEPTH_31><DEPTH_64><DEPTH_74><DEPTH_74><DEPTH_31><DEPTH_3><DEPTH_11><DEPTH_64><DEPTH_40><DEPTH_22><DEPTH_17><DEPTH_75><DEPTH_74><DEPTH_49><DEPTH_3><DEPTH_70><DEPTH_31><DEPTH_63><DEPTH_14><DEPTH_35><DEPTH_63><DEPTH_58><DEPTH_49><DEPTH_49><DEPTH_49><DEPTH_74><DEPTH_77><DEPTH_63><DEPTH_94><DEPTH_66><DEPTH_62><DEPTH_71><DEPTH_49><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_60><DEPTH_64><DEPTH_94><DEPTH_121><DEPTH_55><DEPTH_119><DEPTH_29><DEPTH_29><DEPTH_74><DEPTH_74><DEPTH_3><DEPTH_60><DEPTH_55><DEPTH_42><DEPTH_42><DEPTH_42><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 5 | [
"B",
"D",
"C",
"E",
"A"
] | <DEPTH_START><DEPTH_74><DEPTH_76><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_13><DEPTH_21><DEPTH_79><DEPTH_54><DEPTH_29><DEPTH_74><DEPTH_58><DEPTH_73><DEPTH_17><DEPTH_5><DEPTH_25><DEPTH_14><DEPTH_72><DEPTH_34><DEPTH_36><DEPTH_49><DEPTH_49><DEPTH_49><DEPTH_38><DEPTH_75><DEPTH_66><DEPTH_45><DEPTH_94><DEPTH_75><DEPTH_74><DEPTH_74><DEPTH_3><DEPTH_29><DEPTH_29><DEPTH_49><DEPTH_38><DEPTH_40><DEPTH_31><DEPTH_81><DEPTH_74><DEPTH_74><DEPTH_49><DEPTH_31><DEPTH_60><DEPTH_3><DEPTH_59><DEPTH_3><DEPTH_31><DEPTH_64><DEPTH_74><DEPTH_74><DEPTH_31><DEPTH_3><DEPTH_11><DEPTH_64><DEPTH_40><DEPTH_22><DEPTH_17><DEPTH_75><DEPTH_74><DEPTH_49><DEPTH_3><DEPTH_70><DEPTH_31><DEPTH_63><DEPTH_14><DEPTH_35><DEPTH_63><DEPTH_58><DEPTH_49><DEPTH_49><DEPTH_49><DEPTH_74><DEPTH_77><DEPTH_63><DEPTH_94><DEPTH_66><DEPTH_62><DEPTH_71><DEPTH_49><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_60><DEPTH_64><DEPTH_94><DEPTH_121><DEPTH_55><DEPTH_119><DEPTH_29><DEPTH_29><DEPTH_74><DEPTH_74><DEPTH_3><DEPTH_60><DEPTH_55><DEPTH_42><DEPTH_42><DEPTH_42><DEPTH_END> | 223 | 220 | 289 | 187 | 313 | 120 | 244 | 117 | 307 | 217 | 115 | 25 | 67 | 46 | 92 | {
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R5sO8j8cj+VRm2umPOoSKuc7YogufzJq1il49KnkRfOyNYgvJd5GxjfIQW/QCpOpJpaKdiW7iVTvJltZRcuv7uK2mZj3A3RVeAqnqcXmWwXIVGJjkf+6jKVJ/MqfwqJ7FQV2WlbfGrp/EMjIxWJp7+VDfl4xFceYzzwjJ8sjn738XU9K17SRJrZCjF9o2EsDnK8EEHng1nXFxBbXV1LIS0JQllPPzHAI+nAP51z1ZRilJs6KUW5OJFqt1N9kEUG03dzOYoYWiL+am7t6Lzy3QVl2umxaTNPJLDePBMfNFwuC2N2NpAyQnO7OO9JBqiSa2nlFXvJLWS2twpwu55N/BPRQoOcf3a3mZbU6egmZIrdzGWfncgBAH5hc/SuZwhX96WqOpydP3Ec5HaCRLu3e8SWze+kKEyLiCERgqMehYgDOOlX7e80vTWnNveCaaAZCW2Z96MAcYjDEbTkfgPWq8FlpV/b3epJYvcSxXlwYt0RCTRnKLhjgYBUDHWjU55IruOztFt5dRdWQabaR7cofvCSQ42jhT/wABFTClTi24rUqXvJX2DxHrEypJYTXMWlyTBUEbKJp5B1DFQdsQ9CST/s1mWBttH1ZNXhzfI8c0N4zuD+9YDLq/H+sUEgY6qR3puoaTaSwSz3Alnv7cvJqMjxlGibaqxRA9NpLDn0B9Kw40vo4A0cS4MkU1ukp2mZxIMEKfvA5AJHas6s5KWp00oR5bRO8Oq6K1u1ybVluJFzBGkDxzEtk7eBk88jg8HvTbbS7iSZtR1qH99JbGKBd/mfZTyfnxjnpyOnes3S9Ui1LWLW4jKXOoIy5SaQo9urNmQImNpUZIG1jgYruYJEuEjkjLGN+hZT098100ZKonqclVeykrI8h1ZoyLrT0hyIbyR0bOQyuRhQB34/Wu2t7FdP0LR7WSPasQN1JkdGBXt65YflXDatcSvLIbeMiSWY+UynBK7sL+I5rvZDN9jmF6wZ4LOONsnd+8wWbPfoUrLD/G2aYm/KjYuNQSytzd3XmLE5ChAmSoI7gc881xOq2UfhjXbLxFpat/Zt0SJ4gMKqt1HqMgnt1r0AIGbzJDuB5AxwD6/wA6zW0u01TQDZybCsse0OM9V4B59DXZKLkcdGag7ERn03X5jb2rJcW+xGc7SNickDPGCc49sE1wur2ES+K547bMw84RRgsX2AKPlGewNT6BqN14W1W80+6iYtGjfuw2A5H3T/n1NN8KyrP4kjnunQSGUuuTgOxGTyfqKxlJSjZ7m8IuEmezKRnHenDktj0qNc76cgG4mvKPUK2oaXDqNsYJRtYf6uQdVP8AhXj/AItspbTWYreeMq6J+BGeor2tj93HU15r8R13+ILTPQWann/fb/CqvpYXLqZFnHiwiAHAQVHeWEKT6DeQk+ZLDMXQ9dwLDP5AVcihZLSJHUq3lA4I7Y4p+mbW8VeH4CrEpGrcngqZJRz78fpTWhK3YHDIGBzkVzWqaWLqS6bCndgDsQcV6Br+lf2fOJIl22033VBzsPB2/wCFc86LI7gYznkenAxTkuZDT5WeNalayQyB2TYRxIAe9Ms7jyJlYCIBTyx4JFdn4k0UCV7vGYmTJT/b9fyxXDgPBNt8zBT07/Spi+hbXU9i8GStrFg1gqLI1kGmi3YXMTkbsn2bbj/erdS3sZbloU+zLL/Erk4xjqCK8q8OaxJpd5DdQrI5tj5m18r5in7y8dgcHivYZ78XVrFILgXEUwwuXysqjvj+tWmSxkllEEeIAsx5OQNrADtnmiO0t4ws0Vi0jo6uzEbcDnjHXHvREfLeJnt48lW2bXyAOM5H4ipY7q1+0jzV812UqQvO0joB7HvQp9CXHqXo5Ge+sWMe0NDJjYcgAEnr+Iq/is+NrYzae1qDDEfOQKBwT8pwfTrWnjFergnemzyMd/EQ3FLTsUYrrucQ0UopQKXFFwsJRS4pcUrjsJQKdigCi4JDHdY42ds7VBJwM8CnMm75GXIPVWHWlKK4KsMqeCPUVTa7S0Tbd8NkhSqnDjtg+vtUTkluXFX2M+9uLjT7V7mAeZaFcO0jhWT+EZ9xxz9M1g+IdYvLu3z9hMVukYkjlaYZ3Px26jg5rR1XU7m3a6Fog+zysM3MchDqxHOPTnvTPsC22jjdbwSs277QCxXaVIHBHXAY/WvInW9rJ049D1IQVNJszdNiltb+G6e3MzSzRrA6MqrEgHKLk5UHvn0rQ1VJL+OWS4S3t7e3nc+V5ys7MCOGwcY9hVG2knNjBPFlomn81BKFbYS54XdzkbuD2zmtCPR9MuvE5e9/eiKB5JRIiqrShuXJ6v8AKwwfY+laxbS5RyWt2UtPuNU1vRIIbO1228ju7XMnybC5LAD+98zAcd8V1Gk2Nlptk8kEJjds/aJW5Z2AyRu9s8Vn6Ldx3Hhq0a6uFWNYUaGSRdoTaq/L9Rt69waqQXZt703zGUadKysLbfjaQcbx7AlsA+qmrlJUo3bMmnU0MfWL9NavopGs41dGV0kOVeNVDMVDe5B/Ks7RQ+oakl6souJluUNw5bc5YnOD3J4rTv1tknvIEXYrQnyps4Yqz5bd6sAcDHY1T0CJzqcTskMcUMDLCkajgIsjEt6nLdTXBGt7TRanbFcqshNU0eC4up7i2iRJosvNBnqDzuHvn+lWtE1bULKw1R5Xmuo/JykjsWMZyB83cDB4J4qbzLmDVYLycxgygwl5ZA/l4AKAD1YZGPXFMt5INP1ue1a6ZbMMWlRx98gZKsOh5/lRh3KF0wqRUrI5ywjkN/pyiJpJGnUiJ/4iW4U+ma9Ht7JI4rxbqeeW5fa94pB2qSTgZHBUKFC/SuE8LatGvicW8lg/mWyvJFJbwFyYx/fA7L2I+h6Cu5m1y0mlaRIppIpIl2kWzH5lY/pya7MLazZzYm/NY17++isbKa5YbhGASo9+mazL3VIrK9Ahs5Lq+nTFrbIMZXIDEnoq7scn0qW/kuEtI5Z0iJV1VYEHyM24FB6k/oBmsfxBeQ6HozWW2ObUrsebK+zIXqMj0x91R2ArqnPlVzlp002ef6zrGo3mvjVbqONJsjaIzlEC9B710eh68YtYuFvtOnu4ntwJxbQFghch/mx6BsfhXIXknmSqpVpC2MIRlunQ/l+leyaHc2FpptrawyRxvNmTbnBc5wW/8dx9BXFh1zTOzESjCNjqFf5uamUcn6VDt9OtKjMoxmuI7icdj6CuB8YWn2vxZBu+4lmhb/vt8V3mQRgdK5XxEAdUZwORCqn3HNDYdTRvtHXUtEtShCXEVuPKJOAflHyn2rjdOtTY+KNFM8TpPGm2QZzxvkb+tek2nFlbjGf3S/8AoIrlL5lbxzpoMYR0U5Hf7rd+4qkxW1Ny8txPYT2Vy5MZdFDIOSM8Ee+f5V5Lrkk+g+NZrO7x9nuAvkuO5UAH88ivXpvkAk+UKsoyA24jPP8AjXlvxltZptR0ZIRvJSdwB670wc003cGkF9bR3dvKuARgivLNd077PcSqB80fUZ/hr1LR7Wa30yKO54ucfvh33e9YHifSjIxuYwAycMMZ3DtRNa3CL6HnVrN9mmSVQuVyRnJyO4r1jwrPDqOnmG43SNaKFiZRlliYlhx0wCT+YryaWI210VXODyCDius8Ga0um38RlLtEDiREkI3Rt1BIxnDYP4U0waPTjYQ3V2qG3CvGhxJu2jIxk4/OtGC3Ft5pgeJpwhVo2HDDg5x0zVB0juJDGCoZH+SV2zlW6Eg8H14qM3EtvP8AuoJYkO7e5YFeDzgY74z+NNbks6CFnkttJd2iLieUjYuAqkDj68Vp4rPtpjcaVpsxXeGuyFJ+hOa0sV6WCfuM8vHr30JilAoxSgV23OATFGKdijFACYoxTsVmvqyws++ElP4WQ8d8Z9OP1rKdSMNy4U3PY0cYoqBb2F3CAjcVzj09qiTUoy+x0ZGP3QSM496l4iCV2x+xn2LgxnmuX1LxFrNprZ0uygtjJKwEcku7gEZ6g4/MV1QKnHzA/Q1FO8caDzog6MdjELnA681FaLqxXK7DpyUXaSOA1Y6jYadfRXS+ZdSr+8ljO4qqkjaB0IDIfwYVJcJNPp8NkI0aBIzOQWKnOPX2OKl1a6isBcLHPM/l3ZMgyHURlVYNkjI2nHHfB7mqkVpdW05Z5JJgW3LGAAFGRuB7kHqPXH5+LinUg7Uz2KaTV2KJPI06yuI4d0lu4t2Z1I2qQQGGDz93qc9qW5lFyVlWK3e1jlwreUDuZ1bcwU5xgdPoKmg8kR3ctnbSSCzCySAz52ANnJ4B7dMnGetOu7KRfsQhZVmgRd7QKzMdvKxnJHPC8g9+hq6VaTiope8RJE2jW+n3lxZWsMMccttZQypN91/NIGQG7cNj8afPY3cGltrEZiM0c5ZoSxKQoGIbk8k5I5Ppmq1tLo0LJqM3nwxW07wgwr5vyqFMAx/eIfOcc4PpXQxahFfQzw+VeXUFym1jLEIQCQchjnjKjOcdq6lT54v2uplJyjL3TkdfjmiBuJvKhEVyYnhjkJUlhgMPTBVBxipdNEVv5NvbRmOKDTrmXJ6uWjA3E9+ah1yaW68Nx2Rt0t5mlErLu8xzkjAbI7rgZz2Jq5cokmk6lfR/ZUFxYW1vFBGzbYlkbGCc5JwrZx61zSgoytHodEb2Iob2ymuLW8s0jMkY2TMyH5kUAcY75IxVbX5IWsbCRJZXlCOZd6AKoZt4/wDQj1rO0/Uo9PvkhuYbJraRHKRu0gETEjgbWBHQ8kmqusX1xfav5NoscM87EbQNyoMcjDZyMeufWlzvktLdmkVd3NPweb7SkHipI18lrjyiD3i6Hp2Jz+ldsqxx6nbxRs5tcDy5NzA7JA5ABz7jJ9arWQifQZbW10+Ce3VTHHby3LLgIgOzA5Hruz1pmkat/aVlqN5BCY7gpBBHZSyBlRfmCBOORuOT7H2rqp3hZHPUfMmS6trltYvdahLuke1/0a0iBO1pGHzufoflz7Ed681vrqSeWO5dzLM8hE2Djk4x/XH0Nbvi2SKJ00iB5HtLEbELYJLt8zHPU88855Nc94a0z+1fEH2a4jZ7XZ5swYEAqpyBx1J6UqzlOXKiqMI048zOm8GeGIbtptVlQSq+6G2S5Upt4+ZiBweuB613i2dpdabbrLaxTxEbXEyhiOcHr71aaS1treCIIogG2GNFGVQY4GPTiqC3E4uLuGCy+0WIOVkWQDa2PmCjHzDdnnIwc12U6caaSOGpN1G7nT4pNvPWnN0z700n5xivHPZHoQrckY96wdTgF5dXCxsftcAw1uwwXTrvT+8P5YrdIJOe9QX1hFfiNyzR3EPzQXCDLRt/Ue1ICxERHax5OMRKM/gK4m+uXm8b2nmRKpijbgk4JC5Hb0IrtNzC0xPInmBdrsBhc9K4gK83xCCfKdsJGCeB+7U/1IqoiN9jGZH2gorgR8DJ3EEA+461geK7PzdQ0aMsHEdrKGyOQvyg5/Wt1YpYncmPcHwB7YJx+IqtrpjS1gMyDKlgxBw35/hTi9bjkU/EejPZ3BniTETbQdvOCE5P06VzeoWwljfI6jnFent9nvIpLd2LLIuw7wcnj16VwWq2c1i5iuUKkIGDcYYHvWkXdWZnLR3R454i0lobiXaOBgr+VYVrcGCQOMkr2P6ivU9a01buOQhecZVq8wvrVrO8eN1wM5xjis0rOzLTurnsPhbUDqGjxLlHNqNjhlBJjONuPx3A/UVvhbWB1jEDNk8IWO0dPx7459K8f8J6ydN1BFaRghO0kf3D1/KvZ0igkQPG7TsQH3AEggjj29+tWiWasEVpFoNumPIMLGcRq/TBKkkHlhyB2pkmqyW1wkM9vbO/lRzNtR/uucDkMRTkjtZ9MUpMv9oBfssuPmdY2kDHgZ478Vmzx2KLLK/lwxJMlrlfMTYiPjJLc888AEjk01Nx2CUIy3NRdahcyD7EgWKZYHkFxtAcjOBkE9MU2z1uyvZHSJJAVVmBWQPnBwew71kSMkbyyksYpNRj8rbAXZlA4II4PfoD0zxVWwSKza0LQhWma8j3jC/xMeoJPBH93FWsRJdSHh6b6HUSX9rE+N0pAQSMwQYVemcZ/nSnUbJb02rPMsiqrZ2LjDH5c/Njn61x01zJHpEY3giTSmDSsuM49TnnqB0/lirN9KGa4aR8ssFvw7A7hkEnK8cenar+szI+qU+x0090IZpFNwuzcYxvQAq45PRuePeseGxXy2MeobkbbvxGpxuHB++eM/rxUG9Yr1IVWN5P7WJkUSADa0IOeexyO9Z8YgkhhhFv5Tp51rkKT5flsTFkIST90gfh9azqTc/iLhRhD4TaitoY1H/ExtB5uVjf5ieDg9jz6kij7AXd7h9R0sMc7yZmzjtztqi8iWogn86MJkXc6oCx25/fKDjOOc8A1XeC1gmW0+zGK1hke1LyROFIYb4mORxggDk96yaurM05Euh0ljGlkXee/s3UjblHYgc9Pu9atXFzbraeb9siwSPLVJV3Oem3Hr7HFcTMLie6hjc3FpcyMXcYGTMuQ8Y7fN94cduKmSwgtNOd7Boblbgsj3Bz5mAcgNwfmU8cY9zWqxLpRMKmFg3zGfr6Xdlq80khiZJfnYxgFAWABXPIwOmT37VUjMpiSCSd4ZlUCO7KlRx9xHyTjaflDc9RnHWmXFvM6SW8800saMFKBAqbgNxIAJzkEjJPVelQXdy8ZzG8biUgfZwSVzxwGxyfb2qJS5ncqK5VYuWX9pLdXFrdzE3H7+FnLgKyfe3cDDfKCAc8+tdXpt5H/ZhZVcLJGksPmfOzRsgwDwMEkevU9fXkY9sVzLJazqywhwySLlW+VmGRnqV3LwcdO9XIphawSypFFI6Wyf6Ml4cxJtB4AU9jwCRRCqqbuiZQUkXNPvLWy1qG6aIpawt5flbSC8yOY/MGOG2I4HXs3TbzqX0l1qNrf2MkKkTweWlwrZBj3YB3A9fnAH415ne6nrMOtqmjx2zR2luL2T7ZdoEizLtyWLqo+Z1GOuW71Z8OeItdOtXmm6hFa28IiF55CSNschgU2EFgykvkYOD1zgYrWnXlYTopu6Oq1fVLWe5xDAtxdSqnmohOEZJGyd2OhXDDjsOvNc9byJb6fp5aaMi6Vp1fI2lE3DPB45yQCO1bN2kyzs9ze20Ebxp56JHsR4wyjDnOXADngFDxUUGhw2yNdS2sEw80SyWjRqkYLEgYUOSCoC8fUEd6TnzO5ooWjY5vWIdq2V3DbKzXBLSANnYuDhfqAOffNLpN7JJqcLgKt3D92UgnzYzgeXjpuAJIPfOMcZPSPptpcym5tbHzYonJUOxA3c5/EkNWXr1heCRLhikB2+ZCsYEaqo6L6gjOcms56O7LjqdeoQ+H7YhCl3dEsHKsCVlPz52jqq5OPasR9Pmt79ZtKldHtHk/dRtuKoDhfvDnhgcEZ69aveHPFVtqsFjpt+wtri1uGUNkg7WQruwe471oXKfZb691GFUuINsMqyxthZiAQxI6qc449625lOJkouLOKuDcahdzvcpKkhk3s7psD4XnH5Yrr/C9ilq1ukuGurkBkdQcIFORk/lVS+uGmjt0ZAyQI22UBsZLAnK4JyD0/Gs60+IXhaO1dZNRYPwVAhk4+TBA+X+9/OsaTcZams43idffyTC2hTBikkIjQRLvIYnluSOBg/r0q7aZt5IYoIhEYYfLbcewbHA6ZJ3HrXOadrcWpL/akU8UkM0MiRSM+xnbeBlUPIBwRkjGa2bNrZYgs81x5kj+dKEibgtkBWyMjjJ6Ac9a9KNRSZ506TijsX6ZpAMvmncEUmfmFeQeoh3cEdKUcZA6U08HFPH3c0AV7uJJLKaNyArLt59cgj+VchPsX4gFvLAxbgnYCeqjr+tdldgeQu4fxcZ6Z5rjrdJV+IVwweRdluCCDnAxj+lOO4HSrJHlJGf5ZYy/Trjpis3UZI3S1eUFCzZY7c5Oc9PxrQQRBQttIwSSMEJjhG/iIz71BIGlvo45PnVCVBwP72KcQZqzKsU7sxxsJYD2x1NZ2qWEeuaZtj4mCkxHPfA4+nWtFmSa/lVI0ZuU3DrtPUVQiS5sbjySWlg3742zkxg4yDj+HOQKNQtc82dCYzDPH5M0fyugOdp5H5cda4TxjppE8kvTeoPHbFepeO45ovEOgiytE+1XAuI5xH0kjXyyA3uMk1zniWyW406QlQBgbT6HGaqWquStGePwzvEwIGHBBU969c8NeK9JbwuHvyi3FqCmDJtMiYJUjsSMAfSuGXR1kADBRngAgcmtTTtPjtJSvlof3e0g9cZpJ3CSOul8X6XbaTY3OnIkt+rZuIHjfbypG45AU846MelRxeNbe0kEckDTpbXMkgm8whrgZfaDx0Hy9q519EM0r+XCFSQ/Ngfe+tW49DhRyTGquQMtt56/5/OspzaexrGMbG1b+M7JCIhpoWNL03EatcjawYng+mM8fjTrTx1B5OnJPak/ZldFc3ah334yx7dS31rKHh+2kjMYjCxP1RTgGoZ/D0c8mVTDZ4IFJVH2Hyrua0XjCw/s+XTfsCMv2OSzWTzx0KkhsdyWA4+lLeeLNOks7qKLT8ma3NuzPc5KMoOGHHOTjNYTeFV+zuxYMwOdp6H1/lVBdKW4+a3iw2Mhc8Y71XtJdhcq7nQy+JYp7yV4bJgHmSUFGA+6iocD3CH8xS3fiG3ecrBZfuWvPthlE+GTI+ZB6jBPNYUmgOgKc5dd7cjOenBNPi0JmCeZuOCeR0P1pe1YcqOgttdhhh2yTzXUcJcbZJNzeSxJ2qMAIOFGcnOasTa7YXEyLezahPE0ZtpjLtdcsSyMoUkgptx71yv/AAjwRm2723DhegXjHFV30MgjmQbVxyaaqsXL5nYt4lhyjztMrhEiWcRndHKvR/xDYPpmo4PE8TSSXMNvIkZlVmxEwVMg7sYznLEZ49a5kaN5uiT26iZnSZbjeH5AwUwPzFVrbQyYZ4wxEcsPlkj7w5D5HqcJ+tDamrMTR1VxqltfSS38e1YYZAA0oYqMrg/KBkDOeSMZ6E1nyQ3L3cC2yx4xgq/7s5BAPHU4B7VG7RW8MVlaIrxkgLGUYDueT0GeOPap9FMqWs7E5lKncr8gs2QQPyPStErKyMC/c2oQedbBYXh3PwMBSuQNw79utOt7IWcYlS5OJLcNPGUJifBKhWfqPu5z6UahPMvlwsjxXExbZasR8qFgcMOwBA689atQ2aR6Ubq5d5Nspjd9hJdXRQuB1wCj4+tCSGcVrN7aSahqtpeTWWm/adHS3gkBlljkYXccuSVQtkqjdscDnmm+G54b3xPptjYytNHYaabY3QQgOfNaQthsHbmTaM4OADgdKu6xoNtq1/5QiV5VhWNJQ7MVbGdpVTjjPQVJ4c8OWGmrPNKCbqNDCxVmUbmOVP5f+g1SG2bOqahbQ3trJfzLOpk8xQ/ypGBl8FRnJJB/MVdT7bcCN76BVRgsrM0y5Yt3Yg8cc8881j6heQRROdMjA3tk4U5x079Qc457ZPaks7qIXzXLWFq9o8ZBUA8NtASTHUYZm/CncVzrpoeWMKR2zwv5MZ3DnHbOeQelMums7e3Q6xFEgJ3xpI4ZGOMEqw46fj6iuZZYY2mYSTRhk8uWOTJDDHt156ZrndZ/tSZovscbT2jSDawi2PEc4Ab2GOvTmpKjI0b6yhe6mexk3xQybUmjJYRbjtIJGQQB078fjXQWPiLUbPfB5LxxgLEyBSxiUH0xgqcZBz0qrZ3N1BL9kMZFpGF+aNSWR2P7wIByRzjPcH2pTAJBJPJCLkx4cmRTlVbkZ74P+FZ2aNLpmzqlzYJHNNaFZJCyOUkQhiwyD1xyAT+Qryq7U2qQabaaTa3NpJpC3TSmFPMZmh3vL5uNw2PuXaDg+XtxknPYiWREkC3q3SRMGMc9zGnlE5O0LnJ4PXp0FcxaeDvE9zZf2VHrUKWpb/j1a7kERPDZ2428nH41rF3M3odN4AnjPhazimMAjVmZnlUsygM5GMDpyfxNd3Y26QTG2idYLW+h8xGhj2sjKArKcnnjkHvmuI8NWtzYaBa2USxO0MrpdOsm0EFiSyk4zgEDmuhub+R4N6WyO1tMtzJlwCYjj5gerdWB7cYrenJLcxqRb0R6eOntSKCdtOB4xSHhuK4zpJD60q9Kb/CPU0oPSkNkGobfs68fOWCjnGTzxmuJ06Lz/HGqBYt7+UqkH+IhsfyxXZ6ospsHMLKsoZSjFA+PcA9+tcpo00g8bX8hXEzxkPxjc25unp2qo7iOk3m7mdnZxHtJIxg5waqSqG1KKSMLIsezevdQSCrY79K0kiQzSRkyM6YIZuAFOSPywawtX0y4e/j1PSJTFqsUR4YfupowfuH3o2Glc2UmE2qM6uuEZgWGAcYBGaJAIWZpQWJUuuOpOTgcUxYgcSmPy2lA37O+Oxq1I6BMkkMNv6dM/nRcDMumM+u6RIRh42dSc9FYIR9elc544sEsokdOIbqXYqgcB9m7A+o5/CunvC39r6YcKyKxwdxBHTt3qj4s08a1oF5Ybip+0wCFHQbVO5OQR83duh71Segmjye30+S4bd5NunkKXLl+T6DFWIYsz/dUOV69BjPNZ9jf395LJ5llZxLbEqxCSFmJOMBd3PINWNOGrT3rC4jtPs5MkXmQsSxKtjoeg4otZE7m7axYAJ6nnFTEIJQHQt/SoYkljfBCrt7A1ZbaMkryR1ofkO4RqkatsXlvmYk9KFcKQwA78EU11B6Z/wAKbv6jJ/CizC4G48xgpXg8YFQRWyxXGdwyQQAq4p7SBRuAGQaUuXKnoQRmq1JuNlEbMCUJI6ZGaZu/dbAQCT1JpTv3nIXiqrNIM/czwRkZ+tFg5mKj+TIwZnc5H8PApbhsgLnBxztqrt2uWIGT3yadKsiLGoTG9SwwO1JpLRgpMkh/dSMzv5cbxlHYEk7T7fXB/Cobrz08qRP3cTYCzAbw3TPI+h/OnKWDKcDjjrVS+dYrOaWKZ0nUbcp+725OByOvf86fKkJseYHtppbu+KW1ufkRgobLZydq9fXp7VetZZ3hVYUitrYyllcDEjEYHLdeAx6c9ay7KGC4uQbZdjhd6mYfOc/Lkv1Iz09OM5FNjikF1IDlkCjy1bggE4xx055/A1OwrmxLvS9a3hJVI5pXLD51c5wCx6k85zRLcxW19JY20pRriIiNhEQGdH3KCDwflyM0lpdIspNzIgkuVXGGaNW52qBg9Dyx+uKqPdPd3cLrjYm1Pn5ByrqOvvgfhTQirc3E+TeIJFbzQMHpjPC9OSMAnPbHrWoi3erQDyvLklkwzIrgFiAAeD046evNQX9oLWN1tbYT3kask3mY2A5wdvq2OR/iM037ZHgW1zCyxyOCqQjaAitsHyrgZwNxOMnPNZU4Si9X/Xc9LH4qjXilTjbVvZKy/lVt0u71/G+WkgstVtYrmNYRbsSpKhg7jnaPQ4IP40uiSy3NzPtsLksjCOaWR/u5Bzg9ckY46VZ/szTrq2iD2sIa4kYkmYpgY/LdtAPPvTrCws7XVopbKO5iiido/IlIkVjgKxLYzg5XgYrU8uxoQgeVFcDZhpRJMG5ZjnlcHp1zWbbpeC0NvbFLq4MzNMtxL5YZP7uT2GDj6itK4gECwtBPiNVaQR7FOQCB3GRxgYGOlVrp7i1Nv5KhIoCw84gfOeOuOSAMfjU3KRWeN9PtkiuZYHuAzStsA2hSBtHPBwSTnrxV+K9SQLZSSTPDGq+WUOW3dPlzxjPXPHcVk3FwLy8JWOJ3yVgeRiCCflIbnjjP5Vdt4biYp5s8ihUbEROAMNklSc9M459eKLlJEurabAmnrLHi5sxMsQWVdrjgnB9/8al8KXqr4ghnlTzmEu5Y14Gc9Fz/AJ4qC5NzI8bh/wDV8+YOAGGNu0fTuaZb2st4JrlFAliMWUUk53OATkk9s8VipT9ppt/Vz1KUML9WftLc2ve97e7bo03vfby0vtzRzjW4rcyIIHkaMQSSbclWPRfUAn24qLWY42tJbIpHPGzfLJG3IcAH5fcAnpzziodUh8+5nsriNUUIwVlULg5XPPXrk1XuJb0Wc0kDSRSRRtCBv3NJ0BwRwflPp29q1qVXDVHmqF2e2E8dKB0Jo7cUJ8w96kuw48YFPA+X3prA8ZpwI3Y9RQBV1GRYbVpDjKAsAT1IFcvp0zzeL9UlX5iCA3T/AJ6HPb681188MdwqIyofm4LDOMjFcV4Jka61PVbh1PKbmHuXzjp704gzp/tDlHiwMyO0YyeTgZzn8xUiSBiqod3VW6cdPamm0eBNjFcwvv5JAO7qBj160SE298yJGXiU7skjgk9OKHsESTa4kkCptEisRgnBHTn0PFMvEAgkD8xsFOAe/bn6gVajXbDtSfzRIpkzkccjiobhWYbFVclcEHpgE/rQBVlYS6vZokqo8e87C2NwBUHH97qPzqa+ZIbN7gyMfLnjY8dBlfz4oFvb3D2zToJZY23xv/EhBxkH8uO9QeIUefRbiCQ7dyqNykDOGBH05FOLFI810Xy4LkXrKcuJJHCjPzGQkd+g5/OqkcJeW4MaKFM8o64ONx559ev41JaStDaQur7ZJNwGV4ADEnn8aLOZZ4ZZncupkcknBJ5xW1VJRMKUm5Mktg0YIbAAHY5z+NWuZMhDgdiaZGoKDDjb2GKnTAFZo1e5C+Qowdx70zPQDgelSTbYcyAbvUCoHTLM5cgYwAKoQcEMME9SR61Gjb5PMBZVP8DVIzFAq4z7iopI1kHJI7j2ouIezCMnHfoKiDb+yjHTNRMZAh3MDkHnFIIt8RMmOucE4NUhMmSaaGUlRGTghuM5FVpni+0RzzSFsRmFfTlgQP0qxteQOQ+ABx0qCWBJY9mRjGC2M59P1ocLu5N7CShM7kXrgbmFVb+QMkS+WgO5QDjqBk8j+o5qZ45/sYZ2ViuUbPGCOh/EfrWWlzEL0IcgwuMgnsQelN2W4Ji3qS+SxjIMZQtJvbaTyMbfTFBiYuJJ51dFkVg3Xli2FOMEjrkHtUWoyW7XsKXK749jFEXku3bp6cH8KsosmnWqx7I5N7nYu8tuwOXY7QecjntWL3HHYsTXUUjp5gg86OEIyJlgGGMcDA4FWNPSHesCrHMuxj+9Pyn3Py+mff3rEEjMNkaqzbxhvQg5yNvLY654HTrWpYOGtbWETZlZ9q5BZlyeckYHXP8A31QnoHUtC4lu7N4ftCC4iPkK8jBd/GFbpzxxk56VFctIfstnbnY0toirNGoZlIyG5/T16U7MNqrzzKscsQEkSyRhiwDLlDz0AbIPfB/FNPlW/wDt9tsBmQxXIMZ2s6jIbGeh5BA7gGnfWwyW1sbQWlzO7qytjERypkYZBGR0474qSLz7QERhgkzebkrko3rknkH04qDTbuG5s8RBl2Boh1DdepyOmR6nFWYztunhklQJCEbZGGkZj1CpnA28c59aYrCLLA2rPaMgBEbpKxBTliDu7542+vWsrWNQxaIibgqsUY4PPJJ47DHf2HFaC26x3FqA7CM4iB83AV9wG0kg5wNvToBWfq6vcQglpEidgxaLDcbSdvQE9j+JpNAig6rbajB9ot1UoM+amSc5PBB4J5HAx161p+SJLuGWJh5m07hjojZGV57dxVK2cXk1vHLI8shkHmFsbOgC/MW4IOOPT6GpzcK95BbRyyr5jlkUqCwBBz82MfU+nb1g0Xc0CpFuFd1YqcAqSMZ4JK+vT049am8M3q2Wpok8YkGDnphcHIPvg1VVl86J2cyzIGEoQgB15wd2Dnb05A6VnXwCyCVdwQNgZHMWON2RjI9zU35ZXLSujc1K7vL7VrmS6uFG+ZngeWJQBHhikZCjqOAT3xVmNooVECwCOXf8xBwr8bjzjgkkjIA4wMVUmvPPhO9ytwoAbc4y7LgZwFyOhz7GnT72tLhJp/NuABKZB8oAyBkc9en+FN2le4n2R7OOAc01OOOOaUdqUHLZpDFJ6ULgkGgDJp5GOaOoMp3zyK1u0MgR1fJyvQZHPXmuf8FbDruumNQE3/KqnIK5GPzBB/GuiuI2a7tnUKWD4we4JH+Fcn8PcJfaqWDZeYxgjP8AeP8AgKqIHX3VsLzfuJGVHGcckHvVLygTuX5X3BmVm/iHT9B+NakkbEmSObaU+8n8LDH/AOuqQ2vPgIR5jAgep9aprRCi9RYYwkygTeYzoQ23GEwRx+lRTNNIkjKuCqArzy3ByP1q80AaQSnCnBXCDq3GP61WYOpzuct+8Rht+9jIz/8AqpPcaFg5mhIUqrIDn06fLiqN9thW7FxNlP3YyVJADA88A98DPargvLO3a3S4kRPPJEAfPLccfU1JJasJrh23bpIRwMEMMH/GhAzxFLW/eKOCO9BVM8CE/Lk8j3x+tX7Cy+zWH2ZpPMcMx3BcbsnPTtU9vEgtYTxuaMHn8KmRRsAxlyCQB14onUclYmNNR1Q8lgsflLGR91hnpT1ZSnzhcnjbnFJ5RSPciguTuC+lRyby6bolAxx83enEGLIASOdo7DHWopEBBWNupGKkYrwMD8etLGVjjeUncF4H1P8A+urRLKrRzh18uINuPLMcAYp0keAS5APtR9mv72VT9oNumNwRBk47VHEkkUyJcyb7dm2eaRjb9R3FU42JUvIa/wAj4OOfU0xsEjJX35qa6TypjDJkMpwT1qFgwH7sscj+7mqQmIzskZKqrsOAM4zWfdyS28e6ONyseAVRs7gSM/lWmFlQHzUaNexYEZNRzW0iDfKZvmbuu0HjoKUo36isVo5FBckF1kBGw9HXtz6/yrmXhNzqV4Qsiyyny4gUDbgTgAYOQcBs8GurjAtGSyZcxFhkEFn5wMDA5659OOtQHTEk1xIbDzIiAVkll2hxt3bsBScEcDPvWKqRnoh2M9tOdrmCX7O0CpCcKF3MS2RgrnIGe5wOMU2e4gNz9je6VJvLO63XOFGB1b1PIxntzU3iM3nhmZ5ngbZdxsgkwcuRk5z7HH51i3t7Ztqj3en2mFcxz/PHgsCy8E+nB+nNOe4kW9MZ2v5IoUxHgxI3mAjaSCASOnQflWg3+hxpE7G3Z0wjbssSCD8pXI5x3xUViGS7lHlRxlpHZjC6sFIGSGJOTj6dMVLeRMzPKY2k8xFZNrhVjJIIbPTg8Y689KhKxRa08pqV3amZEc/aCPOkboGYqFZR1x/UVT09ZlnS5BOS3lTyGLhFVgvPOeMY6Gq2j3AjvppJPOMwk8xQ4O0pE2/cCccnaeuPz4rRs7pQWjfd9knvJGhY8YRpid2PoB+Youx9AaKYLbm1a3kV3kWRTLgk4Y7hx7EfWprSTPkymVoHLMNyoXO0gBR+YY/j7VU1PFpriwx7Z0ikAV7dhiUEenpnn8alW8spbeCIkzOA+9Np+TGAGGO+c1dyS1eoZuDd42/vYjKo2l8AD09T/U1VtgFm2SyBmEuTKr/ImVwNqYzjJweT1pbbUoUaaCL55IoQs3yFmRT1xkc4Cr09TVdrw3VpK0M4SS3OPLb5hMvOMAdCODz6UwYr2trFuQgMkykvGMbX6nJ546kdu3filhuEkkjZbRoo1TdgyLtIwBgHOTgdh+tQIgeO5kgIPDv5OCD13EHPK+ucYyBiq9jFfo5kjtzIsvyxKx4TaoLZ9M5HWsmawNVPs0x+0wSbeAjbRw3bj6H9alQXiyIwiE6SKEG9S21OgbjgDqeTzjpRYwttkv2jcKwHDtyM8HAH0IP0ptrcRvfxFJGDORH5CR8AE4CnJA7+vrSSVywmSwtb2ZvtY/cuF+bpuwcsQMtliBx0561Lqm8o6wS+ZKgVzsUMQSvOR6cfj7U7VBY2+qyyXUcs75Exh8oAKCMY3Ej9M9ai0+GdCBBYWduZGfDTSeYz/Lu5XoAC3c9c1VlqJs9yXnPFIlA4pejVIFPVrwafpVzdF1Ty1yGckKCTgZI6cmsrSvF4vJo7LULFre4Y7Umtz50Uh9iucfjXQtHHMGSSNJEbhlcZBH0rOg8N6Vaaml7bW4idOdij5Sf6UDNPYr3EW8Nt3D7oJIrj/AhRJ9TaSQg+eCMnAOc4Brq5PmfZwDsblu3HWuY8I2yyWmqxlFYfaAoPcHGMj8eauJPU62SNXILKcrzx1OO1LIuGRyhKn5vMHXtmlbJJ9c9641dS1aD4k3mnqpOmNHHKzk7gP3Q+XB6EkHpSTG0dpET5CF8Eou04GPmzWewfzRFsJXmUPnqccqav3P7tlVnKnqpHJb3quxVmMjoXj2kPsP45H4YoeoLQzru2juBayCIStFJuiZv+WbY/qBWuAQ67kXhdu7uRjoKpNkIR82cnnp34/pVocbtuD0AIHOSKaDoeXRxkWqFI1YAAYNNcZVScIwHbtW9HpccchRi2E4wB15pJbKEjasZAZipbHSsluU9jnVeO2yvmNwPMbAp7kykMB8uOBjjBHBrfhtf3/kmNBbrHtB2/MenrUQjjVo7MrKMR/KcYDZ9fetE7EtGRHbSyxvJ92NQSWbtxUttbC60uWdgmIVRmOOMkkdO/OKuXGmy3tskNqxcgEMFbaQexP4VVfUZ4Ua5F8tp5rYdmwoJGcfyNUpO5LQ1rO1jhMolZ1cbI324b/wCtyM0zUdOijS2fzVltpR5e0kdzkHAobxDdkYHiG3B7Y2dKjudek/5b+I7YoccMUOaam7EuK6GtHZm6s4JTBFJLGCr72AyFJHP6VIkSoBttA4YbhtkC7c9qTTZIn8PR3CTw3pLuwMSKFPJyoA78Go5kmI3WsRMW0h/O449eaq4WFnso5Ask1tH5iDIJbgnjvVPV7ySyhObVF3DIcybyM5xx+f5Vp3BgWNGMe/yUJI6c4B7fSuL1R3mmgdbcbpl3BQOTk8kmoqSkloKT0K010HgLSxxxzBd6OHw2OeDn8Oe1dFp0H2mCK6c/uigWKM4yEJBLcd2I/SmRaPb/AGGS4a33XAG4AsMNxgZHcdT9Kv28aDYojkyEIcSSjaemDg9D/jWNKlyybGcf8Smjt7PTQVlMjTMV3En5QOcZ78iuVS/jSBowoP76PyzsJEgPIyewHNb3xJuQl1p0CQplUeRcHIIIIIz2IwDj3riJr4z3Vq7xovlgY2KF+UduOtbS3IZ11heGCS0jaASfxZJ5KF8luffI49Kdeq8kZYFA4Zk/eP8Af6YIx7jp7VnpeRagIYZEw8AZSXXcqjdkYz04/nWte3sUFxMsRaK4UnKIGQxk9dp+nFKIFH7UHmkje0UJDlZHb78ZDE4A/unP0+Y1fFsb3QkubTajZYyKAflcHI5PUEHn6CuYi1S4tZJ7WW7nSM/6pFkOef8Aa7DnPvXUPMqeEWnSMSn7SkKrKuVAKPzjpnOBn3NFhpi+I5nsvHNzOU3yI6GKBThV/dr+QyOPoaZe3siW5VIBHuUsZAAc9hnPIOQfyqjqOtCa+RioiMkcUdwkYI89lC7S2O3yjgcde9a1vLAY54J5VcrIyDPyswxwzA9WOfoQKLgyjPBcJbgOJkmjZVmWJeWTPzDPXpk4FPGpIsrwZRLTbsaZY+GXJAbHuOT9atywGEyW9zGY4ni2yjI34wwZiR3rCa0R7Ke5UtFcpMyMiyfvCdoxwO23g/ShO4WuZsemF9Ksrh/EF7He3FhPqEcTRnylEbyoVMnmZDN5Jx8vJZR71ueH7iY6e0ksyNcIkMokd2Y7WGGXjnlSG/4DWJbeOZbTw3BpUUd6pjsJ7Fl+2/6NIsryMXaHZywEvB3dVU9sVa026eA6bf7EcxRRxrGTtV8YyrHryD+tVNFp2OjWeXUtVWOGK7C7W2BRu80gjJIHQjB69qm01511+GGREkRxhmGD5gPUA98gYNKkJhjkt7a4uJoI13zOsoZHbJAVl64GOPxPU0addSHWbeSC133dvJlNr4VkOOuegB/nUL4guaeo2K3WqCa2jkS13BEP3SsYUAld3sQDWPNDbrpsouZ5gWMod+Q3baR6E4NaurMX1a5FxG0SsonCQckF9oKgdjls/hWfqV2yYt/sEDAr5eHuGGVxxuweD1ob1sNI90PTJpw+btUY6YNPBqShs8hhtZ5QBmONnGenAJrC8JeKP+EntXc2bwFFDMT91yfTvWzdgvp90oOC0LgH0yprn/BlutnG1umNscKDp1OetLqB0U0KlZJRkyohbr2x0rB8DqpstSYnLG7II9a359wguSnUQv8AyrmPBMzW+l3LNEztJdSd8YwM/wBauIHWFmFwVyoRV645zXPpFjxiz7TuYqW57CAf/XroothlV9obcpG4HOMetYKIZPGhfOMSMTt6N+7H9O9NaAWL3WLbTNV06wywedPLXvtx0Jz69KsS3EFtp8kk6skEIaSVkXJ2gZY/lmuA8W6gT8QFjjDE20kUSBR/EDuIz9Sa7jVIftGiajEVZYpLeZXz23I3FQpPW5TSsh9nPYXdklxYTGaGUlg7cdwPzq7GA8+4DDEKSPT0P16Vn6PbRjSbJduQFwgPAA/Dj9KTV5p7QQGBcyzX8KyZfgBTu/ktWmnZol6GLqFxHas7OQ/zkLsY/NyM/wA6rJdw3UcWw4d+QrDHOM0l/cBtRmMYxNEzLukQ4bB/hH41RiuGhe1meSWeMMRsLHcGHsB05IrOxRtukinEWzzCM4l5HYHpURwjNudtigfLxxweRWZezNdTRS2q3UUhhLAhdoBDdDnpSvqfnnEMLiTGfnYemMj9au5LJHt7fUUWRbkgoC3llfv49a5b4mRJH8L7ZUHyjUI8D0H7+una/S5RvNYBXChSY/mVumdwOSM+/euf+Isfn/Da3RmA3aggJ7f8t/8ACqjuTI8Qt0VrgKQD7EVG42yuBjgkdKvrZCB9/mA47A0hsFcs3mAE89a2cWQme1eAPN/4QCyCMFw8pCpwf9Y3X2roBKJVLuxBOS2G4A4wB+NYHw9hz4ItDtBOZ1DliMDzG5rch3+U6x3JTf8AMGManB79uaztqU2jP1iSP7EFQOWZ9wKs3A9MZwayNJjW9vTv83CMCWycDp1/WtW4kRBJqDiRoUU+REVAYnGA3Hvmt+wvYbywhnXTvLW4+YEwgbj7kZPY1SaJaM+aNguPKiKJkg7VYgAe4rPl1S1islEdwVkVBtARQykAgdR14711xawkikiewjk3qVcLJgj17nFY0mkaIssbHTLdP7gJbkgdOuDxnrUsDhvF9rbXejMJxKLmPDQvk4DE5fIHBOGHbNcHNocwm22sv2lYwNmF2lskD8O/5V7drGn6Zf6dHaXUEMscUguRA0jZDMApzhgcEAd+1czqVhpNmtlPpmnQ26ebK8sFxK481IzGVIznkb247+tDiZyucPHDCsZd0EhcAF8njAIYf99D8q6e+02Y3mJYv34TO0zEjvnj1zUunRWsyRzrG6Sl925yCNpzk4I4JIzjsDjFakE+61llZxIwA3yg/eb8OoH4Vg6qpuzQk2zzrU7IvuKW4fy1bcufQYz9QefwqxpMcEds1nIonaRXWEoMhX6oceoP866WSwElotzIUFwxSTcrbg2eo2nrx+PvWEhjs9W8lvMS3ifz5GwWZmTHPb2xj9a1UlLYcXrYiGoi8t4Ea3RprIMiu0jKwXJPY/Ngng+9XXtLm6jjkjni+0v+7KhAUaJudx49xwcjrioYbGOy8YahbNbFlS4ZQz4ZWRzuQ88DC/nuq5cX9sLnY6hXjRoD1wqqAFHB9M1lUlbRDkyusUcWkiL7XIxLvDL5TgES4YFBxwpGcEdeKhu1t0uLdpIxHKilPncs+CWUbgMAdhx7etTWlpFdW8Tp9nBjJCKgwypxkDAzn3+taz2yLbx7ALq6VQztsO0x54TjnjjJ4PXmo9qkmzbCwVatGk3a73/r/gepRvtMNxEt3p2VkhjcSStjGRuwTj149vmq7ew28MGn2tpZxLeSMkisV5BKhTnH4ce1N1GY6nbXn2O0t7TdatBtQcOSAo5xwe574B5NaXheKzsEu77cY5Y3VWl+XO3nKrkEnkdzk9sdK0pz50dONwyw81FX1V7NWa1as/uv6NEN9ZtpN+kccUTpFFsS7QOruBj7wztPfnFM0eK3u9SjlKltxVF2Hksx4OevU9Kp3niiC/166ka/WGKNRHHHNKqqy5znB/Ac5PvSaQY7nUPtdoYZvJIZfKIYh8Z4x6YB/pVL4jkeq0N3xBNZ2N/fqnmYjZUkmHyvwBgAjHTgAnNcZeRLY2P2yYTOp3IIAArIxIIyAP7uPm9a0dd1S+lvtQnnffvuAQmdvUZG3jIGQBnj0qzpMqXNvFvmdhKg+0nd046E544HToaynOUXe1xt8p70B0pcYJFApRzIa0LIp+LWY/8ATNv5Vh+F/wDX3J/6Zr/Ot26/4859oz+7bp9KwfC+fNuM/wBxR+OaXkJGtqUqWtldSncQ0YDqDyRnnHvWB4KmQ6HK7DJ+0Ssgzg4+X/EVv6y88OnTyxwCbbGSo7hgR19q57wXDv0BJG2qRcSEsR2IXP0xiriG51nlkwyPG3lqcYj6lT9fyrmtOuLj/hOLy3kiCcyBCDkKvTP/AI6K6SF4GBTKsrZPDj5sevpUFvY2KXs+qKGhlnVd7bwQw9B6c0SWoI4iXTs+L9UvpRuDXX7nnvhcsK7TU7mK0068lk8wbYnJwMg/KT07965y6t531O8ML7Y/trFMtnPTpxwK3r+3a7sb6FCVmKMFcHq2DgAHGM8UVI3jZAnqGl3O7SoGjQrGpwMjHBI7dutO1BR5lqoDbDMCxKghjnA/SrFnai3gtbdXwE2h3JyTxzmor8g/Z9qYXzh869M+mKijBxiosc3rc5a8lj+33EryzhzJjaWBGemehK574qkZFeQv59wjk8LDEd6cHo38X4gVLqaI2pSsNnluxwplG0k9R14xiqk0iW90RHdOm4LujRSykYwDuHt7URG79BWc75WmluWDjYiywsDwR6Nkn8BSxlpJPMgtyFAwv7ra6jaQccnP5VT1K8kDmK1vH8x3GXll+Ve+Rx+HWpYokSKQ3sTwu0eElEnO7656VN7ysVbQsQr9nvQGnEfKvGjx4QkjnJwfyx1FYvjdzP8ADKzcMpVryNgCvqZvT61p2UxKyec8fmJjy/LkEuxh3PPH5d6zfGq5+Htso2sxnXCEY6O/PX3reG5nLY8klGB0QfTNaeiaQmrXM0Mlx5CxRGTKJvLHIHtisyUbQRsVSD1BrpPBBA1acvtUG3PzBv8AbXtWtRtJtGUFrY7bSLmbQ9Jg0qwDSRRlj5kq/N8zEn+dRyXeoySxNLKTCCd0WFXI9MgUlxI275HII67eSaTzSVxyeeeOlee5t6nWo2JrO7b7XdyEukYgbIYFuOAAOMCtzw1f6hFp/wBnt4Zz5OUZ/PVVUHkcEE55PSuNutQufLjG11iedEY7gd43DggVrWF7fW17JHbmQFm3N5cgU4CjkZFa0nqZ1EdW0FwY2uZdO5ByxRtzZ9TwuT+NQSKsioZNQS0TJJLW/wA/4AuVz+FU11aaWGWI6jqinDEGRA4U9f4RkfiKyn1aEymJL8zb1yV/h3Y57Eg59q61HU5+ayOk/sLQ7RRNfJE8ZAbzsSPK34Dj8BXnvjiKLT9LkutNup5liTajTHITe6g4V+QdoA/Diuz01r5LGH7RfXloinCBWeQsM9lSJz+tYvjwadJ4R1KWSJy5eES3DRSibb5qZwHRVzj3qXHUL3PO0n1/R7/RJbm8hlhv5IrjyxjaCdp2udowdjqTjPDjnPTq9S1WHTvE8sa7BaMVZEi5DMV7cdM+3U1zEfipNc1izjuIIkMeswz2SrbxqkcRO10kxgtwsIyc8Icmuh8T6LefbJrq2md0lXjEfyOAAQqbQTkEZ7fX1znTU0DtsbFpNbynyCwhYDZF8vV84J5PAH9Pfjn9dVkupnfdvKupzzn3HAwKqaeupRzRxPpV4lySWEki4OAy4LA4CjJ45PNdZPZDVNN3XsbPclSItnL7SOCen5e9c1KE6c7PYlqzuct4qu5LS+hlVtyXdrbzjHy4ZYhGeD3ymc1yk14+HTYFbOWIOd31/wA967658N3Wu2NlHfSSwTW0YRS8YaVlKjIODgDcMge5oj8AaPc2aQi4mguQuPNEedxB+9tJro5Fe4O1zk9KmulKfZ5lzJEUO2QAgHqMnp0963rHUEihEMiyRruVVGxj0zyemT15z3qtqngrV31XbYiG5U7IwI8RD5VC5bceCduT2yazdMLXOpw2bERzM3lKzyEKrA85J474zWNWnbVCaj0OoW2jFoYWUKjybVbBJbjDN2P6/nS6nZ3VzG0FhECmN8jLkhio4OMdg3b8quDw1rd3ZSJIifb3KrbRR3UUiy5ByCyuQvA+XOAScZzxV+BNU0pN8mxmswZB++VXjkIGcjncF2genPOKzpqcWmwTsee2Gmw3Gm6zeS6Zp9xdwXVnEi39y1qiK8cxbGZI8kmNOpJxnjrWz8OJJsqlpDCJWvJd2CcIMR4AbnI68frzUHihPEFl4k1RLPT7eK1u2gllhuLeGRWkjj27gJd2OXkwR1DemK6X4WWdxBD/AKXbKk0l60uflVQpC8/LwBkHgV3RszVvQ5LVL9bvxDrFtcDEouZng2SYGwyFyg9TnnBPXPTisqECJhcQSSJ5ocNH5ZJznlSM8jGTnHGaravCx1e9kkBRxcS4aIZy2498/wD163JVuGlZLgPawNbB/P8ALK7GPO7HU8EA46ZqWi9z6bB4pR96kxR3FZlEc5k+yTeVjzNp27mwAccZPpWbokE8M8n2gRCRolYmJiVPJ6ZANX7+aG206WWdnWLgOyKSVBIGcD61S0i9sbq9l+zSzSM8YYtJCyrgEjIJqWru47aF3UlJsJDGMuFB684yK5jwvclfDTIqsGEkjknowLbdv1710HiBpxotzDAnzyxFFYtjBJx+lcz4altP+EbUXHm5j+YAcFyWbpV390SV2QzeKF0e6CXLNBJF8jwMSQGbgZAHPXP51reF7ttXuHklO6O02qR0y5JPT6Gq2i+GbmWBpTfQwm4JeRBbq5P1LdTXUWNkdPUR/aGuTuyxZAmO2MDis1O5bgc499Z/2vNH9phRzdsWQuAR83pXWyxr5srr/CMlsZHWuThlB1tlksZZ0a5YiQRjhQTwT/nrW++4XW4Lg7vlU8cCtpSM0i7bgDnK43/fxwe9UrlVRrVWdNguF53deh6fjVuB0l85lWNgpAZXX5U655/CqOoW6mfSjNEB/pAwByMHBH19KE9BHC3Vuz3U5luZE+d93yjHB4IqMvLMI7S4gkhKkbJ4xyF4GTjtwD+FLPLclpJbebPJwFULuIJ3Dd2NVVXfvhltpIp1XzD8+5pBx8v0P9axVzYBDhZQjTv8p3okeFbB6E9s1KsqzKkCtJOblgEiYjqADjJxjpip0g+z+XcTwQKsgDvHLgSYydwyeBwPrVSeO0FmzxyLMUZleWRsYwDgkdOpXiqitLku97FlmgFpc74WSVo1CHaMg++O1c94kkWfw4kTylFjccsCw++fT61dvJra3YJmJJWwSkf8QJOB+GKetlb6nopjnkKRu331QNjBJ6GrjoRLc8kvIo0mO2UMCM5CkA/mK3fBcZbWLjYzf8erEgDtvT1+tdVL4E0e7lAfVbmIrnJit0OfzpdP8J6foTtfQXVxds48rZPCiqASDuyO/wAtXOV4tCjH3rk/2MqGLrgDhgGzj0qMSJKCpi3g/wC1jPepb2Kc2E5G3zPLzvDc9cD+lQQSwJPt+zKxZfkZcDp1Oa4HozouVL2C5WKCT7MBCl3CSysODuBNaFs6JrkKyyFIwDvkK5AHPX2wKr6u4NtHm1Cjz4hvVweTjt+VNllUTLOVySSxLc/Lhh/U1pF8rTIlqdit9YRQrKt8Bb52rHFbyMrD1I24x+Nc7ctDdTtb2QkneRzjyE27vbHrW3pWhxatpdndyaHaMkuTskZ2XaOjc8Z69a6S106e1iCxT28AUnAiU7VHpmu9TT1Rycr6nKaZ4avvs7XZWXBxtt5mCgc9SQc/hirr+GbO6XbqGixu7jLJiaQevZcGuhin8u6LXAWZwSGaQ7dox1x6elYut39nea7a2mqStHpBgdtiTFFnkBB2scgYAAI6c9z0rGpU5Vc68Jhfb1OS9tG9Fd6K+i0uzHvfCGh2tmmpRaVbRRIQxC2xDIQMd1DDnB9qS31beWS3CKBF5quOdnbOK3vDOooBqVrAn2nSVmCW4nk37fkG5Mk8opxj+ZrzPUbe78L6xe3EsCxLI4ECo4YCMklDx1AAINKFTmXMZ4vDOhVdO99vxSeq6PuujOzuZLTUVaEXR3hQzFc7m78f4VRj1O0VQ2nBpGBPKgjJBweTx1rntD8SyXWrXENzGXluHypBC4GB68cAGop7uZtQUMXYGcIJYXJBMRyRgdOGAJ/2arnuc7T2Z1c2ptJLG8pdftHywAnKkgnIJ7HaM88elRXFxcNqEaRKsZj+R23c889Bk9BVGa+afUGVXVkhLSAFScbj0A9hn8amW6jJe7eKIssmXaNAGKk4VuOuM965Hi0nZov2LLF1Osm9e5XOApBPPB/Ssi7h0KF4bu9SO1W5lRzcxjeVYHkhe+cnPsvtVbWmnsNW3W2oEpvWQp5ZwowMc9+5/GsS7u/OmhiuTILeCMSlCSplHOcD3z29K6FLmWhKpu56FDqUOpxPFZvFYSRQQzpDeIyHOcgocYwSMjnFW9Pvop9TeDUzK88LE3MrKGQhxhZD/tcrxzwPWuN0bxPFqDB0shbRQ28UV1LCAq7ugLevRjUmp3V81zeQxQMWu2QBdp2k4B4A642frWFSo4MuFNP4nYs65dWt/qFzLAzMrLGIGRCqjCjK4PPXI/Cui+G0rSJNC8hm2MDGPY+9cbEZZYcXUvl2qKr5kypVRnIGfr9MitfTdZkM9nNFhJbi3e6LDhyQ78se54x+NZ0sQ4pzkelmGHoQ5fYvv1UtNLO66vW66W6bGF43082WoPHF/pmree8kqpaF98TbmJLLwcYwehI57Vzup6jMrxTyW6m2IjARchVbBHy56fd6V7xo11NqD5hlAjcMdkT4ZWLqwzn7y9vxxXj3jDwvqFlJFd3Debaszwh1UrtZWJO5e33661UUo83Q83mtdH0fz0x2p68/lTSMLRG2AfpUmpJFkH5SQaUF/L+Zs01D8v1pc/LigDK8R3TWuisyLli6rx2Gef6V5ro98wUxdY4JFPDf3kB/rXofikhNGd97KRxgAENxn/2WvJtLu9uo31uQcgQyA+v7tRSnpC46a949a0u4he2U85Pqxq0LhElBXBbPAzmuQ0vW7eNfLn3pN/AI4gwP1rYh1BGu4LdonMkuSu2IbcA9zWCd7WOqOl7iaf8APeRF1CymVsDP8W4kCuldGnUSvNvZxsdvTpwB+dcVpb2puoJbqJ9/nEbsH5hk4zjrXYRrH5isi5tWBADA8Nn09MGupnIPgKJNNAXkAjRNm7o33v8AEVX1AGaSw2/wz7iob6HH6H86nCoJpVhJ2uqouWzgbT09On6VG0Sssb7CwUsxJ4x0AxTTCzOBvYLpZ55ElmSJ5S0iNbhlbnjthuQTWFNukupojdXRkdmMW5BsAH93sMkdvSu/vvDmm3e0CS5g2LtHlYwPoCKp3Ph6JYI4rW5kUKAuZi7nofRgP0qbFXZw0pnOtRTQXE3lRcSLI214mxjIqPVpLe11i20641AxRy2xkk5Zg24cKdvTGO9du3h2N50uLzUHdgBujigCgj61map4C0bUdWOoR3GoW07oIdilDHgDHdc9/WlFNFN6HGRxyudn9p6RIiHEaEYCA54GecYAzU7T6jZRh01yyii6kWR+4COnPGPX8K3h8PzZSefZal5t1GQ8cdzEAh4wwOKmm8Oaq1vsbSdClm3DEjTlBjvxnrVK5m0cp/b2tRgiDXZ2XgbhmQlvbb2pE1vU5Jtt1qd3PblSTHLGwUsO+TTtds59P1WG22wWRWFH22c5kTO5xnknkgCswxTYl/0yTnJJIHJrOdaKvFoqNPqad5fw26CP926DkOqZYnPqPrTYLpprl/3auPL+QOe3rVC2vbiFSkcqNtG4B4wealF/cu/7yO2ZSBlcEf1rFzjo2acrJ7uZZLWEgZf7ZGmSeh3AZHtVjUFlEQiI2siMuAeMg0ye78+RHFhZQ7V4Makc+vXrVmZ8XihgDwc56jIqm01dEtNM1/DV1bI0lr9jj+0s7PHII8ll9C3bkV0yN5qlg2NvB3kkj1/CuY8J3M6+IUit777F56GNnMauGwcgENx1Jr0d7x4Ld+twmD5piiVWb1BxwfpW9OTcTKS1M6KZztjzuZj91MnH41HeW5vIDbXIVUmDAFot5HoSD6HmrweyS3WSLzzGT9xmAI/PqKiHnArcymOHBzGXf5l9jjr+NaWutRJtO6Of0xNShhWyls764li+VWs4yYnUdCMdPoelM1PSb/V7Uh7C5twylVLKF3egIPbqfxroBr012wjWRCqk75EQ7V/PvUnmWhXPmEqRuYmPJ/xosJtvc8V1vw5d6VfyQ6mM71DxRDoq5PI/Ksy0luLcGCOR0iZ8AMchWBBJUepwPyr17xR4dl1WCC/mmc2sAYIkUKofUZOM4z2z61ycPhXSBsc28jSZJXfK2P0NctSsqbsyG11MN9YiBj+yJBIwi2owJDZznJHTNbFnpj6gwMlzLEJk8vzI9ik/eyTx3zjA5qxB4c0yGYNFbonp87f1NJc2BjuhPFcBcA7VZzt3Ejn9K46tZSs0EZobqcsyQlNih1kSNpmUBtrDAI/EZP1p4MLeXI6m4uPJIDIN20bsEDvgDB/4Eaq6nrSfZ4YYwLiaKNjgjiL5uMe/+NKb/YUcNE2QoVeoYsqkoO+c9qalK10dMdrkdvaPaxBbWS408yO5WKLCxyKAFIK9M9CfrUVxd3B8QC0djcvGgMmw9cKMEt6A8fgavSpJdWEEy2e4xgTbUl+UErgsemMYyR7Vj29jdW15dTSQwTWsrM0bCXemc4AJ9PmPWqvzRbZLa2NGU3MU77l3wxlVy/LOx6nHsc/lV63itri+e8vQU8qM2/lBjulA+edsdgM9O+41i30ot7m21KyQxpI5jBwCCMj5l9OePfGa0mkh1C8v3iluEEJEK4IC4YMMjvkHHNTSvBNvqZNWY6Ca9TVAtlaxzWzxkJIwAIDHcpKnpgYOeua1pluNSgjlV7fegbfI0hJbBwCfp0yOvesm3ijW4VzJJviVI3d++OTmobWG5S4is4WzGrFSw4DKMHbz0yCee5qqbTg0thqOl2e3Fj0NA4PFNHT3pdw556V3GiQ5Tj8KUN7cVHu6YU/nVK41WG3X/XB2zjZENxz7gZxSKsZHjq6EGiLuJ5d/lQZJHluc/hXk9mZV8YXkUX7xBGvAHJxGGOB9BXssrz30W/8As+IINx/02TYePQDOc+nFcedCuLvxHBq2j7LPVEyHkuoG8ll27cHHfBxV8vNGzEvddyhFeKrxyKzpkjlRmuz0OOWWVXBm2qM5YBR1rEsPBWp20Ua3Ooaaxj7xysc/htrsLCFLO28p2Ekmclk5GK5adNqR0SmnHQsQW1naGJ40kj8vGNrk5qWW5WWQPlgfeqr3ARfkibI4GRUQWZ13tGVH0Gf1rqOctm6JYgOoA9sUx5WPAO4HoM56VGI3k2gQKoH8WetTBjGdowXA5zgf0p8ouYrlXbgjbn+H1qE2hfOI1AHHXGKvlmYjMQbBzuU9PzxTHYIvyIWycnLYp8pPOyh9ifqpcMP4scUi2ki5yVbPHzEjNTy3U9uhYWjH1HmDp7VyvivxVqOkmzktFaFJgwZHRc5GOQ3OeD7USXKrsabbsbV/YXUmmXZRvs7+S7LKhClSASCM59K8jfUdUljQyzxXSnacMgzzWxeeJl1hHXWZ72JdowIV3hgfYFapW2neG7hgYNemthjOJLbGP/HjXPOSlrFmsVbcqQ3cSSOJ9GgdgCc7yvH4VK9x4cmgdZdDuIpiMG4FyXC++0YrT/4Q28uFMuneJbCcEdJWCH29aoz+C/EtmplEUNyH4LW77v6YrO9Qd0Qx2PhiYgf23eQPjORacf8AodXIPDnhy6YbPF/lnoBNadf/AB6sObTNVtyxn0i8CkY4t2I/MCsyUIExJAY2HBDKQaOZ31iLTud02g+G1YBvGJkK8YW36/SqrR+dcoUztYEnd9K4lQCzbHdQAehruZX/ANOyqbVUdc9RiqbT6E28yHSriC2v7eW+iMtuj4ZR055B/rXqUc1vYosQCpGuVWIKT+GK8hYq0QVsBnYcHuAvT9a9C03U9ZvLGO6OlRrEV6rcgk8f3NvH/fVaUGtSJo3JxBfBWnt45D23KBj8qrNbR8Qxs8aP0BbcF/76zViJ0ktUlmLxyt1Qr0pWMD4jEhLDnjt75rqujPUpQQXkZSI3Fs0IyfLC4O3PcDj8gKtjUYlQOsUkY3AEq4CsvfPelnhIRJDJGv8AfZo9xK56Ahhj9azb6yiW3MMUyW77xtuFiJZc9sEmpA2pWWS2zIVeFgW2g8bTwe/pmvM9R1Sy03U7izla4iMbkBfLzkHkY9sYrp9PvbXTf3Ekk148o2eYlsyIPXgk46+v+FSapbWerz/aZLW4J27AYYyWwOBnOKxr0VUV7ETV9jipfEemc4S+cnAGIcA8Z9fpT49SbUcxWunIHKuwE8wUnAyexpJ4zHdvazRPGkWQu/ILY56Z447ZqGW3gtWGpK6Bbdzu2v8AMoCrkY7ghx+RrzFJOXI0RTj73vFW9dobAahb3KrcWzlsLCp5yMsCTg9c9PwohNvei91W4kklKlHCxsE2u3JYDtyo9RyKqPcw/aLiRrBJ7UKoeEKQFyAByPutwfxrEkxNeRWFtPJDG0QSXcuGfaxwMH/ZI4OBnmuilC8WjrdrWR0mrSwvZW9nYRSB7mbbFcSZVVQjBUgDA4OO+Qc1hRXVxHvW2OCU2smwAYBIx6dT1rQjlng0s2txMzW/leWVDEOXVd2Dk5CjI5HvWNDcCYyJgPbwKQEEnVd33d2Mnr6dKvlTVkTNK1zoLfUnluIfNhjfy2jLjAjTMZyN3Ufd3ADoSRT7nV2thKWjZftcJktxGMhFzxkHocqPyrIuXln0mVx5dtZPcxx+RENwGFJ57nn1NNijvtRmhmVZpIEgCsxHABJ+UHHP0znrzRyJxuQrNXZ0dvdR3Q+yxiT5MI6gMQ7nliDzyRj8a1Y0mjljLhniRPLidi2UwxO0jJ4x659q5WyFyPns7hg6MWIJKkknDLtyMngnkjGOldftKQPbS5Vzh1XqpIHTNclSPI9Bz0Vj0aTXLKM7FnWR+PliBkbnp8qgn9KDcX9wwWCw8tGB/fXEgQA/7v3v0rQgsorFGW1higHBGxQD+dIZGV1ZkL7jkZ7gd69VQ7mvP2KK6ceRqV80wbqEykaj0x1P51agWG1Ro7GCOKNkK+eQQ2e2F6n8SKmHlCQyON7E/dPRaWXaRuUgNn+I44+tO6QtXuRR20ETGTyfNlP3ndsnP8qSWeRxtSNyS2Bv6Uo+0EAxzfIfRwKhd3kk8hnG70z0/GkVoK8cjDc2B7cY/OnwwvnYGByOisuc1H9jddoMhPPHOass8VqhVSgcryx4xQkDKsslzbuFkbDdQu4EmpA0z7Wu3I/upwSR+HSkhtRjzp2JPUMTz9aWR2LAo8qsx+UH5i+O3sKtIzbuLHJuYZ2xhe4Jxz9Rz+FSSqGlHI2AZ3HjFITHGpEoG5vvfMCDSG3Z0zGvlvjscLTJCafYp2TQBF4Jc4xWcJruQtiVF44KfNn8gav5LOUnQu4OcBc5/Kk3PKfkIVV6gttoAyJ9QvbaB5XtUulQZZnL4X3IC5x6kA4rlNV0y98Z3UMqavo0EUe7y44JGYnI75wfyFdVr2l/2tYyWjXMlrJgtHLAwGOOhOeh6V4l82nXbWjOY3QkAofw/pWdVu2hdO19TrLrwh4isWZ0t47xONjQODnHscH9K5i8hurRVW+0+4t3xgmSIqCfxFa9n4k1rTGUW9880IUExSnKkVup8QYVhEeraYrhgDmP5wfwNca9m9DdtrY8/wDkO7DlDjscVftte1rTYwLHVZ4gy9Aelddc33gTVUYR2TRyHq9uNhz+PWuW1HTtLRj/AGfPcEdxNEB/ImrVGad4sjnXUH8f+JpQBPqdw6j5cBwPz4qjPrC3zlr0u0p/vjr+VUZLCRB8ocpnOSMUFXHVG/KqbnHcn3WXlSyflPLUkc/NXQrIZRC8YyGiBGfT0/ImuZZUaJtqLu28HHQ1vW74axC7seUMY+pH8sfnU3b3LaSQ11Iu7eZ8CESsenTt/wDWrsfBd6FtJrKVzs81pFlLgAbjwME59enpXNTKPsbhwPkckg/XmtLwjqOkadrSXmsS+VZeS6KrRs6vLkBRgAnoXP4U4uzIex3rKwJKMB7g5phwmJIeeMcoT+orXa60pFYeWFUYIk24FZ94dP8AKVSk6K43KrcKx9R/ntXSrmZOpY28oY2io2PlkcMxBHZQc/nz7VSntCs0bq6mFRlhvUY4PJBOeKz31SK3uBDLFOcIBvSE7R0wd3f8M1SuvEyW94fJ077ZHAA8kvmBc5yO/wCHWr30JLb3+o2N2YYdOe4tHQkTR/Odw5A2gdx3qb/hJIfN+zpbaj9q/ije0lAT0ywUjHHUEiqF/earMpvWsoIbZ48Kr3Cqygj5TkHORnpjtWFdzzW9rIRcQSRztta4ZizseMkdwOuOKtRJ5i54j26ntmjktYJmbY6q7MZDjjgqMHp3Fcx/ZgEV/ZOHcOnDKASjYO7OD/u9etdSmnK1l9reKW6A+eIS3apGcHGQwyAfqa5261RJLl30eGW2l8thJHE/mrMeec9+PSuHFUPtw3EldkX2ZJ0li2OGuI8MBz0A5IHUjArloZ5I7y5mkull8xTJukjOcZ9gcHg9SKvzajjTJ8XsEdwQJI2UkvuBIKAgcHFc7NBLcTQJCzvK6nzFjXcWPUYA5NY4eMteY1uoosXV/cTXsouZCGMJj8wsCCdh6YHrj8+tU4/M8rzkAM5y7BR91Rxk44xWtZ22purQLa7QIjES7AOpHIODznPFbemeBNe1ZUuI7PyUEOxpXddkjbiTnn3HT0rpUbIhyuYjjdpkpaMF2mQqUdW4VOhAPTBOeMirOiyyXPnvCWgSNt8MSvkJ8wOffGf511Vl8Mb+yna61PUraBgTiOGPzQw27TnOO2atW/w/sbeaMpq1zEmDgQWy9fVju61LpycbITTZmeTbvMl7GvkmSWSRYpDhWcgBWGcEg5znoM1d+3LLZo0UobaWA8xl3DH48gdM10sfh22h06O2ub2W58v5o5JIF3oM54wazv8AhCdNM3nvc3Mgkj2qAoUoPYZ5zXPPDTk9Ru7ep6arqQoRQzDOdw4pqr5QOxVGfUUiSh4ldcjcOlNCse+fau9s6IxsD5PPy/nUGSBltrH0zn9KfIrDGTiqEkskMjfvGUjtjrUjdjQMgEY3RjGO4pkEcM42rCpPViVwBVSCWa4b5mwgPJNXjK6qUjXBx0oBsZcSRWcOxSrN6AcCo7UfaNzvkRg8AITuqOKzaSUPICyk/MR0+laBaOHCeUAMdN2MCrSMmxkqxspHllQx2szKRipVuAQVjA2EEFyMbe3GetRIHdSUdmBPLGU7QO1OjCN9/ZOwPLkgkfnVEku0CDCKzKBjLMQP1qOMxCDDBmI6kHKqfqKXjdvKH/eRsn9eaY0u9mRASwPG9iKAJz5bgMJYyAOAPmFMZ5ORsCjHG1f8aYZHzskkfzNuQCwGR7GooV8yF8ySZDYfPP4c9aYDkBhDMzlifvHb0HpxXnPjfQ/7YEupWqf6XGCSoAHmqPb+8BXo08ymIWyb1VxhgEx8vr9a4rxLq+n6RbCO6W/TzTlGgVhtIPBDDoelKVrDR5vaaXq0pbyrO5cFcDbEx4xTb4NHB5UqMsirjYw5qw3jrVJsR311c7IyQsiytuKk8Zx3qaTUzqeG+1mbbwFlbJ/WuR0oyZrzSSOVkjR5GIGCE6rxTre4vIYw8U7EY+63StuaxaQvuSME8AgVnSWbRjYgJx75ocJRWhPNfcmjvLzyWlkjLnHAD8VD/aavjzN656/KeKkSVktvLKMCM5NVElSSTAbGeTkURc3uaWSLf2mwY4E5B6c8VvWkymztpkUsfJYLj/e/+tXMSRRshKqhb6V0OlL5Fvaop4MXA9OppWFLYvO5dJ9rBg8ewL6tzz+lRKPsrQagw3fZp2fagznBH/6qEBht0nIPys3QdetXVw9hCRwSwxxxyCf50dSTvkuTqFml1E0YSYBlIbJwf60nlQwwyMsjs+xkJ6Hp2/z3rS8POlxodjdyJEZZIQzsi4G7p07YxVy6trFzungtz2JdFP8AOupbGTepzKWsd8Ga5KGN1DLG65CD8elTGxtlQArAkRP3do2sv0FXo7fTrOVpbSDaNoxGsjBM9+M1DdXMat5zW8W+MbgIyy8/X157dadtQKD2unRGHCQI6/NGokZMf3flH44x7U3VdAt7mBR5htCTvZYlz5h/2m6nrUMk0l7I8s4k/ekFXaRtwzz/AMB/pWnaTKsai4BeRUz5jjLyD/a96tSJsYg8G6cbhbi7AuEjQpCpYArx1IBq/DoNpFL9sgXYoI/d9TIR0J/PFaa3cE07yRFCMgbduCn0FNN3DE64CCQZ3SMMnnv/AEx7U7oLFS6sbC3tLgyaci2SRszCGPdgAbug/izUWj2miwWY+yLA6xja0qjLMfRiec+1aiRSyHYEMYIyXJ+b1zjtULuPPwrySOOjliMj39KzaVyrCQ6fpTqTLpcDqMN8tvnDd+lSJBYW6rJDbeUG4ASPbtPuKYl3MymSS7KA92kyRg44B+lW4o4ljV4nlmbGQW9+9AWRUe3FyonCcKerNgfQZ7VUu7VvscojZQ7D5Q77VJ7CrkstyCyPCjKxGSzfN+tVvtK+eFSNiwOCRgjOfWkwRWgSOMxtdSOtwcblDZAxxwe9WWii2FUmBjzt2yNuyf8AP6U5ke5JScMDu25XjA9amex0e3JkuWLNnOV+ft/OmBqfaJDhfLUL0HNRSTFQcsAfpVrIX76rj2XNJPIkY+ZBk9AFFQb3MprhjuIwfwohAmcs6KUHVgK0EtxImSq7SOhVef0qvcOsAWNSWbHChRgfXFAh8lwixYhzjpgjFNt4/POZp2SLbk4PJ7YqukE00nmFXEY6qBkn86njR2QiOTYi8FHGDirSIci+0gH7uN5ACSEVeCcc9RTII1SP94WWRh8xwD/9eoLMEO7NG8hPAwNuPXvzUpuIYRuMEqvnaAe5+uTTsQTRY5ddrRjoXBB/LNSSXDR7XcYjJ2htuTmqslxbwN5jXdr5pOAp5wfpkUXDXckBbYkqdck7R/I5oAm8gKTsQknnkA0nzOqxzzBWJ+4qgZx7/wCFZa65pxkEE1vcJcAcKkW4N9Dxn8alubjDRJ5rW6OcAyxKxwOvAH4d6Yia8kthItv5AErfMWAz+R9aVJGUbRCRGgyWaTBP4VFsjeaMQTeYMEPMqZ289MdqfekJCoiyr9A0i9vwIoYytNc2ZyZBIMjHAJIrk/GV4lvp00EMuGuf3YUr0HckduK2ZxFDuuZNjbMs7byv5DNcD4gvIbzWFkjkyFixtZTweeSe4pWuNs5G9j+fagdkA57nNVpkOVJTay/xKecVum5k8wB7kICckrEBj9apNZ22fmvd7LzgA1E6SewKTQyDVbuBzDsjuIjyN+d1INcCqRJA6nsBmopViDbopec8ArTTKfnVo2AI4bbWS51oaJokbW7eVcEsremKjS8jmk4m47kjnFRzGIxnC4I/2aqLbxOBuVQfequFzaD24xhlY+prY0xkaJGDAhcoMdua482cakYPfoDXTaEmzTQgb5VXOR1ySef5VnLYeht3ccbxi2V8dTj8D/hTTKVlW37IQ4/l/Sq5kFxLEGHVtjY9cHNShA17IWONkQwPxrJu6C1js/BD2kdpdQuwSZSsm5nKqykY6Z55rojDpTEuYkYucnaSTmvK7eWC0v7S4uIy9vDIcwr/ABfKB1/Wu8s/F+myLumjktixwo4PIz9K6qLvHUzkjYa5s7WNzChSVlIXJIz+tQJJdKC2wFCc4YkfN6/Lg+tUJfE+kvC5leScBSRiINgd8A9D3qrea7Hb2JutMUzeXGJMPIRsUkDJXuOTyDwQa1uSX5Yb1LlJ1eGWIkmTeSrpnup+vHOake5WCyc39jcGFT5m62xI2R2+nNc0PHunNcN9smuF3/KUihBVT6k5HFQax4zttJSO5iSO4ilbC7ZiTKvcDjgjINCaYWOyS5sJrNPs1pe7pBlCYz075yeKq6fJ58SuCqNH8pVuMH3rCtfihppPki1kLFcRpES25j6selX08R/aH+0PYJHMyFdv2gPg59cY4z6d6Ta6AkzclF1MwzJGqAgN6mkNgWQYmZDnkhAcfnmvP9X8bXlhqTvYoI16SxO4m5PO5CfunjpyKnsvEGpahbm6N9c8suEwqjPcHbjOfTHekpIqzO6eGOWFw4DgttyQPmPp/OqkTPCiSuxRYyVYA5UDHZev41xHibUAdP32wKTGQOksczIFxySAMg5A/r1rkLG81BJnvrS/uIbkLnf5hy2T0Oc0pTsHLc91SSKe1jlhnR0OG8yNuD/k1QaaxubmVTdRPKjYkTzsYxzjrXm+keKDa20tvqUDSIW3b4lUEZ5I2gY688Ad653VGFzq1xeWwZUnPmKHTLEjqD6ZGOe1JTTE42PUL7X9Gsrl4bqeKOBoRNGqqXOd2Dkk1DdeKNHstOtb9FupraZ9qMo2uDznKgfKOK81lhjaDHlPFnEkbTSeY6HnA+lSWPizWrDfcR3l2skuFdjGrhseoIIxim5BY96aeaHJDx47DNTI5lQmRhkD7vpWaGjbqoPrk/1oWaRmCQbmA/hC7h+dBoy+kYbgsMLySxwae0afMQyRx9CByT9ahijcqPtMUkzt/CAoH8800QKZi/2SXf8A3Y3XC++ScVSREpXLccsjLtDeWo+6dhz+VVrm7htFUz3fHXJUZP51HLIYSENjNvbkFpA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"path": "images/5pts_ADE_train_00006425.jpg"
} |
depth_point_113 | images/3pts_ADE_train_00016256.jpg | ADE_train_00016256.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 295 y = 98),Point B is located at (x = 10 y = 210),Point C is located at (x = 215 y = 174).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_16><DEPTH_64><DEPTH_25><DEPTH_72><DEPTH_66><DEPTH_81><DEPTH_81><DEPTH_32><DEPTH_54><DEPTH_30><DEPTH_24><DEPTH_63><DEPTH_63><DEPTH_15><DEPTH_44><DEPTH_74><DEPTH_60><DEPTH_58><DEPTH_50><DEPTH_41><DEPTH_24><DEPTH_82><DEPTH_33><DEPTH_84><DEPTH_50><DEPTH_50><DEPTH_66><DEPTH_25><DEPTH_45><DEPTH_72><DEPTH_32><DEPTH_35><DEPTH_44><DEPTH_22><DEPTH_20><DEPTH_31><DEPTH_74><DEPTH_63><DEPTH_45><DEPTH_58><DEPTH_23><DEPTH_35><DEPTH_78><DEPTH_63><DEPTH_67><DEPTH_22><DEPTH_81><DEPTH_63><DEPTH_19><DEPTH_58><DEPTH_24><DEPTH_3><DEPTH_25><DEPTH_30><DEPTH_59><DEPTH_35><DEPTH_81><DEPTH_44><DEPTH_19><DEPTH_58><DEPTH_32><DEPTH_31><DEPTH_63><DEPTH_39><DEPTH_9><DEPTH_9><DEPTH_2><DEPTH_25><DEPTH_45><DEPTH_58><DEPTH_46><DEPTH_59><DEPTH_85><DEPTH_66><DEPTH_58><DEPTH_64><DEPTH_74><DEPTH_29><DEPTH_15><DEPTH_69><DEPTH_71><DEPTH_64><DEPTH_58><DEPTH_74><DEPTH_36><DEPTH_36><DEPTH_72><DEPTH_64><DEPTH_58><DEPTH_25><DEPTH_121><DEPTH_57><DEPTH_16><DEPTH_94><DEPTH_16><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 3 | [
"C",
"A",
"B"
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",
"path": "images/3pts_ADE_train_00016256.jpg"
} |
depth_point_114 | images/3pts_ADE_train_00006726.jpg | ADE_train_00006726.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 166 y = 221),Point B is located at (x = 71 y = 119),Point C is located at (x = 285 y = 101).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_64><DEPTH_19><DEPTH_45><DEPTH_41><DEPTH_74><DEPTH_45><DEPTH_38><DEPTH_64><DEPTH_29><DEPTH_35><DEPTH_45><DEPTH_11><DEPTH_40><DEPTH_69><DEPTH_58><DEPTH_19><DEPTH_58><DEPTH_15><DEPTH_74><DEPTH_20><DEPTH_98><DEPTH_42><DEPTH_2><DEPTH_61><DEPTH_81><DEPTH_36><DEPTH_49><DEPTH_15><DEPTH_29><DEPTH_75><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_55><DEPTH_41><DEPTH_25><DEPTH_44><DEPTH_25><DEPTH_38><DEPTH_35><DEPTH_57><DEPTH_9><DEPTH_33><DEPTH_66><DEPTH_2><DEPTH_2><DEPTH_78><DEPTH_3><DEPTH_74><DEPTH_20><DEPTH_57><DEPTH_27><DEPTH_78><DEPTH_41><DEPTH_44><DEPTH_25><DEPTH_58><DEPTH_11><DEPTH_66><DEPTH_60><DEPTH_121><DEPTH_94><DEPTH_16><DEPTH_33><DEPTH_0><DEPTH_2><DEPTH_64><DEPTH_36><DEPTH_81><DEPTH_78><DEPTH_16><DEPTH_1><DEPTH_1><DEPTH_2><DEPTH_25><DEPTH_36><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_29><DEPTH_23><DEPTH_0><DEPTH_66><DEPTH_78><DEPTH_36><DEPTH_58><DEPTH_25><DEPTH_25><DEPTH_44><DEPTH_44><DEPTH_94><DEPTH_39><DEPTH_14><DEPTH_94><DEPTH_16><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_57><DEPTH_94><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 3 | [
"C",
"A",
"B"
] | <DEPTH_START><DEPTH_64><DEPTH_19><DEPTH_45><DEPTH_41><DEPTH_74><DEPTH_45><DEPTH_38><DEPTH_64><DEPTH_29><DEPTH_35><DEPTH_45><DEPTH_11><DEPTH_40><DEPTH_69><DEPTH_58><DEPTH_19><DEPTH_58><DEPTH_15><DEPTH_74><DEPTH_20><DEPTH_98><DEPTH_42><DEPTH_2><DEPTH_61><DEPTH_81><DEPTH_36><DEPTH_49><DEPTH_15><DEPTH_29><DEPTH_75><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_55><DEPTH_41><DEPTH_25><DEPTH_44><DEPTH_25><DEPTH_38><DEPTH_35><DEPTH_57><DEPTH_9><DEPTH_33><DEPTH_66><DEPTH_2><DEPTH_2><DEPTH_78><DEPTH_3><DEPTH_74><DEPTH_20><DEPTH_57><DEPTH_27><DEPTH_78><DEPTH_41><DEPTH_44><DEPTH_25><DEPTH_58><DEPTH_11><DEPTH_66><DEPTH_60><DEPTH_121><DEPTH_94><DEPTH_16><DEPTH_33><DEPTH_0><DEPTH_2><DEPTH_64><DEPTH_36><DEPTH_81><DEPTH_78><DEPTH_16><DEPTH_1><DEPTH_1><DEPTH_2><DEPTH_25><DEPTH_36><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_29><DEPTH_23><DEPTH_0><DEPTH_66><DEPTH_78><DEPTH_36><DEPTH_58><DEPTH_25><DEPTH_25><DEPTH_44><DEPTH_44><DEPTH_94><DEPTH_39><DEPTH_14><DEPTH_94><DEPTH_16><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_57><DEPTH_94><DEPTH_END> | 166 | 221 | 71 | 119 | 285 | 101 | null | null | null | null | 125 | 174 | 45 | null | null | {
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",
"path": "images/3pts_ADE_train_00006726.jpg"
} |
depth_point_115 | images/5pts_ADE_train_00002423.jpg | ADE_train_00002423.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 153 y = 107),Point B is located at (x = 55 y = 212),Point C is located at (x = 170 y = 223),Point D is located at (x = 275 y = 107),Point E is located at (x = 158 y = 135).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_25><DEPTH_19><DEPTH_66><DEPTH_66><DEPTH_39><DEPTH_78><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_29><DEPTH_45><DEPTH_1><DEPTH_62><DEPTH_6><DEPTH_67><DEPTH_1><DEPTH_63><DEPTH_36><DEPTH_36><DEPTH_29><DEPTH_63><DEPTH_19><DEPTH_84><DEPTH_6><DEPTH_74><DEPTH_33><DEPTH_76><DEPTH_64><DEPTH_36><DEPTH_29><DEPTH_25><DEPTH_45><DEPTH_28><DEPTH_34><DEPTH_28><DEPTH_24><DEPTH_85><DEPTH_44><DEPTH_36><DEPTH_29><DEPTH_58><DEPTH_68><DEPTH_62><DEPTH_78><DEPTH_12><DEPTH_82><DEPTH_44><DEPTH_64><DEPTH_36><DEPTH_29><DEPTH_58><DEPTH_36><DEPTH_85><DEPTH_46><DEPTH_12><DEPTH_40><DEPTH_72><DEPTH_64><DEPTH_36><DEPTH_29><DEPTH_61><DEPTH_57><DEPTH_10><DEPTH_94><DEPTH_23><DEPTH_32><DEPTH_53><DEPTH_64><DEPTH_64><DEPTH_29><DEPTH_9><DEPTH_2><DEPTH_68><DEPTH_42><DEPTH_57><DEPTH_121><DEPTH_63><DEPTH_58><DEPTH_36><DEPTH_15><DEPTH_41><DEPTH_76><DEPTH_85><DEPTH_119><DEPTH_94><DEPTH_121><DEPTH_69><DEPTH_69><DEPTH_49><DEPTH_15><DEPTH_76><DEPTH_73><DEPTH_0><DEPTH_98><DEPTH_94><DEPTH_98><DEPTH_54><DEPTH_70><DEPTH_70><DEPTH_3><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 5 | [
"A",
"E",
"D",
"B",
"C"
] | <DEPTH_START><DEPTH_25><DEPTH_19><DEPTH_66><DEPTH_66><DEPTH_39><DEPTH_78><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_29><DEPTH_45><DEPTH_1><DEPTH_62><DEPTH_6><DEPTH_67><DEPTH_1><DEPTH_63><DEPTH_36><DEPTH_36><DEPTH_29><DEPTH_63><DEPTH_19><DEPTH_84><DEPTH_6><DEPTH_74><DEPTH_33><DEPTH_76><DEPTH_64><DEPTH_36><DEPTH_29><DEPTH_25><DEPTH_45><DEPTH_28><DEPTH_34><DEPTH_28><DEPTH_24><DEPTH_85><DEPTH_44><DEPTH_36><DEPTH_29><DEPTH_58><DEPTH_68><DEPTH_62><DEPTH_78><DEPTH_12><DEPTH_82><DEPTH_44><DEPTH_64><DEPTH_36><DEPTH_29><DEPTH_58><DEPTH_36><DEPTH_85><DEPTH_46><DEPTH_12><DEPTH_40><DEPTH_72><DEPTH_64><DEPTH_36><DEPTH_29><DEPTH_61><DEPTH_57><DEPTH_10><DEPTH_94><DEPTH_23><DEPTH_32><DEPTH_53><DEPTH_64><DEPTH_64><DEPTH_29><DEPTH_9><DEPTH_2><DEPTH_68><DEPTH_42><DEPTH_57><DEPTH_121><DEPTH_63><DEPTH_58><DEPTH_36><DEPTH_15><DEPTH_41><DEPTH_76><DEPTH_85><DEPTH_119><DEPTH_94><DEPTH_121><DEPTH_69><DEPTH_69><DEPTH_49><DEPTH_15><DEPTH_76><DEPTH_73><DEPTH_0><DEPTH_98><DEPTH_94><DEPTH_98><DEPTH_54><DEPTH_70><DEPTH_70><DEPTH_3><DEPTH_END> | 153 | 107 | 55 | 212 | 170 | 223 | 275 | 107 | 158 | 135 | 8 | 160 | 198 | 70 | 39 | {
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"path": "images/5pts_ADE_train_00002423.jpg"
} |
depth_point_116 | images/5pts_ADE_train_00004032.jpg | ADE_train_00004032.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 134 y = 211),Point B is located at (x = 267 y = 161),Point C is located at (x = 283 y = 200),Point D is located at (x = 319 y = 174),Point E is located at (x = 192 y = 138).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_44><DEPTH_44><DEPTH_64><DEPTH_74><DEPTH_74><DEPTH_58><DEPTH_25><DEPTH_19><DEPTH_41><DEPTH_1><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_29><DEPTH_49><DEPTH_64><DEPTH_58><DEPTH_78><DEPTH_41><DEPTH_0><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_29><DEPTH_49><DEPTH_76><DEPTH_45><DEPTH_33><DEPTH_71><DEPTH_33><DEPTH_64><DEPTH_36><DEPTH_74><DEPTH_29><DEPTH_29><DEPTH_58><DEPTH_85><DEPTH_67><DEPTH_6><DEPTH_72><DEPTH_36><DEPTH_29><DEPTH_29><DEPTH_31><DEPTH_31><DEPTH_44><DEPTH_43><DEPTH_75><DEPTH_6><DEPTH_81><DEPTH_74><DEPTH_64><DEPTH_36><DEPTH_49><DEPTH_67><DEPTH_59><DEPTH_19><DEPTH_66><DEPTH_2><DEPTH_77><DEPTH_36><DEPTH_44><DEPTH_36><DEPTH_78><DEPTH_33><DEPTH_76><DEPTH_29><DEPTH_77><DEPTH_18><DEPTH_119><DEPTH_63><DEPTH_1><DEPTH_57><DEPTH_1><DEPTH_0><DEPTH_57><DEPTH_73><DEPTH_82><DEPTH_39><DEPTH_65><DEPTH_11><DEPTH_1><DEPTH_16><DEPTH_1><DEPTH_25><DEPTH_74><DEPTH_69><DEPTH_60><DEPTH_98><DEPTH_119><DEPTH_64><DEPTH_36><DEPTH_1><DEPTH_64><DEPTH_36><DEPTH_76><DEPTH_45><DEPTH_58><DEPTH_78><DEPTH_78><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 5 | [
"B",
"E",
"A",
"D",
"C"
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",
"path": "images/5pts_ADE_train_00004032.jpg"
} |
depth_point_117 | images/3pts_ADE_train_00008362.jpg | ADE_train_00008362.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 282 y = 141),Point B is located at (x = 288 y = 101),Point C is located at (x = 138 y = 157).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_33><DEPTH_12><DEPTH_0><DEPTH_2><DEPTH_50><DEPTH_94><DEPTH_39><DEPTH_19><DEPTH_57><DEPTH_57><DEPTH_74><DEPTH_69><DEPTH_40><DEPTH_72><DEPTH_64><DEPTH_23><DEPTH_58><DEPTH_64><DEPTH_3><DEPTH_40><DEPTH_76><DEPTH_29><DEPTH_63><DEPTH_11><DEPTH_60><DEPTH_73><DEPTH_31><DEPTH_35><DEPTH_61><DEPTH_69><DEPTH_15><DEPTH_40><DEPTH_58><DEPTH_74><DEPTH_29><DEPTH_3><DEPTH_3><DEPTH_40><DEPTH_71><DEPTH_50><DEPTH_63><DEPTH_5><DEPTH_17><DEPTH_13><DEPTH_17><DEPTH_67><DEPTH_3><DEPTH_49><DEPTH_11><DEPTH_59><DEPTH_69><DEPTH_11><DEPTH_26><DEPTH_20><DEPTH_73><DEPTH_83><DEPTH_59><DEPTH_5><DEPTH_11><DEPTH_77><DEPTH_3><DEPTH_41><DEPTH_80><DEPTH_48><DEPTH_76><DEPTH_81><DEPTH_29><DEPTH_76><DEPTH_44><DEPTH_81><DEPTH_38><DEPTH_58><DEPTH_14><DEPTH_71><DEPTH_30><DEPTH_11><DEPTH_8><DEPTH_16><DEPTH_55><DEPTH_16><DEPTH_42><DEPTH_81><DEPTH_64><DEPTH_69><DEPTH_64><DEPTH_40><DEPTH_78><DEPTH_57><DEPTH_98><DEPTH_50><DEPTH_46><DEPTH_43><DEPTH_25><DEPTH_25><DEPTH_44><DEPTH_19><DEPTH_15><DEPTH_85><DEPTH_66><DEPTH_85><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 3 | [
"C",
"A",
"B"
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"path": "images/3pts_ADE_train_00008362.jpg"
} |
depth_point_118 | images/5pts_ADE_train_00018811.jpg | ADE_train_00018811.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 190 y = 180),Point B is located at (x = 255 y = 215),Point C is located at (x = 301 y = 105),Point D is located at (x = 203 y = 131),Point E is located at (x = 27 y = 114).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_41><DEPTH_9><DEPTH_38><DEPTH_69><DEPTH_17><DEPTH_5><DEPTH_17><DEPTH_43><DEPTH_66><DEPTH_39><DEPTH_41><DEPTH_36><DEPTH_78><DEPTH_58><DEPTH_17><DEPTH_5><DEPTH_35><DEPTH_76><DEPTH_44><DEPTH_78><DEPTH_41><DEPTH_58><DEPTH_74><DEPTH_15><DEPTH_5><DEPTH_67><DEPTH_58><DEPTH_36><DEPTH_76><DEPTH_44><DEPTH_0><DEPTH_44><DEPTH_15><DEPTH_76><DEPTH_35><DEPTH_30><DEPTH_69><DEPTH_69><DEPTH_44><DEPTH_25><DEPTH_41><DEPTH_25><DEPTH_64><DEPTH_15><DEPTH_35><DEPTH_22><DEPTH_69><DEPTH_69><DEPTH_25><DEPTH_25><DEPTH_41><DEPTH_25><DEPTH_44><DEPTH_29><DEPTH_60><DEPTH_22><DEPTH_72><DEPTH_74><DEPTH_45><DEPTH_58><DEPTH_66><DEPTH_25><DEPTH_64><DEPTH_29><DEPTH_35><DEPTH_59><DEPTH_31><DEPTH_31><DEPTH_60><DEPTH_76><DEPTH_41><DEPTH_64><DEPTH_40><DEPTH_49><DEPTH_59><DEPTH_3><DEPTH_40><DEPTH_9><DEPTH_50><DEPTH_98><DEPTH_58><DEPTH_15><DEPTH_36><DEPTH_29><DEPTH_72><DEPTH_72><DEPTH_29><DEPTH_40><DEPTH_2><DEPTH_98><DEPTH_1><DEPTH_41><DEPTH_19><DEPTH_2><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_2><DEPTH_25><DEPTH_47><DEPTH_END><DEPTH_END>. Since point E has a higher pixel value on the depth map, the answer is that point E is closer to the camera. | E | long | 5 | [
"A",
"D",
"B",
"C",
"E"
] | <DEPTH_START><DEPTH_41><DEPTH_9><DEPTH_38><DEPTH_69><DEPTH_17><DEPTH_5><DEPTH_17><DEPTH_43><DEPTH_66><DEPTH_39><DEPTH_41><DEPTH_36><DEPTH_78><DEPTH_58><DEPTH_17><DEPTH_5><DEPTH_35><DEPTH_76><DEPTH_44><DEPTH_78><DEPTH_41><DEPTH_58><DEPTH_74><DEPTH_15><DEPTH_5><DEPTH_67><DEPTH_58><DEPTH_36><DEPTH_76><DEPTH_44><DEPTH_0><DEPTH_44><DEPTH_15><DEPTH_76><DEPTH_35><DEPTH_30><DEPTH_69><DEPTH_69><DEPTH_44><DEPTH_25><DEPTH_41><DEPTH_25><DEPTH_64><DEPTH_15><DEPTH_35><DEPTH_22><DEPTH_69><DEPTH_69><DEPTH_25><DEPTH_25><DEPTH_41><DEPTH_25><DEPTH_44><DEPTH_29><DEPTH_60><DEPTH_22><DEPTH_72><DEPTH_74><DEPTH_45><DEPTH_58><DEPTH_66><DEPTH_25><DEPTH_64><DEPTH_29><DEPTH_35><DEPTH_59><DEPTH_31><DEPTH_31><DEPTH_60><DEPTH_76><DEPTH_41><DEPTH_64><DEPTH_40><DEPTH_49><DEPTH_59><DEPTH_3><DEPTH_40><DEPTH_9><DEPTH_50><DEPTH_98><DEPTH_58><DEPTH_15><DEPTH_36><DEPTH_29><DEPTH_72><DEPTH_72><DEPTH_29><DEPTH_40><DEPTH_2><DEPTH_98><DEPTH_1><DEPTH_41><DEPTH_19><DEPTH_2><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_2><DEPTH_25><DEPTH_47><DEPTH_END> | 190 | 180 | 255 | 215 | 301 | 105 | 203 | 131 | 27 | 114 | 5 | 60 | 93 | 27 | 124 | {
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"path": "images/5pts_ADE_train_00018811.jpg"
} |
depth_point_119 | images/5pts_ADE_train_00008073.jpg | ADE_train_00008073.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 87 y = 216),Point B is located at (x = 82 y = 108),Point C is located at (x = 173 y = 140),Point D is located at (x = 214 y = 152),Point E is located at (x = 312 y = 180).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_0><DEPTH_2><DEPTH_41><DEPTH_41><DEPTH_94><DEPTH_75><DEPTH_77><DEPTH_12><DEPTH_23><DEPTH_51><DEPTH_1><DEPTH_1><DEPTH_41><DEPTH_0><DEPTH_58><DEPTH_32><DEPTH_80><DEPTH_9><DEPTH_0><DEPTH_51><DEPTH_0><DEPTH_0><DEPTH_41><DEPTH_2><DEPTH_39><DEPTH_9><DEPTH_121><DEPTH_9><DEPTH_19><DEPTH_27><DEPTH_0><DEPTH_41><DEPTH_2><DEPTH_41><DEPTH_25><DEPTH_78><DEPTH_78><DEPTH_66><DEPTH_23><DEPTH_1><DEPTH_25><DEPTH_25><DEPTH_19><DEPTH_78><DEPTH_19><DEPTH_36><DEPTH_31><DEPTH_2><DEPTH_78><DEPTH_71><DEPTH_19><DEPTH_19><DEPTH_0><DEPTH_1><DEPTH_57><DEPTH_58><DEPTH_41><DEPTH_16><DEPTH_14><DEPTH_11><DEPTH_33><DEPTH_78><DEPTH_66><DEPTH_41><DEPTH_0><DEPTH_1><DEPTH_19><DEPTH_0><DEPTH_57><DEPTH_37><DEPTH_25><DEPTH_94><DEPTH_16><DEPTH_39><DEPTH_2><DEPTH_19><DEPTH_78><DEPTH_44><DEPTH_41><DEPTH_29><DEPTH_33><DEPTH_98><DEPTH_121><DEPTH_98><DEPTH_98><DEPTH_55><DEPTH_19><DEPTH_19><DEPTH_25><DEPTH_41><DEPTH_57><DEPTH_94><DEPTH_42><DEPTH_42><DEPTH_42><DEPTH_98><DEPTH_57><DEPTH_1><DEPTH_57><DEPTH_0><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 5 | [
"E",
"D",
"C",
"B",
"A"
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ff3qL3Ez0KGAfZpLJrUpNLF5iTJguCOScnoSe3vXETXuoyl4heXTLL8knnSM2MHoM9K6PT7vVdajsUhtdkOD/AKXuGZMe3ety78E2Wo2EaTz3McxJYvu6Nn0zW9OnKSIc1HQ5fSZxb22GmlzE4Pc5B68V31rqVosKI0xViM/MpFU7fwrFb2sUMd1IJFUgyY+Zvetqy0vy4VSS4acj+J1Ga6adNxd2ZuUWOVwwBB69PerEB9Tj605bBM535x+lTLbqBgnNbuUbEKL6Hz9falJHqt15Pl3kSKu2TZsAHPAXAqC41S+1C4aW6iIhVQMMQRuHp9arCO4e8jkRMANw2eOP51q2AE8MollTMi7UAQHa3Y4+ma8CWh0bkdhChjaSS6eG2CgoUPzM3ZeORV231B4LG4jZp3mDK3lnP73jHHcmmyac1pGVuLqEQEEDGF3AdAPrxWZFdzL5VzJkNG2I41fLgkdPyzWadwLpw1wk8amIOdrqxIye/wCNbmnJB9nkja5eOXOB5XII7ZNc4zP5MckU2S7kBWIYg5yeOucZrWgMMNxNJGr+VclVOVIAwASOfelNaBexrNZ+QFLFGu0QtGqsCWOTjmqMcOqQ6dcXMiRiK6j5VsFmwT933B5qOFWaWKGXKZbc0wBGBnAH5VfvEt7aV0e6/cKo8hcEiNuoOfr6VmO7Mi5vb6edQ0RJSESSgjaFUZxkdjxn8asWOLxN0t2UdnxI7KcKPQ/WorphNOZLeZbh2IDlQy4X33de9ZNgt/5uozJAwSVQYUkf7w5wfQfjTtcDo5vsUOiXEnnTG93/ALlHTgj8Kow3U0+qxTQpIqL8yRICyRY4PHQda17bT1n01ZLwqssIQhllDKhbO4kg85wKqzWglilFvcSwmT96hHyhR3yRye1DQE29DbNFMji6JPkrGOCSeSR2+lRX2n3FnE9pa26xzD94zqzZ3Dj+L5cc0trMVWVHuE+2ouYV2nJP/wCrNTWlw9ysga485C20lz6Dp/8AWoAo21vHJqLQ3EglbYm1VIwCVBcn0wc81Z1OKzGmCVJw8wmMYETcBAv8RHXPrWJYt5ssjoERvNdWjAO6QFiAB7YqeK4t/NnhMI3iMxiNVxjB53AflWkWUi1p8Ec6SwiUNb7d0TM+Mvj7mepGK0X1X7FuhtZYlgiAi3gAspYc8n61ziQvY3F0iwbV2LKU3f6vpk4PTinTxpPemARRxRMVYKH3Z4BzkHFEthM29PuLaSWVp4kjdAWVUYhSe31HsOOTRJLHPfSxWsUDKj4dhNtOD6c8d6y5THc6dYpBFsIJyGbIXnBBI9hV+xtzciWa5SGFWQhSm0NITxz9MVGiWor2NkWdpBZok2oOyHiSI/vCPr1qxLFayO9vEZ5IIkLq0A2lh3AHeslS9vHNFhnDFTHsAZnxnPSo7OObUJGl+2SxWypuWNSFZv8AYB7ZrWEopE6nQRfYojCI7q4gjCgndKdxIGMDnjGeasQpFavCXuI3SX5zl/NccdTnPrzmubuLJnMbJayWpZ2JkmkDDZnr14zUUzQR3EqIWt1WLa0vUNyOcjtxXZCvZWQuU6W0gntb6GZpZZTl5PKVhsYZwucdOD2roVu7e1u4VSNUaRCXYLtVSecEjj8TXB2GuW8Gls4CB4mOJFl5k5xwCe9WtP13Sru6lsp2udpTzGt2DLkkdDn09uOKtVWHKehQahbyxlvMG0dTn5R+NC6lbShxFNG7KpwA1efWtnqNq101hDusHXPlM5YgdcgE5rJguwkrSWwZZAwKuz7VAB+YEH8etWqkh8qZ6emqqkBa4YIwJwCe2K5rxR4i0fSroXuqJZTRIpMbGMuRkd8A1zF74h0y5uryLWZWhxbkRwBuXY55BFY+h6nDLc2lgPs7vM4iQXKllK575470e38hOBkax8Vb1ry4g0rRrK3F22yLdZjfIvY8r8341izaJ4gu7sXOqWt4lxdQGaIxxMQpGMLtUYXr3xXsl5q+jRalukismltFPlTCNCVYf3eOB71jSeKZRetNLeSJOQSoU7Q2fXselDqIaict/wAIv4VtrWza+s5Jb8wo8++ZjtkxyOv6Vcu5zbaWwnvfKtbYgWKAYbnoCD1GKy59RsDLPMbWRrlp3Y7n4X1PWufih1zxLexLaQm4kk5hU5C4HGSTxisnJtl2J59c1G4ecb02SMBJhFAOPSuv8H6JqPiG7WAwxRWQXLTAKxUemK5+P4beIHldJbi0RwPus5z9OOKtJ/a2hXYjNveWi7AshUtiUgj7uKqKihNM9fX4d6ZHbwf6VfiS3OUdZ2QDnJ+UHGKvS6vpNoVjm1S2DqNoHmBz/iTXjM+q+K9V1MLa/bDAAAqTSmNfcZyM963NF8MaXYXq3OsRx3O8EyICwZWPRQen41uq0Y6GUoXep6Y+uaTbpHNPfIqSNgMVIX862bVkeNZI2V42HyspBBFcdY2PhHekQt2LSHKpcSM6r+BOK37HXNKM39n27eUVO1U24H4VXt09LhyJGwBjpS0Bge4x6UhdRVJFOcUfMTzXEcED+aQ8AIZNpG88dBV7Tr43Em9rdAiOo5DDaSDjp1qto1vb3UDtfPG0kmFSNiRg+uc1vS2FhYauZbMRpDKxi2MSSH6ggZ56GvEnKNyipNqEN+PKn0/zJrZ2WMRk+WvoSDz0FY1pb3Md75tx50M9wjMjsuE69QT2x3q1qE4jvmDwmVZXdJHU7dwzhSBWcrXNpcIrxOY4mMThpM4XsQTwPpVKKaugN6ztxHLDLbySLe27745XQGNyRzjjk4Jp8eqokMvno8syeYwPmDCuWPOPx6VmTajCk9q7SYVEZYkB5U84ojhujZwEW6efcPywOWds5BwPwGKgaVzYtL8MJkmSaYlQ/Xq2OntVyXVTciSEPDiPaHMuNik9ACO9Vlivrae4XzWXenluoj5OR1I/T8KfPJYanZ3Elyq2c4CecH5RwvAIIwAeO9S43BksMcM3lRz3cURWUZycZX0HrVr7LeSX90t3LbGDdseOLIdM/d3jt36VydwsZlRJWVLYSfeOSGHHete0jey1K4WW23q8wQss23IUZUEt9TS2GlobDwSLpzW0CEswJEcCkqB7jqatJpjQ6nA1zJPNEFw8eMfJ6j3qG6Y2rNeM6QRRoGCRybyueoyKnhvLVbG5la5leRhtjRmxsB6Ek0hXsUr+UWE0V5DDmRXYAyIdwiP3fxx3p0H2a1t2dkZo9uQEIDyMRweeMfrVey1yCPUIRJKkjuBF1ySqDGcHsTjBqe7jtxbi8li2JNKBvJzt7np0oC9zIglmi+zbokt5mlMiPgkRhTxn8sfWnzmOW/vEi8pJ5cO0xJBbJDkdeDmpNTurGa9MemeUFyDumk+VvU5zxjr+FZ9xYR217LDclRLMQ6zKSVZMfzJq0Ui/BC10kkpWWK6bhxL1dR298iobaOOWNzboqIkojMMh+Yk1MJZJNPLNI0UKSgASMMkgAY9apThFupJZHw0nJX7u0gcH+VPcGW1XyL0q6u3zbQkY4HqRVqxmaeSPMaSx5GY0ydnPoOahsdLv5EMn2eQ2sbeY0znG1frUltFKJGaKTbLbt+7kxtCZ6Enpj60rCN2GRLa4kSLbGV+5vBDYPUDNZaTBb64ItxFb20mVCk/OfYHnFV7m8ubKaJzOZjM5bzgykO3p06fStSKdJYbYtGFuGbarD5t3tUMksxvb6xH9nmdop5cIpbIAUe3ftWlf6LqF1ZxRxxRKCip5kwHA7cCsEXJtpJ5JItrK2EJ5C464P5VqQXhu47eNriWyif70jnf5ueQAPpV022MxLrw1caffQs15bixDN5kpiKgPuyAM9s1zuvySWd48r6tZ+aSWQRBtzAnBwc9s/SvRIbqZ9TW1tJf9D3czSx7hn/dNM1LwVoutB3uYAJeTvkGzdzk49K6FKxVrnC+HvE02kaws1zqTvHLtgPnSLgA46Aduaml8XaNqOrwaLdW9vBpwusGZZfmJ3ZznPQn1rc13wSkunwNZppsc8C5RpQScDsBnnp1rzzX4Z4Y4RPpM8ZhIEzSWxRWLHgKcd8jH1rop1E9CHA7HxBoyahNc3OhaXJNAH8oXUZ8x5AADhRyO/pXIXeu2ptzC8DWt4ZQEaVgpjx3PoaxbhdV06ys4I/7Q02N5cqXLIobORjPU9KvavPq5sLGPUbK4Nq2HQSRBS5z64yc/Wt1FE7F+S7SxjhuLxpZtOnQrHNEAfNkHVM49x+dLFevr+qLHHE67EYxgqcIOODWJaeI47S2t4Xj86O2YlYGPyoe/HY9Oad/wlLPPH9kiNrhGXeOd2fWs5Q1Kudla+D7I6Tc397qAV0TeY2lABz1FQyeJINHWxOnQQW4a1GSjkkHjjrXGSzG6tDJLdujbyTCc/nUaX0ahTLh1XgdBgdqlQ1C510/jm8kjUmZN27cDt5Na6+KLrxHp0dhqN9Bawqd3nZAYEema86mmsswOkTMy5JK5AB9Kde30d1EilywiXsv3R74p8jYr2PTodUtpI282+t5Wt2GyTccMBznAPWrVxrNj9gF/cXPmYJ2RoR346d686ilWM2qGePyXVWI8vORx6cmvRUh0PUbGGbS9Z0qK7hyfmjK7ztwBhjxzQqMn0Jc11JdH1bTyW+03aI6/NGrD5z7Y613GgGxvrkyJAu5BuVyMGuQsPB2u6xZWd3ey2IMUm4Ps3M4z6rxiu8ttBjt0TypmRgMOR0b6VpGi09URKcWjYJIPbmkpEXYoUchehPWnCuvY45as+Y9MiMU0xuxuihOWV+Tnvgj8K2S5nslE0iSzb1kjjt3AIAB7881hXEkcUyyWrsUjJkQjlWJ6j2qXTrNdQtTdSX7wyLJvCNFgN14DZ614co6no3LtxqAMJmmMZ2Et5fWRF6Dn8euKyZHfzNhmeZJQXWM8lh6+9TSn7deQ2ixiNl4zcHYW4JJPp0rOvEmW4gaWQCPG2Pyn8wBSenGKaQFu+mi2wshBBjyi/eKYGDkjp3rUW/ubZrSYXJYQhZBEI8KMjj9axjG0fmwE+Wwco2RkAYzuJ7fStbS45ra3k1CF/Ns7lTFsTk8LjcR2G4VMkNHSaRE9+93e3V95StC0m3qGwCcfnWbPaLFp621wgM14DIkEfzZI5GfY8VWgu3tYYI7eTcsr/MIn4A6Ffr7V0w1CGN5GhSK1C25IEkoDE89Mj5vXHFZ2aGyjJp9taaZDDcqLtvKE8S9o2JIZT64AFacV5bxwiVRbz3A3PNL5ZO0kADAzzjHWsManFdy6elvLM90zBGwNjBieM9eKnupNXaS482Qs8SlpSpBLqfUe2KLDJZ7mW4soILNImEkhUylSMEd3OcAe1MuDZSeTu8vcYzv2A/vGbHPXtj9aggtLprRbZMuWbcABgkt0A9+P0qzd6Jdafpcmo3ypLHEoYO54J7DPb6UncRV+w+bYXc1u6l7REREQYaT1IzWdBdJJavaGU+ZLMWDzN9zGRj0qzPBbtCl2kxgu9gkZVG9c+hIxt6/jWX5st1PCY3QSB8oz8Kwx1zVR8wJ7KNvtBjd42dwwEskRIXaDwpBAycfrSNG1hfRyXEUqBI1lCMhG8+hz6V0emWFze2Ny8dkGuifudMEHqPXpmq7WupS3X26XQ57n7OdsUJB3OcdQfbr+FDl0GR28Opz6VHfXEKzRXEhYWrjBRAfvj24xn2q5Oun3iW00HkQPPzOA/wAibenzH7ucDrVWb7ZdyR+bOkckU3mNHEctGMfdPoO9UreMXdy0cL/PCWlSOIc7Ry2f1NCC/c3NR1K907TIpkurkLc7kkgUgo8YHVTjoeacl+brT57mFd106cQOw5I7YHekfVVl2wabaKy3W0xK3J3dCKuweEbv7b9suNQt7GT/AJZ2yLlIyPU54o5WxOxhF/7PtYotW0+Rrzzd8MTnkD0BrTkuWmt7aOa4gVY0BSOD7yt71qXvh7Uo5Ibg3tqt2mZPNaYMXU4xgdulYclrq06y281lfxzs/wC8b7PkP7D3qZRYh7NJNaJEscph851mbq3JGD7f1rYnvVVJkF0ZLe2iW3WQgMIn4+bA6HAI/GsySM2NmsRsbjfIcmMqQw2ccjt1qrcNE2ormXEt4wbM3yfMoPze4oSaA6Hw9eWcl3MJmEoTJWa4b5mx0woxmp7/AFQXckLSyNvJwoQ4IU+vp9Ky9Dexm1NmuQzjjzDGdyuFHUfiBWxe6lKkjyvYgW9wvyTlwpHoCMenNdEEmBli/mh1CI3ExgBJSB5WBJ46EfWr8uqJPY+Rqgtbi38xWC3B2bsHrn2xxXGXxxc+ZewM0rPshLyc+obGPStWy0hJtQN1L5ZglURbmP3HIxu/CtbWKWhvaz4q8Ki1j8/SxqDW7b4oY/nw4HYjt0rynxZ8QrnxNqVjqA0XyLbTGyYZDvjyDwDjGDXpNhr9t4f1mLQ0ltZ51h3faiR5bEk8Z7V5lr+k6lea/qHlIYLa7uA/lRjKSHjnPpXRTq/ZZEo31K954M1VtLTxLf3FhbJekzW9sPvPnoAM9KbZ+GJ7u3v49M06/mvbPDSKcHOfQYropvBcthp8F7qnia0PkRllG7eyFeQoGfeiz1TxFNFaalZeJTOxjxIhUQlsdeec9qubSegRTa1PPbq3u7aWaG7s5opYuHSYYYelRrB5/l28UZ81c7mU5ZvTiur1jxFeajqesTy2Z/4mEIhIByAF6N0qG1OhHwi0YitrPVY2DGeafEjrg5CrjpTi0wehj2en6k8iRiwuH3KHUGM/Mnr9K6ey0XUoriG+tvDkl9aHdHJaIpCuPrXLwTSyBd1xL5UcflI2eieg9uK7TwZ4w8QeHrmK0hAudPYny4ycHHtWkGjOTZ6j4V8F6BcW1vrB8Ptp0+wqbKYlgnat1vAvhiRCp0W2G85PBHv61m2vjkajpl1JBZETwoeDJjDY57VkN8TEk0fYtnK05XZJKHyFPTPSqdSKMkpSO9iNnptj5MWxLe1X7obJQdajTXNNaN3+1KqgZya84sdQkis5JbfQjcTSD5pZJtm78MHNPguWLu05LPINv2bZwD9aydYpUe56bBqFpcoHgmWTP9081NJPBGBvlRf94151HNH9mt/s8MkUqZ8wEYz+NRzXE8zDfNtyeAxzV05cz94bpI8bnlMUk3kIsbZysM3zAjv9aVtQurq6aCGLyoZCJFWFdoQjpj8CalnmspoRb2ao8cQ2LM/DFe1QILJHAAMs6Jt/crgb681o2sW4RI6ytLC4hWQqszDjPPH86orP5zTw2/lTxwjKkDAPzAA47dadNdToU2kpIxwwzkjnoT70x55pbWeEqsZDGQsDtJIOMUWA0bS3jnWO0mKRXU8zcnsFU8gfhU8qPbaNcF5QLZQyxBeIX4649c/rVK7aMXpngmi/49495xgDKgke560tteK115TEMoUBU3cEHv8ArU2GiGCeezurdfNeRNisq785bqNp7HPSuhScQXMjsmUOAxlfLZ6kD8+ay9QsYtGv3ENyS8qjerHBXPb6YqERERzXMCvJI2I1TZkMDw2f8aUrMGdDp0CPfQ3gujaC4kJmkiXLKo6HH58e1aWkX0V3CkclwD50qxzTRrhvKycsxzXMRXVzb2sTp5kMMSgMqJgkAmtTQLJ55jdG2R49PtXmaBfm+1dwtRYe5z07eIrzUGjtdftbZG1W4sNPt50Ild4ymFDCMgf6xACzDnP1ra8M+I7/AFTQbI3V/JNulZbm3OFjcZO0bQMDiuetfGGnaZPJHdW7mWDWLu7a2k06GZZUkEa+Xvdt0R/dsCVB6g84rV8BaRHc+H7SeCVGu2csYxIQyqrOCSMdOldWIjGNNNISOvsdOtHku5EtWTTG3h5mbDbAfug+nT8qzo7yaMGG1tGlt2OyAr8pSM9CD3HTmtAW8N5YzIPKCo2HdnKuhJ4IGOlMukgkIgs7yO8nX5AsR2hSOoJ9DXn819Bpl39/4esrNxLNNHM7eZMTll696ytP8RveS3bLJdCOAsiW8zbg4YbMjpzzkVfmjaGPdFbLHLbxqAIzjY+4EkN9fbpWJD4eu3u7vVpJ5fIimBbzOfNd+flP/As1okmO5ZRodPhl87TpIn+0AGSc7nZdg6+1WrUyahHstYbZXYEKlum1yvbce4/pUcFtqxiuGtRPdLBLvmLNiOOLAyD6nvV2O+a7WFILmJTeukbL5p5UttUMuOmffpSswaMPUZb3w/Jbo8C2V41wBHsT5kQYOc59zVmy1m+leeaXUGDwNhIHGWnJ7+2P61n3fh+Ca7ltra4heWNjERHwAx9Pat3UbOwhsrCGxCR3LED7PAuSx6fMfXiq5rbCS7lxtVMtsby6mDPbqkYQjOOvzYrTstdurhJpo9TSEnKkFOGb1HPFcSpltZ5dKDtbyHAlDLnGPenPZXUc8kral9pTyt8nnrsUD+IHGcHpj8aq9xNHcStb3cRW+u2laPGGhk2M2evODnOBWZqCaSJV1CVJBBCgtxbLJgDPVwccnj9TTNJ1mxnsY/LtoGktYtpIXIP41Wn1zT5JoC+jskJjBBA+9xTaugKhgea5ZtMiYyRpttoIjtO0nr+I5Nac+ryLbPaMy2chQIVLZAYd8fhVX7VvkiuYMRgHBU/KUUds/SopJ4r2/a3t8Wcj/NGTxx6k0o3iMw7rV7syl7iZpATgyuOM9BitWz1HzZrVZdqWhOGeQcbuxp97oMUU1jqLtcNcRy/vonO8TY6FvbFV9RgvmtJtV+228NmHIMH9zPA2+9axkmPQ3hcaOpYtbWEnyYZtvGcnpT7+3g8SW6pLGltb2/KSW5wQMVyltcxAL9nEcyswBkZuSfpVyWeGWNbVtS8gKCHSJzk00Mp694T0Sx0e3DCQyu5+aefIPv0rNtbnTorOeC31C005YoXwzR5EzjHyjnjNY19puozTvG17JNGj5iWVzlj2rS0b4c6xqzXZe5tbM2xG/wA5zyzZwAMe1ac3cDCju4jYh/IaW8Bxg8j6AUJd/a3jhj01nk3YbZ6entXZyfDHxPZ2Qji+w3HzEk2k5Zz+BAqnb2MQ1GztbW01O1aK3CXqNHy8q4yQc/WmppEtI5trK3kKDzJLaVmKmErzn0rQggkiltJbe98qe2H3W5wK6a3vNLa/+z6nbSM7N+7MyZyo75rrLLQ/D01u0VzHJbRzt5iTK3zKo42j601O4rGToWmTxaXc3qTvJJcrv+zhtpc99p/PtVW3m05ojBcabc2mXAMTvnnP0/Guo1HwZZRXlvPpM0sGkTx5kmR/liYdMj3IyT707TtOs7n7TFqOpQlfLIMqsW3dgRwOaOew+VFeyhhmgk+zQvJHFwDmra2ow/mXEEPG5eOT7Vi6f4bis7qcNrty9if9Un3T/PpWubK3tLR7gKkkABVZZjxu7VDrCcSWWGcwPLFGZgnACnin3OgXskaNHGd2ecNjFR2ElxIJY1uW85lG1bUZH07U6e1vrR0uHnxkkn5/mJ9MU1WYcrPDPNt3jBSCIwlQSu3Bb64pyS28Ei3MIjiUgjYvJP41bNtYQTQgpNBBP/o84P34mH3jz+GKZq72kk0YtkWNbZtoR1AaZf7ykdh7461NriNRbS0u9NbU4RMrxBUljYhxuI4OSeDWNCS9z5SRtdyKCCHxuUde9UhNMJDah5Cty/JBwH9M+tW7mzNlMYrmTEu4Alc7lx1HPalawDNiTIhMI81Hy8annGe/rSgRRT4wPLdtzcYx3AzReRIl7IUkVFlCgcY4x94H3qW1jF1MiGXcIwZZCuCY9owN2fpnjNKS0AvNBcs+FQ3asVEbOPm3HpyeSBU1hPeNKysrxAMGYqxRlIPTI9SKdcTw3kNvGjym6iYBWlYHI+9nr0wcVTOpzS3sySvJuBAwrZBI6Vm0COlllVN2Q1xbqmQ28jnvnu1bNpDHYlz9omjjlwx2SFcn1B/u+1chDd3EwmCt5c0UTZmY/MoHIAPbvWtc38NzpV3dsWlmnl8tUlyfKUD+Gsnoa0Ye1qRprS7S+8fr9jodxmeDS7JiyFZroRKS8uckkevv3qHSbqHRt6WECpNcwPBGSAqjJBDADp0NUJVtiyNGPLj3AbVfexUD5mPofy71Jc+Ut8Le3DGP7MG3kgsu3g89hyKFPmVmdOLwv1fl1eq6qz3ttd9tDV0+KBopYtRvmaOfLBS2A4B6+/41oWNxotxeMYvJsS0DTvdY4VFYDG3pkkj6VkWlrGbG01AiKU26kTIMlwAMDI9PSsSRbl9PTWGiP2KGUQupO1DnnHqRx6UKKZw3sdXeartkMtlqMtvgFJbSRdyOjKcOR0Jbg+2at2z2+o26KL2SCN4kDR+Y20OuBkDGOgrnE1N9Q0y5eCyjtodyINoJA2sG5yMc7fyrcTWRawtqcs1pIShjWOPKxIG6sRjg89u9U4lbFbU5ru4EmlaRHJK0s+Wkt/kBTaF2npkZ5qG38PfbNXslvL42vnymOKCJfL2FVADZHoRk1pXWzWZ7C806+it5Yiv7iMttkiA+bOQPmJzx0rK11roXFsZJpooLXzGJRV+fIJCkZwRmiC6FI0baws9Pimmm1CIrETFgrl2dSTye5ORVyW4jb7HI1nF9pC/6KwiGZCOdx9+a5q2WLVtYhtdNlkNvAqpI0qgDeTljj1wRz7V0Wr2r2s0Q+1zrbOuWmwD5YHUrznJ/pT5bPUUjDvNQaSRL+VEt7mMA+Xkl3Y55+nFQaYJowwuJX23/APrNznEanrwaSaG5uNShn8tmREXypG+9KgzgkVDe6kdQ1GG5uo5nt5FCyRxncy+opAa4ZbL7XDp8n2mCQFZREgGxR3J7VnpDvjDQX8k2xS6x+aVCN0wPXrUdvJLYvdWtqGitLt9kjScNEOcDjrTmitYZUjngj8uOMISOHJA6/U07hYnS/gihnE8jLMYwEuSx2q3AIK9z15qtKYpRgawjuqBVQAlmOR0P0q1YaJpslg15czXTq7OFjwu2Pnjvnn6VmS6DM8iTwHy3Ufu8Ag46elUncLG2+pLpt4ZMyzKYQY47mXdkgdc/WuY1G7Se2Zp74zTM4ItQeBk5I9xVa40S5a+ZJpVbgZLyZHP1pkWhWtuitqupJa2z8I8IDsRnB4+lbRihJGppkDasqhSlsy/MyA8AeuKvzT6Zp2qPaoXlWNciZRkMcVycsMVhqLLbX9xJZr8scyDazL1BIH1rofD1umoXsii7c7hkMAo2t2B5/lSkralhqMmdaV2laK3UKyT7Rwv0rcsre/aU3mmak09pdt5rggcY/H3pNR8MQan9okd5IrjyTFGyMAGb1Yk9azLzw/4hg0+CDTNMvYYbRW86d5Il37sYwA/Tg0QXMgOy01L+CBpJ74iQKDhQBz+daVv4ju47rzLkQBz9xpUDbgfQ14rDPffaGS7uJ9/8aSSHg/j2qVNUuwI7NzKYM7VZG5FNwE0evJF4d1TUzLqNsY5bgbWnjkKmMjpgCsFtXt5dbazt76a2soAYo3u0813ccFlyfu8Guf0bxTaWTqt4JiIiBuAyWHfP0rc1G20zxkk6+HbhFmiXfvJ8t2HfmpSaCxpLdloGjh1vdtIDjOAT1PB6DHam3VwAyyW08ckCLuIAwrcdse9cUllE19HbTSx7DJH5zEFumOCSO5GK9JlaC2kjiit40iWPCuq4U/lS66hoZdo91rLRyLbrGHGDmT7o/GtiO1v4zJpFxAt5EZo1TbLtC5PBwOtGlX9rZ3EkkllBPC2EAZARn8atSX1nHqrSW9kiMZ0dQp4GMVfLEVuxp3OiyWq25XT0RQcSTQzEYHqeKzdPvNP1Ga9t7cTubaTYzOevuM1pal4nN5DJAIQhBwxDVjiUA/MyDIyc96tchrGSS1PENUklndIl8x55yzMC28Mpxjn86o3CmTyizsvBUEk5B9zV+XD2gSLbbSQKIyw6/hVKB5IY/MCpOzcgTHIpJnOWY7j7CsduY1kICsGx80fIJxj1qa5uf7U1VpIpGdJpW5mJyDnd1HsMU/VorW1u4oBdLNdeSjSy2+du4jO38OlVPPijnVrXzGLcujADBx14oa6gW5W0xbmNlbE8cmTHKzOrc579PSm7IUsrq4uJDHcea2yCFAN4J7t6DP6VVti8sjolusnBY/L93HvV61uHiByLcArnMnzL79OalgSWf2WbRfPNuWmikDSYyFGOwH0p9wbd40WDy3WNgwuFUKSG9fp0/Co4pDaW5jt5GaOQSJKwHGSuQQOvcVBFmOzRYljKDLFW43Y5xzUNAaD2zRvIobz4hF5jHOOByeenFSadczNceUsqJcHDAE71B/HgCs+wnuUe7iGwSSo22I/MrKwwQPQ/Wr9/HBDZyjRS5tsIkk00YDjfkY6c9D0qZQTA7rTjp8VpKLyK3guX2wtHjmY85IA6jpWfqtvp0Rt5XlWB7qE7khiULsONyEj329a5m5mbUbyK5luYoZ4Io4EEIkBJGfmG7ofWlu2jfSbhxqamO0uEVYGUiSQsGz25HArLks7DcpSd5M2NL1OOO2n0yPTwDdnaZgxLlMHanHeuf1dbrT47W0a5WaPy1aOFW3BWI6Y7kehrU0ucHQ54lBivCgitpUYIVY98tyDxj8axhpVxFqkFvIg+0Rr5su18nd0Jz3PNaKKQcpt2i3dzYW7zMiRjmbMoCL/CPkzjPOOnBqmLZPJTSixW3a7G9mDMSmc4OMjGeeK2FuJU1BJBZ2wtwEjuLeVFKscBV+b1OQxweD1qfU/EVhDLaabpsJkMUhW8cphY+fuoR94jr6HFLXoO9iWfT3S+muRcRx29lb/6O0ZB3N6eo9az5b5pIYY3jUzTFpEDgjouRkNx1rQ0k2txcXqwkXFveKY5NyFZUHTIHQN9Kq6v4T1GSNbuFpJbeKMgyyuORjBUjOelTGXKyou5z/264tL2f7EVlkZvmMaD5OB0IroYbWbVL9bSS+b7NGykSJgkqe5A9Dmp9N0DULLR08iO0M0UZubqNXUbRzhVPfgfrWbZWmpRQ3dzYxw24jhKzlpPnQNnJAB5I7U3O7FI0tbs7yyvbTTtOD3SzREyXO5QzJ/sjOQB+fNcdqranBfRW+kN/ZttHFI8tzcYICLtyzHBPBYDgZJYAZNdxbC5n0yKKW2WK7ijUxXbyhS3XPBO70rlfGt1FpMsNlqEs01jfW00DyRIpePLwyBl5AbDxrwSMjIyK1o2dRJg9jAs7vVW8R6da3urRXdpcKZ454ThXGGGeVVgQykYIB49K6QuTJ5bNNI0gG391u3HHJ3EZrjPD9vp194w0y006OdoRGwkeYBXmYK7FtoJC8YAAJ+7nqa9EuhNZ3UX2a5SdoD5Ztot4MKYwGyflPYcHvVYlKM9EOOqNvRddjtHtrU6HbSrs3STEndypIyPriuY1Zdb1K+aYXckcTA+XGGwOuSAPbmq0qvDc7ILiUCTHnSFzuT29/wrpYtXkkspYm0+0ZHRYQ6khwAQd4Y8AnHP1rmUncOU40aHqt3azSSxB4y2RM0gLHb1GM57d6mh8FzTXSRyTnyFXdJgD92CK19S1jTrC0e5uJ1ibIiCqGIZsHg45zgHms+y8daXGu4zCS4chBCqOFPYZJHatUqj1SEaF54Ws7LTt8M8sRkXapb5i4HXHpXMRyWPzW9jazJfr9yYFmYkd8LnFdJL4iivHdiqKFwpEhbbn/Z9BVSXWLqcLa2sdraEt8lxaxnfn3OM4qo32Y9zmnvZZiYZbm6BYkkMXBb86nluLwWUKJqVzKQPusxAX0+tM1K6vRqMjzTpcTcrvRDx+BFNj0++bTxPJbs1u67t4k4P4A/yrdWQWHNI0xSaaRLiY5DHb09/rVcHYnmE4Gdq4GMe9TwInlssfQAdCePX/Jqa0tbe4tZJpbgRx2w3ujdT249etNysO9ii9ulxbCWK7kmmUtviQkZ59qS21F4NSil+zm1jVAjbWOQvc/nWp/Ycclra3FpPO80oLMluMBfRW96sNoFvLEomW/sdQCEolyvyze6mk5oBsBvXt49QaJRpomH71p8nhuPlJz+ldba67OkC27XW6LLFXkjzxy2OledXNld2iRrIr45UgjJBz1I7VvaLHf6qgSEoTGdqCUlQe1ZtJ6ks7FbvUp5bJbq0jaHzBIHRwgZc456elXrsGF55IXT5GAA3dz71ytlos91NqFjql88P2KEtmKbcqjqOpwefStPTvsNmLWC4uftMOxhI7A/NxwMjgGoYJl6z1FJMhhl3YhlXJatiHT715YJbixIhPUiQZA+mc5p0niPSdNRfslpZ+cIwquBubI6H9aWHXP7S1PO9PJVCJgvyurcelQ2EtTxkNb6pJb2dnHuumZ1UJndKeMZB/Gs3DSnylBTywVkMpAw3df8APpWrpuonS5rhjZLM06GGKfaVNqfUH1rOu7f7E0ovot7Ah/L5DAe/uP611pIWhXhdrZyNhIJ7dQe/Na1ppk88lnLZAy+ZKYT8jH58EkcewJ/Cs/5QTOg8m343RdWINTW+py6e0dxBJLELafzEVpAdwwRjA74NU1dFKx0t1phgtbs2rTb7VliMiFdrBl3Nu/Mj/wCvWXJp8wsr51swkUCoV5w3IBOfqDVuz1OOeS5M7k291Kskm09MAH+QxXUTPbPaa/Pbt5bLFFJaIzDJKqpIbPsKw2YcqPOHuJLcSSQ4xs8xQSTxtxn8MVrXcc8F5Nb3CKUtxG5jXAModQeO/eqsFvLcxys1tlGhZ8uCq4Od2D7c1be4u7+9nREjklaJYww67QOPoabtYlIjFykOoM0FuxLgiNY/mZTjoatz31jZmZIJZZ13pIEkYBfk549+ax/MntrhJo5Asgba21hnH97+n4VtWV1Hb2trEI0zDPud5FDMfcDHNS1ZCLSSJqFtJerZlkjHmSbCdyv2yeg71FqdlE0j3VrGqiNlkfcT8zc/MM8Ae1bcWqW9qZ7iG2ZoZCTcRLGR5mcbdw7Y5/Os/XtUsr9WMOm+RKjHfLG+VmU/7Pt7etYKWojPh1i1XUVkv5R5AYSSQ7VHmE88Hr1x0qOG/s4tVl1PbveQmXy2Zshj0UYPQZrds9esrq40iC+sobhLV2FwDCF2xgHaucdR/Sq93NDqWrx6hpNuG+zhiym3YCYk8N7cc1pui0iN9ce7t222ixxNz8vIVjx1/HPNZpmurLVI4IAssoBkBGCOE9q7h9EjSygmN3aF51MrpJ+4yOpA3cHHSuUvUsbhVu9OtHiDXXkMofczfJk4A5wRUwEy5oniGe1lkkugWC4EZVQrIepOR1PJ4PautvNYv7jRrqeOFHtfs7qkiEHzywI4xx17+teeSwG5ySqpApZgpJQucbdvPeuk0G6vNUd7OZhAunKiWMZjO1cnLHI4bGScHNEoq1w6FnT5bO4C/ZroLbi1WG4WNwnnSEnKKX5yOPzp+mwwDzI4o7hkkcN8zplVHZiev4VHN4egQzI9yupXs0wffBGUA9mX+E/lVew0l9N1uG5VFewmBinIlJEanhhyeprL3eg4nQ3kNtdvALu4xLcPshaFdwAH1rI1TStNt4bZ9Tjt751YtEke2UkN0AByDnHbjitVZNKjuY1soZVspHIXKORbYx/Eev4Vz2pzR3OtyJdzm0dGIhYZZIUCrswF6E9Tjv2FRzNM68JhfrDlq7JdFd722uu+rMdLeGOWG/tNMit7mJ3GzyQhYHgAbAOcZzU80DLcKkk5ikuB/q7Uktjr/Fn0pkAuDdx3S28j4XJddzAED7xOevIrbtLHVXm0+5+whUjUxhXIG9SOSCec1sry1ZnWh7GpKm3eza+453buv/LUztsUkvKV3Dv24rdtpWk0m5mmwAroDC20cEA7jjt/WmXXhS4jlkuYWlmtXfK2SoQynuN3fH9KpIbnTZHQalFYpIm0GZA3O7368cU3F9DJtMZPYWcureGVaKOaK61y1WeJ13KQWI2kHggjt6VyVo8epaVZ6jfWlpHNHq0EETw26QLNGQzSKVQAHaRHzjP7zr0rodcsJ7+O3k0zUI4buKdZ/OEjJh1Bwylc4PQ8dKxv7E1yfVrG71XVRfCGRWzLPJIQobJA3CuqjUSp2b1Ie51SxxBFjMEQMbkof4ZTjgVd0Kzaae6D28aELtTaCBjuPrVFpFjWRjGzJHIGQ7Tx0zWvfLDcyiBL77PcZXHlg/MCOn/16405DT1I7i0gtL+CGS1S2hkYpJKcNtc9S3fGMcVk6ot1o8UVjplo10sXQ27CUOf7wAyR9DW+1zDpWr3S3F28dqpxJG8W7zBjgkkcd+eKf/ZkK2Kajb3zO7qRDcwrt8wfxYHT0rZSe7NLHn8EE225knZ4ZpT5jq8e0knqMY7VHCLWKSIyPIYnOH2gZH510t7ewxXsNrd2W8Oo8qdyQVX396rzW1opml81vIK73hZRlz03KcdOa1TuhWRZsrw2TQx6Les7vIGmjljUhvToOOK6u5vGuJYGvpba4NsT5RtmDFR3BznFc/bwSWa2jR3JhuygZN0SgRoexyOTWlNeQWlrcvYxvd3GcuyxhdxPVs4wOaynC4WsUtZ0y0ubK51E3wS6ZlIt9ykyDgYAHJOPSudghv7S9itLq1uo7eQnYcbR83GDjnoauy309hP9vudJLXTFSs3mKRGBxwBxXVRa7p2sW+ySXOU3OMYIPsalXQnqc9bWG+7vod4WLyhHszksRzVexkFvpr214ZGti5cxIuGBHua6nThpmnnzoY2ckdW5q5LeWFw532sLDOSp4piOesNJ0K88u9tpLi3DHeqzHv8AUV0mmafaaM73slpCbiQYd97/AD/XJxVG6t9MuoTFHbiHLFxtY4XP/wCqptKur+wd4bq5ivLYD92WAyKhq4Hkslw+o+fdOGigdw/lHozd6deP/ampxzT3IYXWUaRP4O/T04qpd3PlXk8Sr5MQzshVeg7c1GJWgkiunBkby/MUj8Oa7bWISJ4g5mEEsixqCYXuJOmByvHrxSmxaOSCeW3nW0kdk8+SMqpOCflJ4zxUq21+9rJqqqzRXEp+Zl4Jz/D60mpWcllaQFpYZZJv3jBZNxQ9C2O3p+NCdx2F0qbZbzQbYyTLlP7xAGfyrpdS1N5tCvA5eY26oysihcbsAjpzwcVyFgD5vl7G8zPyjHPPp+Brp5GfUNAaztreOeUcTShtrKqt1I9OMVEkty9LalHW9Xurqyto4DELWPCiM/eGVGc4qezuljhiu4V8jy2jWUD70mWxlc+g5rOSbZBKt2AzhCFBOBnt+mK1LXTp7RYhcWbSmXaIFbgknsB3z0qW0QjCvZYpri6EO4wiZtjPy4XAODj3zXS+F7ae6vIJ79hbWHlNM002AgUfxAnrnHT2rPvbSeTVtckubU2U8Zx9mC9DtHyn0Pf8a6Kw1rw6um5g0FrK5t4NsMrXYYSj+LjGMe3eqlZxAbFp8d9cxQ2mppbLfEyW8UrDdOn8PPY9axQsEt3HIvm28IRziVhxyOTx901cvo9NhQ3MmqML5trRxpbGRWIzyHBAB56Y4rNF95lyROGkRFdAFG0kEjjNYxjYajcaLS+ufNCW8sst65kXykJU88HI6DmtS88N3mkw+RMgYvEHmZWIKHIHGDWnpXijS9C1SW0SMxWNygVSELEEDpmlvdViu3V7WzFqkQ3OHfL7+21f4h3pScuw7WIn+e2+z39s7QIqxRPGjF143bh7cc1Bp5tYbxXXU7WZIo3uUkRCpV1U4TGepx+tWptfvrPS/KiTfdrmWS8uRhokJztC+hzmsXUbW0m3yjVFQ3BR2Qpy27GcAdhnIPelFPqhNFuBpdUSG6v7n7M0j70hlA2bic4HvjmugaSG08i2ElpFHM2POBK5PcnJrP0zRrmO2vLyOZxHHEIIpLkhBsPcKRwSSa3dP0CdLS0167vvtFu8L/6PDh/MYZACt06j0qJ+QJEi3TpdQPa6gqxzRh7qPYAGGSoCn14qHW7i00Rbj+zlmuJZFJjjUZERx1NQsX81Lgo9nYyqAywzK7sMnORjnHoMVVGu2F5aXmk6bNLb3t2u1JJLckpjtnPGahQQ2uwlnezXljJHcTvAs0ZUW7uoOe+BjPpUFvaWNxqk0rhYfJulKxOT+86/Keeh9BUlreNoUkGlTWMM00oje6k80EN1znjjtQZhp1j9ukGJbiTbbLKdvlofvNz1A4quUqLlF3i7FnVb+bTFnle6ggYyectrCvyzDPQZyeM8/UVsJ46WKO2inEkBYAxxugIQn8OKyLPTtQvY3/tK/N1HcgN5BKqpB+6S2OB1rTi8Or9iSHTrcXtsE2zeUh3RsOuM5zk1eopK5rRa6vmRJJOouJHPliMjc/bP41zPivSIIlBu0knadiI0yAUb72c4rO1zwzfaN9mmE91HMW8yIyLs8vJ+6SfQE03W5Wlgjkj1Bo5No/eMc5IHPNVFEcphXdlFp7/uGZMLmRZvm25HtjnvVITTtKkCFWkkAwcnAz0wavNazX0Mwkud67lZivAYAVu6D4Pg1GaWS/nVbFNnlSKOcjHQ04p82p6FeOFWHTg1zad73t7109Ek9rfjrbkLyS9trwW15NIIwQGEPJA9aWC7vFj3y2V7td8QSEhQ3scivTLrwRZx3Y+w6yDGOXF1FnaffkcVlP4Tv7Oe0ni1W11OLJ3RJ8vlk/xAZPStHynnJamjBp51Bt2o6bNcRSxhZfs742+oYnNTJYNpenC1sgt4pyZbeZDmL02YIxVO/wBOkTSZWid3kRWDOuRvPriqNuiLHMhnlm89AYYwD5jj39MVm2jXoZviK7tJrG1lMF093bSPG+0gxgcYB47fWsi3vWivYTcQtJbCMxOinDbcg4HvwK3Nal+wpBCsdwIbhNyQgbRC46k8ZOawRPe3l+suw20jjerAbsZ749q1gD2NIa/qE92sMNgxgXJi85Sx2nkKcegrdt9IZXjlVZ45JU3y7/ukE5wAPTpWRaarYaRKIZbkzTbiWuBHneT6jtXWWms6dd2UUltqUZaIEqgOWbjkY780+ViuUZrBJbgRtNlQDwRgevHtVO30K3t7yOa1mjMgOSp6fjVOKFNaiiS+1d1n3yMsax/eUk4HXt/SnRfD/UXhkuLe8ikjIO3BOX/WjkexLNqP7IqGO91GzifPChgM89uahisftRZrRZLgMekQ3EY78Vzt94Vvxot1cRBUewt5J3MrZPyqW49elc5JrPiDwssM0HiW0S7a3hmFvFCxkVJY1kXJaLZ91xn5j+NCoyZNz1G00O/mwPslyoYYG5CuT6c019OeJ1SVZEkPBUjla0YpLnW71POubuFoPnAX5l56dPpVuKwkWZzPJLNjnd5RyalUZvoPnR4fdYhmjvFP2iOCUxSgLjcg6H+dVhKrXCxwtK+FMY3NkIMjOa2mtLM+HWRJWjYEkkLuV89g3t9O9YEDxxakvmRB4Y3KyqDzICePxraDuh2Oh8PxSR61BYXl15ViyyHbKdyqOpI927fWquqWUSRILcpDHGvnRq65lKlgAp9wD+lS+Y3hnVVQ2sLySHPl7/mCN0UnHBxVma3kFo9xGr+QshEkcXzlCTwD6r2z644qHdMUmZMdvJb3Edw90VJmVVUnaW57fhxWi109lqDPE2xp5fLdEkw2zP3S2O/071napJJA8cPk+WyJiQNwxJbKnH5Cpp4p8WV1c3TSi5ZWYS/KBsOCM89hRa4tWhlwyXOozgDyx5hI43cBcYx3Ndd4bvWDx3SCeaS3P7uSY/dYcj5fX8a50tZ2V5c3H2eG7t7mNvLKtkx8YIPHX+lSWYmto7V5Lryt6syLt3eWMYx+NZTjcZ6JeR3eqW3mWDPPfXrk3M0U4Xy2wPvrg5UDHOfWvLl8uKZo0KSCMlQyLuCtn730rXt9UgsJ7RZQ0l2syNuLEADPU/X+lal/4V1XwxoNjfafrUbw6pcBbjZwApPygHuOW9KmG2rJMO0ja6V2SFLlYMnEb7CT2wOcmtXTtKW4it2XTru5FuquViGdxbuT6ccVCfCviJbNbv7DcTW1pubzduVHTJBzyPetHSby9kiSWxle0tPk86ziOIz1+ZvapnKy0NIsk1Hw8+oXdpcaUjR7IibpzKDtfjKFccY6VSvbC5SGK6lmV44zyUXYeh6Hn866+z1Kwk1C4tIFZ4gnnTrbrhpOOSo7jJBqtbeJo9jk3Vy7w/uVEb5Hl98j0zislUn1GzhLyQf2PHC0kSXDPzuk5ZWb+L86rSKsFwgjmB8hgglBySB1A9utd3rmkWk3hbUtRt1tUuI3jZridcbs4wFPfjrXKaRot3cEXMltJJZvndMfljJJxnP16VuprlJO38OTapqt1LaXRP8AYklusIz/ABc53fhn9KyZkbTYZtL03U/tVqWa3jA5a2Yk8hvU5546VsR6aujNJNaWQdHRW8yJ93zAAYP5ZqlrVqltpunzrZRRTSyGSF+hJPU/Qd653UVyjmtfDaPqsmmJK1yYgqF5FJQyEZJB/EV0ltpM1npMGo2e8lwwuZlTawyB901p28OpXEdlBbam6QbvKafyQYGY8lQ2cnGfSpI9KtLu1uY4mu44YnC+dCuEkOeuM80/aITOXeVZ9ZtrC3htjBKi77mWMtMcZ+82ePyqe9vGnWWeC2EkUMUiRkQeWAmRgLyc9K62ztms7WP7LbFjA++Wdk2lPf8AGst7rSbe9hghtJgGl8s7pNuwHtjHtS9pd2Q0YcWs3kVnBBd6cY5rhU8tn+U7cfKPrzW9YadqmnW80dlPeWzxAtcHzf8AXtn+EY6d6iFy/wDaYkLJLhj5cWzIT/Cuj3KYC4lkTdDudUmznGOOldmHjzOzCUrFI2Nx4i062kuNW1JpQrZglx94AjI/wrDPh2+a+s7Y6TcmTaNtw0OAuf73P4V6FpUWnTadAYVuCdpaQFu/U1FcajZSJKEicOMbGRtxxnHI47V3qnTW5hKbOP1T4YazfbGt74WkRBEyiUHj2GPxrlP7N8Y+Hbcyy2t1/Zxk8pGU5YqP4tv05HNem33jjwrpsPmXJlmkXiSBY8tx7Vhx/ECK7VoYdFMdk6OElWfDwqQSXZcdAD60pQp20Ii5X1OU0nxpaQ6rHBei5bTwmDc3C/vCSTncfQV1mjahY3kEtxp00kkC/dEkeAckjg55FclY32i/2lLZaVFLqjM2HuzFhfXI54P+FdJYeH7e3QymYmMqPkx0JJrjmkjU1/Plktnhks7Zgx5O3YMfSs2S0t4bhVaCOGBSGEiL/D3A9KuwoqpIpcIittD7uWP0p13rDoGDW6yNGAFMfBasbXKTZyuvXMgvoI7DSJru3KEB3X7h7msyJUh1e08+3WXCeWoflfoRXQ65qd9DMriHyUvFMcap97PGc1zFtqlzpfiT7beQEQaaWaKNud5HHB/Guinyrc06HT2ng+TXb0LBpET2XKvK48uNCOM7ed+PqK0rj4a6TpM9hBFOWOwvcfZxh5ABj5RmsebW7fxKYb21vr/Sw7YuLaKDeJCx4YvuHPtiobXw5AfFso1HUDd2asYY5Lv5AcAnA5OMYrqVuhjY3bDw/oz6zHbQ6fcQTtGwBul2kIcgnPrius07w5YabHJHDJcBThfKkfeoA7jgdep+tcIljNpmrNe2HiWGKAKVV36KMY2j15rY03xPqFtfpbXOpWuqeYAFMdwQSevTFaRlDqjOafQ1fFmlwW3g/wAQzIwBOm3HB/65tXzr4h1zT9W0+2WCWRZorS1hMT6ZAp3RQpGx88N5hGVJGR0wOMV9SMUvbIrdWieXLGyPA4DKynIIIPUVmL4Q8Lnk+G9H+n2GL/4mtHSU9YkKpy7myun26MCsaggYOO9P+zQhiQoAPvS7l/GjIrpUEjn5mfMRKJqsi3EksEAHmCAMRtJ6gfSoNPvrfStUtNS+ziWa0k83yZDkTDBGSPxFa+rS2moNLqDTyyTxZlKzqAWc/eHU8dKx/Jiiihk84FipBZRyoHt+NeFCeh6PMW9cupLrT1uHiWS5vHklaRRhgQ3HPoATU8vm6J4ftLrTbwP/AGmuL0iIEoykEDOfUVTV2YHfO2FPyKejD/PalljkmdxHcGCMDdsyQPbAFPnJbdxmqSzXtjDfXkwaSdjgY5cA4J9sGqEtzJ5ik5VUAVB6U2dZIbgl22Pt25B4APvVmC2EaBnkjliBwSKfmgvqRGWaGNo0ecRsdxw/B9c1ffzXsbe4ZxvkBbj+HHSq5xtUTIREW2gEDJ+lSw2AuIreO0cTTyMUMSjnjkAe5qW0Fzf8M3l0L6aWTRYtQglAaUAhZEXpkGuxhuUnjt7GOVzCjKViWIElM9CCRgj9a4bSpzoRZbmPyZlfY7f3SOcH861YLl5NVF2L8vPcSbikiBYoz2II5yPpXLV1Lud7qlxeNdWFvKlxPpseVEKIE8wrj5XwTkc9K5vVNM0m3W4N2H0a4eNXgSCT5Hz/AMs2A7+9ZWsSXUUV9qA1+S2tbeYKZIpHdS54zwMj8KyW8T6Xfx2tnbukl/N8r3BV90sjEDBBGOvfNZxpztdCT1Os0m0it4lMvnxi4j2pcRvtXjqrDvW/HpGmxlBaRQNbviMSKA21jyVY9zkVQ0Cw0u0tLS11O/tpVeRpZIbheIyQe3TJzn8KrSx2umx3+nxRKqooljkRQpY9A2R7Gs7jbOpuvsM+3SpraC7hRf31u4BT1GR0B6Vn311ZW0LWraXsRIw0UKtsC8/w47Vxw1e1vLW3srWCdJXcec6vtaV8+1dlZXljfzx2svmrd2yGNYpm7gZGT6VLbAzpXim0JVQTRRKWuWjjlO6UDqufwp3mXVxNHJPZMLRSfKhWPcY02Akk9+9EFzPpV1cNfWNpPcIym3hyXwSQeMjjrjNTRanqtvM1zNKFkEmWRnJIDe/t6e1JK4XLV3ZxxKlxLdeXDcEAoj48mYew9tpqnLfumkJYfYi0CSZmO/axYdMHtTra3WVw8UXmqZBNK/lDlge2evGOaS3sr27S5ubdkmFq/wBouIy2VfHYD14qla+pRJd6jNZTOsElwtpcRKXVpS7KeeM46e1Z2pXdpd2emQrIWvkuk3tDGQWTB5Y+vvWpppW6udQluLp7eBm2PGDhoj2CgVppbXVnp/k2ttcW+IuZHcfOB3bnjNNONxo5e3Qw6ys2x1DkMrO3Yg9q6y3Fo8Kh7yON2TYEKZB5B/Piq9/aR6hBptxG6RHBjlaMAxqw7k9efpVW50/7Tp909rCpt7Zwkjg/xAH5x7dvxruoT7A4cxti+jsdPuIhM0KIRIsqc71Y9h+NULi80m00y5urmRAkID+aBhgMjtWPZLLPotnLHE7TwlmcSZ6E4A/UUQ3sFq4luNMmuJpyYHQopjwOecn2rpdW26IcLD59b05L6KIeXfWV1BmKVhwGPO361dhk0SKNHudHgWMowJBBLDHT6VmLokGq3n9oTwQwWtuDHFaoAAzddx+n9KqzXEIEkUSwsMFEkTOQfTpXPKTb0HY2LS78LWO9LbTrWwlm+QiM7eMcMcDrzWXJb3dxJIsFwzJE43bDng96xZ9PmgnKX0BiE0YkjnIDbucEfpUtxrDwwvFBdjzflDGJcdPWp3CyNKO6aC+Fmt1NcRkk5I5FSiZ4XmCIqBc7fMG768VnaZr0tperJ9nidJE3h+pz6D3q/Y+PhZSzm70hWYNtdz/F+Hek21sFjQl1rSkaBGt1upJEA3yLgRv3I9K1YtR0e6hjV7LT7hD8kiNGOT61mv4x8OXFgJ59AAjf5WkijUbD3zXHXs9vp2qldLT7WkybocdYhkdffmptJldDrPEPhywtZ1urBdvmLuW1T5UU44wR0+lVrLSNL1OzFpNDHK8WGuJnT51l7jJrVs2vrbRwmpTxnO1sRMSxyOO3HNOvrJZo1X7WjXMmHKzg5XAxgn0ropVOTQztcoR+DdJFs0yX0sNsGyyM25AR1IH4VnXPhqzhV7q3S5aBsGO9I2I3OeAMkelSySGG5xcm5tvKGApX90M/xAZ5B962tD8c6VaQppV1JbajI2UBjUktk9wR74rVyi+octtCPU7gPa6NbXlw1tpc0rR3MgnIY/IdqMQfuNznj8RU/h420XiG9s9GmM2kx26MR5pkWGUk/KmT0IyT157jpVjVVsd22LTBbqTzHxhlI5GK39Mks7OG3itxDAkQ+eJFAAyevFZwqctRO/8An6eh3/W4rCOhZ7W303vzNfzLZeXzTlwewyPWk5rQ8pJfmjIPzHOKJLNkGSvFetDE3R4/sj5K3uys4gKqoyQ43Fvb1pW8yCIzMsKI2Y9qsct+FNs5i8xCybTLnZKSeCKrtKshlIcEjGC3P5V5SSOhqxNAWOxGygXGFD5H1qdJ3WeQqe+PmIIIFVDAyIJZAEVuVJ5LVaikijCkrH8vfbScUxEl+HyieTFIrIHDL05//XUyaHf29imopZC7t1U+ZGj52Y7nFV3eS4AWIlUHUcbcdeKmhiaNXNtqNxDbz4DCOUgN7EA+vY1OwhkVq+oR+bbxqz4PyO+MHHHWrv2lrWe0F1bLbQxA+Z5L4Zn9mXkfUVXkeK1gG1kKtnMrj+Lpj6ioysFxJsMpBYZXHPbkipAfc3Vs13M0AlkhmO7c8pkKn/gXNKZcp50dxkswUqedrfjUcyEW0FvH5Ywc4cDe3/Al4/M1bstMhSeFrq3lmjuYzhYCM5HYHoD9aGk9xlK/1SX/AIRu90yOMvFPIhGGOQ24E/L0OcVo6lpWnRahoIs5LJ2sNQi069NurJhvlIaRioyzOs/zAnhQM8VHrui29rFCLDVFh2t5oMxYyRNkHlowemOKxdJtrmy1m2nN3DeWyXUVzNFucpcbGzkhlGerDn+8fWtacoqDA9PC2trBcNcQQ31pBJviJJLR56gkfex2yadbzWT6jGLa8+1PeosQWRFDRZG4jnjjGOa5vzbm/uLyeCzuY7K6mMyxRErEATkLj06Vc1+5i1G7E0dtb2uoQW5SeJcBQ5IAI9W/pmvP5Cjq7LT9Na8ZzYOx8wJLskCFCOAQyHjI5OKguFFvqbS2m6aKKQoOd7Ek45c88VzEl1qVqtnDEfssjIEkSMf3eM+nPUmtXStQFhfzTPcxYeAwtDJwGk65AHHI71DgMmvZ1OoQsbiYmJ9xO4N5mBkjcDkegrU1+fd4ZilS1Xzre4VItrcrvx949+tZtqZLaykkMVs0cp3XDnYGjPoCOCAMGrTma+s83MqRadGC4EUf7yQAduOT6GhKyGkXdAN1faRqFxdPtFsuUVTuyRztB7E06K8NixjijksXuAMjZuwB97eT0HNVY4XFvdtYuw04xjzXlkVSJiOAAp54x7064hjurCK4uLmWO5uOFa4mOyTH3uAemMcHrWckyi5Ff6eLstBqUMiy4ZpBB8jN3JYjtWnaSRzpqBvLpnTyG8yMycHGOFPpXLana6gs+mG3sY/sLOVDowWKZ+Mgg9B07VFpuqWsEyRPbxwHzQFVyzKwb+DJ7cU1Te5JrxWttJdWH2TUZrcM8pa0VQYxjGAd3FWCuox6X5tjdea11MI5IolCKCee3HaqlrdpM1xHBHF+8nk3s/zADIwV7+tbFw/2bR0EaoCzZgCHGNvHI6nrXRTujaCKiT6lpFrJBqMpj+f90jorc7xn5utP1OVLm/ZRB5lvBGXaTeRhycfyJpstvZa69lv1RHuIWBWHEg8w55yWGBzWjHdQNey2ZRHme4dCpjO0gKeDx2IrpjK+5bimc1eXFjd26rpV+WeUAPEAw8o52k578c0zXrGbQtGtJbhokvbnfEAGG0DbwcDg54rpbDw9HY3cv2ZlaeUFiZIsxbSOnTI5/SuG1nRruO8vNQudEvJrS3yrxm53IuRjcg3cDv8ASq5kZyg0ZCaxd20drJfXCNbq/lGVXVzxzjaTwOetR3viAXH2mP7LCkMjALKrgE/hUUttomm3yWep6DeW8Uo81XTaxO4YyDnlePzzW2fEulxaLHZQeFrfzxEUEt3CpYnnDcc/nzTsjNoybK4EV5FKkgWHZnBxz6j2/CqkSz+abu+uHhZ2H2YZD5B/GtOxitxcXlwbWG7jWNDiRinlHn7oHX8a5+/SeWX93b/u48gxjqPQCiyFcvXV/OlstrDbuZSd0zq/D/h0ra0q9OmrHfGCKQx2v79WIzE5K8Y7965SC7SOVQ8UqooGV3YPPXrWte38EBivRAzxx3Aj2FQDKhBycjr0FS12Hc9Ls9dstWmkV7MrNGiNGqg4Ylfy4qGabUo5PmRZmPKM6gbc9ifSsi3vrO7sYri0uTAGT50ZihXH1qbRfFxn1dNOjszNFM5UPMQeR6Hpg4rGzE0bkN7A1mY9QkSSTcN6OoOOeOvaqk+kaZa3BltLaFTGQylIwuzcc53DluvfpTNUhtY7ieO5ljilZ8gtyB6LxxjtWZrT3kV6AsjTRbQfJtuF4FFpFI03vHGoNC8uGIBDOSwb6Zrq9Lt7iC+zepD9luE2nbjIHbpXkz+Lv7QuFsXtGhaH5RnG41t6RrV3HfBmwg24IcsxxRyyWopHrlvbvYqUiYOOvJ5xT3vnlGMYArC0vUlnjSWWNkbjLZ5I9geavy/ZvISe2kYs2flPauyhWezM2fM9lpwW8uort9rxRKU2AFec9vw7VmT2E9vDbNJDsJU4JUjd+dSTXPmcglFdArEHlvqf8KSSRp8RpIX2glfMZjipTC5DLHJJEpGNoHChs4FMCoVy25s8FQanAeDhcYK5IYgCoGfb8wAB74YUxFhVjEgO2QgdOeBVqK7SCIOgCDn5SoI+p96yxKEB+Q4PvRHMwc5TkcAHkUnG+4G6NdkExO2J4zHhVuIF2kngkYHX3PNVZZo1ht5IXbzySZECqAo9s81DFBG+GXzFVBu+bgZ9s01EtZYzNLeZm3EsgjP9KmyQWLVuYLlcMjowPIAHPvWvp01mC2mQw3ALDAmkb5c/QdKybS2eWNRHGTEzHLjO4Vom602e1aCzhlh1CIErN5wAbHse59qykr6AbSX4tNMiWFrJ2m/1iJGv7vHUMSOp4qQCG+svttvHC8lkuQmACydx8vBHvWTaavaWWoW0H9nQ5ZMTm6cMkjHrkKQR07c0ss1nbXCzqHjUOyBrZv3YBx8qjnI+tYcslKx6Uo4X6rdW5red731TW3LbZ73+aV6z8V60XDWUcNvAgxHb+TkEdhkj05/CszU3tQ0LGC5Nw7EzzTkAOfUAdOauPfQakPs9ra3Y8st9okVcsigjDADpVLW/7I2pLps9zPHLHtaO65LHI5UjGPxrRRPOOh0+1do2SY3fkLADuYLlSecBj1q8ViNyADa4eAuJhFnACYwQw9R16Vy9qwbSQFa4aUY3s0hwqjtjp7VvWgMFttkVZjs81GjbcFj67T/Osp7lILa7a/h1Czl0u1igKKzOXJBwBgHBwM+o9auvqJuLmzK7o1tlbEDDCghOFz71Bp17p95Hc2TtsiunWUzNG2TkAfw9h2xSWQijvJF8smS4XyYAzgiRs4Dj07flRY0iiCeFJLeO6jniS3aZm+zM/MDkAEkDqO9OnmWW5s9MLRzJbjel4Ayq+eoAfrjFaofQbC8kh1TTYmihVmSRnKF/l5BOcE5zVm20fSr6+gufPMVtZH/j3lYLu3dsn19qlpA9zBs9RuodUGmhpZ7ZnBCSEEI564/TitU2diJZbWWQvbwybZZIMMUX+983b9az7qGWHXFvrsrBKlz+5tlXdsUfdbK8Y69am8UGW00+0tWRVnmRUXb8u8fxbyO/StNLFaHSReWjZ0c27WbqEacLnaADgn0JqBg4SxkhEgkjiPzEZOR3wfWsnw7dX8GjMYJYdrYMtuADuYdAcfjVv+0NSv2vbm3KXDLIBFESI/Xd1xnnFKAJmnHe3MllFPHagzPuy3lE4xkHoODTNKmliv1Lx+TtjCrIzbt7Mck+vIzVJ1Nnoc0sLzxX9zIoWIuSoY/ex+Oavq0rxW7hy2xTEwK/Ksg7Fh04FVzSHznQxaxLCrySp5iIzFlh43AL7+wqvceMLKK1jNvp5fzVLMJSG49CB+XNcyZciZlEhkdCj7QxQZ44NVdQ1mHTrNY7byVu42QSMcbNvG7k+i8/WqimPmMrVDcanqbXkcYjZuiMMpAvZRn3yfxrKvFv0Crdb5Cz/OyqBx6g11OreLtHtLuwtzHHdwSrumEJGSfXI6cVHZ6zoGtQ+TEwt7iR9qRSZYjJxgVpqjF6nO6hp9pZXqRx30eXIB2Sgqfrile2mvrkTK7RM8e5AqdPqe9bt7baLoUMr21h5t1j5kjxIrt6jriuXtbm7sJbs3On3aNIhit0ZW3pIegUdCKLgok2oeG911EYil1JGPMlYE7WDfwnHHFSXVpcloU+wS4s4zuXZnd05PpWpoAvdW82AWsltNCii6PlkbTz1FdRNFczpbXMUMCYjKGRJci4HH3snAo5mh2PPrmGPUUluFi2SFBH5W/7x9cdulU7a2voPkju448ruKyqVaPb7j3FdreaXcW2qW962iNGrox/dhpkYAdcpwDnHBrm/DclpqGtSNqJhihZnSVJnIdcnPzZPGOlCG4m1pQOpxiaVWMpx82QykjvzXR2UTWs5k5kkGcqE9vaq+gizFhe/ZbiOaKCRwxUgIqjOPm+lZdr4h0e7dleW5iO4KjgnAOe5HakptMzszQvvCek67dRakYZbeZj+98r5Tkd8VZsbG90mcRER3dq3CkqPMX8a2bKW1NufPnMij7ksbKMfX1rQjto3Tel9GwI/iXA/wC+ulddOdN6dQsyG3GyQSYww6buTV6OMuSxPX0qNLOXHyeW6j+5MrH9K1tOtlc7ZUZT2yp5rblh0IaaPkBtxxsUqg9aVXkikDf3l4qa6t0W4lgknUrAxXdH8wb05qL7OY1gK3KPvHIBztrAQ6WRWKqQM455oMbMu1B068VDLvDtGcZzwasJvhZXKFjj7vrmmBSkDK2Swxmp4Z2dkjKxnHRucirKuowz2jkdfxptwWEhTyfLB5UY5FJu4ErZOcM3TpUEEkdtIsojbJJAz0Jp8GZV8oLIZm+VNgyxJ6AVq6T4cu7lpbPUJX05shUFxbNs3npls/Lnik3FLUYWV/JJG8sUThEYbwoyMe/pSXunRTRpJbwyEzMMyRnKp7Mfetmz+HrwCe41zWbXTYk+VAr8zH6Z6dKq6+2kDxXcQQXirZFFSMwHciP2OBWK5ebQNDP0idnvIlliE+zIaDb8zAen0rZ08aZJHZCSK6S8ZvLjZcbUI6nbjk1W0HRbbUb2UrrqQahG6tZvKn7uUnOQT/D2610d9ZL4WjtotV0caqGUxx7WKI5HUqe9Z1JK4zP1BV0G8883kHmXJZpBbqyk5ODkEn1rL1DSYrW0a4szPJaA4dHXBVTzuHt05967WGSO+s4YX0JrGPnajjdk59TVmAWrv9lit4vtEUvkSxDLnnJP4cVi5tMLHnkF19nQubUykpmOKVW2sv4YzxXSvPHugfTrOJPMthvdwwSMsNpHX0OKzdWT7T4pNtcW09pbxOIQsa5bkccepq3FpUNk08A1iG32SgR2k4KszZ4zk9xVXuho0bLToNL1GxdrlmUhTJ5aZTaG7E/Stm2GnWs0MM9s0nkzl7VWYKTlt20H3z+tZFpo+r6XAupyah5vnOYbu1iIYQxZztPqSDnjHBrUkuYbOwjjt4maFbhJRJnkLuHy8+uMVnJdjUqald2NxIjldPMcrGR5L/czQkcEAKRyMd6uobePR4LSe4S/gGwrMq8IuTkuw7DtU9jeveNqjWtqiaW/7xreO1MkiAjDZHUdM1Vuta0i1vJHgghdrU7kEnyjgA7Cnv8ApWetrEX1JbS4sbubUDeae9xaMFitrgPtBAzgqT161NcwWOpmyi1QtNaxLmeRBhhjo+O2OaxtR1WK506P7P4auLe5Z9wuwScE/wBwdMVY0bQ1uNt4iNPp/Rm38be9PVLU06F2KO30PUpbfRUa5jkUyPdRoZFCduB6ZqPQrRrhpEjkSSKFMwjP+sl78jt14q5a6PLFPcNaOLq3a5VpsNs2RjIVPpgn8qfbWRstXuxp8cl2rOWtgV2iJfYdx70oS1EiJbfVJjJ5jpNNYyK72wGCwPTHtzUtybXUrd7VLoW6SSNJNGik5PPUjpWXdtrUN7dXJ1MbnTfDCwCFz3XPtUl7a2AgiE080s9zbqwhtkOUlIBKse3fmtlJsd0VL3Wr2ys1itGl2yuYyYVDAqBwM4PPHWue15/I0xUdlfzDumLDleOhxWrJq8GlRQxzRl5VhY25U42HJB3evNU1mtbyFftYV5GRt4PRiR1zWinbcHKxytrYiSXdFLFulAORxuPoM+2KW3Sa2vhJGvkywPkORkq1dPpHh60llHkqoYIS+5uEHqKzfEGjvaahIY1zHuyGB68DFac6ZncyhqV3ZunlTPGqtvYdePrW/P4v1i/uLJoIy88Uokx5e8hh/Fx0xRpdnpC6Mt9fyLI6NuaBELMGH8JxWfAbCS7mkguNgjXfGUBz7Aj3qhqVjVtvE2uWWt3by30ipqB/0lgFDFRnjGOBz1qxGIL+S1tIb2XS4hMsUfkktuJBO5s59K4mW9e4kknmfzJNxGAp49q2c3Pn2qXdjPaW8kG9vlKCZOPnXP1H507Fcx1Gt6XfWNyYVvdRn0+E/wDH5Cx8p39/Q57VzsPhj+1dcENsvkTSqzPvJbzTnk8e/NQ2V7c6dqkVw/ntpeWEsbuQGHRSFPUjjmqdrqdzba9Dqfnl5IXYr5nyApnFKyWwr3Om0myfTIL3TobyeJt5WSJSvls2O5I/rWzZ2drcXFtZ6naRQWucF1BA6cnP+NV9J8QafNJqT3EUBuLohkRTvH3farumeRrnhm6022VUvQpdY5X2YIbpk+1ZtMaRpHwnLplw7aTLNd2Mi7ljVwQK6HRVivLXyGu4FvUHNsQQw+orK8J6Dqf2uOC/guLRIohtZMvG30bpXT3nhqIXzyoi7JyBK/IcHsc1Gq1Kshh0uePDqCWX73lDkUl1q9zpiBr3U2tUPAM+3C/Xiti205obVIY5lGOC+CSR271dS3EsAW4CzjqdyDk/jWkakhua7Hx1FbhEbLHD9iahBGWKZBzyfWpVCSo250Dr09PzqvOhUEZAI646V1I5A3iSUMy8juaJJmdy5OCvAb0qDkEYbOen1pwgmnIjiRnaQgKB1J9KuwupchW5ktnnRpJFQ5baMgL0yatRzzavLGLSzuJ54kJl8v5sgDg4x9K7zw38KNcFk8urapHpVjMg8+BfmkZeoyOPavS9EuNO0Oy/s7R4ohFbqFBAA8z6n3oUS0jynwj8Ltc1qH+0blDpsaSL5f2ldrMeDuHtXof/AAgetyXYmvtVtVRmBdI4+JwOhPPHSuhil1G7vJIkjCh4sgA7z17dMYp6rKwjhaANOhO6R2+cn6UpUlIrlMDUvBEd9blXmWZTtA3DlTnnb7Yxis2L4WRpE1nHa6KyBSWuHjJlx2Od3UfSuymiu9iSEyOycmIjBP40xHvpdrx2c0fl9ARgZPrUxoRjsLlONl8BWtrbfY49JnjlKBjcRtgMe3GKs20ztY28GqQSSJE7yQmdunTA6du/4V2aeJdK029+x6lqMKX1x91A3f0q5d2Ud3avDclLhZkAO9cBCepz71z1MLzO5SVkeManrl5I14kuoW3nK4ENrbRknA6Nuz0x7d6pQvpNtdma7imM02JwyzbTG5PIK46cnvXodn8OrS58Rx6lc6mNUsoWZFsn+5EOmB61v3HgLRbiGONUkjWJAnynqn90/Q4/Kl9VdxNnnxjt9W+06eYoDbiSOae7u5MeV8uEAb1yRUHjG+uvDUdpdzeHraa4kxAmo3B8xSoHAwMdh1roLfwV4isNTK6b4hjvLJZfltpG8sKp5567sHoPasXxF8KteN/9vhvV1UqxcrI2HznOAves44dqeuwXSOc0bxZK2rXN1i0tR5ZkdFB2SMq9wT7dK2p9ek1bRfs0ljHDNKoczwn5ZI854H8JHPrXM6t4f1tdQiTU7W7sS5AQyR4iJz1JqvpPh86jLJHp0/najDukuIQCGAHT8OK0dKyNI1kdtoOp6fYaZetmT7VhogsVwFLrjjseeat2WlWEd9qFjDaG/cCN5bndhsHOMn16j8K46djJZSQTQyC6nUP868owJH4HitvTbi4uRapfWlza24RoL67j6r/zzdj3AO4+1c06TWoS11RvNby6d9gA08NM6qtylw+42/Xk9M59Kim1GW30cWdzpV1p8k6v9nitX2lm465BwKlhtxF4wt995LO9tEsiHdn7WpztdV9sHvVLVIPE0Vm1vqNndXrs4V3jbJ79D71zq7dmSrlLStUvI7uXzLhrV9uyWOf5txHctxnP0rStLoaxPbWdjKQZV8sGE7WXj+QxzXPPm2sr6eYrb3UEZih0+UbpJCCMY9wM5rX8O3bQ6Ms97MYbyUj7EVG3cD1G7t+VaThyq5TNW+t41EFkZ3nj03AkCSBGlYnnDEHoetcP4ivy91KqTXc0ryEAs4zH2GMDpiu6mjjjhhvbuAmC13gxu2T5jnqfU5Oaw9Q1q/0vTHnvJhhm227PgOecnHpxnitKWo4o5JpfOuYwyhWKCJZR8wVe4/Pmop4jBdeSkwkPQFTjFasms6lZxmObT4HbUUEtu6H5x820Aj1PWqM63bW7xS6ZJ58bjOV5BHP8q35EyZIg+0TBmiSQopzHLz1XFXH1WdIzG4jcRrvw4zjHQVjxyZuQJo2aHfvlCD7o6HNQCRo4WMj7XmcYycfLmnGHYztYvHVwWkysMbTNuYheGPrVG0YwamzQqHBBJRRw3rUDyKxBX5uf4qt21rLczDYwUEYZicBc1VrAR/2a/kXF0yNBvdioZcd+1aQe61W8s7S+uZZY47VYonznYvHb04Fad34B1y6mtrO08iWJIQwfzcKzH8Pataz8F6/b2skkE1lvntfJa3aX5wRgnbxz0pSlfY0S0NHRtLt2sYdIv2V2IfGGAbHUYFY6aNoBnVP7YljlCtA0csgbjuOnHIrEvRahLa4VJ7a/jQo4243lflbnPrVAywwQqQ2S8hyD06HJz9ahXQtjpxpmiPLB5UMGrGAFJFs1MTg5+Ul8kE9O1dHG1pbWyfZYpgA4HlySh2jJHJOAKo+E72WewVbXzZJVGVAGF45P5DJzTYdb0xL6WJboFnVjgfMSwJJB/Wk5MtSR1kGp6jb2yGzuZHjPdJAw/lWnB4qvopCbmKF9g4XGG57n2rlLe6sLq3ieRi0fRMjoavwziWTajM6H7y54wO1L2grnXWviOzugyXMZtyo6uMqc+lalvcRSpiG7RwPuKnGa45xB5HzxKpfIQqc4qKCCfajrIR5Z47ZodVdguj5rUW5tDvZll4AAHynFM8xmLs2TuPSrDWygndJyO1ReQVGQcg16CaOewigvhUVQ3Y16L8NPDttNq8utakStlYJhARxJKew/U/hXA2dg95eQWcQ3STuEUdufWvoTS9KtrXTbfRf3Gy0QQyyGPgydc++MUPfQ0jori3GsS3t00F0ois403K0EmGOem4fQ1BYxWUuox2GjROIY/wB7cT53eaev6H+VU7TTtHOrXenxhPtOR50ir80g65PtWmSBfTw2Be3iliKQlBgcLzj8RVJMvm7nQWiG31KWaGU48sIu0ZA5yfxzWsrxOnnqpMoBBIQbifzrzLT9Y1XR/LsXYy3BfK7+N2T0NdjZNqMs6O3lGRmG6DJwfbOKdmFrmu5vGCym3A4x+9bDfhT5ElkVTFh3PJRj/OrC3hhjIuLeJD02hicfpQt7ZxQCUmGJjxg/xfSi5JQfRkkRpLqzsnumH7sCL5s+xqK2jnLDcUzD8piLcPjpmtSG5kuCHSJ0A5GTgMB6VRu5IWv5FhUO8C5lSVc5J9DQBoxRRlP3braB8F40XuferYVdixO7Eep4z7ViWc9xNMVe6McYO3yxyK2TFtiYRkli24N9aCWiCW0T7J5UcYDEk4Awc/WrEEBjKb5SSqgknryKH8x0xG4d4sZ+v/6qR7hPNMLfdUby2fXtSsKw2Z4XuBE1utw6qXLHnFQ2dhptuz6lHpkNrcyfffYAzfU1Yy6xs6tJ/ez978Kge8JRVMTkyZwp9hRfuhqOpnar4f0PVo/tNxYQfaEG7dt+bHvXCapoOoaUZJLW9eKyM3+qcnY0JxuBx39DXoMpneGaJU2FY95PcVzOu22rjTHuNMad7leQqtyg7so7t7VjWXMtEaWSOZuJZNK0qFg7GaZGzdJIWWGBfu4468mqc8z6nDH9i1TUUvYoBKhL7hK/ZSpPBPrmpdP1PWhJd2k8k17NAWL2d8vltIrY7DI4xxz3rn9S0TUzFe38WkTGzEofzkAO1RnjrnFcKw8r3YJxLcOmS+al1rWn6lFcKpl815AgV8ctkE78n6VradFZ/wBkWV7ew3S32NqwlAyyg98Z4rB0bw5caloza1HeQkwPsNtOT8g7nkYyf6V0jaPO1vH9h1W3m4ZkCgJLLz0XHAx256Uqi6Md4jNPu55r6a1tnEbhGCwsdqttBJ59eOPeubjm0TxXayWo0i5g1JicTT3h27x94t8vA68V08Xhy6t7eS8W42opRirSEsrH73PY5NNi0GDUI7yW0uLgyo22ZJ1AwepIIJzSi4xD3ehz2vWNxqsNrNb2s8clmix5iw6uVwAVJIPUelULu01S6iRru+nTnYYEbMpYjqV7cY716PB4R082qyXcMUAVf3MiDbvbHtWde+G/Pgmma1sobuJcrck7XlUfeXIHp2q41Ig0cE3how2g+zTtNdSgq0EQBcD35rFvNKvI7tUmi8mPdgPOeAPwzXoA0KS3sbSRrSOJJQQskOATyep65rMutAkluGlwMo3Udl96pVUnoZyOKbfbzmEjgHG7HWrtpeLZP9o8tLqJHVniY4LAZ4Fa8uhOlnbzAGYXJ2rIB9wetc3dLNDcSI0n7pSVLY+9itFLmEnY7W5+IF7qVxbPBB9miAETbFxyeo9xxW7ONRUJcWlzNbzXV0H+1CQqtvGQTwO46VxnhiRA0C3CrwxlVP7+RxXUaReXDaXf2159pe7UrLFvUYCDqAc+4pSVtTeOq0MLXtK1JteH26XevmE2zr0lQgkt+JANczJG0lwUYgKTlUbofcV39xdPmXUri7mkt4iGWBnyuCNuD9N1O1TSGlhsr+KwsRFAVikjVzibJGO3YVPMYzTOe02/bR4tpmmWWYgxwjgKBwTn0OD+dRzw2P8AZXn/AGcR3UMjMz5wxVz0/Xit6KCRbTVIwFkFlO0MZVQwjDjdgE9cZrlWtJbVblrY+ZbzKq+Yw27CDk5H1obI1NPRbnI8rLqqnKgnJ5rdtNVv4LbzIITOHyvIrn9Ovo7S5imaFXcDt0auv0rU7VpmjjVYyMF1PaspNDVxtnr0k6xR3Ns6MjHO3tXU28shjDMrbeuD6VURILj/AFUYj3HhsdasxzOoKmQMF+Ums20Wk2fOuzd82OfU0MvHJxjnipWAUqrPt3H5d38X0pI5FSZWdWKL1UYzivVRn1NfwcII/FulXEjAJHLubcMjO0/1r0+3utYe+vrixYT3Qn3RxkDD+uA2ADXksc6WmoRyorLG7B0JxkDPfFekaHcSyyXNzcrKyzTh4wp5AwenpzinFm6ehLBcCTxF9pTeHLHz3CHO8/eQ498//qruLREWa0IjXEOSCe+T7/Wua+x3D+JJ7eGZoWkMTM6cNH8g5PvXVQvZrcpZh3lvI92PM48zAz+eOarmBq6Ogl07S7ohprWOSdRkHGCPoafFJBAyQZCOeAkY5/E1HYiV7XJA3MOo/wA5q/DZQxkMzsZcfep3JtYzZ/3r7CGMIGCXXa2fXPepbPT7RZBLuE69QT/D+FaskayLl/n5/i6j8KY1rBbIzomNvJ57UySJ7aS4VRkqmeqnG4e9I1hDucMi7WwTIMZOPX1pLyR5jHHA7RPjk4BBBp4iliSMmONsD5ivegQwxfY4pHhtYpCDkEcE063vZJgJGjKSYw0VMleOOPMxZVPIK0Jdre25eANCR8u84JA9aAESeSKS8mmh8mFcMH6k8elNiuLVVS5aVSkq9Auff8Khe3nEiKs6ygnEhZsZGavOvlIVjtDt3YBjx0oAruEZFmgaQbnHG7Ab8O1BEEsyoHk87BIfllX2qSS0mYloygUkZEgJPWpjKYdtulu+09WjxgUrDuV4Lbnzmm3MDggZw31qysMcKM0KBmyT7A+1RpMW2oXROegU5FNtIsB1815AXySeKYXuQz6fBfyF5bSKKbK4mMQZsDPGaniWygUwiCCKJ+CioAH+opzZWLO5wAcfeqndQWzhUd3hl++qkjP0pXCxX1bw9bXnz20cKoiFWttg8uXOPvDpxjiuDuvDFnp+uW0capEpOT5SBAhI+4ccfjXb61e6nYyW629vHPZPlbiRmwYieh9643VLTxXqFtqdjLp0cESKrw6ij5WQpwFK9cEEngda56lFTYWIoZbpbee2tXE8omJCsoJwvG0jofXr2qw76tFKg+zJEzpndAgAf61znhC3vo9c8nzkPn+ZJKoziGQZzkHpnnpXTWzXUt7D5SSygMfMYSbuOny8+tclWhyG0Wh1kk90xlvLl1kicZi8sYVgPlKgcY6VOtkXtT58pc4YsoHBBJz+NWRFcW0zpJHHbtklfNPJHX+HOKijmwsEuwli+wIx+Vcnr71ioFpCS2tg1hbmJZIikhCluvQcH2qutovm+WUGG9BmtGN4muZonKlV5LFch2+napDHmdGUxjJxgZBqeSw/YoxtQ02NLcWpbYjfcKjG2uel8F2lnYXLfaY7hnXd5bIGPHfmu0up40+WX5XPAJGcmst4RMjMhRmPLEDlaPauJhUgcjYadaadZiGWzLys5NvOOWK+w7AelbVqUS9JLx7LdDEJWQ4dfUrjnpWmLZI1BIyfujJ6fT0qCRCAUViHzuyBjFUqre5GqOaaz0+LT54g0gu55i0MYB2n5uSR0Aqe7gupGs9PgdI7eNjJLjjeR2b15raa3+0Yd2xjPTvz3p1zbxmMBUV3AADMOgp8xN2c1LKrpJb2o2wSyfaJwvGXBxj8uaqTaXEYcJFtySSd+c856VvNaQA7dixsOQUHBP1qMqgdzsG9l2kY6Y7ii4tznJtMhSSJWVgAONo4zWzaWYt7p3aND5hADbecU8ThLdd4GxTkFhyav2UsckhlYYJHHpUsEjYU7fIWIZVD1HFXGjSN1YxhA4BPcGsxZo0HmNJ054qzHMZI1CsSz9Ce1K5vA8dW2jubxgIQWkG0bhxEPUVQj0oTzTQru3E43behrs9KurSzghTV7SRckhRsP3R3z1qPV5NOms5ItMikikc5Us4AYdue1ejzC9muphppci2lxDJb52gAOVztx9K6PSbvzrmJY1LsIAgiU454Of0rCtbzUyfscoZAyEKSw6+x71GHudH1GC4kmZiQrMI15BPb8OlNS1CKS0PUmjsYNZ+33iTW8r26KsxlbbuAAwefT1q3cuzYvVgEW0bmkBO5sDhhnng4qOGzl1uZLqK+Aja3UPDOgKdAQcYz1x71q2dnFc3ix3TK01uBvJDBXXGOAf5Ve5rsjW069ugsTXJVVZRmZB98kcZrVVJXjdcvvyCPcfWspHt72aa2uoGjiicIihsBhgcqe4q/KjW8CpDKCqDCjJJK961iZyLa2KOu93feB1VzgVHJaT/ZmFuf9YMfvD0H4022MKqAyrGW6B5uT+GalnKPzJvZUBzKGwB9PWqMrk6qkcIEhUS7cZJ4yKjBmlJDOEjBxkL1qta3lqbVy07yKGPzPHnP04p73DT2YmtGfDdA643+2O1AEsskMaFZXR0Tg4wefpVZZZoblUNmixyDh1x0pLMkFhNA6q/3yVGM/wA6vLDBCB833ifvnqPSgCFDG5ZpZYn28BTjK/THWpI9iW5CSEEDd8uTioLiMLiO3jjRn4xjnFRI88cTwwSJ5wOBkY2c9z3pXAtGQyshwxXbySSp61KJA0LG2IZsc5bNUHaUOI7lmEp43D7rVZhnjhlitwpQHoSuM00waJfNckYVV99vWorrf9nK4UMe6mpZXVWkR3RDjjc2KrtsS2DiJWA4OG5J9qGCK1zbzBkCuBFGoZiT1/CotVn0/wAtIrm8TzmbZFnG/P061oAwSQJv278DywzfNn0NZH2Z3hS9uDAJDIGVzEGKfTjNRYq495rCdvsVy8hRyCq7T+89enSsnxJpOrXWhXNhpt9MryMHVWO0BM8jf1/DNas8BuGjE8pZiP3bouw/U1XjlvrKJoroFYTkqxbdmqsNnl95ompeHfEOm6jJaySxLKILl/NcrMG+Vd205zyK7C6tLrStbGnxW0i2twjNG4OAjq2NgK84wCcmunieJdPlNwskkRw5CJvOfXGPXmqcsgvnVYpBewEFJEUlXA9z2/nUTipKzBGDMwSSWQRytgZb5y27A56njmnaekNzNGLrfZjGUJyVB6jrUMduLO9uLR45CkbZ37+NnUcnrg8VbEUbypb3KnkAg7unPp1rzai5XY2TLV1bRwW7+TMXcZLsMDII9aaghjIaNiTgHLEk/rTJbMMzvbCQ4k8vCjI6DqKhFzO08ZlXM5BO4ABcjpxU81zTnJllEzOpkVwvzKMDBqO1aERMNyqzcbR0qG1WZlTBHDH5QB0qSUFWX5eAckhfu+lZySIchJ900pjQ8DJ+6ajltWfYFPON2fWrMSs8Qy/rg5qxKDInygrKvyVJnKzM4IoDKSQeOKjkiUhsEkir6qI4yWdSwGOneqpLbPmHzE5BHHFBnZFSa2VrUSEEYPIAxWFeedC/CkhckPXTErIpXf8AKPeqtxEJEdosNgU0Jo5C8/1Fubfe7bSXVh7mtOzDxwK5VixX7hFW10wTRPI74bbwApFFtbzRtNIu7aIyBu+laXCxatZFaIEIBn1HNX4GiOAZDj1H8NUZIvuEMdyjJApRlZ4WlXZGx+6OposmUmcPqN5PJcRpd3FvJCmdhKnLZ9waSxsUmtmgmb9w+CcEYU9s96de6VJdWMr+ZbrJFjZ82FIPoaXRtHvFDulxHwpBIbIz2+veuiTHzMdc6OsL26KHdQP3LuflBHoRTdQ8P3MksUobzmcBW2A8c11lnbtc28ZlcytGpBiAwrZ9R1/KpPsqI4lhtzbyIQcxvnB7jHp1qFOzIW5qaYkun2tsJNzhVKlWGAB04NXrjUk0qFNVeO5lX7hVQOFxgscjoB/KsqeVpWT/AEggOCGHQiprO7SANbXERaNQclud6kcgduhrWNXU15tNTp47iC+SO4t5Vlh8sNC8ZHC9/wBc0sMs0E8duzG5MpJ3jgxD3rxzW7e98P6oke5447gbrTa5AUE8DHrXaeGPGmn3oFpqbfY9XjwpV+BJ6YrdVCrKS0PRJbOylRJ5ohMQcBxnKmrm6NVEUqkoOMt3rEghsI41kkk2ySchnDcn2GasHVrKFlWSXEucNv8AlL++DW3MjGxeuLq1tI1xEXDfdRUzn8qzX1CWdymmz7GX5milAXH0zTRqcEubgRGGNG5kz1HsO9Om1i2LkW8DXLhcmWKPcU9AQO/WnzIXKy3p7zPuNxMsrdgOx/CpZ5JGC74XdO/GCD61lC482IXKQmaRflkTPlFW7jBq/p8kn2po5xKu0Zy5zk+gPpQmDiyyIVliVRIuF6vnkVnS2l55rsrxyRqwwAp3HnPXpRqc8NvILO1jZJ5WBLKdoGPUn2quGublpXmdpLcMOFOASPepuhpMmu79bWJ5r1gsan90m4b/AFpItf8AtUULCykLt93LqWX3xVS21mxl1UQRRymZE/1D4CdfUirFxq2lIJZ2ezinh6nzQ+B9FIp3Q7FgSwzki5SRpc4AnGDj1GMUmyO3ljjE5KFw26Q4C/Ss/SZ4dU3z2BlSMNlpGjKo303ZrRBju4FXy8knqRuGfU47U7oViSSAeYjR3UJOSYzkHd6VWFvJDHsZJW8yQFN38NQohsfKhRogpJLCbhk909quuwniXy7sFlYbBnn8aQDxMN4SW3YNCu0nHBp/lw3lusEvyqEG0+uRmoRfMRcwXBkTgHz/ACiE/E9sVlReJNKvrs6ZBOouYjtRi3Dntg9+M1QkmbVlFNaW8rBgVAIAHUY4Fctaiax1cxllaS5DSrKiEFz/AHCvc/Stt5JVfyll2syjJB5zjnArB1O0a9glhE7ecpDxyE/NG4Pt7ZqWUh980c8zOyjDJtYDqp9x9ax4rg3GobiQjFCvmHtgcUt9cGH98xCS4VJMfxEd6itrVriRygy7gsB6cV5mI1ehWpp6bcSWkdwYrvLyNyxHHTFF9u8yNo2UtHG3JUrn/Go7ZHtiysingHBHQ1IZVZyC+5cEbSOa5tQSZHDG8UaAOu/dllUcirVtaSyySF5XWIkZXH3qcIIXhEiu0bbeQR3quk0kSMzM2Aew60ne5aRawqu8TKcqePao2d1eRmOSO1EkqJFI/lF52wQxft9Kjm/fLiM7XJ5z1oJlEhRGmhldH25b7rVHKZ3Qbmw2OAtTJK6YSRAzMMZHGMVGzJcBVjBDk4J+lCIM4pOquzqdoz/OpbaTagQ5CuSSQPQVJcv+7c7CfLfbx35qrBOx85Q6BVUgZHIzxWisIu7FSTyxkqBwfXNIrLjySMDt9arWcxkmRS33PlBPf61Y+c7wdpxn7o70hjmij8ssM7mGGx/D702A29yyxPsBj/5asrHHvxUkKiVGbcF9OP1qndD7I4A5UH52HY+1UmUkZ1z4fi1CwCRS7bc5IGcrz2pdJ0FYYzFHGwihT52PIL/5zWHeanfW9xNFp7SyW2/MIYYGK1bDVbmGJrcKV3/vJGY/xdh/OiVyeU6W3jS3XamOAA3r9M1Vmgkji8yOJkkeTOQOabYFrt1upCqKfvgHjNaSzKb0guB5a4UMetRdjUDMaCQzlxxJsJJbnJ+lRwyF2SSU/OrAEZ4HbitK6jae4O19hKgj3wf8KgltnmuNvlMuBnGOOOad2h2LWqWuna9YwvKgE0QzE44Klfb8K46/0GBrkz3UWxG5+0RjDZxXRiXyjCwCxhyRwetayPG8CQyjcr5XYTn8a3VTQcUyp4d+3pa7Li9MywfJE5XcVT/GtCwQ6hfst9pzlycpcs27d+ArltbS4tdPD6eQ4iZjLsHMg9DWNZa3q2kgTec0MfmKgjVuDntmuiFWyHoel6hbOZDAyzxIB8m0/Ip9TxVTSdYhto2trqzmsiQTFdTD5JiPT1PPSsH/AISW4cieW9aFo+QsjYWQf+zVuSeLdGWIxXMe8OgyFGS3rgds8VqqqYrEsNtc6jqD6jCjWABJXIIE2T9/B/zzUGveJNVspIo7K2S/kzt8uD7zemPWrdjq9tcRxSRSSSTscRiToB/dI7YrEv202yuLjUbgG4lt5D5biIgFjx1z7mrc9As0cyNR1/VvELteXV3ZyrMq+SSPkBI4PHpV3X/FXijT7m5e0tn+wWTbRLIm5TzjORjFY2m3V/Lfy3kgmjhjmYBuuSckCu38PwKILqeCSWB3BY/aJQ4ZupHT5QeneslLUpXM/RrrU9T8OLq01xDbtcZJYLvzGDgsMY44NP0Pwz4dvSdQZZrYLl/NknGLoZ5bGOBnPHtWr/bctqYkuJ9Hs5tpJTz92B2UnA69enes/wASrDcaa88lo8ku3c4ikyn++nHJA5x3xWjkNxOoe11KR4ore8Q2CkbdqckfWtBALa22s7uxUgRseteSWPiHUHmhOneIdWnRWAkt2xjHqW/piu1tNRuWgD6irTRMMxFn3Nn0oUzNo2pi0ixyzIXkAZMYxgD0qS2ghZpbiFopBJ/yx2kFf1rPgvLfU3WdYY1jTAYCTcVx14x71dm1CIRMYI0MsfyI8nyq9WncRFqst2IWh8pXtSuZcg7gPQVSj0a3uHSYOtu5JkFyoAaMDjk9MjOK07q7tk0yS7u182SFMOuOP8iuBmvZrSVZLW/kXTLrLvkcRHrkeufShzsB6TbRI0ayIwkZVCLK3zHOOtYc/kWF04YgTSOdxY9TWNeeLLWxtwLC4866miUZ3YzwAWx2OayF1q5vpTbykO0Q+aQtyTWE6yQ7F/UYxcPymApLYz2p9ncpFIpjYO49Dzip7ZzIiyFOShjIPPakhtiy7VVUdRkMK4Kkru5UUXSzCMSKpbdnIAyRQNklm24qsgI4pIJV+yNL5SiTaY+T95vWmK7IpA+RyVycZrOxoOjkb5Y1BIxxUc7yNsSTKjdyCO1DSiKUAjfJnG/pTrohiuGAfv7ihohuxBISGOGQhehzzinRSh3VVcI7JkE1WlUtJ94AgYX3FSNEq7JDjcqgVNmTe5Lewv8AKoy2VyrCqBMlqNoJHdSfWtT7xUgjdgjGapvFMsreaA3QqKEJorC4JkMTsF3/ADE++KFhRFYBdwlI+b8eajljn83cYwV6fSp1xzEx5UZwKomwhiSGTAHytzkc4FTonlxnaXPoQKEB2llkJymDx0pssxtIhcby8ajaw9jSGlcdbZaMqzgA5Gc1K1ulyB5qfuyc8HqaWwlgurVBGi7uoB96JphbRgq2xVPz7ulNJlqJ/9k=",
"path": "images/5pts_ADE_train_00008073.jpg"
} |
depth_point_120 | images/3pts_ADE_train_00018965.jpg | ADE_train_00018965.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 203 y = 212),Point B is located at (x = 208 y = 167),Point C is located at (x = 94 y = 189).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_59><DEPTH_29><DEPTH_31><DEPTH_31><DEPTH_49><DEPTH_63><DEPTH_3><DEPTH_29><DEPTH_35><DEPTH_36><DEPTH_6><DEPTH_6><DEPTH_85><DEPTH_20><DEPTH_30><DEPTH_44><DEPTH_67><DEPTH_70><DEPTH_5><DEPTH_80><DEPTH_34><DEPTH_33><DEPTH_26><DEPTH_30><DEPTH_22><DEPTH_63><DEPTH_67><DEPTH_29><DEPTH_35><DEPTH_40><DEPTH_52><DEPTH_21><DEPTH_6><DEPTH_31><DEPTH_10><DEPTH_5><DEPTH_80><DEPTH_70><DEPTH_27><DEPTH_82><DEPTH_119><DEPTH_119><DEPTH_20><DEPTH_27><DEPTH_42><DEPTH_17><DEPTH_14><DEPTH_54><DEPTH_121><DEPTH_57><DEPTH_119><DEPTH_119><DEPTH_51><DEPTH_8><DEPTH_98><DEPTH_31><DEPTH_98><DEPTH_50><DEPTH_42><DEPTH_57><DEPTH_98><DEPTH_119><DEPTH_54><DEPTH_12><DEPTH_47><DEPTH_79><DEPTH_8><DEPTH_23><DEPTH_94><DEPTH_12><DEPTH_119><DEPTH_119><DEPTH_54><DEPTH_16><DEPTH_47><DEPTH_44><DEPTH_121><DEPTH_57><DEPTH_42><DEPTH_57><DEPTH_47><DEPTH_98><DEPTH_73><DEPTH_16><DEPTH_55><DEPTH_73><DEPTH_12><DEPTH_84><DEPTH_9><DEPTH_46><DEPTH_61><DEPTH_121><DEPTH_84><DEPTH_85><DEPTH_14><DEPTH_40><DEPTH_45><DEPTH_82><DEPTH_61><DEPTH_72><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 3 | [
"C",
"B",
"A"
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",
"path": "images/3pts_ADE_train_00018965.jpg"
} |
depth_point_121 | images/4pts_ADE_train_00017985.jpg | ADE_train_00017985.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 216 y = 191),Point B is located at (x = 289 y = 129),Point C is located at (x = 198 y = 99),Point D is located at (x = 266 y = 218).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_59><DEPTH_31><DEPTH_59><DEPTH_49><DEPTH_29><DEPTH_3><DEPTH_70><DEPTH_59><DEPTH_29><DEPTH_59><DEPTH_5><DEPTH_59><DEPTH_70><DEPTH_49><DEPTH_31><DEPTH_31><DEPTH_70><DEPTH_70><DEPTH_29><DEPTH_67><DEPTH_30><DEPTH_67><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_43><DEPTH_60><DEPTH_17><DEPTH_59><DEPTH_83><DEPTH_5><DEPTH_59><DEPTH_70><DEPTH_70><DEPTH_5><DEPTH_80><DEPTH_28><DEPTH_82><DEPTH_17><DEPTH_22><DEPTH_22><DEPTH_59><DEPTH_76><DEPTH_49><DEPTH_17><DEPTH_23><DEPTH_62><DEPTH_39><DEPTH_5><DEPTH_30><DEPTH_17><DEPTH_38><DEPTH_63><DEPTH_58><DEPTH_67><DEPTH_0><DEPTH_48><DEPTH_57><DEPTH_60><DEPTH_59><DEPTH_3><DEPTH_60><DEPTH_22><DEPTH_40><DEPTH_20><DEPTH_19><DEPTH_71><DEPTH_66><DEPTH_60><DEPTH_29><DEPTH_36><DEPTH_60><DEPTH_33><DEPTH_53><DEPTH_59><DEPTH_19><DEPTH_75><DEPTH_63><DEPTH_43><DEPTH_72><DEPTH_72><DEPTH_77><DEPTH_12><DEPTH_47><DEPTH_72><DEPTH_76><DEPTH_0><DEPTH_83><DEPTH_77><DEPTH_41><DEPTH_2><DEPTH_2><DEPTH_63><DEPTH_61><DEPTH_64><DEPTH_39><DEPTH_8><DEPTH_18><DEPTH_8><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 4 | [
"C",
"B",
"D",
"A"
] | <DEPTH_START><DEPTH_59><DEPTH_31><DEPTH_59><DEPTH_49><DEPTH_29><DEPTH_3><DEPTH_70><DEPTH_59><DEPTH_29><DEPTH_59><DEPTH_5><DEPTH_59><DEPTH_70><DEPTH_49><DEPTH_31><DEPTH_31><DEPTH_70><DEPTH_70><DEPTH_29><DEPTH_67><DEPTH_30><DEPTH_67><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_43><DEPTH_60><DEPTH_17><DEPTH_59><DEPTH_83><DEPTH_5><DEPTH_59><DEPTH_70><DEPTH_70><DEPTH_5><DEPTH_80><DEPTH_28><DEPTH_82><DEPTH_17><DEPTH_22><DEPTH_22><DEPTH_59><DEPTH_76><DEPTH_49><DEPTH_17><DEPTH_23><DEPTH_62><DEPTH_39><DEPTH_5><DEPTH_30><DEPTH_17><DEPTH_38><DEPTH_63><DEPTH_58><DEPTH_67><DEPTH_0><DEPTH_48><DEPTH_57><DEPTH_60><DEPTH_59><DEPTH_3><DEPTH_60><DEPTH_22><DEPTH_40><DEPTH_20><DEPTH_19><DEPTH_71><DEPTH_66><DEPTH_60><DEPTH_29><DEPTH_36><DEPTH_60><DEPTH_33><DEPTH_53><DEPTH_59><DEPTH_19><DEPTH_75><DEPTH_63><DEPTH_43><DEPTH_72><DEPTH_72><DEPTH_77><DEPTH_12><DEPTH_47><DEPTH_72><DEPTH_76><DEPTH_0><DEPTH_83><DEPTH_77><DEPTH_41><DEPTH_2><DEPTH_2><DEPTH_63><DEPTH_61><DEPTH_64><DEPTH_39><DEPTH_8><DEPTH_18><DEPTH_8><DEPTH_END> | 216 | 191 | 289 | 129 | 198 | 99 | 266 | 218 | null | null | 110 | 41 | 11 | 71 | null | {
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",
"path": "images/4pts_ADE_train_00017985.jpg"
} |
depth_point_122 | images/4pts_ADE_train_00002480.jpg | ADE_train_00002480.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 31 y = 95),Point B is located at (x = 245 y = 133),Point C is located at (x = 230 y = 188),Point D is located at (x = 154 y = 147).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_29><DEPTH_31><DEPTH_3><DEPTH_67><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_70><DEPTH_70><DEPTH_49><DEPTH_15><DEPTH_38><DEPTH_49><DEPTH_30><DEPTH_67><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_29><DEPTH_19><DEPTH_72><DEPTH_36><DEPTH_49><DEPTH_5><DEPTH_70><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_49><DEPTH_70><DEPTH_67><DEPTH_3><DEPTH_70><DEPTH_70><DEPTH_70><DEPTH_70><DEPTH_67><DEPTH_67><DEPTH_3><DEPTH_3><DEPTH_31><DEPTH_31><DEPTH_49><DEPTH_29><DEPTH_49><DEPTH_49><DEPTH_31><DEPTH_3><DEPTH_29><DEPTH_36><DEPTH_36><DEPTH_64><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_44><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_44><DEPTH_19><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_1><DEPTH_94><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 4 | [
"B",
"D",
"A",
"C"
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"path": "images/4pts_ADE_train_00002480.jpg"
} |
depth_point_123 | images/4pts_ADE_train_00009365.jpg | ADE_train_00009365.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 31 y = 200),Point B is located at (x = 296 y = 156),Point C is located at (x = 269 y = 224),Point D is located at (x = 165 y = 214).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_49><DEPTH_40><DEPTH_3><DEPTH_31><DEPTH_3><DEPTH_5><DEPTH_49><DEPTH_73><DEPTH_121><DEPTH_98><DEPTH_49><DEPTH_40><DEPTH_70><DEPTH_70><DEPTH_31><DEPTH_67><DEPTH_40><DEPTH_73><DEPTH_12><DEPTH_42><DEPTH_49><DEPTH_60><DEPTH_3><DEPTH_35><DEPTH_3><DEPTH_67><DEPTH_40><DEPTH_73><DEPTH_12><DEPTH_121><DEPTH_31><DEPTH_31><DEPTH_25><DEPTH_40><DEPTH_67><DEPTH_5><DEPTH_3><DEPTH_73><DEPTH_23><DEPTH_42><DEPTH_3><DEPTH_38><DEPTH_72><DEPTH_40><DEPTH_22><DEPTH_67><DEPTH_40><DEPTH_35><DEPTH_12><DEPTH_42><DEPTH_3><DEPTH_49><DEPTH_60><DEPTH_58><DEPTH_41><DEPTH_3><DEPTH_40><DEPTH_20><DEPTH_12><DEPTH_42><DEPTH_59><DEPTH_59><DEPTH_5><DEPTH_58><DEPTH_80><DEPTH_72><DEPTH_78><DEPTH_84><DEPTH_57><DEPTH_121><DEPTH_31><DEPTH_5><DEPTH_82><DEPTH_31><DEPTH_9><DEPTH_67><DEPTH_63><DEPTH_66><DEPTH_57><DEPTH_42><DEPTH_37><DEPTH_17><DEPTH_63><DEPTH_1><DEPTH_58><DEPTH_17><DEPTH_66><DEPTH_58><DEPTH_32><DEPTH_42><DEPTH_35><DEPTH_11><DEPTH_67><DEPTH_49><DEPTH_70><DEPTH_59><DEPTH_31><DEPTH_73><DEPTH_66><DEPTH_57><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 4 | [
"A",
"D",
"C",
"B"
] | <DEPTH_START><DEPTH_49><DEPTH_40><DEPTH_3><DEPTH_31><DEPTH_3><DEPTH_5><DEPTH_49><DEPTH_73><DEPTH_121><DEPTH_98><DEPTH_49><DEPTH_40><DEPTH_70><DEPTH_70><DEPTH_31><DEPTH_67><DEPTH_40><DEPTH_73><DEPTH_12><DEPTH_42><DEPTH_49><DEPTH_60><DEPTH_3><DEPTH_35><DEPTH_3><DEPTH_67><DEPTH_40><DEPTH_73><DEPTH_12><DEPTH_121><DEPTH_31><DEPTH_31><DEPTH_25><DEPTH_40><DEPTH_67><DEPTH_5><DEPTH_3><DEPTH_73><DEPTH_23><DEPTH_42><DEPTH_3><DEPTH_38><DEPTH_72><DEPTH_40><DEPTH_22><DEPTH_67><DEPTH_40><DEPTH_35><DEPTH_12><DEPTH_42><DEPTH_3><DEPTH_49><DEPTH_60><DEPTH_58><DEPTH_41><DEPTH_3><DEPTH_40><DEPTH_20><DEPTH_12><DEPTH_42><DEPTH_59><DEPTH_59><DEPTH_5><DEPTH_58><DEPTH_80><DEPTH_72><DEPTH_78><DEPTH_84><DEPTH_57><DEPTH_121><DEPTH_31><DEPTH_5><DEPTH_82><DEPTH_31><DEPTH_9><DEPTH_67><DEPTH_63><DEPTH_66><DEPTH_57><DEPTH_42><DEPTH_37><DEPTH_17><DEPTH_63><DEPTH_1><DEPTH_58><DEPTH_17><DEPTH_66><DEPTH_58><DEPTH_32><DEPTH_42><DEPTH_35><DEPTH_11><DEPTH_67><DEPTH_49><DEPTH_70><DEPTH_59><DEPTH_31><DEPTH_73><DEPTH_66><DEPTH_57><DEPTH_END> | 31 | 200 | 296 | 156 | 269 | 224 | 165 | 214 | null | null | 22 | 202 | 101 | 67 | null | {
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"path": "images/4pts_ADE_train_00009365.jpg"
} |
depth_point_124 | images/3pts_ADE_train_00019656.jpg | ADE_train_00019656.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 94 y = 168),Point B is located at (x = 58 y = 203),Point C is located at (x = 276 y = 184).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_69><DEPTH_77><DEPTH_77><DEPTH_77><DEPTH_77><DEPTH_77><DEPTH_77><DEPTH_77><DEPTH_77><DEPTH_40><DEPTH_3><DEPTH_67><DEPTH_5><DEPTH_67><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_49><DEPTH_3><DEPTH_31><DEPTH_49><DEPTH_3><DEPTH_67><DEPTH_3><DEPTH_3><DEPTH_3><DEPTH_36><DEPTH_74><DEPTH_29><DEPTH_3><DEPTH_60><DEPTH_70><DEPTH_67><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_29><DEPTH_74><DEPTH_40><DEPTH_59><DEPTH_38><DEPTH_60><DEPTH_17><DEPTH_3><DEPTH_31><DEPTH_49><DEPTH_31><DEPTH_29><DEPTH_31><DEPTH_59><DEPTH_60><DEPTH_25><DEPTH_35><DEPTH_67><DEPTH_67><DEPTH_70><DEPTH_3><DEPTH_49><DEPTH_31><DEPTH_3><DEPTH_33><DEPTH_20><DEPTH_49><DEPTH_3><DEPTH_3><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_59><DEPTH_59><DEPTH_65><DEPTH_53><DEPTH_29><DEPTH_64><DEPTH_36><DEPTH_64><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_29><DEPTH_65><DEPTH_24><DEPTH_74><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_19><DEPTH_80><DEPTH_80><DEPTH_0><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_41><DEPTH_0><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 3 | [
"A",
"C",
"B"
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",
"path": "images/3pts_ADE_train_00019656.jpg"
} |
depth_point_125 | images/5pts_ADE_train_00016425.jpg | ADE_train_00016425.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 133 y = 158),Point B is located at (x = 158 y = 159),Point C is located at (x = 187 y = 101),Point D is located at (x = 182 y = 123),Point E is located at (x = 118 y = 122).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_17><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_61><DEPTH_40><DEPTH_17><DEPTH_70><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_80><DEPTH_16><DEPTH_11><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_76><DEPTH_44><DEPTH_58><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_80><DEPTH_66><DEPTH_69><DEPTH_17><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_70><DEPTH_6><DEPTH_76><DEPTH_19><DEPTH_64><DEPTH_17><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_17><DEPTH_68><DEPTH_66><DEPTH_58><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_17><DEPTH_11><DEPTH_13><DEPTH_83><DEPTH_32><DEPTH_77><DEPTH_6><DEPTH_17><DEPTH_20><DEPTH_17><DEPTH_13><DEPTH_63><DEPTH_12><DEPTH_25><DEPTH_40><DEPTH_73><DEPTH_60><DEPTH_70><DEPTH_20><DEPTH_35><DEPTH_39><DEPTH_4><DEPTH_68><DEPTH_68><DEPTH_68><DEPTH_68><DEPTH_68><DEPTH_61><DEPTH_61><DEPTH_61><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 5 | [
"E",
"C",
"D",
"B",
"A"
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"path": "images/5pts_ADE_train_00016425.jpg"
} |
depth_point_126 | images/5pts_ADE_train_00003330.jpg | ADE_train_00003330.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 208 y = 102),Point B is located at (x = 324 y = 133),Point C is located at (x = 235 y = 151),Point D is located at (x = 247 y = 135),Point E is located at (x = 57 y = 223).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_81><DEPTH_15><DEPTH_44><DEPTH_64><DEPTH_45><DEPTH_60><DEPTH_77><DEPTH_74><DEPTH_36><DEPTH_2><DEPTH_66><DEPTH_15><DEPTH_44><DEPTH_36><DEPTH_45><DEPTH_5><DEPTH_73><DEPTH_43><DEPTH_44><DEPTH_74><DEPTH_78><DEPTH_29><DEPTH_44><DEPTH_36><DEPTH_25><DEPTH_20><DEPTH_73><DEPTH_83><DEPTH_72><DEPTH_63><DEPTH_58><DEPTH_74><DEPTH_36><DEPTH_64><DEPTH_64><DEPTH_58><DEPTH_75><DEPTH_22><DEPTH_69><DEPTH_49><DEPTH_58><DEPTH_31><DEPTH_74><DEPTH_74><DEPTH_44><DEPTH_49><DEPTH_69><DEPTH_83><DEPTH_74><DEPTH_76><DEPTH_81><DEPTH_74><DEPTH_64><DEPTH_69><DEPTH_36><DEPTH_38><DEPTH_64><DEPTH_69><DEPTH_58><DEPTH_69><DEPTH_81><DEPTH_66><DEPTH_9><DEPTH_72><DEPTH_38><DEPTH_82><DEPTH_74><DEPTH_1><DEPTH_2><DEPTH_27><DEPTH_72><DEPTH_36><DEPTH_36><DEPTH_19><DEPTH_82><DEPTH_72><DEPTH_3><DEPTH_9><DEPTH_14><DEPTH_15><DEPTH_2><DEPTH_66><DEPTH_2><DEPTH_66><DEPTH_0><DEPTH_7><DEPTH_29><DEPTH_60><DEPTH_72><DEPTH_60><DEPTH_42><DEPTH_42><DEPTH_42><DEPTH_94><DEPTH_98><DEPTH_82><DEPTH_22><DEPTH_29><DEPTH_30><DEPTH_31><DEPTH_END><DEPTH_END>. Since point E has a higher pixel value on the depth map, the answer is that point E is closer to the camera. | E | long | 5 | [
"D",
"C",
"A",
"B",
"E"
] | <DEPTH_START><DEPTH_81><DEPTH_15><DEPTH_44><DEPTH_64><DEPTH_45><DEPTH_60><DEPTH_77><DEPTH_74><DEPTH_36><DEPTH_2><DEPTH_66><DEPTH_15><DEPTH_44><DEPTH_36><DEPTH_45><DEPTH_5><DEPTH_73><DEPTH_43><DEPTH_44><DEPTH_74><DEPTH_78><DEPTH_29><DEPTH_44><DEPTH_36><DEPTH_25><DEPTH_20><DEPTH_73><DEPTH_83><DEPTH_72><DEPTH_63><DEPTH_58><DEPTH_74><DEPTH_36><DEPTH_64><DEPTH_64><DEPTH_58><DEPTH_75><DEPTH_22><DEPTH_69><DEPTH_49><DEPTH_58><DEPTH_31><DEPTH_74><DEPTH_74><DEPTH_44><DEPTH_49><DEPTH_69><DEPTH_83><DEPTH_74><DEPTH_76><DEPTH_81><DEPTH_74><DEPTH_64><DEPTH_69><DEPTH_36><DEPTH_38><DEPTH_64><DEPTH_69><DEPTH_58><DEPTH_69><DEPTH_81><DEPTH_66><DEPTH_9><DEPTH_72><DEPTH_38><DEPTH_82><DEPTH_74><DEPTH_1><DEPTH_2><DEPTH_27><DEPTH_72><DEPTH_36><DEPTH_36><DEPTH_19><DEPTH_82><DEPTH_72><DEPTH_3><DEPTH_9><DEPTH_14><DEPTH_15><DEPTH_2><DEPTH_66><DEPTH_2><DEPTH_66><DEPTH_0><DEPTH_7><DEPTH_29><DEPTH_60><DEPTH_72><DEPTH_60><DEPTH_42><DEPTH_42><DEPTH_42><DEPTH_94><DEPTH_98><DEPTH_82><DEPTH_22><DEPTH_29><DEPTH_30><DEPTH_31><DEPTH_END> | 208 | 102 | 324 | 133 | 235 | 151 | 247 | 135 | 57 | 223 | 47 | 71 | 25 | 1 | 107 | {
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",
"path": "images/5pts_ADE_train_00003330.jpg"
} |
depth_point_127 | images/3pts_ADE_train_00005865.jpg | ADE_train_00005865.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 98 y = 213),Point B is located at (x = 113 y = 148),Point C is located at (x = 146 y = 175).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_17><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_17><DEPTH_31><DEPTH_38><DEPTH_15><DEPTH_49><DEPTH_38><DEPTH_69><DEPTH_36><DEPTH_64><DEPTH_44><DEPTH_64><DEPTH_58><DEPTH_78><DEPTH_44><DEPTH_25><DEPTH_44><DEPTH_25><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_44><DEPTH_44><DEPTH_64><DEPTH_44><DEPTH_44><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_44><DEPTH_2><DEPTH_2><DEPTH_19><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_57><DEPTH_57><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_16><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 3 | [
"B",
"C",
"A"
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",
"path": "images/3pts_ADE_train_00005865.jpg"
} |
depth_point_128 | images/4pts_ADE_train_00014187.jpg | ADE_train_00014187.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 199 y = 180),Point B is located at (x = 100 y = 130),Point C is located at (x = 302 y = 191),Point D is located at (x = 14 y = 222).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_17><DEPTH_70><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_30><DEPTH_51><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_59><DEPTH_5><DEPTH_28><DEPTH_26><DEPTH_37><DEPTH_13><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_53><DEPTH_46><DEPTH_68><DEPTH_8><DEPTH_6><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_22><DEPTH_8><DEPTH_26><DEPTH_23><DEPTH_53><DEPTH_85><DEPTH_30><DEPTH_6><DEPTH_6><DEPTH_43><DEPTH_53><DEPTH_12><DEPTH_55><DEPTH_12><DEPTH_98><DEPTH_42><DEPTH_8><DEPTH_21><DEPTH_20><DEPTH_42><DEPTH_98><DEPTH_1><DEPTH_1><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_66><DEPTH_46><DEPTH_9><DEPTH_57><DEPTH_39><DEPTH_57><DEPTH_57><DEPTH_57><DEPTH_1><DEPTH_1><DEPTH_32><DEPTH_32><DEPTH_1><DEPTH_1><DEPTH_94><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_9><DEPTH_94><DEPTH_57><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_1><DEPTH_94><DEPTH_42><DEPTH_16><DEPTH_1><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 4 | [
"D",
"C",
"A",
"B"
] | <DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_17><DEPTH_70><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_30><DEPTH_51><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_59><DEPTH_5><DEPTH_28><DEPTH_26><DEPTH_37><DEPTH_13><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_53><DEPTH_46><DEPTH_68><DEPTH_8><DEPTH_6><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_22><DEPTH_8><DEPTH_26><DEPTH_23><DEPTH_53><DEPTH_85><DEPTH_30><DEPTH_6><DEPTH_6><DEPTH_43><DEPTH_53><DEPTH_12><DEPTH_55><DEPTH_12><DEPTH_98><DEPTH_42><DEPTH_8><DEPTH_21><DEPTH_20><DEPTH_42><DEPTH_98><DEPTH_1><DEPTH_1><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_66><DEPTH_46><DEPTH_9><DEPTH_57><DEPTH_39><DEPTH_57><DEPTH_57><DEPTH_57><DEPTH_1><DEPTH_1><DEPTH_32><DEPTH_32><DEPTH_1><DEPTH_1><DEPTH_94><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_9><DEPTH_94><DEPTH_57><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_1><DEPTH_94><DEPTH_42><DEPTH_16><DEPTH_1><DEPTH_END> | 199 | 180 | 100 | 130 | 302 | 191 | 14 | 222 | null | null | 177 | 198 | 154 | 51 | null | {
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",
"path": "images/4pts_ADE_train_00014187.jpg"
} |
depth_point_129 | images/4pts_ADE_train_00018354.jpg | ADE_train_00018354.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 27 y = 172),Point B is located at (x = 51 y = 122),Point C is located at (x = 175 y = 210),Point D is located at (x = 254 y = 98).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_38><DEPTH_49><DEPTH_46><DEPTH_47><DEPTH_7><DEPTH_32><DEPTH_1><DEPTH_33><DEPTH_55><DEPTH_54><DEPTH_29><DEPTH_72><DEPTH_59><DEPTH_67><DEPTH_63><DEPTH_37><DEPTH_25><DEPTH_41><DEPTH_50><DEPTH_7><DEPTH_29><DEPTH_74><DEPTH_64><DEPTH_35><DEPTH_18><DEPTH_62><DEPTH_41><DEPTH_4><DEPTH_54><DEPTH_26><DEPTH_29><DEPTH_74><DEPTH_29><DEPTH_29><DEPTH_3><DEPTH_35><DEPTH_28><DEPTH_82><DEPTH_75><DEPTH_31><DEPTH_15><DEPTH_58><DEPTH_29><DEPTH_74><DEPTH_40><DEPTH_29><DEPTH_59><DEPTH_22><DEPTH_38><DEPTH_60><DEPTH_38><DEPTH_72><DEPTH_74><DEPTH_29><DEPTH_31><DEPTH_3><DEPTH_3><DEPTH_60><DEPTH_70><DEPTH_67><DEPTH_49><DEPTH_74><DEPTH_49><DEPTH_3><DEPTH_15><DEPTH_49><DEPTH_59><DEPTH_3><DEPTH_20><DEPTH_78><DEPTH_49><DEPTH_29><DEPTH_49><DEPTH_49><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_38><DEPTH_50><DEPTH_74><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_76><DEPTH_40><DEPTH_14><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_25><DEPTH_73><DEPTH_4><DEPTH_END><DEPTH_END>. Since point D has a higher pixel value on the depth map, the answer is that point D is closer to the camera. | D | long | 4 | [
"C",
"B",
"A",
"D"
] | <DEPTH_START><DEPTH_38><DEPTH_49><DEPTH_46><DEPTH_47><DEPTH_7><DEPTH_32><DEPTH_1><DEPTH_33><DEPTH_55><DEPTH_54><DEPTH_29><DEPTH_72><DEPTH_59><DEPTH_67><DEPTH_63><DEPTH_37><DEPTH_25><DEPTH_41><DEPTH_50><DEPTH_7><DEPTH_29><DEPTH_74><DEPTH_64><DEPTH_35><DEPTH_18><DEPTH_62><DEPTH_41><DEPTH_4><DEPTH_54><DEPTH_26><DEPTH_29><DEPTH_74><DEPTH_29><DEPTH_29><DEPTH_3><DEPTH_35><DEPTH_28><DEPTH_82><DEPTH_75><DEPTH_31><DEPTH_15><DEPTH_58><DEPTH_29><DEPTH_74><DEPTH_40><DEPTH_29><DEPTH_59><DEPTH_22><DEPTH_38><DEPTH_60><DEPTH_38><DEPTH_72><DEPTH_74><DEPTH_29><DEPTH_31><DEPTH_3><DEPTH_3><DEPTH_60><DEPTH_70><DEPTH_67><DEPTH_49><DEPTH_74><DEPTH_49><DEPTH_3><DEPTH_15><DEPTH_49><DEPTH_59><DEPTH_3><DEPTH_20><DEPTH_78><DEPTH_49><DEPTH_29><DEPTH_49><DEPTH_49><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_38><DEPTH_50><DEPTH_74><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_76><DEPTH_40><DEPTH_14><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_25><DEPTH_73><DEPTH_4><DEPTH_END> | 27 | 172 | 51 | 122 | 175 | 210 | 254 | 98 | null | null | 72 | 52 | 27 | 112 | null | {
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",
"path": "images/4pts_ADE_train_00018354.jpg"
} |
depth_point_130 | images/5pts_ADE_train_00000293.jpg | ADE_train_00000293.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 10 y = 118),Point B is located at (x = 66 y = 154),Point C is located at (x = 155 y = 111),Point D is located at (x = 107 y = 220),Point E is located at (x = 210 y = 196).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_64><DEPTH_36><DEPTH_69><DEPTH_74><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_29><DEPTH_64><DEPTH_74><DEPTH_29><DEPTH_31><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_74><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_31><DEPTH_67><DEPTH_67><DEPTH_31><DEPTH_49><DEPTH_29><DEPTH_64><DEPTH_74><DEPTH_31><DEPTH_3><DEPTH_3><DEPTH_35><DEPTH_67><DEPTH_60><DEPTH_59><DEPTH_3><DEPTH_45><DEPTH_38><DEPTH_29><DEPTH_29><DEPTH_59><DEPTH_5><DEPTH_6><DEPTH_70><DEPTH_29><DEPTH_3><DEPTH_31><DEPTH_3><DEPTH_64><DEPTH_36><DEPTH_82><DEPTH_81><DEPTH_44><DEPTH_85><DEPTH_40><DEPTH_64><DEPTH_45><DEPTH_82><DEPTH_25><DEPTH_1><DEPTH_39><DEPTH_41><DEPTH_39><DEPTH_9><DEPTH_67><DEPTH_40><DEPTH_45><DEPTH_40><DEPTH_64><DEPTH_41><DEPTH_55><DEPTH_12><DEPTH_25><DEPTH_76><DEPTH_3><DEPTH_31><DEPTH_60><DEPTH_77><DEPTH_74><DEPTH_2><DEPTH_57><DEPTH_32><DEPTH_25><DEPTH_31><DEPTH_36><DEPTH_36><DEPTH_71><DEPTH_29><DEPTH_31><DEPTH_74><DEPTH_41><DEPTH_78><DEPTH_31><DEPTH_38><DEPTH_36><DEPTH_36><DEPTH_END><DEPTH_END>. Since point D has a higher pixel value on the depth map, the answer is that point D is closer to the camera. | D | long | 5 | [
"C",
"B",
"A",
"E",
"D"
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",
"path": "images/5pts_ADE_train_00000293.jpg"
} |
depth_point_131 | images/3pts_ADE_train_00010058.jpg | ADE_train_00010058.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 214 y = 216),Point B is located at (x = 255 y = 126),Point C is located at (x = 38 y = 153).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_33><DEPTH_119><DEPTH_98><DEPTH_121><DEPTH_33><DEPTH_55><DEPTH_7><DEPTH_26><DEPTH_36><DEPTH_74><DEPTH_42><DEPTH_16><DEPTH_121><DEPTH_16><DEPTH_57><DEPTH_42><DEPTH_62><DEPTH_5><DEPTH_24><DEPTH_41><DEPTH_12><DEPTH_63><DEPTH_19><DEPTH_78><DEPTH_41><DEPTH_94><DEPTH_19><DEPTH_40><DEPTH_68><DEPTH_44><DEPTH_23><DEPTH_45><DEPTH_94><DEPTH_57><DEPTH_33><DEPTH_94><DEPTH_50><DEPTH_63><DEPTH_12><DEPTH_76><DEPTH_12><DEPTH_94><DEPTH_121><DEPTH_42><DEPTH_94><DEPTH_2><DEPTH_32><DEPTH_57><DEPTH_41><DEPTH_9><DEPTH_24><DEPTH_121><DEPTH_98><DEPTH_121><DEPTH_42><DEPTH_63><DEPTH_16><DEPTH_14><DEPTH_2><DEPTH_29><DEPTH_32><DEPTH_57><DEPTH_66><DEPTH_78><DEPTH_66><DEPTH_58><DEPTH_94><DEPTH_1><DEPTH_44><DEPTH_63><DEPTH_23><DEPTH_45><DEPTH_16><DEPTH_42><DEPTH_42><DEPTH_72><DEPTH_44><DEPTH_39><DEPTH_94><DEPTH_57><DEPTH_32><DEPTH_16><DEPTH_98><DEPTH_121><DEPTH_42><DEPTH_19><DEPTH_81><DEPTH_0><DEPTH_57><DEPTH_0><DEPTH_23><DEPTH_14><DEPTH_121><DEPTH_9><DEPTH_41><DEPTH_94><DEPTH_57><DEPTH_0><DEPTH_57><DEPTH_94><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"B",
"A",
"C"
] | <DEPTH_START><DEPTH_33><DEPTH_119><DEPTH_98><DEPTH_121><DEPTH_33><DEPTH_55><DEPTH_7><DEPTH_26><DEPTH_36><DEPTH_74><DEPTH_42><DEPTH_16><DEPTH_121><DEPTH_16><DEPTH_57><DEPTH_42><DEPTH_62><DEPTH_5><DEPTH_24><DEPTH_41><DEPTH_12><DEPTH_63><DEPTH_19><DEPTH_78><DEPTH_41><DEPTH_94><DEPTH_19><DEPTH_40><DEPTH_68><DEPTH_44><DEPTH_23><DEPTH_45><DEPTH_94><DEPTH_57><DEPTH_33><DEPTH_94><DEPTH_50><DEPTH_63><DEPTH_12><DEPTH_76><DEPTH_12><DEPTH_94><DEPTH_121><DEPTH_42><DEPTH_94><DEPTH_2><DEPTH_32><DEPTH_57><DEPTH_41><DEPTH_9><DEPTH_24><DEPTH_121><DEPTH_98><DEPTH_121><DEPTH_42><DEPTH_63><DEPTH_16><DEPTH_14><DEPTH_2><DEPTH_29><DEPTH_32><DEPTH_57><DEPTH_66><DEPTH_78><DEPTH_66><DEPTH_58><DEPTH_94><DEPTH_1><DEPTH_44><DEPTH_63><DEPTH_23><DEPTH_45><DEPTH_16><DEPTH_42><DEPTH_42><DEPTH_72><DEPTH_44><DEPTH_39><DEPTH_94><DEPTH_57><DEPTH_32><DEPTH_16><DEPTH_98><DEPTH_121><DEPTH_42><DEPTH_19><DEPTH_81><DEPTH_0><DEPTH_57><DEPTH_0><DEPTH_23><DEPTH_14><DEPTH_121><DEPTH_9><DEPTH_41><DEPTH_94><DEPTH_57><DEPTH_0><DEPTH_57><DEPTH_94><DEPTH_END> | 214 | 216 | 255 | 126 | 38 | 153 | null | null | null | null | 173 | 150 | 211 | null | null | {
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znkk1G4Qw+aTkSbhkkeg4NcXpGjTXa29rdlIPtGDJg4ZkH8LetepRRRP/AGfGpAVZ/MVf9lVOMflzWjTK6nmHgr4izeJ7U6VeK0etRxM8Vwrf8fHPQj6ZNQajbxX8EksDIcZEccQx83f6c14vYXc+nX0N5aSPDNGQ6tGdpwD83PqRXqWk61HdWN3NAf3VwwmK90J7VzV21HQOU6P/AIRPS4fC8WpyahPNcEoUQrhC5IzHj0/xqS6nit4XG5EaMbdh6H3qbWvEN/beCP3ullYQw8iZzncU+bGO2cda8ol8Zx6hM8moxPEzA8R8g5rWGsblw7HdpIruGEm5SCQwHSr9r8sPKnnpXHad4v0e2hjiEsvHUsvT9a1rTxFbaldNDHdxKqjKMzY3e1NGjSsbM9pJNLE0ajdGd2W6YpwjEJP70M+CwQ/r/Ws28luI4ELu5RzgmPkD2rM1bVJLbRprmAkXPmIE39AuQCKpE2R12gzIfFlgVJKyxSqc+m3Ir1CCPahBbJ2gkfUV4v4c1BV1rS7l3yjzMwJ6hGGABXrcMt08SSiPaNwOG4OM45pJ2FNMw7qVZTcoIyFkmEO7GcEjb/Mj8qr2msWmtG7itGmQWUpspN3fy+j/AEzxWjPoOsSFjCIubhpACfrj+lW5fDX2SJn0q1gjmvJd94ucAsRyenqKtT1uQ0jT8Pyfup0/uvuPuxHOPauN8ULJF41mEWN8sUZ2gZJ4I/pXSaRbappxnkuUhO8qEXd2B57VwnxOvbm31S4mtWaG5bTw0csZ5BDHIB/Sp63En0I3u44rmaFR5syjB2dCfU0+1vZJLZngTZAjFVTdj2OPxNczoElzNpq3TKTcXXzsDwV+taNpfW1jbTi5YrEJmAwMkZwSRQaWOh3XgtmkV5Bj5duck/5FV1e9XEsOcg8sG4I9K87fx7qFrfy3Rv1ljk4Foo4CdFOfWvRDALXTI5767FnZqqyGQD5pCRnCL3Pai1wegjyy32qeRb/vJWXeVjPyoT1wewGMVoQyyT3BsoFN/cqR5sURxDF/vH/CorGy1DVrSNLKGTT9JK7xAG23N4OcbmH3Rkn1rsNP0wWtglu0UdtAFBSCI8qR6nvVp8qIauYE2lzyAjWb6S7BYKmn2Z2oh6gbvp145rXhsJYbV4LWKGxhZQreSMOuOp3fxZ71B4g1CPQ4Dqi2wNnEVF7sHziMn/Wr7qa03ut2drCQYDLIOjKwyDn0xUIpEUOnRQEMrMSVxufnNW0h8ldyqo9cUiz/AC4wDkcYpwZi2Dzkd6HE0My/cOWBPyg8EdqzL+GK81Jrd+ReW5tZHxzyOG/DitK9XGT3DDp3rCv5sazagyFAXKrn+X41HLbYKzOW8Mebpl9qdhPIN1vbvG4XkzbTtCj09TVqx0mP+zkVEJPnGL7OOEBPO4n0pt/pU9v4y1C2sXSG6ZvOYMPlKuSTz61u29hJDYvCt0mx2JKnoF7gCokYc2ljFtoL5Li7NqFjlR0KSZ+6wPT8eR9DUL6PJPrUt3dktggyQY+Yj+6D7VpW9lDaSCA+e6KPMU95RwfzGenvTLm/uRdzAFEET78E8yOfvc/WoiNN2IrvTlWZZ4odu1icL1Bx1P4VnTSxyXFtdKqzQCUNG/UKw6ZHpmtKDU3dNysNq4UgDq2eRVOKCKzvUWJlCXEwCx5woUt8wPsev4VSeo46mnpltdWuoLeG/iWORiGgJz5hP8QHauk0rZcanbGD928kbLcRH+EL3/GuJtrqy0vW8RWhcK7xFnPy5J4dfYVo2TSztFaw3DWuoiZ5JrstwY1PQn0I/nWtrimbFpq63OrXVrEwjmim5VV3KzY+6PTINZ0moWU1zO7xEROSQJOvv+VY3h/xh4esvEt40eorbSSzmPawzHIy/L5ob3+ldT4p0AahAn2dUa1c/annibnA5O32PWmtDMzLS8vPD+rwWVtd+Y8sRkt4peUlTOWQeh5Bq/L4su9P06+1C9ZZLWBMPEp+Zd3Q/Qd65mbUls4kcASmRJDbMeqdMN7dOv0qlKHnd9QdUl0+EEX9ue5boQO6nH4GqLi7m1oN48/h6aRLaTy5RLNDLJyUOOSf6Vzelx2sMUc8UC3UsLibymb59rdW/Ouw07UmtfDix6VELozM8xhccogxiM/h0rMl8L6T4iubTUba5OkaivzyWYbO9QeUU+hx096ISswldPQl+0w/aJPEEV6s1lcbba2gVfniJ4YMPXPeu6jliEpnDbktbcxkqOQSBkk/SvOYvEyabrd5a22kx2ss8qs0dwOcf0PvXT2jal9hxp7C4tJJmLRN8ryA8kfhRJtk31PmKKNpZUjTBkdgoHofWum0R/sdxPaXMxhEMnzKP4jXMR+ZuUIcMWG3HXdXURxGK/nWaMb1hRn5yWfuaxnZxOiKueiX98+ueELTT49URopmmXy2TmMqhIOfxxXivIGSAOcbR2xXpmiR6heW9zZWltG8ENq8uWIDbQCGf9TXmIzsJAGNx/nU07olx10HA8/Ln2JOaMg9gvsOCTTRncM8A9KngYREsdzuo3LxwDWt7jimXLTVNRtsIt9Kife2OxIz2rWh8X3DxiK+sY7lAd2D396wbp8Syo4yxINRq6LMjN93ofpQmVbU6xvFsiX0Fxa2EaNbyLMA5+9gjA9q6qP44X8TyLLokMjs5bmU8D06V5arSNlkjwgzg5p7KeSyZI53nvUtFaHsMfx+u49kk2gxeQyjd5cvJP5UP+0FMJpvK0QvGceWrNjA715E9o6wjf5aqOQCfypEidV+WTOeoxQri5Fuep3vx11q8ilit9Fgi45Znzj0PSuaPjnVtUvInnhidY4WSMk53/Nu/mTXISiRt4hLAEfMD3qxpkU099DagYLArH/s8dqtBZdDY1DxPq1xHGsbhZS7ErGMcelY8F3dS2txJJLJK9uPlBbGzJ5PvRNHOrBll3Pa7kbP3iM1QO4Aq7MCVJYD3PGaYbD0ZYwcKoC7e3XkGvpK2020l1K0lvC9zdi0jMbkfu7RSBhkHqe/Svmxt0YcPjJGfZsYr1y71LULOS4S41RZY2sYZW+z9QgA3R0LcrR6HtEIWCIsAqy9GI57f5/Oqk19/CMcDt3rltO120m0u1TT3kNqsSsjSHLYbnB9xVxLnI+9nNEpWItZmg8kbhxInmIylJI253owwR+Vc/4VvpNN1B/B2puTdWiF9LnY/wDH1aknav1UcYrUSdP+WkgBJwE71geNtNudR0SHUNNbbqujS/ardh/Ep+8ufw6UlK5MlqdzBlyOCMdvSrZJSPP6+tc3oPiSDWNBg1t45bcOdlzG0fzRy9yB6Gquo+KPEM6GHw14ZaaQ/wDLa6YKq+pxzVC2Nq43ed90jDfma5TxIHPlSsOd42SDsQe1Z97rPxLsVF9e6fptzaRg74IlG4r/ABY49Ku6xqdprOhabq+mvttpMrJCfvRN2z754qRVNSfUWa5mTW4mWNxbrDKxGRkHrjuetZsVxPcwrAJRHM74jlAzuP8ATNSXWpx2OkSLMu9o41kWJP8AWGTAyD/snP6Uyx1KCyuLaeV2UbGlTaMhnxwv51nOPUyWjLOpBLJIrISv59s4mkmDdZSwIQey/wD1qxZ5zdareOY1eWQCUp0VeOcfSnRahPqMZSOARXIk/fxsOWQsMvn171lvb6o+o3puYmhskRvKuYhlmC9PzpRRSV2atortAJEkQp97Z0Baqwhnkult1hM8qsSkS87+pJ+gGaZHeWt7pgjtYkBiK/Njazsev5U7SZ7tdVVYN5lWOUAjq6gH5R/L8aa0Y+WzNCa1huPMZj9miTJgGd24Y4X2rkfEc8+maNezC4dHuNkQVjyAeCfyxXUafZT6ZDO1xcJDcQItzbR/eSUnnB+mawtaQX5sL+7jE0K3ii5CD5NjDGT7CtGtLmjXc4G20m8lsJL4WLfZLbaxLrgSDuo/DNeqeF9Yt1vbXw9Lcumg6tGZ9Im3ndbyd4ifTPGKlSGf+xxZSMLiMyeX5YGAY+2PrWNqWhyv4fnt9MRIpLG4W7s44j8wk/iVfT/GouRdHYa/olrPFuwVu0DGXYMBSAMge2O3vXK6JG18up2Sr5uwZj3NtMijkx/n0+tdANbGszG5jnHlXdnBNJ6pMmQ4PuehriruO+RbfUYRJ5aXP71oexJzitN0SnY7SBE0DwOXmikt785kVicsik/cPvXK6Rf3M4nu7vd+5KlpOhVmztx7cGun1TS5p/Dl7rFqQ0N4V/0YjhD0JHtXHpo2qXxkWC6iyAA6SHCtjoB79amm97ivc7FNS0nxXB9i1tcXSH91foPmA7E+oqSB9S0SKew1V3li2i40+7h5JKe/07UxfBtvZRWUr6m1r58KsHc5CMeiN7Vo20+peHkMGoRQyxMC7Kp3RsvQup7cdq3i0wufO9haS3LmTO1IsMxJ6kkDj3rT1JC/iG5EUjCNcKDn7wA5qTQER/suY0dZLhI2XPb1xU99bW41vVbdMnypyEOa5GdLSRs2REVk80N15cMKeVO4bDbHB+XHfPWuO1e1tbHUXtrSb7QiYzJ657Vu7LeKzkM0beXjdMq/xAf/AK65c7WlkeNdsbHKgnnHanEljV3Fwg6k1dt7ZoXE0xZNrhQqdSMZqmq4YEH5s9a07C5CW80VwcuOUbuKbeo4a7lNhLeTnylXoMsRzVpYLWCNGml3EEhlzUAvypHyYTuF4zTt9jIxLwbQec5zT0KEN9Gv+phPsCajN1NJ8pxz2BqWM6dJyyuPU1L/AMSxQTHGxJ6CpbFoRO7yACMEhRzjtUZvJ1C/MvzdVNasN9o1vaBGtZDIDlsfxCn3Or6O7s1vpCLkcFvWldlN2MyO7k8whI9xPOFTJq/BfyWrI7wlDjKt3UnvT4PE81im21sIY3XI3kZxxWdNqU1wu9lR5cDd9a0RKZeW1hnuHm80/vBlwe/fNP1O3iTS7K4kXa7ybUPcr71mxTmVnkf5Aq4AFOu7iWaOGKRi0USnYe/Jq1sAs0ltLH5UCkhFJYscFmPp7V1F5q/mQ6bafZ1gaCMLcuDkzf3c+1ccgXzUVkzyCqjnmrt9PuvjdJkfKBIn90+nvS5W9ikepaRexx24SLbtU8AetdFBeb1Azg968csNX2lQxaJuuVOV/H0rrtO1mUABiGQ8ZU5rCXMmN2O/EmzDMUDJ8zyN91R25pbO6utclVNPbybANta5YfNPt6gL6H1rza88RjV9XXTFkI0+3ddyA48+ToB9M12GkanNY33zTgRqgaNAOAPSrh5mdkemi28uCSdgFkRAQsfQAdOKydRu3ju4JjMnL7ZXZsbkx1x7dK8+8Y/EjUrWWG20vbuUebMx7ei1ieMpJdQTQtVinmaHULP5gGwI5QckfiK30ZnfU9PNyxcENk9c5+8Pf2rlPsC28+qQoiKVu1mVEGVEbjBOPrWZ4Q1+SZf7Iu/3t3bnMU4PMqeh+lbOoTvY60l3aOFuZ4fL/eDglTkVm3qaOzjcqXGmHfdXE53R6lMIlcDdsjj4H0bcTW5omjQtGLieQXDRECGML8pZf4vypuly3DQ3CGFFWe7Eki44LtnJB7V01pCyRRrAnkgA5B6ChpNmDexjT6ebhxNjykYEELkEDqScVCLXynAUuEB4ycgg9D9K6a5sb+eGH+zrxLacXKPOzLnzFHJUegqvqtuGDtEqo5bIx2ranFbCbOe8QaFbW1jHqkY2ooCTJEn3f9senNcfbyyx3l0xBEtvA5Z0JLKhHUe/IrvLfU/LvS065hceTNG/3XB45rFtraSw17Up7i7t2e3jJa2hBOYj8qg8dSGU/hWdSFpApu5U1OO8054WmfzFtEV4nxxtYdG9c571duGS50PUGNmti81uIpIo/utKTlSR245qCSO7e/8AsUsXyo+67jnbAnCjIX+VNuZrifTb69VVgW72C6hzgRqDgbD34qnblNG7lOKGeDQbdPuF5GCyq3IIHNYLX8untJC6lLonejqeo9frW1dQebBG6sYrSKQsRnr2HH5fnXKawlxJqM8b/upC+Cc4KDHaudJ3FTjdmtoM9vJaaiJ1+zy8ZeMfKS3JY/lXaeDvIg0i7jlKz/v2ACrkMB/9avLNLvZf7NCmX9y8oRh/fArs/D3iE6baJA0Zj865J8xTwjdMVtpYJpXsdNrmpWUPhqz1K2Z5reS52taH5cr3AHsaqWem6bNFeavptuZYZgqrG5yB6kDsRhh+NdEbKytoNO0+/gS5hFxvjuV6Ix5xWfe+HtQh1OO90AKkcnmXE9oxwpcHhPxBY4qIozasVdCsJry2SC5P2lVDuqzNlfLH3S3vXP3/AJdv4fTT/tMyy3LSXLBnLbI92FVc9AelTnV7ufS7hrdBBJNcETxITlWzgj6Csq8kDarEj3CNDtESk+g4APtk5rSGhGt7HksEt9pU3nJG8bsONy9PcVf0vzirzyMXeSTJY9Se9bGrXCy27ifI3qRl/wCFsZxWDo05gjO4K0ancEPesXF2Ox7m3eITp18VHPlE9eorkV+bBJ6DFdm6FNGubkLgeSQRnpzXFgjaMd+v1oSdiWwJwe4pQw/vkE9/WlXnjIz6VKtq7cySxxAngnvRoCIuOmNpHcd6FX5iSOfrVnyU3nzLhfKxjIHU0kcVsu0STP74Gc0rDIipZfmBC/WmhFJyM4+tWgmn9CZj6dqcn2NfvRSOo96NQsVghwcDnt83WnBSQV3EFuSOtX0fRf8AlpZzn1Cnn+dTQjw9na8WoR/7uOP1p2Y5WsZRRix3H7x7inC3LrG4GACQeMdO9biWvhptpWbVA3Y4H+NONvokQje1vrti77GNwv3R37mqVyedGEZDA7qUGM4H+NMEuAQDk9cnrW1quhrFAL6G7jvbSQ7Wlj48t/7pHXHvWHsxyeCDg0Wdw5gQsJHkU7GUdu/0qe4YM5lZsEgZIqrgFgGP3Tg1fi0/ULiziuY7aV4d/lLIBwz+nvTWg73KqfKR1BI4weD+FW7TUJYJMrIykHt0xWtN4G8Rwaf9sazidWG5olcb171gKGAP3lOcbiOh9DQk2O5YtrsRXz8YSRjvPc57j0wa7vRb9poXjlbdPEQD9P8ACvP3AeLcMfJ6f3e9b2h35W5icdcCGQ/3h2NKUW0K9jQ8R4fXp1OM4XBxx0rb863vvhzNpzjMulTrNDKp+Yq3UkD2zWX4jRDdw3JGDLFtZf8Ad71P4Rbybq6tQFMV3A0D5UEk9j+RNXFaGTZU0q8bS9attRi2leVdTwGU8ZH869D1KLz7KCaMCVIl3bie2OMe9eaeSq2wtZZFAiYptI+Yjpmu88Nyy3/hO1jmj5t5GtkGeG28jP4UpLUqLVrG9pFrNdaBdvPeKiQuJHkzjcenH0xXoWmWYfTYHuXD7k3ZHf0ryFSLq1t7d4gEFxtdA2F2MRmvT7u9+yxCGN9qqoVF9ABRGm73Rm2XtSuoURUQAYI5x0xXI310Wk379wY8kH0qC81ZprhgCSU6D1PcVmm5eQNMI9sbkbR/SuiEehEnYm1KeCO4t5gSI34lQjPHrRe6fIsn29dseYkt7gA5MmGBDH8CB+Aq9bad/aNm5YqrA/ICucAdc1UiYXulvHL89xEwt2mh42lT8hI9Pm5+gp1YCjOxlw+VfXVyLmK4uMnAVmO5Zj0OfSrzbpbS302AC4bcWZQudoHXn0qa3QaVmWa+jF1eSMlzNGu4YXjEYHerS6tpej2LSapd2+nRuN0duhBnkQdN5HQn6964Jyb0iatt6oybrSmhixAeQcc84J53f59K4/VtJv5ZxeoY7ppf3UiM21m44fFdXN4r0u7vXtTqNvp0JTzVnfnI64P8qbPL4HksjcQ+IEuLxXBLMSCqn+lZRUuptSlZnmcmmXcemNdf2fLHYWpx5o+7nJyPrxVuyvUvYY/3uEEyHYPXI5FelR2vhq8svsF94qjFj5277JEcK3PBP4irY+Gfg+bZcWmq7DAQR5cvAIORxnmuhXasVO17jvF95Po11YLCoist8U0jE58445wOxrXm1Qvr+leTNgb/AN7b+iuCQ/v0x+dcv4+vEjk0aHcJYDO8pEvJTAxj6GtGK6srm90fVcJbNFMN9wTwYgDhffBJqloc0jG8U6dLp3ifUJ9Mdrd9zXEgZiyOCPm+Wm2Hhq0jszr3iZhFoUYWSOPGCzZ4Y/ieldRFrlhc3xK28TXE7tFbzT9C/YH2NeU+IPGmvXurXmi3hia1aQCS1I+WNlPG32GM1WqQRV2cLqd9HdQxKMja27HDFj0qW0sZ7IW0t5AYo7oloZDxjHtXuN/4N+HXhyMy20IuLxRlYw5ck9fpXIePLaG7062uUGJoSrohAACnqCO1Zt20NVuc2YzcaTqGyQMdgXYvHmfSuKVTgKfvDIOK7C2uHgYh41VXU73X+DiuOQgAjJ6nr3oi9AktR6qOWAJ/pQsW/JbcT2zT4uRjvUrpJE4AwxIz1qkkxpMjKEYU4K9SKcVPynZgEcYqykBB3uML3YcgD3qeS13WwPmodjjG09VosPkuUYY8HLZqRnjcMg+8Ohp2wedtyfmOMCpYreby5Ldo8EsACo+ai1w9mRNbwrbMZGb7RwQB3FPeGMgOHGTjhe1TQ2kpnMMg8p/uqZeqkZOD+VXrayu7e9FlHDFLJIyuSPu5PTBqth8l9CCOAfZZAzsGLZQn+Ed6eBAYJmO4RhBsbGcn6Vr3GjtNqqaYLqGK4kkG2Rj+7jB6gmhtPfSZjpl2Ua5gfa/lncp9GU+hqlYJUuxnxXMrXG77PGuYQjoq4Wde+B61ly6akk10IpNyQjcrD+Ne3H6Vq3rWkcEUsc0n2gbhJCT86N2K1Wt0SF4Gd1xKhCAD8cH8arQSh0DTtK02dIZLhZgqRFrsg8hj049K6GW+fTYbS2Fz5kVtCZIohyiHPBx3JHWsc3o3vDIyq8j5O0DITjKmopNRhm1MwopjiZSsXqvtWbWprypaFG9vdQa8e9e+njmdvMG1zgfhRcpNfQJfpHw5EdyDwPM/xrVGjXN9a3V2Ap+zuqTIOq7s4I9fumrNpoyyaNbqblXa4Z3KgnbG/ofei9ieU52byTeP5EQgi4VlJyV4+Y/SmWD+XcleQnTI9e2fetm80F4bfc+wNgkSd3IH3apNZyPareIpEu4fuh/HjqfwoUglFWN+eQT6ZFdSZcW7ruH+x0P61BFdSaffRzKwQxEOpPfsc/hUukMblJbRCojuIiQWHpyaqSxyX77YI/l2sheT7ozxn+VUjJpWNXX7MQ63IQFCTQLMM+h5yK1/CdxMthrFrBITMUS5iWQbgdv3s++OlQapLbah4e0W+4le2j+xTBP7wPXP4VDoWqm2121kbEVq8vlTbRyFbgZ9ecfnUyISOnkga1uorlp1S3eaIyFl4SNxlT9QQRXT6ilx/a0sau0n2faweMZDkj5RXLax5qDUXniYxofKCE7lVkbJGO4BLYNaNpcXoljijuJobU4nuNq5ZR6568elXCTW5Ety7C1zZi5tZLaOPUUKvubDdT82M8DjrSLaodSeHLtApLKegLHpx2qvdW6QwTyS3krpBL5gQ8vMucKpY923dK34lM9zJBBDKhkjXIkwSijgnPqK15ramclcQslsCRLt2od46AEdea4rXNVPgzSNRvLVvPScjaQ2N3zBducH1J/Cui1S+trPWmt763lYQ4kdE5WZOgP1PpWN8VIS3wxnme3ghRGjEaRLym51IDf8BBpVKl0TCOpy7/ETVNAgSCTwZc6bO6mC2nvHdRG5+8wDRjJ59az9F8CHW7htQ8Q6rHDA48zeX3yzk9x6VB4vbTZrzU4tNfzbjUPEQuEji1CG6S6XMuHURjMfLgAMTnf321vWXg3WbiaB7jTZrJXbJBIOFHToeK5YRW52wWhYbS/A2lymSe18+RPlVZZNyyAe3asnU7XwbqEYFqqWjOxBZI87c111v8PLDy8yJkhuWkOefpU48E6SoIgUF85bjANVohSbPO7fQfDLQOn29xOgJadl457j9KpW2l3Onatp1xa6mbm1+1xK0iM2Ivn6OD2Nelf8IdZx6jECVeIF5QMcAheAfbNVtUs3lSLVIrK3g1WMCO4t4kAivo/Ugcb1odrEp3L3xHfSbe6tr3VLtVkhd1+zQDmfIGGz2Fc/Priy6haLcW6xxW+y4toByghxgEf3iT1rM8cm2OiI6Sm5ubu6VXLDLRIo+7/jWbp3nax4UiiBKXumSERSHjbGei/TNRHUdtLnU6hq9tqlnMYB5MhnMi9gCOfwrndWsby98YWl9a2pl+32qyYU9SPlc+9S2OkX+tWSja1tZjL3t04OyJR1wOrZ9hVPWdYSTX7JbS4ktoLSDyIWhcgqpxtYfU9frWjFBXPYbrxj8O9MiLwy2xkjkJCpFnLDjHSvL/GviCHWWb7HbmBb1gSp7pnqK4I2E1pfQpKCELhd2O/IzWzqEkjXOmeYQzQwNFx3wa592Va7H+Yv2RoVGXYHPuK5cjORwQGAArqEm8m3baoMaxlCuOcnvmuafgded3StOXQb6D4ypByDgcYHY1IkZaXChnIXgA1XEmxhuKgA5wTjNXLd0M0jx3EMLSYGQ4JprRFJoVJXHmxn5Fbhl9RTre2LyRiMO6+YAwUHAFaMJtoHLP8AvH6Bm71q6fqEBlCZSNFxkADmpc7IpSMtNCvRcEtB91uTuHA7VqW3h+4uxvmvSrbuiqflA6NmugsYop5G/fwnPdmHNdXYRR42xrHtIxxjn6VDqS6GsZI4m08KIrSzai815OyvsbsHPRz61YXw+JEj2tNvi5VEGAx9CfSvSktrdJdk6lemGIx+FaBS1hAZY06dh29a0jd7kOSueXz6Bdx6e4nskEVy4KSEZK46qv61m/2A8rxlVfhQHYk56fdHsMCvXNUKN4aikdSTDdqq4PQE1ztx5caiQlSrAMccHmm7oXNc4JPC4gmaZbczSGQSfvD8wx7mqVzYOs9x5ESQgSgqHHc8k/zrrdX1q0sYv9LuYonDEBScvj1rlLnxTpOsXFrFMk75cLMyALuQdSPwpJslPUyrtbNlvZDAVkjUBXJxk1S061TVbiNZ5BBCMBmxzk9MV0utadY6s091ZzPb2zKJI4iPmkxwE+ox+OaxPDqoZXeVAZFbgN/CTwR9at7DfxHYaLoV7ZXyuk7T2LBopFm4Crt4PueePxrStNDFrbBERQpkyWxwfetfQrL7daxpKzFIJeA54zggZ9eoq+ttOigSqO6Ls6UoK71JvZnPXGjx3ETebAGjDBlOejYrnbnSXtbgIh2hNxRx79V/GvQ5Lf8AdFcLgkcVRvYI3s/LaHL7yyye+Kpx1Klqjza2tW02SGZnWSCVjtwfmjz1GKZeRyee8W8mFTiNc4yvUZ9+laOp2g2mWGNRKoJP16cVMlmLtIbiNB5TDJMh6YGKS0MrFbR/Ou9L1DSUQiOSMXUYA6SJ15qqyvGiMm1TgOqjueuT+Vb2n28GkXMM018CqOEESDqG4NZ93Zm2vryIAYjc4k9uq4ob1FsdZqLz3csFzZjH9oWqSiJzlWA/1n47smuj8O3crXk4KpLGwT7RK427Yuw/OvP4Lu4HhPTpwspbTr9oUGf4Ty2fbkV0Wnah5eprFdTb1mj8kqeBnqOO+Peod1IyludpqGhW19/aMUW/iVZ5EPfgbCp9BnNPubu8Ww/tKyltY0C4EbL0VupJxz6/jXOyavrNssEoeK/jYr5yRHa+0tjaemB6/Sts3em2WizWuobY7Io0KpKTt4b5EU9T25q7snczdWvV1XTbuO1uLaWa3MckMcYw7kctnjOMVm+I1ivfDcmh6ncO0t8sbXDREKVRWV0IJBBbIH4E10V7YaBpVpHc3Y8rUAN0v2XhiGGNv5VzcgfXbmHR4Ejt1aNrgXE0ReRIwQFxyOcggg9uampKyOrCYZ1Z2vZLVt7JL0u/uOW0jwH4b07UrTUbe81L7VaTxzRo8iEFlYMM4TpxXsEVw7RlVJZnw7Z5K/jXm+nRzx3lxZzKDNbMpLKuNwIyCf8APeu10m/3zn7UxikYYUr92so3eqN61F0Zcj8n8mrp/NGs9srKH2nOSSSexqibQE7owR3xWssJUMGY8gZGfvVR1TUItOgluJduyNdw/wBr2q+boKySMxomVpo0j+Y4GDxuB6gVl2Ma3FhY3rr+4jchpB2IJxxVeHxnJcTxW19ZGK2dsx3TcH2AxVnQIri5nntXUootmkhZceWz5zg/7X+NCVzB2uc1fwWNprkMU9qs1hdu8kUrDq38WKsf2bplqr3jRSxyRAq0AOQ49DVzxTZTzxNKuVki2NCcfKr8ZAH865/XVvLO9X94+2ZASwPBcDBP0q+TS5UbPQ7rwtI+qFohGIYra3Ma2m0FV39CR3rxPxLoVxo1/MjEHy5GJP8AeAzk+w9vavTPD87X9rHcW9zLBepGVcxcEnsTWfD4OfxFqUhurwSWaNmSf+OQ9x9BVtaXJhG7sVde060vtPMyRoVfJGOuf4cVweoJDp15psCyPNKqE3OR91ia6vQ79prCe0bBiQ/u3bg4PSua1Tb/AGpEz5UuhQEdWYHvWCXKx63J4pEWJh8rOwJZT2wOK5af96gk3AHcSVFbisyLKWXa0QJOe+AT+tZt7aPFbW92yjzLkk+WvYdq3ik43Jk9bCaNp0OoapFDdbngVJrh0Q4Z1jieQoD2LbMZ96rXclpex2U1ppgsJXmeN/KZ2hfG0jaXZm3DcdwzjG31q1aabrcc1vdWMciXMUgaJkIBU+pzx+dWbi312W/s59Vt41tbOUOY4EhjRF3AsQkeBk464ycD0rJu4OLuMXQsuA9+oJbj5jxWna+EIJo3lOpqFHPEnNVG0uC5fzrW4MolfO1j930FaraLNpF39lurZDMefMBJUjg5B6Y5pNo2VMjtvD+lG2imN9eMHbZhG5VvXr0rUh8I3y4fSdfkVxyqylgCatadbRecswQICpOQOAR0rrobY+RGzryU+72Hoai7excaaOfsvFvijw8wh8Taa1/p/wB0yqMke+RzXZ2evaXcWH2jTJHmRxyZDnZntUMJngj4bemMbHG5W9iDWFfaELV5NW8PR+TMObmyP+rk9do9aakwUEdjcq8nhM3EbZZZtxUnKkr3/KuK1bVJLawg+wYl1Cf93DGwyEA/jb9aeni3UpvDcunWnhfU3DEMMqQBk9vxqKx0+5srSGfUIjDqdwuWRxzEp6Vq9URG1zFg8K2wLXN+zXt7IckuePrjtUltp9jJex276eDLcSiO3kiX7rY+YMB0U8YNbgjY445I2/WqlvFdxanstpHSSRgUdR1z1X6VKTK5Vcgg0KV9qKyxhHVZbZ25KqeGVuo2nr61m6t4S1KC+m1KK6t5JJ/mMKEDa3pjpyK6HVtTjWI2USqLj7l02MkEnOFPWrmlaUZUV5MHIPU5/wAmq1ZTiuYq+HNZmi0+W3njeGUEb1bncR0xXYRvvtTsG7JFc/d6c8L5jXLYxV/RJ/MiaJm2svXJqorUmpFWuWZDztJwc4x61Xk2s4V8qpGDj361dmCsiMBnYeQOvJwKoSgqY2VgSW2nPZjz+VbtKxgp30Od1OxSZzIJVVYty5A+8MZwaw7cSNpt6iA4UqYlJ5G6ux1WxhisBHBkSM5MzP69fyrkZme31K2MSuofAIbpkck/TqK5m7sJIzWcsSzYBI4b3H+FaupTtqIs7qNQpuYNkhI+UOnUH8OaoNax2d3N5hLl5MrzlQCOx9u9alvcpcaNZ6XInkXN67GByPkJXp/310p21JvpqMtY3j03VbBpPNBljnYBj94nG7PYYA/Kp5NYs9OmkNynmzLHtSVBnbn5dw9SOtQaBvkTU3aMrG6xRtu4MjKTkD86w9Ws5JntYxKFmRmhKg4DoenSlIWjZ1Gj6te6a+2O2F3qC7o3If8Adz5wVkY9gOOB71eklvdWvDNcY1bUY3/dAjba2xzztHAbHuO1VtG8OQWyRxPLKyFApBYgbj0+ors0W0t4RCw8iCPCCNBlnI9cc0PUtxjDYxU0S8v70vc3sjXG7cbhR8vmdsD29OldD/ZY1iWOCWWc6koO28tnMbQk4Dt8vHIGCOeta+n6NcX0KybfIgfgBRgqO5NVNe8S2XhkXGnaLbG61aNPNWND8oB+UF27DPOKqpGNuXc0hWlCSlTdmjHfQobHx1DpenLIbcw4unaQtI8hGdxz64ycYFW4CFc7MPGJGQjHUjg/TBqn8PpZEiufEOru8lxJKYfNJ/1rZwdv+yOla+sx/wBna/IqKoinHmLjoM8HH86UEkrIU6s5z5pu7NNL6GRPKj3HADruGMg8fjjFcl4uaa81LR9IiAdGk3uScb/art3cvay2s8Unm7SAR/sntXO+PXnsbnS9Wj3qYZ9sm0cqD0P0rCbSmaJNxsWfGVpNB4Zktn2t9nlQwlVwYxu5Gas2Wl3OoeHLWeC78gRkuihiCZE6k+xrH1DXrjVLOOxQCRxGXnkzxtB6/nXRRJEkMcCzuiSHZk98gFh7YzWraujJQdtS9Jp1rqarqGoas0UrRgyWsWNq9v1rjPiTpun23gx7rT7uWS4S5TGTyoORtH6V6GLbw1FceTdsqzxoAw3fe46+9ct4ztNIutR8Nabp5VobnVFMzZ4GxcgflVtu1iIaSMnwattb6dDG8vlTPa5kd2wXbvx2OeK6DQNTslsoY3VBNvfdtOCV54A7mqs9jomrvf36xuYJbnErL8vk4ONox0zjNcrr/hy4bVoE00TCMo06SLJholQ8kc8nBotdHRyqK13Zz2n7ftbQdBGF56ZIXpWPrUmb6MKcOFJH1zV3RnknvpDOMuVdsDpmsfV9x1CBicFYzurKUk5aGbvuT3sga0ck5DR4LepGeKtxQpcSaWuCZFh8wj0rJaRpbOSHYGYAuhz0AxV3QJWllLmQ7igjU+ntVKXLCxk03K51cMgjKRwiWQkfOqLkuKmvdMe/0KUWeJHn+SMgYAPPXv2NXtNt7q1YzWtslyJFUMnmBSrDIyCeMf1re0O0+x287XGwySvI0jLkhXJ4xx2rmpSk5We39W1PWq0cPHDqUX72nVO91qnHdWez6+d9OFs/DHkWrEwNG6gbhn+Luamtrm606e3inX7XaK67oJR99AeRu6gV11zqWnrEHNzEyk9vvGs29t4pgJEG6ORSVU8Hb3rq5UzhU+hZ06OC5ubl1A+zvNujjxgBT2HsK6eK2Aj2jDY4H0rm9La4W6iXarQRrtfAxtAGAa7C2UKoydwYY3UKNtAcmUzAqgg8CqMkTLOrAFWH8QPaugFuzcRxuxzt6dacvh++nmKCLCnqzHpUuOoo1LIseGdUePS1+3XDAGYRQlRjbk8L9Sa5rxUrTeInm3FxLGARIfubeOK7TS9Da0EljcxLPF5qSpIR1I7j0Iqt4g8M3eo6rHcWxiERHzBxytMwUveueerBuIypX6/zqY2sq2jyWyoZUIYBjjAxXS/8IdrCjl45PTtxVO6sLrSnzdwRhzGzxZPysw42mtFZmqmkytY6Rp95I08VqwQfObhx1c/eUD2NbzWlrbQEqiRgKM5OPxqOOZvlOVAA3ZUYX6AetY3ifVza6RKiLHLJdnyYkf8A5ZqOXYn1Paqty7j5uZli9MRuTFHMkkucqIzngjisaVls0a/IASEhpP8AdHU49q5Wx1TUdKu2lhjjZ0K478r0H5V2cJS/a3lbyzDfQszem1uGH51nzJ6oqSdjU8yGN4vNxKHAfep+8h5Uisu8dIFbzcEs7BcdhXnY+I19pFsmkrYJPJYlrZJjyWAJx+Wakj8TeKtTVitnbW65wzzDkZ9quU1y6GCjqdR4j1u2097GNoXaO4/dlyc8Yrmby9gksg0QkbD7ZJW6qmcjH50TT2wb7Rreoi4lhX5EjG1Qcdq42DXLlL9riUebbsrR+UOBg9P0rKMmas7iGwTULNbeS4ESoS0Fx/dJ/hI75pzra2ltZ2Yf7U9nIX89zjDnsPpWHFqFibYs1+UKKDHCVJy319qzo9XvXlEnlxtGrfdf37/Wm22xJKxvXniHy5lDSRmfkxxoMLH6t9T0rKF8Lm9iuyVhAGRvI4NUbawtpZC8zs5Y5dgei+1a8ejaTJOBJFLKhGR82NxpSehcIXehvT+LNJtYhI908gTAAQ9OOv1qzp3xbgsE26f4ce8vORJNJli+Ohx2plr4X8KC2F1PKYSsgja32liQa3o7PR1kEnhqF0aBzvmderA8DnsRWftEinQbuJDqfxM8VSNdqItIsmh2KuVA57/NVuPQ9G8J6bcyarqM15cCItcwwMS8zkZOW9Mc4zjisvUrm5kM0ct1O6KSVXdgbT1H4GjU7h7vT9N1VmVN4axvGCjAkUcN/wACRh+VbxstTlu07GyNct9VsdMvdOHl6ZeQmK3gAAMDqfunHc1u6s7ah4Ugvcjz7PO7HdejV5X4RP2aPxFo8uTPbbdQtIk4AZT85H/ATnFeneHJo71JtOP7y2vIPNiyemRyaL6E3tJM5y9L3NmfKfZKFyCDjmphdnVfDh89fMkVTFKX9qh8oratFJyVwGbuCMr/ADFV4ZjbT6jB5iMkqK/HY964KrvK56vKk1Iqrbww2tu4g/dKcXSg8tESM11cFrPfzRWaKse+Yb955EajOV98VmJbL/ZMPB3zqUP8xU1k2oX1hJeQ5iktbOQNI55UqD/6FVUpuT1May5Vc811TWvtOu6pPBI5tVuDHbo7HKqvHX681ftb+SODT5ztkaF5JkBJ+9gLn9a4e0Z2gLufnaRnP+8eta1hLKjoUBfymwPYE8/yrvb92xxx3ujXh1i6ikms7eWVIpHMkkR/jNXNL159Qu4dJ1CaRdszlZUYghRgbc+hrmdamaCR5IXYiRztcGqVjfNbTzOw3yTRlIx6Mcc0R0Q5tylc2NEZEad1HGxgp3ZyTxmsLU8y6myMOibfqTXc+JdP0XRdQ+zaSjrIh23IL7lXjIHHQmvOnuPPvH+9jzC/5dK51H3jSb0J5mkgHyjaSpH4CrmjXMfnwbcASMW/3SOufrWfM7eRukHGCDmk0yVYWIyMqwYD2qp7GSkeiw6veabp9xIqmSN5kC46gH+gNbt14gZdEa6Vg0ygAKvRia4+ya5unRVdfL2MGHoTwK2rxIjoShcKyzIuwdhjlqmCKT945w6jcSRtLcRbIwuVaGMHDE9DXR6R4lbV7A2b6f8A6XaqZPODcbB14/OslLKNNJmJufLZZP8AUEcy544+hrQ8FwraXlwXwqiyuF3EfeJXAB/H+dbRijWbstDYi1sKY1/s2dRIxjMo4VvY+1dR4fuhdaI08mpW1tDFL5Nt9pOGJB+bd7elYKzqbILMNu4BhEP4jxnFaum+FZNYsryKbTGZC26KSQ4zn2q5RitzFVG0b178SfDugxR28Alv5Qm4eQhOMnAyTx61jv8AFrVbpl/s7w8ShJBNw2Dn8DVrT/hxfmZBcvBFCihD5YBJxnFT3PhzQ9IlNzq+uRQJECTGHA/Sosg0Zkt468WXMu7/AES2T+6pBA/Gqv8AwmfjMOZY7uyZP7rYqS/+Inw60mMxWsD37seQiNg/jWcvxT8BXDFbjQ5oVP8AEAaFbqLQ1YviP4ribE2n2U56kLJjj86ddeJdf1m3k+12dtDCAzNkgmM/3VPfiqyeOvhfdRnc0ts+ME+U5P8AKpoda+HF/GbSLWrktIeBtbPPpxVJpClrsalrN/oq5LbCBkkc9P51z/iQmdrP92AU3KW7Eev1roorHSbnaul+IoQxQBY53A/Gs3xJol9p9t51xieByoE8XKocjDfSrnJSQ6V1I5GSxME8ccMjSwgjaWGHyex/xrYswbbR9MVj8+X47D5uFFRNpmoiy8yOWBbiRjEN5y0YHVj9R0PvTp3HnrGAzRRgIrjoQP4h9awastDqlJNHA6xqcOm6zqKW1iklysrbmYcb2wf061iT+INUuU8vIjQ4z3JrU1SIP4hvZyGZWck4Ht1rMv7QtKgQbWBXjp8vc01ojC5nTlpJj5mZOflLHip0jPkqWXex6Beo/wDrVaTSZby5JjBEAk2qxHDD1r0Xwx4MRzHK4yg6AjlqHJJXFe7secw6Td3J83ywsWMlzxj6Cug0vwVqF/JHm3uZlHUIuAc9vrXumneF9IQ2du1qrzOhYAjgKD3rV1UXFm0dvpzJDHlQGCjg1hOq3qhw10PH7b4dSwzR+fp9yluU2u27IXHXd6ACo/7MsrLVZPscwktIziOXO4Ed67bW/wC2o7UIt/MqtKwdRyGX/wCvyK5m40O6hv4pLMCNJ8EqVwkef4T9aIvmNVzQZ0mk2On3unrIwiEpGVJXO7Hf+dRCz+wy3EZBQSoVz0BGev1ploxhjtNUgRPJUtFNEOqEA8gfhWldFLyyCvuJVVw2euaUqacbnRSrNs5O/iDQoyrjyz5OO5B5T9evtSaVEL221HRTsxd2/nwkt8qzpk4X/gO78hV51kcTWEsWCQRvPVWHKn+n41z8V01ld293Gm1rV1nIxwFBw6/985FbUXeCT6HJik4yKmnXqaf4k0rWJoz9nuf9HuFxyOMHPsRXZ6LbXOm6rb2sbJmxuD++DfKtqfmDH22/rXL6noc13qupadasRasVure7fiNEYZBJP1xgVvpdRNpKwQTrIlwhtL28VSAzRjIUA84K/nWySsc71Rs+ILVbbVZpYiBHORPHnpg8Nn/PrXJBtt3Mkm1FljPlv2YjtXV3Mp1PwjY3LKwuLRjZTe+Pu/mMH8a4+93rGsmAAPmTPX3GK8+cfeZ6dL36Z0kL+Zoliy53kZ59RVefWbXT/Amr7y8cyxu4fPEpY7VUfhUouLbT/D3nyP5kijMKr/ePQH9axfGKAeEri3iKeQZQEbbucseduPcmlQjaV2YVJOXunlUZcW+GUGXHzD3rT0qeeP7S9vhmXayhh97irt14YbS/DZ1DUbgR38jhobYdcHqD74qtpZMUF0zYAAQA4/WvQlblOXZlLUQLtkMQ8t2HzI/Hze1ZjiWGVkkDxt1w4wc9sVs6pCZpl38bACG7n6VBJem7kVNRQSRAYWZPvACkttQv2Jrm7MdmjSOzTupllz/Ex9fXArBiDKz7OUbkHvVy+NwbU8Z2n5iozwap24IQkNl1O0jtisom1RpuxLeZWE55GORUNiR5smSRuiIyRU9wRLAMf3cfjUNtiO3kncYBXYhPQnvVN3MranR22pLZ2XmGXGY9gIHU9s1v2tw5iuIrj51f5Qy+mB/KuWHlXQtopdnljb5hHAA9a9B03QLO7j/deJrFUIHLo2cE8AY79qlFKNncy47O6kci4gVjGflmVvvA9x6/hWz4b0TUdX1MWEMQjuThpSfuwRAjac9znBxUl1YaZYXF7FLLq8racQxihhx8/YKSOR9K6bwzqOkw6TdX2lyXdvc6uwE0l2MtbsvyjI7dc8elVsNy5lYux3/g/wAL34siH1HUUz5pQb9jd/pmnXPjfxDeQvHpWmW9rxmN55ACfYrmqWm3Xw20+MImrxPL1eRiS8hzySeuc1Yk8U/DmCUSPPIzg4HySU211M0jgNW1r4haqNl7q0drCCVZbfCkfiOa5yTwjdTAT395NOW6ebIWyfxr13/hNvhxIcQQzXEnQqtvITn8qoSfEPwRC5ePRLuQqOcxMOPoaOZGkUecJ4bhiUkrwBlsLzn2rStvCIumxHaSzAthtsRIHH0rsl+Itrdll0HwPeXUhUsXkjwuR0xTZLb4la5El7Ddw6RE6sBaQQgGPHPORkk0+YbaOcTwHdsrn+xZ2YDBXZjjtXTeHvAUlkFmOi20cmBt3spIPoeeKbYeF/GLwWranrGoLcyzEMiMNiR44BIrSPhvVdKmhuJ3u7mSYMjosp/A9fSmmDsxX8DNdkPcDT7EgcNG3LHPr2qazS38My3+jnXBqaTDd/Z8h3PAT1bPp7UWml24P2fWEkSFpfOJDP2+6Cc8fhVDXrVbDW7ebTrSN0lHmTXnRtmcBcnrSewKGouoXSWmsGQaH9rmMAZ5lm2rgD7gGRnsar6pb+HUtrNLW7FnqNwoeSDzfM8odcdTzRr+kWOrXFsLmK5YRw7YpIJGUKM8MQDyeKy9Q8H6bZRRyeG45rjUlLC6ExJOCPVqluyG4NHFXw3zzyZzvd1MmMHH8qpsokdABuEgJBPXA7VoahHJaq8E0bRzL95W5OfWqmnyG6ud3B8tTtYeh7VFyXojTVBAkKEbYivQdvpXcaNq8MEULB0MexgZN3JYdhXGyYQJ5qkJtG76GuTgmNvqQjWR2tkmZozu61nKLkmh0o3dz6J8OasNQa9uSDuc9jyijpitdrpBKo6RxjcxPevHfB3iiWwby7kb4mBG5evXpivQLTWre/sJVjf/AEgvtUMP9aeox9KyjFxVmXdc2h08cMBufMSImPjZnnnHPWub1zxb4f0tzp97KJnP32Rfug9zik13xtZ6J4MF7eSrbtcAxRsql8StyM7QcYVW/KvFrbXLO61nzLO5S7upCSIpIm2vxnBJHpmulR00Ji7Ssz3bw8NL1F7hrQq8dyhYJ12t0yB71zxEtndT28oUGKQrgHPPYVS+F7vb6pc2zFVieJyCgOV5zxnt2rc8TWq2GvhlU7buMPuPUuDyfzqZpxRrQlarYpWi+XcSyFQ8TQNHKW6hj0I/HFc3cjToJ/khknlf5izEhFBPzHHcbq3opdsUgUOsEj+XK7c7h3x6VhamyniNG2QSeSqdC4P3efTPJ+tThp62NcbS+0R6vPNe6JYykY+xyNbTxK2FZWP7vdj8aj0WRYpby0bdsYLLCpHG5DyPxGRTdOAla6sgrSrdRlAoP3pF5H5U/SWMeo2dxMP3cLhZt393P9K7keZex01jvij1OwA8xZbcXKHPWWP098CuLstUj1OC6u7nZDsG5WJ4K9yBXZrv0nVY5JG+S0uNkhI+8jHDH8QRXmuraba+H9QuLK9EjR3V3L5MWekWeG+hrCcVc2o1HBF+2uJvESW9rYylbG2lSa4lcEBgp+UZ/Ct7WNfs7HTbWZ4tsKSFYyy58yXv9cdqyRf26aJHFZwlIYrqODyE/wCWpbBfnvgA8epq38VSWsdOvLONf7NieTA27dpJwox/ex1qIpJmkpdTib+Y6rdte3Or/vgM+UVyIxnAxxU9lpkjSTQWd5FLcgMrwv8AKHTqMZ71za3rIh2QoFb7xYZK1ZkdohFcKT03QvkgsRx2qpS6GajdmtfgbtpV0lEYwrjBUjrWSsQuby0slPz3EwjLDjg1rtrP22BY9Si8yVFxFcLw30bsRVDTU83XrJyCEhLTyAdlX5s/pQpC5eVmWdRlt7zdC5KgbSrLkOD2/GpFhSSOS4hjIgJAlj/iiPY1mOkkP+tVkLAYLccf41d06SRLyIqGO5/nGeGHvUq49Gx1022MPJgk/Nhemahml2QW8EZAEYLEN3JPIp80atI8YOFDED8Of5VVhYNufAZufvVVtRNlzzI1VUVCuE+cE/eqdbeVIVeOV1Xg7FPTJ4/kKg8hrhoxEhMjnaM9q0l02/hlggcqJC4MeehPvTlEuNmjqotN+IviRkctelkUbJGQRqR2PQZrZ8PadqegX19pmruHvn2s+W3BcjgYHrzTW8Z+MLSKO0h160ACbMKodkOOQAOSa0NR07U4L+z1ye1lWyKxwy3Eh+eVj1kYdhnjHap5bgkjVtB4NGnn+09GtY72OVo42iQjzMDgn3Ip503RoLmaAW0ryyxh0RochAewOK0fDnhHTdTlvdT1He0xuBGUDZVSvGVA6V3l9f6RosHn6hNa2yqoG6TAOB096puyBtROU0SzvJITHb2NrpqoBtnlgXc31yKu3Ph7Q9HDapq08RRVBk8xQFLDuK4nxb8cNH8iex0uykvs/K7sSq49RjFeVar401PWJS+oXuYUH7u3U5UAdM+9RqSndnt+reP/AA/DE32PUGt7OLJeG1hy85I4AOODXNaf8U9e3xOmnmO3C4CTHLuPXPr0ryZfEMkR/dttf7wOwcH8qjn8R6lchY5JV2gnAHBIotJle6j3lPi3KsTFtMR5B91PNAP6mpYPjPoyIratZy2jhuAh8zHHfGa+c3uX3MNro3YlzRFO0ieV87bnG5icn3NXa24O259NN8W/B0w8qSSR2POzyCeD+FNv/G/gnUtPa2a6EDEbUDIVIP0r59t7qXR1SaK7jiljP7tdgckepyDVDULufVLtr+++aWQ87FCr+lIEke9eH9as7mV5Z7mI20Ci3WYvjcck9K7E6tpptppN8DSE5BixuYV8w6TZ+cgZml2pg7d5AbrzW1beZbW6y2000b7wMs5w3tzUum9y3UWxs+LL37RqWoSSBDj7p6EDHQ1h6Cm23Q9CWzn6iq2pXUk3nM/MrNz7t2FaejxhoUT1VT9OKOXQzk2zZ8ofut2GQqp+Y9B3rh9Q8v7XIYCGjjmYoy/3ccf1q5r9/dy3CWKviFTnch5+hrAmV0jDIPmXkrnjFJIqL5UbNndgrsYsADkFODmuq8P6oUQeZNIbtGxGMfKPQ/WuGSRiqO3RxkEfWr9vNLAyToSXi3MFz60pRBa6nQeLjNrmnaXpagQyTX8SYJ4BYOpY+wOfwqi8VkfGuj6toi2clrOk6BbaNkjV4lYbcMqnPlmIk45JJ5zSXem6hq9pCbK88qUzb/Od2TG5WBGVBPfH0zV7wX4G1Oz162nvr21exs2eVrZZZPmLoVyo2gc/LnkcCqi7EqMnJOx658PNOFvHc3lyI2M4A3ZxnPJx7U7xlf211bWqGVTc25/eOvRQ1Mv/ABEl7pr6bY2YgQDazE7QAPSsC/dXgcFRsI2scc47fyomzSnF89y1byz3ds8AeONVXchPcjv+IqteWqS207yI481PmkxgRqMcD/aLAVW0q8HkpHGQJi6dR0XOOfatjWbdtLsmtFuPOXypH8wkEeYo3AVyx5ou6O+raUeVnJwO9ne211EVSRJVfcegweR+I4rY1BILfXblQuIpj56R9grgcfnWI0kUqpNGoKzr5gUnhSRzWlcRXmsaPpktlEZboFrKQsCODyrE/XAr0XLY8fl953NK9uLq7WS3WwkzG0VrDcDk3G5Rtcj2PX6Vx3xNhuNO8RadbXRgeT7IqSHdkxt03fTvXo1henwx4MitXvYp9QSciIOQW+8evfjt9K801aOO7+JHlXWTA0gmmvJQWJRBkqo6dayadylGxUvJBpuoeFvDtnKs11AGmmlQZzJJyufcYB/Gtn4nWN+dK0SymieS/kD3M4B2oqdMketcvoV0998UhfTRJlrl5JFjPCpwF2/QEVs/FLUr2TXLfRWkVwp88ThiC6PjCZ9BU21G2ctDaaZpZ2ag5nvflPkxHMar1AJ9TTL20l1C5MqtGjDHlxocKq+gH1qnCqJfLkkESdSc5IPIP4VsXB8rVJiV2Nu83Z2AZQR/hWiinuOLsYMTzW7yLtMqo3zE+taWlXDL9vkjVfmsHh3ehc4z+WataW8AtnjkT52mYru4/OrvhCKBdXvbqUpHZW9tIZWcZAY8IPrntT5UTzXZz1vfLfCVJ40kvTGQryjCkjqOO9ULdIRcRgb0cc4zgEg/yq3tSO7idUCbgzlW7DGDVeyUpcyRMQygMuG528ZzSCxDOWETynCu8mMe/f8ACksbC4v3lW0QM0URkcMcAKOppzx/aVMfsBFjv71BFI6klGMZIw204z7UhPcsxylIomVmDgcN7etbGk6Vq3iO6RTO8UCYUytxj6VjxuohwOUB+fPf0xXZaPrgtEjG9dijqeADSqPTQqGm56/4C8H+H/D9n50kcc92GB86Y7jn1FXPiBr+kJ4dvLK7vI4TLERGu4Z3dQcflXi2sfES78gW1gw3AZaQcYrjr2a81W5We5lkupn+91P0rBKTNPdOyT4oalYaSdP09FWaRy9xcHPzZ71yuoXt/rM3najqMtx6tJJx+VQppeoxqJRYymED5sg4qoypGhaQeZK/AjA4StVZEN3JhbLt2qQT2+YA06OwdizMsSqoJwWHWqTNluGyPU8Y9qeGRiMjg9OetaXQXLaWN2DuKIW4JG4GnRwXsLA/YFkJ9icVVi81iMRu7E9ATz6Vs2GmapIqxxiSJxyDng/iaL6Ail9sVJR59g4J45BqxJbWyrFIf3crqWG08YJwM1q3Vza6JABdTLeXg6R8fIaxG1i8YuMQfNxgp93PakK99yeKx8+SOON9zunzdDiqzFFR4nl8wQkqqgdadDdlbWRNgFxIygFeNopEt2MksTrsljU9O/vVIpO+h0GhwmbTPMSM7lXn2HP+NLqMgh0YyuOfNVSM8DPepvDlwr6O4DfME2v9e1VNdHl+HXXOSZlXNb/ZMPtlHUJhJGsyfdkXOR6g8V0GjviNWyOIxn6Ada5BGZtOALjdG5GPqM11Wl4+xwkcmRNp+mK557G25SmgWaeSYKT5j5BHcVXuLNQGGOCf0rbSKOCGNA4AHTPasjVLgBNkb7mLCpjYaiZAJj8xMEoCNvtzzVi2mUTCMs2Xbj8Kpw3jRyyFQGd/kVT069aikeVrrzFfDo2MY71fLdDvbRHdaRczxkLHiUONyoxA2MO4rq9KuUuFmmTcJChDJ6c159pdyk9sjiTEsZIIBrstCwI5sOB3J9ea4V7SNS0v67HsVPq31dOFubTve9vev0sntb8dbbcGWKqe5AAPan38wlgGyTDKMMpGPqagDMrlweFJINQzTNM6oQpY44x147+1dMtTgp6NsotLJBMSDgE7044I9D7Vzmm6wkr6g+pXc6PJIyw7iSm/pyO3FS674gRblbKxnD3OdpKrkA91q5p/hq00iNtS8QNtuWIMdtuyq5I5PqTQkrEym5PQZousWthHJp2pW7Sm3cgFeQUPJwRW0vxHubfTZLfQdJjtCxy91Oc7M91XPJxXI6xqUc+ozlI0TMhd1QcREdvcGtHQ9FGrNM+pTLZ2zx/aY2DcybecY7dMY962a00OZxbZJLY3X9jrqbAi8f5ZzI/zsxYFXA/ukFTwO9X9e09o/tYsriaW8uYvJmBj/wCPaTGSOnQjvVDRrzT7m2gtb4TR3dlI7JOSSs0AAIjI9uAD/hUurR61qVnENOknL3LBpWC8gE9z3xQ2CXczPhZp6f8ACVyXN7EQttHhYDkMXxke/atLxZ4ebW9b/tr+1rK1tZYxlZ3CmPswUE5OK1fBXhXVNF1t7u8tpERgGaab73Ddcf0qtffDLVdY1+S/v7q2jt5pjLHCr5/dk9AueCetRZ3J3ZgTeCJIHG/XLOVyuYY48FpI8Z3H0NUrm2lgkSzurfY6QCSOZjkFBwTnvzivW7P4c2emgG2fy5oVZhLIdxVT1T3pp0NY9Ks55SJBCDbxRsgOY2ILg/XFDbS1NIw5jzLw74W1XxHLNBb3S2kkCbow6ZEjHkDP071Z0COBrC9sJIhFFFLtkkYfLJJnk+/PHpXp2mCKFtTTT40aF4WhEcH+tJzwcnoMcVzWnaLPCgs5EQATphH6jGdwPrxxUOsk9h06Dlc8ayZLSF8ncFeHd6Edj7kUQyLvSRCFZkCPn17mrU7iK3u4owpikRJgB1B6VThiAjiby2KPnlfbrTuTYhuWwFABGDlMf56Ux5A2H24JHzAetWLkjy0XG6UnJHtVbC7GDHBblcetO5D3Hr8o2kEgmlJd4WyWCg9qYGxnI/Cp0cCBl4Ge5qua6EisASS2cLirSXMtq0bWj4k8sbs44qFOu3K465q06AxfaAgChxuHeouNRRp2fjPXbMLiWOeMZwroMfjWuuojUbZprjRYxLjOYCMg+uK5yGELGJuI/mJCnvmrNtZXTsDaeciuSu7JxQrdR2SNN7zT7mYtLYmP5A3GPmPQ5pi3uj27PHZaU0rDI3SHOSOw+tUprO4WRYWhkyF2n0P1PSrj29xJHA8xKlFCoRHt5HT61V0gbVwS+uY7mOK10qOMgbgWRsox9TTJ7rVNQN2r3BhWI8xoQC/0rQkt/wB8hlkm3kDdtI/z1xQNPCxGQsHc8DPUYPehNDsZMelRtFFJAIy7pukeZwNxz0Ge9UWtnWcpc254PzbRyPcGu30mKK2leMWaTwbNyxynADdyDVUaNbXvnOAyrCS21mxhSfXvg1SmuhDTRzsForJLKtsQqYEWT8xx3xVO4kmtLk3MvyySZxu7KB1rqbXT9JuUQRTXCToGUekhPfPar2qaJHHELF2jn3QANLAN+4nkHIzgjuKbmrDaa1Od8LT28dvdrcf6wbcJ/eHrUniaQf2VbKq7d8pYj6CpX8IiORX0/UvmUb8Tjbk8YHb3/Kr9n4fl1nS2jvp44bkSNlD/AAN2H0NNVE1YSjd3OJiiItVkUHaJTwepGMfpXRabewJZLCJMunLH0A6iqa2tzpLxrdWrEhniTP8AFk84H05rDBAcgMQ4YgkfrU2uatWNK+1d5JJAGDQ7sIQeaoyEsMySDbjI55HbH19Kam3O3Hyk9B0ya2tLjSxiOs3FuskEMnl20b9JpiMA+6rnJ98VOwrmXdWl7Yyp9rhlhl2rIEdcMF7HFLFbtdY8pchsuxB+5jnmtDXZTdnSrqWV3mms98jseWbceB7VLoVtLPDfww7d81rJs+qjOPqf6VV7AtyjaStbXEU0JDbs7l7Een1rrtD1q2ZmV5VhdlAMb9AfrXDxsEUoAScKQR/CQQD/ADrXn05HtZcyCLdPxJIMcAfoazfvasuLsztrzxHp1mD5s284PyQ5bca586vqviuRtN0e2MCMfmfOML33MelYMNqImzIjKjkbIm5LD1/HHFbdprY0c3EVmFuHlx5pHCr6fjVctkWm29Dbij0TwPCPKlj1LV3IUSY/1ZPcA+nvVTV7DULfW4/7Xu/tMzwrc25hGY2hP8QFUrWXUpQ5NvDGZG3F2XczGumgu9TM2wTRB1jCKWjzsX+6M9qhuyK9k3sZ9vplmLlhHBOPOGWkkiILn157VsWejWkkp3xzSIeXBlGBgdh6VJcWus3CwxXU6vsOYVUYIqGK1uraQxz5VMZZs81PPLobxoRXxHX6NbaVAgZ9BWUsP4mzjFdBHb295GzWeyAjrGB09q5DT76O0txLEzTEdEXJx9a3dOmjmU3ZmZX+8q4x+FOFSXUdSjC2hfutOnmDyGRyQ2/BPVf8imxyQG6ndY2TICDcM4Y9x7VZsrmW5MwcHlSo9hUlzCbI+YsbFg6hgRwRXTd2OCVouxWmu5bEmKdjLGzlC2PbvWZYakqWccRXIEjKqNySRzurX1xo2iuHVl3SpjbkfL/9euL0udRdzl23lVKgejBQSfwBzSm7xFCTjK50OjWdzFd38ltFELhzu8wHoT2x6VGLRba6n+0zRyzEFxtPRuwqxomozCytrmVN8avsllTup6Gt59MsYA1qsW9LhmljfB3BgM4z6EdK5UtdS3inGTsfJ+qGK1uJorZg1vOuAT94AH9KitjcTtFBbsI41jO4twBnqaS/hihQRQTM7qoEgZeSze9MD7T5K5RQAJG/vH0rfQzb1GXckbr+7VhjqcdecVSAAYj+frWlqDw+WqQow4+cejZ5FUECPIqnjmoIluOU/Nz96gA5IIOcdDSBhvO3IG7GadHHLMZPKjaTaMsTxgVUWCRZzFLJECgWMLzzgk1aR/Iu1S42lFPK55PpxSxaTKNPW5STzJJD5cVsFyzZq3HYtvb7XanzF2wpGeGDgj8+M0MtRuTRMl5LEwiBaT5gMcDHStNo7sXSYk3NIRGIIRksx6YFU5XCAR20cisxKkpyPb8a2dJmn0m7tNSt4i1xDlY2k5+YjGfrWci40Wye08NPEJodSke1MRLG3lb5gRz+uafdLDcvCkcu9IwCqnue1UJL2SWd5p5muZnDO88zcnHBGKWC5jmuSkNxGqogOal3KVBbs0fKbBmnhjxICobkA/Q00y28IV9qFgeVBqkwmcbDPmKP7ik/KpPNXIbW3miwZUM7oGAB4qbs6Y0oCo0EgIUsUPr0B/wqwjM0KrJcI+GLRouM7u2fYDPWoYZltoJk27i/AUDt3qnPbO0u2cqCQDE6cZX3pwbVxzpxurDri4gskF1NGnllgdh45PUge1aEHii28pAYbaSAPt84thmHXoPyrHvbKDy3LNHNNEA6EnoD/DiuaFhbtc7rk7Ek5IjOfLOemK2hFSWpyVY+8egy3+l6kDJY2bKHYFWJ4TGev5mp9LWxXUZLLUneKF4y8Mo+80g7VzGmWE2n2drdEvGbhmg2MeJY+xA9Qa3rSFrqzDsY3ltjlQ7gOEHU4pONnoVCKLV5Y2+qRm11BfLlEW6CVeWWUAsn54wfavHxkEmQDcRnjn6mvaIJI5CsysMgg4buenP515nfIpXUg9uouzdONq8eWATx9K1QpwM7TdOm1C7SGE7fl3ySEfLEg+859Kuatfw391a2kJNvptrH5VqpGc9zIf8AePWn3l3FbWEGnaaW8uZQbq5xzM/93/dHp3rIYmR2jXILFUUHqB0P86OpjZmxq0bCDTY7hlZ2tg0br0H/ANarXg+3lfxHZKceXO8iABurbD+VR64AlnoUWz5Y7Ld8o6sTiodMmOl3Gj3BBVjch2TPO0HGfxqug1pIr2+mzt9lEu1ZZ+bYZ+8dw6+3Ga7bxRprLe2Gm3t1GUdArmMDMsnXP4dKyLO3iXxvd2k+5Ldb+SCLI5jG4nA/AV0urwwxapDeyMEkLFIZmG5DCvU/72OKlNI1tucLd6jPNdq9yUEyL5UZUcKiZwPcjNJYiOHb5oBOMtnv6Zqret/ppdUwhYsFPY5OCPrTIPMkiuZGYANjec9T2xTmroUZ8p2FheRSPCdo8wdieldboNtHLOpaJpJH69xzXlMM5QDLDeeODx9a7bw94gurO5gVJlAjIPPp2rPkNvbdj0+/0nTbDTGu5TJ5gIEXPzFz0AFVz4Q1fWF89xFb/KDEWH57hVe38Qx+I7/TkO3y03NuPeTPFepS827Ltzheg5z7U5JRMalabPMo4YtI1E2l1AI73byyD924x1zVvzo7jbHFtVAvzHHT3zUfxBZLPQ49TvRIsNs+zcPvMvYfnXnmgalrPibV7Wz09HW3dy0sgHyKV5KlvcUJpC9q7HsSajpmm2Z8+8t4Vx953GSD3x6e9Z1x498PEXFrbXEmpTKplMcC7iEHU5FeF6kTHazS3waWUXDpKjScDLEkA+gGK734K2aRXGs6uoCW8MQhBdMRyAE4YOeOOhqpTuc8nd3IZviTol1KVtrW4dEk3DfwcH19xWhFbi/1KFbXKQmPzpFPByw5x+Brl/E/g2//AOEt/tKwT7fpuoyLK1zbJ+7iLNgrxxgetdpLq9qt5abUxBcXDQSTqOIIoyVHPqSBWc3dFp6XN7S9Olt7aIKSkcLArGekkYHU1asbm5tL22Z75bm2UOzRpglVwSPyqvowuY4XnlgltjJI8bLKc8A8FfYitywtbWSECG2EaDIfA+Yk55rC5zylHmPkdSsUv2kqsyBtxDnG7sfypkUm65+5ujyXVG4z7U7YzW0e/ndGxHbvx+dNjyk7A4DElhj6V0HU9yzqjWj2UEkTN9oZmWePHyoAOCD6/wCFZibQcsHzzjjvVid8xEKB86gk+9Mt4BcN1KMqliW+6MUyXuSQv5JE0DLmIbhuGefQ1fE0dxIhtpGRZB+/YjGW6lRWOE3DIyB3J9au2EIL75HA2gkY7eppeY0dLps9xpNzC9lOqNGd0KyLnaxHatGx0O1vbO7e+u7qO+ifzLdY0JZ5H9T2wf0NVtNjSDTllACRzjYHcZxg9fpWmjX8umvHBdPD85LR8A7SOcn8sfWle5vFdS62jazo9jaWOsWUUOjH/XXMLhpGJ5LE/Xis640hbySWfT7q5gskXKRykbpcdCOPxpI725tZY7aSZ3hSPAjfJYdO1Wv7Yi1DUh58giKELGyrwR3GPpRyGkZFG2tJ9WjWaJElJBAdzhXK43Bf9nnr35pJ/DNxE0kYt3RFYeYU6c+hrfvBdG6nvI9Kk0y08pIwNp2Daf4T7gg112nRF7ZGPzZXkHkMPaqirsh3SueZWXh6+KXECxPnICI/cf3qur4c1C3uo2jlZiRu3bfl6YxXr1r9iRBK8AYqApA7j3qV7rT/AC2/coqhgGJHC5703BEqqeWxaTfNGWePBK4JI6EUS6a72P2pogZYiZPYL3X8s16gGgmjDQgsp45H61TMCyR3lo6IsVwpKsBzk8fzxUKmaOtoeYSaA16rbVZcJuLDofQVVj8NtZM0iRj5GD/Oc7/aux82FtGilkdgvCho+x96gudNZrSGZboM0TFlwePxrSNN2IlVhY4LUVa4aLcJftJYRwIp4DZJI9uP5V0Hh6C2kZoSSb6EjYM8sucfP/tZqpLsXVhblGaGRQrug5Q5+U/XJ59q6DT9FtDr0U7SSQzk5Zh0OOMEevehxYozW5Fask8byRBCsUrQkJ/AR1zXC+JLQWut3E0cbCS4kLBuqEHoPqe9dzoFssWueJLE3f2iFp1mS4I2B3yM8dgOlVdW8P3F9ps2pWxR3EqQvb91LHAYe1JaDlPS7PP7gQqjxuEhuAQcdlbttrOjjUXMOME+Yn7s/eY7uc/SvYYvD0OgeFNd0nWoE+2NH5sWoiIyRoxHKlh90j0rmIvC9nq2gWUWn4ttZj2PMJjxO3oPw5/ClzamEpXRWSxRjpSKx860ieKfPO7JyP0Ncrc3XlaqZSu7ymBVH6lc123k/aobyeN8TRtieOPnHIHB9awNR0G5TQL3W5ZFWzS8+zxJJw7ZH3s9wKfMVKySNSGUHxJq9/5ZZ7W2e7Mn8PmEIFJ/EkfjU3iO+SydtKCypBLbLIqkZMMhGcqf7uasGMRab4gVHVXnsrQxyY4IEalv581Uv7S78R6f4evLaIOr2/2N5AfmLg8M3t70tNy+dJHHXcbIHZWkMbKr5xxjuR7ZzRGUdnj+UbuuD1716Afh34hj3Wr2zSlVZUlVMgjB+U+2ePyrida0PUNG1CfTNRgS3uo1XKFsjBGQwPpQpmTnFimwuYIIZ7mzmjt7nPkzyLhD+NXbINHYwSpIoaaRk2n7ykAYz7cV7J9huvHXwe0tYLYW/lpl43TPmqox8p7E9q5fxD/wh934Qsf7Dgmi1PK28JMZAZyQHJ9SNrc+xpqYk7lHTJntYFvFQt5UqyJGOMkdf0zX0LpepW2rWUV5ayrJHIoYqDyuRnB968LgihihSNHVokZY89AR0JNeh+DdN/4RiKe0vysWxjMl0r/u5VY9CegxwKJ2uTJ3KXxlnaXwPItvskkguYpZAoyFAOR+uKr+G5H13SH8ReFIn064b5JrWVQIZ5QMFm44H0IqlrenPZ3Ws6ZdB/sN+PNCo25pNoycemDXN+DLvxDeTxXPh+4V9QuInP2RjtghhU45/wBoms5AdXcfCG11K4F5qV0UDOk72kP+rU5BlQH0PauzWGC0WTw7aaW1vp0dkSLlV/d4YEFfr3qtpviG8udJu11OD7HfWkGbhmGELnoQfTirSR3OpaXZy2N4WjjcOWYf61f4lqHIi/QTTNLkg8ErpcyxB1hZVFv0bupH4Vw/h/RZZfDVhZWVtGJxdMbyC7P72P592GHHbB6d69Elilu7UfY5zCySh1yOcDqKyI1t2n1O80fE+oR3YW9Vf4mKgMq+nG059qUm2gUuhTsIJL7xDq120krSJhBaTcBIx1/M9DVm41xvDxla4YyWrwmSEMOAw/gzXD6H4gu9M8Xxz3ME5utSvZLa4txziIf6tsdsd66vxBdC0s7m1Fn9rWeX98gOTHEPvso7kDnFZyutibXep8zvIJfJZuVk7HsAcCoY98M7B1+6ATn0re1Gw0OTSbS9srmUXsjFb61l5MLdQykY+XPasS5Vkc5y2/G8/wAq6kdcokdwI2TcvGDx7c01kfewXOJCAR7U1FaVhHIp5Ixgd6SQu8zlkIk4A54BHWhmdgJxJs52A4PFTx/LuH3R1P59P0pYkSeJ0dvLfBYY74qa2iVLpUusKwQSKP7xI70LXQtI6/RorrUZGjtULLcfIkTjhfpXoE/g6y0i2itnkaW4ljAZ3bIzxxWToGrabofggajebZNRZ/LhUdF45P4Vwl/r2s6vIbi4v5re3kJEMSdX5wfpRy62LUnY9OvY9PGhwQ3doy6kkhT7RGMjGeMn6VkQ6bpt3PuktHZnO1wBjGO4rjtN1jVdIcvaX0klqgyyTMGwO1eq+GdfudfheBLOG6uIo9xGQuAa3pxi0c1STi7opi4n8yOwmlkeWPEqQt0Kc849uK3oNRstqB5FjvJEGYiMHJ9B6Vvw6dZ31nFMlt/pMYMRbHzIe6n2rnfEdxZ2jQ2yQrdXIO3zNuHgUetTGN3ZFQrXZBqE721uxIIl2bljHXHqayRqcgRRcyLJudXVUb5WHbNUNYvbkg+THK00i7JmbrH6f99Cue1SaWDUTDEsix7EMhC8L7/59KSi7lSd9T03R9VScFZWG9D0j6VLfzSB1EQAlGGxnqAw6Vz2ia3aWlm/lglyu3ey4x71Nc6m5eJQ27hhuA5wR1+taT91aF07t6mfdslkj2gQmF5GKgdCxrLbUWjgdShMXBCjuRwa1L4zrNA9hEZDArZEg4J9T71R1DR7q/jtfImCz7G+0LjAGeVx+NQpOxEoa6FPRGX+3BPMCYS4Zlz9zj7xrp5NQtm1hWjIMZmIeZRxgdT9awdO8OTWswN6HuFljZZFQ45GAp+lXI9OvbWzELK00BP70hgDjPIFOEkhcsiS+m+yXrhfKCtLuR4eTNE54Y+4NTQeMIfDtlNJ9iS5mMxEDHkMcKSG9gc1z91HcQ3rJ5Hy2y7YYxw7I3IDH69KxLqaXWLhpLSMSJECAqn72epx+FZ/EaSScbHoF2sV4dWh0i4u5tR1REuhAvzxwykchuOK0bTwVpc00WrQNI3mWLxRwbsYnAwce+Q1cJ4e1u78KQPcWlsJpp8Ce6myyJGTjBAxyD716RPdX+r67HBHbmSXTLmG8Qk7QiMhVgSOP4s4rCTszGUOU8u8P+foE0c+reH9Q+xhitywU5+9lR065rWmvdB1mLXI9SnlsNOnuIpdMaZfnilz8wC9xXfrr2ly6PrVxaXcepBLh32MMbTjBwe5rzmbUo4rdVFnC0l0BL5lxz5C/wCPrQmawiqhQ8S3bXOvxvEHexmjaOJo0wswZsOB9Aoq54OuNN/s2O+vYbplsJZMLbqSGUfwH2rV0TxjfaTewwXVjY3NjFl1igjx5Q5yyEk4yexzS3HjY6Xr95e6RparaX0Ye4tpl+5L2ZB796tpyQqkOTRmhJ8W7eWWWys7WRrjyWe1utp8tX4C5/2QCc+4rkf+Ea8QfEPxMbxoWt0uk3T3rqdiAcFU9RRqGqXNnqjXdnZ2MayW6vDCU4AY/MGGepOPyrZ0j4neIdHhTT9QtoGt41+WVUw5XPA+vSoiraGCWljb8U6BceHNJ0ezs4b++ltLdraz8gkbpW/iIHXAziuWe0u9E0G3t7xQl+ocCHIOzdli/s2M/iTWs/xO8S+Ib62s7PTHs5A+ZZUG8+X6Z/hz61y7XFyugSW10GLDUZCitw5Gc5bPOcnGKexcHa6O907wEdS0ixa7vWW2uYSSYeCr4yuT/OrvgXUbnVbC80u6Z7+1802iuy/JHs//AFZ+tX/D0X9kaPpD/wBpHbNDwzODE7nkrt65AyOtXbeyg0yV7zT3ii0nyvtM+5TvVwSwkAz+YoczNy1LP2210/xDpttqc0cxudPMSXDjhmRjvz6cEV57ruhxeH5Xi0i6f7NuM1stu3zPuPzKx/uivRNRGk6zp8d3qVnCsEtuPLu5m2qCxOF9s9fxridfuZzPDe6XpbG208bLmGIEiYqfur6ilJ6Fpmz4W8NQ6ro62utw3ZghcTQx3L4PzckE8ZXgcdq6/RtO/saB7S0l822EuYw3JRT2HtXL6N8Q7bxF4ntdOW1a2Vbdpisn3mfgbB+BP5V2GlLPHNcxfZhHZqAIJCctIO+fTFJicbSHRsY0uIYnVpV3sqs2SfSuHi8ZaN4e0aSN4Zm1Jd0l1bKPmEhY8N7DHB9K29U0S+1DVbm+sbh7PU4l2Wkm79269fmXv+dcnpfhLWdD8V3Or6nPa3E90GmLov7vdxkbSSQABxzzmjoJLW51Gg67pGq3Agkjjttclg814JB88asOoq5p+gwaX9gZ5RcC2SQtcSHLFnOSfx6fSuI0e3stc8Yi41OF1vnLpD5Pyl4+pZz/AErsb/VJtN13TtIjjykxT94RnAz0pXVibuTPmJgYty+WJE6Ad8DkZrMl2vLtLHY33fauivNNeZWQPsVc5PTc3asW8064tY1lA3EABx/hVqWp2z1WgW0AfISXEkWXYn0GKNLsUv8AUUgMyornHmP90knvULfJbuUfY7xnn6YyP5VEBLCQ2RtbB46H2qmyEW7mwvNMugWhJ3SMiqBkuAf5Y6VPdW1wYI3uEy4HI6HqQR9Riu/8GeINNuvJ0MWskbTwSx2t067mVivP1HpWDrEN9r72lxLb+QbSyLSxg4bb08zHqeh+lJSsy7EFrD5vh60TezPLLsXPRUJ+Y1PLprs8kiMUcDapU9h2xVbR7gDQLZmk2rDOFkyOgJr1PwXZ+HLq/eLUpA97EfNijkbCOo7+5q79WKekbnmd7pNvYiCS2cMs0Ak8sHJUN1H61r+D7bUbm+tH0CSVb5XaFnx8oA5+avQviPodjcaH/a9pZhru2+UeRwsinqKm1DV7Xwb8OILvT3gtLryEMKMvzyMTzkdTS5jl5+aJsQxXdtHJa+JNYjja5y6LbsE3lQC2Cc9OKr3F5ompxHVLGeK6itWEd40QyzRep9h3Nc9Ya/8A2n4tttU1zy2jgXyIlTlIpn44HfIPX3rovDOk6Do/iTX7PTy2zCefAR+7j3fwY981Km09CXGzuYHiXxF4TsbyKFbvzLjYr7IRlZUPKtn/AD0rEHjrw7Gqg27ts+Ublz+deY+K7GfR/FGp6c8QgVZy0Snn92T8u32xVG1tLm+Lsi/usEF84zWqmbrVHrX/AAsbQFc405lbudmA1L/ws3SSB5Olyb+cHHTivN7fSoINhllaQ45LdBWlbWiTP5g5cxkgKeCOnFS5yNFodTcfEjfgw6eoAGGV+PxrOn8c6kysQsKIp5WP0/8ArVjXw06GwtvKmYXW4NcRngCMnk/ga1LGw8O6lpF7qQ0m7Oj2kRE7RS/MsmfvAY6GlzysL2nKUrLxL4j8QSra6ZbyTvJlvkQhWwORn24/Oqw1XWCC1xcywzgkRwt0Bzzv9s12li2k3mo2Wn+DdUntZbWDzXdAA8rOAu33IABb6isTUfD9287ySN57ROYpJ1bng9/rSjJ31JhJyeo6yuZrjR7m8SRnljt5I2J5G/BJC/riue0wRSxCbTLoNer8oty3zbmOOPXvXSeDiLRZbaRVEXmlJA4yNren4fzrrTa6Ro8Fp4itEtbDVNDiaC6sQN4nBzwB/ePUHtWl7Dnc4RF1Lw5eRw39lcQSFh5scnziZSeTivevC1tbWGiG4tbptRS8l87zwuSQwAwR2wAOPauXsfCTeM9Ok1/Vp7qG9u4y0MLMGW3XsF4+7XL+EdM8cLKPsem/Y4MOYppGOwyK2ASvocHvUtJ6mMpN7nUL4b0q/m1ax0ezexuoXMjWk6EB5GxiQf7OO1c9N4R/4n9nomu3PlTXz7UYREJKuMkKc9RXqUR1SC8uZ7lIXhESohQYk3DruPpmszVbfVIvD891LHFql5GTPbKgwwbqoXr75qdAhNx2PPPEnhA+HLW1TTsvJMzAMxz8oA+Y/UZH1Fc3NFb6YgvdRk8ydRttrUH5hnu3tWhq/j/WvEunywXAihi81ZNkY+dccbfzrnrfTbrV9TNtF5jzY3TSHqi+v1raNlHUrmlM0ZvC4uxcXOjy3N1BAYmzLwzjByR7DOKXUNOuIV3eIGVfMiL2rW3JaUcbG+grpIrM6e0EOlme8tlfesxQ/dUZfcPT0quUjulllSwmubfzvJZesoHbj25z9Kwe5u6eg74XeILDw5p2oHUFkGpSXCeZu6mLouPoTzWz4x8Hx/2lbavpU3mf2jMIzB1ZpGHzSJ7gAnHtWjBaWOh+HtWhvDC+05EaYLSk42nPse1eetpXiOKS1iSC9ZLASXiW2SGjckfvB7Hd09qhs5uV3bOm1DTbnwjDpKW10rrAktxKs6kgLjoOeC1VNL1weKbHUNI12WeK9MStDPF8sYjI+4f5Vc0nSJvH0s9n4m1GW21G1KAIvymVeoOKyr66jsNSvtPOBb28bRBlGDHg8H3PWhrS5UIJ7nYa7O8XhK5tmWIaWFVRaz/NJ5X+yBjnGOa6TTrvTbfwVby27iwszD5cTy/eiJ45z1NcbpKTayYtQt7i5hjit8S38Y3Avn7rL9P5112padBNpbae1pHO0i7rmENzIMdV9zUc1yanus43wj/wjHhnxW/2e5n1GSdtiXzL+7gPO4A+pJr0++vpV024k01Y5riIYjjdsBj9fevF9V0c6DKoNvKLiZd0FqDuO3p+eK7i0a90DQIZEnM0EwEgaQcocdP6VamrCm9UdJr+o3Gn+Hm1MIsM6KvmjG4r0z+AJrznRpZtWub3V7q8urqSaQwxSJxGijb8wHvg16Wsket2du8+ViZN0luer8Y59q5258MPoskZ0xG/syElvsadXkYnn/dVTxRN6DbSRHa2EtvA00fMZ3M0ij5wPQVlSRahPdQTz+assy/u5PQA5yPfFdElpLfaYYYbh0tjnZxzx1J96dp8erTWsLTWcIntR5cUjHt0zj3FYa2MYykeFSXJ2vOAsqjH2qEjJ29mX/PFV7i3SSRooFYwH50zyQhFVn1EQTmVUD718soePbGfetW1tfNs45bFhctsKiBmwQO6++BXVKFlc9GEtbGP4n8MtoMSEoZImbcsi88MoKj/AMdNc5INkW1mGTyB/Kuu1FjfW9xpP2pryXTT5tszNjzosAup9wDx9DXMC23AxKkkoUZCIuSwJojqgmrMsaXqd3YNbrEzxLHcJMr9CrZ5yewNdL441GWPxBdWyr5M0QKNIDnzVclgvuCCKq6Dpmv28GtS2lkYHtLdJ54pkzvTsMVrXekalq2qrqdtbbtOv1tl88/cikKY+b6FSPxpX1J51YydHimtbWJzCrRlSHjf+Je5+tdDoccUs8sMq+bDHEZIwR+8UAgjn6VTm0G8t0msNP8A+JutrNtkubThVbqVzzW/8M47+/8AEIv7O3jWO0V1u2uB97JwAvuBRPVaGbqxcXc7a/1G7mtdJ+1W8djojToG3HLSf3QfxrZkh8Pan4hSG7+yXeqWiMEtt2TCh65FYmv+Hde1fEH2qC4iG4I8p2mJeMNj19KzPC3hjxT4Th1K4hNhNLcuMtO37wqB13f0qIpnJGV3ZHWp4d0lzLBBaeWS++MgfdHHT6kY/KuY8Y63B4N1rSfEEgb/AE3dZ3sC8+bGvR/95a6yZW1LRLiM7zMsAYSRn/lsFBwv0NeFeNfEepa6tpHfIssVuWKySL86HoQfbiqigheTIviL4p0vxRq1o1lZSRJbxk/anGHmX0x6CuZg1J4dLbZEgVX+Rj2zzVywtrbVrV9N2YvDmTT5M8k/88T7HtWzZeC5rzweX241J7pVERO3yhnac/hWj903T5TB0q0m1m4aG4uMMzD5yflx3/CrRt5tK1qBrJZLhmI8uMcgqDj+dbUOkXOjX7wX1q0CYEED9RJz1Nej+B/CgsJrm91Ce3mvzJ5cLZ+V19APaqT5h899TgLzR4NTEXlFY1lZUZ5P4BnmqevaMnha4uNPtdRmGlXybVc9Ln1DfQ9K9Dl8KXjaw9taKv2ZnGWcfdOck1nfGC0to9I0uEMq/ZrnLAjB245IFO2gnO5zkHhuPQLBdatbudZ9qsk0KbgVwQVX6nv7Cr+iJELDztMnkvYpQznfGVYyE8g89R6VWtbspp6Tx6l9r0eGMi3sR8rQjOF+vOc0eGGsXsdSkjuLmCTIYwoMhZD0f86y5xQb2RJbQCGDU2LvEsoDhiOVOdoIH1xTdfm1jTPEywqgv9SuoFaWGNN6wb8AlT6nr7CrF3Ff3IuLdSs0sYCpIBwJgM7W9q6vS7qS20w6rprEW0Vok85k5dHXloVP+3972pyely3NrRna+HNCtvBnhwq11O6KnnztO2Qpxk49KfrF4GuNMhjuDFDelmZ14JXYcEfmK57w3r15488NX51CS0tre/DQwxRf6yFTxh/U/lV9vDcbaXo1mmrSKumFYjMRkyhQcr+RHPtWcpaGMpXNj7KsVgbdJHlMsZi+ZuWB4Jz2NZUesXGjfZtJubd7mS3wHkUfdg6K/vjvWnHrWnrq8Ojll89ofNVVOVABwBn1pt1dWV5qNzojAHUGty/K4Gw8df0xSV+UUH3PN9a0CPxL4itbjToorGCaRrVlVcF2X5mb9RzV/QLOytLKaG3gn+zwykT3bj5nI4PPavQ4tIsbbR47ExqEAxlR3PU59+Pyqjr8dkNJk0+6RrWylXb50fHlnt+FXd6HTCpFbHOWRv4biS4tG8qEKFiicfNtA5LeucUyEzeIfEEMdhdJp9vlpmMQw7M33ufc5ruNIMH9kW22YXS+WqfaMfNJgYyfyppk8pYvJt4Yrgy7FDDGQOpFDdglWvseb6Z4PWXWJINSkuSIJTKqyH/WJnGR9Ca66wumtLqAyTCZYl+wyTzLtZnyWX8AO/epbySHXL1Qnm2c0LtHBdKuGVu/1FV7zwjPJM179r+0XQA+bOC2BzgepqEZybmzO1PQ9Q1fxdHq2mxwrFZdJHHzM3OSPXrxWZaeCQND1a51HTnF1IzSRSB9zdck9PxxXU6NNdTXt7aorWzpjzlkGWGR1Bq21nqUdykNtqXmRGMI0cq9R3bPqelK+lhN8pw2k3q6VryaTpSSf2Wx85tnzFmdRu3fU54roy95Zl4p5ljaUeVZuv8AyzPZfetiy0XTtOaO7t7dWnx5ZkUYx26fjRdQRwPBbQQ/aieqnqgP8eaTgZ1Hc5k2p8QXJuvtf2d9PkGY5Uw07p/EDn7prZh0tNStZrW4tWFur/K27+Ic/lzVTTfDUlle2vnzYtrUzSxqDnqfl3HuBzj61uRyXFna+aWEyc8E4J544puKsEp9ANvOl/HPCVKJEEK49qj8wl7a+urh4QGMLRL0Y5OD+QNXYryKZgisoZlyFB5yKjFzHcuVeJN4HmgN0GAcfzqW+hCZoweSUDxY2E9hTGjgt55H2ndKwZvqBisu2WcqrbtoAzHt6A+9WpJpTtbYCVYDGeo7mqWxTkfL91aI7HdHjbuI98Hik0G/+xXc/mqjbWWSJWOCJOmB9auXsZa4WJCCCTz+FZOrwkahYTRoqy/d3dtw711zaeh0wutS1d6pFDq1vcRaWEuhIJYZEO3LAjhh3yOD9a1fC+safpfiL+1tOAtL1GZJ9OuOYpEPLBX/AIeenBrntZjE0i3ShmEwIcr1WUYyfxwDVYWjPm1Mm2NQHD+prJJGkoyaue5Weu3XjG+ljsdJkt7MQFLy5lODL/diU45x6/pV+yure/dL+MzWMNgsllPpjRYR3OGBPqMd6848EeJtTtbOPSrKdIVbUFNzNNyoVhgY9Oler2L20NvqGyQz3hzLKG+87p2A9KyqbnLNNE9pbx6eWj0uyFtFcASyrGuMt6D8KxdKgOn67da5cXFtpNnPF5f2dpMoWB5ZhxzxWPrOt+KNJ1dNQ0+BzoV88cs/mjmI9GUe1dHrjaVeXmkz6pZRrobOZEaZfl87+Bj7VCuTGF46ltdRtphOPt0UkCv5slxE2Ci9QPyIxXB2NlrmqeIZhZ6rcwqxZ5IrluV3cByPQjpXW3XhrSLeW8itpxYprM8Uls23KsV+ZlA9D/WtRoY4/E7amzp9mmtxbnaOQF/+vVp8omlEyZfD15p2jKul6rcRCJArxbsrnPJX685/CuN8QabfWVuzfZobm2L+bIzjOF7g+ldr4z1uCwwlpcmPUFiEpT+Hyc9T+OK5Wa61XXVfTPOje7kC+dEPlGw9G+tJ3KpaanBXljYWtzDdQWjxXNov2iS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"path": "images/3pts_ADE_train_00010058.jpg"
} |
depth_point_132 | images/3pts_ADE_train_00015864.jpg | ADE_train_00015864.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 160 y = 200),Point B is located at (x = 143 y = 147),Point C is located at (x = 144 y = 223).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_74><DEPTH_64><DEPTH_40><DEPTH_38><DEPTH_64><DEPTH_31><DEPTH_3><DEPTH_76><DEPTH_11><DEPTH_22><DEPTH_74><DEPTH_36><DEPTH_58><DEPTH_74><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_15><DEPTH_40><DEPTH_60><DEPTH_40><DEPTH_11><DEPTH_69><DEPTH_29><DEPTH_74><DEPTH_29><DEPTH_31><DEPTH_74><DEPTH_40><DEPTH_3><DEPTH_49><DEPTH_38><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_49><DEPTH_29><DEPTH_29><DEPTH_3><DEPTH_74><DEPTH_64><DEPTH_64><DEPTH_74><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_49><DEPTH_49><DEPTH_3><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_36><DEPTH_36><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_74><DEPTH_72><DEPTH_64><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_44><DEPTH_44><DEPTH_72><DEPTH_25><DEPTH_41><DEPTH_0><DEPTH_41><DEPTH_19><DEPTH_19><DEPTH_2><DEPTH_44><DEPTH_44><DEPTH_0><DEPTH_57><DEPTH_0><DEPTH_19><DEPTH_78><DEPTH_2><DEPTH_1><DEPTH_94><DEPTH_41><DEPTH_0><DEPTH_57><DEPTH_0><DEPTH_1><DEPTH_57><DEPTH_57><DEPTH_94><DEPTH_42><DEPTH_42><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"B",
"A",
"C"
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",
"path": "images/3pts_ADE_train_00015864.jpg"
} |
depth_point_133 | images/5pts_ADE_train_00007881.jpg | ADE_train_00007881.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 254 y = 200),Point B is located at (x = 324 y = 217),Point C is located at (x = 232 y = 212),Point D is located at (x = 214 y = 177),Point E is located at (x = 47 y = 98).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_17><DEPTH_17><DEPTH_70><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_17><DEPTH_76><DEPTH_49><DEPTH_30><DEPTH_66><DEPTH_58><DEPTH_76><DEPTH_3><DEPTH_17><DEPTH_67><DEPTH_5><DEPTH_3><DEPTH_64><DEPTH_64><DEPTH_3><DEPTH_35><DEPTH_35><DEPTH_58><DEPTH_36><DEPTH_17><DEPTH_17><DEPTH_3><DEPTH_74><DEPTH_70><DEPTH_3><DEPTH_36><DEPTH_39><DEPTH_67><DEPTH_49><DEPTH_25><DEPTH_3><DEPTH_70><DEPTH_49><DEPTH_23><DEPTH_16><DEPTH_42><DEPTH_32><DEPTH_16><DEPTH_60><DEPTH_59><DEPTH_69><DEPTH_44><DEPTH_94><DEPTH_39><DEPTH_41><DEPTH_64><DEPTH_64><DEPTH_82><DEPTH_82><DEPTH_73><DEPTH_11><DEPTH_36><DEPTH_32><DEPTH_82><DEPTH_44><DEPTH_45><DEPTH_45><DEPTH_39><DEPTH_55><DEPTH_76><DEPTH_3><DEPTH_25><DEPTH_81><DEPTH_14><DEPTH_33><DEPTH_94><DEPTH_42><DEPTH_19><DEPTH_98><DEPTH_0><DEPTH_69><DEPTH_0><DEPTH_78><DEPTH_0><DEPTH_32><DEPTH_64><DEPTH_16><DEPTH_66><DEPTH_19><DEPTH_78><DEPTH_23><DEPTH_16><DEPTH_16><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_57><DEPTH_94><DEPTH_16><DEPTH_42><DEPTH_94><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 5 | [
"E",
"B",
"A",
"D",
"C"
] | <DEPTH_START><DEPTH_17><DEPTH_17><DEPTH_17><DEPTH_70><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_17><DEPTH_76><DEPTH_49><DEPTH_30><DEPTH_66><DEPTH_58><DEPTH_76><DEPTH_3><DEPTH_17><DEPTH_67><DEPTH_5><DEPTH_3><DEPTH_64><DEPTH_64><DEPTH_3><DEPTH_35><DEPTH_35><DEPTH_58><DEPTH_36><DEPTH_17><DEPTH_17><DEPTH_3><DEPTH_74><DEPTH_70><DEPTH_3><DEPTH_36><DEPTH_39><DEPTH_67><DEPTH_49><DEPTH_25><DEPTH_3><DEPTH_70><DEPTH_49><DEPTH_23><DEPTH_16><DEPTH_42><DEPTH_32><DEPTH_16><DEPTH_60><DEPTH_59><DEPTH_69><DEPTH_44><DEPTH_94><DEPTH_39><DEPTH_41><DEPTH_64><DEPTH_64><DEPTH_82><DEPTH_82><DEPTH_73><DEPTH_11><DEPTH_36><DEPTH_32><DEPTH_82><DEPTH_44><DEPTH_45><DEPTH_45><DEPTH_39><DEPTH_55><DEPTH_76><DEPTH_3><DEPTH_25><DEPTH_81><DEPTH_14><DEPTH_33><DEPTH_94><DEPTH_42><DEPTH_19><DEPTH_98><DEPTH_0><DEPTH_69><DEPTH_0><DEPTH_78><DEPTH_0><DEPTH_32><DEPTH_64><DEPTH_16><DEPTH_66><DEPTH_19><DEPTH_78><DEPTH_23><DEPTH_16><DEPTH_16><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_57><DEPTH_94><DEPTH_16><DEPTH_42><DEPTH_94><DEPTH_END> | 254 | 200 | 324 | 217 | 232 | 212 | 214 | 177 | 47 | 98 | 90 | 68 | 152 | 121 | 48 | {
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",
"path": "images/5pts_ADE_train_00007881.jpg"
} |
depth_point_134 | images/3pts_ADE_train_00005801.jpg | ADE_train_00005801.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 111 y = 206),Point B is located at (x = 15 y = 135),Point C is located at (x = 25 y = 194).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_42><DEPTH_16><DEPTH_94><DEPTH_81><DEPTH_80><DEPTH_74><DEPTH_5><DEPTH_38><DEPTH_23><DEPTH_121><DEPTH_121><DEPTH_55><DEPTH_39><DEPTH_77><DEPTH_98><DEPTH_37><DEPTH_22><DEPTH_26><DEPTH_23><DEPTH_1><DEPTH_10><DEPTH_50><DEPTH_44><DEPTH_40><DEPTH_12><DEPTH_32><DEPTH_65><DEPTH_7><DEPTH_32><DEPTH_57><DEPTH_45><DEPTH_9><DEPTH_82><DEPTH_45><DEPTH_32><DEPTH_1><DEPTH_98><DEPTH_7><DEPTH_41><DEPTH_39><DEPTH_23><DEPTH_16><DEPTH_19><DEPTH_45><DEPTH_2><DEPTH_19><DEPTH_14><DEPTH_44><DEPTH_59><DEPTH_38><DEPTH_98><DEPTH_16><DEPTH_81><DEPTH_68><DEPTH_78><DEPTH_25><DEPTH_32><DEPTH_121><DEPTH_83><DEPTH_78><DEPTH_8><DEPTH_2><DEPTH_58><DEPTH_55><DEPTH_42><DEPTH_14><DEPTH_16><DEPTH_14><DEPTH_64><DEPTH_57><DEPTH_94><DEPTH_16><DEPTH_44><DEPTH_23><DEPTH_39><DEPTH_57><DEPTH_42><DEPTH_24><DEPTH_55><DEPTH_98><DEPTH_119><DEPTH_78><DEPTH_78><DEPTH_53><DEPTH_23><DEPTH_9><DEPTH_55><DEPTH_50><DEPTH_16><DEPTH_119><DEPTH_57><DEPTH_2><DEPTH_72><DEPTH_85><DEPTH_66><DEPTH_76><DEPTH_14><DEPTH_82><DEPTH_16><DEPTH_23><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"A",
"B",
"C"
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7VAGAOCfU1ArtnBVOPauidTm0RlGFtWXUwqZqzLdLaWb7OXI+X6msdr0RuFVdx7gHjNRyzM2TI3K+nSphZJlSuxJ2kmJkuZDK/TntUclibgqYOOPmFIWLc4x7Ve07el3E6uyOrgqy9c5pNAie00DfasWS4kmPCrFE7H8+la0fh+9ubcWw0S9MeQwMjCPkcZP4V7Peag+lWdvIthdXZdlRxbIGKZ/iI9M1Z1C3WWNZGUZX1GeKxndK5urbHjknhTVmhjSCwsIimQHlfcwB7ck0yx8AalHIXu5IJUI5XeST+O04r02a9srQEy3MEWP7zKv8zXP654ssP7NuIrK/Sadl2ARtnGeM5HFc/tJdCrI4DyFt3MVskYJYj5MkYHfnrT7mLyoDJLJuJ6+pNZM+pSRF0iOM8E1fsTHcWexnYydeRxWjhfUcZLYxmmLy5xgA1btVLTo6r/F1q6NFaViqFQT3qzJaLp64fke1Da2QcrWrOk0ZdOvLmCPU0LWzNtkA65x8p/pXXR2XhDTplaK3VYlRt4ldV/LGfevLtOvxLcyRgHBGRWgLa2DNIkMYO7c3y+p4rNRadrjburo9FXxt4MtFMccFqdv8Kbnx+Qpj/ErQI0Ji0iWRR1CQEf8AoRFcCdLUMJVQKXOBxzz6mo2VFlEXlmRjwdjcitYRTV7mcpSTOzuPjKscuzTNF8uPt5xVMfgAa5/V9Z+02E+oTQbCXC7IRuz0Pf8Aziqep2thb6cBLFJHct/qi3Unvn2qeO4Fvo90CcF1kUHHfZx/WuepZySNabtFyOftfEWojUEZJfPLAAI2QOR0xmr+q3jInmkmOX7TvMang45IqjYWwtr4SJaMjqNwLk4x64pdZu92mhvKQM7OWYcknAOeelPT2isjVRlKL5jrNI1KdRbXkzb5Jh5qHaC2wHaST6nmvZLRrPV/A9nd2CsYVxKm4AMdrENnHfrmvnOx1q3Ntp4dvLEdtswDkcE8+30r2X4NeIbXWPD19ohf95bSOwToTE5Jz+ZP5it6SabTOac9jP8Ag3okzSSayj4hjurmFkPvgj+dYUl7q15JaTRXVnc77m5/0e4xuGC4/l0r0H4U6fNpOhaxbSszRx6pMsbt1YKFBP5ivIdPks7yG0NxpU9yI7m5DSwnkc7gP1ranBQTS7hVqSqNOXTQ9H8G+bF4Lj82OOORgRtj6DLGuqmUf2VBH6gL+lcZ4IeM+DrZYhKsYlYBZfvD5m4NdrcHFlbe7rQtyUYmq2sD6TYQXUvkwsyK7ZAxhSR1+leV3gVIH2529ATXp3iWFbvQYC8ojCZkz6kI3FeYXuDGF7Hmu3DbHJiHsUf7gB6DPFS4JABPbJNNjA2qPXmpdoGAcYrrOU5C/RJJCrKCCSefrWcF55YsRwCxycVpXpH2lwOgJrO5IzjFcDikkelWleb+X5HcSWpjIYYI+lLGGBHk/Kc5BXiqo8Tae6lW3/8AfNJa+ILMy+VDHJlujMOtctmO6L2qX/iJViNncjA4KbQPxyaydRs/Fd6ga4mZlI+4j7R+QrfF1FNCMpKRnJbYRita0uIXt1RjuI6Z7irpQi9GKXc83h8KavMN/khc/wB9ua1bXRtb0zT5YbRF824OJDu+6O2PzrvjGFi3LHJK3ZUX/Gnw2l7KQfshUH+8eauagluKNzyWXwrq0cW7yQx/uq2TiqNvazROxkRkwduGGK9wj0O+kbpEqgYxgk/nVa88FWQEt/qJaUKuW4zgD0FZOUehag7njbzrHkZDH0FVnluJThIzz/dGSa9ZVPD1sMW+kmTHd8KKBqvkj/RLGzt/cJuNO0uxapNnmFvo+ogeb9huCvY+Wa37bwLqV2guZxHbK3K+a2CB9K6ibVL+b713Jg9k+X+VQ/Zp5h5jRyMP78nT8zQ20V7Bbsyk8FafDzda1Hx1WJd1T2nhzSWvoo7e6uyzHCFlCqG7E57ZxUktzZQZWW+t1I/hjO8/+O5pVuYFUSxxXUqDncFCDH4nNJbbjVOGyJj4n1pJmR9YukZCVZAicEdR92tCwGoa7aagt5rd+8EYU+WrBd+egzjjpXN6pdDUNQlu4oWiWTGVY5JYDBP49a6Xw5iTSNQjO4KYovM2jkLkhsfhmm1aJj9ozrvwtpunrA/2ZjKxcSeZJ5mGU44PHFY+tGG3t44YYkjVQWwox0//AF112um3tdPtDFIWtvMkETklsrwep6855rgdTn+0x3kinKxxbR+dc+8jS+hzBkLNnNbWjJLLIFXNZFlbtOykDINd54dsVhZSy81c3ZBShzM3tL0nbGHkHNZHiiz2xFkHSurmn8uEBfSsS8P2xGQiue7vc7XFW5TzuxuWgv1BOAxwa7HTxvilUjlSM/TtXL6xpz2c8cqjgSDNdNojiW5IY8PEGrSdmuZHIk03FmxDAlwAm5s55yf5Vbh0qKO6IRv3p5BA9fWksLdJJpMlu+3bWlCnnLsSN3b1xz9a4lKalo9C7JrU47xHBImptFdTBEjUGMhCfMz6fyqK41caZZiL7JFcGYtgyDITAHb8a9ITwXNrkZ8/PlJ8wkJ+7xzljwB9K888TafZ2zPB9rTYjFFdPnBzjOMda11bi2VHl1uY0erz6hNdT3EpaVLZnZuwOcAY9BmqmqSb7G2x0Jcn/vkVDaQ+TBqhTJUQhAfXLjn9KNUfy9Otc996/otdPKrqxCk43vsZ1nG8sO4dEJHT1rtPhBfSaf8AEnT8ymOOYvBJno25TtH4sFrP8JWkU+iXjuoJWXn6YFXvCVisXxB0q5nKxWUdwszzOcBQuW6/VcfjWnNq0Yun7qke+W8uq2Iv1gQvbGSaQYUcEkk5P1Oa8D8H3jF7qM6r9hKymRSRkHKkH+lfSN1HcJpmoziParwSPjj+5Xy74QleDVl22kV15zGIxy9OQP6kVVOm4x1epVWspqyjY9e8ENIfDX727S6LPuEidPTFdve/LbWq9w61xXghSfDMCNaLasJyDGpyOvX8a7TVWC/Zh/tighHLeKkZvDFtvYKySg49eo/rXnOov2H/AOqvRvGrAaNaA/8APf8Aoa81vGBkb0xxXoYdaHHiHqRRqGUdevFTOemcj60xV+RDSE/Nt610nMjkrvmeQ+9VChjOCc5HetZ4BLczyN90OePWs6fHn88VwVJrm5F0PYlh5ex9vJb7HQWvw/8AEVyR/oQiB7yuB+ldBp3w5eyJl1HUraJuwU9PzxXp3iW0efRJTAWV4iJPlOMgdRx7V5ucHk8k9zUQjzrciEEzQGl6JZJg6pPK/wDsLkfy/rU1tf6bp6ssFpNOzfxSkAflWbFBPO2IYXc/7Kk1Yl06W2TzL6a3s0/vXEqp+hpuEFuzVQS3LkniO7xtght4R7DcaoS6tfzE77yXHonyj9KyrrxF4XsciXV3unH8FnCWB/4EcCsW4+IVjHkabogc9pLyUt/46uB+tRzQWyDmgj0XwnqJi1B7aRiUuB1Y5ww6V1F9e2cEEgvbiGOFgQfMYLxjnrXg58Q+MNWjb7O7W0HpbRCIfn1P51G/hq6lQ3Go37yyHGFYlifbJqHGU3c56mIgjp73VNAs5JN+sJMqk7RbRmQkduen61mDxXaTS+Vpmj3N2/Zp5No/Jf8AGq1noFkPMl2ARqxUb2ySR19q3rVWtPJFlHAI2bYEUDJON3+c1oqcnuzGWOfQrwS6/dru3W9ipBIS2hBf/vps/wA6pSaK1wFbUbu5nkPI892OSR064FdcZzM4DMFlXlh7e9Vrq1u72zn+zQSHy2Uq+3hjnkewx3pxhFdDklXqTloznrO2jt2ZI4QrKx+XHI561q2w8tmeMfe4ZSOPyq5rUEcFvbzqV3sFQnvnH+A6VWt2aApNMvySAhWA6/hV3jY6KFSTXMitNYLIpCYHtUmmzX9kD9kl8pnjAc7QehPrV9XX+LaAOOB1qFSFYjsc/wA6zmklodlOTqS98qajPcyweZf3DzJGd2GPH5VxyktYXK9DIcY/Cur16YNYlf7zAVyErGJY/wDroxNcnU2kknobHh/TImt4yozkZrr7ex8hQ2K5vw1IFKx9gTj6ZrtZHHlAVlNvmOqilykWzeADTTYhMtipEcDFWJpR9nOPSs3exskjhPFRRYVGOS+MfgaZpOUurZDw7oF5+tM8RSo0qhz0cECm29yY7q1ugNwjwxH41ql+7scM/jZ6ppvh4zovkxkjq7n5VH1Jq7cXmk6ECiyJeXC/wJwin3rze58d6/4mvf7Ogb7DpynaY4jhn+rf4VavCsVr5MB4HBb1NYVX7PRLUILn16GjrnjeXUFNvdXDLB2ii+VR7EDrXP8A9tWWprHp81uBDExZWAHBPvWHeQ53c8Dp6n3qOwgc3AC8YppaczepVrOyNq50+K0kY29qro68gNjeMHqetcvqSh7SyEjBF3yZz2+Va61zK9pLDGxSXblVJ6GuU1RN9lZBh1lcHP8AwGtaT1RM17rRa8N6kNM0SdNm6WeT5AemMYqxHqU+8LK6Mo42BAdufQ+tZS7TI20YUcKB0AqWNi+c9acrt3JWyR9Qya7Fe/D2e+tmyjae7Lnkj5D198ivmPSYVJh3u6CTzWBQ8krggfiVxXofhHXpo/AmvadIzlFt5PKwOBuVsj+teb6bqH2K7sJxtYWs+/5hwRkE5ruoPnt8zlmuVO57H8Mngn04RwSTPGtwWzN1zjOPpxXd6ueYPZwa5fwPZzWt3cxSzRSKr7o/L6KrDIH6102r8tF/vis+5ojk/Hcn+jWUQ7yu3H+fevOJyPNIPSu98bEm4s17BXP6iuCnB3n3OK9HD/CcNf4h6H92G+tI/DKQcHninhCqBRURbLitzE56KQKbgscAMTmqtpbx3d8/mZKFc4qOcnfJzwWJqfSztuvwrzK9LlUp9T6LB4pValGhJaL8T1bUfjH4btgyW4uLw4x+7jwp/FsVwd18TwGb+yvD9rFno9wxlP5cCuGS2RPvDd9atBiFwFHHpSVJ9WeW6ltjTvvG/ivUVKtqMsMR/gtwIh+nNYMkM9w5kuJmdj1Z2LH8zVxVOOM0HPcVSppE87Ki2san+99au2VwLK6jmWNGK/wsuQRTMewpNmR61SSQm76M72LXLHU4Y4i5hYEEqDtJ9s10sRsrizWN4Y3TbtVT0FePoxQ5Bxit3RtZa3lCyNlc8oTw349jVHPKm1dxOyn01fNeZYHdACxwSFJ9/Qe9X4LGwtr+ARKjJMXQ7ecMP5dDTNP8QWchC+XLEqjBUHcBVRg819LOsrbJTyhbtxx7Dim9jnVObdmWZ7O2jgkkiuWjXeSGPO4g/mRWnbX962lBoVEMewHdIvzt1zx2rDuNMiut2/5AW3YT5efrVqGNhGtvLNIYwNuSeT9fWs21bU1jh5rZlNNZtrqMpd2ytx95TnB/LrTJ/s8ixJHLuXkp83THtS3EVvESu4cHrWRd6xZWWGkkUsOgHJpNR3RtCEou1y8moKrhQxOeuasRy+Yue5z/ADrB0xRfSPJ5iqGO7r/Kt2JEiXAJIBPWspSex6SpxUb9TF19yscKdy+f0rAuY98MDDknP61sa/KDMpH8HSsa3bzY2jYcpyPYVlvqT1sXfD92I7sKxxzXoZ/ewKVPavIo5jb6jleACK9J0W/82BAx7VlVXU6KE+hpLG5AqW5YRWhJParTSRrFnisDV7stAwU1nudM5rocRrE32jUVA5AbP6VLBISBF2IyfoKqTI3mM/cnAqwjbGJ9UrbpY4d3c1dIiRZWdepauojs0ucBs4xjArmNJIyAOoPNdzp0OVBriqayOumihdaFbSgMVYEDHFUm02CHlVO4d67J7YGLOK5zUV8tjU2aNJJM566cxSLKOqHn3FY2swq5t41wN0rMPx21p6gdycdM81zuuys1vYbXIZVfIB98f0rppq7OaWm426jWGXCH3+tQNdbF2r17n0qS8ly0a8s+1BkdzgZ/WqKoZWycg1tFaamE3Z2O88PeJF0rwV4gt/MVTdxFORz0IGPzrz60cyCQ/wC0Kl1C422ogX+I5P0FVdPcea0ZOC3SurCvlkrmFVXVkfRvwnlF14YSfyyroxhZj/HtHB/I4rq9UO5o/wDeFc78LIvI8DWoOMs8jEj13H/Ct+/J/dt/tA0pNXdioxcVZ7nB+L59+tFA3yxx4GPck1yEwzKnqTn6Vva3L52uXQx9xin15NYsqj7QoGOneu+j8KOGtrJibjg47Hp60zqx46DNS7TjgckelQNkFiT/AA1sZHHS/ebnvT7Btt6nvkVG5y5pIXEdxG5OAG5NctdXhJHo4OfJXhJ9GimI2KEgdP4aRSR8w5Fdv428OJYQrqNrEY0ZtsyAcAnoR6VxUrxxQ7zklepX/CoTVrmHkOByOOR3FPyGBADDiqS30TuoCuGJx0FXo23cHr0ppqWwWsNC547igAA1a8lViLA89eaj2bu3SjlEma7WVpqmmefaRrBdQjDxL0cetYoQEccCt3wzcC31UEsFVo2Vsnisl4pHmbZGQpYld3HFYp8kmm9DXlc0nFGjoW59RiQknn16iu2WPynGSeuMe1cLotyLO8PnINx4Vs8Ve8Q+MUV3h087n6GXsPp61rzxauRKnKLs0dPd6xaWMLNLMqgDueSawNS8Q3J0UX9p5YjZ9nz9e4ziuBmuZZ3MksjOx7k00zyGMR7yYwc7c8ZrCUn0LUO5fuNWvLknzbmRs9QDgVUEmWJIyfU1DuJpM1JVjp/DdrfTu8lvDI8A4YqCQDXWrBcRwZkjdME/eGK5PwLr13o/iKLyIpLlbgGJrZGAMhx8uM8ZzivQ/Fmtvc6dFAkElvJJH5sscoG9PRTjv3oUHJ2Ro63JCzOBvpxcTsARjr+VZkEzfaZCP4j+lSKxbIHJYCq8RIuuOlZpdB3GTBRdli23jPPrXb+FHju7UoX/AHqgHI9K5ZNN/tCSRVbado2n8cf1qvbXWoeH787SY5V4KuMhhTlSk4cwo1VGdmerfY7k8Nc5T02CszW44rSwdgTu6DJrEt/iFL5e2ewUt6o+P0NZ+peKH1UpAtuI1LAks2TWHs531Ol1oW0GOVZ4xjGMsT+gqvIdkuM/N0NMu52il3gYV0XH51G7iSZ39Vz/ACq7GVze0E5GT3au7sLpVAGa4Lw6rFXyMfNx+QrpU8yM55rCUVc66ex18t6gh6iucv5ll3U1ZpJAFOarTQyAt1qeVNGmxg3r7OCeGOK5nUlzLFvGQHKn2yQa6PVbWV1QxglhIDgdx3rHu4g8XmOMhSGx61pSsmc9Uo4D6jEM4AYk/gKiw8UjDpzyDTrdxLqCkjgsOfxGafqJ8q6mb3zW/kcsnzScjHu5C9w3PTioR1yKGJJJ9adDs81d/wBzcN30zzWiMz6i+GzA+ANOZec785/3zWzqL7Y4j3BFYvw6dJPAlnNCwaMyy4I6Y3mtXXTILHMI3Sc7R/tdqVrKxpfmdzzO4miutYu3RvlMjN9eTWfIY/tH3wo7nFZ82rwPfSIzxLNkgAnZuHrnpmpsW8l35P7wq6goRE5YnPQcV6EKkbKxwzg7u5YTMiOULYX0FU3kJhkZFL7Y8nH0qaG6RUVWFwXDt5eIyoYg4xtPU9qpygx2Uu6dcPE2FVcfn78dK09pcnkscwetMYU7vTHNZs1LVx4k1y+tTaX18XhYjehQAn6msi8wbSQ/T+dej6v4Utri+ubYsVaJgyso5TcM7T64rzvUrOSzu7mwZ8mNtpI7964FN3aOjlVk7HefEdLhDqxurzUZWPiAmCHUbYoFT97/AMe7F23R/dDYAH+r4rikBbnGO9Z9vYhpEYS8hgcFf/r1otDIo3g/KfTrWtOaWhM4StexYx5yqSQPWmiORgTwic/NTrWCRo1ZgAoPRuCakupMqhESIT93BpVq2tomlHD6c0yNJEjRwq/OOhPWmSXxMa55cHj6VUyVLAnknHWntYXUkT3CxMYkGWb2rC3c29pZWQrXBKud21SRzVC5l81g20D3HerZsrmW1eeKItFEQGIHC1PomgXWu3LKjpHFHjzJWPC/QdzVJIxlJyMhEaRgqqWY8AAdTWtH4X1uZN6abOV9cYr0PTtNtdGgiitrWLzQdouJVBYn19q0hCXb/SHMjH1PH5VMqlgUDyR9B1OLIeylBHUGli0DUZXAMHlg93OK9eEccYwqAVBKI2Qs4HsPapVR9huCOBg8MT6fqFrIl8plXEhMeVKHPGD+fPtWvrVzIltkyPJLIu3e5yxx1JPrWrLLHJfxxpyypk47emax9Vt/OhGDyquOfqDXpYeL9hKa3Zw1pL20YdDmrdjsZgMkLtH8qi2lXyOmeKuNEYIufvbhn29KgKlmVMjC9T6mvOO6x0ujxKtvJIB82EJPsCDW9eaXaahEEuoVf0PQj6GsDQWMkzW5BCyRHn9K6KK9gIjieVROw+4Tznof1Br3MHaVJJo8nF3VV2Zz994NsVjLW880bZwFJDZJ6CoW8IxWUQnad5XDDIAwMZrp0InnWXrGoIT3Pc/0/OprgL9mk3HC7Tk+lVPDU2m0iI4iomlc8+v082UxDpG/B9iajNsRKsYOTsxkfWr01qySGQHO6QANjrjvUemRma/DvwCCPxrw5xa1R7MWmb3h4eZEilQCnyfXFdVJbDYK5TQ38tyDwd/IrqjPkqK5J3ud9J6EkcCgrxVma2UxE4pgO1Q1KZi0RqLWNDCkRFM7njy0J46+lcxdWn/Envm53RBW/DOP61patLIb6NVdlXzBvweo96m1SJItE1Z8gBoMD3Oc1SdmkYTd0zzqyYm9XqQeuOw9al1l2WTaTywBqra3AtpWYrkEYpNSuvtNwD2VcCu62pwdCnmlH3RTad6UxH0t8IZVk+GVmv8AzznlU/8AfRP9a6m+Xcka9y/X8K5D4OqB8OIB/fmlJ/76I/pXVXjYRmz9xGb8lqehcdjwfx3p1tplxa3NoPKZSemcknvmsq08balBcxzSsJXiVVQkAYCnIrU+JE4+22Vuc5EZYn3zXDDHHI/Olh21TRNVXkdZP461GYWgACG2LspBxlmJOT+dLZWGqX2kX2uB9trv2SgPgM3GTt79RXLxwyOCyqWHYivTXin0v4ZR2hO0vh5FwOrNn/CrnXjFpSe4owuzhTxUbGnnpUZ612mB68BHGh3n5mJLEnJY+pNebeI47OfW7y8ZpFgDLGwjAJeTbzj0wMda6nUd9xFLE9yys6kAocY4rzu2uhEjwyxCeFmDMrEg59QexrympWutz1MNKkqq9ra2tr3te2l7a29Px2EuYRbrFLBIzQTAlCwwRg4IPuPWo/tEip1zk+vNSXNx9pKLsWOOMYRF6Af4+9V9uBwa0gny+9uZ4qdP2rdH4dO+9tbX1te9r9DXtdSjjtnWQM0h9eaq/azubaOvTPaqisM5YVIjbiBxinymbrSasOCFjnv61Kt9NBBNbRO3lzAB/So5ZM/JH+J9KiZwOB2qrGVzettdWz0V7OG28ufORKGyDnrkGsjT7q5srsXNpv3DrgZBpkay3MgijXJb9K6/TrWP7KbRwoAXKueMEUnZCb1Ip/E9zHDGzQJIzfMMnAH4VGvjO/HW3hJ9yawL65WW5Yg/KowtTabpd5qcv7mMhB1dugquWNtQTZoyeJdWuJdySqgPAREyKvWem65qDebcXssSPyQDgn6DtW1pWgW1gFO3zJz/ABEZP4V0dvaBWAcAseiZ/nWUpdIotLqzmLPTP7Nnb5s7h17nnqfWq1yN8LnGSNxrb1JydTdMj5BtwOBWNjMm09C5Br3cPT/2dRZ5Fef7+6OSmmKtJGeRuApUANqzZ/eE5UfzNV751F7IgPyhxyKuWrNI6tHETiPy/wAeea8Zw96x66mrXOl8PW/zvPt4C7FPrnk/0q/c6RDPe/aWAydu73xTdAjKaTCW6sN1ah5x9a9zDR5KSR4+InzVW0IRt28cD0rHm1GWZ3hMQTbIEGSfmOSPy6Vsmsq6toZWnWPLSR5dmZyApPOBinW5uXQilbm1KEn/AB5sskRJKhhIp4QnOBj8P1rMIksY4nIBiY53e4q7cRzyOFQEMFH7sNnqABg/h+hqafT5LdrYsVe23ZZMHgkc/hXl+xlN2toj0/axgvNkMV0qz+ap4bB/SujtZxOqsDXJ3kEsMwUry3IArd0IttCsDx1B7Vw16bg9Tvw9VS2OlBJjApGISE+tPWSIxjbIhPoGFQurOp4P5VyyZ2yZytyjS3znHyjk/nWb4l1RlsLi3U/I21B7k4z/ACNbt7C8bNIkbtyM4FVfEnhySysoZJrNpkDZM4PygY/iHrVQ+JSOaptY8zwWzgH1qMnJzWtqVyojMMWFQ9h6Vkmu2LurnG1YQckU4nnNIBzR3piPfPhL4h0q28Eizub+GK4hlkJjdsEAnIruDJHd2lxLbyLNH5LDcrAjOPavGvhZBbzabqDSRq7+coO5c8bT/wDXrsmvNX0OWSHSoLVrGf70bLjYT1IriliVGo4S2NowvG6PMfG2rsviWaLyoZo0iVCsi5wTz1/GuTd0K5MDJnkENx+teoWWiaYusXmqavEbh5ZSUQqCkS+pB+8cD8K6nULCxv7Rbd1hlgkX9y7ICI2x8pHoPauqnG0UkKUXe7OP8AaVZT6HHcT26SSNIwy/PQ+ldD4uC/8ACNz4H93+dReFJJJdGjaZgZFkZTgADgkcY47VL4sDDw5dZwVOMe3NeXJ3xCv3NI/CeWk8VHn5qcfu0xuAW6Yr6O5wDJb67mO555CR0O7FVXbcBjg9zV2y0+5v5DHAuf8AaPQUy+0u90+QC5t2UHo4GVP41xaGxTCr35p+V6bacuD1p5wB0zTEMVRjik3behI/ChpQvIAq2ml3VwFJVUDDJOen4UA3YpNKMbR/+uprawurphsjIB7txW5aaPFBgkZb1PNa8UIUDAoIc+xT0/To7OLplz95j3q4to96ssKOUJUgEeuOKnitpLqYQxj3ZvQV0Om6atqhihRmdjkk8kn3qZOwQi5O7OTsfBsSsst5KzHqYxwPzrr7LT2ZFSGMRQrwDjj8BWibO1sIftN/IuOy9cn2Hc1gap4gmu8xQAw2/TAPzMPc/wBKcKcp6vY3S7F661S104NDbYmn7tnIH1P9BWXaahcf2kt4xaZ48kgcKq9/pWZM0VoqNdFgX/1cCcySfQdh7mnILh9rXGIo/wCC1iPC+7H+Jq6qcI35URVmoRbLL3LyXBlPOWyagvEG585AJDDB6+tWAsu3ESIAe5NRyWtw0RWRk24yHB5X869hK0bHht3dzjtYjSLUCFAVdgOB3rW0tNmnTCJHaS4cJHgdPU/qazdfQrPESckKVz612WiTRz6XbsiqDsB4HfvXnQpJ15I7pVGqKL1psS2jhUEeWoXBHpVkfeHsKagB5pema9G1lY4b3dwJ6VkXcH9owy28BCSxSkyEjGeuB75GPyrWfgCqskCOXkEhidxtZ1PX0pTjzRHCfKypa2SjVt+8uqRAZJz2GP61ooDeSLHCpbJ2jPeqtklvaxrbWxyzHgE5ZjXVaLpS2KmW4d3kYcKeQg9K55Sjh4a7m8Yyrz02KdzokFhpUlyEaW9RS3mk8A4zwPSsLS0MLBwSQevvXoyQpPG6kAqex7iuB1SwvPD12w8oyWbnMbkcY9M9jXj1lKut9T1qXLS6aG3HYx7xKkagt3AxWgICtuOOvpXNQ+LViiC/YySB3fj+VXbOfXvELpHZ24tbfPzTkHA/E9fwrmWFqby0Op4iHQuJafbr9LCPnOGlI/gTvn3PQV1V1Cn2VoWRWjYEFCMgipNK0a20az8qHdJI/wA0sr8s59TUkibzxyB61soKOiMJScndnkHiX4ZRzSPc6RJ5DHn7PJ90n2bt+NeXXtlcafdyWt1E0U0Zwyt2r6pktwV+YVwfjfwfDqwhvI0CzQMCxx9+PPKn+lO9iWrniNxaTWjqk6bXZFcDPYjIqE9aualNJPqNxJMcuZGB9sHAFU8GqIPUfhbFNbaXf3bqTayzKi8fxAdc/jiu3uZlkgnlA/1UZ75+b0rM+H8cMvw/tVIBP7wOAf8AaPX9K2bS1TyWiLMiswGVOCBn1rF04SbbWprF2SOOiF1Pc7JImRSvzB12Ej2Hr+tc3qs/iJ9Mms4EeOwtF3SSHA3KTkYPf8PWvQte8Rw2RazsbSFIIsbiUB59v85rAl1WPWtCl09YxBO6lYiW+VhnO0+ntXS4ciRc8T7VctrL0sWPBEbR+E7TcDlizfgWNXvFaH/hG5yrq6sQPcVa8NwCx0S0gdgWCBDzn36+lP1wxNp08Vy48jqSWC7fTH+FcMKKbc3vclN7Hj6RlpNuetEtqdpCgkdyB0rRdQCMCren26yrdMzbVjhZz747V1OtKTsjveBp0qTlLVo9EsPCMFlBu2LGi9q1baLTpImjMaz7eNoXdW4tks8wlkLE4+UH7o/ClureMPFKihZI2wcdCPSsHC0uY86+ljyD4iwaQsaCxtDBdxSfvGRMLtI6EjjriuAjSWUrGi72Y4AA616tqUiTX9zcQ26JE8r4BJBwDjp74zXmN1pujafBHaXkl4uoSWSXQnV1MSs8Ykjj2bdxypUFtwwW6YHPQlZGd7mpbeHLi3KzXMRJHIXqB+NaCRN1JxWn4OVpvClhFGvP7zc2MgfvG4rXXRLaa4JeJ3x1+fC5/AU7GcoNs5kyIg4yxoW6B4wa7RNBt5XEcVrHzxtC5NbEGhWNhF590IgE6lhhV/xPsKjmV7IapMyPDejSNbiaUbTL8wyOcV10GnRWyZK4Hpnk/U1zGpa9JPuhsQ0URGDIeGYeg9B7VsWviOyg8O/adSlES24COXGd5HTHqT6U3TaXNI6OTliYXizS7k6kk8YeSKUbQOyEdvYd65D7XC1ybXTnimuF/wBZctzHF/uj+M+/SoPFXjS98Ru8EG6207PEQPzSe7n+lc5DuhcMjFWXoRVe1drEObtZHSrYfZpXmZnknc/PNIcsfx9KhnvntL62jeJpEnOxdvJ3ZwB+taGm3f2+2UuB5i/K49Qaeljv8Q6JKBuWG+jLD2LD/wCtW0ZtWcTGUVJWZt6le+EvDc6aTq8l3NfMo897bpb5/Hr+dcF4y0ifQtYEaX0t3ZXMYntZy+d8Z/qKqeMmaTxrrJclj9sk5/4Fit3VSdT+E+j3so/fafePZqx/iQjcB+HFTKrOW7CNOMdkcWZnaARnJ2tlfb1rqfC14RaMmeYn6ex/yaw9J0qbVLgRxghBy7eldH/wil7bAy6fKd68lGON3saVPEKnUvIqeHlUhaJ1hOF470p6emRVe3l862jkOFG3nJ6HuPzqRXHALKQO+6vdT5kmjxGrOzAOclJB9DUTxM52MPl9e1SSyRuAEdN3TrUIg3nBmz7A1on3Ifkavh2wha9adUBEfyhsdzXaxgjgqMVieGrcrpjOAB/pGB9MY/nXRqucgj8q8PFz56rPZwsOWmhFEecjr34rG1jxVp+nSmzMBuZB/rEGNo9j15rakTy43YDJVSQPwrmvC+hW81iNRvoVlnuGL/vOQBn09a45X2R6FFU0nOpr5GtoE+iaujS2un28Uy8spiXP1FdEMJxwo9PSuKvbJNB8QadeWQMcFzOIZYweMnjI/Amux5Y/1pxbejCtCKtKGzBmy2BnA60zZmlHORT1zkjNMxIXjzGQOvQVFc2yyySJgY8oirbEbQMc7hUYJ3zP2AxTsI+avHWgnRtbaSNMW9yS6Y6Bu4/z61gWNlJdXCoBhepJ6V9EX+mWd7dW8V7axTxsTlZFzgnoR6GsbVPA1nqGnzJpcn2R42JYuN2R6ew4pw5b+8TNNr3TB8B3U9gLu2ANxYsN7FOTG3TO3qQfbpiutjvILieOC1ZpA+4h1Hyjbzgn1yRXCW/w98VARtbXKJFvK5S4KlQTycfrXqUVjZeH9ADSyEJboFMshyzcgkn3JAolZz5loFO6jyvU8i1hphtBf5HdiVz3z3/T8qgtblxLb2zHdEJdwUcYzjPPXtV+7tG1rVobPT52MkkreTGYuCrHqWzkcDPTtVm88I3el6i0M93As6kNbKeBN75PH4VU2pVNy60XF2XRL8ja0K/trqL7IMLcWpKvGzdh0578d6xfGOpWUlstiGkdlbzXCHIQg8KadLYQFimp6TJHLsKrLDllJOcE4rCtfD08OnsUn2SZzsZGKuPrjj8amVPk0Jw9Tmtcx7zUWVF+zod5PO9e1OstUnNlPEzbJJXwwHHyAdPpmugtbLSDp8iam2LkNjCZIH0xwaw9SsZbJ4bjYyxsMAMOcds/UUqa5fesdmJlWqRbm7H0gbrzARGVwv3mPQVRv7S4v7F4bZzGzdZTkMf930q9Hal2Ms4UdCEXoP8AGpDMvSPnHftUHJY4ltHmtnMVxcM7jnfwCfckDk15DnxK1ksLeGZnuUtzaLemymMwiIK7eu37pKglc44zwMe7XnlQNJPPOijOWkcgD9TVOwvrPUXZbOdZX7ryGx64IBx06VLqq9maRw9SUHUjFuK3dtF8znfA+nTW3hCxivIpIZF8zdC6FWH7xuoPPTtXVW+ntNjACRDjP+H+FaUVlHEC9wQSoywJwF+p7fSsXVfEmN0Gm9uDNjGP90dvrVRhKoyUi5eX1locRQDfORxGPvH6nsPauTvr+51GXfO/yj7sa8Kv0FEFvNdXGxA0krHJ7n6n/GszVPElnpTNb6c8dzfDh7n70cR9E/vN79B710WhRXmaaQ1Zcvbi10eASX2WlYborRDh292P8K/qa5C/1S+1G5FxM6jZlY4lHyRqewH9epqFrjz5GlllaSVzlnc5LH1Jpdo4ORXLOpKTMZTcieLTbO60eWdSIrmH72Tw3p+dZHlMTnPFXXTrg8dx61HjB5qbkjYpri2LNDIULDBx3qDV9QYafnLiTIwQx/MVOcbuOlU72xkvbV2RkRI9u53baoLOqjJPAHOc+1aQm1oJq5kSJeI8BuLadTdKJIWkUgyqSRuUkfMMgjI7g17HeeEri6+DWk21sSt2r/bPK7Sls8H3wRiuQu7vS9e1DS7WwLq1hq0NpD5twrtPAwVFZAFBCjyQSPm5l6819DCKOOMRIoEaAKo9AOBV2bWgzxDwZYpBopmdMSlmLgjBGDjH6V1FkgdpmH3c7RXQ+JtKZNt/aQAjkTqi8nvu965+1dYYNuDtPzLgZrhqqSk0ejQs4IwltlN5MrDKLIxx2JJzStY2+8ny2+gOBWnFp13NPK8VpKVLEg7cZokt5bdik0TRn0YYr6nDVI+zil2PmMTTaqyfmzN+z26kf6OKfvjt1ztCeg71O7qqnjJqAqrZYAMT610ORzWO10F0OiwumCjqP++g3Nbankg9jXL+F3kj06RJgAjOWi/DGf8APsa6NJVILsQEHJJrwa8eWo0e3RleCZYwSB1pyptwvYdB2rGv9eEUxt7JPtE7cAL0B9//AK1RXVtfhLi6aUW0ZAfznmI2rgfLgdMHJz36d6yNlroL4mIF1oqsyhTfqSSfSujLqqszsFUckk8CvNLSG48Ua2kMbvJZ27MxncHGMDGQT14HH1rs00F0iuoUmwkkHlqTz8x+8xHvwPwqIu7bR014uEYQe63+ZsKVcK6sHUjIYHINLnaeFrnpLTVrCZfImQxu2BHGp2KWbJOOwAJ+uAKgbXJrTVbtLgy+SnKZUDAHBx/eycdM9RVnMdFK+2EEcHd1p0pCQnOAXOeaqsftDwruHllg3HfvVqUozNIc7YxhRTAw9QthcWl0zFkLr5SEcFe2R71BpARdPntEl3yFMAs2S3Uck1o3pyLaMN959x/DmuT1AyWVvNPqN7DY2kbbdsI82ZgTxx0Gcd6Ersa10N1LsaFokAu9qSkksjMPUnt1rivGfik6sLfTYAY4g4MvXkkcA59Kw9G1LVLK+udaZTLGVaONpxk5P3SB2IrHmuS95K0pLO7FmY+vc1DknoipRUNDvfB+najpt6+pQwJcQQR+VIuPndScnZ/tD079K7vU9MsvE2kqA+Vb95BPH96NuxH9RXM+B/E1rNbw6NMyR3IUtERx5vcg/wC0P1FdHeCbT0k/s+SG0jlczXUsilgox1UZxknH86cddypS5ndbnnepa1q+j6ykOp2VtLNbgAP5f+tH97PvWXrusJqd4qJbeWCcuoYd+mDit/W9MvtWmhZri7YliYop8SSOPUKqjYPxxXH3FndWeqNHeQPBIOdr8cCs/aRl8LujtoRjH4lZk0t5BsWKG2KzodrEKBuBHIOPoKpazqf2+z+yyAs4UGNwOSc9CPWi1BeeWUk9z/QfyNQIm6JpwMumZB+f+FEZtP5GlXDqSbPoOSZpPlbIB52L1NQucDYcY5Xb2/lzQMyDaoz1B53fnkc1dhsyPvglj/CP6+lLc8o53WtNu7+xV4IvNMUySNAzBRKAeUJJxjv+FUzeRjV7TUWtLuwht4pFYzKEluCcYTbnIUZzu5Gc967xLYDBbnHQDov0rzLU4rhNSuEu3Z5Vcgs3cdqunhlOd2/6R3UMZKNL2XKutnropKz8n5dvus/U9XudTbaf3duDlYl6fU+pqG1sGnDSMwit1OGlb19AP4j7CrMVmluUN1GzSuN0dqhwzD1Y/wAK+9a1pbvK6yzlWkUYREGEhHoo/r1NdU6qirROZyUdEcZ40GqWmmLDZRNb6XKNs8iH9659HI6L7D8a8+W3RB1P4V9Dy20M9s8EsayRSDaysOCK8Z8W+H38P6mI0y1rLloWPp3U+4rinJ3OrC+zn7s1qYHlrjjIP1q5pcFrc3fk3c8kYcYRlPAb3qoDjtUcayTXaRxKXduAo71CbZ2VKNJLYvapYT6XeNA0pZcbkfsw9aomecD7w/KtvWTNdPZWsaNLcRQ4kCDJB96rDw9fmIPL5cG44AkJz+gNWoyZxtYflvKxn2sd9ezGKCFpmAyfLGdv1rtbfw5AfDM1hfyFDcMGkaNgCMEEAEgjt+tZPh2zm03XrnzjiCCIiWQAhc8YGTVu+v5dUnCxq4iDARxjqx9TV7K5hTw3tanLB6Wvd7JfK7On8MfCTRIZLHV/tWo/aLa4WZFMibCUYEZGzOOPWvUGIVScM2Oyiua8JahcyW9xYXW0XFnsJKDhldcjOT97rnoPSugR2BO7b87dQacZqSujOvQdGbhLyfyaun80x7MZEBIK5HAqpbadbJJJKIlDOeeKt5U+pHrS8hx9KLdzK9g8pAnAAqpe6bDqdrJbSr82Mo/dTVwhjGdvWohKR5UhOM5UmrTad0JpSVmeWXNnLaXMkMowyMVYetMUAdBW34gnhvtVeWIFkXCkqPvY71WmsVleJrUAh+2a76eZU5yUH95xVcunCDqJ/I3oLXydIiiOQyKGJ/3uf61nXk1xcaomkQNhZYxKzHI2gHg/nW1JK08SKQEKgA45zjtV3T4YxCr7AXBZQxHI46Vy1E27jhiIL3YmYDo+iEubiKNzjczkbjxjp17VheKPF9jqWmS6fZ+YxcrmQjC4Bz9a0z4L0uWEtK0rXDtu8x5Dhie3FczqHgy9sEt0sbUzTu58+bPyYPcjrx2rlqc6Vkj2MHXwcakXO/rsjd0fXX+wx2Wi2ltGIlAaSd+WOOW2Lyefemzax4jtNVR5vOurJPmkW2hVN3sM5JFZ7+EXihR7GeSO7QDJbOHPr7Vagv8AVbCJRrNnIsR4M64OPrisVUqLoXOlQqO9KWvZ7/8ABL8fxE0aWURzrPavnB81MgH3xmuiWO2vbJnYrLFIBtdT2I6g/jXlvj7TDDLbahFHmOZMtIoO09MEn15/SnfD/WL/AO3DTfOd7Vo3YRschCBkEen/ANeuiDbWpxTST0OxtRd6dqxs5G3oq71fn0xxk/p2rbgRiQSThzkj261lXEkz3sTPgkgjOPy/nW5DGQN7YBIxj0FWR1K9wnm3oAHEcf6mvPdX0WK4vb2VJGEssu45+6Pwr0lUwHduXc5JFeSeNRqNvc3CIJVhLgl1fAIPbFTK9rJmkbLUq6rcWtpp8VhHOskitlgvJ+prEXT5r272wkHPzY6VUtbO7uGDW8EkpB52qTivSvDXhwW1mZr+BhO/Re8a/wCNRy2+EqMHUdkcx4ZgifxFbWtzAGJlBBPBQrzn9K7Ea9NrlrYwzqEE94wwON8acgkfUj8q5Dxasvh/Wre8ilKhgHikXqSK6Tw6W1+yTxDIYrc2yOfJQcO+fmb2zgVFWMnTkluzSklCqlI7fRgk1qZ8gXF4zbW7pCpIUZ+gz+NJrmkaQ1hIt5BEY1Qu7OcbF/vEjmm+H7eRXtI2GEjsolz/ALTfMf51zHjjxAqafCANyXM7yN7iPG0f99MvHtXRTpqTUUY1J+82zhLmwkN7cxaRFPPDjcE8smRF7EgZwPrg+1ZzK1varFjEsnGD2r2nSNPg0rT4tK3mM+UZ7yZfvO+Azsx7jJwKmufDei6lCkl7YQq5UugUYZV9WYcn/GsqkI81o7HVQxMo259TXnuLXTLczTyBF7MfvN7KKv2EsV1ZxXEPEcihhnr+NeYXNxcX0pmuZWkc/p7D0rqPDmrHTtGuGvFZbSD5lk7c9VFdc6ChC/U5eV2udcCVLbsBex/xrjtXvoL7UC2mRRyTxjY94wyiH/ZH8TD8hReX93rpAkElnpjdI+kk3+8f4V9utWYrdURfLiVY1GEVRgAVz3Jv2Kdnp6xhmIYu53PI5y7n1Jq8iiM4wMGpFU5zT9m8dKhspIT+HiuT+IVol14Zd9heeB1eMKMnJOCPyNdU7CKIkmuY1+8LRiJRuZmB29eB1NVGHM7B7Rw95dDy+Lw9fShTJLFGGP3RliP6V02keHE01xNHKTP/AM9COR9PStGO4hZdrxMh9RyKvxrhN2dyY6jmuyNKEOhhPE1aqtKRBDaQ2wZVjHmyctnqfU59aq3Eby3eY26YA+g/zmtG7ZRH5q7s42oOv4j9arW6C3iLzEbmOcDoff2odtzLUxNYiupfJTI8p24iU/MWJzz61veHPCq3sckkskquh2edC+0qw6qp746E/hWFbSS6l4hj0nTpzLe3DlpbgDAtIT1x/tkd+3FeyWljb6fYw2ltGEhiUKoHoKwm1Jcj2O2jWnSalB2ZU0/SbbSIEhtt/wC8bdIzuWLvgZY57nHarsCZJLDJBI5olJ+T2YUjF47htihgwzyeAazUUlZCnUlUk5Td2yVtqIGHUcf/AFqP4Ez1oEY2+Y53N6dhRn5VpkBI3loGz35rO1QhdGuDnG3dir1yCbd8dhmqN8n2nRJ1z99TjFD2BPU4hPMdmdF3BcE9qkgkP2rKqcE5cD+E1FZoWhkk+0BeoCYzmtyytjFARJhnb5mOK5qFHnlrsa47F+wppR3ZZDKQCMVo6c2Q8ff76++OorMeBYwHTp3FTxSNGVkU4YHIr02rqx8zCfLK5eKmC7A4aCTnBGRjvVs4KjY5HoOtJFKk8IkHCnrjqh71G4lGXVVOOdyjrWMrnpUeRKz6kgZDGzFoxt6nb0qs97FInklPMBBBDcKR7iobRd0Fwqj5nJbk9SetMhtmEmWZR3wvzGnGzWpFfmg0oFqC3t5dONs8MZg8sp5eMrjd0xXLaX4UtNH18ahaMyQbHQw9cEjGQfSusLiGE8FSRgL3A/8ArmqKuO5596pRTRjOvOm009TKNyIb61bIGxsnccDH+c1Nfa55e5ovndugGQuPUmk1UQNB86jzGOEb0NUJ4Ea28uLMkoGS/XAFclepKm7I9rBJV4c7VjIm8R6lDfgXWDADyqZHH1rX1q0TULWzltlM6THBzzhSM5PtXP6nGptt7MN6YX6ineHdQuHD2SlmC8oM42gnmqpz9tDXdGrpclRLozoNL0y30Zfk275T820YHtWN448SXmi6fC9iFEkkm0uwyFGPT3rS+y7rlIFuEF0/KR7/AE5qv4k8O2E+i3Ml/O0ksSl48NtVW/rVpKOiOipP2cbbHC2tzqfxAeDS3hhjFufNmu8HbDGOpI9fbvXYx32kaRoD6JpEEvllWBuJX+Z2I5bH9Kz7LUobHw1/ZtnbJAsjlpZVGC69gaq6ZG2qXZht4nJB64yK6adBWcqh5TxEpWlHc9H8L38t3aW0sgHmuxQlf4gigFsduteeeMbCU3Oh6cCd7XFxj6eYP/ia9S8P6Q+k2UcckhZ8szDHTOOAfwFcl420a71DV7S+sH23FqpCggbTySw+pBqaUoqpfoW7uGu5qXpnWbVbiMFgWityvbDTZY/981sancsgvX24YOkKe+FBH/jz/pXPXk0v2bVPLnwY9WR5QBk+UOg/E1reJZmt7Np1ZTuuEZfpmMf41hbU6IP3rmD5FrpSpLqm4zSDMVlFzJJ9fQVYEF9qN1BdXqRhIeYLJOY4vc+re/apbXShbs0wdprh+ZZ5fmdz9f6VpwExn5gdvqKc5uTuyHJslikjY4mQofRhkVK3lDAjkznsDU8bQSDqD7VIIo16BayeoFRp4Y8LI6qScAE9TUnCjIPFMvbCK6iIcYPqOtZUepP9nuVmj8kxSFBls5HrWUXKMrSKeqE1K9WGF2ZgFUEknoK5aCR7mR7l+N/3QeoXt/jVTxH/AGrqM8AVWg0vIYyA/NKw5Ax2Xv71Lb3EqEeYAfcd69DDw05jjrT6FmSJSDuQHNNtp2hcxElWI4IP3h/jVhJFlHylT/OoJo2kJHljb1zXR5GK01LFz86+eVLBQMZHGfYepzXC+KvEEtqptVyl24yY85MSn+97+35+la/ibxFfaLpaKiK0zyYimI+7wTyO5HFeWySySytLI7PI5LMxOSSe5rkqNp2OmCTVz3r4SaDDYeHxqcgDXl987MeoTsPx616MRzXlvgHXTbaFpyyk7NoXPpzivTlkDoGB681DRqQy+voRUp+99RUUxxExqVDnBoAQOfJH05pZM+SpUAkHvUTnG5enOalJzAKkRl2+ozSXDJcBI4ypAXHO70zV0xbLJY/YVlDTJpnkBIxvLZf61ImpzRSPBcxlo4jt80en+16URuOVuhRl0m0srqeaFMF13EHkKcdvSsNbi8svKIlDRf3SOcV0l5J5iySZ4bOPpXOXskf2aBpZEjXYSzOcAV1RSSseDWm5VGzZt7vzXCn7rCpQ2Bgfw1kafIDbiVCGH8JB4PFW4pjna1UZNGhZ3bRyv5Zx3wehq6dTRCSY2Geu08VjK2y6Q9mGDVtxkexqXFMtVJRVkWrTUIREB5e0kn5SM/rUzXrDOFUH/ZGKyYZGG4N1z1qbzCaSikN15sleRpG3E0hjBGc8UwH0pwclcVWxjK7ZBdWsN0ipJng54OKxEW6V5ILfZGseVLk546dK3S2XYjoMCuV8SajbaNc75hOgnJIaMZDeoPvXJiad43W57GV1nGbhJ6FfVHtYNOli3gzZHzHqTXJf2vPYmVLQObiU7E2HmtGea88RbYtPtfLtI8l5H4z7+9IXt/D3iXdFG000duPs+BnExXAJH15/Kow9N2PalLXmXTb1LWk6Vd6Jcxaxrt6lvKvzpbMcyvkY+71A571YM974i1Nd4cW275ISflHoW9/aswRLZzNPqQa7vpPmZWf7uf7x7n2p767eeU8URSJG4xGoHH1rqnWpUXaO5NHL8XjEpy2fVs6IaJYptW5l80v8wQNt/CuohlsvDiCadUit8KIIo0+djj5mx6DpXkwnnmnjXc5bICksSR9K39VtNX2xzai0wkZBsaYcN6CsVXVR3lsVi8AsLyx5tWepnUDeRB7Nh5BGfO7Y9vU+1cd4gvrx1FvGZdNsw25p5FxNcEf3Qfujjqa6HwbpV2lml9qV1JM8i/uoyAqRKeyqOldDdxWtyAlxDFIF5G8A4P8ASjn/AJTjjHqzzzw5Yzfabm+m8xFmUpsc8vnqzZ9O1afjMNc6MkNltLh1ZVBxkKQTj8BVnVri3FmLaHYSXZ3Uc5Qdvzry3xHqCfbhHHPKTblhGEbhc980Qi+o1Pkdz12JQo6jd79qmRdo3MMgmkjizyc496tqM8GoYiIQRSDIA/ClEAX3FOKKvzDIPtUFzeJDAzFsY70WHcLq5W1tnkyAB6msKy0+TWLv7TcAizByqnjzD9P7v86ns7KTWphPcbhZKcqp/wCWv/2P866RYxEAB09KVluG5S1DT4prR4pAMMMdPy/KuEWBVYjcDj3rudVu447RvMlEYPBc9q8y1y4hvZ9tpH5UCdD/ABP7muvDXd0Z1KXO9DSmiiDAqSj/AN5aj+1SxMqSxhlbgOv+FU7UfuI4btlWV0LxjdhmQcbseme/epEjcHMLHZ/tcgn2rp3OWScHZnKfEKUFLGFTwWd8fkK4cDNb/jC5EutCIPuMMYDf7xJJ/mKwQa4ajvJnRT+E9G8D30M2kG1kYB4SRjPODzmvXPD179p0xMnLJ8pPrXy6sjxOGViufQ17x8PdXjv7FJE+XeMOn91xwR/I/jSvdFnb3UgWIjvU8BzGDWRr9/Fpmnvdz5KKVQAdWZiAB+ZrVt+IB9KAGXL4GfwqZSTCPpUbx+ZxjmrDIFQDHGKQCIPl4rHQiO9vc91Df0rYTG0gGsG8fy9WC9pFwfwNVFamdV8sGxl18ts3TAFYtvpia1E9nKAUELjp0bPyn862NQO2zf6Vxt5fXttcNFbXJgVo8PtUEtu7Z7cenrXSoOT5Y7ni0HFSvI2NFthY2C24yVTK4ParzxkEGobGIx2MQPUKBirijdH9KZEpakUhIjVz1Ug1fQh0zVV1zCwx2p9k26IeuKRL2EC7ZW+v+f5VMuKTZmZ8egx+tO24GaGJBnFIrfMT6UhJFRAkxSUrlJDoz+7yf4jnpVfVLKG6tv3sSSBTnDjNTkYhU88VY2h4sEdqTLpycJcyMFtiI2xVSJUIwBgAVwiXJS8a8YBp5MspP8I6Cus16Y2dhNED80n7sfQ//WriBJulkPYHArKpUdKk7bvQ+ywVCGNrR5vhWv8AkOeRnLuxLMTyT3qLcApY9OtOTmLPua7jwB4Xh1Arf3WHKP8Au4iOMj+I/SvLj7z1PpMXXWHo8y+RpeDPB6RiDVbpCXK744mHIz0J9K7t7WK4ZBMqSAHIQrkD3q6qLFAVHbrWfc3a2mny3B6lflH4V1wpo+OnVnN3m7sz9a11NPVook3zYOP7q/X39q5EXtzes0lxO0h3cB8EdOePypdXl3iFY2Dg5bc3HzHqK5vVNXfTLRdhUyMSQFOTjpzXSoO2hzueti5qmqQWKkfZ4w5VtuXODkgZPp0/WuU0qK3n1FHuYGnVyQYwTye1U4tRea4hkvVeZEctszywODj6cV654J8MxKH1m7tEgMnzW9vj/VrjqffvQ2khbux08YwtSfd60iDiqNw0l3d/YrZ8OBmR+yD3rE0C61BI2IHzHOMDvVe00p9RkE98hSEHKW57+7f4VsWmlW0ABQb27yNyW/wq84WNcmgCFUWJeBjHSszUdShtI2eRwqoMkmpby7KjagLSN0Uda8/1G7l1O6bexMSn5V6fjWlOm5spa6Ibqepy6rIOCsCnKqT19zWTqV1aaBYDUL8LI8mRa2pODM3qfRB3PfoKv3M9tpFiL68TeGJW2tgcNcOO3so7n8OteVa/e6hqWrSXeouHlk6beFVR0VR2A9K3nLkjywHKSj7q3FbXdRfXDq8svmXJbLE8AjptA7DHGK1r7x5qFxCI7WGO1AGNwO5vwzXLg4pCvPFYKckrIxcU9wcs7tI7FmY5LE8k+9Nzg471NtxxURXnBqBg3KZ7iun8CeJE8P60j3crLZyA+YAM4PY4rlSGA9q1tJ04yFLmYHZu+RfXrz+lVBNuyFJ8quei+IvFw8U6laW9mjpplvKrhnGGmk9SPQc167ac2659K+frZwL23iQ/M0qg+3NfQNl/qFx6VrUjy2RNOTldk8YHnjNTyDK/pUKcSH6VIH3Lg/SsTQiXgmuf1b5NSt2CMxZtuFGT0roCcSfWqTwhtUgcvs2gnP4VcdzOqk4NMxdRmjMJXdg+hrjpNl3q7OjB080IpHTA4/nmu68RmQ6dcusMTvtIVlOMkjAryrw9qsk2r2FmsMccW8LxngAV2UJxTcmeS8O4q6PR04AFTAhWGeh4NRqpPFSkZ2j3rM5XuG3AZT2plgcO6+9TEbkyeq8Gqts2y72+tALW5ox/NIT68UMO1PiG1Eb3/nTX++fSglMgkHyE1DGCYnHvVmQAofpVeADa31pWNExJrhY4BHtLMw+UCm2up2zqY5ZFilXrG5wf/r1Mls1xLHGrBW5BYjOKnOhQLE/mmKSQc7iB8v0pXRpGEnqkcj4tW3uLdJoZUeRD0U54rhtwxn/ZrfudQ/ta8lt4YnjhiLJvYY3nOMj2xmsO8tWs7t4AcgYK57qeRXNjF7qPsOG5+zc4S3f6DAdkAz9a9w8DaY+k+GLNZxiWcGVh/dDcgVz2geCVvbFLe4k0+906QLPBd2z/AL2J+MoR0KkD8K9BudsUbISF24x7CuelTs7s3zTHKvanDZEF1MxikVCAADk9zXO+IbhobKKNPvSERqD+p/kK27qeM27LFjkbSa4vXbtp7t2TlIxsQj1Ocn9MV1wV2eLN2RUDxnzipBitozgt3kbgn/PpXFXb219MfJDXFyxKBBj5R0AXPU/nWnqt+bO0mgQOXkK7dp6nkf1rsPh/4LXSLX+1L0K9/IMouciIf/Fe9aTfL8zOK5tC54P8HafpECy3lojX0kYEjOdwXP8ACKZ438Tw+GdMkWHb57jZFH6n1+g61s63qkGl2xup32RKBIzew/yK+efFHiCfxHrU99NlEJxHHn7i9hWcI9WbO0UfQU96yyLBbp5kz8Kuf1PoKv2tt9nhELENhizsON7HqT7VDpummFA8nEz8u3c+3sK0XjVAX/OsJtpaAvMnRl256VlXt2zOIowXdjgKO9UbjxBEguBnCJwG9af4Wu4tRFxKRidWxz/dPTFXCDceYb8jTsbERZeQhpmHzN6ew9q4nxZb6f4Zlk1G8bNtIcw20Z/eTSH+Aeg9T2Fdh4j17TvC2ly6pqEm0AbEjU/NK3ZVHr/Kvn7U9dvvEmsvqupthiNsMI+7An90e/qa1pczl7pDnyK42/vr7Vr9767Kecw2oin5YUHRFHp/OsjU4Xa2aRxkoc9O1a0RV2wBgevarH2VJVaNgMHgiut0/dsjk53zXZw4pe1S3EJtrqWA9Y2IqJjzXn7HXe4/qAaa4zQGx9KY784FAFzTbRLm43TECGPlgf4j6VuPdDhUUBeg28BRVDTQ0doD5ZJY5z0q/CjXD7UTc/t0/OuylBRjc55ybZd0OFptdtFAyBMpYn619AWYxCv0ryLw7p6281u8mAd4wT3NevWf+pX6VlVldmtNWWpJ0lFMd9j4PQmnn7+aSaLzAMdayNAYhmUim4P2hiuzhDw3egKyoueorN1q3uJYRLb3clvIgOdgBDD3Bpoiom42RLeQB440MW3cxJIPBAB/xrxbTIPsPjmGDpsuigH5169plpPGgkmvprnK4USADbnrjFeWawptvicgAwDdxt+eK0g9TCcOWnY9KAwadtDcevGaUAZOOlJjHIrY8Mch3qf7y8MKz3Pl3IYdjV4nZKJOx+VqpXQ2zkUMcNzbUAwcf3VIqEnIzRDKDAnP8AzTAdy/pSRI4j5D9Kqx5wMetW+qmoIfuCmUmPhAa5C7gpYcZ6HkcVPr88sVn5EUaL5pAdgckLkA/wA8fjVSSw+3zRKJXhkTLJKnVT/I/Q0ktvcrplxJdTrPIcbXWPZhQw7etYzep6mEheKkcNbw4vLsgDarEAfjiqXiOAw3sM2PldNv4j/6xrWtQPOmXuZzn86zfFN15t5Fbr0jXJH+0azxTTTue7k94YhNed/QqeFPE0XhrVtv2VDFczIJZQxBjUEg4A+ufwr3BbjzndWfLoNwb+8K+bHijXVYIlcyZkUOe2c9K+mDpey0VY18uQHhuuBjpUpJJI56uIVerKa2Zk69MLLSbm55UKmVJ6k//rrkAcIG5YY2keueTXR+LEf+wWSXorKGHfG4f0rnbYZCq+QE5PuPWtI3M58vKu5xXjKBoJbcrICjKXU56jPFe56ReJq/hjSb+DH7+Fd2Oxxhh+BBrxzxlZlrmyd8ASJI+09AAQM11vwf1oSabfaO7MVt5BPBu67W4Yfnz+NVU11Ihoyt8Y71tPsNNhixukc5z6D/AOvXjc+L10lACuzbXA9fWvR/jbdCXxDp9uGz5duWI9CW/wDrV5pZn/S0XoC3NFtipy6H1ejq8eVP59qztX1KO1sZCzgYU8mor27TS4ZJXk2qeSSa4S8v5dUuC7krEDlU/qainSdR+RaV9iN3ku5jI/Ck5C/1rTsNTj8PRy63dzeTZQDbJnrKT0RR3Y/p1qmi21vaTX19MLexthmWXv7Ko7sewry/xT4nufEt8pKfZ7CDK2tqDwg/vH1Y9zXRUkqceSJTairFjxD4wuPFWtvqOpo3lJkWtsrfLCv9Se5qlba3bJKFntCIz1ZHOR+B4NY2P/rilC9j+Fc8ZuOiMHFPc6yaW0Kq9s/mBuhX/DtU9vKHUcneB+YrlbW6ns2YxOAr/eX1q/DqqRS7mjI28rg53e1dMaqMHT7EPiOIC+WVesiDP1FZXUA960J0e9gn1CSQLsYKkfr/APqrMc7V5PeuWo7ybRvBWjYRiQOKtabbCa7AcZUc49TVLkjJrS0+9awVyiBpHGCxPQelKEuWSdrjkrqxc1CS4+6sTpEOC20jNdN4K02S5s7iWQEW+9Ru7nHYfjijQdct9Qb7NcQkTbSI4xysmeMfWt3UpY9I0e30q0ARipzt/hB+834nIH401Oc5hGmrWI7S8F54ps44sC3hchcdGODk/TsK9cs+YUPtXkOgRi31K2XYPMkG5v8ApmmDtH1PX6D3r1zTjm3UGqnbZFyViwxwQcZp0bEuBTJOGFPi+8TUCHTLg8etVbqPdA2e4q9MuV/DNQTAGAntTTAzNPObYZ6jivJvGy/Z/iBby9MmJ/yb/wCtXrFiNrSJ6NXmfxJtyniXTpsffXb+Tf8A16qO5lU+E75V/Kmn5SaeOvFNaug+eEbBUg9CMGqNySzJu+8PlJ9auNycAfWql195MetDHHcR7sQwhW4BUj8eoq1aSmTcO2ciqFzbrKFD8xn9MVcso/LYj2FCCW5fAzGcelQxDCn2qeH5oqaExkeppi2JbMYuRk/wN/Si/wCNJkGDkIDz9RSQkpK7ekbf0qzqMJFjKuTkRdCO1YT+I9rBfwTz7To915dP/D57Y/M1yfiW5MWqXBBywfA/AV1lreQWOl3l05ysUshbJ6nPT9RXmd9eSX15LcyHmRi2PTNRVXNud9HEfV4ytu1YgLkNvz8wOQfevfvCPxFi8WTw6cLdoL1IC8m45VtuM7e+e9fPhbJzXpXwetYf7R1LU5eDbxqit6ZyWP5LUnJTbT0O28dX4UrYxsSGwzk/oP1/SsnT4/OkjtXIHljeXJxlR/D/AJ71V1mdry/a6djukkDqDz8vYfhxV2GHy4xbnh+HkbuD2X+tdMVaITd5HP8Aji5C6jp9y64jeOSPZ/cGMAfhVz4Wwi1uL2ZTnITZkgkg7s9Pw/Ks34jyCa3sJiMShmV/c4HNHw5u3jGrsTtkW0Mqv0J255/DNZvY06o5v4i3/wBv8a3rB96w7YQfdRz+ua5m1IW43kEgZ6U2R2kkaRiSzEsSeSas6aIjMNwJlDqyDswB5FX1FN3uz17WtW/te7GwFbaP7gJ+8fU1FBFCsE11dSrbWVuu+eZuij0HqT2FV7OBXWSWeVYLSBd887/dRfX6+grz/wAW+LG8QTLaWavDpFu37mI9ZD/z0f1J9O1aVJqnHlidLaitBPFPimXxHdJHCht9LtyRbW2f/H39WP6dKwKavFPribuZbhgZ4FB5paQUCJLq2eHy5ADslGVP9KsW9tDFHL9tWTzgAIkVh+JP+FSR3P2qOG05HlfMPc1ajtY7dTNcYAHqc12UsN7T3lsc9StyaPcggs90ZL5WHrjNZFzHCJSIWLKDwTVy+1B7nKRnbEO3rVDJA9zUYidP4ILbqVShO/NJ/IaqZYDrU6jB5pI0PXqTVu2tZbq5jt4VLyyMFVR3JrlNzofBtoiXU2q3APk2i8e7ngAe9bcQa6uZr+7XcqkEoDjcx4WMfy+mTSC1EEdvpNmPMSJsMV/5azHgn6DoKdDfWE2pixiuYytoxULn/WS4+Zx6gfdH4nvW6XJG/Vm9KF5JGrpNs4vYpJWDTPLvkYdCcdvYdB7CvT9P5txXnmmALeRr6OR+ma9DsOIFPtUMvFRUZpImk++fapY/uZqFjljU8f3OTUnKWeGRfpVOcYUr71PBJwAe1Q3QywxQMzLX/j6kHrzXn/xUTbPpkw/hZhn8j/SvQLb/AI/G+lcL8WE/4l9nIO0pH5g/4VcdyJ7HUo4IU9iM0rtiqlkwk0+0kyfmhQ59eBV3YMA9a6D5yWjIhkniqtyDuT/eq4x7VUueWT/eFMIvUlVN0QyOlSKNsx+lLEvyYxRgiYD2oD7RZgOFIqYAHvUCjBB9KcWK89qAepHeuYbO6lXho4WI+tcMPHmuRQSJM9vcBxjc8WCPyIFWfHPiC5sb6x0+GfyobpGM+FBLAEADPYda426cJsQjmRwo/GnGCd2z1cPJxpRijOutTuGtJ7V2JWabzn+tZLHIxzVzUflu5FxjDH+dUScjrXLU+I7KvxjWPOBXp3w6k8rwzewrtzdXQB9QqqCf5gfia8vHLk16l4RgbTtBQyoGMvzkZwV9xUJXIi7NGxGIpNQy4BVWYj2PQfritEwPAzRycyZ+Y/3vesrRiZ7pmbBKBV/3s9z+Ga6G5h88LaltrAFllP8ACo6g/wBP/rVr15CltzHAeOlM2nWkv/TYovuMcn8+K42+1GYWFvaISnk7lZlOC2T/ACrtPFM32i2eXy1KwkBI2HAArg9WvVu512xrGqjJC+p61oxIzjWz4NsTqfi/TbXGVeYFv90cn9AaxCeDW54R1C50jVzqNrs8yNdgLruHzcH9Kym7K4SaS1JPF3i3+2mXTdO3RaRC2VB4a4b++/8AQdq5hajBqQcVk3fc2JV6c06mA8UpagQ4GgHpTcjNJv8ATrQA+KQR3SOSQA2TjrV+fVlmyPIDD0c8Y+lZTcsDRnbz2rRVZRg4LZkunFyUnuaKT6YYXM1k/nfw+XJhfxqki7zuC8dqaqb+W+76etWUXIGKyLECbeorsPDunnT7L+0XGLq5UpbZ6onRn/HoPxrN8O6MupXbSXGVsLYeZOw7jso9yeK7CILd3Etzc4it4k3yFRxFEo4UfhgD3rWnG7u9kVFDLa38uOG2inWDUNRV4rQnqgAO5/8A2Ue5PpXl0sM9ldyQygxzwuVYdwwODWtd69e6l4qi1KBGWRJUFtAvOxVPyKP89Sa6H4oaO9pr8OpiHyo9QiDsv92QAbgf0qZy5ncTd3ck8JeK1a5t7XUGPn+YFSX+9njB969x0/m2Q+qivlSCQwzxyjqjhgfoc19S6NN5+k28w6PGG/MUJ6FTqOdr9Cyx/eYqcH93/Kq5+/U8eCuKCBiPiU4p83zAEVERibjv0p0mRF9KAM+15vXrjviom7Q4n/uzKf5iuwtP+P6SuV+KQDeHtucHzF/nTW5MthfD9wbnwzp0o/54Kp57jj+lbEMmY/euS8BXPmeGfJJ+aCVl/A/MP510sL43j0NdKPBqxtJolc/P7VDcfNt+tLJJjHoaYzgyKtMyS1L0AO2lYZuAP9mi1kimjJib7p2kHsaMZuD/ALtAvtEhyp6cU5myMVEXKkg9KlRkcdeaBnkPxUnZPENkFyTHbZOPQsf8KxZdQjvILKeNh5qygMufbrWn8RJPM8ZzL1EVvGn55P8AWuTtW8m8RSqhVOVx3FTCVpPse1Sj+7j6GjrLodRbYcn+Ids1nOdq49addzf6VvPVuTVeSUHnrWE17zsaWbdzT0SxbUdWtrVQCXf/AOvXqdzGYoGiCspVcbSOa5H4bWf2m9uruRAVhQICfU13mpOQsSFyfm3An7y496INJ2Go6NlbRXWN5TjJjbccdSMY/nWrq0/kWbQZBlfDSkHp6KPpWBpN21rdPdcGWIllBH3mP+TU1xKssgw37tjvkP8AcPoa15bvmQlKysZWrbE055bhN5AHy9PMXPJrzK4dZLiVkG1GYkD0HYV6J4pvCmlXJBCltqge3YD+debZ5NJu5aVo2sNY8Vv6DGDAsYPz3EgUDv1xXPt8xAHUmvVdA8D3lle2U1y1uqQFXIViWOOcdPWsKuqsZVouSUUf/9k=",
"path": "images/3pts_ADE_train_00005801.jpg"
} |
depth_point_135 | images/5pts_ADE_train_00019079.jpg | ADE_train_00019079.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 205 y = 183),Point B is located at (x = 147 y = 143),Point C is located at (x = 47 y = 146),Point D is located at (x = 288 y = 169),Point E is located at (x = 221 y = 97).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_5><DEPTH_70><DEPTH_49><DEPTH_70><DEPTH_31><DEPTH_3><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_70><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_31><DEPTH_3><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_30><DEPTH_3><DEPTH_70><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_3><DEPTH_40><DEPTH_38><DEPTH_31><DEPTH_60><DEPTH_10><DEPTH_22><DEPTH_40><DEPTH_35><DEPTH_59><DEPTH_72><DEPTH_25><DEPTH_74><DEPTH_83><DEPTH_38><DEPTH_14><DEPTH_66><DEPTH_44><DEPTH_41><DEPTH_2><DEPTH_9><DEPTH_58><DEPTH_77><DEPTH_83><DEPTH_98><DEPTH_58><DEPTH_57><DEPTH_76><DEPTH_19><DEPTH_41><DEPTH_42><DEPTH_41><DEPTH_82><DEPTH_94><DEPTH_19><DEPTH_9><DEPTH_72><DEPTH_31><DEPTH_72><DEPTH_72><DEPTH_98><DEPTH_16><DEPTH_77><DEPTH_19><DEPTH_1><DEPTH_41><DEPTH_82><DEPTH_36><DEPTH_64><DEPTH_36><DEPTH_119><DEPTH_55><DEPTH_14><DEPTH_74><DEPTH_82><DEPTH_74><DEPTH_44><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_121><DEPTH_78><DEPTH_76><DEPTH_36><DEPTH_15><DEPTH_74><DEPTH_64><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 5 | [
"E",
"B",
"C",
"D",
"A"
] | <DEPTH_START><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_5><DEPTH_70><DEPTH_49><DEPTH_70><DEPTH_31><DEPTH_3><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_70><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_31><DEPTH_3><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_30><DEPTH_3><DEPTH_70><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_3><DEPTH_40><DEPTH_38><DEPTH_31><DEPTH_60><DEPTH_10><DEPTH_22><DEPTH_40><DEPTH_35><DEPTH_59><DEPTH_72><DEPTH_25><DEPTH_74><DEPTH_83><DEPTH_38><DEPTH_14><DEPTH_66><DEPTH_44><DEPTH_41><DEPTH_2><DEPTH_9><DEPTH_58><DEPTH_77><DEPTH_83><DEPTH_98><DEPTH_58><DEPTH_57><DEPTH_76><DEPTH_19><DEPTH_41><DEPTH_42><DEPTH_41><DEPTH_82><DEPTH_94><DEPTH_19><DEPTH_9><DEPTH_72><DEPTH_31><DEPTH_72><DEPTH_72><DEPTH_98><DEPTH_16><DEPTH_77><DEPTH_19><DEPTH_1><DEPTH_41><DEPTH_82><DEPTH_36><DEPTH_64><DEPTH_36><DEPTH_119><DEPTH_55><DEPTH_14><DEPTH_74><DEPTH_82><DEPTH_74><DEPTH_44><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_121><DEPTH_78><DEPTH_76><DEPTH_36><DEPTH_15><DEPTH_74><DEPTH_64><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_END> | 205 | 183 | 147 | 143 | 47 | 146 | 288 | 169 | 221 | 97 | 120 | 34 | 64 | 95 | 4 | {
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",
"path": "images/5pts_ADE_train_00019079.jpg"
} |
depth_point_136 | images/4pts_ADE_train_00019501.jpg | ADE_train_00019501.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 304 y = 184),Point B is located at (x = 294 y = 202),Point C is located at (x = 245 y = 175),Point D is located at (x = 143 y = 133).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_2><DEPTH_2><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_33><DEPTH_2><DEPTH_58><DEPTH_9><DEPTH_94><DEPTH_2><DEPTH_25><DEPTH_15><DEPTH_76><DEPTH_76><DEPTH_76><DEPTH_69><DEPTH_76><DEPTH_78><DEPTH_2><DEPTH_17><DEPTH_82><DEPTH_82><DEPTH_3><DEPTH_35><DEPTH_7><DEPTH_7><DEPTH_85><DEPTH_73><DEPTH_32><DEPTH_20><DEPTH_84><DEPTH_83><DEPTH_26><DEPTH_67><DEPTH_51><DEPTH_75><DEPTH_43><DEPTH_78><DEPTH_82><DEPTH_3><DEPTH_81><DEPTH_49><DEPTH_43><DEPTH_2><DEPTH_77><DEPTH_63><DEPTH_74><DEPTH_44><DEPTH_25><DEPTH_49><DEPTH_78><DEPTH_11><DEPTH_15><DEPTH_40><DEPTH_64><DEPTH_49><DEPTH_38><DEPTH_63><DEPTH_45><DEPTH_64><DEPTH_58><DEPTH_11><DEPTH_31><DEPTH_38><DEPTH_38><DEPTH_58><DEPTH_83><DEPTH_36><DEPTH_45><DEPTH_58><DEPTH_19><DEPTH_49><DEPTH_60><DEPTH_1><DEPTH_38><DEPTH_40><DEPTH_83><DEPTH_15><DEPTH_61><DEPTH_29><DEPTH_72><DEPTH_3><DEPTH_39><DEPTH_57><DEPTH_1><DEPTH_58><DEPTH_83><DEPTH_44><DEPTH_29><DEPTH_36><DEPTH_74><DEPTH_36><DEPTH_38><DEPTH_58><DEPTH_45><DEPTH_77><DEPTH_29><DEPTH_80><DEPTH_1><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 4 | [
"D",
"C",
"B",
"A"
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"path": "images/4pts_ADE_train_00019501.jpg"
} |
depth_point_137 | images/5pts_ADE_train_00018052.jpg | ADE_train_00018052.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 222 y = 147),Point B is located at (x = 107 y = 111),Point C is located at (x = 210 y = 173),Point D is located at (x = 284 y = 130),Point E is located at (x = 153 y = 177).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_64><DEPTH_63><DEPTH_67><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_1><DEPTH_19><DEPTH_74><DEPTH_72><DEPTH_66><DEPTH_31><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_17><DEPTH_45><DEPTH_19><DEPTH_74><DEPTH_74><DEPTH_31><DEPTH_58><DEPTH_49><DEPTH_67><DEPTH_5><DEPTH_17><DEPTH_2><DEPTH_25><DEPTH_36><DEPTH_29><DEPTH_29><DEPTH_74><DEPTH_74><DEPTH_7><DEPTH_39><DEPTH_62><DEPTH_63><DEPTH_45><DEPTH_36><DEPTH_29><DEPTH_44><DEPTH_2><DEPTH_64><DEPTH_35><DEPTH_9><DEPTH_84><DEPTH_68><DEPTH_2><DEPTH_36><DEPTH_29><DEPTH_49><DEPTH_77><DEPTH_60><DEPTH_59><DEPTH_6><DEPTH_60><DEPTH_45><DEPTH_45><DEPTH_29><DEPTH_74><DEPTH_3><DEPTH_29><DEPTH_74><DEPTH_60><DEPTH_11><DEPTH_70><DEPTH_63><DEPTH_66><DEPTH_74><DEPTH_36><DEPTH_74><DEPTH_36><DEPTH_15><DEPTH_36><DEPTH_63><DEPTH_76><DEPTH_15><DEPTH_81><DEPTH_19><DEPTH_19><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_25><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_78><DEPTH_16><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 5 | [
"C",
"E",
"B",
"D",
"A"
] | <DEPTH_START><DEPTH_64><DEPTH_63><DEPTH_67><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_1><DEPTH_19><DEPTH_74><DEPTH_72><DEPTH_66><DEPTH_31><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_17><DEPTH_45><DEPTH_19><DEPTH_74><DEPTH_74><DEPTH_31><DEPTH_58><DEPTH_49><DEPTH_67><DEPTH_5><DEPTH_17><DEPTH_2><DEPTH_25><DEPTH_36><DEPTH_29><DEPTH_29><DEPTH_74><DEPTH_74><DEPTH_7><DEPTH_39><DEPTH_62><DEPTH_63><DEPTH_45><DEPTH_36><DEPTH_29><DEPTH_44><DEPTH_2><DEPTH_64><DEPTH_35><DEPTH_9><DEPTH_84><DEPTH_68><DEPTH_2><DEPTH_36><DEPTH_29><DEPTH_49><DEPTH_77><DEPTH_60><DEPTH_59><DEPTH_6><DEPTH_60><DEPTH_45><DEPTH_45><DEPTH_29><DEPTH_74><DEPTH_3><DEPTH_29><DEPTH_74><DEPTH_60><DEPTH_11><DEPTH_70><DEPTH_63><DEPTH_66><DEPTH_74><DEPTH_36><DEPTH_74><DEPTH_36><DEPTH_15><DEPTH_36><DEPTH_63><DEPTH_76><DEPTH_15><DEPTH_81><DEPTH_19><DEPTH_19><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_25><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_78><DEPTH_16><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_END> | 222 | 147 | 107 | 111 | 210 | 173 | 284 | 130 | 153 | 177 | 119 | 54 | 8 | 89 | 32 | {
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",
"path": "images/5pts_ADE_train_00018052.jpg"
} |
depth_point_138 | images/4pts_ADE_train_00005152.jpg | ADE_train_00005152.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 144 y = 198),Point B is located at (x = 109 y = 205),Point C is located at (x = 306 y = 119),Point D is located at (x = 216 y = 184).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_58><DEPTH_1><DEPTH_33><DEPTH_58><DEPTH_66><DEPTH_72><DEPTH_25><DEPTH_23><DEPTH_32><DEPTH_58><DEPTH_82><DEPTH_85><DEPTH_33><DEPTH_77><DEPTH_69><DEPTH_40><DEPTH_64><DEPTH_81><DEPTH_84><DEPTH_15><DEPTH_82><DEPTH_31><DEPTH_70><DEPTH_35><DEPTH_81><DEPTH_3><DEPTH_31><DEPTH_35><DEPTH_84><DEPTH_3><DEPTH_62><DEPTH_20><DEPTH_83><DEPTH_7><DEPTH_50><DEPTH_67><DEPTH_74><DEPTH_75><DEPTH_50><DEPTH_22><DEPTH_73><DEPTH_17><DEPTH_24><DEPTH_84><DEPTH_43><DEPTH_38><DEPTH_66><DEPTH_51><DEPTH_62><DEPTH_26><DEPTH_40><DEPTH_13><DEPTH_14><DEPTH_65><DEPTH_81><DEPTH_85><DEPTH_58><DEPTH_73><DEPTH_2><DEPTH_18><DEPTH_9><DEPTH_81><DEPTH_77><DEPTH_18><DEPTH_16><DEPTH_98><DEPTH_33><DEPTH_60><DEPTH_0><DEPTH_68><DEPTH_14><DEPTH_71><DEPTH_31><DEPTH_65><DEPTH_65><DEPTH_119><DEPTH_48><DEPTH_29><DEPTH_27><DEPTH_55><DEPTH_72><DEPTH_77><DEPTH_8><DEPTH_32><DEPTH_50><DEPTH_12><DEPTH_121><DEPTH_17><DEPTH_68><DEPTH_66><DEPTH_27><DEPTH_39><DEPTH_32><DEPTH_85><DEPTH_66><DEPTH_77><DEPTH_14><DEPTH_66><DEPTH_52><DEPTH_80><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 4 | [
"C",
"D",
"A",
"B"
] | <DEPTH_START><DEPTH_58><DEPTH_1><DEPTH_33><DEPTH_58><DEPTH_66><DEPTH_72><DEPTH_25><DEPTH_23><DEPTH_32><DEPTH_58><DEPTH_82><DEPTH_85><DEPTH_33><DEPTH_77><DEPTH_69><DEPTH_40><DEPTH_64><DEPTH_81><DEPTH_84><DEPTH_15><DEPTH_82><DEPTH_31><DEPTH_70><DEPTH_35><DEPTH_81><DEPTH_3><DEPTH_31><DEPTH_35><DEPTH_84><DEPTH_3><DEPTH_62><DEPTH_20><DEPTH_83><DEPTH_7><DEPTH_50><DEPTH_67><DEPTH_74><DEPTH_75><DEPTH_50><DEPTH_22><DEPTH_73><DEPTH_17><DEPTH_24><DEPTH_84><DEPTH_43><DEPTH_38><DEPTH_66><DEPTH_51><DEPTH_62><DEPTH_26><DEPTH_40><DEPTH_13><DEPTH_14><DEPTH_65><DEPTH_81><DEPTH_85><DEPTH_58><DEPTH_73><DEPTH_2><DEPTH_18><DEPTH_9><DEPTH_81><DEPTH_77><DEPTH_18><DEPTH_16><DEPTH_98><DEPTH_33><DEPTH_60><DEPTH_0><DEPTH_68><DEPTH_14><DEPTH_71><DEPTH_31><DEPTH_65><DEPTH_65><DEPTH_119><DEPTH_48><DEPTH_29><DEPTH_27><DEPTH_55><DEPTH_72><DEPTH_77><DEPTH_8><DEPTH_32><DEPTH_50><DEPTH_12><DEPTH_121><DEPTH_17><DEPTH_68><DEPTH_66><DEPTH_27><DEPTH_39><DEPTH_32><DEPTH_85><DEPTH_66><DEPTH_77><DEPTH_14><DEPTH_66><DEPTH_52><DEPTH_80><DEPTH_END> | 144 | 198 | 109 | 205 | 306 | 119 | 216 | 184 | null | null | 183 | 212 | 20 | 100 | null | {
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",
"path": "images/4pts_ADE_train_00005152.jpg"
} |
depth_point_139 | images/3pts_ADE_train_00007464.jpg | ADE_train_00007464.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 124 y = 180),Point B is located at (x = 239 y = 182),Point C is located at (x = 191 y = 151).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_3><DEPTH_69><DEPTH_49><DEPTH_3><DEPTH_31><DEPTH_67><DEPTH_17><DEPTH_40><DEPTH_5><DEPTH_3><DEPTH_3><DEPTH_29><DEPTH_31><DEPTH_59><DEPTH_67><DEPTH_5><DEPTH_35><DEPTH_65><DEPTH_43><DEPTH_67><DEPTH_49><DEPTH_31><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_49><DEPTH_7><DEPTH_8><DEPTH_6><DEPTH_60><DEPTH_3><DEPTH_31><DEPTH_49><DEPTH_29><DEPTH_74><DEPTH_40><DEPTH_11><DEPTH_33><DEPTH_43><DEPTH_60><DEPTH_29><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_64><DEPTH_35><DEPTH_98><DEPTH_65><DEPTH_21><DEPTH_68><DEPTH_36><DEPTH_44><DEPTH_44><DEPTH_64><DEPTH_44><DEPTH_73><DEPTH_27><DEPTH_119><DEPTH_45><DEPTH_25><DEPTH_44><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_19><DEPTH_77><DEPTH_39><DEPTH_42><DEPTH_65><DEPTH_119><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_19><DEPTH_2><DEPTH_82><DEPTH_39><DEPTH_121><DEPTH_1><DEPTH_119><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_78><DEPTH_1><DEPTH_16><DEPTH_57><DEPTH_42><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_2><DEPTH_41><DEPTH_41><DEPTH_2><DEPTH_1><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 3 | [
"C",
"A",
"B"
] | <DEPTH_START><DEPTH_3><DEPTH_69><DEPTH_49><DEPTH_3><DEPTH_31><DEPTH_67><DEPTH_17><DEPTH_40><DEPTH_5><DEPTH_3><DEPTH_3><DEPTH_29><DEPTH_31><DEPTH_59><DEPTH_67><DEPTH_5><DEPTH_35><DEPTH_65><DEPTH_43><DEPTH_67><DEPTH_49><DEPTH_31><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_49><DEPTH_7><DEPTH_8><DEPTH_6><DEPTH_60><DEPTH_3><DEPTH_31><DEPTH_49><DEPTH_29><DEPTH_74><DEPTH_40><DEPTH_11><DEPTH_33><DEPTH_43><DEPTH_60><DEPTH_29><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_64><DEPTH_35><DEPTH_98><DEPTH_65><DEPTH_21><DEPTH_68><DEPTH_36><DEPTH_44><DEPTH_44><DEPTH_64><DEPTH_44><DEPTH_73><DEPTH_27><DEPTH_119><DEPTH_45><DEPTH_25><DEPTH_44><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_19><DEPTH_77><DEPTH_39><DEPTH_42><DEPTH_65><DEPTH_119><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_19><DEPTH_2><DEPTH_82><DEPTH_39><DEPTH_121><DEPTH_1><DEPTH_119><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_78><DEPTH_1><DEPTH_16><DEPTH_57><DEPTH_42><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_2><DEPTH_41><DEPTH_41><DEPTH_2><DEPTH_1><DEPTH_END> | 124 | 180 | 239 | 182 | 191 | 151 | null | null | null | null | 81 | 224 | 59 | null | null | {
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T1KRTgpED2Ubajz2Cu3fjinA5I3IAM+uTmiy7D33ZC0txLgy3TlunFKfmj+Xfx04xUzDIIRMc9h3psdnKzbnJUHr61SV9iG0imjkI2M4JPJNVAV3kZyfQc1tx6YFVgwJycjI7VZh04ov7uNIwPTANWomMnc54W9zMf3VvIeerDaP1p40e8bl9qj/Z5rpVs3GCec/nVhbd2PPH1FWook5X7HJp4FxHIySqcBj2qVNc1gEBZ2bPQFAa6O403ehSRVZT6iqR0y327PIGM54J60WDQybrxJqc9lLazOhjkGG+TBrGTkDoeO4rqH0S3PWFh7bjUH9iWy8BZR9GpNMpWRgbc+g9qltFxc7QMb0IrZfRIAMieUe2Af6VD/Zv2Se3m83cplCEFMdeKSTG2rFVIt81h7zKprZ1fTBDCkwxkHBx7iqE8ZhktX7LdgfrWtqtxJO4tyoAA3nn8qonqcxIMW10/wDelWMfgMmqWP8AaH5GtDypJrSERIWLM8rY7ZOB/I1Ue2nUnML/AJUho3vC1xdF5bWFvlVPMA98gf1rs7JJ/M33DksvRe1Z3hC202wsIr17W6e4lXDMSMAZ6AfUVq61rNnbWr3UVvNkDBGMe1K+oW0PJ5zuuZW9XJ/WmUp+Yk56mjHvTGNPSkPWnEUnc0AJSU/ikIHrQBOxEcXzrkkDJHFRgY+dxkE5ArcXS7MZaWaeRl4+QBVz+tLDFaIOLNWOM5kcn/AVFxKmzMly06twVPr7U+GxuZ2kaK2kZSeAVNbkMsyPiCFFGD8scYFSrZXsku91YKCfvtgc1F0i1RMD+xrvo/kxL1O5gcflU39gxoAZLrcB1CJ/jW+LC3VXa4vFUEn5UXcfz6UrXOiwL/HO2e7jH5ClzvoWqcVuLZ2yukVnaqUQjnJztI/iP5GodUuFnkS0tcLawZwOPmOeTUja9G8UkVpbiDzF2mQJg4+pNZo8uNSI43kYjrmkk73ZbegkreXLGS67c8Y6VMXjuJ9quRx0AqrN5i7dyKORgGp1RnKqsiI2PmC4/pVWJb1sLIhA/dBE/vE9aDIABuYsM4wopMsBhVBYkg5pw4YMZRs6YUUFehIwV4gfKAOON56Uzzivyu43A5IQdvSpkgdwNiMFPIZjgVNHp6kZkkHuIx1pqLYpSSKJZCpY52k9WOKcsMkxAgQAdzjt9TWstpCrEiLI65ZcipGQE/KCPYVah3M3U7GfHpcqrulnC57A5qVbONM4GST1arQjZzzkn3q2lpIUDeTIR6heD+NWoozc2zNEGcZ6iphBgD73NaAhePojLnvinoCoAYAn3XFMkz0hAPANSiIHPBzWl5kQQK1uoJ75601khK/IrhvcjH8qYDLO3iaQb5TER0YdKmu2aNwqyiROoZXP8qjQMo27uvvUwlUKFMcOexI5oAjEFvLyZSAewXPNMkto42ARmkPp5dS4jGeIwfoaniZV5cqwxxh8H9aBGa1s5IcjaewxiklilYZMceO5BANak0xkXYBKwPqwquLMnc8oCKD0bP8APFAGYyxHBIcfjmqurWinSJp1LsY8SDpgbSDW+vkKdjRu6+oOQP0qS80eC6tJFjmwJEYbSfUUAcZqsSixilA5+2pz9RUuqYS4vJP+ecAP6GqtxN52iW/Ut5sBOPUHaata4x/09HUo0jxxYYYPXBpDKWmWuYSWQkKFjHJHQZP6k1PJbIucM2fQgkVo6bCw0+NgOJMyfmc/4VejbAwcqP8AaXcKYG7otjImjWyuMnbnn3JNZPjK0l/sSVEQgnBH5ioncqMxTsp7gEgVVuHnuEEc8juoOQCanlKUjhjp9zjIXI91qNradDhov6V2Jg2ngDmhYGJyVzTsK5xRidesR/A0wrjrG4ruzbQN99cD/cBqJtNsT0dDn1QiiwXOI+X/AGh9RSfL2euxn0i1UEhI3GP4X/pVFtJtD0V1P1pWC5eYaZCzGW4kc5zgYApn9sWcIxbWobHfbms5LFQjbyM57cmlwsDGJI2bjNYWTOi7L02tXrqGij2Dt2/QVWNzf3APbjqBkn8TTyJiq4AQY57U9YyQA7k4/GiyRVrlUWxLf6TIT/vNk1Mq28eY0iaRjjGOKlK+buZYdzr90mlxMkTCWVVZgAFU8j8qBWY11dJVHlJHGD/F1P50pnVSxZiVPAAHFQqkrssaQM4DfePStiLSSybpJUUD+7jj86fLcXMkYUuwvtdTtJ7mpjGFlAgGSRk4OTXQR2VnFAyLBvLdWfkn86ckDxxbRGsaf7K4q1BkOojKttNLKJZCcd8VZht0XiNBn1NW/IO3kEj3pyw7evX2q+VGbk2QNE5O5sfgeakjjxjA/MVMI1yAS35Vqw6ZZyxhjPtP93cKZJmQ585T+hPFbc9osyA74ox/eIPFXotLskiUqmWA67s5/WluIrgW7ZO1OpKpmmBmx6danAEySsRyVyKugyWMQjhCuvX5qyy0kYz9pIT/AD6UFpJipE+5gOMk5oA0jqW0NHJCA3cA8VB5jSqrGRdpP3dtZrzMWwzAkeop0dxdRjCSEL6A0AaExtmTGwo3qU/wrPmZE+5IG9sU43c3G8I/pkVNCLNvmkiGfQHAoApxMXbrx/dFO2+U3Cnn61cFyFkIWJCOxVMVaIjmgwYoVzxnfzQBTt4RKNwhJx2DAVPJYGSMlLZkcer5qBEjguNkxjIXqDz/ACq68tk0TGEPE3Zl3EUCMl0lRirBlIpRBMCCroR6Bh/KtRdLluVWV59y+pznFJJouAzCbJA4UY/xoAptHcCP54/lHUjmq3zBiVG76jOBVlLK4jyXtpGB74NBilLhELRDHOW4H4UDPMddhmsL6a1Er+Qzeaq9AM89PzpLe4vtbvbWynuZHVpcgn+HPU/kK0vGaImrJFkF1iGXBznJNVvC6INaTILPsbaR2OP/ANdID0D7PYoqRJJLGFAGDg8VFJCVA8qUP7HikaGXHKOPqtRmM7SSWwOuaYhfs77cmL8KlRd/ytcMnoGNVgMdHxx69KaU+bOc+mKAJJ4wmQNrn1GD+dVTCyqGDDnqB2qxudRt5INNx8vQ89qYEICsMYYHHHOajaNAMjkZ9KuFBj5cjjnBqFk6dc+mc0hkIIU/Mob1yKjZRK21B8x7dakdecknA9aCqZG6P5j3DUCMnAZjhCfrSkMUK7gjH8KrNIZpNkW5+PuqP8KuQWV5Ow3KIh/tHn8q5kmzsbSIUiCPkuWOKGaV5SkCb/pzW9aaRaxMGukllJHTHFaQgh8nbbxMi/3SoxVqm3uZuolsc7b6bcyIBKwXj61fj0y2TazfvXH4/pV0xMueG/KhU74zn0q1BIh1JMYkQDgFQq9s1aTT3mXdDHuI5JwMUw4PXHHpV23uZUURiNCCe6c1ZmU5ba6xgg/L7dKSOQ2zEMisT6k1sTQosWZUDHrwpFZZVHbIDgmgCKeUzuGKbfYE1Ft3OW4HtnNXfs0YQsZTu/u4zVZoRnLKMUAN8okBtvA705RnknH0p6hMcjP41OqANkLhfpmgCFWdgcE5+lP82bYAztj61c3xYwy8Y6laaz2pVuV6Z6EUxFNy5Xq5B7GnxK9vOhkjkQdvlNRLuLY6c5BGatLd3H3PNJGO5zSGWGS0f5wwD/7QpXtrcR7t8bEf56YqFbpsYwrAjqRUBJLE7f8AGgC1mGOPdFtVvTZkn8DUE7PIqiSJFI9EwaYCRjJyfTPSlBJGAnI74oAagjVs4OfrU3BIMgKjvgZqLPPK8j1qrf6lFptjLdzIzxR43BOTyQOM49aANFo4CMrMP+BLQkMLniaIj2auTHjzSv8An2u8emxOP/Hq6UtGANsSt6nOKBF3ykVAyzSADoEbFRvbDY0h81mPO5qplQxy2U+hq3bXLxbVJLrn+8STTAiSaUEBJZI/+BHFEkBL5adJHbktuJNSXmyeTcgXf3+bOf6Vm38ptLKWdgyhRlc87j2HFQ5JOxag2rnB+JZDJr1wCQdhCcHPQYp/hxhD4htGZioJKk/UGs+8cNOX372Y7mNWocwTQ3CHDRsGH4UyT02QyAfubvLejNjFVoiN7faELBupV+lRxF7u0S5SMmJxuByM1IsSphiJRgdCtFwsOeC0fBV3Q+h5pBYx7SUmY465Xj6cVEzcNgEgdT6UkdyUyEfaM8gjrTAd9lkK8SKfbdVYxNHIRuIfPJDdKnNxISQShLcZxUkcUcyqplXeew9aBFcXVwUI3OwH95c0yO5CtiRAfooBpY1k+0tErqCOnzYH+ehqV4Jgv7yMvxyVI4oTuMiae2Ocxnr3FM8q0Z9yzFcjOBSm1mA4gkCkZDYpnklS0jIQBwAe/FDYh8UAQbYIEQ9McIKsRQzpIBPGR3ADf4Vda4to4GVIombsWTIqlHc3ETMY2C56+1OyHcvHzJAPLhkP05pohkhfcyO4xnaTxn8KomednzliepP/ANelSWdJOLhivZc8UAWJWmlY7sIPQcU1Y2IJLEKO4GRUYWRmzkkjkmryiWKNStyCvUDPT8KAKbMIOFbcf92rdrdOvz7FYL1LKaj/AH0jlgPMPc1GxJBG4g/WgDVS+hnO2eGMoB2zSILY3G6C3bA55G7H51BbrdJCAu4qeeABQ2S+XBD9Pm5/WgCzczLcx+WiIHPZoufwqg9s0eC5x7HipVumtWIilVSeoXrUy3MlzxLNGQP73OPwoApRx+ZLtztzxkmrE0LRMQkgceu2nybYuUaJs+nX9KZE2SBIwUHjJGTSAgZXXJ2kjsA1SRlp3OYYEUDoe9X1t7PLf6Q4A6hk60g+xE/6r5R0KtQBlmNN4J6egPFKmAeAP++alkf96dkeF7A/NRJO7uMIo9kG2gCF2KMQQQfc4pow2ePf1qUFmP8AER780443DGB/wGgCJQ4YAHg/hUpMm3GQB7Y5qxHCV+YOgPbnJzSNcyMMSANg+xzQBS2vu53fUCqmoG0MUC6mw+wfarf7Tk/8svOTd+ma6CGW16SW4Y+ingVm69pEeradPZxObdJduHxvxhgemR6etAHAeJf+EmGnzDX8iP7YPIE+d33Wz5Hbysbc7fl+5iu9Xyw7CT5R6Bcgfma5NvhsQmRq2T6G3x/7NXXmCVucZ+jUAxjiFZD5Rbb6tTftdpFMY5bgKR6jrT0iLnGUBHdulc/qY238oyDjjj6VE20tC6au9TqkNtDbiZpEcN9z5hlvwrK1CwbW7VoRvt9vzK+75c9s1hXrAWsS4yxXj2q5Y3csGnuiyyKrDgZ6HNc+yubt8zszGufCmpRyBFa2uM9w2D+tFr4Z1eRXPkQW+04/esMn6da6KHVrlEdsI2AfmYd8VSs9cuPtTCaJZeC3XFWpysS4QubekWc2k6YkVzMXIJ+VR1JOamn1KIZWTcGPQDt+tYn/AAkAuHHmhgx4G3kCoPPaaUknO0H8KlrqzVeRrxXDyQtLKFIJ+X5R1pjSrksYsc8UzT332KZGVGTz9aldd2W2Hn0rojsjkqfEyeO5tZcrcjYR02IM/jU0unxrF5kKPIB1UKQT9KrW7QKWNx5jKem3tWilkhQywTXCgjpwf5VZBz93HGoE0EjbkIV1fgr6ZH+eDU0TTSrvRGK9CoH3T3H4VLqljI8YmErLPtwGKnB/2W9RWRpmoujmOQlH+649COh/Ksm+WV2M27e6kt8lhKMDdtOQKbe3JmeBpEwSpYgHtTjds9s0rJKYgORuyPT0qrcvHcTRsOMoQR1x0pyethDgVJJw20+tSBvLAUYIHTPQVdgmt1X5od/rzkD8KiuGicnybVU5++Op/CtBkDSMRt2nn+6nFTJZybdxVR/vNUDO6kK7sAw/i9PpQqEYYyMRnoDn+dICysA4G4bvc8fnVhYckLkOF+9t/wDr1V8zA4Y06PDDBLD6UwLs0kUUARYXZj1JfFVUmIHzREL+VMb7wJYsfY0pRn4+YEdD60AaC6jAsePs4HHaqTOjEsAR365pY0hTCTu23qVXGDV1LbSpVOw7WPH3yMfnSAoO8TgBogMdyaesUYUEBgpPYYFaI0A4Dx3iEj+8M4qlPHIH2s6SY7oaABIRJ/qpceoBz+lI1n5QLGRAAeh4rW0cBQR5lupPVcZb8avXwaTEPlxOG9Byf8KAOdE0O3DxSAdiGpkenLcSF4LgJ6b+ta02nQiJibRwR02tmuE1i41eTxXaaVpl9FaLNAZWedRsjC7yzMdpIAVc8DtQB1DQtbsUEiyEdSDmrljM0ecsgB7FMmuM8JXWqX13qdvqUu6a1dYyrKFKtlgw4HqK7WHakYwjq3QspyTQAk7ws4JiUnPA6ZpGskkXesTDH91gasOIZEJkneM+kiVAsQwdsMbL2YMQT+FMCiPNHIUkeuKjViCeAMngGrwlmgOctycYIBA9qeH81xugVweMYwM/WkBQRCSFJ29gCabNJIkywW2PM27mYtgAVsyWcBViIiCR2NY9xZEuHQyRSAYB25z9aipzcvunVg3SVW9XbXe9r9L21tft9z2HQ3d45khdvnQgMpOevQ08u44YZ9cjrVeCJ4FZg7MznJZuCe1W4rq4hJdcHpnIzRT5uX3icU6Tqt0fh0++2tr62ve1+hUkVD/Bt+hINc5qEb/bJSEfr3B9K7eHXdPEm3VWSMEfL+7JB+vpWi9xo91F5kMkDo3fHFZVp20RNNdTza8gzEjFuUTIHPzetNjw1qmwdRxXa3Ol6ZcSBljicjp5b9PyNc94jt7bStJnvI0ZvK2/IHx1YD0PrWEaidomvLbUyZMpavgZbNRLb+XCLsg7WUj6HNQGbVbO5trXUdCvrL7TMIke6VoxkkA4ygziteTSLrY6H5uy4q2+XSQtJao52BiZ1GOCwFb2l27318Yox/ASf5VlwafdLqEUDQSLITjbjr713ml6UNHsjM5Cylcux9PSirNJaFw2sTPpENnpiOkwjEY+ZW6HPpWe3l7c5Vj2CrVe+1F9RvlUEiCPoOw9z705CQ/yEjjjmt6Lly+8c1VLm0HfIzMeNx9+c/SondkYFXYH2pzK7SZcfL1JI6CoyFY4GRgdf/rVqZCy302xQ7sw64z0rD1u334vYT8wA8zae3r9a1Fky+2RW9dv+BqJ5Pvo0YYsDtPTf7fWonqhmfFrvlaZ9mZSd55I6Z4z/Q1dhvo5jbGEByhUspHHLDg/hXKP8sjx4I54B6j2/pVmyv3s2VlUEZ5HciufYGd75qsMCMOfTHSmiRY13PhQeg5pIb9FjCmJCPbilkMjKXVNsddgDkl80FRgL23Vcht9NYATXH7w+ny1lARZxgAnuBz+dKsTOwVPmJ6ADJpAabWNuW328pZRx8/rUZjZSVOAfQc1E1hfx42Rsq5yNpBqSCSWBCGlXeTyAP50wEkQAFmXgegxiqqn1bj1FXTdgyAuMrn5gO9WzcabKhf7OCwGcbRk/wCNIDIcbgGEPyjgMOppFZYmAdSpPOSOf1q6JkkJ/wCWa9gx/wAakRl+bbkA+3UUAU1k3NjeyqeOByauCIKpETlj0wCDTzBGRyqfNx8o5pDaxMPlfp2U0ICzZ6g1rHtMcQz1Pc/jUv8AaFtI4EqsB6jmsmVmVtm4+UDwo4FMASSQbVG7tjOf0oA3TdafLEVEzAdxuYGvO/FmqRaHrtxJAge6m09IYfNhSVEBlJckOCD8q7eh+8fQV18RdUOAgx1Yjmqtzp1teSCW6sLe4fGA0kYZsenI6daYGZ4M1C11fWdc1IqytOttJNuRR++Kt5pAHGC+4j2NdZLdQxJvtmkZs9dnT8MVk2NvBpxla0tYrcPy3koFzj1wO2T+dXhqEsyhNwbPAwvNIBV1macFCyZH+xn9M1WdpFlyzDd1O2pmsrhlBEaA9cbuak0/T0jZpbuYxg/dQnj65oAiiQyE7n25755NStatt/1w/EVfk0+HblLkKPwP61ntZNG2VkDD0piK7XUkbkCQtj+6eKBMZX+Z0XjjJ60ySExEhUcL69qiYZTHyn60hl/zUVSkiKSOh61ObR2hWT7OwB6EgCqCabdvGsiw8EZHzYNXkvZoEBvDNIR/sggfj3oAyr/RzPMji4MZxypTIP41xU2sRW881u8b4RyuVPBwcZr0xtQiuk8lZDGWP8YGD7V5Feqv2mYbeTIxz7ZrOcUa022W/t9o7ZSRoyfqKZrF9JNoksZuRIvyjliScMKyjECaa1uJFKHIB9KhJXLd7HbeKrrTItR1CTT518+68SLdrs1CG6juEBlxIBGMxgFxwxJIfvtq5H4gkUgz2yuB3jb+lecxWYjmWSJm3IQ4PuDWoNUvVPz7HHuvNKrFTFTlynp+m+JNJlKo7GCXsZV4/OqXi/W4po1trVgUGN5BzuPoK4OPVt5CyQYJ7ir0TtcvG7LtiX5R6D1NZKkou5pz3OhjhSO2SNCwBwWOMkn+tP8AKZcj5Txz2NTWduZwwZtgHAyRk1PJp7qSwdWAHAPeuxI5LlUBkjBaUqe6nmmMFdtjSYY+o6VPFGcEmOTcp6g5xVeWPyomkBYqP7y9/rTAhuFdd0bRiVQc5Q4NZ0l04ZoiPPjI+642uP8AGpEkaV2j3MjDkbTjIJ4/XipZPtTRqJGimjIyBPF/UVG+wjnNT2yOJFyXH3ieD+P+NUA3Fbdzp1zKSEiyR/dlyMfjzWTLZTQyoHUqj5OT2x1rKUQO8iLIxOwbv7xxkfQ1Ms7gHzXDDsQADUXnAtjABPvTJSkg29SPwroGSwy2zfuyhUnqx6E/WpEvWtp/3GEPTAA+aqgdwCGBI7YqxBNHMSPKbjtjrQ0NO3QvjVpuBIFYdynFEl5avnEfJ45HX8TVGQo7DaNmOPlNNXbna24+gGKYiR0i3MVyGJ4HTb/jT4RwCc59WPFMEW/AUE4OAAafHZSyKzscLwFCn7v17UgHmRnG/PKc4PWqi3k4kHKIvuOT/hVpovIQlpVIx3GKgjuYZ5QokVnB4BwQaALCSy3HQEKO/Y1IIJlGQduRzz1p0TSDo4GOwAxT5pJXhIDIp/vY7UAVnupfuEYAGMsOTVnTb1LVt/2QMp6ybufwrOXjn5iemTTszCUB5M47ZzQB0D6nbzKweAMMdGxXPqLN7Ge4mn8q9UvhVcgqc8Ko9P8AE81Ou8fePAqxGsWVdoFLAYBxkisqtNz/AK/H5HoYDGxw17p622dnpfR6PR319FvsQ3FpiON5JisjKC0WMjPf9aqHzAcoNhHcGrd0yKQCm0nvjHFMX5VJduPatUcEnd3tYWPVbpECpMDjj513H8zUonurtwkhU4HJXoPrUVtbzToSsRdVOCRwM1OsM8UioEeLccZcYH50CEaKWHHygHPBDdKBeypgbxu/2u9X5NJZxkTgsRnkcVSubOe1xuVGHYqef1oAiub9pVCEBSx5wetMjbYTgg+nPH1pjMrAhk69Tj0pqxx7FKyOB36HJoAvtqt2ieWZRJ/vAGkh1ZoZd8sSuo7KcfzqvEiW/wAzNvYj6EVP5tvKhBgO4egzQBqf2pYShHlVQTzhkBI/wrzC/ihubqZ4VEaM5IUcgc11lwAj7VBXjODxxXJMwJY9s9RWVV7G9FXuUHsyozkH6GnxWyRwtPMhfDbVQHGfXNWdpPTpnOarx3UlupHyspP3WGQawlzSVonZhp06dW9XbXpez6Np7/1vsDW0aYmiBCSqflY5IOefwqrsIOD196sPetKf3kaHjAGOgojkiJOVcDvg5qoKSXvGeJlSnVcqWi08umrt0u9bdCO1hDlT1NbGnzRS38VvNlI48klT2FVbdrWLJj3M2OFI4zS2mFmuJG6gUSZgkdBNfLc3TNbSxFRwI+h/KrDmVIVkL7AAOAfWuGDlpc9cnOa3F1edXWGXEqAcjoau7VkhcqZ0dtqU1oD5bKQ3JEi5zUr3glQtLaI528qpx+QrOsLiG53OpAAGNvpVi8spIyJIgZARu9wf8KtVFsyHSla6MHU7uJpkubeIRqCQ6qe+Pm+mRg/gauRXQuIF+bhGBP0PB/Xn8axb65y7usDhZGIwezDt/nsTUFjdSoWiWLcSCmxjjg/5H5Ur6mbOhmXZNL0IWMH+dY2sfdcJnAb5uehp73N44lbyEC7FDEt0HOKrXd+GiaKVYmbBAeMk4z79DRJpiOs3KyYKqTnAVuppQc4XgAfw4p03l2cxVnXI4yTk4qQSW1tAJM7S3TYOTWoyrM4JxGMuoxgdPxqezR5GxMyqme3OKqLcRtORDCwB7BeB71KA7z4EgEPfC/NQB01vaWEke0bJcd2POf6VmaodOs2IilKvjlAdwp8ZsLJAysWIH3iDisS8W3uZS4XaxPY9aYE6alDICGfYR2I6/SrqzRmNcfeIzuJ7Vm2lvAsigK0sjZ4YZA+laXlLJJiXzFYDg9PypAVrmI3QVS7bR6d6dbWFtDHvmiMknUZb5fyqR4Y9xO9y+fvE8mjlVIaTPoMUARtK275gYgegQYH6VMJJJ0KDax65HGB704BdoBXnGeOaAQoGHIjBzj1+lACGCbHy4Ye/FRtHJCGO3dkfN3FW47zy+HGV9R1qBiJA0k33O49qGBXjuCr4ChmB4DZP6Vv21tcyRguEVj1VjzWSFi3q8ZIf+Hbya1rWe6jChyGbvmgCC9s7yKBsxMUI+Zl5wPwrKRIV5X06ZNb93eXpiKRKqjB3FW5/CshJY2ceaCxHUEc0AaNhe3AiWNLdDCgwCeCf8atvfzqny25P4g/p3rPt7hnnCQsqxjg7h09uKvtI4TlV9jnimIox3C+aVNw0bntyv6U2eCWeYbJWdjwAf4qetwY1Jmh3E/eyuR9KnhubUgNFGsbf3kO2kMgfRbtV+Xy2P+9zVSa1mgwssbDHV+34GtE61IsuAqSIO5GCahvdYknh8pIjHnhiDmgDP8oEEhyM/wAWc4oRyuRlTj8CahMyMQWfnpzxQAGYgOAepOM0AWLie4K8j5APmDHJ+lcVJcISwCeXnrt6flXWyqwjYoc/Kf5VxMoy/Qj1rOok9zWm2tiwgyCEkQn0ziq0sLBcENkd8ZpmxxyPzpd8qPgMRn0rNRtszRu+5Fswe1NUHdjnBq7DJvJ8wBsdMip82xXDxEe4NDk0CjfYqRgbvlPRh0qUsFS8ZeRgYzVtEtrdPMzuBYdR0FdBBbWV/D8nlSBhyOM1nOY1E4m1GZkHcsKmkciaRwM7siujm8NRxN5lvuUjnaTmsO4ga1YKwO4jBz61SmpPQOVoZC8kMaurlWzwVODXT6d4hLqIbpRvx8rjufeuadBsVfTtTgQVJOePT2pPU0WiOnvdEgv7edojtnk5z2LDofb0riZkuLG98ueJopU6hu/vW7pWtTWTGOUl4Sc4zyv0rW1OyttYheWR8CNf3Tjrn/PahNrQyqU01dbnKm382RmlcsRtwOpJOSMCr1vouIQ820FpFwh54zzn8M1JpxFhdMLiNXOVCuR0XnJH5VLrep25CrZ5KY6ntxWiaSuzl2Jo2uJJNsapLzjJ4/nWhFaOp82XaWIwEXkfj601JCyHdGBjipEd0X5Gxzmtxjvs0W7IV1Pop704RvHzwfx5/Klileaby9nJBJccD8ae8csakuhAA6igBUt3lRyQFVRllbqfwqobaBj8qGMH+6cU9Z/MIELMR3b0qdNzg7lywHDEA/jQBPp7RQB0ggYjGGb7xP41PPPFGokOQv8AtZHNV9PvmhnKzN+79VXBP1q/qWo2Zs9gkErP91VFCYGSzLJyoCjpxxSkYU7M5PZuf5VUkMpwUVEAHRR1qxZanBGVSaCQS9N45H4UAPaOeMkPAy7e6nOfyqWESvMpkZto555NXxc2x5MoAB78VKimQh1UbCOCepoAg+wRspYblOeec1SuUnVvLFuZF9UOSPwrZZH2ALjd0UsOlV4ZTbxkSyCNt3Lk560xGE7sSY0R0c9AQVq/bz3EcSq0m5gOSe9bEk1uISXKyL6nnNYMkys5aBCqE8A0hk11PcSxqitGq5+fqMiq5kWPAMeMgHIGf5U12cph8k9x0FRF4lTeUIUnAbGB+dAE4meU/u2J/wBr0q/FKyEfPx7isYPJPKqwucjv1A9q0SXRujLg9CaAL8cqmY+awZySBjkY9vwpzfZmUsvlt+prIuC+7IJIxjIGKg3AHGCp9+ooAuoyNM+XG3jaQualFoswxFOuT/Ccgmss3K226RyzueFCnqagg1qSOQs8fPXIPIouBsS2r2ygTKFz0PY1WlKKCoIHftTv7QF8FLueOx7ChjGDw2fwFAEM0jRW7Mh+YKc56dK5I3cbJmWI/wC8oxXYCykvIZ0hDYETYJPAOOBmuKm+WyETjEqN+lZVEna5pTe5IscdxxHIfowxila2ki5ZSR2IGRUVkOGbtnFW0uPLUpgHd+lZO6ehvBcy1KsahVO4gNnvxUgB9aCXxjdkd806OOMHJBA9UouUotEVxKYrRnwGwenrTLS+gdgQxik+uCKlvFXyQq52nnmskwgg5HemrMh3udhb65dQECU+fH7jmtNTp+tx4QL5g5KnhhXn0E1xBKoR8jP3W5FaNreJLICHMU69CDgg1EqY09TV1HSnt5C0bFgOo71lsCsZBHNb1vrKzkQagAkvRJx0b61W1DT9+WTAbrx0NSpNO0i99jJiiYL5jD5c/nThqEttP5asdvdSeCac26NCH4xWaN0k2T1J61qld3M5s64R2uoWClDhn4Hqh71z9zbSW8jAfMv8JHSpLe9bTx5ijOfl2nv71fM0V/saAbR0IpWuTKKa8zpkRQuwJkZ6AcVI+mAoXDhPX0q5NDPYR7Htjgngg/L+dRpE85zKwIH8Hb/69dRzmcDcWyOVhLRqfvRDOf8AGok1bzGKqr7x1DLjFbolJG2JeRxkjimyWcD5e5jSRiOSw/l6UagYolcuWBAYnPyjFMlmcqFZgBnnI61blscZeAnGeARmsi+trxJgJUxGSQrDkGlcZcjuBGcFNwzt3LyM/hT5XTaynaSfUVc0/SnjWOSRwYyMlQOT+NRaglrPKv2f/WL1k9f8aYFBFmJKvtRSeq84H0/+vViNUgzgM/8AtY5P+FRFJwvylX7bumPwrUsDBHGoZx538Rbgk+3tQIyjqR8wqifd654xXRaRaXjxs80nlw4zGpPJ/PtTZktnw7IpZejHmo4tVl3ttAkjAwA4xn1waGBpzW10IWNu0UsmOCflriryK/gvSb+N1c5OWGQR7GuzTVojCCImViOORiq4P2ljI8m/seOKNwMCB1KjBBVuq9jVxLJArSpI6k9IzyAKsS2MBDbY1BYcsowazLudrFlSB2kbHIPOKNgHzQTshwVJHRRnJFLb30NopimtwT6EVLbXImjBLLGx7nuatM8TxBXXPYBhmgBILez+zmU7lQc5LYxVAuwYld7LnjcMHFWxbReVhSwX0BPX6dKieyvAu+Eh16fNx/8AroArPIThWGB7VCQu47eT9atttUMszKjDqvenNJB5RjSNW/22HNAGdLCk7ruUbhwMHGBTfsSocrhu/Iq9HHGGGIxvz9729KmZI4tol3jd/dwce+KAKMS7WUlBnuQelTqUY9uPQ1JtgjIcyArnsDmqsyPNKJA+0AcAdMUgLDXU1raziFsK0bZXHsea41bx5FzKqyDPRhzXUXG5LSVSw27DyT0rlmgZF4wQTkEdDWdS17M2pXJA0JzsLRE9B1FMKYOQyse+KiwwzkUxmZV5HbtWfKuhtsWT6FWwadCcZGegqrHNJDbblbBZqlTUhtxLEjn1xg0nFjVQknBK+1V0gVxiN1LehOMVK1wk21Y4yg5Jyc5qp5TdunWjUS1ZKLdkmUspA9TWfLGfMLDIOc1fWaWLG1jj0NPW48zIkjQke1NNoTVyva32391cLuU9zWzb3j28eCxlte3dk/8ArVlGCCfdhShHWmQSvatmOQSR91pNJiu1udBcQR3cO6Mg7hwRWJ9maGY7gfarttceWPOtjlM5eL0+laUsEF7D5sTAhueOoqE3DToNpS16nMXDbpsdVUYFS6bNJBd715X7pHrSXVq9q+3BOehpCRDAFxz1zWvTQi2p7vbX9peqdjAcZw3f8KZJpVpKSygqScnYcA/hXJW8zRM4VioHFbNtqLxBQxJOegFXcysTXFncW5zABKmcehH+NZ3LSZnbD/3W7V1Mbeaivg4xms/Urqy2bGjWaRTkD0P1quYTRiSXClwka5I9O1Mlt1Zd7EFj6+lTW6wtkE+U56Hrn+tNaxuWkzJ86joI+R+NO9xFA2n2gNHC8scXQsrHB+goGlvAhaJg4Udzg4q/I6QfKc7uygc0KN4BfBPUDsKaAyZH2kLgqxHAIpDFwpkAJ7Zq/dfvf3KYLEY55xTYdDuRb/68k4/j5piMs20UmWAO4+jHj8Kek0yDBiMq7tu9B09qs29u0d95V59wLkmLPPsfStXeFQrAqNgZCA4JoAyo2dyCIm9iQRzVz7HLJyz8nkleOauJDmISTRhdvzHnpUeZFDFpDsbojDnFAFa5S7SA7CGIHbg1m2iSXnmSRW8hEZwTtzitO6kuJGWKIBYzgtIGyQM84FbFotvDCkVuVEZ5yvc+pPrQBzcaqzfvH8sL19RVS81cPdYgjUIvyluhauxntYLlGEkStuXaWxzj61zUnhdZZmjtZyCoyxZflB9KAHQXIePcAozVy3v5PNCTQeXAePNU5A+vpVO10i7s1ZZYw6g8NGc7qUhju5wQdpTPSgDQna1kTrG6joQOa5m8nc3DJAgBB+8KvFxuzgZHqKpeUI2Z0YjcenbJoAltrt0KmWHpxuU1LJOJGwpJB5HFQlZEUCRRknqpyKI2eOQnkNjg4wR7ikBIJVPHGPak2jIJAwTzg4NIEDENnPuaUxgNkHHY89aYFXVA0elzkMcbCOa5BJJUACMwHoDXZ3xjNpKHAZdvIzmuX8lGIELD2DcGsptG1NaCQsGjLycc9RxSssb9XVh78fyolj2RFGVlOe4qp5foahK+qNHK2jLDwl4QEAIBzwaqPC6DcfXGO9SEuMbSfepI7mSLrz2wRmmrom6HW6YhMjZAAI+tPhMLkAOVPoelDymSNmIA44A4FUlznOam1ykaggdhgKrj1BzULQY427T70+1fAyTj5aT7dKOG2uPRhmp1NFqMSMrHL/umsY5Bro47m2cFJIimRglTxVWbTbWQ/uLgKfR6cZW3MqkW9TKhuXgkDr36471sWl+VYyxA7P41/rWfLplwn3VDgd1NVkaezl34IPcHvVtKWxCbW51cwiuogwIYMMg4rFvYGQEHn0xU1tcbV8+L5oj99P7taBRLqEMoznoay+B+Rr8SOnQEjGAx9j+lbVjY/IJrg7YwMknjNQRJFpxEs5y46J1zUE1/cXr4LAJ2XtW5zmjeay0v7i2JWMcbu9UC5P8AFk9elRKCo9/Wngsgy3HpzzQxATkj9akidon3q7fUcVFv3Z3MBTHfa21cnPXJpAaoubWZQJgpYfxYxn60ybTJJY1NlKCjdXz90VRROAQccZqzavLC4aJiG/ujkfjTu0BZt7QWp+dSrHnnvSXFxJKzW9sef4n7LV9bsTR4uowSeMgYNWU0yIQk2cibTyVY5P51akKxjw2y20WM5Y9SepqBoXupQIRgqeZCcfhVu8tJjP5brIsQHzOBwfpVmEIkYRAFHQUXAzb3Tr50hW3mLGNwxU8ZqoL6RmMVzbNHIr7QyfMpP1FbU1y8uYYPu9Gcf0pgjitrfy1QE46H+dUhFAspQPglfYYq3ZWm12lmUCU8BVYjaPf1NZxl8y48y3wNpwZFA5PoKsi9kjUCRN3uvFAF94WG4eawXHAxnH41HHKtrGodkRScZPTPuarf2rAyKNwU5wd3H61RF6b+Q7ABbqceu4+/tQB0EUiMuZHAzyDmsTWbuBmMSqruP4u4qbyoyAwGzPB2HH51mT6aVLywybtxzsfjH40AUApVT1IPTJzUkO1SpfaeM4GetNPmKPniZcdeMj86SMee+xGBJzz6YoA1RaCVch1bP93mqt1aNCvzAMp49akS2wMlyVxgHNPdJTGV80huxIBxQIohVKfKCvoAePyoEMhzzx0OOtP2tA5Dx8YzuXJA9aQziQ5iOQOpHagZDqkdu2mzFX2yYHykdeRXHyqV6dvSul1e5MVix25YkcHjjNc49xDIf40J655FZTvc2p7DEupI1IJ/A80+OZHJ8yIZ9V4qJ7Z2AZfmX1HNOSPCnH3jxgdaz0NG2yx9nSQZRsfWmPZygEqu76c1IH8pQjg5OM/WpDKgZQpOc0lcLKxUyUSTcOVXdimxz2swAeIqcfeBpzKzeeO78A1QaGWPh0IqkkybtGzAtswZUlQnH8XGKhmsZ0JYIWX1HNZakjocVZhvJouVcik4PoUp2HkFeoOajYkGtKC+8+3me4iRgvQ45qssllOfmEkBPf7wpK66FOaaGWjkSHrgDNNN2ZMiRQR2yKvx2G0b4XWZSP4Dz+VZU0MkTESKy89xQrNkyGpcrbzb0XAP3l9a0oLgQESQ/NBIckehrHkXJNJb3DWzkcmNvvLVuKaJ2PTWdpZDJIxdz1JqVAobuCaj+XOcHH1oD+n1BqzEk3uQAxpwOSdpyR3NQ7ieOCe5p+4g4A69cVLAUgg4J/KnKhyDwAeme9CnygXOPr6CqV1eb0bYxAOAf7x/wFNAaqG1YMfOBIONi9c1dt3hCYiOT3B6muLXKPng88DJ4rQW+kgRZMAxkgEZ6fjSlGV9Ck421Op3Pk9KdGznGWZQOgzwao2V1LcYIjyvX5h0FXwAD0x7CpTuNqxOmoXEbEOqzR5wM1K5s9QTYcxM38J4zVYEDOR3pr7dhfbhsdaq5JcSze3jACqUHHy1l6pehGMEa85w8mOR7D3pkeoXNvK5V+OpXPFa0N1ZXoVJYwJSOeOpquYVjnUKbQo+UDp2pGWSebYnOPvEdv8AE1tXnh6RxutJFBPXd2HtUUdhJZrtMbHHJOM5q07ksrw2cKRiPYBx1rLuNPS3m/0HEb56dVPrkVsXdwkKgqOT2qjCmDl87jyabAa08kY+eInjOV/wqnFJcX92qGMxwKCec5atGaQRp1+Ws5fMlkJzjJ6dMUAaojyM7MDpUEttGFJRAjMeoGPzqI3bx4TJJHrT/tRKg+QxbGQR0FO4hluJpZ/spQGTG444AHvU0sEtoC80bKg9F3Z/KtDSIY/s+9ZVkmlOZMHke2K1PuDGOCcEUDOEubwTzOwV9o+VVPGD3JFRQQRzHrhh1zXY3uj2N2S7wBZD1ZDtP6Vx0ifZbiWK3m82NWwGbg/p1pAUtYsJTZMY8kjH8WeBXJyK6nDDmup1S5m+y8ko24cg1iG43f6xQ+O+MGsZtp6G1NaEsWY41APUCoGJ3fMMn3p4ZGXKuVP91+advOMMmR6jmsjeLS3It+cDkfXkVKqbiGGOPShUidT82COgpCNvAPehDko2uhk+FjwOuefrUaXEqDGQw9GFSSKH4yFB4yfWk+zSoMsm5fUc09OpmOMVrLHvdDGScZXmojYbhmGVZPbPNPlRlsRgdXql1fqePSmr9A0LYieGzlV0IJccVRGM8j8avR388a7d25R2bmnh7S5JMkflnHVf8KabQOJQSR4TlWI9x1qyuoThcOwkX0fmpH03zBugmDgHGOlVmtpYjhkIovFk2aJ0aC6JUw7WxklTUE9kuTscNUtojB5HIP3eOKjEisxJFLZ6FJXO+Zxuwe9G75xhRxVdbhHcoWO5T90/0qxGYzw7lfoua1Ocei5b5fxqeCJmcbMnJ+8elS2cC7Wf75PCgjj61fQALnuO9SMxdSsbqJ42dc2+7kpyPxrNeMoX39T3rsVmZc9Cp7Goruws75MgtDLjgryD+FHNbcOXscmIw5G0c9ye9a9lphmCNM37tfbqalt9HjhlMkrs/wDdBrUBXGBjHTHpQ5X2GlbckjjVF2qAFHYd6CTjjp61GOoOOnX2p4BzgkEdKVgFUZIyagu3O0LnGe1TgAvnsOwrPnYmY8celAiEYjIJHfJA7U5ZCoJVjz7VG+NjHqc9M9arsxVtp/L0piNvT9TuI3AEm4H15roIL6KZB5mAe9cpYxuRvIwOgq8Cy4AbApXGak2j2d3I0qnDE5J3d6pzaPNEp8vbKfXOKhS4eE71bPtU51cxIDn5h0HXNUpWE0Yk8E63GyVSpB6U79zEDuwWHGK1016CeTyrmHKd260smmaffxn7JIA/1/xqlNCsYMUIuJWbOE61cKIOmM1KunXNouHQ+nHNQzSiAFnHIFUmIq3ahACmPNY4Ttj3yKmgvr62wPP84AdJR/Ij/wCvUMUTzSNKw+c8DP8ACO4q+EWKEg4PrTAo32vXDQ+ULZozIcPIG3Ko+vrWJJcIVVIyuO7Afy9fpV+4P2iYhQfJwQT2NQTW8DwAqhyOpHWlqBm6hB5mluNhQ7xjceT9fSuakikjJLA/lXRXYkjQIzEoT3PeqBXt2rCbakdNON43MsP8hDZB6mkjn24ABGTyamlSMSMDleeCKTylbH3W/HBouN3LCAbcsFYH8xS7FYfeYfrUBbBAb5TjHNPEnBDA5weRUWHoQO+Iz3y5xT4ZnXlGIx6GoX2qVV8jjqKf5Xykowb6Uxpo0VuY5RtnjDD+8vBqq9nbyNmKUofRqgQkHg4PoaeJcjDYpWtsPlvsMmsLmJc7dynuvNQJhSM5BGcitGaV4VhYOy4HJBqMX8MhxPCHHdlGDVJuxF7MWHAtOByX70sl0y4AOR6EZFSg2rwoIZApznawx+tVZkbPIwKW+40SJcwyEqU8okdVPFV3t1LYSRW9uhqMLhulLRa2xVjtCR5gkCrkHIGOlSwB3uCXZSD69qiwDjn8RT9oOfUdPU1qchswzxxHBAGOBnvUqyg/eJ65zWIs5wFkG8DjHcVbtZBJuXndyQc8CgZeLuJM8lMgVMHJ6HnvjtVWKXcAN46VODk8jHHT2pASMSNo/U0qg8E85NRNcwxqA5A9+p/KmC+iYnYGOe4FAFsEKBkZ9aemSMn64NUvtqKSAC3Gfm4pftxPAjGcf3uKALZGwPJkDI7+3SseSZnchfmyecGpLi6MuVGFX2ql0HPPsOKQEoJzk/epCN0gxnn0FRLlnxk/gcCrMeY+cc5pga0QEcW3PQfSnl1znr9KzvtkhzgDHfipIbh3yWICKMk1IyaWXA44Jb0qtLHhic7x/eBxg0yZt0oAPA4IPagsTgEjbjigQeUAgY+p4FIjSQkMjspHIIpdxwGIwD0oOcYHFMDRtdfmQBJlEo7nvWhJ/ZWqbAcK4ORng1zITY/zcCnqyqxYgng9KLgblxo7phrZ8j361mXsc8doyTBkZztDelMtNWurZwFclP7rc4rZt9dtbmMx3KYJ4IPSrUxW7HI26vEmwkuSuMnrx3qOZjFnBANdXPpVpd5ezlVfYHOPwrBvNGuo5WLRlkzncpFVzIVmc5druhAcnc3PHb0rNBliJAxIv5GtrVl2hABsfPIz7Vjk7+v3h3FYVNzppL3SnI26TJGOTwaZkjoauDDHacMB1yKZJbLtJRipAzikmVZoriZs4PzfWnmVEbBTbngYNRAEZwM/SmyqXKDrg8+1VoJtboa+DL17HBqeLg8dMc5pscYmuFjyBkcZ6USR+TKUJwQfqKQk2ToccsoPPel328h+aMofVeRUIfg5GR6rTB6A0rFxs0WLqEzxjynVgB0B5/Ks9kZBgjFWMHOR+dTIwkUhxketNNomVO+pRUk8YyKmLPEoKMSD0FOeKMHqU9D1ppt5MZT5sd1Oaq6M7MmiIe3Ejgk+o4o8uN/uuM+jcU6HKwhCD7im+Wu055NQax2OxHyjoM0pJDggZFLjHGc7untTGcncM4XrgVqcoADaQKFwrZDYb1HXNG7aAAKYDJJMJI4nKY2nnAPvQBN98784cdWGcH6ikSZ2kEfnGMk8kn5R+NOLjbhWB9QOtQ8q3Tk8EUDJlk/eNkB84AIqZiFUY78Yz0qGNEjjYDnPTd0H0pYoVknK+YqMfuhz/KgRKDgl+STkcipI2eVTg8Z/OoSAhO37wGMg04EAA9MYyDSAfng/400BEXBxz6U1Zk53DafYUbiVBbuODQMQAIckHOeBmp02lxuztHYd6iYZx1NNJPmbV69cE0CLEr/aZlSMYQc9fzzT52CMkcbcIOSOmfWodo27Aw2gfN/tH0+go8schjhvrkUhjjJkjJy3rnmnpktyTg0CBBFuMgLf3QOaRVKJyCDnimIsFdkefvAGmtyN3AB7elJ5m0cZHHWmPOuxVHpnNIYOwY8daTy+m1/w9KWB2JZBjnvmpIl/eBR+8Pb0BoANibGGfm659KriMsHO7Bxn1zVufJOT9/vVQ4z90fWkFyJJ5bd96OysB9KvRa7KnFygcHkkdapXGHO4gBewHSohtWNvlBPbPemBpX0Ona1CqxgCXOSp4Nc7d+GbmBC9u+9R1U0+TdkuuQR0INSW2q3lqOX81O6vz+VJxKUrHPSwSxNteNlb6VEHwrANkEdK7YX2nX+BIqozHneP61RuvDUFyxeBlCnkMDnNTY0VR9TjzuUkDNL5kgiIyCPcVsXugXtqSyp5qY5IHIrPS2eaZU8sjnmquiUV1UxOknIIGBTp2Eh38Z68V0EelBrfJHPYVQl0dlJK8fSpKUrGWHGADtxg8+lJHHvQlvzp81vJA+2ZCPcU+PDLgEdOg7U2ylysgZCGIDdOxpyuFHzKff0pswJJweQahVnTJyfpRYm7WhLMV+Xv1ORVcMyPuRiD7VKGVycDaf0qMqc9apPoS97kwu3bAkAfHfoaVbgHPp6N1/Oq3Tmk3DINHKg5mf/Z",
"path": "images/3pts_ADE_train_00007464.jpg"
} |
depth_point_140 | images/3pts_ADE_train_00017830.jpg | ADE_train_00017830.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 26 y = 196),Point B is located at (x = 12 y = 134),Point C is located at (x = 235 y = 220).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_22><DEPTH_49><DEPTH_49><DEPTH_49><DEPTH_29><DEPTH_60><DEPTH_81><DEPTH_80><DEPTH_69><DEPTH_49><DEPTH_22><DEPTH_82><DEPTH_49><DEPTH_29><DEPTH_49><DEPTH_74><DEPTH_3><DEPTH_63><DEPTH_81><DEPTH_31><DEPTH_22><DEPTH_69><DEPTH_49><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_74><DEPTH_31><DEPTH_74><DEPTH_49><DEPTH_22><DEPTH_77><DEPTH_49><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_69><DEPTH_36><DEPTH_38><DEPTH_59><DEPTH_69><DEPTH_31><DEPTH_31><DEPTH_74><DEPTH_29><DEPTH_74><DEPTH_29><DEPTH_64><DEPTH_31><DEPTH_70><DEPTH_59><DEPTH_15><DEPTH_29><DEPTH_59><DEPTH_31><DEPTH_49><DEPTH_49><DEPTH_29><DEPTH_59><DEPTH_3><DEPTH_31><DEPTH_69><DEPTH_49><DEPTH_31><DEPTH_49><DEPTH_31><DEPTH_49><DEPTH_29><DEPTH_49><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_44><DEPTH_64><DEPTH_2><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_2><DEPTH_2><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"B",
"A",
"C"
] | <DEPTH_START><DEPTH_22><DEPTH_49><DEPTH_49><DEPTH_49><DEPTH_29><DEPTH_60><DEPTH_81><DEPTH_80><DEPTH_69><DEPTH_49><DEPTH_22><DEPTH_82><DEPTH_49><DEPTH_29><DEPTH_49><DEPTH_74><DEPTH_3><DEPTH_63><DEPTH_81><DEPTH_31><DEPTH_22><DEPTH_69><DEPTH_49><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_74><DEPTH_31><DEPTH_74><DEPTH_49><DEPTH_22><DEPTH_77><DEPTH_49><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_69><DEPTH_36><DEPTH_38><DEPTH_59><DEPTH_69><DEPTH_31><DEPTH_31><DEPTH_74><DEPTH_29><DEPTH_74><DEPTH_29><DEPTH_64><DEPTH_31><DEPTH_70><DEPTH_59><DEPTH_15><DEPTH_29><DEPTH_59><DEPTH_31><DEPTH_49><DEPTH_49><DEPTH_29><DEPTH_59><DEPTH_3><DEPTH_31><DEPTH_69><DEPTH_49><DEPTH_31><DEPTH_49><DEPTH_31><DEPTH_49><DEPTH_29><DEPTH_49><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_44><DEPTH_64><DEPTH_2><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_2><DEPTH_2><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_END> | 26 | 196 | 12 | 134 | 235 | 220 | null | null | null | null | 27 | 4 | 49 | null | null | {
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"path": "images/3pts_ADE_train_00017830.jpg"
} |
depth_point_141 | images/3pts_ADE_train_00002361.jpg | ADE_train_00002361.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 222 y = 208),Point B is located at (x = 240 y = 122),Point C is located at (x = 280 y = 177).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_22><DEPTH_20><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_17><DEPTH_0><DEPTH_66><DEPTH_6><DEPTH_70><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_15><DEPTH_19><DEPTH_45><DEPTH_15><DEPTH_17><DEPTH_70><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_25><DEPTH_57><DEPTH_25><DEPTH_25><DEPTH_57><DEPTH_19><DEPTH_17><DEPTH_5><DEPTH_17><DEPTH_38><DEPTH_1><DEPTH_76><DEPTH_19><DEPTH_19><DEPTH_64><DEPTH_1><DEPTH_75><DEPTH_5><DEPTH_17><DEPTH_80><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_84><DEPTH_17><DEPTH_6><DEPTH_85><DEPTH_19><DEPTH_19><DEPTH_2><DEPTH_19><DEPTH_2><DEPTH_2><DEPTH_56><DEPTH_17><DEPTH_17><DEPTH_85><DEPTH_2><DEPTH_19><DEPTH_19><DEPTH_2><DEPTH_19><DEPTH_2><DEPTH_84><DEPTH_22><DEPTH_5><DEPTH_70><DEPTH_69><DEPTH_69><DEPTH_69><DEPTH_69><DEPTH_69><DEPTH_40><DEPTH_75><DEPTH_5><DEPTH_45><DEPTH_63><DEPTH_45><DEPTH_45><DEPTH_9><DEPTH_45><DEPTH_61><DEPTH_61><DEPTH_9><DEPTH_39><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 3 | [
"C",
"B",
"A"
] | <DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_22><DEPTH_20><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_17><DEPTH_0><DEPTH_66><DEPTH_6><DEPTH_70><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_15><DEPTH_19><DEPTH_45><DEPTH_15><DEPTH_17><DEPTH_70><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_25><DEPTH_57><DEPTH_25><DEPTH_25><DEPTH_57><DEPTH_19><DEPTH_17><DEPTH_5><DEPTH_17><DEPTH_38><DEPTH_1><DEPTH_76><DEPTH_19><DEPTH_19><DEPTH_64><DEPTH_1><DEPTH_75><DEPTH_5><DEPTH_17><DEPTH_80><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_84><DEPTH_17><DEPTH_6><DEPTH_85><DEPTH_19><DEPTH_19><DEPTH_2><DEPTH_19><DEPTH_2><DEPTH_2><DEPTH_56><DEPTH_17><DEPTH_17><DEPTH_85><DEPTH_2><DEPTH_19><DEPTH_19><DEPTH_2><DEPTH_19><DEPTH_2><DEPTH_84><DEPTH_22><DEPTH_5><DEPTH_70><DEPTH_69><DEPTH_69><DEPTH_69><DEPTH_69><DEPTH_69><DEPTH_40><DEPTH_75><DEPTH_5><DEPTH_45><DEPTH_63><DEPTH_45><DEPTH_45><DEPTH_9><DEPTH_45><DEPTH_61><DEPTH_61><DEPTH_9><DEPTH_39><DEPTH_END> | 222 | 208 | 240 | 122 | 280 | 177 | null | null | null | null | 114 | 87 | 25 | null | null | {
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"path": "images/3pts_ADE_train_00002361.jpg"
} |
depth_point_142 | images/5pts_ADE_train_00019981.jpg | ADE_train_00019981.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 197 y = 222),Point B is located at (x = 166 y = 181),Point C is located at (x = 295 y = 190),Point D is located at (x = 90 y = 208),Point E is located at (x = 153 y = 218).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_70><DEPTH_70><DEPTH_67><DEPTH_67><DEPTH_70><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_70><DEPTH_5><DEPTH_5><DEPTH_6><DEPTH_67><DEPTH_70><DEPTH_5><DEPTH_43><DEPTH_22><DEPTH_5><DEPTH_6><DEPTH_43><DEPTH_17><DEPTH_47><DEPTH_60><DEPTH_17><DEPTH_6><DEPTH_27><DEPTH_13><DEPTH_43><DEPTH_84><DEPTH_53><DEPTH_7><DEPTH_76><DEPTH_11><DEPTH_56><DEPTH_17><DEPTH_34><DEPTH_13><DEPTH_6><DEPTH_21><DEPTH_34><DEPTH_27><DEPTH_14><DEPTH_55><DEPTH_5><DEPTH_6><DEPTH_26><DEPTH_6><DEPTH_34><DEPTH_10><DEPTH_121><DEPTH_1><DEPTH_39><DEPTH_41><DEPTH_119><DEPTH_4><DEPTH_27><DEPTH_61><DEPTH_94><DEPTH_14><DEPTH_1><DEPTH_12><DEPTH_94><DEPTH_42><DEPTH_14><DEPTH_55><DEPTH_47><DEPTH_98><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 5 | [
"D",
"C",
"E",
"A",
"B"
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"path": "images/5pts_ADE_train_00019981.jpg"
} |
depth_point_143 | images/3pts_ADE_train_00017258.jpg | ADE_train_00017258.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 312 y = 103),Point B is located at (x = 261 y = 214),Point C is located at (x = 91 y = 141).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_22><DEPTH_31><DEPTH_29><DEPTH_67><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_3><DEPTH_49><DEPTH_3><DEPTH_49><DEPTH_59><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_70><DEPTH_70><DEPTH_17><DEPTH_5><DEPTH_31><DEPTH_30><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_70><DEPTH_35><DEPTH_5><DEPTH_17><DEPTH_43><DEPTH_40><DEPTH_75><DEPTH_59><DEPTH_3><DEPTH_70><DEPTH_60><DEPTH_3><DEPTH_67><DEPTH_72><DEPTH_40><DEPTH_32><DEPTH_81><DEPTH_69><DEPTH_44><DEPTH_25><DEPTH_53><DEPTH_60><DEPTH_68><DEPTH_41><DEPTH_46><DEPTH_84><DEPTH_42><DEPTH_45><DEPTH_12><DEPTH_61><DEPTH_41><DEPTH_50><DEPTH_14><DEPTH_9><DEPTH_24><DEPTH_76><DEPTH_14><DEPTH_27><DEPTH_10><DEPTH_47><DEPTH_76><DEPTH_8><DEPTH_61><DEPTH_45><DEPTH_94><DEPTH_9><DEPTH_94><DEPTH_39><DEPTH_16><DEPTH_1><DEPTH_47><DEPTH_98><DEPTH_61><DEPTH_76><DEPTH_1><DEPTH_45><DEPTH_0><DEPTH_27><DEPTH_33><DEPTH_33><DEPTH_98><DEPTH_65><DEPTH_1><DEPTH_11><DEPTH_82><DEPTH_53><DEPTH_81><DEPTH_85><DEPTH_71><DEPTH_81><DEPTH_121><DEPTH_121><DEPTH_81><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 3 | [
"A",
"C",
"B"
] | <DEPTH_START><DEPTH_22><DEPTH_31><DEPTH_29><DEPTH_67><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_3><DEPTH_49><DEPTH_3><DEPTH_49><DEPTH_59><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_70><DEPTH_70><DEPTH_17><DEPTH_5><DEPTH_31><DEPTH_30><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_70><DEPTH_35><DEPTH_5><DEPTH_17><DEPTH_43><DEPTH_40><DEPTH_75><DEPTH_59><DEPTH_3><DEPTH_70><DEPTH_60><DEPTH_3><DEPTH_67><DEPTH_72><DEPTH_40><DEPTH_32><DEPTH_81><DEPTH_69><DEPTH_44><DEPTH_25><DEPTH_53><DEPTH_60><DEPTH_68><DEPTH_41><DEPTH_46><DEPTH_84><DEPTH_42><DEPTH_45><DEPTH_12><DEPTH_61><DEPTH_41><DEPTH_50><DEPTH_14><DEPTH_9><DEPTH_24><DEPTH_76><DEPTH_14><DEPTH_27><DEPTH_10><DEPTH_47><DEPTH_76><DEPTH_8><DEPTH_61><DEPTH_45><DEPTH_94><DEPTH_9><DEPTH_94><DEPTH_39><DEPTH_16><DEPTH_1><DEPTH_47><DEPTH_98><DEPTH_61><DEPTH_76><DEPTH_1><DEPTH_45><DEPTH_0><DEPTH_27><DEPTH_33><DEPTH_33><DEPTH_98><DEPTH_65><DEPTH_1><DEPTH_11><DEPTH_82><DEPTH_53><DEPTH_81><DEPTH_85><DEPTH_71><DEPTH_81><DEPTH_121><DEPTH_121><DEPTH_81><DEPTH_END> | 312 | 103 | 261 | 214 | 91 | 141 | null | null | null | null | 5 | 148 | 58 | null | null | {
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"path": "images/3pts_ADE_train_00017258.jpg"
} |
depth_point_144 | images/3pts_ADE_train_00011669.jpg | ADE_train_00011669.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 10 y = 176),Point B is located at (x = 197 y = 127),Point C is located at (x = 78 y = 109).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_57><DEPTH_94><DEPTH_57><DEPTH_57><DEPTH_94><DEPTH_94><DEPTH_16><DEPTH_16><DEPTH_23><DEPTH_16><DEPTH_44><DEPTH_44><DEPTH_64><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_45><DEPTH_19><DEPTH_25><DEPTH_64><DEPTH_31><DEPTH_60><DEPTH_38><DEPTH_31><DEPTH_69><DEPTH_38><DEPTH_40><DEPTH_36><DEPTH_20><DEPTH_15><DEPTH_17><DEPTH_13><DEPTH_47><DEPTH_35><DEPTH_17><DEPTH_83><DEPTH_56><DEPTH_17><DEPTH_63><DEPTH_12><DEPTH_56><DEPTH_60><DEPTH_58><DEPTH_20><DEPTH_15><DEPTH_84><DEPTH_11><DEPTH_75><DEPTH_18><DEPTH_37><DEPTH_56><DEPTH_42><DEPTH_22><DEPTH_38><DEPTH_36><DEPTH_46><DEPTH_38><DEPTH_72><DEPTH_38><DEPTH_72><DEPTH_48><DEPTH_1><DEPTH_84><DEPTH_36><DEPTH_25><DEPTH_44><DEPTH_25><DEPTH_45><DEPTH_2><DEPTH_2><DEPTH_62><DEPTH_39><DEPTH_81><DEPTH_66><DEPTH_41><DEPTH_2><DEPTH_0><DEPTH_33><DEPTH_0><DEPTH_1><DEPTH_78><DEPTH_44><DEPTH_25><DEPTH_41><DEPTH_9><DEPTH_66><DEPTH_41><DEPTH_94><DEPTH_1><DEPTH_57><DEPTH_45><DEPTH_76><DEPTH_63><DEPTH_19><DEPTH_64><DEPTH_41><DEPTH_47><DEPTH_33><DEPTH_94><DEPTH_42><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"A",
"B",
"C"
] | <DEPTH_START><DEPTH_57><DEPTH_94><DEPTH_57><DEPTH_57><DEPTH_94><DEPTH_94><DEPTH_16><DEPTH_16><DEPTH_23><DEPTH_16><DEPTH_44><DEPTH_44><DEPTH_64><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_45><DEPTH_19><DEPTH_25><DEPTH_64><DEPTH_31><DEPTH_60><DEPTH_38><DEPTH_31><DEPTH_69><DEPTH_38><DEPTH_40><DEPTH_36><DEPTH_20><DEPTH_15><DEPTH_17><DEPTH_13><DEPTH_47><DEPTH_35><DEPTH_17><DEPTH_83><DEPTH_56><DEPTH_17><DEPTH_63><DEPTH_12><DEPTH_56><DEPTH_60><DEPTH_58><DEPTH_20><DEPTH_15><DEPTH_84><DEPTH_11><DEPTH_75><DEPTH_18><DEPTH_37><DEPTH_56><DEPTH_42><DEPTH_22><DEPTH_38><DEPTH_36><DEPTH_46><DEPTH_38><DEPTH_72><DEPTH_38><DEPTH_72><DEPTH_48><DEPTH_1><DEPTH_84><DEPTH_36><DEPTH_25><DEPTH_44><DEPTH_25><DEPTH_45><DEPTH_2><DEPTH_2><DEPTH_62><DEPTH_39><DEPTH_81><DEPTH_66><DEPTH_41><DEPTH_2><DEPTH_0><DEPTH_33><DEPTH_0><DEPTH_1><DEPTH_78><DEPTH_44><DEPTH_25><DEPTH_41><DEPTH_9><DEPTH_66><DEPTH_41><DEPTH_94><DEPTH_1><DEPTH_57><DEPTH_45><DEPTH_76><DEPTH_63><DEPTH_19><DEPTH_64><DEPTH_41><DEPTH_47><DEPTH_33><DEPTH_94><DEPTH_42><DEPTH_END> | 10 | 176 | 197 | 127 | 78 | 109 | null | null | null | null | 46 | 81 | 106 | null | null | {
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",
"path": "images/3pts_ADE_train_00011669.jpg"
} |
depth_point_145 | images/4pts_ADE_train_00017743.jpg | ADE_train_00017743.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 101 y = 192),Point B is located at (x = 242 y = 216),Point C is located at (x = 302 y = 209),Point D is located at (x = 141 y = 100).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_70><DEPTH_13><DEPTH_60><DEPTH_43><DEPTH_38><DEPTH_74><DEPTH_59><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_61><DEPTH_65><DEPTH_22><DEPTH_72><DEPTH_31><DEPTH_36><DEPTH_69><DEPTH_17><DEPTH_5><DEPTH_30><DEPTH_60><DEPTH_10><DEPTH_5><DEPTH_36><DEPTH_49><DEPTH_3><DEPTH_49><DEPTH_67><DEPTH_70><DEPTH_3><DEPTH_34><DEPTH_119><DEPTH_34><DEPTH_69><DEPTH_49><DEPTH_31><DEPTH_49><DEPTH_35><DEPTH_59><DEPTH_22><DEPTH_79><DEPTH_65><DEPTH_13><DEPTH_69><DEPTH_3><DEPTH_11><DEPTH_5><DEPTH_17><DEPTH_20><DEPTH_29><DEPTH_43><DEPTH_51><DEPTH_70><DEPTH_3><DEPTH_30><DEPTH_70><DEPTH_12><DEPTH_39><DEPTH_25><DEPTH_14><DEPTH_66><DEPTH_54><DEPTH_66><DEPTH_42><DEPTH_121><DEPTH_81><DEPTH_44><DEPTH_25><DEPTH_76><DEPTH_82><DEPTH_80><DEPTH_24><DEPTH_32><DEPTH_39><DEPTH_66><DEPTH_57><DEPTH_11><DEPTH_72><DEPTH_19><DEPTH_77><DEPTH_16><DEPTH_42><DEPTH_16><DEPTH_32><DEPTH_78><DEPTH_44><DEPTH_76><DEPTH_78><DEPTH_0><DEPTH_41><DEPTH_25><DEPTH_33><DEPTH_0><DEPTH_19><DEPTH_63><DEPTH_2><DEPTH_41><DEPTH_41><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 4 | [
"D",
"A",
"C",
"B"
] | <DEPTH_START><DEPTH_17><DEPTH_70><DEPTH_13><DEPTH_60><DEPTH_43><DEPTH_38><DEPTH_74><DEPTH_59><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_61><DEPTH_65><DEPTH_22><DEPTH_72><DEPTH_31><DEPTH_36><DEPTH_69><DEPTH_17><DEPTH_5><DEPTH_30><DEPTH_60><DEPTH_10><DEPTH_5><DEPTH_36><DEPTH_49><DEPTH_3><DEPTH_49><DEPTH_67><DEPTH_70><DEPTH_3><DEPTH_34><DEPTH_119><DEPTH_34><DEPTH_69><DEPTH_49><DEPTH_31><DEPTH_49><DEPTH_35><DEPTH_59><DEPTH_22><DEPTH_79><DEPTH_65><DEPTH_13><DEPTH_69><DEPTH_3><DEPTH_11><DEPTH_5><DEPTH_17><DEPTH_20><DEPTH_29><DEPTH_43><DEPTH_51><DEPTH_70><DEPTH_3><DEPTH_30><DEPTH_70><DEPTH_12><DEPTH_39><DEPTH_25><DEPTH_14><DEPTH_66><DEPTH_54><DEPTH_66><DEPTH_42><DEPTH_121><DEPTH_81><DEPTH_44><DEPTH_25><DEPTH_76><DEPTH_82><DEPTH_80><DEPTH_24><DEPTH_32><DEPTH_39><DEPTH_66><DEPTH_57><DEPTH_11><DEPTH_72><DEPTH_19><DEPTH_77><DEPTH_16><DEPTH_42><DEPTH_16><DEPTH_32><DEPTH_78><DEPTH_44><DEPTH_76><DEPTH_78><DEPTH_0><DEPTH_41><DEPTH_25><DEPTH_33><DEPTH_0><DEPTH_19><DEPTH_63><DEPTH_2><DEPTH_41><DEPTH_41><DEPTH_END> | 101 | 192 | 242 | 216 | 302 | 209 | 141 | 100 | null | null | 79 | 128 | 104 | 30 | null | {
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",
"path": "images/4pts_ADE_train_00017743.jpg"
} |
depth_point_146 | images/5pts_ADE_train_00003555.jpg | ADE_train_00003555.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 41 y = 108),Point B is located at (x = 11 y = 215),Point C is located at (x = 265 y = 201),Point D is located at (x = 213 y = 126),Point E is located at (x = 110 y = 134).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_0><DEPTH_82><DEPTH_31><DEPTH_69><DEPTH_29><DEPTH_74><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_63><DEPTH_66><DEPTH_82><DEPTH_67><DEPTH_3><DEPTH_49><DEPTH_74><DEPTH_74><DEPTH_36><DEPTH_74><DEPTH_63><DEPTH_66><DEPTH_84><DEPTH_22><DEPTH_60><DEPTH_40><DEPTH_29><DEPTH_74><DEPTH_36><DEPTH_74><DEPTH_76><DEPTH_66><DEPTH_82><DEPTH_22><DEPTH_49><DEPTH_2><DEPTH_11><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_76><DEPTH_78><DEPTH_81><DEPTH_22><DEPTH_70><DEPTH_60><DEPTH_49><DEPTH_31><DEPTH_49><DEPTH_29><DEPTH_15><DEPTH_66><DEPTH_58><DEPTH_5><DEPTH_58><DEPTH_76><DEPTH_70><DEPTH_74><DEPTH_74><DEPTH_49><DEPTH_85><DEPTH_78><DEPTH_25><DEPTH_5><DEPTH_77><DEPTH_59><DEPTH_15><DEPTH_74><DEPTH_74><DEPTH_29><DEPTH_85><DEPTH_78><DEPTH_58><DEPTH_13><DEPTH_5><DEPTH_19><DEPTH_78><DEPTH_44><DEPTH_44><DEPTH_25><DEPTH_44><DEPTH_25><DEPTH_75><DEPTH_9><DEPTH_4><DEPTH_23><DEPTH_45><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_41><DEPTH_40><DEPTH_20><DEPTH_53><DEPTH_1><DEPTH_41><DEPTH_32><DEPTH_94><DEPTH_16><DEPTH_42><DEPTH_42><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 5 | [
"E",
"D",
"C",
"A",
"B"
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"path": "images/5pts_ADE_train_00003555.jpg"
} |
depth_point_147 | images/4pts_ADE_train_00012742.jpg | ADE_train_00012742.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 229 y = 222),Point B is located at (x = 197 y = 213),Point C is located at (x = 110 y = 97),Point D is located at (x = 315 y = 197).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_70><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_3><DEPTH_3><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_31><DEPTH_70><DEPTH_70><DEPTH_3><DEPTH_3><DEPTH_3><DEPTH_31><DEPTH_3><DEPTH_3><DEPTH_49><DEPTH_35><DEPTH_11><DEPTH_70><DEPTH_31><DEPTH_59><DEPTH_31><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_64><DEPTH_59><DEPTH_3><DEPTH_40><DEPTH_69><DEPTH_70><DEPTH_25><DEPTH_70><DEPTH_77><DEPTH_43><DEPTH_25><DEPTH_3><DEPTH_31><DEPTH_58><DEPTH_40><DEPTH_59><DEPTH_2><DEPTH_25><DEPTH_67><DEPTH_1><DEPTH_0><DEPTH_3><DEPTH_31><DEPTH_72><DEPTH_59><DEPTH_49><DEPTH_72><DEPTH_9><DEPTH_11><DEPTH_23><DEPTH_41><DEPTH_70><DEPTH_59><DEPTH_49><DEPTH_64><DEPTH_60><DEPTH_29><DEPTH_49><DEPTH_80><DEPTH_94><DEPTH_12><DEPTH_67><DEPTH_67><DEPTH_70><DEPTH_3><DEPTH_67><DEPTH_70><DEPTH_67><DEPTH_63><DEPTH_14><DEPTH_8><DEPTH_END><DEPTH_END>. Since point D has a higher pixel value on the depth map, the answer is that point D is closer to the camera. | D | long | 4 | [
"C",
"A",
"B",
"D"
] | <DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_70><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_3><DEPTH_3><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_31><DEPTH_70><DEPTH_70><DEPTH_3><DEPTH_3><DEPTH_3><DEPTH_31><DEPTH_3><DEPTH_3><DEPTH_49><DEPTH_35><DEPTH_11><DEPTH_70><DEPTH_31><DEPTH_59><DEPTH_31><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_64><DEPTH_59><DEPTH_3><DEPTH_40><DEPTH_69><DEPTH_70><DEPTH_25><DEPTH_70><DEPTH_77><DEPTH_43><DEPTH_25><DEPTH_3><DEPTH_31><DEPTH_58><DEPTH_40><DEPTH_59><DEPTH_2><DEPTH_25><DEPTH_67><DEPTH_1><DEPTH_0><DEPTH_3><DEPTH_31><DEPTH_72><DEPTH_59><DEPTH_49><DEPTH_72><DEPTH_9><DEPTH_11><DEPTH_23><DEPTH_41><DEPTH_70><DEPTH_59><DEPTH_49><DEPTH_64><DEPTH_60><DEPTH_29><DEPTH_49><DEPTH_80><DEPTH_94><DEPTH_12><DEPTH_67><DEPTH_67><DEPTH_70><DEPTH_3><DEPTH_67><DEPTH_70><DEPTH_67><DEPTH_63><DEPTH_14><DEPTH_8><DEPTH_END> | 229 | 222 | 197 | 213 | 110 | 97 | 315 | 197 | null | null | 46 | 67 | 7 | 93 | null | {
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"path": "images/4pts_ADE_train_00012742.jpg"
} |
depth_point_148 | images/5pts_ADE_train_00009847.jpg | ADE_train_00009847.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 208 y = 207),Point B is located at (x = 100 y = 190),Point C is located at (x = 256 y = 219),Point D is located at (x = 123 y = 154),Point E is located at (x = 277 y = 220).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_83><DEPTH_43><DEPTH_35><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_61><DEPTH_80><DEPTH_54><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_80><DEPTH_53><DEPTH_56><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_80><DEPTH_43><DEPTH_56><DEPTH_67><DEPTH_5><DEPTH_67><DEPTH_83><DEPTH_17><DEPTH_17><DEPTH_17><DEPTH_63><DEPTH_52><DEPTH_81><DEPTH_13><DEPTH_22><DEPTH_6><DEPTH_82><DEPTH_30><DEPTH_43><DEPTH_12><DEPTH_57><DEPTH_32><DEPTH_41><DEPTH_16><DEPTH_32><DEPTH_94><DEPTH_55><DEPTH_63><DEPTH_33><DEPTH_58><DEPTH_74><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_69><DEPTH_98><DEPTH_65><DEPTH_66><DEPTH_29><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_69><DEPTH_32><DEPTH_65><DEPTH_58><DEPTH_16><DEPTH_55><DEPTH_94><DEPTH_94><DEPTH_16><DEPTH_57><DEPTH_16><DEPTH_1><DEPTH_121><DEPTH_14><DEPTH_END><DEPTH_END>. Since point E has a higher pixel value on the depth map, the answer is that point E is closer to the camera. | E | long | 5 | [
"D",
"B",
"A",
"C",
"E"
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6m6DNC4U4xVgKO60AJnleabiHMkIiArkij5AelObGMDiiKCSd9sak+9VGK6mcptuyJbNEnu1jfgdq6FYUjYYzis6y0eaO4WSbGwdNvWtkxgHmuWq1fQ6aadtQU5XgUj5HapFGMYpXXPPFYmhUMe45OKBCG7Cp9vtQRtwe1O4GfqUZWyYD1FcDreTcZPGK7/VDmyBU9Wrz/Xc+Z155qHuB1Xh233eHrY/WrzwY6VD4dbHh2zH+zWngE8gVtcNDOexjuFxKmcDg+lc1qEHkiVDjA9a7Mpk57CsnWLCNrKWdSd4xx681Tnam0R7PmmmeV+KlGE24UMuSAKyvA0IfxTIdnW3OB+ddD4jJKnKgFV4qL4YW6zeMpi4BC2pIB/GuPDys7nRUXMrHXpplzgHyetTRaVK06h0wO9dUw7Cgx9+9eg676HGqK3ZzlzpKKn7gfPnnNZzW0iHDIR+FdXLhT0qBmD9RmiNWQ3SizmmgKD5lIz3o2EDFbl0geFhgH0rI2nP0reE+ZHPOPKyIAj1pckipcUgWqsiLkBXPWmNFkVaKUbKVhplBoajMdaDx+1Q+X14pWKuVDF7Unk1dVOOlJ5XNFkPmIEhxVhFA7U8RVIqGiyFcpXaOF3r0PBFYdwrIcK2a6S4wFPPtWe1jGq72Oc1BaZzFyW3fN1qFCRwK1NStURwVyQaz9gU0DuNkwo5qq3zc4qzId3aoSOcUWAiXinAZ6U7Z3xTghPSnYD1rcaTBzTwKcELcKMkdMVrokc2rdiWzsZLuULtYJnlq6G3s0tAUTt/FTdNiEFovJ3HrmrYAByTXFVqOWiO+lTUVdjlIXOOppAAaQ5644ozjkd6wsa7iMOwpyqCvNGCeaazEdKAGseCMVWJY55qzgt2qNoGySKaQjM1At9mCg981wutA+fye1d3q6+TAmDktmuA1lybj8KXUTOw0BmGgWX+7Wvu7VkaH/wAgKzGf4K0FY1rbQRZJG2qGqtjTJeeuP51PuNU9T+axdc9f8azqL3WVHc858QANG5brjAo+FaAeLbsntan+tO14bIZAOfem/DJtnie6P/Ttz+ZrnpKxrfc9Y2DAJNRSsFPWmvKSBUJbJrrSMBJBu5FVytTOxPSoj3qhIjZSQQBmqh09tpYt71fGQaDwOePxqoyaehMopmO0LryVO2kWMntV9rlVYrgEVEzeYcAYFbKozF0ysUx0603GO1WDGo6Nk0hjGOtVzEezZXK57VGUIPSrewU3y8nikpA4tFYJiniP2qfyiD0qSOElsdKfMhWZWCj0qeK1Mh64FWo7UbsmrATZ3ArOVQ1jT7mfc2iGIIqbj3JqpNY4iOB07VskZ9uaa0YYEHpis1I15Uji72weUjA/Csq50+RByDXbvaZJ4x6VVltAThhmtFIjlOGa2cDlaSOyZz0NdbLYIe1QLaBG6U3ILHPrZnOMVMLQKuStbDQBTnHNMeMOuKVwsdoIy5xjJrb0izEcZkkX5icYNWLfSYo3LHOa0YgAcEAdqzqVr6IqlQS1kQFAvA6elBXirEqAGoStcydzdkZyBjNCDBz1p/ljqTikDpHkkZ96YgZie2KaP1qGW7U9BihLqMqMdaaTYXLC9eTT3Hy8d6q/aA7bVUsacJZEBD4A7D0pWYXMvWy3lIB79q881h8TncRn6V3+synC4YY5zXn+ryM1ycYI70luJnZ6KwGh2fulXt1Z2jD/AIkVkT/zzH8quGQeordEslyOPrXgvxAstLbxT4m1TUYbycwXdjbxx29wsXElu7Eksj5x5Qx06mvbprkBCdwxXifi9tVHinW4IPDZ1WxvJrWfdJBOw3xQlQVaNl/56ODnP6U5AmVvD+nJpNzrVtFK0sJjtZ4nYYYxyRmRMjsdrjPvmu0+HWV8SXfH/Lt/U1xXh46rJPrF1qlvNBLcGL/WQmMYAYAKCBgAYAA6DFdh8PpD/wAJLcgf8+/9TWH2i09D08880lITgdeaTOAcnmtmQJ3pkkiR/ePJqlNqMkOUEWW7VnO8zP5sp59KqKuJuxo3N+IkyvL1Tja4upN7NtWkjhabDkcVd2BVVR61WhOpF5Ww88mpUiyCakCAnaKmUbEIFJsaKTR4603b6VKSdxzRjPFO2guZXIulPUEngU4J2AyatRwcBmGDSvYpJMjWAtg0kkbocir2Aq8UKquvNS5D5SijPUjbjirBiABwKjZfWle4WIhnvTsjFKQBUbtjpQAxwOarSKOtTO2cioWGaaArSJntVd4/arjCoyvNNCM9oiTnFR+Vz0q+6VHs5p3EepsccnoKiZgG56e1QpcGcdwPekLFSCOa5LG9yV5SfpTGdh2oJDEGqt3K8KkqMimuwn3LO5CpLPg+5qOUjbhTxXN3F5I7jAPX1rUhuHMCqwxxV8j3J5kOkYFSpotk8vPf61BI/wA4HrTGufL6Hjvmqs+gNl8zxoeW5qOW53d81mS3cYOTjNLFcA/Mx4PSnbQVxupvuHbAGa4PWJDvYoFziu31CVTyuCNtcNq0imfG0Y6Hmst5DOx0+Ux+HbP1ES/yqrJdEn72Kz4b4nS7aMZGIwOPpUQmJbLdK6oR01MpMtyTOep4qpb6pp8l20CXcZlIGOeCTjgHoTz0FMuH8+J4UdkZ1KhgOVPrWdBDdXOnx6WmnzQzRmMmf5dkWCMurZ5b2HPJrnxM5R0X9eR6WXYWjXTdSWzXVKy/md90uy189r19cc4YAjOcdKb4DJTxDdbRybfj8zVnWwN8nA65qPwGAfE916C3/qaUInGz0WFMcsSSameBuuKao3MDWimdgOOlXJiSM2Oy819xT8ahubFS2EUucZwB0rZEjdNoC1nahPcWzK8Nsbkc+Yqt8wHbA70oyYNIppGQxjK4I49Oal8obsck49OlZy67NJOGntmW0lBCyEbWikA6N7VmWPiPV38PLeS6a93fPNtEMSlMIejc5zxWjZB06xqmNp3E9PagcUKWeNWZSjFQWQ87T6UoBNIZFJCX5Uc96ats/pVpRtNTdOBT5yeREEVuIxuPWh2+apXIxUJGTSvcpKxIGytIDto2gLmmO21SaTQExcYzVaRyxwBTfNyhOcD1NRT3SQjbuXf700gbJG4wO9RMcZ5rPl1bBYcDjmo7OczHO/INVYVy+Tk8U05pVXHNOIpAQHmmEVZ2CkMYzQBUYZNNCZbFWmiIPShU+bpQB1kU5xgjFOdwF4pqhUzTN6nNY2NCWO428EZqleXZKMG4FMnu4oht+8+eBVOeUS4IHzd6qMRNke+MYLHjtUsV/Gz4rNkgklcndxVWSZoCRnOK2SujNu2pr3FwEkD+ZxVSeV5m+RxjGax5Ll3bJponamo2J5jTLk4BAyKlics2ew4xWYkrk1dgkdefWhrQcWPuC6Iw25NchqZAlJK8nrXY6hIoBC/3RXEamxW4YnvXJtM2voV9T8RXumXdppth4fudUlNkt032dmLKpYryoRuMgc+4rQ8H6xL4outQt7jSpNPmsDGrxyOS2W3cEFQQRt/WsHXxZvql1bXRQrceGoUSNryO1MjC8jbCySAqDhScYOQprofhxLa3PibxK1nM0tukOnxoWkWQrshKlN6gB9pUruH3tue9b8zI5UdgmjRDk9RUc8ItA2O4roVUBRisPXEfecf88zWc5toqMUjz/V5C8sp7VP8ADtS3ia7z/wA+39TWdqEcvPTvWx8MYvN8T3IYDi2/qalOyKtc9IVMc1bjikccHApVtwXBBGB61YLEd+KJMLEPknby9RS27mF/KIaTGVUnALe5qdyN2GP41QutWW2+RIyxHfNCTYmzD1WHxPHA4s7ewcGMmVsZIPoP1olstVv/AAzpVtYXB09zHG08jn5wAPu0s2tSjzGYkZQjFN07WCtnbKcnES9fpWyi9yLo1du0BCS20BSe+R3P1pRxVV9Qjf5gKRb+Pdg8CnZhdF1eWqV8DrVX7fAqgg5IqlLqJklO1sY6UuULmmxFRtxVSG7VuGfnvTpLiPy2IOSKLBckkuVTA796ikmimRhuwRWPPM0jbsVA0zICe4q1EhyNYSJsKhxx61mSuskjNnA9/wClVPObls9agebOF9arlFzE5hZnyD+dX7FY4pNufmqnAzKGRztUjhuufauQsfHF1L4pg00wQKHneJiF5AGcfypNjSPTg2QKeMGqDSLb28lxOcRxKWkYjoBzVDRfGGja9eSWmnTStMi7v3icbfbmpsUdBgUYGaaD6HikeRI1JLKCBnFKwXHEU1iq9agS5M5DISoxzmo5Z1Ofm5NFgudfK2e1ViCQSKkd6FQn8axWhoU5bbe4cDmq0sBUHnrzW00YGBx0qu8Ic4A5qucTjc56a8k2+UifpVF4JpTgRnPrXYCxjQZKLmlMMaDhRVKpYn2dzjl0m4YZ204aTP6V1jIuOoqucE4Bz24p+0bD2aOf+xNCRu60crxjPatS4RiykKTn1FVmiLdVK1V9BcupBOhNuDuGe+RXC6msqXkm5gVxxXfXKsLYgBAMdSwFcFqrEO5OwY77hWTXvFFy/wDAOl+KxYXt9cXkciWqQgQOoGASe6nn5jXS+D/BOmeDhef2fPdym72eZ9oZWxt3YxhR/eNcxaeJHSzEi6tZwzW8R8uxkhJEoBwMtnIc+g44Hqa6z/hNdBt9JTUbm5eG3ZtmSMlW/unHepjUU9jsxGCqYdXk09Wna+jXR3S/C68zph0HBrF1pisjBsYCYrFj+KvhFpRGdQlVT0doztqrq3jPw9qUjfYtVgkBXHJIOfypSTOZHM6hMSJeAcPgfSsvTPF974T1GW9sraKR5B5X73pirF/PA0YMV3buS3RX5rnpLNtQuUtxPFEC+WlkOVT60WbSGnrqddH8atde6QS6bZMmQHROCQffFeufbpgB8gAKg7R2yM14r/wrScC0urPUEuwXV+E2qCDz+Fe0iSKWMGNvugA5HoKvlHUa6FW81CTyCsYw3vWAzyFiTnmtqRA1wwxz6VXuYQqjAFaqyOd3ZiyIxhkyTwpNNiO22hH+wv8AKtKaIm0mOCCEPSqsNkDFEWmx8i8fhWiZFmQmfAxniqt7qS2VlcXUm5o4I2kYKOSFGTj34rWENtGjJgSMe9ZPiCzX/hFdYfaQFsZiP++DSuOxyY+K2jg82uoY/wCuaf8AxddyEkcE5xXkmrw2reDf7Fjlma+0aKG7ljaEKqeYf32G3Es26WFT8owIu9exkGMkDk+lTGXcclYrguvB/OpEkOME04AysVYYNMMD+ZtAqtBaivKFGB0qrM4f8KuvZOFB6kjNZ0yuGK4xzQFiM7sEBc1OtsXjGcCp7OBzOGXDKOTmrZiYy5Kce1FwsUktZI3+VsgDdgeteT6fGbz4hxSQl1drxzkn0JzXtO1Fc4O1gvQ149apdt4/gEUYSEXblGHpk5rO5pY9d1N0k0y/WdcxmCTOfoa8l+GDyJ4xkwMo1u2M9l5xXq+qok+lXsLZCSW8mT7AGvJPhrIx8VzIgypt2XPoBnH8qpCZ7DJNhMA4PtWVLKyyZYk/WpGlPfNRMQ/XrTSIuI98wXYpIzSRykjk8VTup4YCPMdVz61Faahb3EvlwzpI3PyqeaNBnpYuPl5qeKclayFZiamRyGwTWTiaJmp5rM1TQqQck1nxvz1q1HIueTWcloUmSvIXOBVWYsBUs11Bbpvd1GTt+9is+41C3b/l5twP+uq/40QQ29AaUjjNU5yZ4mj81os8bk6j3FMl1GxTO6/tVJ9ZV/oa5TW/H+n6Ypi06I390P7gIRT7k9RWqsjPU898XeI/EWn+J9R0621q8NvBIFX5znGB71zMuu6/ITv1e/8Axnb/ABq3qS6lrWq3F/Lbfvrlt7BG4X86r/2TdqrGS3ZumMMP8aVzXkXcrNeanKp8zUrpgOxmY/1qm81y2Va5lZT/AHmJrWXR71ssI174BIyKp3OlXMEuxtuWG7rQJpItWep3H2Eu3lmSNlWNygyq46A/56moRM/k+VvcRZ3bFY7d3rimx20sdg6lefNB/Q03a3Qg5FQoKOyOp4mpWSVWTdtrkc/3gMdvwNQFQSPlUHPapZg24cHpUXOeQaZk7A+0uTsA54xUkMmyVdzMF3Avg9Rmo6M00S0j3C1+IfhgW8cSXzQhUVdrRnA4+lWG+IWiw3nlxXPmRBcrMvC57Aj3rwYnPbNWLRAXf5RkRsau5m4Jn0LpPiSDUhJtkiUFwsQMgBK9yee1a9zOps2KlWcdwwNfLyMygFGdWPo2KsJqd/GCseoXSD0ErUC5Gj6IkuJvsEjgcFSDSwos0KFs7tgxXiHh/X9X/tK3thqE5hckMrNuB4J7/SpoPiN4ktgQLmJ1A2hWiXgflT5ieRntUEkL3MttFKGeEAuMf3uak1SzOpaPead5nlfaYHh37c7dykZx36149p3xN1Sxvbi7ms7a4e4Ch8kr93gdK6S3+LJntbiV9IWPylzu35GTwBjOTz9PqKic1FXZrSw86s1CG/8Alq/uWpnTfBjyoi417djt9j/+zr0HfLLKZV7ckVzdj8UNNlsFm1G2kiBfYZIhxu64K844x3P4dK1IfH/hCdABqXln/biYf0pwnGSugr4edKfLP8Nmn1X9fibZcMVdRzVgkoQ2OSKzbfxD4euE3Q6paHHPzPt/nV6Oa0uFDw31vJnoFlX/ABqrmPKxktxIh5NYmuyyr4d1WdGZJEs5mR1OCpCEgg9jXRSW7uuF2v79ay/EsBj8H6ySCCLGfqP+mbUXDlZ43qU+o6Ut5bf8JfqX9p2WBcWzSOibtwVkR95LMpPIKjoxBOOfX/D88knhzSpZppHkks4Wd3JJYlASST1NeG6rr1nqYu7k6Xt1O9wbm4ebem7IZnjTaCjMRzlj1YDAPHt/hqdH8M6NDkFxZQfKf+uYqUyrGN401DWoNV02z0jU4LIywXU0000YdAkUQkOfkY/dDdB1Nee+HLm4bx9pqf2jFqAaXcXgV1Qkg54ZVP6V23jrUrfRPE+kXl1vEBtb2HEcKS7TJB5YOxiFYZYEgnBANcX4ZvrJviDZXST74uhdrOO1AOCPuRkqPr3pAe06vEZdIv4dxQvDIM+nBryf4ZyKPFdwmCM2xA99v/6q9M1nUY4LV13iSOeOVcrzjCE/0xXmHw4kz4qm2jO6BsDpxzxVok9Pk5GRUQyOTVlsbeF4pPKLLnGBVIho888ZXM0es7UfaohB/PNYng+aX/hLLZVf7+7P6VreN1ZPEAGePJX+ZrH8GkL4wssjPzN/Ssb6nQ4pR1Pf1YA1KJFznNUDPjOO1IbnbyeK15TG5p+dj14pyXGHXOMn3rLN4VUuSoQDJYnAxXJa38SNL0otDZH7bdf7HCr+PSplFJFRvJnMaxrjtrt+Wad8TuoHmHaOSOOayTcIMko7c85Y9aqyTG6llupAA8rGQqOgyc1GCTuw3HpXPfU6lBJalxbiNVO63UsehanR3pjUqsMYzVME5BOTSEEuTluD0pKTkVKnGOpZNyxP3efY043cxB6DGOAMk1XHrjmprZtMWUvq01xDAAcNBjcW/HtSUmwlFJbDzdzc4ZR9AKx9Qnla+bLDhcfhV4ENnaPl/hJ6ke9Zd9zeueOgppu4SSavYf5rGwJLDJkGf1qPzj3RTSYP9njpzL/jUJ6VpcxSJJLhSRmMD6VXllRkI2496VjmmEZHr7UXLsVs56EUCpmiQKSw6elIsSsoIBwaoh7kVWrH703XiFsflUJiAGckVZsov+Pghs/uW/lTEU88DpxQT79acIiR19ulBjfk8Y9aNguaXhtQ2vWwPIG4/oay85JJ71seGEYa7CT/AHWP6GsZVfaDt49aYuYcOtWbS7NsXUxrJFINrxtnBGf5+h7VVIOM449aTcPeplFSVma0qsqclOD1LtzeiaNYYYVggQlgiknJPck9arDB681HuHqfypdwx1FKMVFWQVa0qs+ee/3fgtF8h5CZ+4PyqaLzEbKSyIO21yKijZc4JHPvUocMy7eh4qjNlyLVdVhjbytTu0A7CVv8av2fjDX4lWP+1riRScBCAxJrLitmnZVVgN5x1/WrtjZT2/2xIyq3BULG4cDjPI+p4x/Ss5z5Y3OjC0FXqqm3a9/wV7Lzey8zoY/iJ4ktf3bOJpOMCWIAj9M1PD8Qb37Sbm7skEoXDMmQM/jWMFMdkkV4RLICQzFslAcHk+tZlyqxSzIJi1qW3RydcelTCbmrl4vDKhV5F5b6NX6PzX9W2Ou1bxHF4h02O5lsICIVYl2jVyq9BjdkZPBP0rlIjZW9xbzI8ELodxYqSM9e3Wrkn2tLa0FptkjdMSDywQx468cDrWJqFtGNRuEgKmNWJ25xtPcfnmpp1OaVjbE4D2NJTv26WWqvo76ru9Onc7F/E63dhbW0EqGZC5csMB9+enYde9YGm3dxpeptMzxrtVgwRgMdccismLeAwIIIGenao25YY5Zj06kmtk7HE6asexWXxE8ONAkc006NtAJeM4zjntWtF4u8P3C7U1WFeONwIrw2KGKaQxJNhsfxITz6UfYZjw0agDqSavmM+RHb+M7m2vPEHnWkySw+UBuU5HesrwWgPjmwX1kOMkDI4qhYQotmu6VAcnIwTVzSxZxaZfXfzfaUfCyjIK/Ss4vUqorRPYzcArk8AfebsK5rW/HumaVG6Wj/AGu66bY+VH1Ned6v4o1TWHP2ifyrf/njGcD86xmZY15OA3Y9a2cr7GUaVtzb1rxXq2tELcTiKHr5UPyr+NYZKomCQFz+NCpdXAY28EjRqfmcLwO3J7V3Wi/DuJUW51a4aVtm8QxdAcZ5ap5W0VzKDMNAvlqQf4RTxn5vlGKVgFaQrjAcgD2pr7UuNjE78A4HuM1za3Ormi0rjh1GKT5ssccZpUDOwUHG44pyqjXMUBLbpPb3x/ShXaHOUFoxhOOc0x1SbhgDjtjIqRgASQ2ev6UyRxFD5xUv82zApJNysNtNaj1OFx14rKusNevWuuCOtY10dt5IcZ46UQ1kKb90cwH9nR/9dTVY96tE/wDErtzt2/vG61Xi2y3AhGct/hW1jC5AWAOKAQW25wD3psnBI79KYwKyAH0osPmRbW1SRdplHPvT5LWOB4Ylm3g9Se1QRkAinT8yxY9aLiUbs1v7FtnQA3oHHOR0qxDo1lDHMVvA5MeCBVSMt07Yq1GMQzkYztrPndzT2SGf2LpsUu43byL1207+y9LJP72QJ7U0MWzyOgoJw2P4alzd7Fugkr3L+m2GmwXu+GSRnWFiCRXN2sVpG+5mL/7LDg10Omn/AEmT2heuWX7g961i3YwnTSlYuXEVtcSZTy4B/dXOKhFmp+7In50zjFAx64NPmYlAcbBwx/eIR6Uo05zyFT8aZ17nNLlh/E350cwchJ/ZoKks+046AU8WKNERJKyhfulV61EJGA4djTvNlGFUnaaOYVizFYW6MxkvxE/YlDk0s8dkZxKtzIRwCAhAJ96rSLLkLJzkZDAc1Yhika385IzLg4dZF+76EUrLuHM+w6OKWWFx9sT7Ow+YFdvzfjTX024DL5eJF6bYvmGPfFPcXEiYlkjSP7qoGHJpY0eBg9vNEjevng//AKqLWGmzTlsnh0qCDeZDEHDhJNqYJzye/wBKxriWyt4grWzzNkE7vkB47DrV65mna2tZXcOzl0cxnO7B7npSB0QtHLboQP8AlnJ1/AdaUdCnJtJditFeQ3NogW1ghkRiTnIDr6Ek1XOqKkbxnT7Y5+6wByPxzV0W1nIx/ciInpzuA/wp0enxSfJbW6SP/eAOafNEfvWMqTVS8CosSwuB96Mfe+uapeaz4zK3I5FdKdF8sI72qRuc8K2WP4VXfS5thAtI9u7JL9atSTM3F7lfT9n2QAnnPBzVnTY5JbO+ihBM0sgRVz1NXYWmtrD5bSxEf3SxPzDP41RtrmcXcaQosErzqY2Xp35pR3Cb0Mi3E19ci3tgN7Dgk4/Ouit/C8Nja/bdTZpjn5Y14GR2J71yIPOQfpz0rTi1q+a1+yTTNNAPmCPzgj0q9jN3Z30d0h0qVFsoIdPMIcrCuACCMFveu2jurb+xIri6aOLdbgDccsDt4JryGLXrefS5bMs8DSIBIQeGx0GKYb+W4mhZZHClVULuzwB3p8zsFrMsnkyZwck9KuXNjPGpvGjKw4VVJXg8DvVFivmNzxuIx6HNaN0N2mLvwT5w5ZuwFYLZnTLpYq2pL3cQ25OeMVs/2XdpqNo4hYnyyT82McmsKBCbpCBnk49DWvdEJqkRHDeVkA96ultqZ4jczZgYpGRhsIJ4zmpUsLnUrPZbRLK3mnIB246fnVUjLnKgMTW1ophSNnkBLq+EI7VnH42aT/hoyOVHl4wQ2DWJeAm7kGec45NbjyKpY5JJbqetYVyQ107FQ2D9096UPiKqu0EWLqNo9KswxUEvIeDnuKgs0c3QkABAz1Psas6iVe0sdqCPmTK4wRyKZYxRm1aQqeM8++DWxzdDKAaRtqKSxA71Jd8XhGCMKox6cUtk/lXKNjpxiku/+P2TPJyKGCHRI7ruVc44pzJI00QCMwzjK+tT2W37LLkn74waGvbkSLapO4gDbvL7A0KKsHM7llWYSbHVhg4PHf0NXIsiC4G0khBkAZ65revblf7MZZ41kXavXhvwNVdD2Ram7RqVj8sY3HPr3qGlc1jUfKzGQkZ3q6/LnkYNS+TMybxC7oBu3L0xWh4ifzdUD5BAQdOlbmntt8OAgA5iyeO1TZXY3UlyI5vTWXzpuelu/wDSuct4HmiVlU4x/Sug00fvbpvS1fn15FQaMc6S2fU9R7GqhsTVfv3MRUZ2CLySKdJG0ThXGCRS2ZzcRAfezVjVDtuUJ5+WnYlSZUwwG4YPHSnoiSMwdthHQnpSxHMEoK846/jTrdkhKSMpZ2baBnp70WDmHxFokyZ0Q9Ng+YketTx+WpYSXfC8qpXG/wCtVbmSSWd97FipwM1ILgxKix4Vh0O2jlByJJkuiR5RZhgEKvv6U+TT7tIy8odnJ27QeR9ahW5ZFZ3lYvUsWqSLIrtF52eqt82D61NmO6ZUWwmEpV0cFeOf8KlGnzLL5T5ZFXLMv6VrNqjeb/pCW5kUckJliPeo7bV/Ok8uPT4fJVdpDHGVo94LR6sktxt8PJcPGQRcGMrEcDBBPXt0rPFwtuRssIScfKZCWJ981pu9nPpsVtaRMltJcGV95xsYAjaD3HNMS2sXl8mNYDIFyzqd+PqeOaXqOJQj1K+aTbGyRnOcKMDHpRfXc7vkF0yACuf1FacljZ5jjS8sgu397kYbPXgVKbC2jB8hYZS2AD5vJ+gxUPRm6fcw4XLH5pMbDxmrFxcwyECNFBA5K5yavzaKFZnLLAXOFWVsZP1qpPo97DyIlkx18o7sCtIyRlO5TMkbRMCGOOm08VNIBcTpPHEY/LATIPJI7/rVOUSR7lYEEjgYqxbJ5iFQ2xs960RgzJmtkIynyn0qKEOiyOV4Axn3qdmLgYK/nUlpbPds8UZUNgu2e4FUSmUAC3TJI61b0+R1v4ArfxdDUThXI24Ud6ksAP7UhwcjJ/lSKWrOgYnzTj++D+Zrp/EPh6XQ9Ktbh7wSLOwYRYyFyua5iFVe4Tf8ybsEUl5dTrDMgkeQMwX52yEx6fhxURV0zWctUi7pNt9t1e0s1YKZmKBieACOtdt/whkUuuSWv9oyCVYQMnG3ByODmvPrVtzBgSDsYjHGOKt5lW+kAuZgyxk53dPlyKcNETW1Yy7hWz1Ce1L7/Jcru9a6jwroMOq6RPdS3awGGRsLuxu4FcgoJzltxPLMepq9ax2htVe5dg6sSm1senWs4fEzWppTRRfOMKc4bBJ71k7Vmv8Ay3YgM2MitR2ThQQcnJxWWdSnt96xiAqCcbogT+dOC1JqO6LmrQsNNs7hY5PIBKlnHzBj/wDqpLSNhpLzGYd/kqS9vrySwsBuQKyliqoOvast7m5iAXcuCDkFOtbWOe5HZQm6nWMNg43ZptxxfSjrjg1NDJKxLhkQgDogqrJOZJju25B6hcZoaKTNvRtPfULeVI5VTDjk/QVSubZ4dW8sqWCyBdw6GtDSrZZNOTLSDzpC3yNjpxj9KguCEuY3RxskwrJvJOQ1NLQi+rOy1nQZ7TSZr83iPGwXEQPIyKzNOtvtLXC+a0OyFWyvLErk4x75qncsJLSUMzEIV4Y9auWYKW1xPlS21VKL1xzUW1NE/dI9e00aTqBtluGuR5Sybz75yK6iz8L+f4VW/OqFC1t5vlAjp6da4u6JNy/LHGPvnn6UDBX5pkAC52AnOf8ACoS1ZUn+7iTWEm9LuQcgWbnOO2RTNG01ptDa9FxgIG/dk9aWwJ8jUG5yLRs56dRWbpzKLQplRgN8q8ZpxQ6r94r6ZE1xfQxjAJBb9KtatbSC8VI0LHyw2B2NZcbMhXaSrdivbitWBybuE72LMoHNVa5nJ2sPl0S5tdG+2s4ZZcAIOoOelUYYXeSGMgghs81ZvLqcTXSCaQKmCMPwD7Cq8UssxgdpZGZjyxb3qrBfUEje5uPKjG52Y/jS3FjOhwRHwOmeat6RF5lzqD+YUeKM7GY4AzkZq1KIJ4HI8uSZQu2QZw3PPPU/jSUSZPUwDHKqkNCw24BPpmnQYIk3AEbD1ODn2rce7dbYre2ocFhsETkHn0PtTDJAIJXkgUKFOHmO9j7EUm7FJFHStPuJE+0LG0uDgkdvb3qe3028mDzG3l8qHsBU1lrMjvsjGFbIjAG0KfoOlXNP1W902PdJqLt5w/1CEjjHb0qG5MtKK3GW0E/9kxLBGCBKSdqZYseePpzRPconm20V0pcn/Vxw7Sx9Dz1zTDfPfaZcXkUzo9pKpQIu3GfWq66nm4knnC+cW3h1GRu9DUpNle70FkCQ7Y5o3jldMFVjy/XnvSXcwhiCW0ZB3DovzZxVi41K6RodRnjiMwPCsvGPY0kd/I+si8VSSfmMaNx0quUXNYrvfSfaGIlmAyCYy3GcCgXG5QfN+4cqDwM/WmXjLcahcTjYCzDKY6VVaMMeMfQUcoXb1Jr+SdgZnLru+8Qc/wD66iimkfejShRkYJFPt5JUeTagkdY22BhkZ7cVsJb3Ebwl44JEd/34MCrgfXNaRRlJmbfQ6XLpI+yRCG5RupP3hVbT4UgeRpCFZ0IUZxjNZ8h3CIRsGI9jSs0s9wGkYBgAM46D6VROoh06UFRmMFunzVf0ywSG+SSWdNig5x64q/NfWVtpqQJDDdygZE6qRsPp9ax7N2M7PgBgCckdaAuzdJthcb45R5aqGbOf50PBbXUccMNzBCZH3MZGYg+3SsqG6PyiXcEONxx1/Crt7qNlIkcVtabiGyZcY/DFOyBtk8aW8ZaL7REXUlOC2G/Spt8Um6dZ0ZG+Vmy3HGPSsG+uPM8tIv3aqcnaepPvVWC6lgztkY98E8Zz6d6nkG2zqAbRVy8oAX2PNRyG1fy1+0fKOxB4pNB1KC+vHi1Z2Kun7oqgC5FWrw6VeXQFtdvAsa7Gygw3vUuCRXO3uUHNoJ963CEAdwcj9KypreNnLiZAXbPQ/wCFad0bQzsYJmbAAPGB9abPFCtksXmSykHduxz9KEhOTHTGAw2yeau+OLHOeay5E8w/NcxfKD2P+FaE6IFjG12ZYcD3+tZhtZVGAh4HrVkak0UEZjB+0ISw6YNAsoi2WJJ9RmnW1pM653JHjjDVa+yzKTm7UcdjQF2PV7dbaG3jdlaLLE4NVxbW4uBKsz7gc8rUluGNzMQ7sAoGVI5/OrDyrHEWZCG/2sf0o3DUVZI3SRDISr4z8tWlvoreGYxbgzFBuK8cVnrfxFdptiOOHzxmrM823TNwQs0hHA6D3paDuxWuLe4bzpS7MxwcDpSiWARsoDEP1cpyB9aow3s0RUi23Adj3qVrp5CzeUygD7oPWoS1HzO1i9BLaxWl1HGJTvgKFiPcVjxLCigiR/u/3fWtW1nE1jqIG7KwnIPbkVmFzsVVbAVcEY59quyC7ZWEVuDxOwOMYxVy1Ns92hlv3giQfeWMNj86qDBkLHnnPSlDguf0+WgNSe5XTnu3WG+mkDnPmPEFJ/AU1fsaCM/aJWK5OQnoaqsR5yjvj6d6lzsVAewPH40CukXLN7aJL7EsrmeLaWCAbahEtum0C+ljRRgqq/epLRwEuOgJC4/OkE8fnGOKIBu8h5pvQa12Lpe2a2jNzNOYEcbQVBLfrVVzayNIxuJgGXG0IOBUeJDC7ud+Xxjrn6Cpzp832VWbZApHG9uT+HWp0G77EdqLK0ClZpixHB8oZFO3W4lRpri64HdASOPrT/8AQrRVHnNPMByFX5R9c81MuuSEgyxQOBjgxAZHpnFK67BqLpiRtpWqpbSyMGjVpC6AEDcMYqvLYRIWkcXad8bFOR+dammixuLPVJI5vs32iLa9uwJ2fMCCp9OMfjUkv2GRYobi6mtp8BUJ+feMdG9Km67DSbMtr62+xfZdsxQjILqv6c8VFBc28dyJkW6BwFyFXHp61uWdtZwv5UtvBcZ6fNyp+hpZrNPtPkz2yxxFcDYcD86TnqV7O6MOXULOa5eQRSLg4OAAT9ac0tsI0YJIxccEAcfrUb2EaahJFGzKFOf3gwWHoKkisSqkELzyOarcV3sRyPAoJ2TqAOqkA/zpbbySHCG4YEc7jn+tMltpUgcsRnHAB61Zs7YLBkgglc+1Uml0Jdy2ugMnIVc+xqQaIwzyvPXPJ/Ctn98Vx5chP+7TsTnpE4/4DXk/WJHHeRh/2GSCBjPsMfnT/wCxWA4C5x6Vs4mxjynz/umkCzA8Rv8A98mk68wvIxxop4OVx3BpDonJ4BB9K2cS7T+6f/vmgiQDPlv/AN8ml7eXcLyMN9BjWJicDAJqKx0VJLKOUhdz5P5Gt6cuLWY7G/1bfwn0qLTiU0y3G1vuZ+77mtPby5SryKC6HCCVXIXORz0p/wDZCHqM+2K1DJg9G/75pd5zwjfXFZ+3l3J94yho0fpj2Ipf7JQdGNahkIPzZHpmkMykc8Gj20u4uaSM0aSgJIdhkYNH9lJj756VpiZAOaTzkz1FHtZdx80jMGkxkcseKT+yIiB8xzWqJkPQil8+Ifwj60/ay7i5pGDa6ZH9vu1DHCMAOOvAq4dNiYYyP++c1NZOn27UCf764/75FXRPGOMDNFStJN6j5pGWNMhGBkkdwyinf2bGVC7jtHYDFaZkGcbetLvT0qfaz7hzsy/7NTHDkfhR/Zsf988jkYrTDrjpShwOoFHtZ9xczM9bFVtpoEk2rKcsQOSPSoBo8ZGBJ9cjmtjdjsKM44wtP20+4czMgaSi/wAefwp39kx5+/8ApWqOT0FKMA8gUvby7i52c+NKgfWRE8qqBBuHy981f/sSI8iWPpzlc0HnxHxj/j3/AK1pYHfB9qupWkrWKcmZ8elQI3LxlT1wg/woGl2jZXy1IJ78cfhV8gdAowetIEG7lVAxxUe2n3HztFMWcNvhLRIo0BOSRuLe+T0qBtNQndJtdv8Aa5rTCjbnaKUqM/dFHtp9wdWTMo6TEe8fvx1pv9kwAD7pz7VsbV7hcVJCuCXKoFHSj29TuTzsyJNOS1029VdvmGMds4G4cmpLPTIt6TbYzhM/MSccVZvGcWNyyquSvzfiQalhCrZh2ChygwPbFW6s+VO5q5PlTMttNjZw5KbskhsYNXobbzh9mm2TKeRvONpqXYMLhV6c09VUEDC/N3zWftp3epKqyTsZsFlBqLSQ3fyyxsY0dhx6gcdqVtHMZOGXrzznPvTtMYyx3QlbJW4IB7ngdavAcYCjFaSrTjKyY5VGZ39mx9Plcd6ctl8mzgJ/dq8FXB+TB9aAo/2qn6xU7kc7KXnzZyshX8aUz3LcmVyfamYYYIK0vzN82Rx2rOwrjxc3IAxI4IqRL28UHEh59qgALZBHFGBnjt70WQczLP8AaV2ON4/KlOp3m3G8flVXcq8EnPpR1/vfShxuh8zJbvU7z7BcDIx5T5wB6Umn390mn2yBxgR/3RVS+40+4yGx5Z/lToAFtYBtOdg7+1Xy+6PmNEaldE8kHHqop39p3JXnZ+QqgwDYDBvwNLsUALhiPc1FkLmZdN9PtywiOf8AZzSC8lYcwRH321S8qJQRsfJ96Uwoqg7H/OlaIe0aLwv22gG3i/75pTeFyd1rHjt8tU1t4sY2OT15NNEUbHGH/Ojlj3D2jLjXK7Qps4vXPNPWeE8mwjYeoJqgtvEjdHP1NSqsYwOQuemaFFApsi0+eH7XqJNoCDMOM+wq6biD/nxQr/vf/XrIsNpmv8tx544P0FXwyR9cYNVVWrG5ssia1LZaxOPZ6US2RPy2L/8Afyq29c5Vxj0o3kdx+VZuIuctNNYplfscm0/7dAlsAv8Ax6SZ/wB+q+9Ccll/Kn7kByjJ+Ipcoc5I0tluwLV8e70oksQebZ+nZ6gLgYAZfypQUOcnmjlFzkzGy2/u4ZM/74qJ/s7AqqyK2f7wpoIJwAoNISVGcL9adhc5S2R/8JE2C+Bbdfxq6UUt99wKoruHiKQ4yfs4+nWr/OR8orWqthyYmFBxmQ/hTSCCOtSbm5AA5pdsgHJFZkkZ3B8jOKGBxz1qTD+xoKOxyBigCLnI4NOVmUbcGpHViBkUNvBGV/HNIQ0xmW2ukZeDET+tRQSs1rCcAHYo5+lTPE32O+wxz5B249ciobVQbOA7c/u1/lWr+BGsvgRIXkBDEKfalWVwynCjmlEe75uhHrTlGCuCevasurM+pl6U7b7zauP9IOT+Aq+zHpuJ49OlU9J27r4lsH7R2+gq+uADkn64rSr8YMaXIQHdn2pN/PU4qQFRx/MUvyKvJqBGQHViflI9KfvQAZDfhW3PpdiZFWG+dS5yfMj+4PzqpLpTAs0V9FITJjgY4queBt7Jmf5yr1zj3NIWQFsoRj7xz0q//Y77BtuY3kJPyFto/OrcelWA8vfqSpIqFpXKZUNnAQc+/X2pqUA9nLoY3mJgYPU4xSeeh42sPfNXZNPKyBFuI5GY4Lr0C1a/s+1tVJnmaYsMKqHjd2oc4JEckuphX8yNps4G4tt6E9KmV4/LTb2Ve/TipL6wllspUjPmPgfePQ56VO2nv5COI4yoClyp6dqtSi4FKJB5q7/mPbtSxzhgMr06mnrbOj58lGHbmpBaXUoBWCM57A9PrUNonkZGW3Hg0zzTtIJGPrU40+8efyorbMjccNgCiTSbtFDFANz+WAGyS1K8eo+SXQiEuTktgnilBO4BSfTOKmGkOsiwtsGeQynOD71ck8MXH2dZmlhLFsDa3H1pc0AVORnjIG4M30xRnc4BfBq0miXUj7Y1Vm3YBDcE4qP7Axu44IGlnkPBRBzuzyKOaIuSSZm6ZtxfMT1n4yOvAq516OD7Gm2mj3lr5wmRoppJ2+TqV4p/2aXaZdshUHBOKqpJOTCUWCqAASVGfXilJfbxtA7H1qMQl2JEjEAZIIqdYDGsIZJE8w/uy/SpZPKMCnBORx1J7UAb+cqKfJB5cW9zhS20Sn7rMKg+RVwJVzQFrE6KzAjK0NEeMRk471Du3cBl+uacm7hdxxnsaLASEDHzIQfamhvl2hMgepprRyAMdrHmmfORtKmkIgjcnX5sDpbjv71e4A5zn2rOQuuuTbQ3+oHb3q+zOCNytitKvQp7BvUnow/Cl3oeAT+NNVgrZGW/pSGZRkbQTWbEPB2niQc+9OZv+mhJ9qYjo5AwowKRpUIz8n40APLEgfNx60Ek8GZSewIpnnRADlFPoDSZjPzFif8AgVOwi4iyfYNQYYJW3JHPuKp2RxaQ4/55jj8KmEinS9RKMy5gx8nPcdaq2xjFrAp4YRryPp3q7e4vU1n/AA0WCHZsgAfU09C7EDpg1AfLYD5mJFSKUI/i3dqza3M+pS0vKG9Of+XjuPYVorO7Zwy/gKytLK774gdJ+x9hV/LYzukXPYLV1viBkolkB+5+lG+TPKVEWXGGdiaC4J2ndu7VmI//2Q==",
"path": "images/5pts_ADE_train_00009847.jpg"
} |
depth_point_149 | images/5pts_ADE_train_00010826.jpg | ADE_train_00010826.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 262 y = 173),Point B is located at (x = 222 y = 125),Point C is located at (x = 103 y = 135),Point D is located at (x = 308 y = 215),Point E is located at (x = 94 y = 182).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_59><DEPTH_22><DEPTH_5><DEPTH_5><DEPTH_6><DEPTH_43><DEPTH_17><DEPTH_67><DEPTH_5><DEPTH_31><DEPTH_46><DEPTH_58><DEPTH_70><DEPTH_38><DEPTH_6><DEPTH_47><DEPTH_51><DEPTH_5><DEPTH_76><DEPTH_66><DEPTH_29><DEPTH_49><DEPTH_58><DEPTH_58><DEPTH_82><DEPTH_47><DEPTH_54><DEPTH_83><DEPTH_58><DEPTH_49><DEPTH_29><DEPTH_49><DEPTH_49><DEPTH_40><DEPTH_40><DEPTH_65><DEPTH_76><DEPTH_38><DEPTH_29><DEPTH_74><DEPTH_74><DEPTH_49><DEPTH_76><DEPTH_75><DEPTH_55><DEPTH_65><DEPTH_37><DEPTH_35><DEPTH_44><DEPTH_36><DEPTH_64><DEPTH_36><DEPTH_36><DEPTH_4><DEPTH_61><DEPTH_47><DEPTH_65><DEPTH_16><DEPTH_83><DEPTH_19><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_69><DEPTH_78><DEPTH_119><DEPTH_12><DEPTH_30><DEPTH_81><DEPTH_44><DEPTH_2><DEPTH_19><DEPTH_16><DEPTH_24><DEPTH_98><DEPTH_119><DEPTH_119><DEPTH_42><DEPTH_1><DEPTH_19><DEPTH_44><DEPTH_78><DEPTH_16><DEPTH_16><DEPTH_94><DEPTH_14><DEPTH_16><DEPTH_42><DEPTH_57><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_END><DEPTH_END>. Since point E has a higher pixel value on the depth map, the answer is that point E is closer to the camera. | E | long | 5 | [
"B",
"A",
"D",
"C",
"E"
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",
"path": "images/5pts_ADE_train_00010826.jpg"
} |
depth_point_150 | images/3pts_ADE_train_00011045.jpg | ADE_train_00011045.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 118 y = 188),Point B is located at (x = 184 y = 178),Point C is located at (x = 16 y = 224).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_45><DEPTH_3><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_78><DEPTH_77><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_58><DEPTH_82><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_78><DEPTH_72><DEPTH_17><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_70><DEPTH_81><DEPTH_82><DEPTH_5><DEPTH_59><DEPTH_29><DEPTH_74><DEPTH_5><DEPTH_70><DEPTH_35><DEPTH_2><DEPTH_72><DEPTH_25><DEPTH_71><DEPTH_67><DEPTH_59><DEPTH_59><DEPTH_35><DEPTH_59><DEPTH_74><DEPTH_76><DEPTH_15><DEPTH_77><DEPTH_77><DEPTH_30><DEPTH_11><DEPTH_11><DEPTH_11><DEPTH_64><DEPTH_77><DEPTH_11><DEPTH_35><DEPTH_80><DEPTH_63><DEPTH_72><DEPTH_29><DEPTH_31><DEPTH_3><DEPTH_72><DEPTH_78><DEPTH_9><DEPTH_83><DEPTH_38><DEPTH_5><DEPTH_62><DEPTH_54><DEPTH_46><DEPTH_54><DEPTH_1><DEPTH_9><DEPTH_2><DEPTH_23><DEPTH_57><DEPTH_55><DEPTH_61><DEPTH_69><DEPTH_66><DEPTH_85><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 3 | [
"B",
"C",
"A"
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"path": "images/3pts_ADE_train_00011045.jpg"
} |
depth_point_151 | images/4pts_ADE_train_00019002.jpg | ADE_train_00019002.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 47 y = 202),Point B is located at (x = 117 y = 195),Point C is located at (x = 100 y = 104),Point D is located at (x = 272 y = 195).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_98><DEPTH_42><DEPTH_64><DEPTH_62><DEPTH_73><DEPTH_44><DEPTH_44><DEPTH_72><DEPTH_9><DEPTH_73><DEPTH_42><DEPTH_14><DEPTH_63><DEPTH_75><DEPTH_17><DEPTH_76><DEPTH_78><DEPTH_72><DEPTH_63><DEPTH_75><DEPTH_42><DEPTH_14><DEPTH_45><DEPTH_75><DEPTH_17><DEPTH_45><DEPTH_19><DEPTH_58><DEPTH_68><DEPTH_77><DEPTH_119><DEPTH_14><DEPTH_77><DEPTH_56><DEPTH_17><DEPTH_69><DEPTH_84><DEPTH_81><DEPTH_11><DEPTH_31><DEPTH_24><DEPTH_55><DEPTH_17><DEPTH_5><DEPTH_31><DEPTH_67><DEPTH_70><DEPTH_30><DEPTH_70><DEPTH_35><DEPTH_8><DEPTH_55><DEPTH_20><DEPTH_20><DEPTH_36><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_35><DEPTH_84><DEPTH_121><DEPTH_55><DEPTH_20><DEPTH_59><DEPTH_59><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_36><DEPTH_58><DEPTH_16><DEPTH_55><DEPTH_75><DEPTH_40><DEPTH_35><DEPTH_66><DEPTH_44><DEPTH_25><DEPTH_78><DEPTH_29><DEPTH_94><DEPTH_14><DEPTH_75><DEPTH_40><DEPTH_59><DEPTH_40><DEPTH_44><DEPTH_63><DEPTH_77><DEPTH_3><DEPTH_94><DEPTH_39><DEPTH_35><DEPTH_70><DEPTH_70><DEPTH_67><DEPTH_40><DEPTH_85><DEPTH_35><DEPTH_5><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 4 | [
"B",
"D",
"C",
"A"
] | <DEPTH_START><DEPTH_98><DEPTH_42><DEPTH_64><DEPTH_62><DEPTH_73><DEPTH_44><DEPTH_44><DEPTH_72><DEPTH_9><DEPTH_73><DEPTH_42><DEPTH_14><DEPTH_63><DEPTH_75><DEPTH_17><DEPTH_76><DEPTH_78><DEPTH_72><DEPTH_63><DEPTH_75><DEPTH_42><DEPTH_14><DEPTH_45><DEPTH_75><DEPTH_17><DEPTH_45><DEPTH_19><DEPTH_58><DEPTH_68><DEPTH_77><DEPTH_119><DEPTH_14><DEPTH_77><DEPTH_56><DEPTH_17><DEPTH_69><DEPTH_84><DEPTH_81><DEPTH_11><DEPTH_31><DEPTH_24><DEPTH_55><DEPTH_17><DEPTH_5><DEPTH_31><DEPTH_67><DEPTH_70><DEPTH_30><DEPTH_70><DEPTH_35><DEPTH_8><DEPTH_55><DEPTH_20><DEPTH_20><DEPTH_36><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_35><DEPTH_84><DEPTH_121><DEPTH_55><DEPTH_20><DEPTH_59><DEPTH_59><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_36><DEPTH_58><DEPTH_16><DEPTH_55><DEPTH_75><DEPTH_40><DEPTH_35><DEPTH_66><DEPTH_44><DEPTH_25><DEPTH_78><DEPTH_29><DEPTH_94><DEPTH_14><DEPTH_75><DEPTH_40><DEPTH_59><DEPTH_40><DEPTH_44><DEPTH_63><DEPTH_77><DEPTH_3><DEPTH_94><DEPTH_39><DEPTH_35><DEPTH_70><DEPTH_70><DEPTH_67><DEPTH_40><DEPTH_85><DEPTH_35><DEPTH_5><DEPTH_END> | 47 | 202 | 117 | 195 | 100 | 104 | 272 | 195 | null | null | 184 | 4 | 78 | 25 | null | {
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"path": "images/4pts_ADE_train_00019002.jpg"
} |
depth_point_152 | images/5pts_ADE_train_00000753.jpg | ADE_train_00000753.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 148 y = 95),Point B is located at (x = 20 y = 140),Point C is located at (x = 263 y = 182),Point D is located at (x = 208 y = 212),Point E is located at (x = 229 y = 217).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_64><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_31><DEPTH_29><DEPTH_29><DEPTH_74><DEPTH_74><DEPTH_49><DEPTH_31><DEPTH_49><DEPTH_29><DEPTH_74><DEPTH_31><DEPTH_3><DEPTH_3><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_49><DEPTH_38><DEPTH_63><DEPTH_64><DEPTH_29><DEPTH_49><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_49><DEPTH_82><DEPTH_36><DEPTH_7><DEPTH_6><DEPTH_31><DEPTH_31><DEPTH_36><DEPTH_15><DEPTH_67><DEPTH_22><DEPTH_29><DEPTH_15><DEPTH_49><DEPTH_11><DEPTH_70><DEPTH_69><DEPTH_82><DEPTH_49><DEPTH_60><DEPTH_70><DEPTH_20><DEPTH_73><DEPTH_44><DEPTH_45><DEPTH_31><DEPTH_29><DEPTH_11><DEPTH_31><DEPTH_85><DEPTH_69><DEPTH_98><DEPTH_25><DEPTH_59><DEPTH_69><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_2><DEPTH_55><DEPTH_46><DEPTH_19><DEPTH_25><DEPTH_44><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_64><DEPTH_72><DEPTH_50><DEPTH_42><DEPTH_18><DEPTH_71><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_2><DEPTH_76><DEPTH_78><DEPTH_12><DEPTH_58><DEPTH_END><DEPTH_END>. Since point E has a higher pixel value on the depth map, the answer is that point E is closer to the camera. | E | long | 5 | [
"A",
"B",
"C",
"D",
"E"
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"path": "images/5pts_ADE_train_00000753.jpg"
} |
depth_point_153 | images/5pts_ADE_train_00011007.jpg | ADE_train_00011007.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 131 y = 97),Point B is located at (x = 30 y = 224),Point C is located at (x = 51 y = 214),Point D is located at (x = 155 y = 205),Point E is located at (x = 308 y = 187).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_44><DEPTH_74><DEPTH_29><DEPTH_29><DEPTH_69><DEPTH_29><DEPTH_36><DEPTH_31><DEPTH_5><DEPTH_59><DEPTH_82><DEPTH_3><DEPTH_31><DEPTH_31><DEPTH_30><DEPTH_72><DEPTH_31><DEPTH_40><DEPTH_67><DEPTH_59><DEPTH_31><DEPTH_3><DEPTH_31><DEPTH_3><DEPTH_30><DEPTH_75><DEPTH_60><DEPTH_59><DEPTH_29><DEPTH_31><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_67><DEPTH_30><DEPTH_73><DEPTH_59><DEPTH_30><DEPTH_59><DEPTH_11><DEPTH_59><DEPTH_3><DEPTH_59><DEPTH_70><DEPTH_60><DEPTH_11><DEPTH_70><DEPTH_30><DEPTH_59><DEPTH_35><DEPTH_70><DEPTH_67><DEPTH_30><DEPTH_59><DEPTH_66><DEPTH_14><DEPTH_81><DEPTH_23><DEPTH_61><DEPTH_37><DEPTH_27><DEPTH_46><DEPTH_12><DEPTH_36><DEPTH_35><DEPTH_56><DEPTH_77><DEPTH_77><DEPTH_60><DEPTH_62><DEPTH_74><DEPTH_58><DEPTH_40><DEPTH_5><DEPTH_47><DEPTH_47><DEPTH_0><DEPTH_52><DEPTH_55><DEPTH_18><DEPTH_44><DEPTH_72><DEPTH_27><DEPTH_14><DEPTH_57><DEPTH_98><DEPTH_23><DEPTH_61><DEPTH_65><DEPTH_65><DEPTH_54><DEPTH_46><DEPTH_98><DEPTH_65><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 5 | [
"A",
"E",
"D",
"B",
"C"
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",
"path": "images/5pts_ADE_train_00011007.jpg"
} |
depth_point_154 | images/5pts_ADE_train_00002806.jpg | ADE_train_00002806.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 307 y = 164),Point B is located at (x = 121 y = 102),Point C is located at (x = 261 y = 168),Point D is located at (x = 293 y = 139),Point E is located at (x = 319 y = 135).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_44><DEPTH_29><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_31><DEPTH_49><DEPTH_59><DEPTH_69><DEPTH_98><DEPTH_74><DEPTH_74><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_31><DEPTH_40><DEPTH_70><DEPTH_47><DEPTH_74><DEPTH_74><DEPTH_70><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_31><DEPTH_11><DEPTH_47><DEPTH_69><DEPTH_49><DEPTH_60><DEPTH_17><DEPTH_59><DEPTH_3><DEPTH_70><DEPTH_67><DEPTH_59><DEPTH_47><DEPTH_15><DEPTH_74><DEPTH_35><DEPTH_11><DEPTH_31><DEPTH_77><DEPTH_59><DEPTH_85><DEPTH_30><DEPTH_98><DEPTH_41><DEPTH_35><DEPTH_7><DEPTH_70><DEPTH_19><DEPTH_45><DEPTH_62><DEPTH_38><DEPTH_66><DEPTH_55><DEPTH_85><DEPTH_27><DEPTH_40><DEPTH_30><DEPTH_31><DEPTH_38><DEPTH_20><DEPTH_22><DEPTH_29><DEPTH_42><DEPTH_15><DEPTH_0><DEPTH_40><DEPTH_82><DEPTH_72><DEPTH_69><DEPTH_58><DEPTH_72><DEPTH_82><DEPTH_42><DEPTH_46><DEPTH_30><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_29><DEPTH_81><DEPTH_94><DEPTH_36><DEPTH_64><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_44><DEPTH_69><DEPTH_0><DEPTH_END><DEPTH_END>. Since point E has a higher pixel value on the depth map, the answer is that point E is closer to the camera. | E | long | 5 | [
"B",
"D",
"C",
"A",
"E"
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",
"path": "images/5pts_ADE_train_00002806.jpg"
} |
depth_point_155 | images/4pts_ADE_train_00003931.jpg | ADE_train_00003931.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 73 y = 144),Point B is located at (x = 204 y = 95),Point C is located at (x = 257 y = 117),Point D is located at (x = 183 y = 171).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_70><DEPTH_3><DEPTH_59><DEPTH_31><DEPTH_3><DEPTH_26><DEPTH_18><DEPTH_18><DEPTH_55><DEPTH_98><DEPTH_70><DEPTH_31><DEPTH_5><DEPTH_70><DEPTH_22><DEPTH_22><DEPTH_65><DEPTH_65><DEPTH_119><DEPTH_18><DEPTH_67><DEPTH_3><DEPTH_67><DEPTH_59><DEPTH_5><DEPTH_22><DEPTH_119><DEPTH_121><DEPTH_12><DEPTH_18><DEPTH_11><DEPTH_11><DEPTH_67><DEPTH_5><DEPTH_31><DEPTH_13><DEPTH_119><DEPTH_121><DEPTH_12><DEPTH_18><DEPTH_59><DEPTH_35><DEPTH_67><DEPTH_5><DEPTH_11><DEPTH_11><DEPTH_119><DEPTH_42><DEPTH_23><DEPTH_55><DEPTH_64><DEPTH_27><DEPTH_60><DEPTH_40><DEPTH_70><DEPTH_64><DEPTH_16><DEPTH_121><DEPTH_24><DEPTH_55><DEPTH_39><DEPTH_57><DEPTH_72><DEPTH_29><DEPTH_40><DEPTH_77><DEPTH_47><DEPTH_121><DEPTH_24><DEPTH_55><DEPTH_42><DEPTH_19><DEPTH_69><DEPTH_64><DEPTH_64><DEPTH_29><DEPTH_65><DEPTH_16><DEPTH_24><DEPTH_55><DEPTH_23><DEPTH_74><DEPTH_36><DEPTH_25><DEPTH_76><DEPTH_29><DEPTH_121><DEPTH_94><DEPTH_46><DEPTH_94><DEPTH_78><DEPTH_74><DEPTH_25><DEPTH_25><DEPTH_64><DEPTH_36><DEPTH_32><DEPTH_39><DEPTH_84><DEPTH_1><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 4 | [
"A",
"D",
"B",
"C"
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",
"path": "images/4pts_ADE_train_00003931.jpg"
} |
depth_point_156 | images/3pts_ADE_train_00010400.jpg | ADE_train_00010400.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 226 y = 153),Point B is located at (x = 51 y = 211),Point C is located at (x = 152 y = 222).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_1><DEPTH_78><DEPTH_66><DEPTH_19><DEPTH_66><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_0><DEPTH_2><DEPTH_78><DEPTH_45><DEPTH_31><DEPTH_76><DEPTH_66><DEPTH_49><DEPTH_64><DEPTH_36><DEPTH_76><DEPTH_29><DEPTH_70><DEPTH_68><DEPTH_36><DEPTH_0><DEPTH_0><DEPTH_31><DEPTH_70><DEPTH_60><DEPTH_35><DEPTH_59><DEPTH_36><DEPTH_43><DEPTH_22><DEPTH_67><DEPTH_73><DEPTH_75><DEPTH_30><DEPTH_59><DEPTH_11><DEPTH_29><DEPTH_74><DEPTH_69><DEPTH_31><DEPTH_83><DEPTH_17><DEPTH_67><DEPTH_69><DEPTH_59><DEPTH_35><DEPTH_59><DEPTH_49><DEPTH_59><DEPTH_22><DEPTH_82><DEPTH_60><DEPTH_83><DEPTH_3><DEPTH_49><DEPTH_38><DEPTH_60><DEPTH_60><DEPTH_84><DEPTH_69><DEPTH_33><DEPTH_57><DEPTH_1><DEPTH_67><DEPTH_59><DEPTH_74><DEPTH_2><DEPTH_42><DEPTH_42><DEPTH_98><DEPTH_42><DEPTH_33><DEPTH_76><DEPTH_70><DEPTH_59><DEPTH_30><DEPTH_39><DEPTH_23><DEPTH_119><DEPTH_98><DEPTH_0><DEPTH_19><DEPTH_49><DEPTH_49><DEPTH_74><DEPTH_3><DEPTH_63><DEPTH_19><DEPTH_42><DEPTH_16><DEPTH_45><DEPTH_69><DEPTH_59><DEPTH_74><DEPTH_74><DEPTH_49><DEPTH_38><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"A",
"B",
"C"
] | <DEPTH_START><DEPTH_1><DEPTH_78><DEPTH_66><DEPTH_19><DEPTH_66><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_0><DEPTH_2><DEPTH_78><DEPTH_45><DEPTH_31><DEPTH_76><DEPTH_66><DEPTH_49><DEPTH_64><DEPTH_36><DEPTH_76><DEPTH_29><DEPTH_70><DEPTH_68><DEPTH_36><DEPTH_0><DEPTH_0><DEPTH_31><DEPTH_70><DEPTH_60><DEPTH_35><DEPTH_59><DEPTH_36><DEPTH_43><DEPTH_22><DEPTH_67><DEPTH_73><DEPTH_75><DEPTH_30><DEPTH_59><DEPTH_11><DEPTH_29><DEPTH_74><DEPTH_69><DEPTH_31><DEPTH_83><DEPTH_17><DEPTH_67><DEPTH_69><DEPTH_59><DEPTH_35><DEPTH_59><DEPTH_49><DEPTH_59><DEPTH_22><DEPTH_82><DEPTH_60><DEPTH_83><DEPTH_3><DEPTH_49><DEPTH_38><DEPTH_60><DEPTH_60><DEPTH_84><DEPTH_69><DEPTH_33><DEPTH_57><DEPTH_1><DEPTH_67><DEPTH_59><DEPTH_74><DEPTH_2><DEPTH_42><DEPTH_42><DEPTH_98><DEPTH_42><DEPTH_33><DEPTH_76><DEPTH_70><DEPTH_59><DEPTH_30><DEPTH_39><DEPTH_23><DEPTH_119><DEPTH_98><DEPTH_0><DEPTH_19><DEPTH_49><DEPTH_49><DEPTH_74><DEPTH_3><DEPTH_63><DEPTH_19><DEPTH_42><DEPTH_16><DEPTH_45><DEPTH_69><DEPTH_59><DEPTH_74><DEPTH_74><DEPTH_49><DEPTH_38><DEPTH_END> | 226 | 153 | 51 | 211 | 152 | 222 | null | null | null | null | 21 | 56 | 129 | null | null | {
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"path": "images/3pts_ADE_train_00010400.jpg"
} |
depth_point_157 | images/3pts_ADE_train_00010301.jpg | ADE_train_00010301.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 286 y = 139),Point B is located at (x = 52 y = 118),Point C is located at (x = 214 y = 144).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_1><DEPTH_25><DEPTH_29><DEPTH_49><DEPTH_44><DEPTH_81><DEPTH_29><DEPTH_29><DEPTH_49><DEPTH_2><DEPTH_41><DEPTH_44><DEPTH_74><DEPTH_67><DEPTH_70><DEPTH_59><DEPTH_67><DEPTH_36><DEPTH_49><DEPTH_25><DEPTH_66><DEPTH_44><DEPTH_74><DEPTH_17><DEPTH_70><DEPTH_59><DEPTH_67><DEPTH_69><DEPTH_29><DEPTH_25><DEPTH_1><DEPTH_25><DEPTH_76><DEPTH_5><DEPTH_3><DEPTH_59><DEPTH_38><DEPTH_58><DEPTH_31><DEPTH_9><DEPTH_58><DEPTH_84><DEPTH_73><DEPTH_20><DEPTH_70><DEPTH_59><DEPTH_11><DEPTH_72><DEPTH_49><DEPTH_77><DEPTH_3><DEPTH_30><DEPTH_67><DEPTH_30><DEPTH_59><DEPTH_70><DEPTH_38><DEPTH_69><DEPTH_40><DEPTH_30><DEPTH_41><DEPTH_74><DEPTH_66><DEPTH_41><DEPTH_59><DEPTH_70><DEPTH_11><DEPTH_64><DEPTH_40><DEPTH_78><DEPTH_0><DEPTH_94><DEPTH_0><DEPTH_40><DEPTH_35><DEPTH_5><DEPTH_30><DEPTH_72><DEPTH_1><DEPTH_9><DEPTH_8><DEPTH_57><DEPTH_76><DEPTH_40><DEPTH_70><DEPTH_59><DEPTH_70><DEPTH_11><DEPTH_58><DEPTH_42><DEPTH_16><DEPTH_25><DEPTH_29><DEPTH_35><DEPTH_70><DEPTH_3><DEPTH_70><DEPTH_5><DEPTH_69><DEPTH_9><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 3 | [
"C",
"A",
"B"
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"path": "images/3pts_ADE_train_00010301.jpg"
} |
depth_point_158 | images/3pts_ADE_train_00013507.jpg | ADE_train_00013507.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 65 y = 182),Point B is located at (x = 173 y = 148),Point C is located at (x = 268 y = 217).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_29><DEPTH_36><DEPTH_64><DEPTH_66><DEPTH_1><DEPTH_58><DEPTH_19><DEPTH_57><DEPTH_1><DEPTH_2><DEPTH_49><DEPTH_36><DEPTH_31><DEPTH_44><DEPTH_19><DEPTH_50><DEPTH_44><DEPTH_1><DEPTH_39><DEPTH_44><DEPTH_74><DEPTH_29><DEPTH_29><DEPTH_31><DEPTH_32><DEPTH_50><DEPTH_76><DEPTH_1><DEPTH_78><DEPTH_45><DEPTH_31><DEPTH_49><DEPTH_31><DEPTH_67><DEPTH_58><DEPTH_41><DEPTH_85><DEPTH_0><DEPTH_82><DEPTH_27><DEPTH_59><DEPTH_31><DEPTH_31><DEPTH_6><DEPTH_69><DEPTH_39><DEPTH_83><DEPTH_2><DEPTH_0><DEPTH_19><DEPTH_3><DEPTH_29><DEPTH_3><DEPTH_5><DEPTH_30><DEPTH_27><DEPTH_29><DEPTH_2><DEPTH_66><DEPTH_30><DEPTH_29><DEPTH_40><DEPTH_29><DEPTH_67><DEPTH_72><DEPTH_25><DEPTH_64><DEPTH_41><DEPTH_41><DEPTH_25><DEPTH_0><DEPTH_58><DEPTH_31><DEPTH_31><DEPTH_76><DEPTH_69><DEPTH_32><DEPTH_57><DEPTH_19><DEPTH_25><DEPTH_0><DEPTH_66><DEPTH_3><DEPTH_36><DEPTH_58><DEPTH_45><DEPTH_16><DEPTH_98><DEPTH_57><DEPTH_39><DEPTH_94><DEPTH_41><DEPTH_30><DEPTH_69><DEPTH_64><DEPTH_25><DEPTH_94><DEPTH_121><DEPTH_121><DEPTH_1><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"A",
"B",
"C"
] | <DEPTH_START><DEPTH_29><DEPTH_36><DEPTH_64><DEPTH_66><DEPTH_1><DEPTH_58><DEPTH_19><DEPTH_57><DEPTH_1><DEPTH_2><DEPTH_49><DEPTH_36><DEPTH_31><DEPTH_44><DEPTH_19><DEPTH_50><DEPTH_44><DEPTH_1><DEPTH_39><DEPTH_44><DEPTH_74><DEPTH_29><DEPTH_29><DEPTH_31><DEPTH_32><DEPTH_50><DEPTH_76><DEPTH_1><DEPTH_78><DEPTH_45><DEPTH_31><DEPTH_49><DEPTH_31><DEPTH_67><DEPTH_58><DEPTH_41><DEPTH_85><DEPTH_0><DEPTH_82><DEPTH_27><DEPTH_59><DEPTH_31><DEPTH_31><DEPTH_6><DEPTH_69><DEPTH_39><DEPTH_83><DEPTH_2><DEPTH_0><DEPTH_19><DEPTH_3><DEPTH_29><DEPTH_3><DEPTH_5><DEPTH_30><DEPTH_27><DEPTH_29><DEPTH_2><DEPTH_66><DEPTH_30><DEPTH_29><DEPTH_40><DEPTH_29><DEPTH_67><DEPTH_72><DEPTH_25><DEPTH_64><DEPTH_41><DEPTH_41><DEPTH_25><DEPTH_0><DEPTH_58><DEPTH_31><DEPTH_31><DEPTH_76><DEPTH_69><DEPTH_32><DEPTH_57><DEPTH_19><DEPTH_25><DEPTH_0><DEPTH_66><DEPTH_3><DEPTH_36><DEPTH_58><DEPTH_45><DEPTH_16><DEPTH_98><DEPTH_57><DEPTH_39><DEPTH_94><DEPTH_41><DEPTH_30><DEPTH_69><DEPTH_64><DEPTH_25><DEPTH_94><DEPTH_121><DEPTH_121><DEPTH_1><DEPTH_END> | 65 | 182 | 173 | 148 | 268 | 217 | null | null | null | null | 30 | 93 | 149 | null | null | {
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1urEqWBcgg5POKmMN9b3rbrQ/KowQ4AA78ZqEy2iSsYJJvMkXrnaoPUj2qWW5DRxq8+GC4LZJJrLcQ8GYW6zYDxSMdwX06U62iiY72HKq3lAk/exmqIeSKJVikLAE4Q96txtJI8UPk4PRVQ559zSYiee48+1t+IwwHzFQVOc00eWRv3GNc4VpGJ+bso/Gorubyb+yTYTKJwm09CeMVJdSO7xKYoyYXJZQTwazsNFiQxPCnlxgyY/eP3zUFzefZo42izcE5HlscdaqwyzPqEgORj7oP8WavWqR3V2n2lNxiyAi8YNOxUiNbwQG5h5URIJ2brhc4IHr1phiks5ruEuwtXlDxbQASDkgjvirMMYhvmvZnXH2cwCNRkHJHP6VBqyznUUlETi2eMKkrHuBVPsF7laS5MMrwq5YMCysDnOetQMSLlRtyVUHAXAHHrUFvdwpfec5UyBMbAOBkjmrCyRHUWt3ky7/AHAv8XHArWESokttNGt1NdAh0ZcbCuAh6VWJSZRFKmDuJDA8nNWNMtru30m5W8t/IVN8qlmBzhj61nXN5ax6lJMsjuHEZComdowM/wBabEPlSQhQAqyev0rKlspI9VlBhZ4g292zxjAzW3PBFqsfnWExZN24r0Kjpj9Kz438y+1aFSflRIwNx4zxUoRbtokKWlwigMuXVehPoP0oWJp7ozqmJg24ru6H3ppfyYLSOTYAHAjweWFTu8aPLg43Hn1FDYmOvWiklgLYJkmY5z0zSxeXBLuVRuB9M1XvbWSNbeN0XJG7INS2qlx5YGCB19a6bFM0L+4WW281IgoAwQOATWXBG0keZQoY/dwcAVO8jLH5ZOVJxjHemlPujjAqWrGYhKRoy55PAApSVSEliAMde4qoBKzmSPBRHwc1qiRkPEaMNuWDClcCnM5Hl4f5dvSoy3nyhAcjGelOluBJIDIAGxgbRxQsykrtG1l6kCgCaNgZl55HAB4FWrizaVE89lhwB/qxjdVFZgwCgAtnOa1TKJbApKCA0gGaLgQQl7WMxqdw3ZcDkEVJc2sJg862cPADuzu+6ff0qtcbPNMSFgueCtKLh7ORJICoUckFflP1HekBWbCXKPlg3oDnNbCLM8J+7+9xkfxVm/bxfCWW5tljcD5Tb9D7kc1YtIXW2WR2YOVBQdyMikwLF3H51s1vLjawwxK5KnsK5jSjJYzTQysQolO1T0b04rpL5ZJPPhDjaxByWAwaq6tpkX2JLkSYvogNiJyGHQk/hmqUugyO7hndxIkhEgIGxeRVaVyLkvGgwF+bjvVvTLmIzBy5ADj5jzk4FJeBZ3Z0yg3HIA6j1pvcaJfDmpLomvx3AQujqQy9smuo8ZW1ta6cl5abVYTASkqMhWxmuDJ+QgMRID8mR3ruYr+38U6Zi7Xyn8vynA/vDoTWcoa3GzhreSN7seSrSbVPJIBIqN3Y3S+YqLJjaR7DpRa2s0TsoTMyOYsD09ajaN0kMbAEq33881UQRYt1tv7SVLiSSKJlKeZGMnd2H0OKt63qY1DSobBHWPVrd1MiesYHGD+VU2by2SVj8wdSoHcd66DVJYvOexksoUG4Seeoy+7rjPpUzB7mdHdSLGzSLGPMXlMA7R6ikElu4VQWLYyD5Rqu11Gtx+8OS0hK7RkZJ6fSrRkkR5ZCV6bSAOg9azbsSySWIsysyFcjrjFRrOtjNGsTsGY/eqqLl54Q4mcqDwMdcVrW7QfZ9zqCsow24crUuQgb7PJe2aGUs/nby3U54xSDEmAZV3u5JI6nmlGnQyXK3saklchNrd8daj0+yFvGqRAyvncxYc5z2rO4Lcia3ia/tS8koG45Yegp0Qm06OK7RWZZRnc9WJY1hsb2dsb4kZlG7pWZZyzz2UXmSh4lQbQGzimWzUguoJNPnw2fILEoOgGR1pl5erdX8MEE6eWg3cZwOKZYLbtpdzGgP2ln3SccEHtVSJRY3Ei4+coF5Xj86trUlmXeWjJqrszMEkwqspHPFaQdnkMSRKpFsUEowWH096x0uBPq1xLIPlB4QHOCOCa00Vd7QWcT7mZGGepJH8ua0vY0WxDodv5Wm3lx51zdSzAwstyThVX5uB+FKIoEuZJJS3lywBVQLx+Yq/qNvcadFa2dwPKnlmZmWMbgRtPHFGpSJd2atJbpGp/cpGmQQcYzTZLRU0qKezUTWaieeNgUWTgOc8KfWrcllHqYutZVFivHBGpW8Zx5eO4HtTYbCbT7WGa3njmhmuFiZWzvRhjHHbmk8P6lKniW9tpI0i8s7JpO0in1z1PtQkCRk6fFYX+sqyySE7xIQW4QDpitC5cAtOqDLvwW6YqzcW66Vf3FsRCFn/493XGXB6/T6VTu4FlgAy22E4OO9RIGiBjdtdWyzcgk4+lWh8jZU4wcCqe9nmgUZ3JlcmtKDRb+4dEjiR88g+ZiulIGxnlmRQ2cENmmF3Lnaw4rTj8Paztc/ZotvTPm81nPaPaymKdAJ+wByDRJECHMhUtxt+YBejfWnXEzBtrH94wyoFKd/lMF78MB1H0qFkltNpUMzYwpPUCpVgGorO2SPnxjFTTEDaGjAI7jvUH2mZABNCrKTnjrUkpWdFe1VlJOCsjUAMAyMxrg5q3C832ZlcfIHDMagmt2gmCPG2SM5U5FPVwkTb2f/cVeTSsA0kPEj7yNhytRs8zIsZCFsALg8nNa1rpy6jbjDzRLj52aLCqPzqt5MVkyvd3az7MMscSdR2yexosMhgWQXC20ySBunykYx+Vak0E9tBGrYMY4znkCpIbpJjut7QB3GCxfoPfim+XCySiTzC6tgujcdalsRFLNHHCxcjYVGdw5JpsEz2d1HIkSASJwWOeMVJPOruIkdgSu0MefxqK4ghIhiMjkyDBKcY/GhgVtTtVtLkEF2tpAGZlHQmqkMjgmWR/9W2Avqtbn2E3Ma6de3IMbKWQxjBAHIJP4VzgLpv27Ttbbz0IFaRldFJli+uUSeNbjCSsu4Ko/hqxpWo/2XfrLnMMmAQemT0qPUrM3Fil5G6mcYQjtz71ViEcsZjlzuHAAPHHvQ9Rs09ZZ9N1drmJMGePLN2DVgWzbySGJ+b5s1r39y17oDwujNPCwKuD2+lYiNsk8w/LG33u/NCRSLd3gxholO9GGWPpmtq4vprq7EqsrRMvIxyOKxmMhVlYAx7dwYcZ/Ct3w9p76zaC5jV9iR/KRwC2R1NZzT6CkjAtmnnuHgRFCx8ZPXOa05ikSbU/1xG189KravBHoesPb3O1rpeZSnOWbkU6FWubQSFSrBtxHQ4z6VndvRkakTqjRoWyrBuAKstJukh8mEuyupcZ4IrVtNIs7xZ7kpdTLEoPyHIc9OB9aht7COEQz2pkiEpORN8pOCcjHrxScdAaNAXEszTBYooYkG4D14qo0zQnhUWRx8+Aeg54/OopnkWeJYpEl3yBZcnG1fapdRhaNzKHBeAkWpbpkj+L+lZ2ElYW2zNBNm3YpNkSkjoP9mqJVbWKcW4yiMAquQCR3rQgZn227XJEsabZsLxk+lVNQSG0im2lpPMfbjFUo9BiWGqqYfLtIoo7koS+9cg49/wAaia4hedZ7tpGaPDrEB8pP19KoWU8KvcRZYOIyCT3HHAq1Z6VbahcxwLM0aKispfvj1/CnFWY0YUmpLJqV1dSRtB58zMqIuerdq6m10+4e3s5REhnmDbBIf7p4z+AqHUnsNEtX1aCCN7dZxawoR8zOed304NV5Z0e4mnEr/OVMJ7lxjoOwzWxstivqLzzTwxu6r5DlkAyp3Z5Bzn3q9p+o6ppt7csIrf548qSwbYvr9azdXutQlukOoxRSy5yZNuO3dun6VF5li8ETtbXAEmVOJh1/KhkFi91x7pohK8ZkjOcMm3dn+tLdR3Go+JLaONYhBFKhnRBgqOOc96qQyW8q+XbWrCQZwbg7v8KqNqMrXcW/TYHvc+TC4yvJ6ZHfrTixHb2V4mt2LpJbBfssgaJwvzLz0J98Vi3klxHJLLCiMUJMgfjZitTSrKRNI1J43Mr+SW2qOn+7Ud/5arbzNEfOmXdOvZXHUD9KmoFrnNS3RcwrGclepHerFtLPI4XzJtqjBKtjFVni/eqI1C46kVcQRW08TzsQuc9OG+tbSdiWXoYrlxGgafyedxZvvVdhhwkjheV4B3ZNQiVZTuE23ByqgY49KqTXUyK+07Oe1RdsksouN0jfK46H/wCtUDMVfejZkJ7/AOFUZLp5WUM/vmpRcEYLLyBw3rSAnaNLmF3YHeDgn1qubRYiwjBHoGOd1PQtswXPPJqUMGeNuTtU4HrTTaArwXEgjMyqA44AzmtptUvF08kybORgIMZrHjt2WPzMAKuSMdzU0TC8t0gQFnaVfmB5X2ouMbJGlxcOLibMuP8Alpyc0nyz4+WRQSTIR0PpilnLvqJLFsO/O5ewqRCIZzE+TtzgE8CpbYGhYySB0jRdnbOMjFTvMiGQAgk5yAMCqkcgiVMO28nOe2Kna4XZkxKGxgn1pCK1oVuZZEJC7umD096uWwZ4JoGXjO3DHn65quoihiZwEDk5D+lWxI78bgrMow4HSktdwLFxuFvHtdTxsAIx8o6j881z1/bGNvN2hCf4e2PWtC4eVpD5irEjD5SDyPfFOt7W51GeNXdmPPAH8IFVEcUYtvOyxzWcsW+JwWxu6HHWobZkiBjlO1SdynHerMlhcaZdtbXqSJMQZE3DG5DwD+lZ0yyMRsycnBz2rZGhqwTbJPtOAzbSpFZot57bR0vGChhcfdx0FXJWit55rdB8gAyfeoZFlMZszlkI3j8KTQx1w63E7SADDNivRvh/cy6f4BBjtlm23cgbLYwm7r07V5woUxABegxn1NdH4evtSm0++0jS5niliYXDFGwfLwd36kUrlWuHiu9iufEg1GOELG4EaPu4kC9G6e1ZlvGmpf2hMZfIuIog6sw3CTDDIHTnFafihku/D+n3yXgkEMqwyAJgjj7xb9Me9ZVpcQw3vz7SiKV2fwrnuPesbambdmbtp4biubSzln1CO2tZ1NxECNrb1zkbs+2elbPiXXYri0s9Hsomu1VkNzNEm4pHxyD2rk9av2uIILSO6ilt4j5kTAkiMY+Ye2eR+NQac0flTX28K8i7fLK8yqOik+lVJqwNoku3is7qJY5yWeYrskHKpxg1fvdNaS6S7luo3UqHWNT1x2NU5nSQwzvDDFIF/wBUDgj0xx1ogZpdTthNMTtcG4y2flHIX61zdSG0QScyzAod0nQg424qGO3Esz7Uk3sd4O7OPbFS3EpTUbtyrOjfc4xhafbTsZAgyhA49xWiC5krGEtQt2rqxcshYYOfT3q8DJHqmXIZUQLIi9jj/GonuQ00EdwgKKxDb+akae0uLq4yxUmMyb+pPcbaeo0ZVrdXV9cN58QaW2LqIiPlxng49ferFrKq2M4n2NPIMksPmXJ4A9sUaTdJ5hvVVyZY8fN16dTVmKBLdlmaLf5iYO4fka02RotitJJd29ika+VcWvJ8hhyD9adBpenajpK3lpBOs1oTLPbb84H9KffLGBLG82zaMjaPbpS+G54ra9t7jzmVblvKuIz0VOmT6+tKMrokJblEmkcR8LGDgnOM9KybVGlv7eZPleN2l2g85HPIrXv7SfTNQ1JZoHm4PlyAfKRjII/DFYlpIYm8xo97shXrgmmhnSaBPcWGt2hiLNtZI5dxwqhmPUVrPbWyatc2oyFim3wzO+QxbqAPwFZXhhmNlruovvt2RI4osHlpMnnPqOKtXoRI7TUHDwTuDhkbi4Ixkn86hu+40YIXyk3MoJ7sae8vnIkZ2uCcDPaoZJhjy5QCT1JqCFl8184KqOAa6JK5mzVjma2gZVwcenao0ZDEWMu9m6jGKpI2y2MZOHdtw+lME7SI298hScA1KQmiRHTzM7eA36d6vRTpIFhLeWjPkNjoKyVYM2GOKtsdzII+FAxgUNCNAuqCRdqud+Fb2pJAyIpyMrngVBbxh0kkwSUxn25prOoyVlLEtyAMVI7FmBmIQMeOcir2hh2W5e3C/u33mP8Ave9Z0kDLGZFnACjPvS2s0tgswQ/LNxkUASriYSMFYqFVY5HOcHnOP0qR4Xjbe8eWDEF8ckVFpyiBIYg+V8wH6V0BPnyXTeYOOV3DNJgZK2z+S0u5sbe56U1pSVQM+3gcjmrmpRLC8UTM5R0wwQZqpcRGG0i3KIhnhB1I96QWHLJEIGfzR5qsNqFc7/enmRYirC7K7uSuOB7VB5ToyeTuMhGQqjpmrsFpMVCTQKhd87iM9OP50JBYZujIeMujuF4bv6100ekMfDI1OJZ4HXkfZwBkdD36VyCXNtI5gSVEuVDMAoyWwSCM/QUl14j1a1tXsw/yZAEPmsu5O5/nVRRSRra9pepqlvrV+ZHRVW2UsMDax44/E1zEhAljZlPlZ+bHQGrmoa5rN4qWkzO1qwGC8pZfbANV7pobiJwCojQAO3q3pWpZE8DqhmuSyzuceWoyNvY0qMT8yycqcYHPFV7m9e5Xz43kUsAiIrYBAqSN1tjDEYzH8mSR3z60XGSxODGYyMfOcCprS6m0u9ke3uTC9yphbH93/IqoyM2QsgAzkVbt5oYnWSZVfKkDI+6fWoYEzag1zBLFdXjtEApWPbwNv/6qz21CC7uN9uvl5PzEjrV+zXy7cLI3mnJJJ6/jVeFhvkRooyznqPrWcmZsmhuUindHjjZWUBFHRj1NWmu1Z444o1hdDhEAyMmqPlxsVDqiKjZ3gZxU26PzI1Dbg7dU44FZNkl6ad54Y4hbj7Sud0zcgY9KobhCplLmaYOGdu1WPNWNbjyyygcgNzmqc6PJbOIwVdyW2joRgUohYkvbiW7t7VowoYHc6n+VSW0TGYboyzyfwg8CqlsjeSqsdzqCxVuxq6ZpNqEfIWweDVDVhlzbzrqYuo1kFkYS23OVBrLt7SSAm4lmYobTZ5SKMA8d66GKBIdGCySnMTMuFY96yrq5Sz8L2kh2hZbkwHIzu68mtImisUtBZoI4UeBpk2Nwei+9aed1t+8cEoMZK8rzWdp9tc2LCNnISMnO08YzWhcXHmyORIxjZh8x7nHShjKGrwCTyxHMH24BbHJqsloLBJHeZjuHAXt3qe7jkhePaPMQZ5z364q3ZOs1vdK6x+Z5RYHripjoZt6l28lW/wDBNrqUU0n2mFXt7lV7g52lvXqK5MI0bRKgByBgAkBq6rRc2dj9kuFDvrANsImYFYX/AIGHvkg1jmxkg1CfRrgsLmxk2lg3JY4IrRO5R1X/AAj1xZ+Erdkd2e5fzZEjHAPZWPoai1PTRNoujwx3BjntneMbPuljj5f0p3hi6uoZdR0W5ndxdJ+5Mhzhh6D8aJLeZ9Hik8t2mW4M6qDwoX3/AMKynFrUuOpw08nmXQCyblzjNOjjYsW5AJxU17arbS2sqFSkikjFChhEpAJbI4zXSzOwryA8gAsqkVAvO0E4zgUtyTFJHGiZDk5I609rcI6j5snkVNyZD0R5JggXJXqatmIoAwzksMCordTHIHZiAAcmp7hXMMbgNtVxz+NK4kS2Pzrdwtld2OQenNV95Egi2biOfrzUlpL5c1yQM4APX3pzRI8skySYdcBVx1oKQu5c+Xsx33E8fSnWytJKXxuw2dvbNRlWVTu+4edp55q3YNG9qXkyD9oCDHFIQkId7hEEYyWOATitmAQ20PnXd0sdxJ/x72kfLzHuOeBisKSYo0Xk5lnbmONPvfj6fjVkWsdo8s00vmzt825lyY/9lPQUrdQRutfnSJIY7CVL95STcFlwLcjgIv59vSq9xIwRvMCl5Xy+V+7u54rNjuYo4XiSUCZ23LkZBb69quahPcx+F9QumAJtwrrI3LMxYDCkdByetUmWNvr+304I/msy7drOoA2MBjBqKx8VyXF3DYW7Ptz80jovpn69aqNGuofD7VGiQmS3uFd5WAJ55qtPoEdhb6fdQzymS5j3McjgkdqEyow5ijZrcf8ACRuLdk8xJGPChQwJJOfzrW1CKSWHz0USqX2PxyB7GobTT1e+i804l2nvgke9adqiPOYAxhjycoT1prUcocpkLCJdyyM4WFfMTnOcdBTLeBIWlyzSL97aVxk1oxQYmmjML5UdSeopjiWG0a6kjCIkgQjGc56UCUW9ys+nolyI/MClVDpjpg9TSGXcnnsm6PO1XbocVaYRWkhv7hC9nGmwt6s3QY61g679vlttH0+wv4bRpI7yed5lJRUijEhJwrH7qt0HWmtRPQvQ5aAIw/eA9/SmXDHDkcbSOB6ZrE0R9U/tpI7zUYL22nsTdQSwLhXUSbM8qrDDK4wQOn0NdJKgMTOEwx4578UNAtUayBZLfzIymGX+YzWTI4giDSAjJ7rUtrZyzW9pcQzncSBswcZFVdavLyG/lt5LdFAG4Y9ahoTiOcwR2CzwzF8ttlUqcY9a1LRI2s02KDkY3KOlZtihfRAV3MZGwwwME5rQ00JLJtMjR7G/1aH0HOfas5LQlpExh2wSfKXVR97rTY5UI8lXUyqACSDkZqaW7a6khsrXy1RnxKyA8L3JqhqNlDA2+O6m+0GT5lUcYHSskSOaWOWfYgxIr4epZgkEi/PwV25zxms9ETzcsGwG+Yg4LGr8kizhI1iVVjbOG5zVrQBguZYAxkAMe87gTng96i1l1i0JnjMbgtu2svvyRTr0iTSrmcR5SNtrqv3jzWhrcVuvhW3jRcsZmjzjv1xn8K0TuaIoQxxrZxiKYyIXOSRzg84pY38uJoXjDqTkcYIHr+dUtMVWQ7ZXDBeV985rQu5be3tQ9wx2yyqpXHPIz1FEiyhqq/Y4bfGdry4cH+HiqkMhsr6SONQwlG0qeoBqzqq28Udt5bStG5bPmfNg5OCKykXexWJ28xeVYnkmlFXM2aGqXZltoI44oo50m3GRCdykAYIz06dq1L7Gq6Xa6rZxrNqcREF6EX5hz8khPfr+lYcVs17csID8sSEzu55j4ySfWt3SbuJLm002wy0OoKYZ7leGcnjcPTb1Ge9aqNguaOjRzw20N7qVqkccO4xTsfmlfsoxzzWlq94L2C2urOQqtxGzC3VcCM8fIKr3sP2OKysG3ulireWJG5Y9mbtmkh1KbTdW0uzFtFLHqEciBGz8rDHOfTmp3Yk7Hm4i8tgcsc8qC+cCtayuIXikEgbeMbQE/rWNMxQAg1es2/0hY9xwy84q2W3YtOgkvo38tgydB6k80PIhkLSBwwOCMdKRUUXEyHedmOc9KiX7AbqNLuWVYiWLGLJPelYhontJ7aIsHcyQbiSD1FRjU4JIZoAJPvZXI7VnzX9mmqJa2rZjmXIaReePWpGjZeXUKc9KLE7FiKVzeFEQESIf0q+1w4jLvGVTIGRWfGmLxFLBQqEsTxxVyAtPZrhyQSeB0xUyFdk6urqp6ZpGu5C7aVZBDds6zDcMgJ3ye1N3EJlifLHHSktZkN0URgHbaC2OeM8ZpLa40Om/cS2EcA/iYzSA/MOmP61PayfbLe43XJTjEbNwM+57VWkfyp94Tcy9AP4j7Vr2kSQeTG8So8LZKvyGz60nIdhunSX2kwmcafBIg+bzXdXB/DNF9ql5eWNzZSIgtLpQzBABzkHAq5JIt8VhaAROgIxGflI9xVWK1kj2vJGphVtvHWhG9ODvqR6aY7fS9R04eb5V2gbBHRh0rRvrjUTo9kIrW1EVptTLdTxSsyEyBEbKkY479KaJZxEbN0UB2Dgk+nFWjVxSloZ2nxiK4YSNullYtjOe/TPYVel80zefKkWF/uHpWRqGs22huYQrTX7EybWX5FXPrWOPG2oMDDDa2SIxxl1b/GhIUrXuzs3RDaididzOAMH9KYyzQQz2scIkkuOVDnhT61leHNfuNWWe0vPIDAb1aJSFwOvXvV9Q9sXQzyyy/fUOv3QfT8qUnYiVREeqWy3mnvb2zEJbkK6HruHVv1rkNY1i30nV9IvLpXEH2a+hLJCsx3SQGMHY5CsAWBIJwRmu3urpPtbvCu5nXLgKe/8A+qsXUdM0+8mSKaKOYH518yMHb6gZ6Z4/KiM+pjJ3OY0TV7fWPFkDW0YC2+mfZ3kFrHb+cRJu3GOMlV4YLwedue9dcyeZGMAYNYVtZW2m38U8NvFEzExkxoF4/D6VulcdCcg5wK0bvqOOiMWOxu5bmRbfUpo4ugj9M+lI9k9oXs55pZZYMOs0rZL+1bmnWxuL2dSwQcYJIrF8XWLWPiAstw+Cij5j14FZ9RybaJtMuGM5jCIOQ3JP8ulbBdYri5jlCqCAdyjHWsLT5olvFmIOWZV56djW1DAl611LMfKAPyoerHtSmjM1rSFpbIYgEcMiFY5V6swrBELSXRYuzsHK43dOBV8w3aRG4kn2xKmI40P58UgRbeFXkTEs8eV28naeMn34NYCIjEpiBQ53HOcZzUkKOoRcqWyc5GKYsaiwhALLnoDQFlVHdSrMOBk1SBOxctLeGRL7zXwrS7wB93A9fzquUnHhORJmVlW8d1bd65xVi0kEM0sm7G0DdHjP/wCuppD9vsLq0SGNVjLNtU5PBwR9eapM0i7nPWamOJSMZ2hW/MVe1KVI0WIkbXbCkjIx61A9pb/aY44XkMbbWjY9HG3kfWrUcEc1isE29jE5YbR2zxzRIp6HPahDJF5IjLtnIyx4xntTrFbSOZzqNw0EKDKeUuWY1t3PlMEm+yGYDK4GflqGysNPs/NvJ3mlaNPNjikT5VfPA6fSiLsZt3BVbVkjjtbKWCyZt0c0OFkl7EPu4I4rTsxJpkdvCbSLedzsyMNyAdPYdKzrTVpotHj1O+Cbrx2W2C8BR0PH51V0a5mfXICX3CdwrqDkEZrZbDNbWbyU+KdQt5SUt48MApzwAD1/Gku7hbDUPCuppIzpHceeQ/Ty+/8AKpNWuE/tDWvMWMSzR5KHgqoFUtSeO60HR7VlzizRQe6nJrNbglc5aXaAcjJNaFl5cWo2SMcCQHP4ViyTvKvmMQT6CtKyLi5tNqbsqxyewrZjbTJppo3nvBuyskmEJ9qSKVyhjyCQc/c6URgmO3V0C5ZmU9yK0IdoSTYPmHrUuVkJmEzmMXiyRszTuCkgUZQdwOKuPslhjjAYE4A9x65rQuB51k0ZUcMOcYx61DdL9nRYY8eWyZ96XMLoR3MLLcoI+Qy4JP0qazaD7MwBcsrYwFOKo6rIYri0JZeU60/Tpfse9nKmNz2602rokuTbzOxjRDbheh65pDbpHNCkQIJ+Zs965L/hL7hrZrxdGmNmsgjeQSHYHIJCltuASATj2NdRHei9tbaYKUeZFlCA525AOM0uVx3GrFmVmi1MKroscKB9kh4Nb8UbCXcqKyyDLtuzj0xVGxMdw+qbQA7WyDB696uWCPhYs7Wc8lu2KhpAT3Ngup3EKS3csBLbd0bAED8qypvDccMlwtxruo7A+UaNlbB9CAK0UU3E6YkUvEeneqcmJrm8lZJDuO0Y6qV74qtjeDl0MUxS2tzHIL6Vljcsdx5fnHzDtWvrdkZdHa6R2WTeoDbscE5rPuVecK0pdnYBQSmOhzz+VdGs9pDorJcLMzPKm0om4AbRRJroawT5tThjpMsuMqzZbg7snHerGteGjZ3EKW8L7XhDHjJyTWvfQJeXMkyROIAVWMHgnpnj860dZ0m2F7Hvjk/1IGAT6Uk2hzimV/DGmzadosryxsJpZgFBiPC8VoXNuFupDyWZME5waZaafDCPLhEjFnDYZug4p7GWZGjjGXVsYNJyuck4WK2piSGNPIiVRgAtnk1hyvbfaZftbv5qyEJhjhFwMMMd+/8ASt7Ubkr8roOAOMVjaiFkt45gAGQ55Has5w5jqwWKWHlK91dbp2a1/XZ/0nSdZJEtvNYqQVc4PXrj9MVqEmSX5TkEkiobyQTxRznADAD64qzaN/o0EjY+YlRW0VZWIqTVWpKaVrtu3a/Qn8O2Ed9rUtsSpKRNJ87bST7VR8UWOlzPHNFdsbncFMLA8HbxzViK6uNN1pL6GGKaWP5cSHA6VW8Y6xqWv2MKahbW9uBcKwNqMEn60EKOhR0m1M1wLe/dot5GCg7j/wDVXQaXHcGa7jhi8xY8Dex5Kk4rJsImSf7PJFMVH3XPBGea1JbxbGU2Fsd67QzP0P4mpk7mJWltrgSzvONiA/u8PySOTRYicSyOBvfhMk52j/JqmpyzYZhgluTnr1rT0q3SbBDMhDYkPt61LSQ2h8pkQW4lC9SAPXFJfQ7UikUDZIcsF/SpLvawtAVP7vJPvVVpZTIcKTDgYU/z9qjoSibyReQLHK20O43Y4OBUPiC5NvrdlApCLw2V4wx61PbSXEviIxBf3bgJ5nTnrgD8Ki1CNtc1BYsvvGJc8DAHSmi0Xr7i7CFdtvIm/CjBR++PzNQywS2g3xuskDY2Kx7+lXL27W4nEat80SEupHcnt61XFtbPHJdXDEQwDevzfxj2rSVjRarUW6vtlstrAwNwRl1C/wCr+lZklreahp/2G1jBmZ8M8jYJqGfUTAwurlhmRso6DIYnkCtvSJ99rLeSr8zqWVccgj2rLW5i9znfEMDRSx2EUga2sFEUYHILEZY/mTUekrFYeTf3oeOIHFoY+Wkf0I9K1dTsLW5hF1co8MSqZGKnDN7badNYq9xZ3dyxh0xNgtEjGWJzyP8APrW97Itaj7qJJXN5qi4injyjngyt2A9hWPJM11fyTP8AIeAsXZQPSuj1ezTVLyxZ1by1BKDP3SPaubijLX0plzkPgZ4wKiL1Kscoo/0fAYE45xWqjLFHA8ZcELhj9axkJKsV71sCMCyjIPGRkV0SM4rQvT7vLtY8EsEG01YiLeYFRwXHUGqOohVmAUNu8pSKueUImhCknzVDN+VYsCYPuEiuCDmo5WLbBxwOM+lWTb52sQSO3NU7yLYETo7HH0FSmLoUdQAd1ZyCAPyp9sY/tSrJjkcD2qO/Vo4trH5AduKRdq6xCjHkxjH0rboTuY1pe6WnhUeH3f8Af3NnNdtP9qQRRz5DqpXb98pCifeGDIRiuj08quj6SWAYG2jUFeo+UVkr4D037UYXnu/ulsB1z/6DW/cRQ2VjZ20SyqsGyINJ3wMUpyT2GXLUMl5cFEysK4dieuelbMaTW2nxL+7b7YS6hj82B1x+dZGkXMby6ojCRlG1V2jOTzXUzzQWa2iXrs8MakDyU3Oo+maylcasZphkkMUIyon+8w/hH1pp063QXEfmyAxj5GQ53DPWsvUFnluFIdDYz5BDn95sPI+nSqj6WttH+4DZkJyWkyRwapHTDTVHXW1xa2uoWcp810eIqQ8eRnbVC+lRY2jOUjkYMzFcAVyUVhNLaWxNzc7mU8K3HHFbEl1JN4TAjc+bEDHlhzw9No053e5Zu5YbQTTzXBS2i2BUXqxOKjfxzo8UrPLJfupAwTDnp261zd+bi8iDXJDFVGOKXVNDgtLOGSJGHmryc55xTghVJWR1Fz4hs4tHW5liv4Elfy0Mqbck9D9Oan03ULO8naGK4VrzZuYDpt/xrh7jVr/USEuZy8SIAqFccjpXR+GLSTS9YZViJh8vd9c9abijn5ubQ0cFI5LZZCjli2W5OKzIoHnshEQYwc/f61s3ytIFlXA6kfT0qjJDKbdUiZWDIcq/WpZLVikibvD0CuOkjgHvT9OVZLFF+YEMRz9amu4kh0yJF+8pIbHqelQ6bLiB4nyXVQGpotMm1CHy7dwHOVbd78Vn64zyaT56AKSysQq/Ste7YSQdOn+FZzqJfC5eUEgMyZXg4BP+FSyo6plXTrloLt9yIFVVOByOcVrTXIe5KIAp4yxXHFc5EILy3to9PMufvN5zccccVtXkYK2zF3DFl8wr6dKbWhhbUs28Bad1GDtYVZjaGNpo2MqTEMzYHAAHFKwto1VbPczsNrM3anLdmMBdxYdJyRk8Vky2yKW1v7hEmEsRXYpUHrjJqzE8haZhEnDAE9sVEVEr58w7SMgAYAqWLZGoXBCKy7iDwetRsQWRG6ILxMK0koRQfQg8/jis2aXZeOiKohYiRWB+bd3/AArR0hRcXktzMVUSIQQD2H3f5msWK3mOuSQ3B+eCQAD2wapajRZ864WRWjU+XLuRHx3BpdVgkWyNo00IdhgCVtoYmrKqht3SFCpWfKMe2ck1n65dppyRNcKJJXkyWIyCKs1Q2DRrqOxs7ExWkkDNt3JLnYw5z0rVvLaKTT1giNvJ5PzL83yu4PUn0zUDy2llo1vfIdst2xQLjlc1fntYL3T4hNESgBKunBLYqW7FQp8zscxFNbTO15dJ+/zgxq2UwPSq3my3eq25O4qZVVB6JnnFUcfuyBu++QfzqWzmRLqORg2yFwWx6Vr0M9nY6DXmEdzMkkMouIG2xsXwpGOwxWVpzbBIzAmV1GRnOK1PEWpPeGVwEMMoDRn+IcVmWGdiDjgVMFqFzkYQWB2+gIrZtnDyWsKqdzSYJPSs7S4xL5xwSy8KBWxYzNJeW0jqqNDL8oUZ3deorWTJSLU6ibUZotx4O1fTgVPp8EqqZrk5CgKB04qmJt2oSXDuAxkYsFHr2ratHea1YSKjYxg9qxkUoisESEELkdqqXpjeHKqd2OCatPvwMrgDtUc0SzWm6RMMDtAB7VFxSsUb60+1skmMRqoQnPU+tVNatY/NW5QsgVAoA6nArVmk+xW0ssaDYMBVPJJFYmoX0k8lusjSCM5I2oCc46Va5pRaRWGlThVjKqrxT1/r9OpesrgrqCXDyO5MZXpjt0qbxBcTPYQO67YPNBBzk81HpkYMEkw+ZtwAP+z6U/xMDD4eQhBuMqvn2ogmtzXGVKVSadPtq7KKbu9UltpZfK4nh/KTv8xCk5HPU1rpbvcTbjkKvXHVq5zS52VpSF4Cg8evtXWWEpiADIzOoz9TSqOxzRsWotLupmVVEYjGMbzzwKSXQL1pAfPtynOQSQRxj0rTjvFe2L4+YD7pX+tSx3HmKWfGAMY/pWKnJHXB07amfb6A6WlpEzwl4chjuIHP4VQOkzadZywzNCVllLIEbJxXRiVGwSSqnklj0rN1EWNy6LcC4cA8GIYFUqkuo5SpLVFeLw5aShlvmkAIG3y256Voajoej6lZQwNJcxBBgFfpj1qI6jZLhQZ1AwBlTnp61ciWKc/LcKRjOMYrNymmXKtBrYwF8DaMkvmLqF2SDkZjBGR+NaelWP8AZ96mJTOBn7y44q+bEABg2BnPPNU7iKaSJmDDAYY+lWqstjJ1Kb2RQkjKGWFowNrlxk1RniaZtzpt2rhWA9f/ANVaTZiDmQ7mJHKHjHpVW8uV3ojZUNhcDpWybZzSepnyKbi2EMOFYuXDP0Kjg/zqpHYS2kzyeYJImGMpzg+9WUK2YtILiZ8x788Z3bsH+lQPJLKQLE+SH+Vi3Ab1xVp2BMtEhhIoYAYDKar2U2lfZb601a6uEdVYwCNeC7DjJz6mnRxtCggeIh843H0qu9ta/bFE80lsroVVk+Ybsd89s009TRaIw9Ks4rRUa/fM65AVeRwcj9K6oQPqNlG8MqKnUqTg4rEXS49sQ1G5jcoSIntyefXP4VvQ28UekEK3mKsbMFxhl68miRiK1rmDy5ZgmTgFT1qWwWS0aQxYYKP3pY5OPb1rIicRRREMzrjnuRWnpLCVWnMrgZwPl4UetYspksGbiG9AHMSggnj1qWJYGtTHOGEbSK4A68Z7/jUaP5zSwwI0jM2HdRjP1pZZ3EjxSWzJs4BHQ1FyAmf7Bp0bQwDzJnVW46J/kUmoQmTxq1zFkwSKj5A9Af8AGobm587UlaPaVyqBWPFWbjWNNsYIo7+9htLlXOFeRVkKk8Egn7vHWriXERrtVm+zqCXQl2GPXj+tR6nFDez2umSRsXVxKzBeAAOc1DDqWk32uXggu7eWd4lIMEyuuBjPQ+uKuX13c2FsZrVl+0XRwkbjnYOpNWUzF128SVoprVyEXKKh/hxxkCrOn69HHokMUrs7qsmDjvzXPX0rz6q5aUEMANhXGw9Kna4+zxC2RcMAfmx1+lDjdAqjiQx5MG7+Nsk5+tRRsEeVWLYPpViBd0TPJw+3gVUkBjLyKRuxzk1dtCZal8eQNPkOSzMVEeT0HerVtCiRoW6sKphFfT7UiXMhb7mPzrRRFWNy/wDAMj2ogrMInH6RNJDeAIRgnmtqzkC6zF1/1hIAHtWDp42y5J5GK2YARqolBbarc1UmkDdh0onaWUxKcyMfzrSt9QS1tFQxyOwQF8etSC0iR+HUnOfv0qReTOdmPm5JHNZOSYKZbjukuFE+3C46VDJJJt8ocMTuXikiRkklMmDGwzxTsSThWjZVAH8Z61FiZO4qMJdqOykE4YHua57U9TiW2eK3WRJI5MA44z3rbt1EUhYqQ+7qOQf8KxL6HzWmgiglh5MjORkE1cHYk0NELC3uCvzRqgYD371q+NkjuNIkjtxtCFAv0FUtOiaytlVmLMyk7iOORUvibUrSXw+6QyqLgSIAMdh1ovdlWMzQ4RPdxnlVA3fWu3s7dwgMs6sY14wK57RLZ5ZEdgNqQggr0Ga6O2XMgGQzE/wnFKVmxovxQQ28cjyNuSQDKd6uxQ26xgiMRQjkRk5LVnWd6kSvuiwScfvB1+hqyreaABFgg4Bz07U1FIoluLKyuYjNg7gcCH196iYJCY1DEdgOmKmG21kLfa0RtuCWGc/SqN9bNePELdz5A+V3znB9/Sqa8h6GrLbLauEkYM7jKkHOKY8cRcfIoHfAwaf5JtwsTkMwUKMd/emRjzpWWOQGUcdMkfhUtabA+xUlnVA6x53DoSeKzrqYm8KSZxtz8p4zVpoTaL5s0TsoY7lbgt7iq9xaxwyDzDlvvBgfu57GsXHUze5EyMZFzhFQ568Gs67IubJpGG10bANTySCZTbRRuzKdx96o3F6I4U6iLBDQlckt65rWIrlHW5hNHA2MOuCGxUrulvaW+/lTKAmO2eabM4uIo7ae2DRFA+9XyM+nHOaZdbJdEjDsqNFICyk8nFWWkWUZpLuWQZXLEDd7GquqReZgFgI/OXg9OeKso6SBHAyHIIwemRmnX8QlinAxuiKShT3xihKxo9jOtLWOTUJ7PdCrr02kgLznj6itnZLCnlq4dVU7ueorJ+0QXGpC+niFtEcfvNvDnHOKuNcbZJWUpsZRtIPBGcUmmYWY+3tVE8MeBhuBj65rUSCVLBgsJSMNz/u1jWuoxQC3jeGWQiTDqg6r9a6hL1LvTpl+zyKGiJiXzBkHnHesJ3Q3sRWemx3VtuZJIo+DtSRkMp/Co9R8mK1WN4Zlw5HkKxZsepJq9ZSTQRojSxNGAMKzcof8+lMeac3MziRWZGwH8vI2/UjNYq5KOQvdjX0Bt2LOzfMrDGBXO+L7dFnutc1O0ivJoobWFLd3YJlzN87bCGwBCRgEcsPoe1jRNXupA0sTrED/AKsbc81zPjHSdctvEHmaFAklt9hSKZJzFIrfOzYZJMhiMqRwcdq6KMrS1DUyfAdvbz+NLxrS2e0iGnidYJzyM+WSFJ5KkklSeSuK7/Vo31C3sru3KJdRPtZJshlU8/yrh9G0XxDpeuzavrtu0Znj2LJ5iHL5UhcKeBhTgYAAGK9EuCk8dvOFAaUZePOcEcZrSpJc2ha2OSvITBeG4mjadZ/kUR5wvc1d+wCW5iVty2yBSg7sfTNbN2gmeMWyrEVPzNJ0b6VYswxAjl8rcSSxUcLWTkyepyd3DFDe3EankkLg/wAOapfY52cJFBK+eNwHH1rrrq2smkZibclXy3zfMTjg1XnuXUPZ29yV8pgJCmMFD1GexrRT0LMUaPMjQGaWNSD8ox/Wtb+z4xayGWePlPm5qfUYbaTSrS2FyALaR22YJaXAB4bvVM24WNUdColjyu7nI9PrVJthFGRFo9uDucEN329KnXTBCszRyht2DkmtYqB1wpHUZ600Rxhh8vDHtWMqlzMZHZr1AQ5PpUqQuiOmxVHY0OWEqJGu1cY3HpmnNNCqhHDFz/Fn5fzqVICm0e/cAPm780pXdtBTkd6ehGXOetCK+8gNnjIHrVpgOYJ5RzwB6VFLBcvDIA3ynBWpBKrnyniIB6sKbPK4gRd4UqTxQ2NFO6SRJUeUqYvu+VuwTWNqyqImhAC7z1xnGO1b9w0Vy6jyf3owc5zmsKWK5kunQwO3z5xjBraGxSOj8J3Mr6Owbje5xuGNy10NpJaoXcoyTx87HP3h7Vz+nz28ejRJJDLEy7lMT8EkY5B7Vp74Jbe2+ZGlUZYb+celS1qMuQs06bNu8O2UyelaCRZBXzxFJtweentWZBcJBbiNbdlBOVYnpVlVjljZixB7k9/pVxJuaFtEgj2yOsy5znbk/nTvJSLKRSGGF23MvBDGsuJ4LXCpdlEflonIG4/jV9LhHA2R+YoIyEBYVovMpFqeQTyLIAvnIuwSKx/l0qlEf7KkbyH33UqlmnfjA9KsIryxSA2zwMWyNyEZoi0u8LHzdUWUHkI6KcL6ZApyimhjpJbsWLrcXMMnyFkkXDbT6GsG8Sfy1czLhsZwBzVPUL64lvJbeHy2jWQA+T90j3PrTLG7jnjaxMqmVSSAW6YrncbCY5HmnkklBYFRtUrxTIQtta+Zdusj4IC4p9vuWydXZopFYtk8Ais+V28wmVlcZBx6URJIrCKQ6Kin923mM/H3utWNVnjm/cpAvlvtbLrtO7HJpiStEjtHhT1A7VWmaa5nZXYuRGSAf1FU73LLFs3lwCMSRTgnAZOlaKIoWSWXHzREHNZelG3SEQwRqqLtK8+vWtMhJbloiw2bSuW6U0V0OHuL64uLiG3nuAbRAwtYyAFDEkZz3/GtuzVVg+ykj9ymWY929qzGtVuLyDT/ACk2wzMQx4x3H61rafZyQ+atyyyMDtyDgHntn2py0RFy/DYIbYyrcbXdSG56j+lbkFktva2rx/e+9wc/LVaXTBFpTXSyRlBE3yDkg4qzaC7mWa0gKIttGrzBx8wU9gPzrlk+YT1FcWs80oSSLdEuc7uc+9PjdR5EpbdDhlbY2RzjrVdbeyF1c3VurqTHukjdfvfSgSKdOSQBokVcbQuev0+lQkTsRx2S2wYxQsRIu0BR1OetQalqEazSxnJjSTZJMsDFUIPKsx5znHT1FW47ueO7t47V0ntlQsVc49OprJklvLfRpLC2si0IZ0ScS7vkJPDADryeRgdOKiTn0PRy+jQq39s+3VR01u7vdrSy6367GlfZvVZFJVEIYM54V1GOh59aozXDxC3kdlWV2PbHI9qSyWOTRIjguguFVowcsMcdRWxeWo1O6mSDy2jhUMUblhx2xWpwSsm0ndGdLMt0jPGkxmx+8CDI+oH+FLaXbeRHCHQdd8jYBK+h9KLZ/LKssflFDg/N83vn8M1YFlatqF/5K7IJIUKnOQDnmqb0JKeuW8cGnwXTKvmSseFUDd2/lXKyyujSBN2CcuAeT9a7Ce2hE0H2o+ZHCcxru6mqMlpYtdSuYQu8EAhuhqoSsir2MOxnuVKQFyY4G3xqwyVz/wDqrqGv08tIgFcMoyG9fY9qoS6Y9vCk8RafOFbYM4pknlkJ3YMcgHJ/KtE0VDU0JliYK/moVzhm9DULoq/MBKTu4ZhtBqxa2YNtOJiJHXhiiFth9asQ2c9zB5clxgxAHzHTqKwdkZGJdBncbJzGy8nkcZqGQvbhg908sJOCNozu9hitmWyVpEfb58jKuQi4JJHb6UxNOhvJo42iMRhkKsh/iJOQT9Km6HYxZRJa3QjcMgK5G4YzVtJA8qBztYr8o74q3f6akl6ZnmM8kf7vaOlUL6xaFo7wRyx7RsJPQE9KtO4i6HG0MiA7fU45pVs1ulJRwpf5sMOciq0MqOxhTbI+R0PerDi8hLMLabaOhUcU+RspJlZ7FlKTEkkLghfXNWUjhS6IZzh024J5B9jVvT3lkj2ujseuzFS291biaRZrEZ6bWPPHetoJrRjsczBeySyP5hdYUkKhXXk/jWnA0FwGmSzz5XICnl6vyeH9M16OQWV79luAQGgPbFULJJdPnmgbloG2bh7VbiM0ITI0cMiK0Sjqklbcd3AyKJrOCfAHAVhj9aoW84uYUA+T5PvEjrVqZAyqYZo5TwrKh5BHetIQJLGY5ZQsVnZQY5BcEn9TTJ4L8CRBqkkKOB8sCqv5ZBqBbVLosDM/mg/ePHFWpZHd0EMmfLXb0zmtOUVyFLKd0k83Vp5yMfMxG4fkKzr7T9WtC8um+KZIVyMo0IbI7jpVi6s9SuF3Wl3DZg/fcrlv51nw2OsO0kMurRMjn+KP/wCvUy06DWo2DSLmKeR/7UJV1Lcw4w2OuKtf2Xb20avL5TTd5UGC34Vch08LKiidWYDBI6GpWgeW58i5kfYU3DC9CK5ak7DuYkmyWIjcWbB+U/4VkXgBysSBQeuTyK1ruCSO5IG4AqcHFUzEkltcSltrRsvy+oOamLQkRxwecyhMFQoO7Pp/+uhQYjGflaVndMe2al03zYbl1kj+QxHaPxFOkbzNSiCxbQInk47nGa1L3MnSVjmu5lQcYbAB+6d3ettVUwoCpba+Ce351j6PGLnVLdoLl7XzY/3iwRF2PqT7V1K2cMCSvNLFdhcqoUEEHscZpXSHqc0n2SLXZoriRdzL+79yBmtBDBHGjlSXlblQwP6Val06HUVsPOshCbaZria+VD+8CqcA+g4xmpLiyimlhu4Cj+Y2dsJztHYj1rKciCYXgsEniS4SKSSFgY8AkAjrg96qJPcL4iuLm0NzdLd24URqAu9h/Gcjgdse1WZrOW5vyfOLqVGVlUKTjqM1C7X/ANsNtpsW2VI8I0R6dfzrBsRd1AXUsiwafGIJISrTlhnI7gCptRt5Gt3jjBmDq21k+U7uMDH51Q02K/t1e7vXea6d8YKkEVanWdri1ne92l0ffAUwVYY61N+wXGfY0hspGjixGV3L6tnquKzoJ7aDyLYPKHZGbeRtU8j161oxyQ6jIbdwlugG7LZ+b171R1FbBdTj0qKFFkihEvmFsYBxxzVRYmy1aW9vDDJArAbpQxCHjkHmrT+ZYYngBbIPmIvU4PXNQXrJpekKUiH2qeU4bORt5AP8qzNKnubmKeCe4/eRIzo/ZpA2PL/EZq7cwJFu+ukaCDUI43j+1FgUYdSM9fyptplUlR0YFohjPuahjuftMZj/AOPdc7/sz8mBsYI/Hr+NX9QkmeXyo4i5WNQCO5wP60JWHYpSJ5vzZBAG0PjpTri2WO2t4IZYfv5d25yaVI2WNY2PK/fT+4feo3SS1ZCIy/Oc9QatIY8XaW6mOOSNdjDcwYcjvxTlsbWFvtIIJl59MVFLbTXMbXcVsYlQEuhH3/aol1QXFtHstTGw4MY6qKOVgrot28xt9SitZI0haRyoZ5f/AGXFasOFMqiZZI2YhgVx+VZ0dsl28k0ckhnRsq7pkr9TUyLJhdrRorHJxzv/AB7VlYViZYnjZZQHK5JG3t9aSGNSjTNKPNRjgnrzSxh45lV5eBnaAeDTJ5Q0yIffICdfxpWEPtbRZd7LDkM3Vjzu9abLo8rRSJK5kUsGYMN27HTAq4m2BBgDlcgE1Sja4upmmS4aMhSFVH2k471a0GkmZjacbWUNBAyOxyT0PvV1XuI4Sck7eST0AqO71a7kuRpkFqLiRly1xPJs2+2cHNU5Dq2nWLS6lEHkLYU28m5dvYEYrqha2pslZF+G8uoZlkVCVx+dUPtQnuWmlt5QzOV2n+dTR3DpCJHjO0/xbv6VmSmVrhpopJJ7cHDIw2FT9eau5NjZh/dzi4hlWKZfvMBw2O1UJxcNcz3Cuxa4ctkL90+lUIpX+1pDJC8kbMTiI7gPxrYXTLyaFjbIyg4BbOf07UWbE2hbW5dE2MeR09M1ZtUzOGVPnHzHnrV7TvDN+zxwvasN/JZ+AR9alutMm0ibMrqrHKRogz+tawTRDIpp8BWjBjJHzELwKrLfPGSiW/XpIePxprTyedzdBnfOxd3THXIqt9qhkcrLOxkQ8h12gfT1p8wWL6PcNIPNkEkZGQVGB0qa3xIjSBlG35Tz1qk9/LHFGEEcsTL8v73Azn6VYglWabBgt0AHIEuQT+VZzk7D5SwYYhsZCTtbnBp1yQHaRGwo6sewqDzPnCqAjFvwNOuU3KQFA3Ag4ORXE9XqLYyL2eM3HmGYNbgY39hVdkFvA1qjrO0p5dR90UhiklhC9EOeAnFaMcSwvGsEHlPtYkOd2RxQIw4jJ5o/fEbeCw6CtNoY4QMkSSbCFx6GpmhhKv8Au08yRfvJ0H4VTv7ny3iMseHOAQp6DFaqRqjCfTJwkU+nTBUjbACn5lGeQT6VvMZMfao5OJAN230HeqsMqeTeKkexFQuxPAfHbHaovD2sLc2QuxB5alvKZC27jOKG/ILmmo1KeymW0ldRcKUIjXPmL3X8RmksAws9Nt7axVL1JSHG/wCaMDgZH61LcarBakI0cj2qy4ZlO3AC5yB7dansrqK/vGnsmaaKOLcsm7BYerLj+tYz1JaYrPOuqBbq3yr4wUOCGzg5FFsLSKXzWhdJS3yKjctg1oXc9rBHM0ybPNT920fO1sdcVnWhktrNRc26hnJW2lUbsg/xH0+lYXTJaYks7NkpYSLFExJBfhh69KuadJb3ksqTtCU38nugPY1XuoL3yIFtpwHPyBXO0VGtrqIkVVeGK435dkHmZA7dqS0ESNHFBqjR+UHtGQrGgOWJ96TUI9Rlmiu1Vo5JAokAXPyY7ntitV7SwbYJ12IRwV7N6+1ZV0moHUngs7xriDy1KJK23aB1xSV2wM7X/Pne3uX+0/ZUZEYj5gTjnioIVke7mUEQQo5eOPuT1z9atXVtqN99yRobVJQ8rRNnocfjWt9nsLItdyxxzKch93JQdiPf2rZTSA5u7t57uewviGRblwkke3lMN1P8639ZW2iuVFpcIjxYbOOwHWpknhuo5RpyI48hmXf8hQ461z7xzCa2tzIRcSDy3BG4OGGOv40+a+oieOeS4QzGOUs+SWH/AC0qzBFNNtm8uaIbTzKOF96i8o6W8CXflyIn7uPacbGJwM/jTzq97HIltPFk7ijbDlXH+TVc1tQuW5IpRbnDB1c/cQ48wdzUDpD5JR3VNozsxhsemaoyTCOdQqSwlWIUht689u2KVp3LmK4lErd1C549jVKY+ZhbXMllazwS73cnZvxu3Eev51avHle3iktQxdUyVftntV2aeewtwb6PzLpC29lGRk1n2QEk8jWimHb80ofo2ahNBclQu0MYniUEICcHv3qzFCrxruKleeh5qk/mlmLkuG+7t7VMHVSytAG6bOakRajTLfJxjAHOfwpl0wDtOojRY8BieD71DDMWdvvAh+mailuYZVcTQF0LEPzxnPemnqNFeDWJb7UVhtFgkiXd8z/ez7VqlJJMq00aMFGR0P596zxptlDMLq1iZZQmF2HEeTxyKxr6S7+1KPtKRypwPLXINdCNYyudBqFvJHZNcxyN5asCVDcn3rIkdtQuY5pJnIXqEHX6+tSeTJLb7ZpjJnk84qaBEjY+SuIh98EAmtoruDZoWga1g/cxRZPMfHbvSxzSTxSRtCm1j8xTo1VrOS2j8zFvI94DgM3CgdqeHuUcW7LEpkOCSvAqyGbI1i8hskSSKJoQuwcZIFZkzXF95LQgQjlgY/lNWXEssvypCsi/KpVuKmnZomVS3+kRJtcqcAmnzEmQ2l2cDpL5KvPndvc5IJ60v2jcWLxqz5wCUwRU17ehLy2he1umjeLJdMEBs9+akFvIpWSQu0I7E81L0LRIqm42+YFSNR8qr9Kd5UKRBPKTaeuRio7e8WEKoUjk7Qe1LbsbgMCT5uTz2rOcguMmimS3ZrZl3g8B/T2qNt6lMsVdhzjpVgFvMaNnKoFySe5phKiUl2BGK527kSGB5YYhCuPlPBIp10yhUJY7Duz/AHt3H6UhlWb9xGevr0/OqzRxMQgLlcHhTnnvUWYDdyx8wnEjD5j2I9qz9RiMz+dGCAzqpVvb0rQnEMN3vtkcJ0yTUN80aRfM27ew79T6VokzRCnTdIe3aGSO686RSCTLuAJHHH1rOt7L+xLOLTvkaVT+9b1z82av3BsFIe3tpRcAYYPIXXpzj05qxb2zXulpM8FtIVYB9wwcDuBik5dBN6mbdxrM0UFqspkhy7lx8pzzx68VraTf3km2BmthAuBt8rDKp64Puc1PGlhJZW9vbrPkSMUaXoo5JH51agt1ZdzHDqjbQo++ecVnOdkDZXlERvLhfKzFuwDIM7RgdPSrxiazt4AkalnO6QIcgL2H1qS3JeBkdXZurJtGOO2arXk/2cxtGMb+MdcVz+grjVjjYiUQRuQd6lxk0tlF5E7zQRGOZ+WIHBoguI3hPmhvNIG04wKktpJ3ZoSyKxBO7Paq5boLEk4jnjkR8/MvY8Zqvf6LBcxi6Mj+YnDLI2Rt9AKgj243IeQcEE9atSyuZDvznsB0pJNCsVUWG4sJI4IZ4YmUKiiTaEA9qsJcxWljFZFZhECCjlsuW9SfQdKhOx5mWdG2+i0wwTxeaLDIibG7c+DmtYxuFiDUbKaSGOWaWKRbh/KXcMseecmqX9nXCymEoGSI5G7lVAOcittoWntIEuZmnWAlkj2/cYn1/GrEYnBdY2G0AcEdfWtVDoFjLudVuJYwZ4RcWbR48rZk5B5x9e1VpBczpbvaRpDbKc+UVw+30PvW95OwhEK4i52lumaZJIqSDzFDE9ADmq5bFqFzOe3bySwUxxsRlMcke9MaG2TiFAh9D2NaUcgUuqKMNwxJqnJZWLzeYwff1H7w4NTyicbEssOoC4jk3hopPubBj86dAN9w4niJwec8bvX61dt2DsqEtmPvk4qlcSZ1GN2cyRoTnb2+tYGZGkiQM6CB9iv8jY+8KqmWNvMzGrPnIb+7V25mkkWZtsm0Y2MBgAVlPtizGm4qwyTjOWppAV0Kgli2WL/wjFTpC52uE2JnnnBJpYQgiLsdrIQeR1okxLcxSlmAJ3ADoferAkeNjMBCypGvL7uuaqLFBArZV2vZDlSHwAPrVsQeY0kpIySSu44J49Krw2LyxSFUaPnPzn5s+1bwZSGxm3Yk3Ns0kxGARIcD61HaxNBGRIwcMcjy88D0q7HF5KgM2CO2OtS2ccUk6iSTy0ZsFydoH5VvHUrmEUmXLxSwqFxkN1FEt4Su2Rt4PXHQ/jV/UdKsYZXEeo2pYAHaMkt+lYmxCjM6kIvVf7wqmAkwWQ7kiVAvJO/k09P3v94h+cMSaUCMOhCryM42nNTCbDAgyKvripvYGTxQxwjbcZYlcqAcCpbe88sNHGij5upFZ9wzXU4PnM20YFWoIhGwBQkk9a5qlXUSIL+5O4ytgYPYUWV88agKGwT1K1YlEWWWSMEZ70+DDuFDAL/KpUuZgh7tNIMME2HnLcVVl2MxKrhRwfUmrMm8Qs5An2f3OcVEIZBcMJCoAwenStUhSRJCkaWp837voaqQx/Zb8w2Sx+UEOS2ev5VeFpJOkiOwBH8PtUN3BfwIssVuzHIVtnJxU21EUb6RDbBQV+XHzIcEnuPWspwDdKVzvXsQcA+tbUmiiUsHLCZmyN0ZUgD6iriaSnkbmlVp3YAxhznHrTcuVFpkGn27IlyZbdUjZVJdmHzEDkj+dSWsyuXEwQ2zj91IAVf9Bmr/APZsUKOksazRiTKkOSV796cEW4l3EoFjbds6Pis7pgMWAeUgOYyv3TLzupwt+RJPvd4+VZDgL9RV/Uvs9xHCsWNyrnBbvVYpI9qo35bnIQ/oaylEljVn2Rqougdxy0e3lh7Gqs1vJFKk0ZMUBf5ehwaVrdo2WMkJg5BPPNLKxMUcE4GzzMkgdaz5BFE3N19raM752Q4YhDj/AAp7ACUHYVV/4W7flUsskvnSwwXjxWjfMUz19qdbxI8G8h1UgEGQmnew7ljT0s5VkYssjgY3YIApbiEwKPLOUDbc5yfrUq26rEJlKrG/ysAe3riqzMtxIFDMpXg9g1StWO45Hkd3Qxu42/LIBwD71atdNhVjcX0pkLJkCFsYNOtLn7MzQo2zIIwTnIqIlQpRVbgHOOpNdUJJDTGPGWGIWIUckdwPepI5cDIPydDnrRDmKTeQTleneo0hW4mBmYLs5IBrZSSKFltlkgeYKwZBuAY9aq200Dys21ixHzLnlvpVvVJJG0+Pyjk+ZyB1K1BZ2UCoxni3y7CUBYqQfWs5SuBmziTfIEgnC5+XPG0d8nvVhNLuriNUMqgRfdJx82f896sXjX7WEUZnQJApcscEH2PfNOt7HUpLHzPtkDR3MeWXZgr+lNRCw+ZJQZWjlSMHkg81FbOAWjZAgz8+R94VHI0gLRggo7bpDjrjtmlUtKxbG0PyATnFciMSA3MziWFY3MYJKjpxVZ08mQRz8xMN4CnkH0q5LOsWSBuwMHdxWdfRxPO3lhWURgt8x4q7gNYGa0kKTDaSdsbEZODV6KAXM1uoIXZHtUE9+9VrfyjbhLkCSJGVlCrgr+Petmxt4o4pjPFuDSZTYcttxxihMDLaB2kCrMgaM8sRkVVlmvkfa8u85++I8DH5VLdec90xQpBFu4QnkipGlDQLi4ztPII6V0QRaKyMzybX3lu5PFSSyIE2Bd5PIz0qQ3AXho97dmqOGdJZiWRRjjFdCaGVlkuQA7RQsR1Kr2q2wkzu2IH7EdM1dWylnTEChW7A9DSXtheC6eGWSNGz91DzV2EZd0lz5iTRsm8DBxnimIcptmlJfv6VuDT4ZLQyfaYIJI/4fMBZvqKzHiRomaWVXcngAYqJRuMIykakoF/OnrcSPwcj0rPR8z+THAyv1BJyDU1vdT7mTajSqSGC9B+dcc4OI1FE8jStPgqWULk1Np8H2pCPMCndjIOf/wBVMkcqyszYcjkCp9MRY7e5tYgFnmcO0hPQelEBWLt08VrGsVhEc5w+DyzHvUT28iKPtEis24MW6YothtYTSOpfzQCF6gVNcxxtG0cxLBjnJ+8PSt47gyFrwC5PygyEYBHPFaNpdHzX80HKgbMNgg1lTCGOZYVZVkK8OtPS4VIvMkwzdyKaeokbdzfSTvulIcbeAxH8+tYEiRu32hCY7huBjkFaZqb/AGiKEI48zOdoPb3pun208mo/aJJ0EKxEKv8ADnj9airZlWLtm8KMzzMXOMgB8c++aeFMsrTwoFlxtyecCqL2KeasbOshPzNg9M81LHIkasv2iNcZ4V/SsbCehIZV3NmIGVRyT61JFM4gBiKDcSHwOlUkuoX8wZYOQPmxkGpYvMkDpHtKD75A4Gahsi4PdKLhFDfPuHLnIpWeaUSsi5cL8ueQfpUE8SrlHjG1B1Tkk1Ys7oiAowTAQ7R0aoYalWGGW5aaQ7UjgUGXI5Y/0qzJfstvbpcKxRE+7x0qmL+ZZJF3RxpK3zKpGW9zmpnY8JJtlMgyCnpUMVi3HeQTjZHbtEnTDHmrNxbloUiyoZDkFeaozwh4UuQSd2QUUdORVq/uFt7NlhiJCNgPuwXoTsMiDQeb5hhk8zH392RmpJboRCKRy4kzgFBwFPrWHZSXkar5LRx25bBikbL81sebLNIyJghPvZXAH0rRMZdaRd+3EjZGdxGKbC0EkrJ5Z345JPWoF1BwJEm/fAgLGQOhpzOBYvMsLRyjKnd1U+taOTsO7GzXLKzEPEHHG0Yz+lVvNe5vAJN5ViFBA5/WqrQDzI53RmmB6hcAe5rUyqqJGUtJkEMD0rSELq7DmEurJjaIJAzCCTzGRMfMo55qSNLkQG5Bk8mRcqkowVHoKHuSMSMzZzyoB+Y1FFdfaX/0hpnt1PyqTgKfTjmnflQ1IYME4fK4OBmnjYkiqVEiJnG31qu08fmRYUtkcEf1qIz+S5jkbazcqx/pXOzMaluH84Sz5yeCRyo9KrpGsdvdqWTfJgKD3A/lThM/2lXjJIY5JJ5NSRxompSm4dZbd0BcAfdJ96m4C6bHgqs9qvlu4CqW7Y7Vav7l4kCB/LVuNyc7cdqlhgtri6t1UExpwuT90VRSWM3zqoSaMs67c855Aqo6sEUGR9xuJA7KRxnq1MikKqxzEsbfwsea0kFqLaSS4YSsmUjQNjHc/wBaxIbmG9z5Fs5VXxuPc+30rqgjWKuT+YZBs3/vP4QBxip4lZQYjbxhmPEjNjH60SWxtZwj3kakjd24qTyBOuxpFcHuegrVIY7MtuwV7tHI6GJs7acYGuLkzRykyKMgsxyTVK1igt7khWRTnGTnitC2aL7RuTMrqc5XvWqYiFLUxu0hiG7uSDTXJLFjGuOxHatWR7X7OzXVvOrHooHB/GqfmaecF45Y2A4zzxQxMrwozXELAKhLY3HqeKYbBYbiVmu40ZjkbTyeatJLao+6HzXJPB24xVY2zkl5IgoJ4c/1qZK6GTfZ4JLov9pLkkEADsB/jVwiPfkjLY/1Y4rMiEMOoo0d0jeX1546Vf8APEkhkYKFHv1rNU0guLGYY5h5akSZyOeAR2p97MmeTkMMg/7XpVG5uD5hWOM4GCrDpmodSmKohUH5iCAD0Peh6bCYoZppvNRAsgjJPfmoTeWlvCzzBtmfuk4zViCeFWiHEbnnPXP1qC98KSa3PHdw6gq6YCCXMZKg9xkelSkTcX+0bacedGgC9Bk/dq5DOr2TeX9zceEGcmtWDRdKtbgwvFDKkajLMT834ZqVpY0ylta+VCQSpVcAe3NNxTKRjWE5jDyywkmQFQp4I9KS2trXcFkhM87KVJzhRmtK5hMsW9kIfHG0YzUcAi/s5S1s8Vyj/fY8H2+tZTSWxV0UTpyWkaIz5QHrGc5qa2fYJCHYRtwuwZK47mql9duzeXyYw3zHGKls7lUhljyqJ0VerOe4FczIsS3F0k3yWzKSpXL7Tkmoy115jKFXP3icVEJltZVEETRM7DcGXn681tQ3FrMVlkZGO3Y6MOSPWk0IwESO6d0lUGQj5fmHX6Vfhs5IY980rYX5sRpkqPepo7KBpy0MbEIxMZVT1/u0JDLOsqkiCZsbyTyR6Go3EWNNWOCGOaS4XYQUTcOXfufpTZpbR7dJcqo3fdJ6H1qOa3ixHGsfIPDbuEPr9KjuYQJNoj3oflznj604pARpawvfvLJcweSU/hO336njtUMc8f2ua7VXlhlj2JAJANhA6n1pf7FiitkIcEsSGTBIpy6fFbP+62CQfxK3UYzjFaWEZqT3WQ7MiQI2Y/LcNubqc/Q/yq/BdT3kkxuLrnbv3HAz7UsclqyPE6RwAZyjHAUkdfzqC20pDDKu8TDGFmDcLVwXcNTU8yK600IEKyryZScZH0qlHK8jqrsQF6NnqKfBZSQiISzq4D/Mc/w1Tmv7Iyyldp2k7AxwD711Ra2CxoRyvImXcMA3ygHpSPEIkWSOTBDbiM9aoQO3lLJHAux/443zj61KCzOyDDO3T0qHFNFJBHeJcRMqlU3cJU15iWxjijKyyRKc4GSD3qe/0S70a9a4jsxKgXKiRcFKz/tMlraLMzgGZizZXBWueULEg1td2uoWwjkJtzGrMwTOMjp9auRXImkKli8Y4ePIXOPf60+2mikhyJkG1f4Tnd6UtvbxyI2VCM4Pzfj/AI1kwLlirIWkjh+QN82OQPpVFLBkiupsPHJvJjwOua0Y38uPA2ssTYbYeGOOtJA5dFDFmLNkBe3NVF2Ay7wxl1Rp4oXMQURuM5zwT7GqbKbe2nSXYCoUrMvyiHnHI9+lWJfMneW6kTzHjbYm5fQ1GsDi6e4mlMsDqN74+QkchT7iumEilIrXhS4gumW7R5PLXYVIOcZzTY5103Cw3QuZm6TAfdHpVjUvJhvoI1ighTyPMdl6qxJxx+FZ20oHjMZI3cqBgrWykWtSb7RG8fNu24k5wOtSWzTpIpt1eI5/h61G0iLjaMHHIBoX7QjB1ZlB6H0qtxsskybiZ3kD57tyaieNHkDP8xPvU/ksjK0jGQt606dGbCxpznr6U0SNgthHOCS6R9qlSUmN18wkbsZJpPLcHczrJtXG0npT/KMMYRZcbvmIx0qgBlxwsQdfQd+Kr2aod8AkV7v74g6sBn0ps65BOHkI9Dit/S9Oh0+1EkUaNNOcmZuu0jpn2osNK5W/si/nAka/ito05aNI9zMR2znill0XTblEE9q1y6/dZ3wVrUkbKkeU2cVXjBDrkFeaLIpxMqfwXpWoOk8qzkocLAsmB+ddKLmTT4hbW6qlgse0WyjIRu7E02JCpGQVOafDFJcuIluBhQ28gfe6daLInlM8zW/2d0EQDZDeb1OO3FSfZWfTILqd2aCR9zMV+RPSp7pFhgli3hPNwq5HJ4NZ9tLPDoUXmsTAJcJED1YA4oaQWKs+p3BmeGDU4jApKjZjrVQyeXvDu87DsG+6fWrF+t4VV2VIpXGfLIw27vVGAjTYLl3jNy7r823qprkqRbEyxbxNMsksltL5e3PmEcE9qeWePyh5Sjedu0fezWfaX88umISzJGSQyseCM9fwqa4mMkySAbpCAdynrjv+VcrJbGXkotGDM4G5tp55FS2TRuJI3bbhOVxzn1zUa2tpeXb5m2bAGYN1Y+grQS5sreExvGJJHQp5jcbj6fhSbFcdeTXDm3jFyPsyD92ijnPrVUXsvmqzKdq8N5nGT61BJO3muFUB15QD09qhupkwqyI7K3UYzzRFCN6ynVoZm8yMHHDZ6+1E80EMzSXTq9uqBF39yay9Kme0sf8ATodjGXAQJyF55ptneo7SR6jt+YEAt13fwn8aaWoFh/sYaQWCrIFjBBjJ5qaDVLeJU86JInljxuByR2wazVtp4IGiMYVmH3342/8A1qy5GMQlJeG42uEO0/eyOo9q1QG5cW0dyNzsDCCpjwvyk+1TSNJGyRvvjTBOUGFk9vaqNvseEoPnCgHCngfStCNRKgxI0qSYxEf4MdanUZXNktwguxKWgU/LDGdwB75NUb6wkt080WTOpJdSo/StiSyCTiSBWjiXkrt+VqQ3srqY4bZpckgInRPc1SnYaKKiWK2hnLIhdfkjx82PTFWISsASR3WN5OQG421as4Y/LLXLbXyNrEZPHYVDqRgn8sxhAyg7iOTW0XctI//Z",
"path": "images/3pts_ADE_train_00013507.jpg"
} |
depth_point_159 | images/4pts_ADE_train_00015722.jpg | ADE_train_00015722.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 77 y = 183),Point B is located at (x = 234 y = 200),Point C is located at (x = 117 y = 156),Point D is located at (x = 313 y = 207).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_66><DEPTH_81><DEPTH_46><DEPTH_46><DEPTH_78><DEPTH_78><DEPTH_78><DEPTH_50><DEPTH_50><DEPTH_33><DEPTH_63><DEPTH_76><DEPTH_30><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_60><DEPTH_29><DEPTH_76><DEPTH_84><DEPTH_77><DEPTH_49><DEPTH_70><DEPTH_31><DEPTH_70><DEPTH_40><DEPTH_31><DEPTH_82><DEPTH_44><DEPTH_84><DEPTH_26><DEPTH_26><DEPTH_5><DEPTH_17><DEPTH_83><DEPTH_20><DEPTH_67><DEPTH_74><DEPTH_80><DEPTH_81><DEPTH_83><DEPTH_67><DEPTH_43><DEPTH_40><DEPTH_26><DEPTH_84><DEPTH_26><DEPTH_70><DEPTH_75><DEPTH_25><DEPTH_36><DEPTH_11><DEPTH_12><DEPTH_0><DEPTH_26><DEPTH_32><DEPTH_53><DEPTH_8><DEPTH_33><DEPTH_36><DEPTH_59><DEPTH_13><DEPTH_50><DEPTH_0><DEPTH_121><DEPTH_55><DEPTH_98><DEPTH_98><DEPTH_10><DEPTH_11><DEPTH_49><DEPTH_11><DEPTH_77><DEPTH_64><DEPTH_45><DEPTH_39><DEPTH_94><DEPTH_98><DEPTH_37><DEPTH_44><DEPTH_78><DEPTH_19><DEPTH_64><DEPTH_36><DEPTH_72><DEPTH_78><DEPTH_33><DEPTH_121><DEPTH_37><DEPTH_94><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_94><DEPTH_94><DEPTH_14><DEPTH_39><DEPTH_94><DEPTH_23><DEPTH_END><DEPTH_END>. Since point D has a higher pixel value on the depth map, the answer is that point D is closer to the camera. | D | long | 4 | [
"C",
"A",
"B",
"D"
] | <DEPTH_START><DEPTH_66><DEPTH_81><DEPTH_46><DEPTH_46><DEPTH_78><DEPTH_78><DEPTH_78><DEPTH_50><DEPTH_50><DEPTH_33><DEPTH_63><DEPTH_76><DEPTH_30><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_60><DEPTH_29><DEPTH_76><DEPTH_84><DEPTH_77><DEPTH_49><DEPTH_70><DEPTH_31><DEPTH_70><DEPTH_40><DEPTH_31><DEPTH_82><DEPTH_44><DEPTH_84><DEPTH_26><DEPTH_26><DEPTH_5><DEPTH_17><DEPTH_83><DEPTH_20><DEPTH_67><DEPTH_74><DEPTH_80><DEPTH_81><DEPTH_83><DEPTH_67><DEPTH_43><DEPTH_40><DEPTH_26><DEPTH_84><DEPTH_26><DEPTH_70><DEPTH_75><DEPTH_25><DEPTH_36><DEPTH_11><DEPTH_12><DEPTH_0><DEPTH_26><DEPTH_32><DEPTH_53><DEPTH_8><DEPTH_33><DEPTH_36><DEPTH_59><DEPTH_13><DEPTH_50><DEPTH_0><DEPTH_121><DEPTH_55><DEPTH_98><DEPTH_98><DEPTH_10><DEPTH_11><DEPTH_49><DEPTH_11><DEPTH_77><DEPTH_64><DEPTH_45><DEPTH_39><DEPTH_94><DEPTH_98><DEPTH_37><DEPTH_44><DEPTH_78><DEPTH_19><DEPTH_64><DEPTH_36><DEPTH_72><DEPTH_78><DEPTH_33><DEPTH_121><DEPTH_37><DEPTH_94><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_94><DEPTH_94><DEPTH_14><DEPTH_39><DEPTH_94><DEPTH_23><DEPTH_END> | 77 | 183 | 234 | 200 | 117 | 156 | 313 | 207 | null | null | 27 | 199 | 2 | 226 | null | {
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",
"path": "images/4pts_ADE_train_00015722.jpg"
} |
depth_point_160 | images/5pts_ADE_train_00018021.jpg | ADE_train_00018021.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 224 y = 171),Point B is located at (x = 319 y = 171),Point C is located at (x = 263 y = 215),Point D is located at (x = 285 y = 138),Point E is located at (x = 124 y = 199).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_59><DEPTH_49><DEPTH_49><DEPTH_29><DEPTH_74><DEPTH_3><DEPTH_67><DEPTH_30><DEPTH_17><DEPTH_68><DEPTH_31><DEPTH_3><DEPTH_31><DEPTH_69><DEPTH_74><DEPTH_70><DEPTH_40><DEPTH_58><DEPTH_73><DEPTH_4><DEPTH_3><DEPTH_49><DEPTH_59><DEPTH_29><DEPTH_49><DEPTH_30><DEPTH_69><DEPTH_38><DEPTH_5><DEPTH_4><DEPTH_31><DEPTH_29><DEPTH_59><DEPTH_49><DEPTH_59><DEPTH_38><DEPTH_49><DEPTH_59><DEPTH_6><DEPTH_68><DEPTH_59><DEPTH_29><DEPTH_29><DEPTH_3><DEPTH_70><DEPTH_5><DEPTH_80><DEPTH_82><DEPTH_67><DEPTH_27><DEPTH_59><DEPTH_3><DEPTH_49><DEPTH_31><DEPTH_59><DEPTH_70><DEPTH_61><DEPTH_40><DEPTH_20><DEPTH_61><DEPTH_49><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_74><DEPTH_31><DEPTH_45><DEPTH_72><DEPTH_20><DEPTH_27><DEPTH_36><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_74><DEPTH_44><DEPTH_73><DEPTH_27><DEPTH_64><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_64><DEPTH_25><DEPTH_77><DEPTH_14><DEPTH_19><DEPTH_25><DEPTH_25><DEPTH_44><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_19><DEPTH_84><DEPTH_14><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 5 | [
"D",
"E",
"C",
"A",
"B"
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"path": "images/5pts_ADE_train_00018021.jpg"
} |
depth_point_161 | images/4pts_ADE_train_00005168.jpg | ADE_train_00005168.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 53 y = 176),Point B is located at (x = 246 y = 126),Point C is located at (x = 84 y = 163),Point D is located at (x = 11 y = 126).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_60><DEPTH_35><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_70><DEPTH_59><DEPTH_11><DEPTH_59><DEPTH_59><DEPTH_49><DEPTH_50><DEPTH_45><DEPTH_11><DEPTH_17><DEPTH_70><DEPTH_67><DEPTH_40><DEPTH_67><DEPTH_3><DEPTH_94><DEPTH_27><DEPTH_98><DEPTH_48><DEPTH_40><DEPTH_70><DEPTH_3><DEPTH_59><DEPTH_31><DEPTH_59><DEPTH_98><DEPTH_24><DEPTH_94><DEPTH_1><DEPTH_11><DEPTH_77><DEPTH_25><DEPTH_3><DEPTH_63><DEPTH_29><DEPTH_34><DEPTH_49><DEPTH_34><DEPTH_65><DEPTH_83><DEPTH_25><DEPTH_38><DEPTH_69><DEPTH_29><DEPTH_25><DEPTH_61><DEPTH_8><DEPTH_82><DEPTH_27><DEPTH_53><DEPTH_58><DEPTH_44><DEPTH_39><DEPTH_82><DEPTH_44><DEPTH_1><DEPTH_1><DEPTH_46><DEPTH_32><DEPTH_11><DEPTH_45><DEPTH_9><DEPTH_45><DEPTH_36><DEPTH_78><DEPTH_1><DEPTH_57><DEPTH_0><DEPTH_71><DEPTH_63><DEPTH_41><DEPTH_46><DEPTH_57><DEPTH_9><DEPTH_2><DEPTH_0><DEPTH_41><DEPTH_2><DEPTH_71><DEPTH_39><DEPTH_42><DEPTH_14><DEPTH_78><DEPTH_9><DEPTH_0><DEPTH_2><DEPTH_58><DEPTH_47><DEPTH_23><DEPTH_25><DEPTH_33><DEPTH_57><DEPTH_16><DEPTH_76><DEPTH_14><DEPTH_END><DEPTH_END>. Since point D has a higher pixel value on the depth map, the answer is that point D is closer to the camera. | D | long | 4 | [
"B",
"C",
"A",
"D"
] | <DEPTH_START><DEPTH_60><DEPTH_35><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_70><DEPTH_59><DEPTH_11><DEPTH_59><DEPTH_59><DEPTH_49><DEPTH_50><DEPTH_45><DEPTH_11><DEPTH_17><DEPTH_70><DEPTH_67><DEPTH_40><DEPTH_67><DEPTH_3><DEPTH_94><DEPTH_27><DEPTH_98><DEPTH_48><DEPTH_40><DEPTH_70><DEPTH_3><DEPTH_59><DEPTH_31><DEPTH_59><DEPTH_98><DEPTH_24><DEPTH_94><DEPTH_1><DEPTH_11><DEPTH_77><DEPTH_25><DEPTH_3><DEPTH_63><DEPTH_29><DEPTH_34><DEPTH_49><DEPTH_34><DEPTH_65><DEPTH_83><DEPTH_25><DEPTH_38><DEPTH_69><DEPTH_29><DEPTH_25><DEPTH_61><DEPTH_8><DEPTH_82><DEPTH_27><DEPTH_53><DEPTH_58><DEPTH_44><DEPTH_39><DEPTH_82><DEPTH_44><DEPTH_1><DEPTH_1><DEPTH_46><DEPTH_32><DEPTH_11><DEPTH_45><DEPTH_9><DEPTH_45><DEPTH_36><DEPTH_78><DEPTH_1><DEPTH_57><DEPTH_0><DEPTH_71><DEPTH_63><DEPTH_41><DEPTH_46><DEPTH_57><DEPTH_9><DEPTH_2><DEPTH_0><DEPTH_41><DEPTH_2><DEPTH_71><DEPTH_39><DEPTH_42><DEPTH_14><DEPTH_78><DEPTH_9><DEPTH_0><DEPTH_2><DEPTH_58><DEPTH_47><DEPTH_23><DEPTH_25><DEPTH_33><DEPTH_57><DEPTH_16><DEPTH_76><DEPTH_14><DEPTH_END> | 53 | 176 | 246 | 126 | 84 | 163 | 11 | 126 | null | null | 164 | 42 | 92 | 206 | null | {
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",
"path": "images/4pts_ADE_train_00005168.jpg"
} |
depth_point_162 | images/5pts_ADE_train_00019089.jpg | ADE_train_00019089.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 66 y = 219),Point B is located at (x = 24 y = 122),Point C is located at (x = 140 y = 121),Point D is located at (x = 309 y = 206),Point E is located at (x = 204 y = 107).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_9><DEPTH_14><DEPTH_39><DEPTH_32><DEPTH_33><DEPTH_0><DEPTH_50><DEPTH_46><DEPTH_33><DEPTH_32><DEPTH_35><DEPTH_40><DEPTH_43><DEPTH_20><DEPTH_14><DEPTH_9><DEPTH_25><DEPTH_63><DEPTH_18><DEPTH_20><DEPTH_11><DEPTH_70><DEPTH_30><DEPTH_7><DEPTH_0><DEPTH_39><DEPTH_13><DEPTH_13><DEPTH_63><DEPTH_85><DEPTH_70><DEPTH_40><DEPTH_69><DEPTH_20><DEPTH_32><DEPTH_14><DEPTH_14><DEPTH_98><DEPTH_32><DEPTH_14><DEPTH_70><DEPTH_70><DEPTH_67><DEPTH_17><DEPTH_33><DEPTH_46><DEPTH_62><DEPTH_51><DEPTH_62><DEPTH_14><DEPTH_3><DEPTH_31><DEPTH_40><DEPTH_22><DEPTH_55><DEPTH_66><DEPTH_27><DEPTH_23><DEPTH_46><DEPTH_39><DEPTH_35><DEPTH_31><DEPTH_3><DEPTH_6><DEPTH_45><DEPTH_57><DEPTH_54><DEPTH_28><DEPTH_50><DEPTH_27><DEPTH_11><DEPTH_20><DEPTH_67><DEPTH_5><DEPTH_85><DEPTH_32><DEPTH_22><DEPTH_57><DEPTH_36><DEPTH_18><DEPTH_5><DEPTH_13><DEPTH_94><DEPTH_57><DEPTH_9><DEPTH_82><DEPTH_23><DEPTH_94><DEPTH_27><DEPTH_39><DEPTH_17><DEPTH_26><DEPTH_8><DEPTH_1><DEPTH_12><DEPTH_68><DEPTH_94><DEPTH_32><DEPTH_55><DEPTH_14><DEPTH_END><DEPTH_END>. Since point D has a higher pixel value on the depth map, the answer is that point D is closer to the camera. | D | long | 5 | [
"A",
"B",
"C",
"E",
"D"
] | <DEPTH_START><DEPTH_9><DEPTH_14><DEPTH_39><DEPTH_32><DEPTH_33><DEPTH_0><DEPTH_50><DEPTH_46><DEPTH_33><DEPTH_32><DEPTH_35><DEPTH_40><DEPTH_43><DEPTH_20><DEPTH_14><DEPTH_9><DEPTH_25><DEPTH_63><DEPTH_18><DEPTH_20><DEPTH_11><DEPTH_70><DEPTH_30><DEPTH_7><DEPTH_0><DEPTH_39><DEPTH_13><DEPTH_13><DEPTH_63><DEPTH_85><DEPTH_70><DEPTH_40><DEPTH_69><DEPTH_20><DEPTH_32><DEPTH_14><DEPTH_14><DEPTH_98><DEPTH_32><DEPTH_14><DEPTH_70><DEPTH_70><DEPTH_67><DEPTH_17><DEPTH_33><DEPTH_46><DEPTH_62><DEPTH_51><DEPTH_62><DEPTH_14><DEPTH_3><DEPTH_31><DEPTH_40><DEPTH_22><DEPTH_55><DEPTH_66><DEPTH_27><DEPTH_23><DEPTH_46><DEPTH_39><DEPTH_35><DEPTH_31><DEPTH_3><DEPTH_6><DEPTH_45><DEPTH_57><DEPTH_54><DEPTH_28><DEPTH_50><DEPTH_27><DEPTH_11><DEPTH_20><DEPTH_67><DEPTH_5><DEPTH_85><DEPTH_32><DEPTH_22><DEPTH_57><DEPTH_36><DEPTH_18><DEPTH_5><DEPTH_13><DEPTH_94><DEPTH_57><DEPTH_9><DEPTH_82><DEPTH_23><DEPTH_94><DEPTH_27><DEPTH_39><DEPTH_17><DEPTH_26><DEPTH_8><DEPTH_1><DEPTH_12><DEPTH_68><DEPTH_94><DEPTH_32><DEPTH_55><DEPTH_14><DEPTH_END> | 66 | 219 | 24 | 122 | 140 | 121 | 309 | 206 | 204 | 107 | 6 | 27 | 53 | 158 | 138 | {
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9d2OuDW1O2txNPQ7AMCAcYJGfajIB6GsyC+jESLluFA5Bz+OKnS7RugJ+iN/hWTaRXIy7uHvVe/uPKtt2TlmC/KcH8+1Kshbokn4RN/hVbVVlW2zHFKZgcopQgMfTkVLmioQ11IbGym1e8xbPPvyNqhyxUYySSPoPzrTjkidiBIzSJ94nr9fx5rC0vWNc0u9+0WGnywy4I+UL6H1B9a0fD9lqt1ftJcafLHbbCGOBkt296lvl1bOicYzVo6WNTC4PNLGcHFa6aOT/AMuc5/ED+tTxaGxbizkJ/wCug/xqHiIozVCTMN8HOWOfQ0tnE0t7EqDdtYOeegB5NbN1oc6IJSY4lLFQjDceMZ5B96rwWVvFqFvh8uHJA/A04V4y2JnRcVqzS7nGOvemtjH8PrwKlbncOevp70m3/fOTXYchyVxKxDujKrPOyKWGR949voKrSRzTwOrzAlhgnbzn160T/wCptucf6a3X/eapwByPevOm3F6HqQSaVwJuHkndJVRZc4XywdgxjAPWi4edroPM8bedndiPac/XP1q15LpHGWjZQ43KSPvDJGR7ZBFVL/i7sh6s3/oNHtJS0YckVsUoLuKOaRWZl2jBZuQOhJz9M/yrTimsjfKsNyElVY2CsGBcfxYGM+tZOl6abvU/O+3QyINwfbHxxjHB7/N1PFbms6It1NFemWK3uodkiNGoIJU55H+eMV6EKjSsedUpxcrmjqiiWEQOnlygtsBXbleOo9f8965azC3u/wAsswQc7VJ5/wA5/Kty61pNdeG5tkGF3KZcNhiOcD/9VYCW88MKPaSvbtcowlhDgbhxjJ98/wBKKlklqTSu21YXJX5cd6buH0qJree3t0je/hjYgMHID7R1Kkdj7VZ02ykN86Xd0J0CB8hViUA56nFSpJmnLom+ozd7VA14gnEQ3Agg5B6HqK1tehS30xpLVFiJIxKFZsD8fyqL7NpaQPHI8jTTuCMMAVJHGABwOn51V77CVluOt9O1Ca3F5bwOERtwdeCSPQd6uaX4fmkZLn7a0J+8qxKcrnryT7np61Qu7q5fXdPSO8EMcKJH5AAxgqcnPqea7ize1iiAa4gX6yL/AI1cbIzlsctfeHXsleaC/nYFSGR1yGGckdfUVJpOlRT6S08zTM7N5MQMpwq5HH0yP0ror2707aQ19a47/vl/xqneaho8dvDBFfWhTcCQsq4FVuyb9DlNVtUs7pYlxgLxjr1q7pukMWjuGbDKcgdR+PrTNTuNIkvYJVvbchGy+1xyBV+38T6XK8cFpHLO7NtXYABn6kiqjT5mKVSyKGqaV9njaZH3AckZrB3q3ORj0xW3qfiixnt5YhAxbBGJh8v6HrXNpZXUyLMLxkV1DhSo+UHnFRUp8rKhPmWpYZlHSomfI61D/Z14w3LqQKnoQgNMfTrw8HUv/IYqLGl0dD4LsrXUL+40+7jWRo2XnvjHOK6jUtGthI9lHCotojlY+w75+tS2WnWPh57S3s49s91u3yM2WOeASat3Ab7ZcszbsbiSfTFeO581VtbWPTldQsZFjoVi8D3SKqzQSbceX0PrnNZ+oaTbQI9yYYnJ+ZsxjNbVpdiG0vCxUR+b8x9PaqN/fwHT2kVxtb5Ax4B+ldNPqc1XpcqLYrHBs+y2wJGCQgGe/OBzVd0giyfs6naQPljHP6VuTxsqRswx5ihx9D0rmNRuvIujbquZC3zBv0FbrWNzB72LEn2e5j2G3Mi9TtUcfXFNiWzjc7bTDIMj93k5q9CUt7J5jGiso3MAvt0qOK3untYDHFjoW5FJPmLtZD1u5f8An3k/Ej/GpftUwwFgY5GeHFR6sqhxDIJIipZ2CNj5cAAH8aXS7LEPnF5MshHzPuCtnnH5GnbS5N7S5R0OpYZlcquAf+Wg7dqW71ERQ7riKPycgZZ8jPbtWPJcPItxdQWckkTSEFk2gKTnA5PWlvb8XWnzxXNnc28zxRAAQkrlCx9+uR+dZRTl8S0NZWjszSilsrqVWt4oWVQpY7iME/8A16mufEa6ddtYtbyQyROPMMRBHTOOayfDwL2F82cPtRfmGABuznJ+hrsPDN3Yaj4i1IvHHKxl8xRJEML27/xcdvSnXpxhJ2V0iqcrq97MZBr7XMSvEiRlmKqsmc/pWpof2q8u4pTIiRk5OAeRuA7/AFqz4wktLZLaUCPzmYDkYJH9ecVPZSWlrYy3aTuweMQ7Yxv3PngYAznOa4HNvZHS1+75lubfirTbW1sPkQI0pCxn/poPX2Iz+QrjBarbT26ssYchnztO7OMdfSun13W4m12wtVfeAN77h93OMD2OMn8qg1e5W5vFjSEbUTIl/HpW8Zc1VOKsuxyQ5lSd9WYaqDzt/WsnURdW04uI53ELkDbwQj9s/wCyTwfrmtwRE9l49TUdxbefbyRbVIZSOBXpS1Whyw0ZwUkIuLKDeGjIutxAOCp3H/GqtzqNvaNhpAWycBiP8OaTXpGbT5bqGTy5WIWWBR/EMAt3xnrzjpT/AANb2EtwGuYmmmeNpd0i52jdgAdu2fx9q5qcOdXfc7Kk+VWRDa6uruVuLgPGCAmwnMYyTgj05rQmt0Go2bh5HXLdWyORWnrmi2Gr6dLcW8DQSxgujsuw5Hr7HtXF6XqVxNOLKVS5hyCsZXkdDgmrnSs9GRTqJo78aLDpe6doBZsqb40ZlTzkyFbG4jd2PHpTbzV9Ka0hiSUJLvJleeWMADsB82f0qloXhrTPFF1aTRSvFbi22PEZCXQqDjqD2Ck445GAKbeeCNOhSFk8zLEhy0mNmBwener5lsY8jetytc3um7WU3kIVhyFlIyPwrLk1HTAQBdpkLtG0McAdBVy40W0UEGaPj/aqhJo9ghyZIxn/AG6OXm3Hfl1RDLqFoWeRmEhbJLNGxyT36VTfUoG4SSQHjgKe3SrUmn6eAP3sP4yf/XpjWumRkET2wPf5gf61SppEud0Un1JJAVaSZxnkYP8AjUJvYBn5HOT3xWg1vpY5MluAevvTT/ZeQI5oWx6LmrUYkuTM9ZBPJtiibPfJFXIrS6dWkEKAIcfM3WkabT4sjz1U+ykUC7s2+QTFyewU01ELk6QXbw+YsMRO7bjdz39vaqghuriZoz5cYHXc3FPRonEhRJCIyA+1Pu56Z9KaSixeaI5wqkgsF/ShqwK7KU8RjMiuygKD0ydx9qiNyFjAR9pxgjaOlasdzaalC0cYw8MbsTI20cDuOprFukEakxnzVzgOo4Pr+FOO5nUhzbAbudm2htxY4BNdAsbupghdz5YCn5jgjHas3T7ONWSRiSWj35PbnFblnIlvKViReFHzZ+971UpObsaQpqEOaRXa3mt0y7vtC/dViMVHYxS3Us3nSzReUw+VeSR/vda0dQvi6soRQG4AUZAz+tZ/2+S2zIqeapAMmFIwey//AF/WlZrcjmT2PWprZ/7ctr26jUxopU4HIGMDFUtUuobu/laFcrkYUY44rm2QMSC8h+rmq13Y2kWybcfNP3lJxjHvmvHp0bSTbPSqVk1sb6/Jpd7aywzAzyKysqA7cde45rGubSZ4raJRIwhZj80YGQenfrVpbmPU3EQhdix3orMT1x/hVe4sltZSGRSD3B6V0cijKye5g5cyu1sXzqNy0MaNBKCqBDgjBA6d6x3tjNffaLiNgOcKrAEdMdTU4jjCl/JBUdTipVSE/wDLJPyrRRuuW5DnZ81iK5uohZywk7DJwGZxxWnHqIt7eOOS1cbRtJ3qMn8az54reRNjRpycDgdabZ6k10jRTNbumN4woyD0/pVRhG2jFKo3rYtpeL/ab3TQb1ZNoDOufr1qf7XF9jkgSBkBztO5cAn8arAQbc7I8Z64FJm1JwRDn04pOF+oc/kY/wDYk8jRLJegRI24ocMCfpmrEuiF7iNE1jbB8u5ZpizcdxyPy9hWiUgjAaSBEGMkkACmBrRp08tIywycgZx/hRqloy1K72NC103R4LG4t2vmkNygWRzt5wc5AqtD4f8AD0Eqyf2rqJMZ/dhHX93zn5TgkU83EMb+WzKG44x61OXeKLzJEKL69ePfHSpemrluCk30NPS9N0bULiWNV1e9YYDNLNn75x6dzWzYXfhiwmBSC586Nzu8xnJLDueOvFchCZL3UIEtpmQgElgCPTHWtC+hk01o1mLsXXOVBfP1xWE6dNyUL6mic5R5uh0z3XheRi7wO7k7txlkznOc9KVtV0IH93b9RjlpP8K5WFjPFNIiSYhUM2UIPJxwO9R/aOAxhnC56mIgfnU+xjtclN9jrdONlfwSSwl3USMhDMflIA4HAOOf/r1dFpbLwIQR6Ek/zrK8Io39lzu6FRJcNIgJ5wQPy6VvgA457816NLSCRyVNZOx4tqNpC8dxK7GORpnRGB+XJJGCP1z7VQ0a6k0nWwl5DIwVDbsquMBs5U57grW3qpWOTJA2jUCp3HA+8etU5fD8tyJHt9U04yk4LySAArjhSp6kYqKak27dzolJRSuyprGuXwup3mjmiXGDubAkAXAPX6YrB8No8upK0fmSRqWwMZKkjB6evHPTpWzJ4UlGXl1DT2xyiI42kepx1/8ArVoXFrJayafbkWqxP8kqWzjEpCkhnA5J+uRWs01F6ExnFtJM2rQWMGgWekQypNewfvbt4hgKzDaqBu+Ap6HFVzZQOf8AUK2D3IrJ8K7nuhCqE7oEB2nGAGfpXRXEIt5mcK4QuEVS2evQ1zycVOzKSk43RnnTYO1nDn3NMbS4iMiztQaklu50UkW5YDqVbJFKlzLJEJURChGQd/8A9atVyvYybluy/quhaDa6RbC0lt5tSmSJmRWyIzgl8j8h7VjLp+OtvZn/AIBSLYyWm64ZVMnmNIcns3OAfSpmlnAB2R89PnPP6Vej2JfMtBv2bH/LC0H0jH+FJ5JA4jgH0jX/AApJp54CDJHGFx13ZxQhnnYqiw8YJJcjFGg/eApIOgh/74X/AArON4DeSpcxghBsVSny9fvdqvF5wPmjQE9Ociq8aT388sSRhnj5BB4x68/jSuXTvfUprpJaWG8t38py2WA/jXpg+o5p8UYjTdgE7ARGgwAe/NXrGAMjNJKmI32/McY6cfzNMg+yvcOFnTDE7QHzuHTNVcTWrMK5kZiGdwX8uUY/CtS4+0/Y3zHbFQhPA9vpVLWPLW7RI0wAkoPHB+XtV0mWSEodmPK3HB9uOtK4SWqM3S0LiLEcT5hBPmrnHzHpWuBeAYjuEjTsirwKyNNaRTEse3JiIJbPZj6Vp5uuxh/WiLJlvYlVL1m5vQB/uj/CtC+8uHRVCXcRvduCQ3zA564+lY7y3MalmaAAexrPlSRpo7oyx7i5+UuNp4xgDOatMhq56LFp8UdzDdyIfLjJQqg6n1I7+tQava28l20S8tjcMngiqFt4pguYoUjlA86TEaEfPuAySQOg6CpriZpA0bEqhO9+fuuegHsa8rD0W0nU0Z6NaS+ygspEtfKkhVdxVo8nqoz1/lVy4haVMyDG5cqSOtc5ay7bhpWMnll+Vzn2rRuNWgRWRSWk6bcdDVUYcjab9CJy5rNDra1I0xI41Zm8xmY4zgZ71XvdJFsXdxGQecqc4FFjqDW9q6yhiyncNozkE1Lfal9o09XKsrN8pU9j/WrSUJN33Ib5onH6heyJd+UhVLZvlyqg7h0znHqP0q/o10ksLW8qRyyw4UMqj5+P5jBrXi0W31CZNQkaN4WjKiFovunuQeP16Vnm1ks/EU97GoIYBiq5J9/ocfyrtbg4abnOk1LXY2dMgd5BMyoLfhwoUZyOlXJ720vlWOFAZFky4KYIH1qAXbm33oPkJ3EhcZHv71m29xJ/aHmiKQeacYEZGB2P+fauXqbo2bratkVMZ8xeVBOcCqtlal7gysQo+9uYHgYyOB2p949wIWZULZGAMZptlIYY/KnlG4cfOfvD6U0kkJtvYYsslxPtZNkaBTlhy2emK6m38lraGOSUyRDnG1RyTt5wPeuSjD+YswRmSU7X2gnA7H8K1IJZbdkt0EsvUlguAPTJ/pXNWg5N37G1OSjY1tOit472Yhs7NwQ9x71p3Rt7jSre6kjZ3A2gL1btj9M1zumxXC3DI8MoDndvK/mPzrQu0vfIt7aGFiq8tt5ArmlBtq71OiMk9loaGmsFgI+zFS3DBiTx+dZes3i2cUsMoGC6+WNpYHC8HH5/XFNTTrx2JCyxgdc1Q1G5t7LcdQvbW3uhteKK5nRGKAkZwSOuD+VWoJSuncTk7aqx2eglHhuZIgVSSQOFPBGUXPHatZflP45rjvDGvafO0sNrfWsrGUyGKOdZGVOATwTxk/qK603ducHeeO+0/wCFepRVqaTPNqv32eTanGkzzxyIsiG/YMrDII3GqMelacWk/wBFhODggDp7Vo6wAv2hyrlDftjaDllLdqbp2iLYW0KIBE1wdpiIwQ4HUkkk5AHPSsGnrZnUnHlV9iuNF09iMWids9aYbG3tNQtnihCu5cFsknGPeuhurdrSSGzVB5jhXWWQgZ46Y9sHnPpWPdP5msWcScuJGG1cnI29vXtSkqidrji4NXSMnw6zJfPJG7CSC0Z1Rf4mDOAD+dU9bguTf3H2jWr6yhstLS8mFqpcs5uFiwF3qM/vASc9q19L0ue21ENslhmEe4+YAox5jZAPfgg/lXO6n4obSPFWqsRdslxZC0R7W5+zSxL5qS5DbW7oV6chq6qcV7T5HLVfuadyfwRdzXF3qsaahd3FuVULJcfKxyG6jc2PzPStizWTT4jY8yM7qFcYwCxweO3Sud8JyXWpXesTWckqrM0Zka7uPMkOd3V8Dcc+w7V1Nvps8aStNNF5xcNGQcgY55/OpmmqrsTF3grl+7/er5Y/uYb681lRzySW+SqrNGCMt/FtYZx74rVkyYT+8USd8dM1RFizJGI2VpEYuxx+dVGyY27mXqEpcs8LbnHAG7qOnT8D1qSwTUTdOJIgoAAYZ/l+tWdTsjcFozL5UyKyfNkYz6irduftWmRXAkHnBQkoUHlvpTl5Au7KkwbzMMxIIwFBxk/WnW1wbeeRlGzETkqPoMfzojt3kuWfzPM25wgH3fUmmTWjb5J84QwlG59x/TNJAnaVyhFbzTxeXIqsXuY2ZCw5TAJye3FW9bsz/a/2uPYsGF5XAUk9SP0/OmRWtq8u9I2WKNgzyMcgkA7VX1JyfoKqSR3MslyEYhkjL7FOc4I6CtVTUouV9inKSs7aN7kGogSSxzjIJV1I9flPP6VeEJuNLaaOYqxt9uc/dIGKga2v59vnxg4TzBMMKhQoQOfY0+1jSC3LifCPGCVB74rJMTWpnWLvaQWkjrhXiILOdoJ3ccmr732zlxAo95xXOXpM1giyXO2OIHYGYkHnoP51f0DQobqylu1ulLZZI0MRJAABJ64HUD15NXoouRLV5KJYvbn7XbSQR+W8kq7UWOQMWOeBxVdfDN3p9qb29iidkcJ5avmRDwQxAPQVcjSbRdZdrOMSziMQxyeXtwxHYA8nBrb1exu7OK1u7sxtdtiOdQmRj6k9R7e9Q5u3um8KUYv3yxE1lBIWg0axjbuyZycVcfU5JfvWsB+rGsKC5eZS0ZhYdMgmpVmkaRo1e33r95QTkfWseRXI9pLuS6xcD+wr9VtYEH2WUDbnj5T0rk9W8I21loE19HYavEsVhZXK3svz288kyRM0YxGNuPMbB3H7mDya3tVeY6TeRlosvBIAozlvlPArjb3xJe3lpJaDTraCWa2gs55ohL5kscIQIpDOVB/dIThQcj3IrqoJJM56rbep6as7josA9cIaf5spAGYsDts/+vWLb3sksvlhgrYJG6Prj8avotzIdqSqWxwAmP61zuKWtja8n1LfmTdpwPpGKlsVmdG82R2KvjOAMjGfT2NZsi3MDKksm0kZGFBqOS/ksAG8+UCRgrGNevcA47VUXGxLTNF5pAW23DBR3KimW98bmFZobpnjfoQP/rVl/b7Z0lDX2Ao+cMAOD7Y5qtpF/bTgWqXLROvAB2gHnjB709Ow0m+p0LXEkaljPJ6YAGT9OKIZTvZo53ywGTxzx9KxoLyO5ZY3F204baI0+9u9OKEuYhPCkDzJ5hIJZs5x7mps+sXYSav8R0QnmH/Lw/6f4U9bm4U8XEn6VRt7S6uGHlCZ0IPzbwOfQcVM1kY0bfPKsinBQv60moXL9+17nY+FIbS/S4/tK5k3LIuzEmz5dpz0684rm5bm5ErL9pmwCRjdWUmqNp0vlx3V3FuI+ZHJ/Hj6015bcSsjTTGTg4aQ/Nn3707RtsiffvuzT3yN1llP/AzXF+L7a0inutXurVb028NtBHBK7hN0jTHe21g2AIyMAjlh9D0cKR/LHK8hl92Iz+tc9q1hrt3rjyeHIoriI2QW4WRopI2CuScrLkHBwenB6VpRlG90KtCaVmHw2Fv/AMJ3eta2strC+nB1hlJJXcYicE8lcklSeSuK9eVTu/1ZHvurzPwBoXiK38TTa1rFuRHdWpVZjIh3ElCoCqeBheBgAAYr00J8+TEw9yelXPWRnBaHM+JMyaNp1ztHmPJsyBjOCcfyrStLLTodPVpI2laJeA7lse2OnWnWUNtrfh+OMgNJbOxA7q6k/wCfxqDSYriPc1zZypHJ95nwB+We+aztZ+po23H0NCWLTZ4IpbiCNcxgZbgr3xn61g3kyWNysluSs08gjV93KYT+H0yB1rS1axvL1I2gty6KDgBgOnsf0rm7y1vheaSs0DK4lZSCRkYU45GexoqdR01opN7vYp2F9Kthd/aGaSGOGSbc7EkMJnUc/TA/CuCawv7+MXM0qRneBErE5O5uMY6DPOfcV6VHLaR6LdaTDELpWEs0t0Plx+8IKqO+GJAJ46nvWLbhVhmt2t98zgBAEJb149qXtOTU7cLg1ibpt7rZXet9d1ora/L1KPh3TH0rUpYrky/NCN4ZfkLZzkHvjp61rahqtnZRgoizyFtuxDyPXPpWoNF1cJvm2sOG2sR19KxooHh1y6kjiQsf3ips2Ko9OPpinUqLc4o02pNMsWNxHeIZriOSCESIHReqgnB5A65610NvFbabqdvefbEa2mzA3AAG/lGyOvIC8+tZGsagkdsEW8ggldkmQhSzNghvujr6ZOBx1qa5kZwkO84LDygqjg/3T6D+VVo9jO5JYoLnUruxvYg7bTJCzcb1zz0PXOPz9qpaNqMUtzNDLZzQXVvIyTI0m4g4O059P8O9aTXkKXgu43WQRjZ8pGDnqM9+g6Vz2n2Qe+vb6S/aSaR/NeURnJbPC8n3PPtSaHe+hs2TLBNJLt4dSWYEducH3z/KsO7upbqWGO3QyzPIGkYDmTc33cdsDNb0dpttpZzGGkZAA7nJBPU9snj/AD1rBtZJ4/EFkvlmSF5fm9ehyzVNrK/YSWht6ppv2KOzaV95ETbtvQPn/wCv+lX7rT1OmRTxIBJDHw4HOMf1xWhcWcWqWSW5kMckTBtzDqehFWpI1FsYQflEfJPp0rw6mJnor6p6nqualSjHsYWmwJqFk1xsKYXY54xn09ya4XVd9qI75zsscN5QU8vjjp6H+Qrcjv7W1nvbO5lkiSY7VmCnA7cHscd65PxbeR3FzbWcERSCINtAbliT1PvXsUXeaSW5ySv7NykUo4PtNpEXUMI1LkFsL17n8e1dJoV1cx2ywQ2qR7ZSyhiygfh16f0pvhC1njvlga0l+17CifKQ8LF0BbGOCAT+dXLbU2aaPzkb7Q00nnKT8z5PC+5/qK6ZfDYwvdlvSs3XjKNQC0cClowTnBwPmNdNfww3zE70JjjLhtquMgZAAPBbvjNcRqepmPUNtpJtlaMpNIMDKnPy/X3q/wCFbO5e4a6t5dlvGxBj5w5x6f1rK6WjOlUpOHOUfDts1wIixAiYZZgR1HbFauoWtqsjPCNhPVlGMgVV0/RdQsdrJAAcfMDIOf1q3dWl55ZEUSBj0DSCuaes9xRso7GUG8+eNpGSLbvZSyhhwQOn51x+tW1wt5JPN5WZH+UQrtVh6gDp+PPNdybC+hCTKkLSxcj5gc9+n+FVLrRbvVUmkl8lSxLRhjsK8YA9evUnrWtOo4zOqWGpSwntL677q1725bb3a1v/AMG1Xw5ZtcXgWK4keMR7yX5K5wME/UV1drb7WlO4gqMAgdeeevSsvQNMutKXEzwNuUq5V88dgKvrHP8AaS5niWNj8wDc47VVR8zsjhp+7ZlDXw6zJdoWEiAKe4APb61WivFltiwcLsGWXOcHFaGpWcl4FRLhFU/eO7/61ZyaDMMbr2BTjBK55rNrsPSW7MmVYpgJypYudm0dVJOePTpiqlxBLDdm4tgAVkDBCOGAOenat4eHI41kaW8iJJBVwrZQ1dl8LTTW8c5upgAFLSeQdrg5x+eD+VbRehm7rS43TL9bjXdKuLW2Kz+eu4M2wu24cEjkemal1ExwRx+SreYz4EZHIPOalt9Oit5S6y25bduy1u24H67qkntxPKGeWI45O23IJP1zmqnNNKK6BCLi3J21JfC8l9PesJgyQrkHd90nJxt44q5rkbW00jq+cfPhTncAOlQW8hgiCGRpMA4LKxx6d6s2+lXeqq88EEkke4xkgDggZI5PoM1hytyujWUo8tiPw/YJcxy/brJdhGRKSRuLDkYz9RWRJcfZdSuo4xvkChVLDIAz0/z6VtJdPFH5bM5YDG7ZzWXNpdtcSLJLLcmQNu3hACT9c1n7Nu9zWNWKRXu79pwIomRI942+Wu049x+P+c07wz9nsNRvJL5rlVjDRl4eUCHI+fg4ycYPrUw0q1jmWaATb1OQrKAvPU/XFR273GlrqEdvZyym5i8nf2Cc9scnDHvTSlDZHXho0K1/avt1UdOru+q0suvnsehWEcK6XZLAriDyl8ve25tuOMnuasbFyDtf6sao+Dru31GznT7E8H2NUhxK25jxnPQV0qW0DcGJCD2IzXUldXPIlaMmlqjyoXtzpEMtxZlVZ7oxurfdZSep9xWnF4sv9o+W1KY5/dnj9azr2IBN21SseoglGGVb5sYI7jmun0PV9PW9mgv4dOtoNg8oLAqbjuORznJrOLTdr6nTGyV+W5Vk8TXe1kAgIxhSsZH6Z7/pWeuttd3Dw3ccMcjITGcFST6DJ64z+Vd7HqfhxGJF/pyheDuAB+nArkfGV3bX2vadJZ3EE9vnapijwFIRuMnnFVPRbhdS05LHHw3KwQzREgGWK5QfUXGRXSeG7McXrrhpFG0n0AwKwNN0wapq8Fk8nlGV7kI23dg+Zk8fnXeW+jtBZRIs4XyVKFvL+8Bjrz7inCMnExnKMZE1xtaMMHcBRgqCNp+vFc5NaKbhrlcbd20j1PWt5dIN1fJE1xtIjLB/LyQOM49OtTt4ULsq/wBoMEXOFEPfrknPWoq0pOLSQKrE4a90f+1dPh2KWaPPQZ5GRiqcRCzu8dvgeSu0pjhgDjIH9K7htDXTJiI7yZxJuf5fkKMMdCPrmqx0mziYMobcqheXNaRfKtdzLlbehyE2/wDs2IKFWaMfdjzjA6fT6UWryOUgdSryMNwyRkcdRz7n8a7PTrCxN3MjW8LgRKw80ZHUjvWgdOskfJt7MMOOIRkfjj2P5VStJE2aZyUszXMMiGXa7cZxjLCuaubr7DLDeLnNu4eZB1K5IOBXW+Jf3NzCYSq5j5EfyZ5PT3/nWJICQTg5pJWVhSaT0O00meM2Iul+ZZBleMg56VNIFEL+bIqtIDuYnp2rze9lUSRRyS/cCErk5xubIH6VREsZKb1yw4ZtvB+Xk9PUfrXkywF5tuR6VPWCZ2N9o6X9oU8liqyFVY/eZckcfpWKfC8tvrsV+2jzXsMcLFYN20ebg7CTnkBsHHfFdP4ZljuNFsGjOREGR2IHUZz17dOa1WVwBkR5AGM4x2/rn/69erThy2ZyVJXbRx2oB9Q8aay0F3HiZWaaUZ2ouYzJxxnA3flVWfRmeCLUTc28EKxkpMXIEvzcNknCjHTbngAe9aFppkmmTahrss8IgaS4RldSyqGbGSB16dKr/wBqaDc6vLPDrMjSR2+xIli4VBg4TcuM5BPrz7VtHaxlLR6GNpujzah4imtywRA+DKnzjeeij16/oa7fS9O/su2Nq0y+bu+bdgccgHj12/X1rgrPxdc212s8MaxwxuT5IHDg9QT64rvINd07X1VoHUmIeY0bjDDA9O/XHpzWLimdcpzSSexzQuI89ZCf91qGaB8ZRzj0jP8AhVP7cy3Rbz4vJJ2CMjkY/iz3rSgkEgRirmM91QkH9KzWhjq3Yu2Op6eulGIBy6h0wIWHO4HHT2qqbgOMGJ8egiqCWWJbswxPubqV7iiTUbW3ieSWXCpwcKT+WKpu4rW0ZMJFH/LCX/viniUdreX/AL5qMXsBAwxIPP3G/wAKVtQt0ZELPuYnaNhyf0qQJPNPa3l/75H+NRteokvlmNxJt3beM49etRzXUmC0WAMjgryRnnr7VTa8jfVYnD7Mrhg4xnnj+dDbtoNLXUvx3qzDiByOmGwD/OtK48QLBpf2eSB4yVRNzOv8OcY5z3rDvLlYb5SzA7l6L35qjq07PLC4V0Co2SwxnPGBQpNK41C8rM247l5AGSHcDyDvHNSeZNkfuP8AyIKxNFvCITGyOxEhAwPxrUlkupVYwKybBzvHX/69O67icGnsPmvHhj3mJSM44kz/AErS03xFd6XDII4kMT/ONsgzuI25HHoawtOlUoWbJm5Pzc8j/wCuKT7O1y/kMu2PiVecc9xTUtROOhdgupZk3JFGOeQX5H5CohcXMVzhpInVgeM5Knr2HHHY1WkRtOhuJ0iwxXJVj6Ef0zWLDqLW7PNMrSXBfDAjGARgH8vaqHGN2dBBeztPnan744XOcDHSrQunmube1MsMZnlMRODlQB8xqK2SdNMjlljweAVz0BPWq+mQ3M3ieNFRTMG8xRIRjGOc4571M5e62i4wXPqdn4HSS3vtatWIZYzGBgHn5cV3Sr8yke1cd4QiuItd1z7QoDOY2GB0HIx+ldquCFp037iMqnxM8k1JxDb3TEDC6gOT/wBdBWLrqpc2TyJMuEyBtY5yeMjHf61ra5M8FlqMiBDtvd3zdBh89O/OK4/U9cM9lblUh8w8SIE4JBOT7Dpj8azjBufMu50OajGz7F3SdZ1C61SKG+/dRKrqSqkbm65P5frXRPIs17YKjBz5znqCcbG5xXLWRv5j9qSFS0kYIdeT6YwDwB6Gr2hXlyPEEEF02/Id1dkwQdpGAeuP8KurSSd0RSrN6M9zh0bR4fC1ldR2lrHdNGjCUKAxdsbueuTzmsxoQZGBZcZIBPOT/hXnWia048VWcM9xtgjvZ1+ZsKB5YI/ma9Ck1rSgrF9Utl55zKuOv6cYroptOKOWpFqTRJp+xdXhznLQvtGMYPGR+lbEuQxYZxjruFc5pmradeeILSO0v7e7lCS/JFKGONvXA+groZ2VGG7y1QH+JgOPxNNiSMXVmAmhU9SHxk54BX/GsufOQc9BzhetWNf1KytJ7SW4vLWKP94oYyDH8PHGfSsGbxToeSqarbs2M4QM3H4CueW5tFaGrpuf7TlQM242+c4zwGxjH41qtv25JkIIxjb+tcTD4w0e31FZPNuZlliaNTDCcg7lPO7HHB5qRvH2izM6xQ6jIwG0gRKMe/3varg/dFKLbJfEwYXkWS5/dDk9fvGudZSez8U/WvFUGo3UDwafdxwquwyS4AGWPpk45rLl1e2U4LxjHX/WH/2SlcmVKXYZcjF6253XKqQVHoe9VkjQ4UiXAPIweOTnH8/xq6IZ9QCS2nkMkgC5bcMZOM9Peqt7b3djcG3M1szKpdgCflznjp3qOVvVHdSnGMFFnZ+DTjQn5UFLiXBK5I5HX9a3mdlckyLtAyfk688dvTivLdK8T6lplmLaFoIxNLuAkg3ckgMOTx6jitO38S69cwh1uLdRkg4tl9fcH2rTZanLJc0m0UNZ1qeLUL/T5Z1itDdyI7YJwpYnkD+dULfUbXTpon0pY5EYASGVSjSYBJPzdOoHHoOOtOlt/wC0tWm+2ASGSXMm0Y3NtznitW30e1ispLZkDws4YKSTjHTGen4e1EZJR1CUbyVjDvpbjUXQpbbACSsMQycYyTgfjW34AiW41eaccxpFtyPUkcVs6Xp1jaqdlquXPB6kduD+f513egaZa2/h+3SC2topPLIDCEdecE+v40ou7Kc2ocnc8F021s52LTFpZJCNjyDB39wOeR05ru7O9W3htjc3cMTJAEkiaQAq2fTNcC5itkSAyFkiOUZRjceuf1rqvD9w1ws87mbzZFQyFIg25VBGTkVnJ6t9DVUbJN9TT1RreRRdK8RBA/ecDd6c1UW8ubW8gkjtWnt0UyEqDluOgGMZ5yOaS5vYX0+IgObYFQsvlgIRnAwPSokCrAWMcx+bGEP+eKmpLls0TThzS1HvqbTTSypDJHEjhXEq7SpPtUxZLt8qysyKSNp+YDHOKpNAnlNiKVPm3Fn9c5/GrkUszzxeTLGiKC0oPUrkDj8zUqaY50+VoxIbyVoooz+8iVgNxPIPoa2FjW7niEaK+0ks2M444o1SCKC0JQFtx2jPH4irOmzI0rYIJ+vUVV7ImOsiC6smidmLDYTluPp0qjqG67eGSMLsQsMk8/lWvqJHyyGTaNwyD/Ksq6ls3uNpb5xtO8NwPrU1G+W6NadvaLmRn28/2W5YuGJDZBzzu9f510VpdoVuN2ck5yeMcCsS9ns7gweXGiPvw8meWyf8K3YruP5UF2qgcAZFKmrrUrEyjpymVp1wyvK4BDqxK5XrnPqOtTLcyx38TxgyOW2yAggYPUg9OMVpPfK7iO2uDPIWwQhBC/XHSqmp6hNpzwyTXDLC7Fchs7vU49q2UWzk51bUk1R0nd4vn2GJlyqk8msaI3ciQwS20mFbcXWL0HFXh4jLrG6rdbeQ52j9PwpuqeJ4rKzV4rppLh8ERk9B3J9OP1pqMtkXzqGtjVlu5ZLVB9nl+YYZcZKj6Vf0AJJrVzcvDOhhtgR8oG7k5A9+lYo1+0eyN1DcyyrwNu4ggnsfQ1Jb+Jv7NvZZYbS5u4ZIgjOGO3HOcZHv1qXB/Cw5r6o9M8OzW15PPewpOjXUSSlJQAFBLYUY9OfzrpFGNtcR4E1y11h7pLWxktVtYo0G+XfkEkjsPf8AOu2RuR6VcUktDKW5474kG3StWxyftRHA9GzXB3dtG97a/ZijJPCjMFJ+V+hBz3yM/jXoGus5tdQMahib7AHrlwMfrXN6E1hb3kkk6F42XEO6MgBgfmHPB44opz5eZl1IOSVjo9A05dI00XswzC8LOq7Oc8dPUdai1NVXxPpsUcQACllcHOVKng/pV24mkn0CK3g+V9zHIYDauDjOewJzxzWOxnl8R2kzShl3GL5TwBsJHHbp/KonK9x042sYF9aG81O5tiu7N3JgZAwdgOaor4WvhOshhXZn5kMi8j35rV+0x2niO5lnUmNbtweM9Y6v6newyCFoy8flsspMZXDjnCnGc59KuGiWpUqjTasVbTQo45QZ4Y0CrgGBsAk98ZBHH61cvfDlrceGra+ghQOp8t18wgDDEZPqeKuJdLKm9LXgHnJXg/nTtGVxPqGmXAVNOuijoWbJjdmHAx6kA03e97kc/dDNc0pLS7jt44bdtkSbw5ADfLjp+Aqpa26Q+YXit1ZvuiPHyj05FXfFlzMms+T5xR2Abeqjntjn25rCmmnh1LbBIzB1HzMMbjgfN+tEY3W4nJoteTIl2sjSwAckDJ3Ef59u9TyLFgmFY4y/3ypPzd/Ss2UT6fLHLI7bNmMO3QZ5/XHFLbPO9y175qvGSUKbsYx6Cq5Fbcnmdy8AV5Dc5B4zjp9KieATSL5zts4DAAkkf4+9XJbOa32ytcId3UMCBVC5mui7xwopCH5mJI7duKjlRanItaTrOkWUDA3axiNioVuWIz6fl+VO1q0TxCqzWUMsOELPcyIU3qOigEZP8hVbwrpi2erm9uY0LTOVRGQ7lBHJGen+fWtfU7a9OqyOQwDYEcqgKFU4+XOeT1/zitVohNXlc4W6j26hDvdnCuo+6FGc+g+tbtioFuMep/maxLPTL3ULiTUZD5cfmc/uyeFP6frW5bK0cYVlwVZwf++jWdQcb9StCVXVmJOMyj/0A1vQqCnXPIrnjgasAP8Anov/AKAa6G2+4e3IqG9BtamhaL+9A7BgP1r0HR8f2Pb49D/M1wliM3MScElskV3Wjf8AIEte3yn+Zqqe5Ezy82lhIVZtKsyQMAlScVbtzHbBhBZ28Qb7wQYz9axoo2QB3kBR/ujecr9fyqzbNbTz+VGGklXllVycD35rOyLcn3Jbm8ubcFE0yzkth0UAgAfT/wCtU8eprFGqyW0UJ/uKpIFVJbPa8mYi8ecgeoJ6de1MlidbUKIlGB6k0SUb2ZcIyauaX2hZzk21s2O5TNPyDz9ltc+vlVgxCPyt7KUU/LlQWIPtSPeWsESPGz3UOD+8WMjgHqScZP8AnFNRXQluS3Z0ZldgA0dvj0MfSoHuJ4p1EdrbbP432hSvpgd+lc7a69b3U8EcelTKsgLNJLwAo7j15rTvNKEssM7KAUTdEFOQueuR/jWVWpCjbnCnGU/hL8t3c7QyC3I7hkFTwyPNGhLQeY/by1IFc7JdvbRwRiNUeYlGbaBuXODj1rR01Ee7jhSEp8vyynGSMcn61onFxuFpJ6mh5pX+OEfSNaha485DGZE2sdjYVQayrnzbW/urWXa3IaArGCwUj9TmpI7S3s4WldZLpFUKRO3KdTximu6J73ZUfW7PSdYkt2twkMaqu6PBJ79PxNZPiK+try8gkjdZSrGMRAkZ9yfxGK6RbXTLmaON9MgLzZCHqDgZz9K57VLa10zxDCHtIzARho8fIx5GTmrW+pKTNi1RFsZXAjUmJ18xxnZ0O4Y74zXHz2d3A41CEK0QjDBmKttUnA3A/wCea7mwubW6gMUdnCqjgx5OOf6VNLDp1pCRLa2kUTDDAg4I9x6VFFSptt9S6slOyOA0eUL+5uG/cS5K4PVuBXQadAtuj2X2lJI2n3KGIGcDPIP4fjXQm1sIYxIllaZ6oEQZJ9qFitpiyPaW8b9wU5+uadSMqjbXUqlVjTtfWzNv4YIE1HVmXhHSPHpkE/416Wh+7XAeAoPK1e9KhFj8hVVV7hSPmP5kfhXfrxjFOmmopMmvPnm5dzyTVmMbXoC7iNQTjPA+cdcdqmutE06aXaNZtIYi/mNEkLuu/kFgS2Rn0HHFM1Ilbi9DHB+3p0/3xRKBGnnSv5cbvtRjxk+nuaxcrXVrm0Y3Sd7F57DTBbGMa/HwNuViaqd7BY2z6VHZzrMySP5hWNx5hKH5yWOAevA9fYU6OGXyGbyiypy2O1VNSkljGnmFQW+0gDPTG1s/pS9ppbltcap635rnJ3ptxrl59rJWD7b85ClsDZ6Dk03T2hj1CSXfJLGSiKRGcYHAPT9asX14ltf31yjOt3HeAITjywDGeT3q2NcN3p8XlzsJ5GVJAQAFywB9PU4/+tW0I3SfkZTbTa8zOvPEFnJeNbwB5XM2whcgHPcY64IFdX4LYQS3JntQgMaFWLDOOR06jnNcFr+nw+Htbt5rLI2BZjEWyV5455rr7OO9hksr4lXtJ4YoR82DvPr2655z3rpjTjKDd7HNOUozSWppeKyk00TIMupCkBsMRXLRpqCanHLNFKyoSuduQF9c1valsTWimoTLCI4Cy/OAM9Qd3Q9O1SaTe5tFSW4jlN2xMciJny1yBgZ6n3x+lZytCCt2uUm5TaZmapph1TwsNStZgbqGbLw8fd4Cn6epqo1lcP5OIZJkRvNkaLHDYwB24rvbDR7a0tBHbqySYKhiN2Qfc/0qR4rnS4AFMUyR/NG0m0NGfUMRwfeudV2lY3dJNnF61qkllpcVxLCjsFAKdNrdv881xkfivVlbeksSDdu2+UpXP45rR8SSXr7xeO0aFsrjDhx65HvXOQ2lxJbvIttcuuPldEO3Oe5+ma6YWauzKcWnZHf6Z4r1LVdMe5vo44lhkWMXMKYLk/w456ccDrmuga8ub/Ylv5W5MjExJdsd8frXB+GLiJtPa0ld1eK7W5CFcggLj9Dg12OnS28rtuAZwCRJjGzjn/OaVSTT2Kp04y3eo/TrdbiyljUuXQkycEKGPp/nvWX9jlibyuSFIG4jHbP5VuW0zw2WzyjsP3dzf0/xrL1GfZC6qcZ44rmb7HUotrVaIxmtmj1RpF+aNZVy5Ydw1b1uMRN9awcA3cT4GQYf1DVv2uCvTjNWvhMJ25nY1LIiO4RmA4FdzoWDoNofVP6muHtF3T7TnHPI9hXb6AP+JBZ/7n9TV0tzGqeZXiujIEjJTAUBTyPr7CsCPUE0nU3cRmZ5Pl2ocHPH9c12UksLoV81Rnqaw7vw9Y3d4tyL1onH/PNevv8AWs4yfUqpH+VkD+IxLdQwSQNHJ5gBZTlQD61rXBBhIJUc9cf/AF6oppOnx28tuLtm3lSSFyRg8VNcwwyMT9umhjVNu1YQQP8Aa5Gc0PV6GtKpyxtJmRYym21JLrDyqsjYjVuDkEZxTtTuQ9sbeJGELSEhGIHLHJGeuP8AGtO20K1ktiIry7ZDwW2gf0p0nh60kdC9xdEpz90dfXpQ3JPQOaL1Ytxd7dIka5hRI08sA4xtOeQR+WK0NyrCQApzg5xyKoPoUMhhBvb8LETtUEYOepORzxxV5bJFgEPm3BAGMlRmuLE0KlSzT1NKVWMbpmVb6dZajM3nykolxlgpA6Dpn3rRsrS3t9YC2bsFcHPPIHXv9KrxaFZ2zOxa4lSQktHKqspPr06021TT9HvGuYbeZHKn7qDGPz7YrppQcI2ZFWalJOI3VhHDrayyKPl+Xd/eHWoWu4PsEwCAKEDFs7s9ef5dK0Zo7XWGhvG87g7l2kLn6iku7O3miEZjkQnHzIAGI61vF2Rk7FPR2lsItkcsTII1JUrltxH14GB+OapaosOoWFvflCGmZV3uMEDnoOQOnWtmz0yKzyYonZyMF3bJI9DzTZ9JFxIryPONo4VXwB+GaXMVpYxYxIVR5ZVkG8Iql15H0xTZ5ECxt5mAzAZUcYrdGkoYyu+U5I+b5c/n1qkthZRX3zLcGYDyfmbIOTu/yaE79BaXvcracLhBAsI25ydzA54PT6V0lqom1H7Pe2cU0ZgaThsbmXnAH+cVSt9NS0kV4VkBXpl+Ofar2nTND4igM1pvEqmMS7vujqcD8OaaYnY7LRHtYNQa3itxEzQsSQ5IO1wuMf1rfTOMnrVCxsoUhV4UEeFIGBggZ5FWVt3DZ898elUjNtHnV7olxqVzqVuBGwe8DEF8cK2SP0rXXTTDpdhaC0y9s7yK207UJJ6cjscVxHiBrix8Q362txLGUndQUchjyT6471oaRqeoSWBea7u5trpyfmAHzEggcnOOnfFa+x9nH2g/aOT5DUeK9hFyIdPmlW44bypkTJGQeGBPb17/AI1i3Ol/ZruzZ7YQybm25OT9w+9bMM8l3qREJczGNi0EcwA3AN97GSDgDB+g4NZFu0n9kaa87O0xvGUlzuOPLbPP5Vz1VzL0NqTcX6nLXM0dtrVxLc8xJexmT6bTmrMdtZa7bGysHeOOS+LyOy/NFGfu49jwfzqO78seIrnzdojW5QtnoMIxyayNC8Tw6PPdq0TyW0jlogpAKjJwMHtzV0U+S63Iq257M6GRdPtfFkujPFLcyXdoQb+5kLSM5QkYA428AdM8Vk+H9avrtotBlWSfaCttGq/NvGSB79/yreudIGvz6P4khvdlpGcXRuXEbRhW5xjr3HXvTdC0i1l8Xi5LvH9mDXETJkZIJxn/AA79K1jPld2YuPMmesiCCeCOO4SNxsAYTKCFOOwYYrjL7QoLbUJrq3tI/luCYYo1ABGMYXsM11mpXk9o9m0RCmWNt6sNwB47GsiYmO6jldiwbc23sDx0H41lN6FwV2jStikUcXnFYy52jLA846D1PXp6VW1WFLyymhc5WRGQg/TFWZre3NtF56I4Qh0DDlWHce/+NU5Ns0E0u8KqgnJ6Y9TXLUV0daueaWdjpctpdQQyCe2R12o3JUgkHJ7djj0ro7e0RFLwyeU8m2LhuFBHXHTge1cjptzAmsJpVoHNsCRJIy/O755Yjt6Ae1dxb2bNN5XlsWROhBB6VpiE428ysI1KTu9jltZs4tPLuBuldgjTEYLjPcjr9fpWto8QWzdmhRt5XzMZ+Re/9Ovama55MdlHPcAooJXcwJGcZx9c4rN0jV7yR4bWMQMB1ds5bcMbd38JOMZqoSbpXZMqd6+h1l4QVEaLt7Fj0ArmvEJRb3bGyldg4XoD/nFWdM1iV7k2OoFFZW2Iw6Bu65+veqc9os2pzKpjVI5DuIBG45yeo6j1rOLSbZvXpT5UYmo3N1b6zHZWWnTXtw4VligBLHYmTgAEnjJ9gKtad4gu/wC2YdIvdGnsppASROxVgNpIO0qPSoJpoZPGbkzQxLNYX8SPNKsa7ntZFUFmIAySAMnvVfSWW2u/DmmSXEFxeW8l3I5hlWVYo3QbI96kqcFXbAJA8z1zXVGC9nc82pN+0seiad/rgenyua7XQTnw/ZH/AKZ/1ri7AYkPtC1dl4dyfDlgcdYgamluFU8l0/UptQlWCKfbOf4GiA/EHNX7W7tnvfIlv0m5wVSPAJ+vesi0mlS21e4Kxi6it9ilemWIBI/z3rqYtFjt7C3CqvnRoCzn+9ipbVw5ZpJMztUgnivmRXSBY0DbQA3B6c+4xx25qo98rR+XLduofjJhApmt3Ewuhh9qAANgZI96dYwx+fFNeyMYmZdvzAZb+E474rN1It2N/YyjHmezLsAeCHat7LtGTgxDNSq8q7/NvCgUZzsUjFX7iLy3Eo/fMTlShxtHQ1QFpNPbXXmRnzUjLR7Tnp2/SqMrWKxu75JC7zMISflAjG8D1Of5dq0AJng3x3rnPTKKP6Vn6Zczuk0qwi4yQytKNu3joMjkU60luPtq280SrEX3Fhgg5PCjnPFJO4+VnHNDq9/L4gmXXbuL7FNIIIVkYiYrvdgMMAoWONjwD/CMc5rf8LWmpav4btpJLqR0bcCzyZJ+dhyTzXOT+LbnRdbktrRZo7SHUria7t0uCq3as4BRgB93Yu3nPUnvXY+AVP8AwjensshUEyYQnqA7V0VY3gjGHxMbbWl1BshhuJOZCuCVGO5rQezne5UG4uI0UhCWIOSen88VVuFlj1Z4N3mATGTCjO0dcVqT208SpM7pGiSZZF5DDOR+PWsIXsW9yOJZCxVriXIODyP8KLoywAbJZG3DAywHP5VRWSfc04DMD/s470sLTSERvh3b5mU8Yx71VhiqZ0lKmR8AZ+VsZ+nFWksIZpluWaUyA5Db+9R3qPEgIKoACWPXcO9V7aWaW1ikh87IXJYAbWGe3rx/nik2kCVy5PLDA/lmeTeD0MnOO5pYLi1h1XT52uW2CYjLSccqR/WmWXlzzTmTa7K4BLIMngHH8qxdW8qe4ht/KO1lLBF+U8nA4+tJMq1j221mjWNfMljRSDjc4Gae11bDn7VAB7yr/jXhdv4fa8nisi7QSSKH5k3qEyAePXmuRvLlotTkt0kKRxMUIA6lf/ritI+82iXFLVnoevyRz6zq5i2TK1wSsikHv6+hP8q0dNCx+G9WZGaHCLnYcYODXMeGbOG+t7e9u9SiRGk/0hXUptBPOGxjP9TXb/2ckem6jZWbxmK6kAgaS4X7u0Dk9ua651IypcvUyjFqdziEW507VbQ79kjsskbLwR0/xwa1ftLObJQp8gXkghLrhipVjk++Qa1Nc0jTjJazxXkJu7cAFd25SB9Pcf8A1659jJDf6fCZ/OtfNJWTyCgJKtgAk5PX0Fc1ducE+vU6KXKpsxddRDqWoB2OxpUDFeoBVh+daFh4Csb5NPidrvLq/mTwgBMA5BbOcE5xx6VFqLY1e7Ii8wfaIFKjPOdw5r0S2KWaLDboEiXjGScDLDufb+dZU52ggqx5ps8216HTtH8T2NjLby3OnwQbPs0bnJPzbc+pyQfeu68P201nqUNhPGzTTuHfZGfkQEEqx+p69M5FUtZ0fTFiudWFnGL1IvNM29gd/r1xV/wpf3UljFq2oaxbCeeNk8hvl2ANweOp4z+NUpqSsZyXLqbHiS++yW1ndyoXgYmJpAQQjFsKeOO2Pxqh9q80wSFdwVgCM468Z/PFQeIL22e0i0y0u7Qqzh9o+RByWOSSQOf51AJLhYVQurDAyUIZc+x9M0nJMFdWZ1V06vEoYjGegPsawNdnFpolwoAX5dwG8BmIOcZ9eKp/aJg6EydDn8Ky9Z1SS9kDRQs+M4+U4Ax6EfXmspQu0b+1ujhJNaik1WHUIbT7Pc7y8xRiQ5J7D35/OvUdRjN9IxW4e3MqrIG6HoDg9Pf8q87j026+1q8FspuS+6MqgL7s8YxzWveSXKwTQXMsry+eXEU0fKA9Byfc11VoxqxWuxFCpKjNyR0V7qlgkNtHdok8LSyFsMHMZKjBK984IzWDZaWNQaWWG3tmiMznyZHJTaRhS20feB5APAFYkjOy7duB7KB/Wr2msFjmDKd4KsWB5x6VDhywshOs3NyfU2/tkdxpZiu7MRac7lIpcfMDnhgOuOOv86z9TivbSRnuLs3C3PzCQemAAv5dT3xQ05xt3y/SrkHhzUNctUkgmght0Y5818Nn8ulZxhdjlXurHKalpdvqF5iV5BsCBdjDnceeoPpWno/hWx0+7ivopbhpYwcBmXbyCPT3rasfCMl2t463UJe2cxkEn5inORjtzU9goktI2HU8VSqN+6jerg5Uo87ae197ptXV9Oy6XNSy/wBbP7Qmuz8PMR4b0/B/5YLzXG2i/NdHv5Zrs9CUp4esFPUQqDVUt2clTY8lsrG6XU2hmtZ2s54vLllI+6c5B/Su0mm/d7VIYDkYHP54rB+3TFSfJkOOwlFVBe3Vxbl4xOjMTgNcDj0zWZTldlXV9Nvbq8Z1tbgxng+WAc/mRVk6ddG3CLbvnaMEgfKf8+lWtPk1CKFluIzKxOQRPniki1vz7xraOOQyr/00wDjrg9+eKjk1uauteCgbMagQIhBHGGG2mq8sKlo4WaTgYxgY71hz6/LBeG3NrMQrBGkEgKq7dFq6j3V5IiZlhyM/JJn8/aqSaM27lFNBefzWn8wAyHy1YOxC9ujgY/Clh0WWy1CKS2hzEcBztCEYPYDr+NOkurj7Z5SB5AOuZsVPdtcvZyotttJXG7eG47j8qJNxRpSiqtSMG7XaV+xtrPbGCWKGbeRwwBBI+tZuj20trAPOAVhISqvzhSSePc8flWZG8dxNAtnZiOSNvnIyMLg5BOOp9atfZb1LpZIwRGMZja4JBqYSckb4zDKg4pX1WzVmv+H3X9N2YbaWDWhOEdoWVi799xPGBUuvTj+zGEaOz/wrt6mhpLkcm3Qf9tv/AK1MzcE/6hMjr++/+tV7HHoQQXROngpbyq2ANrEcY68VkQz36ThorUqCSDkHlT/KuiJnzzEM/wDXX/61NzMwz5S4/wCuv/1qLsNDJ1E38iqFjEobGQAeB0xn/PWtTSkjg04oV2OBkI4PB9PypxE/eJOfWY/4VSt7O/guHke48yI5xG0h+Wk02NNIm06No5JfMcxl5Pv+XwRn/Csq8tJpdcNyqO8YJ+bbjAz0ArW8x/OaLdD5iruKeccgHvj0pczE7cx7uoHmNQk0x86GwqsOtWEquXbyXUnGMdCB+leWa1AIvFmowHgC8kXj03mvSnlkTVLDLR7WkZDhieqmvP8AxgnleN9RI73Ak/MBv61VJv2r9BVLciZ1Fggbw3MjjaGeMADjjfjjFbKwAKR5s447ymsPSALnSb2F2yokj6E5HzZrYeCBI2c7+mfvmuepJqTVzrpxTiroQ2NufndXZj1Jcmoriyt4LjT5I4wrNcYJyTn5TWlfadDaQ2LIX/0i2WZstnnvVF7eMy2MmXzHIxGWP909qltp2bKVmrpG7bata2ljNaSyxcy4aMhTu3HgH+lXM9DnrjHy9c5xXnWrToup3MrbVWKSEkhecA559Tz/ACroR420EnP2xjx/z7N/hWqu4qxzzjaTOha9gtI3nuS0kMY3MoQHcM44Bqg/jDScnydMuWz/ANMEFUl8R6XqUMkFrelpnBABjKknI9e9VJSsO3zbtl3HAyB1/Kl7Hn+In2nJpY0JfGCOP3WlXAHXllFP88XMaXGdomVXx1weuM1j3B2pKnnSl1X7oA7/AIVXttbW3soIWsbmQxxiMlCMEgYzVxpKD0Jk3NbG4y44GMqDgD37fpXMb791DfZIEyOjS/8A161IdZFy20WN1HnjLEelZVjFKbZ8zSuYZWjbe3OAeOfXpVcie4otxGw/2na3Ud1A1pDLE25Hznafx4qXUBf3EUl/qU0ckkzj51XAPHXjFKPKk1K2tmLfMQzb2OMZxg59627yyS4SWzmvFjBl3xAgZC4HHvzn86uMLbA5XOLdfmbGOmRhf8+1XNJyHmyT9wccL3roF8LQPzJeSn34qle6aulRTSW8ZlVYyzM7kHA5461rN3iYpNsTJ4wOP9+u48Ish0Vg8aOvmsctz2HSvKl1l2SJkt4irhv42O04zjt6V6p4HdpfC6SjYhkmk3DOBw2OM89qinF3CUWrXLeoaRbXE0s6PPA0inzlglKrMAvAYZ6Y44x1Nc1ZqFtoRjiu2uD5dtKPMUjY3G7OeD7VxsI2wQj/AGaU4xTukbvEVakFCcm0tv6/D00LVrxFdN0IjP8AKu00XJ0CxY/eMKk/lXGW3/HrdnaeYzXaaL/yAbHP/PBP5UUt2ZVNjxyzSSK6uYWE7xw/NuXnA9/UdaNVvVgYSRGOWPAHyqEfPuM/4VqxXy22qzOnlfMgDq7Y78VBr8sd5pk1zFBEsoKgSjnP0JHasYO6uzWpFRkcveeJrx4xDbfuQvJfOST7egp2k6u7X1s8kZJgRlbb3BPWstrdp7hgkG8jJcDsAOf/ANdVbcyLqESpui+Ybj7ZrdIj3XE2r2+u2vZFj81rJplkf5cDdkHk+3Arrp5XguImjlYCQhAB82R+Fc5La+bYzxQyced1Lf6zjuO5zjmtrS/sZsojuSQxAbixyQ3IODUNNrQIWvqKIpP7UjEJbzJOSG/nW7LppeLMU0mQAd5J28/zrmBqMUPiKC4ik8wFcMqDJP0rp11V8Sw3EWXjDMska4jYZ45Jzkdx7VM01oNW6lK1uZ3uWtVR1YEjfgEDB54zU1w8io0kU4kWP742Y5x/OsmxvW+0XL27tJOxLjPAPzZwD3q/cX0Vra3cCIyrEmRlT8zN1+bPP+fWpvqVy6XK/wDaYm/fuj7UKICHx8zNjnGRx1qV7lrK7WEN5wPICPkge+aztKv2trXzYvna2DOVMe4tu9AQehpZ7lH1cyyFguGYZXnnAHYdqtDlFJHVPZyvbmQuwyQcg9Kzpp5YQRGh3bSfvAhT781SPjbRxabPtBLLxsCtlselc3ptzLPNd3LmVUuo3YZJK5yNmB24zWltDE2ZdZ1KdUeGGPCDdng7vU4PSppdRlubAK0Yjk34Vg4ADdQfoapwpE1oxNrKWKkq0cWfn46e3H+c0x7xY55WdU8xGXbu+dBjoD7CiSVhovy2dxHKJGkiW48nMsomORjoAvpnPWj7TNd3KwxjgIGyOd4I4x7c1Jd6kpkhMiWzo8B891YEjIHAHU5OOcVnaTdRxSBA5IIGNwJ6E4A7njH5Vm3oXFal77MPtVpckAhJ027Dx1x171g+JG0q2+IEk2sW9xcWbQxO0UDhSx2KOT6cE8da3769QhppJAQmwBup4bpnpXNfEaMLr9vLnl7Vf0Zh/SppP978iqq9w7OXw5HYiV9NlaW01ERS27HsODirEem6j5qvHDazJx+7lfa2fx4/WtHwFqUV/wCC4Ynw01n8nuB1B/I/pXRtqlnb3Pk3VvhAqsZmAK8nA9+ufyrRU1zt2uS6r5eXY5/VrO9kWERxWpjSMDc0wyh9APTrWQujXcpttzxbkfcxTO3kEHr9f0r0O7utPt4HfyIz5SF2ESAkjPT654Fce+tz6ho0lzPbx2z+e8aIh4ABxj6jkfhROCcbtbChUadrnGa3Hp90b42jTrLbNGJ1lC4dWPDrj3OCD0yK5qW5ttNt3UQwyzI4jdJt2TkknbtI4GOSfUV0V3bT20Ovai6bYpxFb2+4f6xsqxwO4AX9a5R9I1DUQ11BEGIIVlZwrE46gHrmnRWhdSVtDpnWAaXZzJCiny1n8pRjGeh3dfX8qpSmW7WSd5C7Bdq4yOMdevf9a0WKDR7SGUhWihCSDOdjDIKn86y5Lxg8qJJsymwyDOGHTkg9D6c/SrumzK7sWNBkV7oxSZfcNwck9emDW9PaxRRkqFZmOfX8K5bQ7mW1ulLRnBcdeo/zx+VdLrmo/ZbJpApc4JAXmpktS4yexBpMcsk92zxOjeaECtkdAex6VVUf6JqSszIn2iUuQMkDANZcet37aLeuZlgu4ZoGgCAA4fdk989FrUaLU9Ohlt9SMR1KUGd7dWDMAwA+YDoT1x70Si9yeZNlSKx/tkb4ZHaaNAFjZQSR1Gcd+/FV9Ps7y78R2pnkM8kblmZ23FQv8qSxbVLPcsFo4Z8DdwBx069K63w3oc1hNNeXbo08oxhf4R1OT3NCdmN2a1Zs2nlkruUEntTNbtpJY3RFJjkRg4AzgbTz/n1qaKIG5MwOEPIX39agvb5jqdpYxyiNpyyswPIXaScflTM00meW2kJW2YkdMkfkRXqngjWdLtPC6213dxxzJPKSjZyAWyK82SM2zTwkgtGJELY6kE/4Vp6ZKZIpGcAMXb7owOvpUQla5014p2PStT8S6PHbTwxXG64dNoUI2TkHHUVhxuDEoz91QK5CVv8AiZsB3KfyNdNbk+QxOccUSlcySsa1oAbG5OOdhxXaaVxotiP+mKfyribT/kGXBz0Q/wAq7nTFxpNn/wBcU/kKdLdkVNkeXo2lCTzBavvIxkox4/EVJcTafdRBJoJZFAAC7W6VQN1dxyOm0FkHXPBH1psmrF7dR5xgY8E9896yslsXdtjprbR4/mTTLpieP3RYVN/ZWgsObRzkYOd549OlPsb+TyxCzrLcP8yDJAK+pPYcUia11kkwqDI4zg84quVtXFezsNXR9ABwLST2GXxVprDS7OwadLWVYDhW2P09OKjF6105kj+URnDHP3ue35VmXUWoyXEm1JzFHISic7D6H8OtNRum2NSbdkX4bLQfvJbyEnnPzVfeWwkj8to5So4+6c/yrJiuJVX5JGG0EsV9hkg1He69LbWO62KvK7YGewqLDbtqzUih0qFw8cEikdMA/wCFSXNxZyoFkhldO42msuy1uW6gRmdBMTjaO5p7rc2skkpdnEhMkgAwAfXr+lJ2TFdvYuWdxYxZeG2mtyD1IdSarzXWl3KkPA3mHr8zZA+uKpPr008/kQMh24JbPDD3pPNgOqXDxGPa5OxQ3IH0qmmVfTUV/DehODI1vKq85/euB/KpII9DhxBCpCLwNrZyfT1q7e3itpzJFKglYAAZ561lR6NLJbDLKjBAwJxwc9jTbezZBpRzW64t4Yb4xNxuXIQfWnnT7HJIhlJPU8/4VBYXx2qHdS+SCFPXntV6W+8kqJDtBOMk9/SiwcwjKhQptlAIwcLyR9cVXSxtozlIZQfXB/wqydRQAMuZN3RV/wDr9K6LS7BbnSIJbyJRPICx2HoCeB+WKaiPmOJ1dreOzk88P93IBGM4/CsT4iDfPpVx1D27DP0bP/s1ekah4Xiukl8u4ZCyFcOgYdK888fQFNK0gk5MZeMkd/lT/CpS5asSm7wZL4Rvp9K06W+SMsDGqlWOBIMkY+tdZputzahHcSC2gOzBQzAnb13KwHUYJIyMc1wmiz+b4WuLcuNyY2j0Bf8A/XWva2U9mzNBeBGI5ZFI/rT9qoTfMV7JzguVHQarrcMqlLa4SZ5ZAX8ssWORyvbjPtVLTNUk0rbbraGWedjuluAXRDjtngtwPYYPWq0gvWKvJfySEDgnJIHp1qIWypd2sjMvMhJ2ptz8ppzxMHFpChh5J3kU9av7m98QSLdSNL5YjCK2NoG4HAA4ArRuP3NvI/2OHCjgbR17d6xNTuhDrGoyGFHKRxspJORgrzwf51nHxRcXmpRKE22rOg8rr0YHJwM/hRTi3AVV2lobclvLHewwFWNsxI2bhuJHUY7A1YtWmntUlWGBIixULt54qve3bpq7lt2xQVUZ6E96maO7tXW3hG+yK+c/H3HOeh9M8496mC6js1HUsM0kYBPlLk4HTv8AhWHeeINUs9ZjOmAs9qQZAI96tuIXawx0OQPxpix3OpTRtFcASEKzb9w8v6Hoe/b0qnqM1xpV5c2sVvBJNdnPnyRCSUgj7q54Bz3AznvW0Lcxm/hLN9ONOMcp0e1s9RTIAiYOIyz7g2zJIcDcMHpwcVBbsbqX+1E1DzNVaRnljkVw0u4dAcYJ/wAfajWIbey0TSbSOVEvRvkuo0XDq/GzPvgfXrVnXJN+rRapYqInhhjkuw8YXypzweMc5IyK1MzoRpmpXlhbXtjP5sc6rJHjIJ7kY6HnI6+1bttdTS6d5ghfzkYRTxSLsKN64POO/wCIrkoNZjspYbiz1KWwW5dsrbsJrZAfvNsb5lBOCVIBHuK6PwxJJdnWTJPJcO5RjLJxvbb1A7Djgdhis2rFXJzfCLEBVmlHA2jrVTSQLvUZLl4ZcxkgysMfN6KOv1NT2slq+qyTDaSQoIH97H/1xXWQyQsVQNkn34H4mouDRwet+HhcyPPaRMjsDuyvBzWVo2l3siSxrAS8bncc8D8a9UeKKWQRB1ctxgN05xXLeLIvsAgggBijkdmfYduTx6UaIq7drnK3tkbPVmS4dllDR7UCZVgQed2f6VvwtttmHqetVZCdW0MySHdc6fMm5z1aNs4z64NWIjm2HHJI4qZIaZrWxA0i65Gdh4/Cu5sMjTLUf9Mk/lXCRnbplyMD7prvLMY0+3HpEv8AKqpbsip0PFdBUXeq3Ml28iqqFpoycB2zwo9B9K1ZIU/s+K5VI923eF6BeelUZ9NuJLszRzouRtwzZwKlXTrxUWIXMW3pjPOK521zXsdCS5PM0pYUjgS8tCyJcKDM0a52rjkew61kJLbmYQwxQosuUxGzNuz0znnPerdtp17bQSQQ3KLG/wB4Hng9celOttFMGox3CsPLQ5KbycnB5JP1rZyTikmRF2vdFmxtIoCbMDI25yw5Y44P6Vo3N+qaSZvJCN02Mc4PocVRu7e6mvTPCyJgALluRikmtZZtPe3dwsjy+azI2M+oqJSXQiKfVCNZo1oWS1U7hvVmbHB/CspoFlLh1jlaNSwjVe/p71v/ADizWFXCFVIU9ao/Z7kSiRPLD4wTnjNZzbs7HVDlvqUtM8qOV4ZUWMsoO1h90d617iSNLWaUKYoiuwRkeo+97VljTLr7aLnzUDj0NXL2C5urcRCQBR6HFJL3bMmTXNocWLTNwJCFKBAAxPrVpBbxakqId65CltuBn0GfStR9Eulh8uLy8Z3YLVAdFmEpMjIRndhe341evN5A2vZ2LclgzRk8jJJDL24yKjh1S5kjtowuFdHUk8ZIODVqJpkgWF1Aw3yHP3uD+VVLaxuYYoVlUEw7yoyMDcc5qjnlfoafh6K1u2m80KSkrAAHgc1oy2qHT5DcRRrL86jacgD+E/XpWDp9tJZag8sRGGOXUHI5q/eXb3EDRRSAEnBJ6immhpMpaWHdZfOdvNLhN6N8vbAr0qNRFCkY6KNo/AV53o9oLPUIZJZCsSsHcDnOOn64rR1PUb55EawvHh5PIxgk9sEYqk9W2Fr2R2gb2ryfx3AV8O2+Tkw3W0ke4b/Cuu0298SSozv9hmiT7zyAxn/x3j9Kz9e0+3v7KW2vZNsX2hXLRHp1x/6FUyfvRfmNLRo4Tw5bvJpGpSEkRkxoD7g5OPzH51032WEcHzOneRv8adcW1jpmg/ZLGKYbP3kiuDuclhyM9QQBiow8lxkW7GNTykkq9fT5Rk5/PHGaipCdSo+U6KU4QprmJpLJYW2SRyIeDhnb6+tN+zRLPbOgO5WbqxPG0+ppbvVLm9umlvWUMqgEldo9hj1wRxjP0qsl6jeXJsl7lBszv9QD7A55rOdCpF+RpGvTlG5k6lEJtevod2PNjjQkdslRmq8GhW2meJLS2luy43MRKo+U44x6g5rQu1iXWZJJI5lleJJE6YblcDr7Gul1GG2vr+ynht9krSMoXZgoxxnI/wAa6Ye7Tt5HJVac7lG7tbaS3jnVvMmd9m085GOcHH0qwgC6PN5LGI2yrIWcY3DJyuemRimzCYak8JiAhQuobd93nGcjp2q7Jdz2Hh26S8aKO1jAkKOhDvgDOxj17j696KcbqxpO6pps4eLVorSVwjMY1lbaF7jtnmqmo6ni7W+tZmE8kTA7shos8Eqe3Axx61Dd3s0bSQyQROrjMLBORnoeeTmpPDmjy63eSulv5qxBQYwx79Ovbg1uqaXvHNKdlZndW6aZ4E8EWuqeRDda9fxmRDLg7FIyT9ACOBySfyoaZZzzT3GoarpyXnnQ210bdGx5pxk/KOchNx245x0NVDZWeqasE1mW7SHTo/LSEJvG1Twp29B6kVgpb69dXCXsckkcwZfIffsJ28DZjsKE0zNSTRautMt5JbJWEln9s2zXVxLG4WJSWOMAbThcH3J4xXf+FYrSOG7ubJpTaTkGEy/e2qWUEjtkAH8ayrPVtdt7C9j1u+a8SDy/LhdNoLNnk8AkYz1qBNavbQyxzRODJA2zf8oxgnIH1HT61Lncad3ZDrC8i+3TCGMCM3DYzz1PWt86kiROGBjdRjLjAYe1cFostxDdF25h3Btx6Kc4q14mv7mG0iKuHTzR5iZIDDrjjsfauZ8zly9zrskrmi3jTT4A8iXEhkWUHbGDlwOMemKff69D4htIbiGVt8RDSwsMFc8ZHr25rzeQqYzsRQFY8g889AfpTzKgu1MUzRRADDbeeBzwOpP611KkkrGDqNno2nsbbSdWuXICzvFCme5ySf51chb92i+9ctDry6lp9hZBNhgl3SnP+sYk8j8K6S3JDRr+dZyVgTNuJyNMuVwMFCa72EMthFtIBES9fpXCRD/iUXWOymu9jGLJPaIfyopbsVToeRIkbdQp+tWEjhGDsj+uBVRLK2/54R/981ZWytv+feM/8BrMotKqY7fnUgVPb86qiytu1vH/AN81ILK2/wCfeP8A75oAsqieg/OnbEPUCs+R9KgkMcxhRxjIIpPtOjH/AJa29IdjQMUeR8ooEMef9WtUPtOi/wDPW3pRcaN/z2t/zoAviCL/AJ5qPwpTDGf4BVEXGjnjzrf86ev9nSqTAIpSOy0wJZQiEKqLuPv2qs6YbzXJAQdAKc678A8RqegGKTaXImVj7BfT3pFIZ5O47jKGUnO3ggfnSuEiZdgDMeMDj8afIERGfC568/8A1qHbaisVO48bepFA73IpCqlkXKkjO4DOPrTySgXCoNvHUilVnClVbOTn5hj9aeQTFgYGePUCgCIqXlUghQPTvSY80scjA4Knv+FOeNVjSHftJ/iPT/8AXUiw8fMdynoWA5oA3tDNslmvmnb8zAnHv7fWsfX3tjeZiOQAd2BjIPHPrS2V21jdAxIrgjkdse4qtfyNeXnmyqsZXkAL8rfgKhwvK5OxjrZ3lwrLGQ9sFYySFgXVU+Y9SMADkdfTvirMF1GtsIBGPLk/hlXduVipIXHB4GOcZOOOagu0eHz7hdu7yip44cHgjnkdf5VXt73zbcW7AeQRiTkk5xz97J6qOhxxnFdtJxfqRPmt5F65EjgyXUQe7WHmRmxgFRk5xn+JR+fPIFVYrlwtjYyNzCZCMLtDg9G+n8vWi9ubme3zeyNM6xLt3pww4GMEdAOBz1HfNQaW8EciPLCkl4z/ACiUHYkaqMYHck/gAB6066XI7sVFPmTSKGoxeXqu0l0j8jg56AMPu/TGPwrsE1aGK8042VnNdm6ncvJkBxg43tn2GeccCuK1ONIdYmCcg25JGc8k5rTlnsJrZl8+NdzeXJ5wIAyRguPQHH51zxd0rGtSO5qfbJrm6MkVsqxv88ap1A65GO3Gc/Wq+qR3er2E1rwxCF95H3QpzgEn6VzJ1lrfVTe2kMT38M28XMSYiCrgAImOFwO+cg1qXmozeJbe3u55ohcxbiEiAXqRyVHHYVThy6pnRGrGouRxOYnurk6rbSXqGF4nQ42bCBnOcV1elam+g6r/AGhJblLbUMwzJGwBjdWIyO3ofz9Kx7201TxT4j8tURrmYKrnbhUVQBuJ7Vt32jX0Fm+j3kLTCUE+eg4jkQHEmDyVYAA++7uwFdCaa5X1PPlF31L2hXFxc+JLm/XDSuzMyk4GOgBrR1W+W8VNKtrVBcQyLg7s7MnocDv29hXLaFf3FvpN5cwki4WFcNjlSWAJ/WtrTdTuJrSKcxNJOH2PJxtB7P7tjsMZwMnFc0laREYNwcmVbrUZboavDKFVk8tRt6EocZ5rF1ey1TUblZ2hZYricJBcNwGOAu3Hpnn8/Wp7i2ktLfV1uZNyEALIe53A9vqORwe3FZkN5rMdhDEJ71bVJUMb+WTGp3cHJ6c+/NVFO+hcVZsntVuLGeaCQMgRjHIox94H3q9q0f8AaVsoMgjVVLYAHzHtz6CujTw/d3NyZtS86SWTiR/Kx06cYrP13wybLR53h1FXQDCx7cNk9ulTKL5ro2VS6seceaYw8YIZWxn29xSKVJO70OMHGDUi2zq5SSKRWH8O3nNWG02bzs+X5SZ7nOK6W0jJQk9Ui1ocRa7R8HJdQPpzXoVof9IAz261xVsqpqKIvCgoBj8a7PT2G8E9xisKmpS0djbQkaXdgDqK79jtsfpF/SvOgXFpOich16fQ16JckLp03tC3/oNFFbiqdDx6Oyt/+eI/M1YSytv+eI/WqcdrD/00/wC/jf41YW0hPZ/+/jf41mWWVsrb/niPzNSLZW3XyR+ZqsLSD0f/AL+N/jUos4fST/v43+NILlcWcG9zJGSdx6t2zxVeayU3C+VEwiCnOG5JzWgpiQlAR8pxgnJp3mRZwWXJpoRl/YMnO1x7bxT109f7sn/fYrUDJ7UoaP1XpTAzk05GIBDgHvuHFX1tlREQYESZJPOSfrW/Z6PDLaxySLIJZYg6qp4OT0NTtpEJgd2BB7p3osCaRzjwyPiRXwmOMfxCnNBtjyQpAGQfu8VuJokKcM7oBjALetPbSLcuY3+XaME5yB/jRyj5zAG0w+YAxA7EY/GkViX8xdrKfu84I9a6L+y7Rw4klGE5BA+8fSl/sy3GXBHb5e1HKPnMEZUEBGXvyaiWMpvlbCg9BzgD6V0aaNbyyMfNCEAEgtgGlbR4Gt3dmHPVCeaHAFM5xbeVUBYjBOQpGdtSGIRrvKKSBkkEjj2FbMej2sbhWklAGPuvnFXU8P207AOrJEvH3s5o5LBz3OZDKkfnYOD1yOlNCyMjAIHDHO4Nya7n+xdOAx5PHTrTxpFh1ER/76osDkeX6jDJNFLbvmN8cbuemD+VZ0KXsClIrrYhGMLkYrqPFNn9k1lljGIWi3DPr0/xrn1f5se3WuarVlCfunZQpxnD3kV5Ybop89yWHYFjxxjrUVvFJFOJXYMqZdlReSMf/Xp2tyTRaY8kLlHQg5Hp0NX/AA9ptzNYWLGba1wm8St068BvWj2k5QvJlOEISskYutWkjXU1+iMsLW+CrfeQ46GsmW1vvIbyRuV4vnVRksgIJOPYgdP8a9U1/RPI8MXUhLzyeQUBfr9fbmvO7nyxowWRGLxLlHU8Z9QRXTS0Wpx1G29Cp4bRJ1vY3kKhocfdz3BH8q0oLaOwuIy6CaFiXLJ8gj7ZYnoPb8ve94KsbW606a4LbZxlH29T3FRa9ELa9FobcOkSiRmlZjjJ4wucZ+op8152Be6ky14ZgS68Wy2v70w+QwkeJihTkYww6c10Hj7w3cX8tlJY3AjMUn3lz8uT2PqMUvhbRxpdgJmndZZZNxlYYOfUep9hXS3sdxe3VtCXdgRkPKTgH6fhXPKs+flh0NPivKfU89GnvoUEpyJI542iO5OM8Z+vHNaH9nxaP4cS6eXI3q5jJGOowOf8/Suy18xQWQk8u3c2rGREkT58hTk57dTXHTeL01CD7ElhGWlzjJyM+uMVo2n6nPyS15fhOQ8Waqt/qskVv8sTsrtuyTnsGJ6joc+/fqe+sC0Fjb6c04mhSFUIBzkAdcdqy4/C9s8AutwOolw5mmbPmHOSCp+XnpjHpUGnT3Fr4s/sq5txb7lFxEitwqkZKH+eB05GcU41YzuolKCUbs7DS/FeLJH1GLy0RE3zocr827GR24Uk+lcn8T9amsdX0logskHlNIOeGyR0I9u/vWTLczaFqxiilaWGGTcIpfmUqTuwRxnGemecYrH8aeaJbJW1GK7iMZeNI7hZTDk8g7eF+g4HQcCuhSUjNLl1RDeeKjNcRTQWoSRUClnbcePpis6+u7iWKOTzojFLkgRcEEHow65/Ss3azYwCc8CpFgkNtLLtwsZGSfUnGPr/AIVfIhuvO3LfQ2tLnaW4ic8kMgPvjNdxpfzNk9QxFcP4bukjmkt5AuJMMpI6Ef8A667jTeJMDs2frxWU0TFm7b7SuGUHk49q7zUSV0m6PTFu/wD6Ca4K2/1h68Ak/wAv613OsHbol8fS2k/9BNFIc90eOx2695Z/+/hqdbdP+es3/f01yQ1eb/n4k/CpF1iX/n5l/OocWXddzrlt4/8AnrN/39NTLbJ/z1n/AO/prjxrMv8Az9TD8ad/a028MLyfOMfe4qeVj07nawaeGZyrnHH3vmOfrTpNHjnI8xs4PHUfyNcnb+Ibm3VgtyxLHq4zU48UXY/5eB/3z/8AWqkhW8zpl0K3H8R/76b/ABpX0ODbsBbLEKPmbvx61zY8U3WM/aF/75/+tWx4Y1a51bxDaW7ShkBMjAL2UZ/nigVj0x4VjWDAGI1wPpisIvPvY7yoYnd710VwOg9qoW1vI14yKNyquWz6HpTiS9zMSaULtdBtB9akDHGcEfQ10C6FFMiyjALAEcmlfw6GUKWyB0+b/wCtV2FdHKuzFhsQnnk0u4jHJ2nua6c+HSRgHj0DdajPhps8Z/BhRYLnNl3LAIuTnucVZS3aVx5jsq9sDn6VtHw7OAQuQD7D/GpotGlgH3GJ9SKLMChBaImMjjspOfzq7uI4qY2E4/gP/fJo+xzj+E/kaVhogGe5qQc077LMDytNA2yKpIywzj/P1pWsO5yHjiHbNay+sbp+Rz/WuFEmDx1r0rxtEJNKWTHMch/UV5hkZyeTXBW1melhfgI9VZpNNnT1Q16Zp+kJptlptuLjzDFGiN8vQ7f/ANdeZ3DI0RWX/Vnhseh613Fn4kKWENlcgskTDyJujMo4wT3I9aIyShZjrQk3zI6DxtY3Nz4MuksRI9wVUCNF/wBoZx68ZrwvWXnsjLo/nSPbW8pOzsDnp/nvmvdb/Wo7bSXuJZVSNBklugPQV4Rrkv2q8u7+Mt5Ms2xWPAcAdffkCu6D1PPd0mbfgqQW6vMzYRCWZeufT/PtVy91T7XraSy23mLvTeP+mYbO336U7QbAWejqzNkTIXGOvvn86z43RriVi6rz8vOOKze7ZXZHqVpqNrfaXbTwoWCSkbpFwenp2rVnn824gI+XYgIx1rjPCUn2iyurcMD1IIPcHP8AWupbcz2znjzISn/Agf8A9VcT92Rbbe5ieLJzHpV0jXAWSRfL82X1J749q5nwpoUrXRnnkEg6KyjAxW/r9qmq3djCSSu9pZIl6sq/0BNW7e8tLPETAx55OVIH0rqel33Jjdvl6ElpDINPSS8mjco5ffkbRzwM9Dio7jTbafUI7+SBTcW+4RyYwQD1Hv1qK10uNpZI4bgSafMAHiZiSAMng/WtW+i8hVVWLIRlCRj8KhwTkp31QVIuMWlscTrOi282rNqNw4MUEcbyAOQOS3LY5AG3GR0yCeM1w/ivWG1PUw3nC6iWIRxyOgVgM88A9e2STxXV+Ogx09JEJDK+04ONynsfUZAP4V53LF+6EvmxkE4wr5I4z0rupao5r6Gn4e1KDSdXR7lpPs7ApMYlUsB2K7gecgc9etZ0txPIku+dmEjh5AX++ecEjuevPv71Z/sDUxoyastuXsWzmVGB24bbyOo5qi7nCqx3bOFB6Dmt0rk3JLQzi6iFsN0rNhFAySe3Fd74dvvtSKz/ACyhtjp3B5rzwFM8gr7+ldD4TjkXV2cSboxGc4PUnp/KpqQ924Rep6ZYuMzZPHygf99Cu511tug6j/16y/8AoJrgtP2+Wc53eagH5iu48RNjw7qZ/wCnWX/0E1hS6lz6HzYOtSDtWiltAf8AlnUq20H/ADyFT7VGiw8jMFPBOK1Rbwcful/Kni3tyB+6Wp9suw/q8u5k57Udq2haQH/lktKLO3I/1S0vbrsL6tIxQK774X2m/V7u6I4jiCA+7HP9K54Wdtj/AFS16P8AD6wS20uWZVC+dKenoBj/ABpqopaIPYyjqzqrg/PTbc7b5Dx86Mv8j/jRL9800HEkL+jj9eP61UdCZG9an/R0HpkfrU+earW/ERx6mphzXQZEoPPWs/Uru8t3iFqIcEEsZFJ/kRV4CgqrcFQfqKVhmMNU1T+7an/gDD+tWLTVL2S6iimt4djnBeNmyOPQ1o+TFn/VIf8AgNKsMStuEahh0IpcoycE07PFMpRVCsDMdrc9q5u9CrrVoqDapgfjPfK10mK53UBjVdPb2lX9Af6VM9iorUy/EkPn6Hcj0JIrx24b905HYcV7hfRiXTplPckV4jewt5s0A2gq5HzDI69xXBVXvJnoYaTs0Z0VncX8vkW43OepPQD1NdPb6VLBax2+9pJ+FUnuTwK1vBFnE9teNNFbrKGVcxR7AVxkfXnNZfifVbvT9UVLbyEWI8Bog3J7j6YqJ+/JRWxrTbim3uak4gtrWTTtdSNmO1kjcEq3bt71geOLCzttOtLazuopS85kZIlBEQxjjHbpx7VhT+INRupzJOLR5Om57VGP8qsQTX1zEjn7Am7t9jj4/SumMeXVM5ZJPcnudRMGkoHdbmRk8tNi42cjJI6g1l3kckkUaW0TnIy/7sk5rU+zagxYRy2pOP4bRB/SvX4vF2iLbW6Z27IlV8Qv1A6cCqi4vqRyvojzbwDdDTZHhvVkhDMWDyIQvIwQT26V3tzrGlLYQtNfWqNC4J2yhjgjnj1+lN1nxjo1z4f1C0gnP2maExxqUcZYjjqMV4tIL5HZJJmDqcMvHBH4VhOjFyvc1jH3dUb2sazJqGoRzI2yKHesIB2kAnqT1yeKrLrmoRyblvZh9JSR+R4rGMd045nb8/8A61bnh3wlPrhkklupEiU7RsPLGtFFdwvy9CWHxNdwyBz5ZIPLKAjfpwfxFddH4u0290aNri8ihnjJLRv948dh3rhvEXhWbQ5owbh3ik+6WPzA+9ZEGmG4uUh805c4HBNCimKTvE2PEesRapH5EBHl5BLvnJx6DsK5c2qZ4ZWPtXW6h4BuLeEywStKqrkqRg57j2rmLhryd4rW6mlfyCUjjf8AhHoK6acNHbocz5VZEcl5cx2YsvtMrW2SwiDnap7nFU47U3JjCMPm6lxgA59a0oLA3dzHbW6gzMeW/hUY/wA810B8E6o1lG0EayAcHYefyPatoWlFIyqKzMvUPB2p2GnrdOkDRbdxdZlII7FR1rP0y8bT7yAlhsWTLDAzzgHnr0HT1roJvD2sCRJPskzNH9392SvHTjFUdT0++tLK5+2QCLgFceuf0rScLakxZ6Lp+Gj3AE5uUAPbqK7TxJ/yLep+v2aT+VcP4e3HSrckYLTxn9RXYeKXK+GNUIPP2Z/5Vy01ZsuXQ//Z",
"path": "images/5pts_ADE_train_00019089.jpg"
} |
depth_point_163 | images/4pts_ADE_train_00009693.jpg | ADE_train_00009693.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 246 y = 106),Point B is located at (x = 208 y = 220),Point C is located at (x = 240 y = 158),Point D is located at (x = 41 y = 167).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_22><DEPTH_17><DEPTH_67><DEPTH_67><DEPTH_22><DEPTH_17><DEPTH_67><DEPTH_17><DEPTH_70><DEPTH_20><DEPTH_80><DEPTH_46><DEPTH_17><DEPTH_67><DEPTH_67><DEPTH_23><DEPTH_67><DEPTH_72><DEPTH_31><DEPTH_19><DEPTH_1><DEPTH_57><DEPTH_19><DEPTH_13><DEPTH_40><DEPTH_23><DEPTH_56><DEPTH_50><DEPTH_25><DEPTH_0><DEPTH_58><DEPTH_74><DEPTH_94><DEPTH_66><DEPTH_74><DEPTH_41><DEPTH_84><DEPTH_72><DEPTH_1><DEPTH_2><DEPTH_19><DEPTH_2><DEPTH_44><DEPTH_1><DEPTH_58><DEPTH_32><DEPTH_60><DEPTH_69><DEPTH_19><DEPTH_64><DEPTH_36><DEPTH_69><DEPTH_64><DEPTH_63><DEPTH_77><DEPTH_25><DEPTH_43><DEPTH_76><DEPTH_44><DEPTH_19><DEPTH_45><DEPTH_9><DEPTH_9><DEPTH_36><DEPTH_58><DEPTH_59><DEPTH_14><DEPTH_42><DEPTH_0><DEPTH_44><DEPTH_2><DEPTH_2><DEPTH_9><DEPTH_25><DEPTH_45><DEPTH_0><DEPTH_44><DEPTH_78><DEPTH_81><DEPTH_58><DEPTH_33><DEPTH_66><DEPTH_50><DEPTH_50><DEPTH_50><DEPTH_78><DEPTH_0><DEPTH_39><DEPTH_0><DEPTH_0><DEPTH_39><DEPTH_39><DEPTH_1><DEPTH_57><DEPTH_94><DEPTH_16><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 4 | [
"A",
"D",
"C",
"B"
] | <DEPTH_START><DEPTH_17><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_22><DEPTH_17><DEPTH_67><DEPTH_67><DEPTH_22><DEPTH_17><DEPTH_67><DEPTH_17><DEPTH_70><DEPTH_20><DEPTH_80><DEPTH_46><DEPTH_17><DEPTH_67><DEPTH_67><DEPTH_23><DEPTH_67><DEPTH_72><DEPTH_31><DEPTH_19><DEPTH_1><DEPTH_57><DEPTH_19><DEPTH_13><DEPTH_40><DEPTH_23><DEPTH_56><DEPTH_50><DEPTH_25><DEPTH_0><DEPTH_58><DEPTH_74><DEPTH_94><DEPTH_66><DEPTH_74><DEPTH_41><DEPTH_84><DEPTH_72><DEPTH_1><DEPTH_2><DEPTH_19><DEPTH_2><DEPTH_44><DEPTH_1><DEPTH_58><DEPTH_32><DEPTH_60><DEPTH_69><DEPTH_19><DEPTH_64><DEPTH_36><DEPTH_69><DEPTH_64><DEPTH_63><DEPTH_77><DEPTH_25><DEPTH_43><DEPTH_76><DEPTH_44><DEPTH_19><DEPTH_45><DEPTH_9><DEPTH_9><DEPTH_36><DEPTH_58><DEPTH_59><DEPTH_14><DEPTH_42><DEPTH_0><DEPTH_44><DEPTH_2><DEPTH_2><DEPTH_9><DEPTH_25><DEPTH_45><DEPTH_0><DEPTH_44><DEPTH_78><DEPTH_81><DEPTH_58><DEPTH_33><DEPTH_66><DEPTH_50><DEPTH_50><DEPTH_50><DEPTH_78><DEPTH_0><DEPTH_39><DEPTH_0><DEPTH_0><DEPTH_39><DEPTH_39><DEPTH_1><DEPTH_57><DEPTH_94><DEPTH_16><DEPTH_END> | 246 | 106 | 208 | 220 | 240 | 158 | 41 | 167 | null | null | 50 | 126 | 104 | 73 | null | {
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",
"path": "images/4pts_ADE_train_00009693.jpg"
} |
depth_point_164 | images/5pts_ADE_train_00011372.jpg | ADE_train_00011372.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 85 y = 107),Point B is located at (x = 69 y = 187),Point C is located at (x = 215 y = 154),Point D is located at (x = 47 y = 187),Point E is located at (x = 171 y = 111).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_71><DEPTH_58><DEPTH_19><DEPTH_19><DEPTH_64><DEPTH_41><DEPTH_50><DEPTH_15><DEPTH_64><DEPTH_58><DEPTH_50><DEPTH_84><DEPTH_69><DEPTH_74><DEPTH_74><DEPTH_11><DEPTH_67><DEPTH_60><DEPTH_58><DEPTH_38><DEPTH_54><DEPTH_0><DEPTH_63><DEPTH_11><DEPTH_3><DEPTH_74><DEPTH_36><DEPTH_44><DEPTH_74><DEPTH_2><DEPTH_77><DEPTH_7><DEPTH_85><DEPTH_74><DEPTH_69><DEPTH_77><DEPTH_77><DEPTH_49><DEPTH_73><DEPTH_44><DEPTH_24><DEPTH_75><DEPTH_26><DEPTH_70><DEPTH_69><DEPTH_60><DEPTH_13><DEPTH_13><DEPTH_41><DEPTH_82><DEPTH_14><DEPTH_52><DEPTH_41><DEPTH_3><DEPTH_3><DEPTH_81><DEPTH_81><DEPTH_81><DEPTH_80><DEPTH_49><DEPTH_119><DEPTH_10><DEPTH_50><DEPTH_22><DEPTH_44><DEPTH_84><DEPTH_0><DEPTH_58><DEPTH_71><DEPTH_46><DEPTH_58><DEPTH_73><DEPTH_76><DEPTH_85><DEPTH_76><DEPTH_9><DEPTH_68><DEPTH_84><DEPTH_69><DEPTH_72><DEPTH_50><DEPTH_78><DEPTH_33><DEPTH_63><DEPTH_45><DEPTH_76><DEPTH_66><DEPTH_78><DEPTH_25><DEPTH_25><DEPTH_12><DEPTH_0><DEPTH_0><DEPTH_1><DEPTH_57><DEPTH_57><DEPTH_0><DEPTH_1><DEPTH_57><DEPTH_57><DEPTH_END><DEPTH_END>. Since point D has a higher pixel value on the depth map, the answer is that point D is closer to the camera. | D | long | 5 | [
"C",
"E",
"A",
"B",
"D"
] | <DEPTH_START><DEPTH_71><DEPTH_58><DEPTH_19><DEPTH_19><DEPTH_64><DEPTH_41><DEPTH_50><DEPTH_15><DEPTH_64><DEPTH_58><DEPTH_50><DEPTH_84><DEPTH_69><DEPTH_74><DEPTH_74><DEPTH_11><DEPTH_67><DEPTH_60><DEPTH_58><DEPTH_38><DEPTH_54><DEPTH_0><DEPTH_63><DEPTH_11><DEPTH_3><DEPTH_74><DEPTH_36><DEPTH_44><DEPTH_74><DEPTH_2><DEPTH_77><DEPTH_7><DEPTH_85><DEPTH_74><DEPTH_69><DEPTH_77><DEPTH_77><DEPTH_49><DEPTH_73><DEPTH_44><DEPTH_24><DEPTH_75><DEPTH_26><DEPTH_70><DEPTH_69><DEPTH_60><DEPTH_13><DEPTH_13><DEPTH_41><DEPTH_82><DEPTH_14><DEPTH_52><DEPTH_41><DEPTH_3><DEPTH_3><DEPTH_81><DEPTH_81><DEPTH_81><DEPTH_80><DEPTH_49><DEPTH_119><DEPTH_10><DEPTH_50><DEPTH_22><DEPTH_44><DEPTH_84><DEPTH_0><DEPTH_58><DEPTH_71><DEPTH_46><DEPTH_58><DEPTH_73><DEPTH_76><DEPTH_85><DEPTH_76><DEPTH_9><DEPTH_68><DEPTH_84><DEPTH_69><DEPTH_72><DEPTH_50><DEPTH_78><DEPTH_33><DEPTH_63><DEPTH_45><DEPTH_76><DEPTH_66><DEPTH_78><DEPTH_25><DEPTH_25><DEPTH_12><DEPTH_0><DEPTH_0><DEPTH_1><DEPTH_57><DEPTH_57><DEPTH_0><DEPTH_1><DEPTH_57><DEPTH_57><DEPTH_END> | 85 | 107 | 69 | 187 | 215 | 154 | 47 | 187 | 171 | 111 | 62 | 111 | 6 | 135 | 40 | {
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"path": "images/5pts_ADE_train_00011372.jpg"
} |
depth_point_165 | images/5pts_ADE_train_00018423.jpg | ADE_train_00018423.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 105 y = 189),Point B is located at (x = 219 y = 216),Point C is located at (x = 69 y = 101),Point D is located at (x = 83 y = 202),Point E is located at (x = 313 y = 224).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_22><DEPTH_30><DEPTH_3><DEPTH_38><DEPTH_69><DEPTH_49><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_60><DEPTH_40><DEPTH_40><DEPTH_49><DEPTH_11><DEPTH_40><DEPTH_64><DEPTH_49><DEPTH_29><DEPTH_5><DEPTH_3><DEPTH_63><DEPTH_78><DEPTH_78><DEPTH_3><DEPTH_74><DEPTH_31><DEPTH_44><DEPTH_25><DEPTH_69><DEPTH_78><DEPTH_76><DEPTH_76><DEPTH_44><DEPTH_74><DEPTH_15><DEPTH_29><DEPTH_60><DEPTH_59><DEPTH_75><DEPTH_84><DEPTH_5><DEPTH_31><DEPTH_40><DEPTH_49><DEPTH_49><DEPTH_3><DEPTH_3><DEPTH_11><DEPTH_40><DEPTH_40><DEPTH_70><DEPTH_82><DEPTH_67><DEPTH_35><DEPTH_35><DEPTH_62><DEPTH_29><DEPTH_72><DEPTH_58><DEPTH_76><DEPTH_76><DEPTH_19><DEPTH_45><DEPTH_0><DEPTH_0><DEPTH_9><DEPTH_44><DEPTH_25><DEPTH_64><DEPTH_78><DEPTH_66><DEPTH_41><DEPTH_0><DEPTH_9><DEPTH_41><DEPTH_0><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_2><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_78><DEPTH_33><DEPTH_57><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_42><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_94><DEPTH_57><DEPTH_57><DEPTH_END><DEPTH_END>. Since point E has a higher pixel value on the depth map, the answer is that point E is closer to the camera. | E | long | 5 | [
"C",
"A",
"D",
"B",
"E"
] | <DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_22><DEPTH_30><DEPTH_3><DEPTH_38><DEPTH_69><DEPTH_49><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_60><DEPTH_40><DEPTH_40><DEPTH_49><DEPTH_11><DEPTH_40><DEPTH_64><DEPTH_49><DEPTH_29><DEPTH_5><DEPTH_3><DEPTH_63><DEPTH_78><DEPTH_78><DEPTH_3><DEPTH_74><DEPTH_31><DEPTH_44><DEPTH_25><DEPTH_69><DEPTH_78><DEPTH_76><DEPTH_76><DEPTH_44><DEPTH_74><DEPTH_15><DEPTH_29><DEPTH_60><DEPTH_59><DEPTH_75><DEPTH_84><DEPTH_5><DEPTH_31><DEPTH_40><DEPTH_49><DEPTH_49><DEPTH_3><DEPTH_3><DEPTH_11><DEPTH_40><DEPTH_40><DEPTH_70><DEPTH_82><DEPTH_67><DEPTH_35><DEPTH_35><DEPTH_62><DEPTH_29><DEPTH_72><DEPTH_58><DEPTH_76><DEPTH_76><DEPTH_19><DEPTH_45><DEPTH_0><DEPTH_0><DEPTH_9><DEPTH_44><DEPTH_25><DEPTH_64><DEPTH_78><DEPTH_66><DEPTH_41><DEPTH_0><DEPTH_9><DEPTH_41><DEPTH_0><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_2><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_78><DEPTH_33><DEPTH_57><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_42><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_94><DEPTH_57><DEPTH_57><DEPTH_END> | 105 | 189 | 219 | 216 | 69 | 101 | 83 | 202 | 313 | 224 | 47 | 117 | 25 | 76 | 140 | {
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",
"path": "images/5pts_ADE_train_00018423.jpg"
} |
depth_point_166 | images/5pts_ADE_train_00005070.jpg | ADE_train_00005070.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 268 y = 193),Point B is located at (x = 84 y = 117),Point C is located at (x = 206 y = 176),Point D is located at (x = 167 y = 96),Point E is located at (x = 91 y = 202).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_70><DEPTH_31><DEPTH_31><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_70><DEPTH_5><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_23><DEPTH_72><DEPTH_70><DEPTH_3><DEPTH_49><DEPTH_15><DEPTH_5><DEPTH_70><DEPTH_3><DEPTH_3><DEPTH_57><DEPTH_81><DEPTH_3><DEPTH_58><DEPTH_64><DEPTH_25><DEPTH_3><DEPTH_59><DEPTH_5><DEPTH_11><DEPTH_76><DEPTH_63><DEPTH_30><DEPTH_49><DEPTH_74><DEPTH_36><DEPTH_5><DEPTH_31><DEPTH_94><DEPTH_25><DEPTH_82><DEPTH_66><DEPTH_33><DEPTH_11><DEPTH_49><DEPTH_74><DEPTH_9><DEPTH_121><DEPTH_42><DEPTH_78><DEPTH_63><DEPTH_39><DEPTH_32><DEPTH_11><DEPTH_36><DEPTH_38><DEPTH_32><DEPTH_78><DEPTH_45><DEPTH_32><DEPTH_44><DEPTH_29><DEPTH_11><DEPTH_75><DEPTH_119><DEPTH_98><DEPTH_19><DEPTH_36><DEPTH_36><DEPTH_78><DEPTH_29><DEPTH_31><DEPTH_64><DEPTH_62><DEPTH_27><DEPTH_16><DEPTH_0><DEPTH_9><DEPTH_41><DEPTH_9><DEPTH_2><DEPTH_19><DEPTH_0><DEPTH_78><DEPTH_9><DEPTH_98><DEPTH_2><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_41><DEPTH_1><DEPTH_1><DEPTH_121><DEPTH_END><DEPTH_END>. Since point E has a higher pixel value on the depth map, the answer is that point E is closer to the camera. | E | long | 5 | [
"B",
"A",
"D",
"C",
"E"
] | <DEPTH_START><DEPTH_70><DEPTH_31><DEPTH_31><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_70><DEPTH_5><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_23><DEPTH_72><DEPTH_70><DEPTH_3><DEPTH_49><DEPTH_15><DEPTH_5><DEPTH_70><DEPTH_3><DEPTH_3><DEPTH_57><DEPTH_81><DEPTH_3><DEPTH_58><DEPTH_64><DEPTH_25><DEPTH_3><DEPTH_59><DEPTH_5><DEPTH_11><DEPTH_76><DEPTH_63><DEPTH_30><DEPTH_49><DEPTH_74><DEPTH_36><DEPTH_5><DEPTH_31><DEPTH_94><DEPTH_25><DEPTH_82><DEPTH_66><DEPTH_33><DEPTH_11><DEPTH_49><DEPTH_74><DEPTH_9><DEPTH_121><DEPTH_42><DEPTH_78><DEPTH_63><DEPTH_39><DEPTH_32><DEPTH_11><DEPTH_36><DEPTH_38><DEPTH_32><DEPTH_78><DEPTH_45><DEPTH_32><DEPTH_44><DEPTH_29><DEPTH_11><DEPTH_75><DEPTH_119><DEPTH_98><DEPTH_19><DEPTH_36><DEPTH_36><DEPTH_78><DEPTH_29><DEPTH_31><DEPTH_64><DEPTH_62><DEPTH_27><DEPTH_16><DEPTH_0><DEPTH_9><DEPTH_41><DEPTH_9><DEPTH_2><DEPTH_19><DEPTH_0><DEPTH_78><DEPTH_9><DEPTH_98><DEPTH_2><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_41><DEPTH_1><DEPTH_1><DEPTH_121><DEPTH_END> | 268 | 193 | 84 | 117 | 206 | 176 | 167 | 96 | 91 | 202 | 67 | 18 | 120 | 89 | 143 | {
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",
"path": "images/5pts_ADE_train_00005070.jpg"
} |
depth_point_167 | images/4pts_ADE_train_00007395.jpg | ADE_train_00007395.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 172 y = 208),Point B is located at (x = 322 y = 186),Point C is located at (x = 287 y = 223),Point D is located at (x = 144 y = 115).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_72><DEPTH_49><DEPTH_70><DEPTH_59><DEPTH_31><DEPTH_49><DEPTH_31><DEPTH_15><DEPTH_20><DEPTH_18><DEPTH_36><DEPTH_38><DEPTH_67><DEPTH_70><DEPTH_31><DEPTH_31><DEPTH_31><DEPTH_74><DEPTH_20><DEPTH_27><DEPTH_74><DEPTH_49><DEPTH_70><DEPTH_70><DEPTH_31><DEPTH_31><DEPTH_31><DEPTH_29><DEPTH_20><DEPTH_14><DEPTH_74><DEPTH_31><DEPTH_5><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_31><DEPTH_29><DEPTH_20><DEPTH_55><DEPTH_74><DEPTH_31><DEPTH_59><DEPTH_3><DEPTH_67><DEPTH_3><DEPTH_59><DEPTH_3><DEPTH_17><DEPTH_55><DEPTH_40><DEPTH_74><DEPTH_58><DEPTH_83><DEPTH_31><DEPTH_83><DEPTH_67><DEPTH_83><DEPTH_7><DEPTH_42><DEPTH_40><DEPTH_38><DEPTH_36><DEPTH_5><DEPTH_29><DEPTH_58><DEPTH_3><DEPTH_58><DEPTH_35><DEPTH_121><DEPTH_31><DEPTH_31><DEPTH_64><DEPTH_82><DEPTH_43><DEPTH_31><DEPTH_81><DEPTH_68><DEPTH_72><DEPTH_121><DEPTH_20><DEPTH_6><DEPTH_26><DEPTH_22><DEPTH_17><DEPTH_63><DEPTH_78><DEPTH_32><DEPTH_72><DEPTH_47><DEPTH_12><DEPTH_57><DEPTH_5><DEPTH_60><DEPTH_20><DEPTH_66><DEPTH_44><DEPTH_1><DEPTH_78><DEPTH_94><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 4 | [
"D",
"A",
"C",
"B"
] | <DEPTH_START><DEPTH_72><DEPTH_49><DEPTH_70><DEPTH_59><DEPTH_31><DEPTH_49><DEPTH_31><DEPTH_15><DEPTH_20><DEPTH_18><DEPTH_36><DEPTH_38><DEPTH_67><DEPTH_70><DEPTH_31><DEPTH_31><DEPTH_31><DEPTH_74><DEPTH_20><DEPTH_27><DEPTH_74><DEPTH_49><DEPTH_70><DEPTH_70><DEPTH_31><DEPTH_31><DEPTH_31><DEPTH_29><DEPTH_20><DEPTH_14><DEPTH_74><DEPTH_31><DEPTH_5><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_31><DEPTH_29><DEPTH_20><DEPTH_55><DEPTH_74><DEPTH_31><DEPTH_59><DEPTH_3><DEPTH_67><DEPTH_3><DEPTH_59><DEPTH_3><DEPTH_17><DEPTH_55><DEPTH_40><DEPTH_74><DEPTH_58><DEPTH_83><DEPTH_31><DEPTH_83><DEPTH_67><DEPTH_83><DEPTH_7><DEPTH_42><DEPTH_40><DEPTH_38><DEPTH_36><DEPTH_5><DEPTH_29><DEPTH_58><DEPTH_3><DEPTH_58><DEPTH_35><DEPTH_121><DEPTH_31><DEPTH_31><DEPTH_64><DEPTH_82><DEPTH_43><DEPTH_31><DEPTH_81><DEPTH_68><DEPTH_72><DEPTH_121><DEPTH_20><DEPTH_6><DEPTH_26><DEPTH_22><DEPTH_17><DEPTH_63><DEPTH_78><DEPTH_32><DEPTH_72><DEPTH_47><DEPTH_12><DEPTH_57><DEPTH_5><DEPTH_60><DEPTH_20><DEPTH_66><DEPTH_44><DEPTH_1><DEPTH_78><DEPTH_94><DEPTH_END> | 172 | 208 | 322 | 186 | 287 | 223 | 144 | 115 | null | null | 32 | 219 | 72 | 10 | null | {
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",
"path": "images/4pts_ADE_train_00007395.jpg"
} |
depth_point_168 | images/4pts_ADE_train_00009536.jpg | ADE_train_00009536.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 14 y = 111),Point B is located at (x = 96 y = 210),Point C is located at (x = 30 y = 198),Point D is located at (x = 252 y = 186).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_119><DEPTH_46><DEPTH_22><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_3><DEPTH_49><DEPTH_59><DEPTH_8><DEPTH_24><DEPTH_22><DEPTH_60><DEPTH_70><DEPTH_3><DEPTH_59><DEPTH_3><DEPTH_31><DEPTH_59><DEPTH_12><DEPTH_23><DEPTH_13><DEPTH_3><DEPTH_67><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_11><DEPTH_121><DEPTH_16><DEPTH_13><DEPTH_59><DEPTH_67><DEPTH_70><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_43><DEPTH_121><DEPTH_47><DEPTH_13><DEPTH_59><DEPTH_70><DEPTH_70><DEPTH_70><DEPTH_59><DEPTH_70><DEPTH_83><DEPTH_16><DEPTH_55><DEPTH_67><DEPTH_29><DEPTH_36><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_70><DEPTH_11><DEPTH_16><DEPTH_55><DEPTH_35><DEPTH_69><DEPTH_69><DEPTH_49><DEPTH_74><DEPTH_74><DEPTH_3><DEPTH_83><DEPTH_42><DEPTH_55><DEPTH_73><DEPTH_72><DEPTH_74><DEPTH_36><DEPTH_36><DEPTH_64><DEPTH_29><DEPTH_85><DEPTH_16><DEPTH_14><DEPTH_56><DEPTH_60><DEPTH_49><DEPTH_74><DEPTH_74><DEPTH_36><DEPTH_74><DEPTH_83><DEPTH_1><DEPTH_45><DEPTH_75><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_70><DEPTH_59><DEPTH_70><DEPTH_30><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 4 | [
"D",
"B",
"C",
"A"
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Uemrb0SW35swdM8MDTdRiu/tvmeXn5fKxnII65966PLEZNRodwPrnBHpTuQOvNW5uerIqUpUpuElZoeOevSnYHbpTQDinYIxSIsOU85PaukiAMKnPUCubK5GK6G1ObWI+qimhFgLxUi9elR5wOakU8jmqQE8YHpV2EDcBj2qnHnPWr0WNw9aYzTto9zKMcV0OnwnCjpWJaAnB6c10+mqML3qgZrxDbGBin0gpa6Ka0MJBRRRWpAVk6+dmg3z/AN23cj67TitasTxUdnhu955IA/MgYrGpG7TLgz5x1kYvZvUOR+VWNFcGHPXDdPrUOrc6hMev7xxTdBcZZR1wDRNaFrc6WMADGOlQXpP2uDt+7/rU8fAGScmmXK7ryDOMCLn2rkuaMVR79QDTXGZhzVqJ4Fjw7pmholFwARwRnmqTEREYQ81Xx+8Yg960ZIAwIU/lUItlAJ5znNFyWQvxG3uKoW4GR7ZrYlgHl+2OPWs22hzu2kE5NFwsRyAE89MVNFwgBpWt2BySuOlTLAyoOhoHYqT48wey1XbJ74qab/j4Of7oFQyCsmBla1IU02cjqRtB+tcdIeg9xXUeInK6eBnBZwAPXvXKy8AfWu6grIiR0OhbSkg963R0Heud0Nhvce2a316fLWFbSQ4kp4PI4pvTOOlISSME80p5HBrN7lBg0Wo/0tj1wgFIScj8f5U+xB+0TY9QP0q0BFx+NJsJO5W2n+dOzweOnFKBWLSZvRrToy5ofkmvmndMasYUjk1JlQcU3GTyacMdhk00rEznKpJzk7ti8kcU4dPmNNz1B4pQo45oIHLit6yObKL6AVhAqPrW3pzFrNcdjQDLo6cVKCciol96cp5q0ItIauwN81UI+DzVuI55HSmhm5ZnJGT3FdTpjgYA9a5C0fGPeuhsJ9uBmquJnUDpS1DDKHQHNTV0U3dGE1YKKQ0dq1JuArnPGswj8PFe8lxCv/kRTXR54rh/iReiHTLWEDk3cbZ+hzWUnrYuKPC9Ql3XkpH/AD2NQaJOFvfL/vZA/Co7iUmQn0k3Z/GqllKbe+jfP3ZAKbXulX1O+TIBHoKlYxuP3kOSoxkGoIzx7VKDzjHWuJqxruSboFXaIhswM5HNMVbdH3ASbvc5GKCeOtNPTipCw9pIWPyyMnHaonEbkA3Mw/GggHrTSP8AZBpisKEWMl4pzvxghjkVHDA8GWiuNxbO4OeM0hUf3RTCq9hzRsFiz+8IwWj5IPy9KlaRh2BGKz8ezZ9jTSGzy7gduaLgJcHNwxxjgVA+cZqQg5Oc57k96jmyFJqWI5nxLJxbxd8lq55+SPrWv4jfOopGOiJWPISa76fwkNmzoTESkexro42OOBXMaM2LgHpk108ZO3GBWFVWY47Dzu/Glz1xTT9c0vQcVluUN7Gp9O5aU/8ATRh+VV854xVvTfuk4+87H86pAVRmlU00Yx1pR7CsigxzzTgRjjimgEmnBaYDlBznrTs5Ax1poFKCcYxQA9RjnAJrY0z/AI9SPRqxwDitbSz+7cH+9QBpDrTgKYOlOB6VSEiwlWYmxxVMGpkY8UxmtA5X8a1rKfHGa5+JzkelaVtJ81FwO10yYEbSc5rVFcvptxggE4XvWjrGvWGi2cNzfzeXG7AKcZya0pysROJqTMVjJAJ5xgU4ng47Vy0njbw7ewGOLU41Y4PzAjvVXV/H2maXa/ubhLu4kO5Ei4Aro5yOQ7M9K8n+Jl6HvIYgT8koBHbhSa9Ds9XjvdKS8Xugdgexrxbx1Pcf2hHJcRNE0skkg9CMVle8ioqyPPJ5CUcg8cY/OoNwW5c5/jzTZHOxgRjgmoWcifI6kV0N+6Lqei2colt43HdAf0q0DyKztJJ/s223DBEYrQBBx2rgnuarYUEYP1obJ6YpuB39aU/jioGN+tNJ5pSBnrSEcUwGnGaYRzxT2JAphOcHpSYhh60hwRyOPrTmYZ6UxjkcUhjGJ/CoJTz9RipycDFVrmQQxPIf4VJppXdiGcVrEol1SVh0BwDVFs9RSyOZJ3Y9yTSEHGB3r0YK0TF7l7SX23SZ/vV1UfPSuQ05tt0in1FdcgGODXPWWppHYlwT2AoOaaOD1p3asEUJ3z6Crumj9zHxniqDnCk+1aWnAiJADj5RVoChgYA9KUNz64NIDSZ68VkUPJxz39KM8dKQHnpS4OetAhy59af703JxwBQOnWgB6kg1p6UW/eAjsDWYpxzx0rQ0tsTSAn+EYoA2FPNKODxTFPenBhVDJVPPNSqwyarh+wpPNUA4PHc+lAGijgY54q1FcBWAHzEn7orAkvo4Vy52j371Xk1gRozs/lx9Pc1VikjurbUArbASW9F5rF8ceJtMu7ZLWVBd3KnKRxNlFJ9T2NcNe+I7qdfJtt1vB0IB+Y+9ZSzYmjIIwHB+nNXGHUppG4I7Jj/pWkSI2OdjHrWzoEvhexlzdw3QZegMW4VtwlSxztYHnoOn+RVoQQSKN8cbe+KUp2BWJ73xboMtm8drcSxk4AUps6Vx+savZzQjcTcMoOws2/GevWukl0qwcZa2Q/TrWXc+HNPbIEZT0AqIyih3PLdYdrp1ZI1jBGGwMdKxf3wfdkAheOK9Pu/CdpLkrK6H0PasW48GnJMd7+BFdEK0bWIaiZdnql8kCfvBwP7uauLr12n39h/3hiopPC2pIAI7iNvbmqr6NrUOcRhql8jEaq+I5ARut1PuGqRPEcZPzW7Zz0DZrnXh1SI5ezc47iqz3MynEtuwHpg0vZxYjsP+EgtCfnSRPqtSrrNi/SbH1FcSL1RwUZfwpftSN2P44peyXQDuV1Czc/LcRn6tT/PikORIh/GuDFxGeA4/CneYAMgkD1DUnSA7zdu5Bz9OaYc54OD7iuHE0wHySP8A99U9b+7QfLO9T7FoDsSe3GffisfX5fJ0uTGSWIHynpWSus3y/wDLctj1AqO71y5eBklVWVhg5FONJp3JbMUn5mGOMnBHegEhWwKh85QCBkDGKcs0ZTmQA12x2MupYtGIuEbFdjGc49MCuIgnSOXJcYrqrbVbQoqmTB285rKqikaZBz6Uozg81WW+t3P+vSpVlQ8B1IPoa5rMq46Q/u2/3TWtZD5ABjisdiCjdORjrW1agYBHQinawzJxxSjA6UAk56UijHvWNyh2SxHpRjbSc5HGAKpavqLabbxSJAbh5JRGqK2CSQenB9KpK7shGgDShTWA+vX1rqNvY3+iXFlLMyhRcFkbBOM4KjI/wroB05605RcdwTTHKD7Vd01h9qA9VNUh2x1qzZELdoR9DUgbYNIXC1XknC5OD+FZV9rUNsQu7fJjARe31q0mxmtLdKiks+FHftWRc62oJEHX+8e3+Nc7eapLO/7xvl7Rr0qqsxbk9K1jTA2zqDuc7izd3btSiQO2XbLdie/4VjrcBRu3fd6j/Guh8PeF9T8QYkjAtrM/8t5e/wDu+taNJFXKxiW5kWOBGlmY4VAMsT7V6D4Z+Fc90Y7vXJWt0+8sCnLEe5ro/D3hzS/DUf7iMPct96eYfNn2Hb8K6MXhBwWP496yc0tAepJF4f0a3QbbZSccFuTTJrPRlGDCin/ZFQzXuF+/j3rGvdRh2nD9ySfrWbdybWJb2PTI93kvJuA/vVhTkMheNsr3J61j32qqHAVizMSqKOp+nrVIXvkyMl3cRLMCCYfMwy46bh2o5LjuX5nyOG3D6VUc+g/I1WF1vPyngnrmlaQZAJAPrmp5bBdD93bv70w/d6c+/NJv7cH3FAI9aNhDWHT+nFRvGhGCoIPrzUhOTTDT5uwFaSxtX+9bxt68VVfQ9NkOTaxj6Vomm4weKV30YGNJ4Z09xwjr9GqrJ4Vtgcxyuo+ua6I4xTSfampSA5WXwvMrZiuwfqtZUuh20V1qsmrCeZLLTlukS2lWIsTcRxYLFW4xIT07Cu8Y+1cprtxfWmr3Bt9IGoW93YLbTJJHKVwJhJwY2Ug5Re/StqU3zWZMtjDOjiK9tJtLEj297Zfao0mILxr5jRspIABw6NzgZGDgdKLizvSNrW78e1a2gSalc6+9xe2L2kMdp5EMYiZI41DLhVzz6nkkkkkknNdU2CMYx71VSq4yshRWh5k9o6/eSRT/ALpqMW4HGfzFemPChAykZ+oqu9hauSDBGfwpe3uFjzxIyjdVIq0siH0J+ldhJotg/WAD6NVaTw5ZsuQGU+xqvaJhY5nco6sM+1PB4zxn1rak8NRH7k7j6rUD+HJV+5cZPuKfPALFWxlYXkQErcyKCO3UV6DZcxqSMcVxMOh3cNzEzOpUOrHH1rubNcKO+RUTaewzFX+LCkigDPTinEnjJ257CgAdR0965xgMtxzUE9xBZXVlLPMsAMkkaTt0hkaGRY5Ce212Vs9sZqwWI+6Kp6lpcWq26wXDOqq4cGMgHOCO4PrVQspJg9UcoLeeyn0Wzn1G3nZbwyC3gmSZYdzIN29CRltv3c8bc/xV3fQY6msCDwjYW08Vwk1wWicOAXXGQc+lb+QcBelXWmpPQmKsKDz9KVZ1hzIwOF5OKQKRkg0k/NvIBySpxWK3KMi+12WfIiPlxZx/tGslpmYEK2FPX3qvvzjndxkk9qY0vGSMCuyMVYCwvAO38xUiRvIQkalnY/Ko9fSqtvFNd3KQwxNLI5xGick13q+AJLLwpqmpanKfPjsZ3jgjPCN5bcn1qpNJBcu+F/BHlut3q6CSQgNHbD+E/wC1XoUS7VwpCjGMKMDHpXgGreEbay0Ca+jsNXiWKwsrlb2X57eeSZImaMYjG3HmNg7j9zB5NfSKwQKOE2qO3pWFWLj1FGVytHuTOBge/SnGYhMDPHIB9O1WGiiH8f4GvNvH3jaTSb19J08qZI1Bnl7jP8I9xWUIOTKbOl1rxBZ6dGWuLlI+cKM5J/KuIn8WSapfeVYTxxWvl/vZJTjYc/yrzycyTSM8lwzgncGd8tzVaUAZDSB+x+X7wrqhRsZuZ0Wqax5ExW0uzJMDjzAMY/2hntVWC+MyhXUyAkMxzyxHrWCz+YSdzHAxyc4HpT7e5e3cPG2GHBXsRWygkhcx0X2ghUeJ5ExkjB61fg1fU4F2NIr7hkBh0FU7LyxY/a5ivCnavZf/AK9NiMt2HmwFUAqP5UmosOY0U8T3CY86FW9dvpVqLxTatgTI8eTwfWudcxwISxJwAhx1JApphkig86QEv6DoB2/Gp9lFjudd/bmnHH+kgE8DINTLf2jthLhGx71woUsu9hgHnJ54qHCBS3zYP3ecVm8Oug+Y9G8xG6MD9DSbx6jPpXnsctwuG851cjH3qeuoXkbDZcyh/ds0nh30DmO+ySKaW4wOtcKut6ihyLgt7EVcg8U3AQieESN2PSo+ryDmOsJyeuPrUD3ESvs3/N35rn18VHOJbbav+y9SprVqbRtzLgjkkndk+2OawqU5wPQwFClXv7R9uqWjvd66WXVee6NxiM8mjJ654rMi1uzeLP2j7uM7uDTxrFk2T9oApuEjglZNpO5e4J4YZpmKrLfW8oykyEfWplkVhlTuHtT5WA4n8KbwvtSFhnoaQuCMUkmApJ7nNAPambhjP5UA8Zp6APXPmKcAiti1A45PSsaI/vQK3Ldc44qkBz/J5al+8etKc49aFII4HNZFC8fjUZZyzANjGO1Sgc80x0UtySD6g1Mk2tDrwdSnCbdTto7JpO61ae+l187ixvuU56g4NSKcdBmmqAo4XApwznI4pxTtqY4iVOVWUqatFvT+v06DwOpNI4BRh7UgPB9adsJGPXrVLcyOClbDtkYAyv1rZ8OeE9R8ST/uFMNqpHmXL/dX2HvWn4b8E3XiHVJJZ8xackhzIR/rDn7o/wAa9ssNPt7C1it7aIJFEuxFA6CupzsiTG8OeEdN8Oxf6NGGnP8ArJ5Bln+g/h/CrviW2lm8Ja1BDE8ksljOiIgLMzGNgAAOSTWyqY9qjvby1062NxeXEcMQ/ic4ycZwPU8Hgc1g563LhCUnyxV2z5yvYvF13YyWw8I3cDzWsFpPPFZXG+WKEIEBDEqP9UhJCjke5r6LlnVSTvyemccEVWttXsdSt2lsbpJgF52nBXnuDyOhxmvMdY1PV5fF+pSWupNG1o6iC0x8siEdK05va2FOnKlJxmrNdGd5f62lurMWGQN3J4xXz7qNxJc3k9zKWJlkLsWPO4kmtrxVr095qTwRS7bdADsU9SRk5NcjNKzMd7Fj6mt6UOUybuWnYrg8HikMsckfyRsHHXJ4qn5hIxnIp27gYrYkezjovGOtG4DvULctnNKOOlAG5pQNxayxux8qPO7PqRxWxNKsNqrDhF+Ugfxetc/pE21pFdsRcFvSrl5du6gxKCeiA9APU1LWo0yyobzBLMVyfuJ6e596PtI/hOcE5B6GscT3IJYxq+e+a1o1QRo2AwwPl7A0xkPlySxqxbahz5Y9B3zSgb0DAfu0+VAerGpJUPmbByqDLY7+1WrfTrq7tyYLZ3CHYrqOP89KTdgM4nHXHBwwpjKN2QelbNv4Z1m8k8uLT5N3RieBWTcIIGZXGHRtrL/OhSTFYrEMzeWPvE5z7U9lAbbwF7U5IztYj755GfSmkg7kA3Hr9KdhDCjDgYI9ajf5Qc9DwDUxGCOfl7/WoSpcqDj1IoAYF+TGBnufWhhwRxT25ywHHajKOBxg0ARA7W+Utn0FTQ3VzE7COR1x05qNgVJzSKpIzSsBdOsXyhR5xI/3RT4teu0YFnWRD7c1nbcAFQSvc0hwwLHr60uSIcx19lqUV5GXj4YcMh/hq7v3dcVx2nXAgvAScK4w1dHFKdo561zzp2ZaZqW5BmX1rctiQBXO2J3Sg55AzXQ2xXjBNZspGAAccfrShT60vyqME800fMcZrIodjpzSgYbnmjBB25GOtB+9QAvfuBQMnufpSYPrQAc9aYiTIXrTlyWznFRAZbrUoYdT2pAem6O6rpNqY1Cp5QOQP0x/WtqGQMo9fSuB0PW0MCWW2VJ4RtAxlWFb0Wpk4UqZOxIyKdgOmG09qxPENrcfaNMv4beS7is5meW1TGWBU4cAnllxwOpJ4xVi3vo2GM5x/eOMVoRXKSoSGVSMde9Eo3VjahWdGfOlff8AFWf4M4wNcXGq3OsG1mtLdo0j8mUBWmYMfmdQeCOgz1B615l40vZrHxDNLbXP+lSxNFcYX/V+gHvXrPjHVYtF0S4vZDzHIDGrDGXx8o9+efwr53vLma+uPtEztudt7E9Se9dGHhYjFV3WnzWskkkvJf1/S0K3m4U8Hjj1/XvUZIc5IqQlTjaOKYwLHCjFdZykQBJOKcqseRzn0p4GB6VZUDaUXC46GgZUMb9NvPpTMMp71dkJUD+dRM5LdBQAxJGEboPvtgAetbFsoWIAoWmZdrHsBWZbMDIQVBJyc+lbFs+FwBksMA0gQ9IWBVhCAPQt1FTOyoQE+633QPWmgeedzvti9uop6kgGYA4UFY1A7etK5RIIljj4J5OWJ7mvUfB9pJZ+Hk+0KYZHdpChGMA4wf0rlPC+m2tpcLqesNtXg2ysMofVm/z3ruptY06Kyku/taGFFJYg5/L69PxrCrJvRFxTL6yNHKCWYbSM4bqK8P1fTbmy1CT7SqhXdig3ZByfSuzv/Gaz2ZksySTysbcEDturjFkW9unl1K6mHBICKDj86zpOS3N/YSaM9izHB+VxzzTZGDxq4+Rm4GO9Xb+W1lKi2SURoMEyAAsapIVUlXXgj5f9n3rqv1MZ4epFXsMByuG7GowWQA8c9fUU9lO8KCRk5zilkXYTkhuetO6MnGS6Ee0Y3Lkj0pm0Fsjin7WAJU8UNjO4dD1piI2O75c8045yAvam9ZsgUrYYnBwaAFYlFPOF9BUTLjnp7UuedpPFBY5w2MgYoAah/eAnv0rfsZy8Qz1WudyQVrRsZSs+M8EVE0NHU6axa5UA/wAOa6a0wAOOe9clpT5vdvfZXXW3ArnloWjnx1wBuPrS98EflQSc8DaPanL0ODx71zli8DrzSjsijc3YCljieT7vCjqTVxUSFSVxnHzN3pqIim6lJMNwaToeetLdkSAMrfL/AAmo0yygk96NmBIoxmpB04qLJ9KkXmkB6L4SWM6HG6xruJbccdea30Tg8cE56Vzng2TOitHj7spFdMsig4OK0jsJkM1nBPgyRBmPQ9xXM+KvJ0LSZb0XUqy42QoGGXf0/r+FdeSOWLADHJ9hkn+VeK+KdZbX9ZllBP2aHKW69gM8t9T/AE960grsTZy+ta1rWueVHqt481vCxaJewPrWDNFIw3KCQDxW86KxKhG+bkAjkVTniKxrHsOc9TXUrLQhmI4ZDtYYIHSkBIxWlJZhywdSH9RVRrNk/wBW241RIwNu6AcUcd+ophVgSCCCOtClRz1xQAOxxgk8dqi3dTxSu/JJFTwWzTNuIAXr9aAH2ULlg207SDznoa1oFI4UdDwP6/Smx2zphtnyeg7iu+8PeH2sdNNxeWqvPcADay8JH7e9ZylylI4tYwWwOOMkZzwalIRVAwzKvAOfyrvm8OadLiU2TJnJ+Q43YqtceC7YhBFctEzoZBv52r3/AKVPtIlJHMWupXVk4MU+EP3h2JqvqOoPdSGQRpC7cMF6OfU1vzeDLwhoraZJcDjIwfWsa+8NaxCfms3PGMIM/jTUotlqfLqZAnEgx91h1FRyyohBLDgfnTprC6t3/eW8xC9TtOTVCRJFf/VkZ5ww7UrK+h6P1qKgOe5Y42qPXnmmQysJN0jE54xjvVix0q51K5W1gQySyM2EQYGF681tJ4P1s2zTJYMojYLtJ5OR1Hrir0OOeJlIy/OBByeASPpQzRpGe+M5ra0zwXqV/DM2zyXiZV2SjG/rk571Xu/CGtWzur2TsB/c+YGo0uL20WrWMZf3kY2ghj29qZnKnjBB496uTWN1bnc9rLF8uDuXFVZcFeSFKjpWiaRzXuR53ZLcemKcNuRuU57YpQvyKO3UGk5HBOM9KYiMjJORge9Iy/KScHFSBuoOGqNvlLYBI9KAK5OWFWYn2MD3GKrOwLA4xT1bJHvSeo0dZozh704HGMZrs7XoM1wnhxiZwc44rurXhRk1y1NykYW3aeantoxJKQegGarZPfOamtuJmHcrWES2XGdUTjhQfu/3qqzOzsC3ygchR/WpjgsO+Oh9Khk4kOec1QhJTut9xUZ4OB0qGMnlT0HNTgZtnHP3arJkvk1LGT570q/e9qaMmnhsUAdf4QuhDZ3CsT98H+ldP5+CMc55FcR4al2yXCn0GK6Dz22ghu+Oe1aLYTLXifVhZeG7uZRmRowg5xgk4/lmvHDGkyuDEQcFwqNyK7H4gXZj8NxQuSTLcjnPUAGvNY5lV93OcHBzyK3px0Ib1Nho5GlVWZ5EKZwQAV+uKglgLByyMJOmO1VRdv5bs8Zfd8p54xUkN1siZERjk8gt0FXawhtxbh3T5FLlguA1Qy25ZQT8xVsccYq48lqVV2t1IyPnB5z704qHYoCv3cDeecVVwM2a1VGZZFBHByDVE2AkJIXa3YZrbaJZVUbAr8789DQkSuwKqrZGD2Kn6mmnYDEh04hwWYMT0H0q2sahOWOccACrhiCxQuCMqSGA5I96cyeW7BG3ZUMGA6Y60rgdP4P8OSXsy308beUpzDG38b+v0Fd1fahAmnCe4wogXYVwf3g7Yx3rg9P8cX1kYke1jljTj5flwv410UXjXTJZSJUa3kcbixG4A568Vy1IzctTSJftNbjubM3TQlQjqqr/AM9W7KP61T1DW52vbmC4ijSEH5Jk53oD1H4g/lT3vbG+P+iXMBjCtiM/Lu3HJIqxb2KPbtFIkYW4kLyYPEeCAD9SAP1o5basE9TnG8X5kdYraOWSQnEisRlQDtz6H71aVr4m0u7WFIryZJGALKcFUb0zWsdL0fOZdOhZ8kGQDBb/AOtz+prOu/CvhySXzUtpoCh3FIvu9KhzpvSxpZPQ047nNx5U8Uc/IAdFHzE9KxvEPhzTyL3VZ4SkMcRcSR/xOBxgdME1eg05VgO2QxJEuF2nJJ//AFVT8UtJPb6fokexkvZ0IVAV2xgjse2eailKV2OqlFKxL4K8NJptn/aDr/plyoLg/wACHkAe5FdQYZHlUSN8o5AFWYSuNoGAnyD8KYG/eMOOvr1qpybZgkUD5v2g/INg6kdzU6hsd8+pqxtG/wC6APrQ6gj0x3pcw2U3WOQFZkidT1BQVnXGgaRc8yWURY8jtWqzdSSfyqNipGAM9jxVKTEcdqXgKwlid7VJYplUkRjlWrP/AOFdxNbB/tkiMFG5CBlTXdMZllGzmMdR6Uob5/U92Xr+NWqkkHKeQa94ZudD2FpRPC3RwMYPasCQYBypzXqPj9dugkAYxMjE44PWvLy7kFRzjrmt6cuZEWsU5D8w3cHtT14AJ61FP196ajkLjOfrWlgOq8NEiZM96723wEFcB4bI8yKu+t8Ba5ay1LiYYJwB+tLEcXSnPXKmk3ZHFMJAmT6gmsI7lsungrTJc7hUj8EexqKYncD71T0YhM/IQTjnFVU4Zee9WByrj8arDhh79KVtRlnp9aUcnPWkBHQ9aX6UgNjQG23Tg94yfyNdDEyuzxt/F8wrl9FZV1FQ7YBUj866TDGYFSOK0gTI4z4jz4j0+2yTgM5/QVwIGBg55PFdX8QJw/iGGEk7Ug/Uk/4VyJ2gkgk46V2RXumbJjIQm3nhh3pSzCQhuP8AdPNQEqxBYEr6CnFvMi2nIkj5yPSqAfuVu+P9nPFOaRmk3eWeePmOPyqKN1K/e9+lIHLP1PHTNAFuO6ZAUOSgbpnmp0uzMjBlQp944OD+FZpwRu53Z60vmYZGTgDrScQNeKYMW2zRoAcZ2g5HvThJ2DKqDjzFOM59qyoZJBLldoB9aXfsLsuxQR9wk0rAaS7XDK02N3G5k64/lTynyKRGwKnnvuFZy3sh+VtpjUYAx3qR5UlwX+UqQDtJzilqx3L7puYPFG0Rydue341ctr3UY2xFcOpHVJGzmsxZmCsqXRYE8LJ0/SmrMu7y2gbb1yjcfhSt3BHSweLtSiYrMsUqqNucYPvV+28cxCQm4tnCNgMqMSCBXIrOiL5Sjco5Kt1qUM0iKqiIoeiH+tS6cX0KUja/4TbUNzD7PG8KsWjUKFJB7E1n3viK8vdaXVQixzxKqxjdlUA7CqBto3LqjpuA6En9KgjRQSp2S54XJIK1SikhNtnc6f8AEc4VL+2IkGQZYuh98Vp23i6Gdx5d9A3H3ZVCHFeXlA0i4BLrzmh1Kgkrkr17VLpJgnY9kh1QuNzIQv8AeiPmZ/wqyNRtnUbpiMdieteLwXF1bp5tvNJHhuzZ7Vo2/izVYcB5/MA/56KP6Cs3R7Bc9gF0jpkMAO1G8dQea8uj8ayJzLYwEjuGbmrlv4/Rl+exfHsen60nSaC56CS3Jzgmq7hS2QSje1ctH460502ssyZ6njio18eWQuJI5IpI4gQEfruHrUckh3Q/x/Ls8OpG8hO+VdvHIPvXl77uq8D19a7fxnrdnqdnZ/ZpUkUSMzIc56DFcYxiOGiyDzlT2ropKyE9TNnPrUanipJjlgCKbkFTxzmtiTqPDmN0Rzzmu+ts7B9a8/8ADxIMX1Fd9bY2g561y1ty4GGMnGO9MkGFBP8AnmljPyj6UONykN0xmsUrMtl9+QD2PNMl/wBX9KVDut429VH8qR+UNEtxDEIGfcVUY4bjsasqfnHpiq0n3jj1o6jJRyeDwKkjOD61CuOuD0p6jnOcCkBbtS32iMgc7hXVwzKsPmkZJGBj1rkrZsXUR5ABFb0lySHK8KuBgfzq4EyPO/HEpfxI+c5CL/WsDaGwN20kcZ71reKJBN4kuctnG1f/AB2sMttfaeR2z2rtjsZku5wR8p47ipA4JLebtbvx1FQrMynCsQfQinMyyAFs9ecDrTAe3ySBRkoRndSbiRnLMB+VJIibQY5Cw7A00OyE5GPp0oAeBlTgkjvz0pMdsUkTK/LEg+i0uAW4fHpTAUbiTtHT1qRwNnzgEkcHvUS5zzn/ABoZx9nIwSV6UWAlPIxtzTgj9sDjt3pA2ANgOMc1H5hLAfNt9KQEueAxVVPrjrTlmMSlEkRG6jA4564qIEshyNyelNdlwPlx70gLDTmTCNgtxyR1p0JiVWJk2v8AxLVXlssCTSMCWAO3/eHX8aANBZX2fLtnVenPIp6XisxNxAVdfuuBzVCKbyZQyquB1watveycs3lsqDI9/ak9hloSs5ZgsecYWUsOnuKlctKmZgjKByyDOayDMszZkIVSc7lH6YqdRE2Ehmdc8gZwBRbQCZI0icSAo8Wduey/UVHNELeQgMGi9QaaDInzRoJ0HDbRwT9Ket2rfuzDsfkEEcfnRdpAMdTtGwMVIyGY4xQVYqdvzAep4p20leELkcY3cVMIkO5iCoB5Q0XYFNxt4xjj7o70mCoyFIPt2q48cMagyuST90DtVYCXOUBwe2OadxWI3DL82dx/3elV3IGGwQMc/WrfmTKCG5XPUDpVafCoTuDBjnA7UdQKM2d4pi7RzjkU6T5mzmmBDkegzTEdLoGQUNd9bH92BXAaCTha763wUX6Vy1zSBhx5MQzxTip29exFRwEFcZqTGO3WsepbLcDf6KnoOKQkCM5POKbaki3PH3XyaqXE5csE7mm9RBJMT8i9B1NKi7xnt61HEhdskcY5qyB8vHGKTAaQRTh1FAz1NL0pAOJIXeDyKtaffpLEZMhgQclT6VSb5lYexrz37Vc2csscM8ka72+VWwOprakrkyLutT7tdupCcrI2SfTjFU5ASm4DpVXeXJLsWJ6knrUkMoU4bJrrSsrGY7zT8uB9TTiSucGopFwSQDg9KkA3DnimBJGcKykkZHy/WpFnIGAefcVCrYIUcHsaQOQTyTigCxmORBktkHnApGREcqjnHbNRK5HIYjPb1pwEjYBP0oAV1bbk5K5xkU2Rgx+9x7U7LIpHOAc4oby2AYjknsKAJU29MnHOKbt4LIG3L1pZIgrb4ZDjGdpWlW5kIA24UDB5oGMDDcSGOCMZ9PamMcKAAS39409iDjZgYPDA80m1SMs5Lk444BpAK2NoP8XqKQbsZFCgLuRmwR2AyKQ84HzDHbFAAcFuVJNKMnhTg+hppyeQzZHpRuDHjjHrTAl8hj82MZ6HtUqgsjKdqleQ3qagEhG1QzMB2xUiShHOUUg9QRSYEizSQP1EeRncvOasC8SQL9o2MD0IHOfWom+zsuU+VvpVR12NlXGe/FIC+Xh28yZwcho+opRN5p2tOZB/CWGOfSsoTSLkqAreooF0+CGdh64NO2gGmjPGro58oEZ55BP86iMw3Y+1PIcYAUYH41RNwT91mJz1z0p0eMM/BA64HekFywZdrPuAdM8KD3qK4PIby1iPcA5pirkFwoVFOQ3940yQDefTFAFeU/vD6UisSMUkhy2MUDGc9/SncR0egsQqcdxXfWrbkXNcBoJ+UD/aFd7bH92tc1ZmsDDgXBOKmx3JNV4Pv9D0qwOmPSsC7DPnXADEAnmkWHB3Z5Pan9SKd0+tO4hcYA9v1pc96TBIoxhevSpAXNL+tNGQM9c0ZGeaAFxuPpXnOpJ5eo3C56SH+Zr0XnPFcbrqxrfzIFG/dkn6gV0UN7ESMRT3xxQG/lUuCRgYAFN2Bj711GYqybRhuc0vmbSO47ikjtXlfavNLNbzQZLr8oOM0XQ7ErkMMqcU5WV1w2fyqqspX5TyM08SAdKAJghGFJHtSh9h2nJPY0wHK9ee1KPmPzEcUCHB2Zi3UDt60o5IBfb9RSrhOnA680kj5IwOaAJo5Snyu2fw6VLDMquwLLtI9KrFcgENz3pm9n2rjHqaALckELR/OQHxwRxTBbYA/fDPdTUW87sg8CnFm3AluvpSAcQ0DjcvB5yOQR604SEEspyp65FTRXPnx+VIykJ03CmPaBjkbcf7Oc0DIdy5yH69Bio2Q9Qc+uKlktH48tg8Z6eoNRmC4yVUb+OVyKaYCBiB94j3ApN7bc5B96TdsPzZDUD94cBhRcBu5ycgn8KckbynauST0qZYBsJZwPSnh0jTbzub+IdqAK+0lti5YjrThayEg4796l86OMhYxvUDqfWkSbbuKoBkc5PagGKIEi/4+B16FelQyyb3VI8ADjjvTHlYgqoAX3NNUlFwep7+lKzFYk4wETJC9B2zTGJOQKcQEVVY5zzkVG2M5APIpDInbD8UgIPOOcdaRj82MUq4xj1FArnRaAcYz6iu8ts+WuK4Lw9tJOT0Iru7XmIVzVjWGuxhxNtkJ5+lWAQAWPcVUQ/vF55PerJUnIJzWZY5Djk0p5JyKaef0p3O6pELnjFA9M80c45o5wMdRQkAd8A0vA7ZpM59OaUHB96AFB4HbNcjrVuZNZkTO0lEbJ9P8ius4IGa5XxKpGoxEZ3GPr68mtaPxEsqzWMeCyuFAHU96zlUZIA5PSp5TOI9sgOzrUIPzZzzXXcixsWVukUQIYEkZY+lUby4E7YXOxenvUIdgCqsRu60qwO8fmKh2DgVNrO4+hEI167eTTDFySDgdKmwemcZpcY7dKskqHKE9cU9WBwOv6VpWdstxcYcqFUZPv7Vdn0e2k+6rKfUVMpWHYxTKDx17YpMhsc1NdadJarneDHnGO9UyecYIq46klpSAQMjin8YyCBVTI61IkgBGeRQBJkEAY6UmHBJB69s00tzuXp6U9WBIPGfQ0AGSMEjp71YS4ZDkE57YqFgWbJAAPFMJKnbigZbju2QsfKBJPpQ9wrZKqsbHqQKqeYQcA8UhJHf86QF4TDaQ8aMT3NRvaK670whHQbutVwQAARz9aekuw/d3D60AAt5Rk8ZHYmmsJ4zlgSuOxqU3eFI2DB9eoqA3BGQOh7UCFMysPu8fyqFzv8AlB4PeguzAqANvtTlj2rz909RQwuPgg89nAIUom7n+LHvVqHTpGnwWXJQPjPYjgVXiuHiysYXDIUy3bIxVlNQkVF+7kFSfU4HSspc3Q66P1d/xAk06aILyG3Hgg8D/PpSnSZskCVDgZ4Pp/j1pTq0pyNinaAB+HQf/Xpi6rKibQqnjBPr6fkKj98dUngfMrR2DSfPvXltoC8n/wDVUsenu7snmRgg7c5z/wDrPtTEvWRSoVWDHcc8H9Px/OnR6jtCBYEXDEjk/r/jVt1DCP1fuaujwtb3bxPjKEZxXa2sqFQuea4rRLhp7l3YAb8dO1dlaRqPnJGa56zqGnLhXBtN3P/Z",
"path": "images/4pts_ADE_train_00009536.jpg"
} |
depth_point_169 | images/3pts_ADE_train_00007559.jpg | ADE_train_00007559.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 298 y = 117),Point B is located at (x = 122 y = 155),Point C is located at (x = 279 y = 126).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_12><DEPTH_12><DEPTH_121><DEPTH_121><DEPTH_98><DEPTH_98><DEPTH_42><DEPTH_55><DEPTH_23><DEPTH_12><DEPTH_74><DEPTH_64><DEPTH_121><DEPTH_121><DEPTH_98><DEPTH_98><DEPTH_121><DEPTH_98><DEPTH_81><DEPTH_74><DEPTH_30><DEPTH_15><DEPTH_121><DEPTH_121><DEPTH_119><DEPTH_119><DEPTH_98><DEPTH_121><DEPTH_84><DEPTH_59><DEPTH_5><DEPTH_53><DEPTH_98><DEPTH_119><DEPTH_65><DEPTH_65><DEPTH_119><DEPTH_121><DEPTH_71><DEPTH_5><DEPTH_17><DEPTH_83><DEPTH_121><DEPTH_33><DEPTH_50><DEPTH_50><DEPTH_33><DEPTH_12><DEPTH_54><DEPTH_17><DEPTH_5><DEPTH_83><DEPTH_121><DEPTH_19><DEPTH_76><DEPTH_64><DEPTH_25><DEPTH_42><DEPTH_84><DEPTH_22><DEPTH_70><DEPTH_53><DEPTH_98><DEPTH_0><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_121><DEPTH_71><DEPTH_30><DEPTH_5><DEPTH_80><DEPTH_121><DEPTH_0><DEPTH_45><DEPTH_19><DEPTH_41><DEPTH_12><DEPTH_54><DEPTH_5><DEPTH_6><DEPTH_26><DEPTH_98><DEPTH_25><DEPTH_82><DEPTH_82><DEPTH_78><DEPTH_121><DEPTH_28><DEPTH_6><DEPTH_9><DEPTH_68><DEPTH_14><DEPTH_9><DEPTH_61><DEPTH_61><DEPTH_61><DEPTH_14><DEPTH_19><DEPTH_68><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"A",
"B",
"C"
] | <DEPTH_START><DEPTH_12><DEPTH_12><DEPTH_121><DEPTH_121><DEPTH_98><DEPTH_98><DEPTH_42><DEPTH_55><DEPTH_23><DEPTH_12><DEPTH_74><DEPTH_64><DEPTH_121><DEPTH_121><DEPTH_98><DEPTH_98><DEPTH_121><DEPTH_98><DEPTH_81><DEPTH_74><DEPTH_30><DEPTH_15><DEPTH_121><DEPTH_121><DEPTH_119><DEPTH_119><DEPTH_98><DEPTH_121><DEPTH_84><DEPTH_59><DEPTH_5><DEPTH_53><DEPTH_98><DEPTH_119><DEPTH_65><DEPTH_65><DEPTH_119><DEPTH_121><DEPTH_71><DEPTH_5><DEPTH_17><DEPTH_83><DEPTH_121><DEPTH_33><DEPTH_50><DEPTH_50><DEPTH_33><DEPTH_12><DEPTH_54><DEPTH_17><DEPTH_5><DEPTH_83><DEPTH_121><DEPTH_19><DEPTH_76><DEPTH_64><DEPTH_25><DEPTH_42><DEPTH_84><DEPTH_22><DEPTH_70><DEPTH_53><DEPTH_98><DEPTH_0><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_121><DEPTH_71><DEPTH_30><DEPTH_5><DEPTH_80><DEPTH_121><DEPTH_0><DEPTH_45><DEPTH_19><DEPTH_41><DEPTH_12><DEPTH_54><DEPTH_5><DEPTH_6><DEPTH_26><DEPTH_98><DEPTH_25><DEPTH_82><DEPTH_82><DEPTH_78><DEPTH_121><DEPTH_28><DEPTH_6><DEPTH_9><DEPTH_68><DEPTH_14><DEPTH_9><DEPTH_61><DEPTH_61><DEPTH_61><DEPTH_14><DEPTH_19><DEPTH_68><DEPTH_END> | 298 | 117 | 122 | 155 | 279 | 126 | null | null | null | null | 30 | 148 | 179 | null | null | {
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",
"path": "images/3pts_ADE_train_00007559.jpg"
} |
depth_point_170 | images/4pts_ADE_train_00008134.jpg | ADE_train_00008134.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 268 y = 207),Point B is located at (x = 41 y = 102),Point C is located at (x = 83 y = 182),Point D is located at (x = 316 y = 155).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_98><DEPTH_0><DEPTH_44><DEPTH_8><DEPTH_2><DEPTH_0><DEPTH_70><DEPTH_20><DEPTH_58><DEPTH_55><DEPTH_33><DEPTH_98><DEPTH_18><DEPTH_37><DEPTH_52><DEPTH_80><DEPTH_63><DEPTH_34><DEPTH_39><DEPTH_121><DEPTH_58><DEPTH_69><DEPTH_86><DEPTH_10><DEPTH_6><DEPTH_77><DEPTH_12><DEPTH_98><DEPTH_55><DEPTH_27><DEPTH_47><DEPTH_64><DEPTH_9><DEPTH_8><DEPTH_16><DEPTH_84><DEPTH_53><DEPTH_0><DEPTH_62><DEPTH_14><DEPTH_12><DEPTH_94><DEPTH_27><DEPTH_54><DEPTH_7><DEPTH_60><DEPTH_45><DEPTH_85><DEPTH_8><DEPTH_32><DEPTH_9><DEPTH_2><DEPTH_55><DEPTH_8><DEPTH_80><DEPTH_80><DEPTH_16><DEPTH_32><DEPTH_49><DEPTH_9><DEPTH_1><DEPTH_94><DEPTH_119><DEPTH_21><DEPTH_56><DEPTH_48><DEPTH_38><DEPTH_32><DEPTH_68><DEPTH_47><DEPTH_9><DEPTH_40><DEPTH_80><DEPTH_10><DEPTH_22><DEPTH_6><DEPTH_17><DEPTH_33><DEPTH_24><DEPTH_32><DEPTH_57><DEPTH_72><DEPTH_4><DEPTH_24><DEPTH_38><DEPTH_17><DEPTH_63><DEPTH_14><DEPTH_27><DEPTH_94><DEPTH_44><DEPTH_7><DEPTH_34><DEPTH_37><DEPTH_64><DEPTH_23><DEPTH_66><DEPTH_84><DEPTH_32><DEPTH_32><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 4 | [
"A",
"B",
"D",
"C"
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",
"path": "images/4pts_ADE_train_00008134.jpg"
} |
depth_point_171 | images/5pts_ADE_train_00008459.jpg | ADE_train_00008459.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 324 y = 217),Point B is located at (x = 287 y = 126),Point C is located at (x = 15 y = 123),Point D is located at (x = 134 y = 223),Point E is located at (x = 291 y = 201).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_66><DEPTH_33><DEPTH_33><DEPTH_66><DEPTH_50><DEPTH_81><DEPTH_19><DEPTH_84><DEPTH_24><DEPTH_10><DEPTH_67><DEPTH_35><DEPTH_20><DEPTH_7><DEPTH_49><DEPTH_49><DEPTH_67><DEPTH_3><DEPTH_43><DEPTH_44><DEPTH_74><DEPTH_74><DEPTH_38><DEPTH_67><DEPTH_76><DEPTH_72><DEPTH_29><DEPTH_67><DEPTH_5><DEPTH_30><DEPTH_29><DEPTH_29><DEPTH_49><DEPTH_59><DEPTH_36><DEPTH_74><DEPTH_3><DEPTH_83><DEPTH_5><DEPTH_40><DEPTH_49><DEPTH_29><DEPTH_31><DEPTH_67><DEPTH_74><DEPTH_29><DEPTH_31><DEPTH_0><DEPTH_3><DEPTH_3><DEPTH_3><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_29><DEPTH_29><DEPTH_30><DEPTH_64><DEPTH_1><DEPTH_43><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_40><DEPTH_15><DEPTH_29><DEPTH_70><DEPTH_25><DEPTH_40><DEPTH_53><DEPTH_49><DEPTH_40><DEPTH_3><DEPTH_5><DEPTH_29><DEPTH_66><DEPTH_67><DEPTH_36><DEPTH_62><DEPTH_83><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_72><DEPTH_67><DEPTH_3><DEPTH_70><DEPTH_78><DEPTH_36><DEPTH_64><DEPTH_44><DEPTH_25><DEPTH_19><DEPTH_76><DEPTH_25><DEPTH_44><DEPTH_82><DEPTH_12><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 5 | [
"B",
"D",
"C",
"E",
"A"
] | <DEPTH_START><DEPTH_66><DEPTH_33><DEPTH_33><DEPTH_66><DEPTH_50><DEPTH_81><DEPTH_19><DEPTH_84><DEPTH_24><DEPTH_10><DEPTH_67><DEPTH_35><DEPTH_20><DEPTH_7><DEPTH_49><DEPTH_49><DEPTH_67><DEPTH_3><DEPTH_43><DEPTH_44><DEPTH_74><DEPTH_74><DEPTH_38><DEPTH_67><DEPTH_76><DEPTH_72><DEPTH_29><DEPTH_67><DEPTH_5><DEPTH_30><DEPTH_29><DEPTH_29><DEPTH_49><DEPTH_59><DEPTH_36><DEPTH_74><DEPTH_3><DEPTH_83><DEPTH_5><DEPTH_40><DEPTH_49><DEPTH_29><DEPTH_31><DEPTH_67><DEPTH_74><DEPTH_29><DEPTH_31><DEPTH_0><DEPTH_3><DEPTH_3><DEPTH_3><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_29><DEPTH_29><DEPTH_30><DEPTH_64><DEPTH_1><DEPTH_43><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_40><DEPTH_15><DEPTH_29><DEPTH_70><DEPTH_25><DEPTH_40><DEPTH_53><DEPTH_49><DEPTH_40><DEPTH_3><DEPTH_5><DEPTH_29><DEPTH_66><DEPTH_67><DEPTH_36><DEPTH_62><DEPTH_83><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_72><DEPTH_67><DEPTH_3><DEPTH_70><DEPTH_78><DEPTH_36><DEPTH_64><DEPTH_44><DEPTH_25><DEPTH_19><DEPTH_76><DEPTH_25><DEPTH_44><DEPTH_82><DEPTH_12><DEPTH_END> | 324 | 217 | 287 | 126 | 15 | 123 | 134 | 223 | 291 | 201 | 81 | 1 | 41 | 21 | 61 | {
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"path": "images/5pts_ADE_train_00008459.jpg"
} |
depth_point_172 | images/3pts_ADE_train_00003892.jpg | ADE_train_00003892.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 237 y = 174),Point B is located at (x = 234 y = 202),Point C is located at (x = 128 y = 201).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_3><DEPTH_31><DEPTH_49><DEPTH_49><DEPTH_49><DEPTH_49><DEPTH_31><DEPTH_49><DEPTH_49><DEPTH_3><DEPTH_70><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_3><DEPTH_70><DEPTH_70><DEPTH_70><DEPTH_70><DEPTH_70><DEPTH_67><DEPTH_67><DEPTH_70><DEPTH_3><DEPTH_59><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_70><DEPTH_70><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_70><DEPTH_59><DEPTH_60><DEPTH_31><DEPTH_31><DEPTH_67><DEPTH_67><DEPTH_49><DEPTH_11><DEPTH_59><DEPTH_31><DEPTH_36><DEPTH_63><DEPTH_44><DEPTH_59><DEPTH_59><DEPTH_67><DEPTH_69><DEPTH_72><DEPTH_64><DEPTH_49><DEPTH_31><DEPTH_36><DEPTH_40><DEPTH_31><DEPTH_74><DEPTH_60><DEPTH_41><DEPTH_41><DEPTH_2><DEPTH_41><DEPTH_31><DEPTH_49><DEPTH_74><DEPTH_72><DEPTH_36><DEPTH_40><DEPTH_63><DEPTH_78><DEPTH_45><DEPTH_64><DEPTH_36><DEPTH_64><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_38><DEPTH_74><DEPTH_20><DEPTH_35><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_36><DEPTH_30><DEPTH_39><DEPTH_98><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 3 | [
"C",
"A",
"B"
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"path": "images/3pts_ADE_train_00003892.jpg"
} |
depth_point_173 | images/5pts_ADE_train_00018297.jpg | ADE_train_00018297.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 25 y = 96),Point B is located at (x = 256 y = 206),Point C is located at (x = 305 y = 212),Point D is located at (x = 203 y = 217),Point E is located at (x = 68 y = 214).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_17><DEPTH_56><DEPTH_56><DEPTH_17><DEPTH_30><DEPTH_69><DEPTH_64><DEPTH_25><DEPTH_44><DEPTH_5><DEPTH_73><DEPTH_36><DEPTH_63><DEPTH_75><DEPTH_30><DEPTH_29><DEPTH_64><DEPTH_44><DEPTH_44><DEPTH_3><DEPTH_20><DEPTH_66><DEPTH_74><DEPTH_70><DEPTH_22><DEPTH_69><DEPTH_64><DEPTH_44><DEPTH_44><DEPTH_6><DEPTH_15><DEPTH_51><DEPTH_69><DEPTH_77><DEPTH_67><DEPTH_69><DEPTH_44><DEPTH_25><DEPTH_25><DEPTH_33><DEPTH_30><DEPTH_75><DEPTH_75><DEPTH_59><DEPTH_70><DEPTH_69><DEPTH_76><DEPTH_72><DEPTH_85><DEPTH_81><DEPTH_13><DEPTH_36><DEPTH_77><DEPTH_70><DEPTH_70><DEPTH_3><DEPTH_82><DEPTH_52><DEPTH_75><DEPTH_78><DEPTH_3><DEPTH_14><DEPTH_50><DEPTH_3><DEPTH_29><DEPTH_49><DEPTH_49><DEPTH_81><DEPTH_37><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_64><DEPTH_44><DEPTH_64><DEPTH_64><DEPTH_52><DEPTH_8><DEPTH_25><DEPTH_19><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_44><DEPTH_50><DEPTH_10><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_0><DEPTH_57><DEPTH_41><DEPTH_10><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 5 | [
"A",
"D",
"B",
"E",
"C"
] | <DEPTH_START><DEPTH_17><DEPTH_17><DEPTH_56><DEPTH_56><DEPTH_17><DEPTH_30><DEPTH_69><DEPTH_64><DEPTH_25><DEPTH_44><DEPTH_5><DEPTH_73><DEPTH_36><DEPTH_63><DEPTH_75><DEPTH_30><DEPTH_29><DEPTH_64><DEPTH_44><DEPTH_44><DEPTH_3><DEPTH_20><DEPTH_66><DEPTH_74><DEPTH_70><DEPTH_22><DEPTH_69><DEPTH_64><DEPTH_44><DEPTH_44><DEPTH_6><DEPTH_15><DEPTH_51><DEPTH_69><DEPTH_77><DEPTH_67><DEPTH_69><DEPTH_44><DEPTH_25><DEPTH_25><DEPTH_33><DEPTH_30><DEPTH_75><DEPTH_75><DEPTH_59><DEPTH_70><DEPTH_69><DEPTH_76><DEPTH_72><DEPTH_85><DEPTH_81><DEPTH_13><DEPTH_36><DEPTH_77><DEPTH_70><DEPTH_70><DEPTH_3><DEPTH_82><DEPTH_52><DEPTH_75><DEPTH_78><DEPTH_3><DEPTH_14><DEPTH_50><DEPTH_3><DEPTH_29><DEPTH_49><DEPTH_49><DEPTH_81><DEPTH_37><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_64><DEPTH_44><DEPTH_64><DEPTH_64><DEPTH_52><DEPTH_8><DEPTH_25><DEPTH_19><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_44><DEPTH_50><DEPTH_10><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_0><DEPTH_57><DEPTH_41><DEPTH_10><DEPTH_END> | 25 | 96 | 256 | 206 | 305 | 212 | 203 | 217 | 68 | 214 | 8 | 64 | 216 | 40 | 90 | {
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tQxazvBEzLuZwwWJj1IIzwD+mOtTWlUlUcIaFOySudFealHLYSSbBlXCkB8GTOfmwOR06duo61hw37mWSS3jMf3uTnjK478Y6/nVfT/tUn2ob1higXzFW5X5nIYLjb0zk45wOKvR2l3cSQ2enh5wTsjBbvgswPOB/EfpWPsnB26sd7kcF3q+4RRxySQrJ5bjGVyBnHpwBXa+G9GvvEFhvtJobS6huY03mDaAmz5vZs4Xjj7ue+adplzDZaTYXF/EJ4BG1xFYRyKnmMSBu6AMRsIA+Yndj1rb8Ma3p8mrTXoiGm6UFRYfOUqEnH3xgnjIc89OldlOiotMzbM68e18K6xYx6hbs89qXljPAaclwNzYHRh8wychsjpXaaX4jh1eOULdLJHJONpOYWjXG7bz1wFJyP/r1yHxWa11RrJUDLLGxEd0GHkle6lvrj1A9qvfDPQ5VjuZrm2jaxDYiZ2Lb5RlWde23BIrSN1Pl6A9rno9s/mW0TjGCoPBJ/nUtIAAAAAAOABS1uQFFFFABWPrs0MUR+1k/Z9hOB1Z8jAH5VsVy/jGCV4reYKWjUMpx2JxUVZOMG0VTV5JF7RXFxpFo20YKdunB71VmdZdYklXBAZMEd8E1J4ZJ/wCEes2Ix+7bb6Hk0l0hjvgo5LbGJx1JJJrOHwje7Kls8ty9o2AZLhyWz6NFEW/TNaFqwOp6hK7YP2hY+TwAFXA/X9apWJMVkt1sO63t12f77RRgD9P1qVEO/USWORfxdP8AtnQMd5ck3iG7iRgFMkTy5HVVUHH57f1pPEUr3N1p+kQthp5RNMR/DGhB/Ugfka0bGBft19eAt++kCgHphBtyPqc/lWXo2dQ1G91huUlfybfP/PJe4+pyfxp2uyW9Cnrpx490T3if+tdLCcMa5rXuPHOhH1jcfrXSxfeql8LJfxHlXxFGPH1mfWzj/wDQpaiAJQcVN8SBjx3p59bNP/Q5KYv+qX6VS2Jl8R0Wh7/7NG3Abe3X8KsXTRQEy3VwqKBwWYKKxorkxaTEVnMStMwLBsZ+XOM1mXSO1qjiJy+9WaWTCjAbP3n9h2rKUrF0sOpe9J2Rtrrlg10kNuHkJkCF1Q7VJI6k/UdK5nXNMlvNau/LkVFeQDkHPRc/oahTUbezulea9jfEyyCOFDK2RjjecKOnv1pmsazDNdySxaesjyYJE0jNngc7FwOw61VCdruQqkVTkvYmcunWv9mRvvkmunAPlBtx79FHPatiNYNPuFlkijsrZVb5pSsZbIYcL949R2rnH129kjKecIYscpbr5QB/4DzXOsS0pdiWY85bk/nWjrqzUUZuFSo7zlcdLFIsY3DggUxTgrkdK0ZISdOSdjub7p2nO3vWfjLqK5nozRH1QdUCjJi/8eqkPFFsblIVjJLHBJbGB681yMev3csQZ7qfBXn95nP5GqWoa1pukn+0Z3PkKBjg5YkVrzSew9FudlYeNNOljCXrPbTAkHchK9eOR7etY3/C7Ph5/wBDD/5JXH/xuvM9M1q7vbrMcTLat0LNkjnrgjBz7VwFnpVi/gSSB2tP7Vnik1GFDG3nlI2C4DbcBdiTsRuGflOOAa1F0PsKxvrbUtOtb+0k8y1uokmhfaRuRgCpweRkEda5nwed+ueKn/6iO38lrgvBXiG6h0PQLdr+4S3SG2BR+UwFXjPUD2rtfh7cJdy+JLpDlJNUkIPtgYoTCx2xIAJJwBTUdXRXRgyMMqQcgiub8Sa5f6FFNNJbpLaEZSRDtK9ircHn0PHf05z/AAt4qludOjkvLFord3KwS26mRevKsBypGc8gDFAGP4n0qa91m5XTYFmv2XzVdIyG2ljwx/hAwR2J4rmG8O3vhm1nu724tdj2jFIY/mI3nbuzgDoT09q9yWKMSNKqKHcAMwHLAdMmvM/i9cxpa2FqqoH+Zi3cL0wPb/61crw8U+bzNFJ7HkazL5F1/qiZSDtdsdAeh9eKomVdQcwRtP5rLtjjjTd50hOAuOw9ue2K9L8NeDbDUPC91dXO1b7IeMOmSI8HcVB65G78V9qm/wCEY8HaNqdlN/psxE/zRyMMoSOhwM5DAHrn060qnLG05PQp66FfR49L0nw5a6/eW66rJdN/pfnR7jGmAJAFHGd+0AkdsH1rH08XcV7d6/blNouHLSQDzJYQQDkA/LtO7Zkj+IntV/xnqMEVxBNpFtBFBE4HmRIdy5zkHJxzyTkdQD6mug0+S1tNJjsLuQfboYWuGLYjSUFSG2kAFgVJYZ71KqqbutibW3OIvJ7q98L6ck+q7ZIJn320hChVLBg2eDkk+4wO2MVPot/rE92dPjvd0N66pLbyyFjOC6gjcM43Y6+mfWtbWNGa50xLiORLqc3G6O2t3+6m5ydq9MDrkgDGPxveBNLYSo6xobmRw0VxGMPGhXkFs4OQBgZyAT+BDmctR6LU7a78NaHdwW8OpSNeSaWSVTbgAEbghVRyvHTHbFZ3h3WZL7UbOy0qya2sow3mgSEKFz8wUEcEPnA7rnGK6awnM09+DNtmyUxgEKRkZHfnrg1iaH4T1rT4L61u9WhuLO7JLL5Z3ZI5IIOBz29K6E22mtiPU661uo7uPzYt2zJHzoUOR14IBqequn6da6XA0FnGY4ixfaXLYJ64yTVqtSQooooAKzNdkUaa8JPzyYC/mOtadcr4w1BLAwHhpHRgEPTAI5Pr9P8ACoqO0HcqCvJWLmnJ9m0W2WJgxCDbuPBJ7Y7daj1WZY9SClgGwvH4mneHZVudGsWVgcx5bI5yP8iqGrRxXGvswjDyqEjX8ycfrWcfhG1qWYV/0K0iO7/SGEpB4+VEUD/x4Kamm/dTagFVjm7t3IHJydv+FRzv5VzbQoC/2OCVCSeWISM/1qxArTeILsA/u0McjgjqdmF/qfwprYY7X3+weGrz7MBHtj2rt7biAcfmas2VvHa2cEEQwkahRWLrmo/bdK16BAPKtPLj3/3nyC35ZA+oNb8f+rT6CqgRI5rxB/yOugH/AGZP5iuli+9XM+IuPGXh4+0v81rpY/vULZg90eW/EoY8baYfW0H/AKG3+NVy6JCC7BVxgkmrPxM48ZaSf+nX/wBqGsjU5CltGOxGcEZyaG7RJa94aNSntLB4LefZCpLAJ97OfXGRxWdf6h57QzTEudpB3Mcn61VZnCswJ5+XIHH0qKb50VXTcQCAf5VhdjsVmfDBged2cipRI/2jc2VYjnJzk++aawaQAOCNvH1pvluXBPr3oTsFiLy5FDMYz82eMe/pWaYys5BxzXTW8M06GEx5Yt2Hqcnjt6U6Xwzqk1w0/wBlS3iznzJX2D9TTehUdjEL7Iii5G4YIXoarbPnB7V1i+HrY5ebUUkweRaxNN+oGP1qdNJsIhmOwuJmHe4lVB+S5NIXKV7LVIzbtEIGDJHhCZMkkfgKWK+mQNucSuVy29c8e1c7o5mVZD9oVR5ZRhtOWXnIHv0raZVERZWOSoA3cD+X9a6ItNCVyykqKVbbggjoQenQGvO18E6/5iSrqtsJFj8pW8+QFUwV2g7emCRjpg4rsmnMYZ9qsWKj5GBJPpiiO9bzWSdHjJA2qxyB9PeiUkpctzphhqs6bqKOiv1XTey3duttupoaHZS2dvYROQZIoY4TtJIJXH+Fbfw+8RyaQb+H7MJobi7YsSQNuMDkntgn8q59Jfm+VlAABBGQc96TwrKyxy7pCImmkZ+M9FBqne+pzqx1XiK6mvZ57K6g2wLJhUWZW2gZwA3BI5NVdI1hdIkjslZrTa2YLjOQrHAxJycocfng9qy9ce1ezWQuFkKq0UiA4bJyBzWRDcTSahHIhDMuSyqDyMcjj1FVHUzqSsrH0Roc0lxo1tJLJHI5XBeMEA/nXi/jnU/7c8WyKjgxQnyl2nPAPX8a9B03V00b4WR6g2Y2ELiIEc72Yhf1IryvwsEn8UWTzIGjSZWlLDIKg96yqGlHVJnaf2Hq2mtGb6GCG3hh8uJ/PDhmB4GDjaCGbr3OO4riNWE8sPn3KqLG3IikaMZ3EEEHJ7lSuT7dOK9Z03UbTX4bnT7llcyu4mhkC5AIO1iCoyeABjPrmvPPEVrd6XqMcF5NHCJohAp3YVtv3ZGG3kAN1HdT6VxVIXSlHY1T7nHzaZfxqYIJwLS6AfLsoKkA4QjP3sHp3zXb/bp7jwHFpE0LiWEbXvFYl1OSQrZ5H3jwT27VZuNG0y8tFvrhrlGzEvkrGYgZFBzwTll5YZHrWVaT3VnI9pOv2m0RZJwhIBZQQWUnocA9PesKknGXJ1GkmYelajLafabUMEYSvCsYTezKwCsRjoAFA687q9V8PR6lZML+6+zPbjEc3l8sVXJHReSvp6H8uL8HnSr2w1Cx1BYvtEuT5kcRMrl1yynsVBCkD1BrZ0/U5vDVtDp0pW8tmmkMFzIxTO0DJwMEfwn8SK6FKMXzNieuh2l1JG91doUjSO5i2xzblJKnjdtHXB45xj866W1hMFrFEzh2VQCwGNx9cV5Fb+IGv9UM0M32UYHmSRKd7qx5AB4LDKn8c13mi+J4bt1hdlVVQLubglwdrfhn8eela0a8ZESi0dPRWZcaov2+ztrdg3myESMMEAAHI+ucVp11Jp7EBRRRTAK5HxrEkzWaEqH+fBPU9OK66uZ8T20c2paU4QmVJdxYdgOmfxNZVleDLpu0ky34fjMGh2CEbSIAcdsnn/P1rKmwmrW0m0LvZHIHTljWvbXAuLRGU+Wsi4Q7e2dorL1QBddtk6bViAFSrWH1FSfz7mS4PHmrMcDtmCI/0rYJaxsr++Ma+bsaXHqFX5R+Q/WsG1QsLKFV3Gb5SD6Nbxgn8s1p6xcti5sIR+6j0+WSU+mVwg/Rvyo6AzMe1Ft8PZzndJNGJ5XPVnZgSf1rpov9TH/uj+Vc/eHd8O8+tpH/AOy1vwf8e8f+6P5VcNyHscx4jf8A4rHw8OP+Wo/VK6aE5NcH4lvCfiR4eiU8bnGfrs/wru4fvmhLRg9zzD4n8eLtIP8A07H/ANGCszUIhLYghQXHIJrrfHOhDU9a067LBlhhZTGX2A/MDnIBPbp+tU44JVUBXghA4xFCC35vu/kKzlLSxXJd3OLt9GvroBYbWWQH+6p4q3/wjzxkLc3VrA3PyvKGf/vlcmupe1E4IuJZp1x/y1kLD/vnp+lRiKOIMkUaIgPIQbcjHpWdh8qMKLQ7GMZb7Zcn/YhEa/m5B/SrcdhGjAQ6faxkH707NKfy+UVpZyhZVI7E+gpo8tRjue9OyAqsbgAA3sgUnlIAsQx/wEZ/WomtIGO/yUZhj95J87Z+pyaslflUcY3dfeo2kO4hucdFFUkDI2ZlYKDgD8v/ANVMUEM7NyF4GeKkdzgHIz3GKYoHLYUgCmSeUacs80q/vwjOxJjPLDAzn0x2/OujEkgBZoyAQo3D2FYtuJrW/IdGiDtyjrsY/h6c1uHneQPlyoU7cDpzg960pvcmwj7bxjECQ+8bMjOKctpP5u+bA8sYUJkjnqeaS2nMokZwVaGYqpV89Oc81bS/mle5iaVW8tvKZpIQCcg9CKUoRcuZo7KeKrQpezjtr01V9Gk/Pr/wWRhEViSoOADwAOo9v8KPCarLCyMxUM8vPHAK4NQMioZkSXMkYCuM9DjI7CneFoXuLWSFWAMiyqMjgE8Vp1ORFjxRD9ngjiDZVBHGM9TgGsW2nkhmEisQwXAPQj3FX/FT+UY7Vs5QRrwOOFxWZFtKjnNNbHJiH7ysdfrni9LnwPYaKiss4mLylRhCuSRjn1YflS+E9P1CSyvr2y3xtHGVUFMiU5zszjGehx3rlCu6+gUEMq7Tjg5r3bwxonmeD7SF0QxXT+dMpYqcbsqRjvgCsZe87HZTTjTTZg6VeTwWYnuZGtmuZB5pU7nlCqAG4PBbHUdBnPtT13UNYOftdrZtBBudZEUSYj6EFifQkfieKk0He9x4g0TXJXCxSO8SrGfLkjLFdyjH3QWHQ9c5zzXodvo1nFZRxlGZVhKAOxICsMEY6c0nBtWQ7pas+fLXVJ5NSu1vHkljYqVeN97xlcAc8ZPGfl7nPNSa7LJcTWqw3RIljYzSbfmKng7s9+vHFZXiHT7/AMPau0ZjKRON0JUYzGOASB0OBzTDLeTXM91KcNJwEXlQc9Rn+tcTpWnzM1UtDotOljtrtdaSUxXa/Ki5wPLAIxwfvYwefeorvVLdmkkUuZnkYqoB+TOMtgZAY/Xis20MwlhiRCJZjh0BOdoOO3Oc8cc4yRUzvEbd3t1TyIgVG35RvOc8cds81i1yq0kG+qNTTJlit7iNba4khMeVkOSVYkAsuSDkjK45OMCpLa78oSRxrdAFgMGFwNwPGe9Mspd+jIURmlZ1K26YzsIADHPo57Y6k85qw2oaij3VukoJRR+8yPkz/GcZ46ZPPJ960io/aQi/pOvPY6gJppEeeF5JCOeWOeg57k8Yzz2r03RNYza2UV3MzyTZVZCuRI3XIOOnbJ6/z8K01muZZYlKwzAAtKFZyG4yBjucHnpya6zTZL21vlKyxTvHMYxJCCC/TnJXpng57itaEpQ03M2j2qimRKVhRSckKATT69EgK5bxfqbac0HlJuldDgkcLgjn3NdJJN5bHPQAGuW1cwaxqElqCpngXADMQFyRzWFeXutLc0pr3rss+H8S6TpZLE703kHtjJx+ZrK8QzTJ4mR4yu2OOMkHuef/AK1dDpUZhgiSbYrW8CxttPyg45x+Vc1rxJ1peMExqSPxapWkQ3kb+hQbwsrBcRpGFGOhMSZP5VDGDN4e1XUG/wBZeRSv/uqFKqv4AfmTVqLzLO10yyjyJ5mUvk5wqgF/6D8aq2XPgeT/AK9Zh/6FVx1Eyrc8/Dcf9ecf9K6G3/49ov8AcX+Vc7cf8k3X/ryT+ldDb/8AHpD/ANc1/lVR3Jex5RqMkp8d+HWl6/aHxk84yp/rXqsJy+B+J9K8l14Tp4s0u8RdzQO7kHgArt6/iMfhXpfh++W70+PMm6Y7mfPB6/8A16JuyBblbxIDuhIH8J/nWA+0DodvX61v+JSRJbkdNp7+4rAJaRG5wD3x2rB7mq2GyOCpwTzjGKj+45BGQeeR0p7MityyKfqKgdv3x27sEAEgcUAwAPlsQuTk/e6VCyAKCxTB4x3p+WC7duCTnBNRqjZJ3ADk9KYgcKrBjgA9KrPjJLnHGF45NPbbv+ZjtB7mlZUJ6D5u9AiBwAoyecZyaImODhTkDk4qVuIwu3d6nOKI1UxMR97r16U0I4sTjU7G8muoYWkifYjbMMBu9agdVVCq8AELVhNWi1TSLqWOExCObyjk9SCOaoi4jmV2hcNslMb/ACbfmH8+vWtnYlF5J5I4mPncBtpDrnOMc9/Wq5vY45plIiO5t7sueT+FMF3ClvjdHJvLFXVyeay7q3ZnDK7DLfvAR047AVjUb2iyr2saYlRhdzr1kOW/AYwPwp3h95P7KnSAsJzHIIypwQxIxzWVDcFYJAcvhcKQMDBqXS742sChHZXIPK9uf1pRm4xuwNHxM8zuhdCr7l3K3che/vzWMtyig7c5XrjpV/Vr1L+Xcx3LyR1BzgDj1rCuP3DsrNw67hWiqXj7pk4RlP3jWtZEmuYyjE5YDFe9aX4gnsLe2gnSP7NFGqfKpDBQMZ6187aLIxulCjceOPyruG8RavOHgWeOAgYctHlx/ujp+dTGSjJ3OiS91JHqHiKG0v7RfEujXAeezbEs1u5JkhH+sj49vmwO4rqNMv7XUrCKezuYbiMqBviYMM46e30rynQPGU+kXt2blg2hvwNoXdFKcfMQOeSDn/eq/P42sdN8XwTWcbpp93CDcFfkDTqG6rg8lSB74HPFbbamW+hyPxIto49Vl1FJ3Ju5GHlyIQybQFOc9ic9K5K7kaOEmONHULw2emBz7ZHzH8a6b4g6la6zrcU8ECQyuAZyGPznoCc9OBiucikjea9hlby2ZgqgR5JwMnPHTrXHWVndGsdrEvl3cKpfs0nlqQyyKc+XtYDv0YZU49KfBdCZYvtDs8c6ojq/Hy9tpxlcgnp096pSJ5cc08THMvySqerLwePQYyPwPrUst7Bp+6FCxDgrIr4Bwc/KMHpmplFbhc39Bgv/ADVgjiEpe4WHZuUcx/N94HgAZyegz78XIobvR9Zuba/txb3To7rK5+XcULJzgbhkc5znmud8LXKW10t8rkrEQVjUHA5+dR9RkfjXRa+949/fzRXklzDIqzE/eER2kqA3VSM9uPmxSbS6CHWmm313rpj09p1mZjI08Eo8skr8wXAAJGW6diAPe3p0VqL24mSVJo7fCxpHcbWYZ4YqQPm3c8989Riux8AIqaMsMccQuA7BQsu85G1TIT2XI/pXS2/hHR4LsXX2OI3Ctu83HzMeDk++R9OTxzW8KV0mS2bFtn7NFuVkOwZVuo471LRRXUQULwgzMh/uqcfjXMWlpjxJrN+WbZ5qwAKBwdinJ9uR0966e5JF2wA/5Zjn8TXD63NqVnc6gLT/AFU0+9mUcqdirjPbODXHOSUm2bwi2rI6fSGZ9Jjb5iZ2LYbqB0/xrJ1d9vjO0QdSYv8A0I1qeG2afSrGTYVQW6Dnu3c/nmuf1+/WLx7YQBlJZos89DuNXH4SH8R1tyf+J9pnuk38lrO0/nwS/wD17zf+zVceQSazpTDoUn/9lrN093Hg5VABVre43H0xuxVokq384j+GnXB+wpz+Iro4ZVSxiZs4ESkgDJ6CvPNSv3fwPNb7ApjtYwm3q2WXr+dd7pMMy2MLXQAk2AbQMbeKL2C1zhNWzJc3Mm3Cs+9SfRjkY/76q54f1FLTUYI5cCOSFRuxj5uP6ip9V0lhF8zscMIkUDqqj/H+Vcws7m6h3tgJgAnsByK0VpRsJ6M7zxGSZLbDEAo35cVzkqHy8DkHrnPFdDr0odbXABwrD3zxWBNvKqARkCuVmy2GKAqgtgEdgOtInDsGIJ4NEJYAgDLdj2xTwCrtn5scn60xEM7BX4//AFdqau7YemAe54qa4XeNzMuAOKqoyA4YbgOeD0piGvGsigHk9wBimZVQqksSD0NO4MhG75s455NRygn7oyQeBjrQIcigrjqPrTQoUkAtwvOPfFISjwlz1wAKkQ7A2Rj5MZ/+vTQjhkh0+HSZVsJQ0Uk2SQd3zf5xVGK3hgEiM7LHLI8jMOfmI7YHTIFY9pf2yx5lEbMjBkJbpTLW+jjRo0ZSWYt171o5IlG9DY6fKfLeWRY03ZVGUs/oR6d+vtSx6dLC0drFcIxZWbe+dnUcZ9cD0qlZ6ituYQxYlQQSTknrxk1qxlJdLdnkDv54AbvjHTipjyvYb1ZnalFLZ7raJGkhUltwUlQp/wADVDT1O/crAN5fClNwb5jweeKs3urLa20kbuW8xmQKrnG3sTkn/IrR0C7tINMMs0KTquFC4Gcs+O/p/Sm0noV7OSjzdCnrEf2a+ZSwEobDAAELxwB7Y/lWVfQF4d7ZyDkVs+IGT+1pCWORI2R+GKzXJljdT94pkDuPasZNRlZEW1uR+H+LwBTh9pwa2Ibu7ikW8lc+bt3K+wENwev5d/XNYugSAarEPfH4VvJOLS0kt5Y/MMRde43e3+faioryNlsWW1RJtMktVjKE8koNp3DHzZHuQeetVLq7a3tlglaSWVZUkjyM7mBBIyD1xkfjWREbg7yXcbh8xx/D64FX7gKumttBctgbsg7T6duvX8qI1JLToZlrxDexT3Nu4z8qKX9uaiS1aa4vRPOFcqro235WXPT1PWqDszxAuduCFAX+EHqP8+lbSxWsmu28NxDuQQ+UhLZ5C8H+lN2na5fQ5518y8kVuIzgswP44+vH51eewmurdNRa2dYkwHdRndzyT/312/8Ar1bisY727srVQAGtnlk7chCQfzrWsbkQ6YLS/QmwuFZY2OMLJ3jb0zxg/rWkaavZkN2Rk2k7QXVv9kiAbeqqiDb82e3of8at6lN9ljuoyhQyOGWIgLwdrAdecdOnpWCLwLcSHfuVXAIDdcHqD+FW9Tupby6NxM6yPIitK5YHnHHbjgdPauXlKT0O08F+JTocpkZXWFwflIIBJPBJHXjNe1aZqtlq9qLiynWVOhxkEH0IPSvnLTb2WAKcMrHqY2xt44Pr6V6d4b8X29sDBJLmZgrOXfhVBPBJ789Panh6vLdMc431PTKKjglE8EcoBAdQ2D1GRUlegYmfcn/TyP8ApkP5mualniTW5oLxS8Ekm5Yz/Ec449eTXTXKj7YW7+WB+prm3s45bnUdQOWe3lZVTPGcjB/ka4ZpuTsdELWOg06GC1tFithiBc7AD0GeleZeJ73/AIriCcg5PllccZwxr0DItNEj8tyXkQY59ef615148xp/i6GQJuENvG6qP4sMxx+Nbx1Rn1O1029Se7scSBmh+0q/scI38iKj0WUy+CIGz963uc/+PVz3gvzfsYeZt8skl28jerFI849q6TwdAs/hLT0b5o9sysD3BZhRtcRm6NZebBbblLho4+OuBuWu2ilEkQfsc/zrDsJFa9cxQonlOIgM/wAPGD+lX9O3LbSB8Aqzcfiai5VjL1QTW2rR3PzNDChfaBnk7s/oc155NxJkHI3cH+X6V6V9qbUrRGgcJJ5hXkd/LyQa8f8AEGuWejq01zJgMzFIV+83JwAP61tSZEz0CK8il0q03yncC6nd14xUErlIWk2jYOSTXgWt+OtW1e4DLM9nAiBY4bdiv4k9WJ9a52a9urhiZbiV8no8hb+dS6bbuNTsfRsut6Zbpuk1CziIGMSTqp/nmsyTxx4atFYPrEBJ7Rqz4/IV8/7Tux3p7wMjsrkAj3zR7Ndw5z2m5+KXhyEERteXH+5Ftz+JIrFuPi1ZoW+y6TM2ehklC/yBrzIQJtyZOSuRx39KuwaP9ouUjV8IyFsk9cAf40+SKFzNnVXHxW1Fxtg060j4wC5Zj/MVmTfEnxLLnZcxQ/8AXOFePzzWc2mWyaPb3YUl3kAbce2cVkSIFlIA4BPFNKL2E7mrP4u8QXIIk1e6wecI+0fpisye9u7k5nuppT/tuW/nUJA7UnrirshHd+Rbj/ljH/3wKBbwGSP91H98fwipKB/rYv8Af/oaHcSHXsMcdqZFz8pGBnNLp0rNGevJyOwBHem6odunvjuRWbbXEifMgPy/NuU9PWuaV1qiupDqjCTUpIiAy4DKVGOa0vDOy4ybiXy0Qq3pn5ulZ+rQ+bIlzEdiuAST2PpV/TT52nS6euxGunUhyOmOn9ap1FyJnVLSHr/X4F7U83mpzuCu0SMw3Ntzz0qsk6puBHyjA5HBqzqc1m7lbXohJyRgE9/pVaFrcqGMgViSQCvJ9vrwK5buWpzpFSw/d6pE2Tjfj0rX1Z5or68VGXyJHBIzyCRms+FD/aIH3myTuHOTWzq8UcN15s0fmYRSyq3Jwq4FdDXM0X9kyQx2EgDGME88VbaG4W3t5sMYnYqCvPTrntTGt7aRlksrjDOx5H8GB6dakdltoFhZX8zAeR1GQykY/DpS9nbczK4DCGUrhgWU7u3ert0k/wBolngJEkJ3yYOAqnA3f/W+tVYolTTiysG3suBnJXGev51fkn8i9ugC3lzIyttA6gcdun+NJL3ki1sW/Dk0YvLi5nVlCW4t0AGdxPA/E4/Wr+htb6npcumTxsRID5jKAD1GDzznj0xWNaeelr8kpjQguWXlgfp1PTH51DYPFbNfSmVhIPljweGBznkfXNOFSfNd7IJRVhtxpEelTXNs+G8l8pIVyXiboTzxg8dKhso4pDDDKykqjc46njGf1p96z3kUV15qyFBtZWfBX/61UoJomeIxttKqwxnHNZO8k2EbJ2NONcsYYgM5OAp+b0NaGmXrwzO8YJkRt2X2kNznk457e1ZaQFHSZ1YRO+AwOSTjsP64rTsoV3SzTOkez94qHgFu3vXO5uK0NEj3DwX4gbV9PaOVFR4FXpjn3wK6mvFvDupQ28Tp9pKRysJfMQNkKvBXIYDr6/4Y9S1LVIdJ0NriS5QFI8CQ8jdjjP5V6VKT5FzGEkr6EuoypbvJPKxCJHkgDPeuFvtRvZjO2nsscM88gJcYcnAwRntyPes3/hLpLqz0wXKiCGS52sWXAVc8nB69T1/KptEnttR8SCKOfz4LV2nDOgUswGFGAAMZwfwrilNuTaOiCstTpdBFxeadpn2jgRQokgYfeYg5H4AfrXF/EPDeLFUn/l3j6+hLVb1/WrvSte0hBIyeZJJIYg/GGchWI6ZxmsXxZefb/FEE6nAW0i5/vH5ufpXXBWsZPqb/AIekMGko6gZaWdRn/aWIV2vhaFLXQYoEzsid1BPU4Y1yOiOo8E3LxkEx3oyx/wB1K67w42/SHYdDPLt+m40MSMuyDJrN7Lk52KwHYZH/ANYVpaBdGfSZbiUYPmsW4/z6msSTVYIX1W9up0ggit48ySttHrnP48CvL9e+I95qukPpGkT/ANk6YltKz3UoxLcMozsH90EkKMc8+mRRa4y7rnxNt/DNpLZ6ayXWovM0hB5SA4K/Me5wQcD8fSvFry+uNRvHuLqVpZnPzM3+f0qqzEmlTO7PatkrGbY4qS3FEQX7Sm8EruGQKniUNLz0xTYEEl/GmcBnx9KBC5WO73AcA8Uk0vnXDydAzd6SZW+0lQCTntUrWkweRRGzEf3QcUaDK+7aeDV23v3tpUlBLMARtJ4xx/hUK6ddnpA34jFSf2Ve9DFj6kUm49WFmNfUZ2sktt2I17Duc5qs+S4Pc1fGk3SxENGvPfdVKVSsqg8HNEWnsDTW5Ac5xSd8VrxaR5gDGTr6CorvTRAwAYnOTzRzxvYOV7nRsJADiVgfwqvbzTtfQo8hwWJxgdgaunBz0xSIqPd2pUf3sn8DW9WyRENWGq7jZYY5G4HgYNVtNiV7lQUZ43YKpA+Ut2zU+sS+RbRup/5ajn86txGR5wzX2nh1+7/pA7dOlckouUHY06la8nJRoAV24AKjBBwOxrP89o5kCqCBjvWrd6bcNE1xHLbzW8IAcx3CMVJ4BIznk5rNbS7+VleK0lkEgBTYuSR9BRCmoxsxtSb2BpWuLgEt17etTRWkjysEbCx8sScDH1qnPb3EDxvLFNECOjqRVuSZZIi8RKGSLYE7EjAB4+h/OlKLVkhImtmLOCTzitrUL2FL6QSZ4SMbMA5+Rc/y/WsOMbSq4zgf0qPXHxqQ/hk8pCR65UUNe+W9I3LdxJb72NsGjftg4B/wq3Bq6KiSNcQK4AjeN25IxjcR2Xk1zzyjZGwbBPqam027gt5b154UkkaFRGGQMAeeehx2rSEbvUzvqb26M28KxSI6lgQUGARwMj1q7q0qTuWK+W8SMgYZy/zEcAdB7msqxd5NOtXdtzvgnAx6dqhu7jOq3SvnaJ2QheuMmsrPnL6G0XMMcMgVmCIpKgDqcgH+VVo5rZrq/REHkSZCqmSFHYH8SPxqW4uZEsbXa5CshXI74PcfgKz7GWKO5kkY4TcWYA4PX+f9azitGinuJ9uMLmGM7Y9wZl64x7nrSyRrahHUBS8aoApxnJLfj0FN1GKGfU5ru0X/AEYlinGMrzjj19al1OGRwJVcjaf3aj245q5RSViY66lmN1l0+3tzIRIhzlchgCfX61tTGJDEp2AAEArkZA6fqD+dclbSzSXsSviOADJkAzg5PbvWveTiSFCHHmBTkeZ1z39j7VyVaTukaxeho2Wsy2cckcZgRPm+Zh8zK3B49vz4/PpdY8Rxat4ThWYJIzPhpAMbOvAHUnHXpmvPY3Z1QyupbPJHYda6Kws7WW0+ztO6ybtyqDyP/wBf8q2hOUVytkSS3KmmoZ47dncK6Xkash42KzY69xnOByBuruPDD29tqU0pJ3yNtA5JPDHgfhWJ4Y0u3C3EMuopH5eN5VF3hQ4PLHtlc+v6VnahdQ6dChsb5LmSSRnacHb5fGPLGPxyfpWatJmiWhb8SrLfar9r81NglMQIb5mK/dHsPmJ/CsW71O3hvVhcmW6m4JB4TjAJ9gBwKo6hrbWUDSXW4yxOypGR1fuSfrj34rn7Jrma/truQ7zI+5myO4P/ANau2nFtozm0l5nonw61l5vAuo29xJvlku3kLN34jrv4PGWleFfC9ubl2mupVaSG0i5kkJZvyXjljx9eleHeH7+fTfBVzcW2zzPtW0FhkDIXnFJaa3b6dFdfaDJdX9zviJHzOQcAfr2qpxstCIu71Les6lf67cG41CQCFeYrZCfLTA4P+0cdz+lY3iZdthagADG7OPqK9Ek8BjS9Ak1LW5Sbo25ePT0ONr7f42/2cjIH0zXnXir5LSyUHqp49Pu/56fnUx3VynszlCODT4R19x/UU3sa0beBToc02wbxcIobvjB4/lWjdjISytmuJJcLuEabj7DIH9ajt7fzb90B2lMlee4NX9D3+be7f+fVs/TIqCwiMutSKOuScH/eFS3uNIsaJFv8RpG49citu2hAmulIwPMbr/vVkaXIIvFQduMZz+VaX21Wup2U8M5/nXLWUnN27I6adlHXuaQt4y3TrTzbpjAGRnpVIXq+tKL4bslsjNc/s5GvOi1JbRsjAfKa4K9Obx/ZiK7d71HhZhjrj3rhbk5nJ9WNdOFi1e5hXadrHVWwXyk+lVtTjG+P6N/Ko4rvESD0AqK/uS+w/X+VVGD5rilNcthskcKTKEkQrkfxD1robqWOTULfyyjKEYfJjnj2+tc/PY2xZmYMcHjY3A/Sp9OMK3CMu/ywDuz1x3rpexgtzXvLB9Wj8q1ijXYQzKXCcDr16nmuZl32l7LHHK6vGx2nIrob4Bru1GVYmVQdp3AenP0xWHfQSC5mlkidU3k7inGM8c9KEi5J825r2b3cNhM5XzYbtVEjMMk7Txz25qWa7nt4rO4BAZQoQbeABnP8qmS4ig8LRqADLjcM9+aWPTf7SFpDOZIIlTLypEzhSNxGB6HIFY8rktddS6dapTleMrMz01a5e5RIZZREZcnccd/TODSnU3t7x02xsm5sl0BAyceh9ulXrLwpfLoz6jIrK0cpcQhcsVHfrx37dqjPhuS907+1FulVfLlmMZQ9EZh1/wCA02orQv21ST527sahYyhuPmXoBxyKdrb2q3LLLbxmRo42DlyDgAcVUeS/F5Haadpdzfyi2EzLbqzsqk7ckAHjJHPuKq311cahPcm6s2sprYJHJDNnfyMdCAR0H51SXvXIvdWJpo7afZJbp5e3Of3vmAnp6CrH2AtBGyxvzJgsWChuM7Rk8tzU2l281pa+S8e1mJJIIJIxnBHYio9SikniigiLEHmMY7k4PGT3qk9yeW7LsUcsdpDI++NXO9CT823I61TmUfapp432rNKxIYYPPUfpWpc2Fxp9rFFcwyRuv3mbkOf7wOeQaqXAhknuG3ptRgVyuGZj0A9eP5Vnyv2lkD2LlwjpZ2aZ+5cnJ9Omay7eAC5mTcBuJGT0B/wreNrLdD7NAI2ZZ94LuEBHAPLYHfNRXmnzWMwjneL5ZSBEHDMoPJJxxg9uaXLox9TIw0DsrBWG1vu5IxyO9XdSkP2aSM4X7yBs9y3f2wCKv3umLbQ27rE/mTMQWxmJhkleTjsR+VUpmQuhljzG0xBb1yDx+HX8auUU2iVojDjtNQijSS3RTEFOA75GOe2aabq/R8NHBuwScKxwPwNaMV/AsKQknds2ng89SP51Ve5eK6m2AeW8WzJB6EjNW12Gpy5dyPT3u5tRiZmTyiTuAY4Ax6H8K6u3uZWuVeAbiqHll4+7x+Nc7ABaTWqSKTGpZtucb88Ad+pArfF2tsnm26tCCQDFsDBTz0ZjzkAdv5c4VKTmyuZyWp32l+HP7R8GWOrbXS+bYrbSp8xTP905HB569elcQ8kkvil4EtIIljui3lxgAISx+XAGMjA5OegptprlwNOjgaa4C5ACwu+AQ244APpznsazdEEw1aCOW+2NcTAjJBYnJyRnqTz19al00rj966dzW8W2gl8PRSNGuJpJZxJnmRjtyx/GuNslKXFiMkKGxjPHQ102pgLZ30CSu5RUcB2y20xIenpwa5lLm2jmtPMuIkZWyQzgY+U9fzropK0UZ1Hdmv4VsYL7wfdG9mMFhb3HnXUq9QgC8L/tMeAPU+1dV8LPCtjdajd+OtVt47LSbZ2ksoZGJUFerknqEA692+lcbd6jaL4COl6WgaCGRJLqUyrvlmYfeKjOFH3V57HvWRq/jjXtX09NNlvPJ02NFjSyt18uJVGMDA5PTuTzVshHa6r41vPFetX+oW/7q2jPlWqMcBI8Hk+7Z5+uK5bxYJX07SJ5Y0j8233IqLjC5wPqTjOfeqOiRLJY3BKAkAkEgHt71reOzGkekwxtny7KIHgAg7FP49axt75r9g4sd61kmhXwoyqp81boM5z94bTis3yv9H80tgMxUAe1WpZLRNPuLeF2Yna6kj25q2ZotW39q6LaS39zol6lpdQBEnkjZIyHwVYMVwcjketJpbO/iIEAkvIc8di1dBrc+lL4fvZ45wLq60fTbdXj1GGVZmRLffGYVG+MjyySxPVMfxYrmtLneLxFbuFG55tpDdsnBoklZgt0LI/l67Iwz1P8qnhWXBfb8pYnkgVQ1GWSDU5mjYq2cZFTWp1e5tDNC7NECQTkUrK12U73sX1didowSOeopWmES5JGfYg1ni21QncC2T3DUfYtWbjkj/eFK0O4veLbXowQpYVjTgtKMdSa0Rot81ksz6hapcvbm6SzZmEzRAFt33do+UFgCwJHIHIzkF2aJXJ+bnmrUUtiW7l5JCBipJT5qD5wMexrK8x/7xpwlfH3j+dMDr0lilsVd0Qs3OR1/Dio9KaCTUIhGoVSCDk57+9RaReW5ezt2J3b1XGPert1FFHrd0IY1CgMQp4H6dqb2EtGbWl3No14BcW8RbcyKkgb5XB7FSOR61DqM2myW8dzFoWnxKzN5n3udrEHBLcHjPep/DNrFPbT3FzGssikNGHz1JwTmuj8zTpNMkTTtEt2eGVo/wDWuUPG5j6/h609VEL3epwl9A9uGWSF40aMtCrLwFYjoe4+lNkSYaGsatcIv2oEeXubjy16e3JrR12FxEGl06S1ZBtjKsTEAeuB2PFXNMvbKKxg+03UfmKnAZwCnt7VNNXE9DptIuo1gVJcMCgU5x1x3z0rktMu103Vrq3ngWa1traQeU3zDcznHAzng1at9VsbW6dY7kSfaZshU+bB2gckHgfLS6trNs8SWqW8LmdsSHODgZO7PqD/ADrKcU5NM1i2lcwrQ2st1rNrebQJ9GSNIpL2O2LsLqF9okkBUEBScYPCmuetLO7F7fWlhGPK3LuUXEcwAGWH7xPlPTqMV3Gn/Da48RX8Mt4J47cQjcySKG9RwQfXvit3SfhXFpEEom1ZY3mYAqAJCAM4P8OOvTmtLO2iFpfVmb4d8JkwQXmt3/kqSQkcT5ZsHjc3QE9vatPTPDUaapeXixJHBG4EEYbd5eck5/DGOT1rUi8Iw2cwY3ri3jfK4KsJGIx8ylcfSrN5cPZaZ5RlBYuQCqkccdQc4/lV00+bVBJq2jJLa8MlwYAFlgbMex8FW/Oue8YeGI7W1F/aDftbbJGFBIB7/pimWWoxLf2unTRktPJgkjIA7Z9c/wBK9Bh8tFeRZlYuMMoAKgD8qU0nK41ojxu6kI0+ZyPNwq4GMZ5FJNex3Yga1hkggSBFkV3LYl53BckkL0P511et+GxFOZrdle2kGGQEDbz29sVy0ktnLauLZSm0j72Oa52t0X0LGo69I6KlxHKDGQwkbkEAcdAP61i3OoJJYh1kkcQyliA424IB49Dxz+FX9Qkkn0mMQh2KuBlRnnHGPwrJSzjb980E4AYHyiCB6Zxt5x6VstbNmb00JtE1W1iiaG+s5NjqGjb7wJxz9M5rQht7W982VVAQuSgJIOOwrj7C1la7kW3QyYyEJXBP4V1EX9oWip5MDHI+ZWBAoaQtWiCSW3sL9VmkjmYR78YLBeeuD34/lS3TGSzjnILISVDFeCeD19s1l6nFe/bDOLbZ5kex9oJyM+/NdFd28reE7QC2kWdJi5KtwVPUY9+PyoUbO409NTM0KS7uLy9Wzfy/JlWVyCeVwUJ+gBzXRxX1vcrY2Wn+VHczToI2ODJ5pbOSTz97NZ3gyOY6hqkU8LtG2wMSfunkgH14JqjDaMniuYIrqIZ8rjnZ3z/n1pp2uu4N3SIvEep3EevX7MBEEdo8qP8AWKMKFz9AM1l2X2RPD2qareabb31xFeWdvH9oeVQqPHOW4jdeT5Sdc10nim0ikUSuitJIitI/fdnBJ/SsqCy8RwQXbaTa2smnSrDNIJ4reUExoQGCygkEbn6etCjbQTlcZe2MGmwa3Bah1gdbKdEc5aMSRGTYT3K79ufauY2szhVBZiQAB1Jrdtxe3Gh6vqF6zyPczxkyswJdhuLZ/wC+hWXYzJb6pbTSO0caSKXZVBIXvgH2psSOtXT5LKyigdvMZImGEJwOpP5dc1k6/fNqYsH2jf5IQgdyuFH6AVo/v7mVzsdQN7CMcBExx9BisyMxWuq6U08bywxzKXReC+GBIGayjHW7NZS0sj0SD4daNaaGbK8mkm1F8s9zHwITgfKoJ5A7k9fauI13RBpNi9sxR2TC+aq43A969Iivvt0TXahlEx+UN1Ga4bX9Rt71brzInKW7ANhgN53ED6CtK/LGKa7l4ajKrPkXZ79LK7fySOQ03TIby/jt3d1Vu4Iz/KrUK48URLnpeAZ/4HVq1MEMsGp28bIqyFHiLZ5xxg49PWqtluufEcci4H7/AM059Ac1kpOV2OtRdGSi3e9mmtmntvZ/eivqyFtUlUdSf6V0/hu2U+Hpc8/vm/kK5rUCX1aUr/nit/QtSFnpkltJECWcsH38dB2qasXKnZGcGlPU2LawRsFgcZNWk01e/tVW31y1jUGRW4/u4P8AUVyWua1PqN2zB2SFTiNAcYH+Nc8aE5PXQ1lUikNvNS0bUIIru6jvDqEdilp5CoohZkjEUcm/duGFVSV28leuDWOq5gjA75/nWxpeoWaWk9ld2Nq/mRsIpjCu9Hxxzjpnv2qnexeVOkaqBhV4XpnFdybvY5raGe6lTg0J3qybeSQ4Cbj9alTT3U7mXt0yDTETrc+Rd2p8vDwsDz0ODmtq2u/O1NriRAxYFmXkA5PtzVS61K0mR2S0dZMfKTtIB/KoNJleS4kLtn5f60PQSPQNAkj1G5kgaNosRokSwD5RgnggnmuputH03TtM/s/z/s3O4ETjzVbPUnnn615bbaa+ra7plgjhPOlwxZtoCjk5P0BruPFnieTR/Jt2iil+baTCcKiZxnp+VZzm9Ei0luUPE+2HQI7VLqOfyymXUYLgcAnBxms9vDukXuh2127XL3xh4GB5YPOAeASPxJo8QSSvYfNwpYVkajJPJpFvBGzIBGXDbsZ284ppuyFZFKDwvfR7szxqG9CSRVl9Kh08C6urlsqCuRgZJFdOZy6IryMwUYALE4+lVby2t763MM6F0znGccitWhG7pviS6+xTLDfxQmyRYhbOgxMNuQS27duxjoMZAqxdanJfASNPGYz8yqZlQgHsRzzXH2tm8MAjWXIChQcDIA6Cp5GmhQMZBjIB4rlpuafvf1/kepjauHqpKirO76JWXRO3xPzf/AXRPqUiKixSxEhshDKAi+/vUMviK2azdruWGMwSFGAccHA5Hr1rELTIhkH7wgZCBep7Cua123eO3thJt3nc7cfxHGa6ITdzzWlY3odfsP8AhIbbUDI4toz1K8557V2L+Job2zleyfeEwXJTbwfTNedWekS6xZ2tkjOscSs5ZhwGOCQPzFdZo2iR6dprxNK2SAXJOFOP6Csqku25ovM34NQSaBLee3WVZ8745OQRj0rjIIY4NSuoFDJBGzL58nIyDwP1xXRRXVtYhpmDlIzj5VJ56dMdK5KxtnfXDq17CGj3l1jZd27IOD7EcGnGN1qLntsdTYWTLb/62RUZ942qAPqMg1d8lDgcsfU96ZBqH2lcrA4/3uKn8zCklTVpWViG7s5Hwjb2r30rPGGkZCynHQ725/IYrtEsY2P3f0rnvDmnfYL5iV4+zqmRz824lq6+HoODmtCSGLS4S2TFn6Yq+bNPLVPsp2Z65FSxcHvxVnIKj9aAOYgs4rfVtQkSEBZyhz3JVcVmW9k0Gr3s7xArP0Pp8xP8iPyrqZo0RiQO9VXVSfu1IzjdXh+0LfxlCMIPLBHUgg8fkKS2lWK2hhUEAIqbscE4rpLq1jmRlZSMjGaxzZ3BiW2eGNVGN0qt94D0HrWVWc0/d/r/ACPRwNDD1Iv2ztquqVl1av8AE/Jf8FU9Wtv7U037IrxwEkZZlwvH0Fcdd+ENVFxL9ltTNbqcLIsikMPzr0WSHcMAVHCtzaSb4GZD7Vs9TzDn7WZJWch85tBuxng7F4P61zt7Gy31ptHIJYDHpz/SvRtPFhcTXI1S0DvIM7iuCCXc5z+I/SuQ8a2CWV9A+nLM0QDHcRuxnHt9alLQrZnX2d5Yx2MKi9t9gQHd5y8fKPevMLy8a31e9eGSKTMzKCMOrpnpnuDxWT5bMrS7TtBxnHGana0lijEjDCkCqm1NWaHTqTpyUoOzReW6kvGcMiKsSEokagBeRmq1q5j1ONlYjD8kHqM1Y0lQ1xOp7wsP5VQ+7cjH96oUUlZDqVZ1Zuc3dlsKs2qkEkA+lWoFl+dVnkQKxGM+9ZbSvHc71JBHenx3s6s4yDk56Umn0FdGvJDdNEyi4cgjGCeKrWNg63r+YiyMI2MSMMqz44B9utQrqc33SUA9SKt283ngO0i9cFRUSjJxaN8PVjTqxqNXs9v6/ryI7k3MmlSz6khWZZFELmMKx65U8dMc/Ws6SQsiSA5ZeK09TPnqoYlm9Sc1mSQyW5XzFIRvunHDU6UOVGmOxCr1E1d2Vrt3b1bu/vt6JE9lLcPl1ZR25UGkOq3IYg+Wf+ACkt7sWoZNmQeQc1WYhn4HU1fXU476G/LbRjgbRUOnR+TeTqTgbQR+dbU0Y3dBVcKFn4AHy/1otoSRyXlraTxy3E0sbBTs2R7snjPcYqOfVxqFpfMZZHUIqjKD7oOeueMsR+VLfaYdRMZDEBM9Pem2/h5owymRyjYyueDRy31HciGrvqMzqVZYwuRk1ADdSaiAVZoVwB9OM1qy6atnbF1XvjNb2laFJc2UM+1VV1B3GqUQuRRXAkH3SKdcMfszkP5fH3j2reh0OKNfmcsfZTiqmo+Hri8gaJr1Y4m/hSD+pNU7iMy3lWZXIBCqxAolYsSq52jHUdad/Z0mmRbGnEoJ4ITGP1qJ5No5fH1FYS0Zoh67VUKowB0FYPiS4EUlmQoYoxcq3RhkcH8q1fNBOQ4P51zfiFy93F6eX/U04vUT2O38P3/9pT3d+keyKR9kScfKBySfckn9K0pnd9ihAGEcmRngEtx+lc94Dk36TOhI+SYjH1ANbt3JIglKcEYUMB1Jx/n8aylrMv7KLlvGNjDOSTyTUv2dOpUVX04GKEiVwZCc49queYpPXNdEdjNgFwMKKRoyRjmnB19acDnpTELbW+0mtKFCOapx+mf1q5Gegz096Yi4gIUYxU7lhgAdOKgjb5h/jUrOepxQBmXMhaQ7vl9s1UaVOm79Ku3MW5i+AR9MVnlEJPWkUNeRM5JJ/CoHeM9j+IqZkxxu/SoXiY9CKAIWdB0J/Ko/NUcc09kYfwk/hULKRxjn3poQ7z4x1zVLV9QitdJupmTIEZAB7k8D9TUx/OsnX7SW90ea3ix5hwQD3wc4piOYlsFTwTbSocvNKNy47kkD+QrW1yzhi0OYGHY8aqF7YOQKh1HNv4e0+3jjYmGWItkdCOTn8a6l7u3uYmimSKSNuCGGciiwHnmgQma+lAHSIk/mKJdKO+SYsSwYsFA967OLRrOK4MtosceRj5eDTpNHjcEhDv8AVSP5UuUDzloGaUk4A96VbNyxYOvNde/h67U8E+2VNVZNDuhyUU/gf6ikM55bGUjhlJpy2VwrArtyPetdtMnQ8wj8CKrzwS24LtG6qOpwaALFjZtcWoadRgSNuI9AM1Bd68LmP7LLZwfYxwihfnQeoPrXYS6f/ZfhmFXX5miZXPozr1PtnArzeQYat5rkSSJTvqSXdqYJjGuXXG5CB1BqDy3jYMY249QRXQWpE0FhNj54z5ZPqOa6QxoUBBU/UMP/AGauaclF2NFG5nyVVf8A1/8AwH+tWZDVVzibJ/u/1qnsQjc0Gwa9Ep3BVUjk10UWj26DL/OR2PSsrwo6/Zrg7l++MZ+ldB9oDc5XjqKuOwnuYHilWawitre3eTL7iUThcD/69aHh6f8A4ktvFLE8Uka7CrDrjvU9yFlHOMegNPgwiAZG2jqBbMqAZJwB61SmvrYAjfmrLcrjA+tV5I0AzgA/TrQBz+v3iGx/dZZw6tgDkj2rmft0uBvglHHcV2F3FGTkKM/Ss2S0VjyoP4VnKN2UnY59b4biNjj8KzdYlWaSFlzkKQcjFdd9ij6bF+pFcrrxQagI41+RFAyPWkopMbbZf8IaodOW4RhJtdlPyJursG1L7XYKkSkSEDLyLtxwOgPfNcV4TAaW5iIB4DA59/8A69ddHAOO1Zyp80rlxnZWHW8Lxj5mJPc7quozYqKKIfWraIvTHNapWIbHIxqdGpiIDUqqM1RJZhOKuwn61ST2q3GQqjNMC7DliKmBwarxHOccU8Me/FICG6Usx2nv6ms2UbH5FacuG3KQOlZVwqhjsZyfQrSGNaTAHpUZk9CT+NMJbJ4/SmF+aAFLgnvTWKkcikPWmtjvQAxhGe1QOinjkVIajJpiKssOO+c1Fs29Fq24bPSoSADTAEbHHP4VYVz6fpVX6D8KXJHPIpiL6yADkCpVkXHT8jWakrA1MJeeP1p3AvbIn+8gP4Vz3iLT5bu5hjt/JjjiUStvbaHOeB+n61sCYDgkiuTvNR+0alO6EkYGCfb0qZOy0Kgk3qbGran9ssoTJuQsg3Ir8A45HpXndyAsrAdAeK23MsxZw+EVRxjA44P8qwJn3Ox469qudTnSBxsdl4X+y7VF1AsqBMhTxg+o967xNO0x12tb+WPYk/1rzrQZlj8t3YYGBtI4YHqK9DSYNGrIcgjisZRUmO7RwbWEeT+8lH/Aqb/Z1uxG7zXx6t/gKsq92zYMSfU9KtxrgDdtJ9hVaMjYn0yzSFcxhlA7A4raRehDH3FZ1r168VoptHHUnpzTSBsUqcZHepojtHt6VGAQ3fHbFPVxGMYPPtVCJjkDP8P16VXnL7MKw57kZqTvz936VHISCApODQBlvbTnJM569hUaQMCdzlh9OK0mjBPPPtTG5+7UlGfLCjIyHnIwRjtWE3h23D7jvPOcFuPyrqGj/P0qvIpzwMGiwGbY6cluSY0VSeCVGK00jYY7iiJSp9PfPWrK4+lKwAi1Og9fxpqjnpiph8vtQA9R0zUqY78YqFeDz+dTqBj37kUwJ0PIq2mfpVSJu+Me4qwjZ57+o5oAtoMJn86UZGPQdjxUYZQuM8/TNKGII/n0pAVbuKZyAJcD0PH8qolXVSCh+uc1qu2Dn29QKr5Vs7efpxSGZbOVPYenGaTdlsn+VXXjQnkDOfTFQyRqQQDj2Xii4FY855x60zcOhNS+Sin7xA9M0ySMAcEgGgCJiKhZsDnrUpjA7kfjUT+1ADM5Xt9KgYkHH9KkMgXoD+VRs2Tkg/jTEMznvn2ppJxz/OnYH/16aBjrTEGccg498UnmED+tLgHgLxUbHnpxQAy/u/s9jI27DMNoOO5rkJ2Nv5ZDjdICwZW7Zx/Q1reKZmjsIVB4MnP5GuVaUvtyfujApNjSOhe80keEWjEco1r7VnzN7bfJI6Y6Hn6HnvXMffcDtUsjHYqnrVdzg0gOh8Oq91qTwiV0gEe5gAD34613tvdiCNYxnaoAGTmuE8HkC4uSSMsoA/Cuu/EVcUS2QcdalQcimBBjkfnU0KrRYC3EvAOKvqMqCM8elVIsYxn9atRkgYHT8KYiUAuvU/jT14GCOajGc/X0Oak2bjyoFMYYY8hQR69qa/y9VwPWpSWzjJPtUbFud2cevQUgIiNw6fhmk2gjK9fWnDCtwBj2p5UA7hjPvzQMgZC3sf5VXlXGQRx/OrzBXXrVdlBbBADY7UgIEXHb8cVKvT1FNK7Rz931NKOOQCT6UhkyjtkH1zT1J6g/hUY64Bxg08HPUY7ZNAEqYzgcetPU4PoTUfYAjdT1yOc5HoKYFhTtGSPxNTpuxyAfccVXQjgKQD15qWPHmc4B/SgC0ScdSR7cUu47hkj6HrUZwMAvj1C9qcp5HQjsRjmkAkhLEcAf73WoycZwD9T0pXGcYBP1qLGGxnn0qRjHbk9T/KoyT3z9FqSXeME/L9BURDA9OPWkBGxHQ8fQ1DIW2/IAue7VIxBGcE+54qNuOpPPbFAFF5pkO3arMe4BqJncD5zuc9gDir0gJ5IwKrtgjhcD1NAFTe4b5iuT0GD/ADphkfuox9c1YdRn1/CoGVV6Ac+gpiGGQhs/KV+lIZwecUjKSM44prKo6/lRcBTNnGRx9aa0iscdKQkMTz+lN4+v0p3AZPBFcx+XKgdPR1yKoNpNrbozxQQMACSJV3YGOx/xrSzxwPyrP1aYxaZcHkErtHHrxSeoLRnGTRskxB5GeDVd/vfrVhpS0WG7cA1VJOeaQy/o07watbMhxlwp+h4NegbgSTjNebWuftUO3rvXH5135mAX0Jq4shmmE+lSxo2f/r1zwuJVPEjD6E1Kt7cf89DxT5g5Tp4VCnHOfarKpubv+lcut7cMMGVsdxnGamW7mX5kmbHpuNFx8p1CoBzwPejhm4Yge5xmucj1C735Ehf/AGSM1cXVblcFoVOO5B/xp3QWNkhV5B+oHc018NggjPbmsoazMxAMKkk4AUmtGBn2AyIqsRk5bNMQ9c47nHelwU5IG3680jnIBMg47YpyHKgnbSARlHJAye2aryAHIB+uBU77c4HP48CoZEw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"path": "images/5pts_ADE_train_00018297.jpg"
} |
depth_point_174 | images/3pts_ADE_train_00014692.jpg | ADE_train_00014692.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 254 y = 205),Point B is located at (x = 55 y = 206),Point C is located at (x = 103 y = 98).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_2><DEPTH_2><DEPTH_81><DEPTH_62><DEPTH_4><DEPTH_31><DEPTH_70><DEPTH_17><DEPTH_5><DEPTH_17><DEPTH_2><DEPTH_58><DEPTH_15><DEPTH_33><DEPTH_119><DEPTH_56><DEPTH_62><DEPTH_67><DEPTH_5><DEPTH_67><DEPTH_25><DEPTH_63><DEPTH_1><DEPTH_23><DEPTH_41><DEPTH_121><DEPTH_63><DEPTH_40><DEPTH_70><DEPTH_17><DEPTH_25><DEPTH_25><DEPTH_57><DEPTH_25><DEPTH_12><DEPTH_41><DEPTH_121><DEPTH_81><DEPTH_82><DEPTH_11><DEPTH_64><DEPTH_36><DEPTH_1><DEPTH_0><DEPTH_23><DEPTH_41><DEPTH_27><DEPTH_77><DEPTH_40><DEPTH_69><DEPTH_45><DEPTH_36><DEPTH_1><DEPTH_41><DEPTH_32><DEPTH_1><DEPTH_39><DEPTH_73><DEPTH_60><DEPTH_59><DEPTH_0><DEPTH_58><DEPTH_41><DEPTH_0><DEPTH_32><DEPTH_57><DEPTH_9><DEPTH_50><DEPTH_11><DEPTH_72><DEPTH_57><DEPTH_39><DEPTH_41><DEPTH_41><DEPTH_32><DEPTH_1><DEPTH_44><DEPTH_58><DEPTH_63><DEPTH_25><DEPTH_41><DEPTH_2><DEPTH_19><DEPTH_19><DEPTH_66><DEPTH_19><DEPTH_44><DEPTH_19><DEPTH_2><DEPTH_41><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_16><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"A",
"B",
"C"
] | <DEPTH_START><DEPTH_2><DEPTH_2><DEPTH_81><DEPTH_62><DEPTH_4><DEPTH_31><DEPTH_70><DEPTH_17><DEPTH_5><DEPTH_17><DEPTH_2><DEPTH_58><DEPTH_15><DEPTH_33><DEPTH_119><DEPTH_56><DEPTH_62><DEPTH_67><DEPTH_5><DEPTH_67><DEPTH_25><DEPTH_63><DEPTH_1><DEPTH_23><DEPTH_41><DEPTH_121><DEPTH_63><DEPTH_40><DEPTH_70><DEPTH_17><DEPTH_25><DEPTH_25><DEPTH_57><DEPTH_25><DEPTH_12><DEPTH_41><DEPTH_121><DEPTH_81><DEPTH_82><DEPTH_11><DEPTH_64><DEPTH_36><DEPTH_1><DEPTH_0><DEPTH_23><DEPTH_41><DEPTH_27><DEPTH_77><DEPTH_40><DEPTH_69><DEPTH_45><DEPTH_36><DEPTH_1><DEPTH_41><DEPTH_32><DEPTH_1><DEPTH_39><DEPTH_73><DEPTH_60><DEPTH_59><DEPTH_0><DEPTH_58><DEPTH_41><DEPTH_0><DEPTH_32><DEPTH_57><DEPTH_9><DEPTH_50><DEPTH_11><DEPTH_72><DEPTH_57><DEPTH_39><DEPTH_41><DEPTH_41><DEPTH_32><DEPTH_1><DEPTH_44><DEPTH_58><DEPTH_63><DEPTH_25><DEPTH_41><DEPTH_2><DEPTH_19><DEPTH_19><DEPTH_66><DEPTH_19><DEPTH_44><DEPTH_19><DEPTH_2><DEPTH_41><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_16><DEPTH_END> | 254 | 205 | 55 | 206 | 103 | 98 | null | null | null | null | 59 | 130 | 157 | null | null | {
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"path": "images/3pts_ADE_train_00014692.jpg"
} |
depth_point_175 | images/4pts_ADE_train_00018679.jpg | ADE_train_00018679.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 302 y = 172),Point B is located at (x = 167 y = 207),Point C is located at (x = 248 y = 189),Point D is located at (x = 27 y = 201).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_9><DEPTH_20><DEPTH_22><DEPTH_70><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_6><DEPTH_22><DEPTH_30><DEPTH_64><DEPTH_32><DEPTH_32><DEPTH_33><DEPTH_22><DEPTH_5><DEPTH_59><DEPTH_64><DEPTH_11><DEPTH_46><DEPTH_32><DEPTH_85><DEPTH_72><DEPTH_64><DEPTH_77><DEPTH_17><DEPTH_85><DEPTH_33><DEPTH_66><DEPTH_15><DEPTH_0><DEPTH_19><DEPTH_64><DEPTH_64><DEPTH_60><DEPTH_22><DEPTH_74><DEPTH_72><DEPTH_64><DEPTH_44><DEPTH_19><DEPTH_25><DEPTH_64><DEPTH_64><DEPTH_75><DEPTH_43><DEPTH_81><DEPTH_15><DEPTH_44><DEPTH_44><DEPTH_2><DEPTH_25><DEPTH_64><DEPTH_36><DEPTH_60><DEPTH_30><DEPTH_49><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_2><DEPTH_64><DEPTH_69><DEPTH_11><DEPTH_11><DEPTH_31><DEPTH_45><DEPTH_78><DEPTH_15><DEPTH_8><DEPTH_36><DEPTH_36><DEPTH_76><DEPTH_36><DEPTH_64><DEPTH_64><DEPTH_15><DEPTH_40><DEPTH_94><DEPTH_94><DEPTH_0><DEPTH_41><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_58><DEPTH_81><DEPTH_14><DEPTH_16><DEPTH_57><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_57><DEPTH_94><DEPTH_END><DEPTH_END>. Since point D has a higher pixel value on the depth map, the answer is that point D is closer to the camera. | D | long | 4 | [
"B",
"C",
"A",
"D"
] | <DEPTH_START><DEPTH_9><DEPTH_20><DEPTH_22><DEPTH_70><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_6><DEPTH_22><DEPTH_30><DEPTH_64><DEPTH_32><DEPTH_32><DEPTH_33><DEPTH_22><DEPTH_5><DEPTH_59><DEPTH_64><DEPTH_11><DEPTH_46><DEPTH_32><DEPTH_85><DEPTH_72><DEPTH_64><DEPTH_77><DEPTH_17><DEPTH_85><DEPTH_33><DEPTH_66><DEPTH_15><DEPTH_0><DEPTH_19><DEPTH_64><DEPTH_64><DEPTH_60><DEPTH_22><DEPTH_74><DEPTH_72><DEPTH_64><DEPTH_44><DEPTH_19><DEPTH_25><DEPTH_64><DEPTH_64><DEPTH_75><DEPTH_43><DEPTH_81><DEPTH_15><DEPTH_44><DEPTH_44><DEPTH_2><DEPTH_25><DEPTH_64><DEPTH_36><DEPTH_60><DEPTH_30><DEPTH_49><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_2><DEPTH_64><DEPTH_69><DEPTH_11><DEPTH_11><DEPTH_31><DEPTH_45><DEPTH_78><DEPTH_15><DEPTH_8><DEPTH_36><DEPTH_36><DEPTH_76><DEPTH_36><DEPTH_64><DEPTH_64><DEPTH_15><DEPTH_40><DEPTH_94><DEPTH_94><DEPTH_0><DEPTH_41><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_58><DEPTH_81><DEPTH_14><DEPTH_16><DEPTH_57><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_57><DEPTH_94><DEPTH_END> | 302 | 172 | 167 | 207 | 248 | 189 | 27 | 201 | null | null | 88 | 29 | 65 | 113 | null | {
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",
"path": "images/4pts_ADE_train_00018679.jpg"
} |
depth_point_176 | images/4pts_ADE_train_00010095.jpg | ADE_train_00010095.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 154 y = 167),Point B is located at (x = 21 y = 216),Point C is located at (x = 252 y = 222),Point D is located at (x = 106 y = 142).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_6><DEPTH_83><DEPTH_47><DEPTH_121><DEPTH_3><DEPTH_59><DEPTH_67><DEPTH_67><DEPTH_17><DEPTH_70><DEPTH_39><DEPTH_119><DEPTH_1><DEPTH_78><DEPTH_3><DEPTH_60><DEPTH_5><DEPTH_5><DEPTH_15><DEPTH_42><DEPTH_0><DEPTH_76><DEPTH_72><DEPTH_19><DEPTH_3><DEPTH_67><DEPTH_3><DEPTH_41><DEPTH_0><DEPTH_74><DEPTH_36><DEPTH_82><DEPTH_19><DEPTH_121><DEPTH_70><DEPTH_31><DEPTH_58><DEPTH_29><DEPTH_49><DEPTH_44><DEPTH_64><DEPTH_66><DEPTH_14><DEPTH_121><DEPTH_5><DEPTH_70><DEPTH_31><DEPTH_29><DEPTH_64><DEPTH_44><DEPTH_77><DEPTH_42><DEPTH_121><DEPTH_98><DEPTH_67><DEPTH_70><DEPTH_3><DEPTH_49><DEPTH_64><DEPTH_74><DEPTH_41><DEPTH_94><DEPTH_16><DEPTH_119><DEPTH_29><DEPTH_74><DEPTH_49><DEPTH_31><DEPTH_49><DEPTH_36><DEPTH_68><DEPTH_55><DEPTH_94><DEPTH_121><DEPTH_36><DEPTH_64><DEPTH_64><DEPTH_44><DEPTH_36><DEPTH_38><DEPTH_77><DEPTH_16><DEPTH_2><DEPTH_0><DEPTH_19><DEPTH_19><DEPTH_2><DEPTH_19><DEPTH_2><DEPTH_41><DEPTH_63><DEPTH_15><DEPTH_63><DEPTH_41><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 4 | [
"B",
"D",
"A",
"C"
] | <DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_6><DEPTH_83><DEPTH_47><DEPTH_121><DEPTH_3><DEPTH_59><DEPTH_67><DEPTH_67><DEPTH_17><DEPTH_70><DEPTH_39><DEPTH_119><DEPTH_1><DEPTH_78><DEPTH_3><DEPTH_60><DEPTH_5><DEPTH_5><DEPTH_15><DEPTH_42><DEPTH_0><DEPTH_76><DEPTH_72><DEPTH_19><DEPTH_3><DEPTH_67><DEPTH_3><DEPTH_41><DEPTH_0><DEPTH_74><DEPTH_36><DEPTH_82><DEPTH_19><DEPTH_121><DEPTH_70><DEPTH_31><DEPTH_58><DEPTH_29><DEPTH_49><DEPTH_44><DEPTH_64><DEPTH_66><DEPTH_14><DEPTH_121><DEPTH_5><DEPTH_70><DEPTH_31><DEPTH_29><DEPTH_64><DEPTH_44><DEPTH_77><DEPTH_42><DEPTH_121><DEPTH_98><DEPTH_67><DEPTH_70><DEPTH_3><DEPTH_49><DEPTH_64><DEPTH_74><DEPTH_41><DEPTH_94><DEPTH_16><DEPTH_119><DEPTH_29><DEPTH_74><DEPTH_49><DEPTH_31><DEPTH_49><DEPTH_36><DEPTH_68><DEPTH_55><DEPTH_94><DEPTH_121><DEPTH_36><DEPTH_64><DEPTH_64><DEPTH_44><DEPTH_36><DEPTH_38><DEPTH_77><DEPTH_16><DEPTH_2><DEPTH_0><DEPTH_19><DEPTH_19><DEPTH_2><DEPTH_19><DEPTH_2><DEPTH_41><DEPTH_63><DEPTH_15><DEPTH_63><DEPTH_41><DEPTH_END> | 154 | 167 | 21 | 216 | 252 | 222 | 106 | 142 | null | null | 67 | 5 | 185 | 44 | null | {
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",
"path": "images/4pts_ADE_train_00010095.jpg"
} |
depth_point_177 | images/5pts_ADE_train_00004551.jpg | ADE_train_00004551.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 246 y = 188),Point B is located at (x = 13 y = 139),Point C is located at (x = 64 y = 155),Point D is located at (x = 35 y = 184),Point E is located at (x = 130 y = 193).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_17><DEPTH_43><DEPTH_34><DEPTH_13><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_6><DEPTH_50><DEPTH_61><DEPTH_17><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_78><DEPTH_68><DEPTH_13><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_35><DEPTH_6><DEPTH_82><DEPTH_68><DEPTH_6><DEPTH_70><DEPTH_59><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_12><DEPTH_39><DEPTH_4><DEPTH_41><DEPTH_26><DEPTH_67><DEPTH_6><DEPTH_83><DEPTH_35><DEPTH_17><DEPTH_26><DEPTH_26><DEPTH_63><DEPTH_66><DEPTH_71><DEPTH_57><DEPTH_76><DEPTH_68><DEPTH_3><DEPTH_17><DEPTH_81><DEPTH_71><DEPTH_82><DEPTH_74><DEPTH_11><DEPTH_31><DEPTH_58><DEPTH_69><DEPTH_78><DEPTH_81><DEPTH_72><DEPTH_44><DEPTH_25><DEPTH_44><DEPTH_2><DEPTH_2><DEPTH_25><DEPTH_19><DEPTH_44><DEPTH_45><DEPTH_55><DEPTH_9><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_41><DEPTH_41><DEPTH_2><DEPTH_0><DEPTH_0><DEPTH_98><DEPTH_121><DEPTH_57><DEPTH_57><DEPTH_57><DEPTH_57><DEPTH_1><DEPTH_57><DEPTH_57><DEPTH_1><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 5 | [
"D",
"A",
"E",
"C",
"B"
] | <DEPTH_START><DEPTH_17><DEPTH_17><DEPTH_43><DEPTH_34><DEPTH_13><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_6><DEPTH_50><DEPTH_61><DEPTH_17><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_78><DEPTH_68><DEPTH_13><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_35><DEPTH_6><DEPTH_82><DEPTH_68><DEPTH_6><DEPTH_70><DEPTH_59><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_12><DEPTH_39><DEPTH_4><DEPTH_41><DEPTH_26><DEPTH_67><DEPTH_6><DEPTH_83><DEPTH_35><DEPTH_17><DEPTH_26><DEPTH_26><DEPTH_63><DEPTH_66><DEPTH_71><DEPTH_57><DEPTH_76><DEPTH_68><DEPTH_3><DEPTH_17><DEPTH_81><DEPTH_71><DEPTH_82><DEPTH_74><DEPTH_11><DEPTH_31><DEPTH_58><DEPTH_69><DEPTH_78><DEPTH_81><DEPTH_72><DEPTH_44><DEPTH_25><DEPTH_44><DEPTH_2><DEPTH_2><DEPTH_25><DEPTH_19><DEPTH_44><DEPTH_45><DEPTH_55><DEPTH_9><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_41><DEPTH_41><DEPTH_2><DEPTH_0><DEPTH_0><DEPTH_98><DEPTH_121><DEPTH_57><DEPTH_57><DEPTH_57><DEPTH_57><DEPTH_1><DEPTH_57><DEPTH_57><DEPTH_1><DEPTH_END> | 246 | 188 | 13 | 139 | 64 | 155 | 35 | 184 | 130 | 193 | 47 | 130 | 109 | 20 | 75 | {
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"path": "images/5pts_ADE_train_00004551.jpg"
} |
depth_point_178 | images/3pts_ADE_train_00014068.jpg | ADE_train_00014068.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 304 y = 120),Point B is located at (x = 205 y = 196),Point C is located at (x = 298 y = 173).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_64><DEPTH_63><DEPTH_5><DEPTH_70><DEPTH_3><DEPTH_60><DEPTH_78><DEPTH_44><DEPTH_78><DEPTH_41><DEPTH_36><DEPTH_76><DEPTH_67><DEPTH_70><DEPTH_3><DEPTH_60><DEPTH_78><DEPTH_58><DEPTH_78><DEPTH_19><DEPTH_36><DEPTH_49><DEPTH_6><DEPTH_67><DEPTH_3><DEPTH_29><DEPTH_75><DEPTH_74><DEPTH_45><DEPTH_63><DEPTH_74><DEPTH_80><DEPTH_27><DEPTH_20><DEPTH_67><DEPTH_7><DEPTH_94><DEPTH_78><DEPTH_31><DEPTH_72><DEPTH_5><DEPTH_35><DEPTH_82><DEPTH_60><DEPTH_43><DEPTH_80><DEPTH_18><DEPTH_41><DEPTH_85><DEPTH_80><DEPTH_61><DEPTH_119><DEPTH_55><DEPTH_42><DEPTH_98><DEPTH_21><DEPTH_62><DEPTH_27><DEPTH_65><DEPTH_23><DEPTH_16><DEPTH_42><DEPTH_121><DEPTH_57><DEPTH_14><DEPTH_60><DEPTH_76><DEPTH_4><DEPTH_65><DEPTH_76><DEPTH_61><DEPTH_42><DEPTH_57><DEPTH_1><DEPTH_39><DEPTH_62><DEPTH_48><DEPTH_65><DEPTH_12><DEPTH_11><DEPTH_66><DEPTH_94><DEPTH_0><DEPTH_78><DEPTH_58><DEPTH_2><DEPTH_38><DEPTH_68><DEPTH_15><DEPTH_63><DEPTH_57><DEPTH_14><DEPTH_1><DEPTH_57><DEPTH_94><DEPTH_1><DEPTH_55><DEPTH_94><DEPTH_42><DEPTH_57><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"B",
"A",
"C"
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",
"path": "images/3pts_ADE_train_00014068.jpg"
} |
depth_point_179 | images/4pts_ADE_train_00007046.jpg | ADE_train_00007046.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 291 y = 120),Point B is located at (x = 40 y = 124),Point C is located at (x = 161 y = 166),Point D is located at (x = 185 y = 223).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_74><DEPTH_72><DEPTH_44><DEPTH_64><DEPTH_44><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_72><DEPTH_74><DEPTH_64><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_3><DEPTH_5><DEPTH_26><DEPTH_70><DEPTH_17><DEPTH_31><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_70><DEPTH_67><DEPTH_11><DEPTH_94><DEPTH_63><DEPTH_56><DEPTH_49><DEPTH_15><DEPTH_72><DEPTH_70><DEPTH_31><DEPTH_17><DEPTH_25><DEPTH_39><DEPTH_50><DEPTH_56><DEPTH_35><DEPTH_3><DEPTH_73><DEPTH_67><DEPTH_17><DEPTH_22><DEPTH_22><DEPTH_43><DEPTH_22><DEPTH_17><DEPTH_76><DEPTH_3><DEPTH_67><DEPTH_85><DEPTH_77><DEPTH_73><DEPTH_51><DEPTH_37><DEPTH_24><DEPTH_75><DEPTH_44><DEPTH_59><DEPTH_70><DEPTH_30><DEPTH_28><DEPTH_65><DEPTH_47><DEPTH_65><DEPTH_14><DEPTH_61><DEPTH_31><DEPTH_59><DEPTH_11><DEPTH_20><DEPTH_33><DEPTH_61><DEPTH_86><DEPTH_41><DEPTH_51><DEPTH_78><DEPTH_49><DEPTH_74><DEPTH_74><DEPTH_69><DEPTH_51><DEPTH_61><DEPTH_119><DEPTH_55><DEPTH_12><DEPTH_72><DEPTH_64><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_40><DEPTH_77><DEPTH_56><DEPTH_24><DEPTH_24><DEPTH_73><DEPTH_END><DEPTH_END>. Since point D has a higher pixel value on the depth map, the answer is that point D is closer to the camera. | D | long | 4 | [
"C",
"B",
"A",
"D"
] | <DEPTH_START><DEPTH_74><DEPTH_72><DEPTH_44><DEPTH_64><DEPTH_44><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_72><DEPTH_74><DEPTH_64><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_3><DEPTH_5><DEPTH_26><DEPTH_70><DEPTH_17><DEPTH_31><DEPTH_67><DEPTH_67><DEPTH_59><DEPTH_70><DEPTH_67><DEPTH_11><DEPTH_94><DEPTH_63><DEPTH_56><DEPTH_49><DEPTH_15><DEPTH_72><DEPTH_70><DEPTH_31><DEPTH_17><DEPTH_25><DEPTH_39><DEPTH_50><DEPTH_56><DEPTH_35><DEPTH_3><DEPTH_73><DEPTH_67><DEPTH_17><DEPTH_22><DEPTH_22><DEPTH_43><DEPTH_22><DEPTH_17><DEPTH_76><DEPTH_3><DEPTH_67><DEPTH_85><DEPTH_77><DEPTH_73><DEPTH_51><DEPTH_37><DEPTH_24><DEPTH_75><DEPTH_44><DEPTH_59><DEPTH_70><DEPTH_30><DEPTH_28><DEPTH_65><DEPTH_47><DEPTH_65><DEPTH_14><DEPTH_61><DEPTH_31><DEPTH_59><DEPTH_11><DEPTH_20><DEPTH_33><DEPTH_61><DEPTH_86><DEPTH_41><DEPTH_51><DEPTH_78><DEPTH_49><DEPTH_74><DEPTH_74><DEPTH_69><DEPTH_51><DEPTH_61><DEPTH_119><DEPTH_55><DEPTH_12><DEPTH_72><DEPTH_64><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_40><DEPTH_77><DEPTH_56><DEPTH_24><DEPTH_24><DEPTH_73><DEPTH_END> | 291 | 120 | 40 | 124 | 161 | 166 | 185 | 223 | null | null | 78 | 30 | 2 | 197 | null | {
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",
"path": "images/4pts_ADE_train_00007046.jpg"
} |
depth_point_180 | images/3pts_ADE_train_00006689.jpg | ADE_train_00006689.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 148 y = 123),Point B is located at (x = 232 y = 203),Point C is located at (x = 96 y = 224).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_17><DEPTH_17><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_83><DEPTH_58><DEPTH_76><DEPTH_2><DEPTH_0><DEPTH_38><DEPTH_5><DEPTH_17><DEPTH_17><DEPTH_17><DEPTH_78><DEPTH_78><DEPTH_25><DEPTH_36><DEPTH_36><DEPTH_66><DEPTH_41><DEPTH_76><DEPTH_38><DEPTH_85><DEPTH_49><DEPTH_29><DEPTH_74><DEPTH_74><DEPTH_64><DEPTH_74><DEPTH_74><DEPTH_25><DEPTH_19><DEPTH_58><DEPTH_80><DEPTH_44><DEPTH_72><DEPTH_78><DEPTH_40><DEPTH_69><DEPTH_36><DEPTH_29><DEPTH_76><DEPTH_15><DEPTH_77><DEPTH_78><DEPTH_55><DEPTH_9><DEPTH_2><DEPTH_9><DEPTH_45><DEPTH_39><DEPTH_78><DEPTH_1><DEPTH_121><DEPTH_94><DEPTH_16><DEPTH_57><DEPTH_55><DEPTH_66><DEPTH_2><DEPTH_8><DEPTH_16><DEPTH_0><DEPTH_121><DEPTH_57><DEPTH_41><DEPTH_16><DEPTH_98><DEPTH_119><DEPTH_55><DEPTH_39><DEPTH_39><DEPTH_1><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"A",
"B",
"C"
] | <DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_17><DEPTH_17><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_83><DEPTH_58><DEPTH_76><DEPTH_2><DEPTH_0><DEPTH_38><DEPTH_5><DEPTH_17><DEPTH_17><DEPTH_17><DEPTH_78><DEPTH_78><DEPTH_25><DEPTH_36><DEPTH_36><DEPTH_66><DEPTH_41><DEPTH_76><DEPTH_38><DEPTH_85><DEPTH_49><DEPTH_29><DEPTH_74><DEPTH_74><DEPTH_64><DEPTH_74><DEPTH_74><DEPTH_25><DEPTH_19><DEPTH_58><DEPTH_80><DEPTH_44><DEPTH_72><DEPTH_78><DEPTH_40><DEPTH_69><DEPTH_36><DEPTH_29><DEPTH_76><DEPTH_15><DEPTH_77><DEPTH_78><DEPTH_55><DEPTH_9><DEPTH_2><DEPTH_9><DEPTH_45><DEPTH_39><DEPTH_78><DEPTH_1><DEPTH_121><DEPTH_94><DEPTH_16><DEPTH_57><DEPTH_55><DEPTH_66><DEPTH_2><DEPTH_8><DEPTH_16><DEPTH_0><DEPTH_121><DEPTH_57><DEPTH_41><DEPTH_16><DEPTH_98><DEPTH_119><DEPTH_55><DEPTH_39><DEPTH_39><DEPTH_1><DEPTH_END> | 148 | 123 | 232 | 203 | 96 | 224 | null | null | null | null | 66 | 87 | 120 | null | null | {
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",
"path": "images/3pts_ADE_train_00006689.jpg"
} |
depth_point_181 | images/3pts_ADE_train_00002753.jpg | ADE_train_00002753.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 207 y = 186),Point B is located at (x = 69 y = 198),Point C is located at (x = 10 y = 132).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_45><DEPTH_69><DEPTH_49><DEPTH_78><DEPTH_3><DEPTH_74><DEPTH_29><DEPTH_84><DEPTH_69><DEPTH_74><DEPTH_63><DEPTH_73><DEPTH_40><DEPTH_69><DEPTH_59><DEPTH_29><DEPTH_49><DEPTH_54><DEPTH_69><DEPTH_74><DEPTH_63><DEPTH_70><DEPTH_38><DEPTH_40><DEPTH_59><DEPTH_29><DEPTH_31><DEPTH_46><DEPTH_59><DEPTH_36><DEPTH_76><DEPTH_70><DEPTH_38><DEPTH_60><DEPTH_3><DEPTH_3><DEPTH_31><DEPTH_46><DEPTH_43><DEPTH_69><DEPTH_36><DEPTH_5><DEPTH_38><DEPTH_59><DEPTH_60><DEPTH_59><DEPTH_17><DEPTH_17><DEPTH_5><DEPTH_36><DEPTH_40><DEPTH_17><DEPTH_3><DEPTH_70><DEPTH_20><DEPTH_33><DEPTH_69><DEPTH_39><DEPTH_64><DEPTH_5><DEPTH_40><DEPTH_59><DEPTH_35><DEPTH_22><DEPTH_30><DEPTH_33><DEPTH_39><DEPTH_98><DEPTH_65><DEPTH_60><DEPTH_40><DEPTH_72><DEPTH_49><DEPTH_5><DEPTH_43><DEPTH_12><DEPTH_9><DEPTH_65><DEPTH_21><DEPTH_17><DEPTH_11><DEPTH_59><DEPTH_59><DEPTH_20><DEPTH_45><DEPTH_55><DEPTH_72><DEPTH_41><DEPTH_52><DEPTH_76><DEPTH_5><DEPTH_30><DEPTH_31><DEPTH_6><DEPTH_0><DEPTH_14><DEPTH_1><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"A",
"B",
"C"
] | <DEPTH_START><DEPTH_64><DEPTH_64><DEPTH_64><DEPTH_45><DEPTH_69><DEPTH_49><DEPTH_78><DEPTH_3><DEPTH_74><DEPTH_29><DEPTH_84><DEPTH_69><DEPTH_74><DEPTH_63><DEPTH_73><DEPTH_40><DEPTH_69><DEPTH_59><DEPTH_29><DEPTH_49><DEPTH_54><DEPTH_69><DEPTH_74><DEPTH_63><DEPTH_70><DEPTH_38><DEPTH_40><DEPTH_59><DEPTH_29><DEPTH_31><DEPTH_46><DEPTH_59><DEPTH_36><DEPTH_76><DEPTH_70><DEPTH_38><DEPTH_60><DEPTH_3><DEPTH_3><DEPTH_31><DEPTH_46><DEPTH_43><DEPTH_69><DEPTH_36><DEPTH_5><DEPTH_38><DEPTH_59><DEPTH_60><DEPTH_59><DEPTH_17><DEPTH_17><DEPTH_5><DEPTH_36><DEPTH_40><DEPTH_17><DEPTH_3><DEPTH_70><DEPTH_20><DEPTH_33><DEPTH_69><DEPTH_39><DEPTH_64><DEPTH_5><DEPTH_40><DEPTH_59><DEPTH_35><DEPTH_22><DEPTH_30><DEPTH_33><DEPTH_39><DEPTH_98><DEPTH_65><DEPTH_60><DEPTH_40><DEPTH_72><DEPTH_49><DEPTH_5><DEPTH_43><DEPTH_12><DEPTH_9><DEPTH_65><DEPTH_21><DEPTH_17><DEPTH_11><DEPTH_59><DEPTH_59><DEPTH_20><DEPTH_45><DEPTH_55><DEPTH_72><DEPTH_41><DEPTH_52><DEPTH_76><DEPTH_5><DEPTH_30><DEPTH_31><DEPTH_6><DEPTH_0><DEPTH_14><DEPTH_1><DEPTH_END> | 207 | 186 | 69 | 198 | 10 | 132 | null | null | null | null | 5 | 32 | 153 | null | null | {
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",
"path": "images/3pts_ADE_train_00002753.jpg"
} |
depth_point_182 | images/5pts_ADE_train_00015009.jpg | ADE_train_00015009.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 24 y = 166),Point B is located at (x = 284 y = 105),Point C is located at (x = 123 y = 122),Point D is located at (x = 83 y = 223),Point E is located at (x = 169 y = 213).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_25><DEPTH_63><DEPTH_2><DEPTH_0><DEPTH_45><DEPTH_38><DEPTH_63><DEPTH_71><DEPTH_14><DEPTH_40><DEPTH_40><DEPTH_83><DEPTH_19><DEPTH_15><DEPTH_58><DEPTH_66><DEPTH_43><DEPTH_37><DEPTH_27><DEPTH_3><DEPTH_82><DEPTH_78><DEPTH_36><DEPTH_36><DEPTH_40><DEPTH_74><DEPTH_72><DEPTH_23><DEPTH_46><DEPTH_22><DEPTH_15><DEPTH_64><DEPTH_36><DEPTH_31><DEPTH_38><DEPTH_59><DEPTH_73><DEPTH_57><DEPTH_81><DEPTH_83><DEPTH_5><DEPTH_82><DEPTH_3><DEPTH_69><DEPTH_35><DEPTH_25><DEPTH_5><DEPTH_45><DEPTH_33><DEPTH_22><DEPTH_22><DEPTH_13><DEPTH_75><DEPTH_6><DEPTH_30><DEPTH_77><DEPTH_6><DEPTH_80><DEPTH_23><DEPTH_6><DEPTH_35><DEPTH_56><DEPTH_8><DEPTH_67><DEPTH_63><DEPTH_64><DEPTH_26><DEPTH_80><DEPTH_94><DEPTH_6><DEPTH_78><DEPTH_121><DEPTH_16><DEPTH_24><DEPTH_38><DEPTH_74><DEPTH_71><DEPTH_82><DEPTH_1><DEPTH_4><DEPTH_77><DEPTH_36><DEPTH_94><DEPTH_50><DEPTH_81><DEPTH_38><DEPTH_29><DEPTH_18><DEPTH_12><DEPTH_46><DEPTH_27><DEPTH_27><DEPTH_25><DEPTH_85><DEPTH_44><DEPTH_45><DEPTH_64><DEPTH_2><DEPTH_25><DEPTH_68><DEPTH_END><DEPTH_END>. Since point D has a higher pixel value on the depth map, the answer is that point D is closer to the camera. | D | long | 5 | [
"A",
"C",
"E",
"B",
"D"
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"path": "images/5pts_ADE_train_00015009.jpg"
} |
depth_point_183 | images/3pts_ADE_train_00013080.jpg | ADE_train_00013080.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 241 y = 97),Point B is located at (x = 223 y = 180),Point C is located at (x = 323 y = 110).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_26><DEPTH_55><DEPTH_57><DEPTH_42><DEPTH_119><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_17><DEPTH_31><DEPTH_121><DEPTH_0><DEPTH_55><DEPTH_32><DEPTH_119><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_29><DEPTH_16><DEPTH_2><DEPTH_1><DEPTH_41><DEPTH_82><DEPTH_47><DEPTH_22><DEPTH_35><DEPTH_38><DEPTH_1><DEPTH_25><DEPTH_66><DEPTH_72><DEPTH_25><DEPTH_78><DEPTH_4><DEPTH_43><DEPTH_32><DEPTH_63><DEPTH_74><DEPTH_29><DEPTH_45><DEPTH_62><DEPTH_84><DEPTH_50><DEPTH_52><DEPTH_34><DEPTH_58><DEPTH_15><DEPTH_72><DEPTH_83><DEPTH_68><DEPTH_86><DEPTH_74><DEPTH_24><DEPTH_81><DEPTH_80><DEPTH_36><DEPTH_63><DEPTH_69><DEPTH_85><DEPTH_68><DEPTH_34><DEPTH_34><DEPTH_41><DEPTH_52><DEPTH_49><DEPTH_31><DEPTH_31><DEPTH_49><DEPTH_38><DEPTH_45><DEPTH_75><DEPTH_51><DEPTH_32><DEPTH_69><DEPTH_69><DEPTH_72><DEPTH_69><DEPTH_74><DEPTH_29><DEPTH_72><DEPTH_78><DEPTH_58><DEPTH_78><DEPTH_45><DEPTH_57><DEPTH_14><DEPTH_94><DEPTH_57><DEPTH_57><DEPTH_14><DEPTH_39><DEPTH_14><DEPTH_14><DEPTH_42><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"B",
"A",
"C"
] | <DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_26><DEPTH_55><DEPTH_57><DEPTH_42><DEPTH_119><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_17><DEPTH_31><DEPTH_121><DEPTH_0><DEPTH_55><DEPTH_32><DEPTH_119><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_29><DEPTH_16><DEPTH_2><DEPTH_1><DEPTH_41><DEPTH_82><DEPTH_47><DEPTH_22><DEPTH_35><DEPTH_38><DEPTH_1><DEPTH_25><DEPTH_66><DEPTH_72><DEPTH_25><DEPTH_78><DEPTH_4><DEPTH_43><DEPTH_32><DEPTH_63><DEPTH_74><DEPTH_29><DEPTH_45><DEPTH_62><DEPTH_84><DEPTH_50><DEPTH_52><DEPTH_34><DEPTH_58><DEPTH_15><DEPTH_72><DEPTH_83><DEPTH_68><DEPTH_86><DEPTH_74><DEPTH_24><DEPTH_81><DEPTH_80><DEPTH_36><DEPTH_63><DEPTH_69><DEPTH_85><DEPTH_68><DEPTH_34><DEPTH_34><DEPTH_41><DEPTH_52><DEPTH_49><DEPTH_31><DEPTH_31><DEPTH_49><DEPTH_38><DEPTH_45><DEPTH_75><DEPTH_51><DEPTH_32><DEPTH_69><DEPTH_69><DEPTH_72><DEPTH_69><DEPTH_74><DEPTH_29><DEPTH_72><DEPTH_78><DEPTH_58><DEPTH_78><DEPTH_45><DEPTH_57><DEPTH_14><DEPTH_94><DEPTH_57><DEPTH_57><DEPTH_14><DEPTH_39><DEPTH_14><DEPTH_14><DEPTH_42><DEPTH_END> | 241 | 97 | 223 | 180 | 323 | 110 | null | null | null | null | 128 | 53 | 203 | null | null | {
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"path": "images/3pts_ADE_train_00013080.jpg"
} |
depth_point_184 | images/3pts_ADE_train_00018459.jpg | ADE_train_00018459.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 97 y = 135),Point B is located at (x = 53 y = 182),Point C is located at (x = 154 y = 173).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_6><DEPTH_83><DEPTH_0><DEPTH_44><DEPTH_0><DEPTH_63><DEPTH_6><DEPTH_5><DEPTH_67><DEPTH_0><DEPTH_22><DEPTH_33><DEPTH_15><DEPTH_25><DEPTH_64><DEPTH_66><DEPTH_72><DEPTH_60><DEPTH_15><DEPTH_78><DEPTH_19><DEPTH_72><DEPTH_76><DEPTH_58><DEPTH_2><DEPTH_36><DEPTH_74><DEPTH_73><DEPTH_60><DEPTH_74><DEPTH_49><DEPTH_74><DEPTH_44><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_49><DEPTH_70><DEPTH_60><DEPTH_58><DEPTH_25><DEPTH_36><DEPTH_76><DEPTH_25><DEPTH_19><DEPTH_44><DEPTH_29><DEPTH_11><DEPTH_3><DEPTH_81><DEPTH_58><DEPTH_58><DEPTH_44><DEPTH_25><DEPTH_19><DEPTH_25><DEPTH_40><DEPTH_40><DEPTH_5><DEPTH_82><DEPTH_15><DEPTH_29><DEPTH_25><DEPTH_58><DEPTH_19><DEPTH_45><DEPTH_11><DEPTH_30><DEPTH_63><DEPTH_74><DEPTH_73><DEPTH_58><DEPTH_44><DEPTH_19><DEPTH_2><DEPTH_64><DEPTH_53><DEPTH_9><DEPTH_57><DEPTH_14><DEPTH_27><DEPTH_59><DEPTH_49><DEPTH_72><DEPTH_25><DEPTH_59><DEPTH_4><DEPTH_69><DEPTH_44><DEPTH_50><DEPTH_19><DEPTH_38><DEPTH_76><DEPTH_15><DEPTH_76><DEPTH_40><DEPTH_4><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"B",
"A",
"C"
] | <DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_6><DEPTH_83><DEPTH_0><DEPTH_44><DEPTH_0><DEPTH_63><DEPTH_6><DEPTH_5><DEPTH_67><DEPTH_0><DEPTH_22><DEPTH_33><DEPTH_15><DEPTH_25><DEPTH_64><DEPTH_66><DEPTH_72><DEPTH_60><DEPTH_15><DEPTH_78><DEPTH_19><DEPTH_72><DEPTH_76><DEPTH_58><DEPTH_2><DEPTH_36><DEPTH_74><DEPTH_73><DEPTH_60><DEPTH_74><DEPTH_49><DEPTH_74><DEPTH_44><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_49><DEPTH_70><DEPTH_60><DEPTH_58><DEPTH_25><DEPTH_36><DEPTH_76><DEPTH_25><DEPTH_19><DEPTH_44><DEPTH_29><DEPTH_11><DEPTH_3><DEPTH_81><DEPTH_58><DEPTH_58><DEPTH_44><DEPTH_25><DEPTH_19><DEPTH_25><DEPTH_40><DEPTH_40><DEPTH_5><DEPTH_82><DEPTH_15><DEPTH_29><DEPTH_25><DEPTH_58><DEPTH_19><DEPTH_45><DEPTH_11><DEPTH_30><DEPTH_63><DEPTH_74><DEPTH_73><DEPTH_58><DEPTH_44><DEPTH_19><DEPTH_2><DEPTH_64><DEPTH_53><DEPTH_9><DEPTH_57><DEPTH_14><DEPTH_27><DEPTH_59><DEPTH_49><DEPTH_72><DEPTH_25><DEPTH_59><DEPTH_4><DEPTH_69><DEPTH_44><DEPTH_50><DEPTH_19><DEPTH_38><DEPTH_76><DEPTH_15><DEPTH_76><DEPTH_40><DEPTH_4><DEPTH_END> | 97 | 135 | 53 | 182 | 154 | 173 | null | null | null | null | 61 | 24 | 83 | null | null | {
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",
"path": "images/3pts_ADE_train_00018459.jpg"
} |
depth_point_185 | images/4pts_ADE_train_00005186.jpg | ADE_train_00005186.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 163 y = 122),Point B is located at (x = 258 y = 184),Point C is located at (x = 165 y = 184),Point D is located at (x = 281 y = 202).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_121><DEPTH_98><DEPTH_98><DEPTH_98><DEPTH_121><DEPTH_98><DEPTH_98><DEPTH_98><DEPTH_98><DEPTH_119><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_41><DEPTH_57><DEPTH_64><DEPTH_72><DEPTH_72><DEPTH_64><DEPTH_72><DEPTH_74><DEPTH_64><DEPTH_44><DEPTH_44><DEPTH_15><DEPTH_5><DEPTH_3><DEPTH_80><DEPTH_20><DEPTH_38><DEPTH_76><DEPTH_70><DEPTH_3><DEPTH_31><DEPTH_60><DEPTH_70><DEPTH_34><DEPTH_55><DEPTH_7><DEPTH_25><DEPTH_57><DEPTH_5><DEPTH_17><DEPTH_70><DEPTH_20><DEPTH_32><DEPTH_13><DEPTH_75><DEPTH_40><DEPTH_85><DEPTH_9><DEPTH_11><DEPTH_22><DEPTH_19><DEPTH_70><DEPTH_2><DEPTH_75><DEPTH_68><DEPTH_64><DEPTH_76><DEPTH_41><DEPTH_64><DEPTH_11><DEPTH_74><DEPTH_72><DEPTH_64><DEPTH_74><DEPTH_63><DEPTH_29><DEPTH_44><DEPTH_19><DEPTH_81><DEPTH_36><DEPTH_64><DEPTH_15><DEPTH_25><DEPTH_19><DEPTH_25><DEPTH_25><DEPTH_44><DEPTH_36><DEPTH_25><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_1><DEPTH_0><DEPTH_1><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 4 | [
"B",
"D",
"A",
"C"
] | <DEPTH_START><DEPTH_121><DEPTH_98><DEPTH_98><DEPTH_98><DEPTH_121><DEPTH_98><DEPTH_98><DEPTH_98><DEPTH_98><DEPTH_119><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_41><DEPTH_57><DEPTH_64><DEPTH_72><DEPTH_72><DEPTH_64><DEPTH_72><DEPTH_74><DEPTH_64><DEPTH_44><DEPTH_44><DEPTH_15><DEPTH_5><DEPTH_3><DEPTH_80><DEPTH_20><DEPTH_38><DEPTH_76><DEPTH_70><DEPTH_3><DEPTH_31><DEPTH_60><DEPTH_70><DEPTH_34><DEPTH_55><DEPTH_7><DEPTH_25><DEPTH_57><DEPTH_5><DEPTH_17><DEPTH_70><DEPTH_20><DEPTH_32><DEPTH_13><DEPTH_75><DEPTH_40><DEPTH_85><DEPTH_9><DEPTH_11><DEPTH_22><DEPTH_19><DEPTH_70><DEPTH_2><DEPTH_75><DEPTH_68><DEPTH_64><DEPTH_76><DEPTH_41><DEPTH_64><DEPTH_11><DEPTH_74><DEPTH_72><DEPTH_64><DEPTH_74><DEPTH_63><DEPTH_29><DEPTH_44><DEPTH_19><DEPTH_81><DEPTH_36><DEPTH_64><DEPTH_15><DEPTH_25><DEPTH_19><DEPTH_25><DEPTH_25><DEPTH_44><DEPTH_36><DEPTH_25><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_1><DEPTH_0><DEPTH_1><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_END> | 163 | 122 | 258 | 184 | 165 | 184 | 281 | 202 | null | null | 74 | 19 | 94 | 54 | null | {
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",
"path": "images/4pts_ADE_train_00005186.jpg"
} |
depth_point_186 | images/5pts_ADE_train_00009035.jpg | ADE_train_00009035.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 50 y = 220),Point B is located at (x = 104 y = 175),Point C is located at (x = 219 y = 129),Point D is located at (x = 131 y = 204),Point E is located at (x = 126 y = 123).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_70><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_72><DEPTH_58><DEPTH_25><DEPTH_40><DEPTH_83><DEPTH_30><DEPTH_49><DEPTH_74><DEPTH_72><DEPTH_69><DEPTH_29><DEPTH_29><DEPTH_49><DEPTH_36><DEPTH_72><DEPTH_72><DEPTH_69><DEPTH_49><DEPTH_3><DEPTH_59><DEPTH_49><DEPTH_29><DEPTH_29><DEPTH_49><DEPTH_49><DEPTH_49><DEPTH_49><DEPTH_29><DEPTH_74><DEPTH_29><DEPTH_36><DEPTH_64><DEPTH_64><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_44><DEPTH_64><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_2><DEPTH_19><DEPTH_25><DEPTH_0><DEPTH_0><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_0><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_16><DEPTH_42><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 5 | [
"E",
"C",
"B",
"D",
"A"
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",
"path": "images/5pts_ADE_train_00009035.jpg"
} |
depth_point_187 | images/3pts_ADE_train_00011309.jpg | ADE_train_00011309.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 110 y = 198),Point B is located at (x = 225 y = 221),Point C is located at (x = 167 y = 201).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_11><DEPTH_29><DEPTH_31><DEPTH_31><DEPTH_3><DEPTH_59><DEPTH_49><DEPTH_15><DEPTH_36><DEPTH_74><DEPTH_31><DEPTH_59><DEPTH_40><DEPTH_49><DEPTH_70><DEPTH_60><DEPTH_49><DEPTH_11><DEPTH_60><DEPTH_82><DEPTH_31><DEPTH_22><DEPTH_77><DEPTH_3><DEPTH_22><DEPTH_60><DEPTH_30><DEPTH_43><DEPTH_20><DEPTH_82><DEPTH_49><DEPTH_22><DEPTH_82><DEPTH_60><DEPTH_43><DEPTH_73><DEPTH_70><DEPTH_43><DEPTH_74><DEPTH_29><DEPTH_3><DEPTH_22><DEPTH_73><DEPTH_35><DEPTH_22><DEPTH_29><DEPTH_83><DEPTH_3><DEPTH_44><DEPTH_36><DEPTH_30><DEPTH_11><DEPTH_59><DEPTH_30><DEPTH_30><DEPTH_82><DEPTH_81><DEPTH_41><DEPTH_84><DEPTH_59><DEPTH_8><DEPTH_22><DEPTH_81><DEPTH_51><DEPTH_8><DEPTH_84><DEPTH_29><DEPTH_44><DEPTH_63><DEPTH_45><DEPTH_47><DEPTH_70><DEPTH_3><DEPTH_77><DEPTH_68><DEPTH_61><DEPTH_63><DEPTH_76><DEPTH_73><DEPTH_62><DEPTH_98><DEPTH_57><DEPTH_52><DEPTH_4><DEPTH_39><DEPTH_33><DEPTH_24><DEPTH_46><DEPTH_84><DEPTH_49><DEPTH_24><DEPTH_71><DEPTH_48><DEPTH_50><DEPTH_10><DEPTH_34><DEPTH_85><DEPTH_85><DEPTH_19><DEPTH_25><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"A",
"B",
"C"
] | <DEPTH_START><DEPTH_11><DEPTH_29><DEPTH_31><DEPTH_31><DEPTH_3><DEPTH_59><DEPTH_49><DEPTH_15><DEPTH_36><DEPTH_74><DEPTH_31><DEPTH_59><DEPTH_40><DEPTH_49><DEPTH_70><DEPTH_60><DEPTH_49><DEPTH_11><DEPTH_60><DEPTH_82><DEPTH_31><DEPTH_22><DEPTH_77><DEPTH_3><DEPTH_22><DEPTH_60><DEPTH_30><DEPTH_43><DEPTH_20><DEPTH_82><DEPTH_49><DEPTH_22><DEPTH_82><DEPTH_60><DEPTH_43><DEPTH_73><DEPTH_70><DEPTH_43><DEPTH_74><DEPTH_29><DEPTH_3><DEPTH_22><DEPTH_73><DEPTH_35><DEPTH_22><DEPTH_29><DEPTH_83><DEPTH_3><DEPTH_44><DEPTH_36><DEPTH_30><DEPTH_11><DEPTH_59><DEPTH_30><DEPTH_30><DEPTH_82><DEPTH_81><DEPTH_41><DEPTH_84><DEPTH_59><DEPTH_8><DEPTH_22><DEPTH_81><DEPTH_51><DEPTH_8><DEPTH_84><DEPTH_29><DEPTH_44><DEPTH_63><DEPTH_45><DEPTH_47><DEPTH_70><DEPTH_3><DEPTH_77><DEPTH_68><DEPTH_61><DEPTH_63><DEPTH_76><DEPTH_73><DEPTH_62><DEPTH_98><DEPTH_57><DEPTH_52><DEPTH_4><DEPTH_39><DEPTH_33><DEPTH_24><DEPTH_46><DEPTH_84><DEPTH_49><DEPTH_24><DEPTH_71><DEPTH_48><DEPTH_50><DEPTH_10><DEPTH_34><DEPTH_85><DEPTH_85><DEPTH_19><DEPTH_25><DEPTH_END> | 110 | 198 | 225 | 221 | 167 | 201 | null | null | null | null | 8 | 84 | 105 | null | null | {
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",
"path": "images/3pts_ADE_train_00011309.jpg"
} |
depth_point_188 | images/4pts_ADE_train_00012430.jpg | ADE_train_00012430.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 101 y = 140),Point B is located at (x = 140 y = 195),Point C is located at (x = 315 y = 166),Point D is located at (x = 10 y = 133).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_32><DEPTH_32><DEPTH_11><DEPTH_17><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_54><DEPTH_48><DEPTH_5><DEPTH_5><DEPTH_31><DEPTH_73><DEPTH_67><DEPTH_5><DEPTH_59><DEPTH_17><DEPTH_87><DEPTH_26><DEPTH_2><DEPTH_20><DEPTH_69><DEPTH_60><DEPTH_17><DEPTH_67><DEPTH_30><DEPTH_75><DEPTH_26><DEPTH_58><DEPTH_63><DEPTH_75><DEPTH_11><DEPTH_73><DEPTH_76><DEPTH_19><DEPTH_15><DEPTH_40><DEPTH_84><DEPTH_83><DEPTH_67><DEPTH_35><DEPTH_69><DEPTH_73><DEPTH_35><DEPTH_72><DEPTH_64><DEPTH_29><DEPTH_70><DEPTH_40><DEPTH_74><DEPTH_31><DEPTH_31><DEPTH_15><DEPTH_26><DEPTH_72><DEPTH_76><DEPTH_74><DEPTH_67><DEPTH_83><DEPTH_70><DEPTH_59><DEPTH_3><DEPTH_31><DEPTH_69><DEPTH_49><DEPTH_3><DEPTH_3><DEPTH_58><DEPTH_44><DEPTH_74><DEPTH_29><DEPTH_29><DEPTH_49><DEPTH_49><DEPTH_31><DEPTH_11><DEPTH_3><DEPTH_1><DEPTH_0><DEPTH_33><DEPTH_44><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_44><DEPTH_44><DEPTH_64><DEPTH_121><DEPTH_57><DEPTH_39><DEPTH_57><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_1><DEPTH_0><DEPTH_0><DEPTH_END><DEPTH_END>. Since point D has a higher pixel value on the depth map, the answer is that point D is closer to the camera. | D | long | 4 | [
"A",
"B",
"C",
"D"
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"path": "images/4pts_ADE_train_00012430.jpg"
} |
depth_point_189 | images/3pts_ADE_train_00019695.jpg | ADE_train_00019695.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 68 y = 131),Point B is located at (x = 218 y = 138),Point C is located at (x = 200 y = 193).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_64><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_45><DEPTH_74><DEPTH_3><DEPTH_36><DEPTH_74><DEPTH_74><DEPTH_5><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_44><DEPTH_41><DEPTH_82><DEPTH_29><DEPTH_5><DEPTH_59><DEPTH_3><DEPTH_31><DEPTH_49><DEPTH_3><DEPTH_15><DEPTH_45><DEPTH_58><DEPTH_49><DEPTH_5><DEPTH_3><DEPTH_31><DEPTH_31><DEPTH_49><DEPTH_49><DEPTH_31><DEPTH_40><DEPTH_29><DEPTH_29><DEPTH_5><DEPTH_59><DEPTH_59><DEPTH_49><DEPTH_31><DEPTH_31><DEPTH_29><DEPTH_29><DEPTH_49><DEPTH_76><DEPTH_67><DEPTH_70><DEPTH_11><DEPTH_3><DEPTH_59><DEPTH_25><DEPTH_81><DEPTH_3><DEPTH_29><DEPTH_36><DEPTH_59><DEPTH_40><DEPTH_69><DEPTH_3><DEPTH_3><DEPTH_15><DEPTH_72><DEPTH_3><DEPTH_3><DEPTH_64><DEPTH_3><DEPTH_75><DEPTH_44><DEPTH_74><DEPTH_76><DEPTH_15><DEPTH_35><DEPTH_83><DEPTH_58><DEPTH_74><DEPTH_67><DEPTH_22><DEPTH_3><DEPTH_20><DEPTH_7><DEPTH_31><DEPTH_46><DEPTH_42><DEPTH_12><DEPTH_59><DEPTH_85><DEPTH_59><DEPTH_70><DEPTH_53><DEPTH_34><DEPTH_80><DEPTH_47><DEPTH_98><DEPTH_75><DEPTH_20><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 3 | [
"A",
"B",
"C"
] | <DEPTH_START><DEPTH_64><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_45><DEPTH_74><DEPTH_3><DEPTH_36><DEPTH_74><DEPTH_74><DEPTH_5><DEPTH_70><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_3><DEPTH_44><DEPTH_41><DEPTH_82><DEPTH_29><DEPTH_5><DEPTH_59><DEPTH_3><DEPTH_31><DEPTH_49><DEPTH_3><DEPTH_15><DEPTH_45><DEPTH_58><DEPTH_49><DEPTH_5><DEPTH_3><DEPTH_31><DEPTH_31><DEPTH_49><DEPTH_49><DEPTH_31><DEPTH_40><DEPTH_29><DEPTH_29><DEPTH_5><DEPTH_59><DEPTH_59><DEPTH_49><DEPTH_31><DEPTH_31><DEPTH_29><DEPTH_29><DEPTH_49><DEPTH_76><DEPTH_67><DEPTH_70><DEPTH_11><DEPTH_3><DEPTH_59><DEPTH_25><DEPTH_81><DEPTH_3><DEPTH_29><DEPTH_36><DEPTH_59><DEPTH_40><DEPTH_69><DEPTH_3><DEPTH_3><DEPTH_15><DEPTH_72><DEPTH_3><DEPTH_3><DEPTH_64><DEPTH_3><DEPTH_75><DEPTH_44><DEPTH_74><DEPTH_76><DEPTH_15><DEPTH_35><DEPTH_83><DEPTH_58><DEPTH_74><DEPTH_67><DEPTH_22><DEPTH_3><DEPTH_20><DEPTH_7><DEPTH_31><DEPTH_46><DEPTH_42><DEPTH_12><DEPTH_59><DEPTH_85><DEPTH_59><DEPTH_70><DEPTH_53><DEPTH_34><DEPTH_80><DEPTH_47><DEPTH_98><DEPTH_75><DEPTH_20><DEPTH_END> | 68 | 131 | 218 | 138 | 200 | 193 | null | null | null | null | 12 | 39 | 63 | null | null | {
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",
"path": "images/3pts_ADE_train_00019695.jpg"
} |
depth_point_190 | images/4pts_ADE_train_00005020.jpg | ADE_train_00005020.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 261 y = 159),Point B is located at (x = 15 y = 115),Point C is located at (x = 35 y = 185),Point D is located at (x = 175 y = 102).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_68><DEPTH_11><DEPTH_6><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_38><DEPTH_82><DEPTH_29><DEPTH_1><DEPTH_61><DEPTH_19><DEPTH_31><DEPTH_17><DEPTH_6><DEPTH_29><DEPTH_78><DEPTH_15><DEPTH_64><DEPTH_44><DEPTH_72><DEPTH_74><DEPTH_69><DEPTH_43><DEPTH_69><DEPTH_83><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_50><DEPTH_29><DEPTH_31><DEPTH_29><DEPTH_40><DEPTH_31><DEPTH_69><DEPTH_74><DEPTH_64><DEPTH_36><DEPTH_82><DEPTH_74><DEPTH_66><DEPTH_76><DEPTH_76><DEPTH_49><DEPTH_49><DEPTH_29><DEPTH_64><DEPTH_64><DEPTH_25><DEPTH_9><DEPTH_1><DEPTH_78><DEPTH_76><DEPTH_81><DEPTH_59><DEPTH_29><DEPTH_74><DEPTH_64><DEPTH_32><DEPTH_9><DEPTH_0><DEPTH_19><DEPTH_72><DEPTH_57><DEPTH_69><DEPTH_29><DEPTH_36><DEPTH_36><DEPTH_94><DEPTH_0><DEPTH_39><DEPTH_66><DEPTH_78><DEPTH_0><DEPTH_94><DEPTH_31><DEPTH_44><DEPTH_64><DEPTH_57><DEPTH_1><DEPTH_94><DEPTH_66><DEPTH_78><DEPTH_9><DEPTH_121><DEPTH_46><DEPTH_15><DEPTH_44><DEPTH_42><DEPTH_121><DEPTH_121><DEPTH_2><DEPTH_41><DEPTH_45><DEPTH_94><DEPTH_94><DEPTH_83><DEPTH_25><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 4 | [
"D",
"A",
"B",
"C"
] | <DEPTH_START><DEPTH_68><DEPTH_11><DEPTH_6><DEPTH_5><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_38><DEPTH_82><DEPTH_29><DEPTH_1><DEPTH_61><DEPTH_19><DEPTH_31><DEPTH_17><DEPTH_6><DEPTH_29><DEPTH_78><DEPTH_15><DEPTH_64><DEPTH_44><DEPTH_72><DEPTH_74><DEPTH_69><DEPTH_43><DEPTH_69><DEPTH_83><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_50><DEPTH_29><DEPTH_31><DEPTH_29><DEPTH_40><DEPTH_31><DEPTH_69><DEPTH_74><DEPTH_64><DEPTH_36><DEPTH_82><DEPTH_74><DEPTH_66><DEPTH_76><DEPTH_76><DEPTH_49><DEPTH_49><DEPTH_29><DEPTH_64><DEPTH_64><DEPTH_25><DEPTH_9><DEPTH_1><DEPTH_78><DEPTH_76><DEPTH_81><DEPTH_59><DEPTH_29><DEPTH_74><DEPTH_64><DEPTH_32><DEPTH_9><DEPTH_0><DEPTH_19><DEPTH_72><DEPTH_57><DEPTH_69><DEPTH_29><DEPTH_36><DEPTH_36><DEPTH_94><DEPTH_0><DEPTH_39><DEPTH_66><DEPTH_78><DEPTH_0><DEPTH_94><DEPTH_31><DEPTH_44><DEPTH_64><DEPTH_57><DEPTH_1><DEPTH_94><DEPTH_66><DEPTH_78><DEPTH_9><DEPTH_121><DEPTH_46><DEPTH_15><DEPTH_44><DEPTH_42><DEPTH_121><DEPTH_121><DEPTH_2><DEPTH_41><DEPTH_45><DEPTH_94><DEPTH_94><DEPTH_83><DEPTH_25><DEPTH_END> | 261 | 159 | 15 | 115 | 35 | 185 | 175 | 102 | null | null | 60 | 102 | 129 | 33 | null | {
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"path": "images/4pts_ADE_train_00005020.jpg"
} |
depth_point_191 | images/3pts_ADE_train_00003105.jpg | ADE_train_00003105.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 296 y = 221),Point B is located at (x = 305 y = 173),Point C is located at (x = 97 y = 124).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_40><DEPTH_40><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_59><DEPTH_29><DEPTH_67><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_5><DEPTH_31><DEPTH_49><DEPTH_29><DEPTH_49><DEPTH_31><DEPTH_3><DEPTH_31><DEPTH_31><DEPTH_31><DEPTH_3><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_74><DEPTH_29><DEPTH_29><DEPTH_74><DEPTH_29><DEPTH_49><DEPTH_44><DEPTH_44><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_36><DEPTH_74><DEPTH_2><DEPTH_19><DEPTH_19><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_25><DEPTH_44><DEPTH_44><DEPTH_64><DEPTH_0><DEPTH_41><DEPTH_41><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_25><DEPTH_94><DEPTH_1><DEPTH_0><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_41><DEPTH_2><DEPTH_2><DEPTH_2><DEPTH_42><DEPTH_16><DEPTH_57><DEPTH_57><DEPTH_1><DEPTH_1><DEPTH_0><DEPTH_0><DEPTH_0><DEPTH_41><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 3 | [
"C",
"B",
"A"
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iJsTh45olkiIGA5Dqw+h4qjPoOi3I3SaZCjg7t0K+WwPsVxzxWmEJJBQHHIOaUW6+Y7jeCRjG44/LoPwpp2E0upkjRbGVco11EfRyCf8AP41BN4b3xukd2eVx80f9Qa3xEBwTn8MVg+MJJrXRUlimkt7c3MS3U8TlXiiLYZlxznOB36nit/rlaMdxUMFTrVY00rNsw/8AhXWnLGudK0aVwAGItVXJ78basR+H5tPhS2t7OGKIcJHCyKoyc8AY70aUmnWHiu1s/Dtws1nJBK95ClwZY4xxtcfMRvJAU9eOw612oZgOp/CtaeY1F0QYvLYUpJJvVX1Vnu1qru233HEvZXcWd9pOuOv7sn+VV2OOG4+vFd8GK+gHXpQXD/eCsPVhmumOZ94nC8F2ZwPXpRXbPYWEx+azgJznKoAf0qCTRNPYkfZtuf7jsP61osyh1TIeCl0ZyFFdg2k6Ui4FtHn3dif1NVX0CwlYur3Cf7CS4X9VJ/WrWY0SPqdQ5mjNblx4fbyyLYJuzwXunH5/u2FZs2jarGPk09ZT6pqa/wAmiFaLG0n1IeGqLoVM0UxodVtjlvDt8+M/euBKp+oROR+NRT61LGcy+HZYcdR86j6Y8v8Aqa0WIi9iPZMsZxRmsuXxJbN100xsSTgXhXH5x9Kg/txCflt5MZzj7UDx+EdWqyZLhY280mayotfgRxvsJnXPIN236YjH60Ta9bFv3On3K/716SP0jo9suwuXzNWjmstfEdkMBtLuWx1xfN/8aq7B4t0+CARt4fZmY5Ekk4kY/wDfSYH5Uvb+QcnmT0hNRSeK9KeSQnQ5YVcY2pKh2nHVcpkUkXiTQ1ZGfSNTkAznNyuH/ID+lCrrsHKu5NRTX8R+HGKf8SjU48cHbdD5vzok8T6C21I9BvR/tNehSeffIo+sLsw5PNDuaXB60q+JtCC5Gg3xIwCTOrD9OM1YTxn4fSMRt4YkOOrF1DGh1/IORdyt+FHOKt/8Jj4Zzz4cuBjsJh/8VSr4q8Kglm0O857GYHHtjdS9v/dYci7opYo5FWz4t8MM5LaBeLk8ATAD/wBC4qIeJvDXnBm0W9VOn/H0px74z/Wn9Y8mLkj/ADIhzSGr/wDwkfg85I07UcnnHmD/AOLph8QeD2cH7Dqaj0Ei4P8A49T+sLsxci7o6IIYoWKhAM5O8de5/wAiq/7uQqd6HHDK4BJ9CDnjvTG1SR1kFvFFLKMmPeGVG9mYZK/UjHNR20zJaebctayzbSzqhWRl9QCoBbHTpXyh9HuWY1eQMt1NBIhOAEUgMP8AaByM9PWpFvI+V80FVOMjPHtVCHWNPlCtvjhLdVkyjD8wMfQ1fQo5DLJuTqGIDrn8KLjsPSYxHAGFxxgEKR7HGCfxqYXG9CGV03ccgArxUcsSPGFO0qOmCeP1pqxIYwHCyAdOc/zouFiVJd6hFLMQME8Z/pSST5fylJDYzhflJx6EkD61F5SjlCyL1KlQR+FOGCQSMgchkcg5+lFxWLYOI1wGHrxnijnfgkZqJQgGVG0n+6f6GnhVI5UZPZhincVhfMKkgn8egH607ftOCw+pOD9KjI6ApjHTGDTTDGVAZOhzyT/jRcLC2ltb2MZhtIIbWMncVijCgnjJIHfirGdw4bBHJwKrrEigKuR+PJp2wY65oTHK8nd7kuSOTkHt8vajzGxxtwOvHNRBQBgYx2p2Oep/Oi4rAXdshgqnvTfm/hf8AaXIDAfNyTjAJA+vp+NOJ5yetAEYTLBid5Hc9RTwcdQR9e9Bx6/lxR+NAC5pQSTgHP4U2hWKsCM/gcULcHsMkuI4WActyMgoN38qhfWIIzhWlx78fpTp4BKxb91z1DR4P5jBNUzGykKCw9klzn8DXdCnTa01MHKS3JjrFu+QySMPQjOfzqrLcaRICG0iCVm6loU/wpXt4iQDcxqP9scj2O3PNQPCqj/XRN7K2f5itIxS2M5O4hh0CQEnQYsk/wAICio5bLw+wOzw9Hk9cyYP6U/YAfkkwR9aYwck9W9e9a3MWkVm0/Q+o0WMYGAu9sD9QadJbaHLky6BZDPUx7kP6GnMMjBH5VEYlzxj8qa9SWl2IJdN0Ak+XphUY4zMT+f/AOuoDpmksR/oZ46ASMB+QNWmjA6AfhTfLK84H4Cq+Zm/Qp/2RpxyFtmUHggTOB+NNXQ7BRkRSr7ec2KusvQ8fgKbnH8INF/MzfoUjoNmR8rXKjOeJc/0qI+HofmzdXZB65ZT+uK0CRjlVz9KQNgen44ou+5Dt2M99AtmUhrm757mUZ/lTT4dt8ZWe4z6lgf6Vpl/QH6CmGTHPzj14ppvuJqPYzP+Echxn7TP+O3P8qH8PwbeJZc98kf4Vea/jQgGRl+oIpBfwtx9oX/vqnzS7kuMTO/sJMD96Wx3JP8ASohoC8l53I9iBj8wa2lnUj5HBHscijfuz8+afNPuS4xOuC/3yjf8Bx/WmGys2uRctbRmcDaJSBuAznrUnBH3f5UoH+z+VeAfTEgztwXZl9G5qH7PCZ1lIw6gr944wfUZxS7cngsKfg9wT+NAhdikYA/FTimbNv3Sf+BClBI7jr3GKX5wc4B/GgBw34wSQPY0BT2OfcjBpu5u6mnBsZ6/nQMTLA5Kt9Qc05XVuAwP480gLHqwx2wOaViwOAGPvigQkS7IVQokYHRY+g+nT+VSA8UgXtgfhS4oARlWQYkRWXrhlzUhJPU/rTAKUH3oAdzS59OnvTMkdqTNMRJxRUefejNAMfRkUzNLQFhTTiV2AbcN/e65/CmZpM04ys7iauJPG0mGSZVI6hNyZ/MkVTeKdzks7lehVgxH5VczTHjjk++gb6iuuGK/mRjKj2ZUaSTgO+4joJEVsfnUTKpHJAOeMDiriwoud1zNGv0Dj8jVaVHjHO1v9pRwf5V1wmp6xMJR5dxht0JPzFh6qOlRC3dpNkas5xxtU8/pQcg8Bee4pyXEikfM2Ac4PTP0qmmToRPFJHkSI6kdmUgioymO2PrW9FLZX1uqXbyCcE/vC2Pf/OarS6W4O63fzUxwaVwsZPl7uisfoaYUzkbR+XNW/s0yE/uX+XrtXd+tRkuoKfN75FF/ImxVKDPSm+V3G4fTpVlsnAJHHsKTaBnjBHpQS4oqMhX5WX3wTUZj47j6jNXgMBiGIPc9KQqfvbiT357UXJ5Ch5Q64yPYU3Zjg5H1q8YsnmI+x6VGYyeQR9DTuQ6Z5TH4x8ZS6bHqCafpJgkge4RRKPMaJGZWcR+bvwCj5OOik9K77SbqW/0WxvJlAkuLeOVgv3QWUE49ua8stda0OLwxYLM1m95BpF1ZnAuVuY5JJZyoUjERXEi5zk7WYegr1Lw2jf8ACK6OcZBsYeoP9wUczQTproWSgAJHP4YpNgYZ547HtVoo20jt7HIqLaFboM+1HN1Zi6Z2JTPJAI9iaNoXoh/OmsWI++R65pAZR3FeMe+PBJOM4+o4p5JUdR+VRqSeTilMkfTPPpikMN4OcsCaTA9Pypm2KQkjOfc1LgKMKgHvzQA0EjpnNKZMYByD7ikBb2/Cn/j+tAFfy5jOJBcExZ+ZCgI6duM+9TMozwn607acdT+dAoAAD1Bx7UozjpmjjGeKUAdMUAGfejJ9qPxpMUBYdk+lG4d6TFJ360AO+U0mPQ03v0peKAYuDSZ9qOaN1ABRRkelGAe9ACcUtG2k24NAARkU14opI9uFV+zEEj8qcaQ1rTqSpu6IlFSVmUJ7e4hAaSJTGejr0P41Xz0+Ufgc1p7njO6Nynrjv9R3pY5ILhgk9sFJOPOh4A+oPFd9PExnozlnScdUZXG7tn6VJHPPGNsUrL3ABrbl0OCKAyvPIQOfkQNj8qynFsH2rJL+MRX+prodmZJ3LtvrcixrHKm9e+BVue3sdRKs0yhz6jGKxlhjKAo7MM/whT/WmlAh6MB+Az+VS4p7DLlxpAjAMe4oehXv+FZ0tvPEzBonGOCxX+tWbe8ltWyjuR0xwf51am1WSS3WLOFHJ9T9anUZkjhSCoz6kEmmc45A+uMVbllWQhhDEhxj5cimcH+PH4E1WhNiAAf/AKmOaawHTB/OrMcU0j4WNyPQqazfElxdabZxKjLA8syRmYhWEKk8uQeMducdamUoxi5GlCjKtUjTjuzmz8NfCH/QIf6C4l/nvrpba2hsbSG1t1KwQRrFGpy21QMAc5JwBWdBHPpuuW1gl5c3kM8bu6zEO0RGMNnGdp+7jgZzW2FJPPH50oS5lr0KxND2LjZ3UldPyu1t01RAERFP3wc9gKQQq56lvoOalI9CpHruFJjoCT7elXynMbe72P4UZB6g03I4HWlxx1rxT1h+VNAx69qYBSj6HigBwwDwc0vTnp60wZ96UEDr/OkIk5z3o9iKb3pQT65pgO4HQ0EHJ5puSOKXOR7UAABHufajnNLk/wCRRnigAPHekz1paDQAgJz3o75xzS/jxRx6UAGRnrQfwpDjFJ170AKaOcUmTRwaAQZxRmijFABnFLk0wj2oHtQA/dRkGmc0cjtQBIkZlcIpGT0ycVOrxae/76eRf9jBAzVTcuOf1qZ9Rgt7HZOXcs2wKOevQc/5+ldOHlCMveMKyk1oJNqUMhypII7iQr/XNQC9kI/dTzD6SlsfnmsDVNRSxRjHGSc4Ab5M9x374/WrNq6X1pFcxEbZF6N/Cc4I/Aiu6nWhNtR6HO4W3L0kksjHfOpzz8yAH9RVdlVckNn8aTyZhk4JHseP0pjF/wCJASO4Y/41pcVh27sCePTJ/rSYA/iB+px/MU0y5U7oh9T2/Gmh+DyaVwsSAMeVTPqRg0ZUEhlUHsCOf50wkH8P7wpOD0UY9qLhYkyFG4Ae/FRyxQzxNFNbxyK2CysuVPfkEUAjOOad34zik1fcE3F3TKdjpWnabu+y2ixFurclu3G4nOOOnSrwdecRr9STTCCPX8qMnpn6804xUVaKHVqzqy56km33buIwYHkqPQEj/Cl2HHKgfTijccnmmdORkZ9j/SjUzsa2cdhTgR14xSYwMH9KU8HrxXinqCrjPU0pH/6hTcHvR05oEP4GKQU3J9hSggj19KQDvegctzRnp7Un4Y56UDHemKM+tJ3o9aAF6nvSg96b7ds0vpxQAuT6A+tG6m+wGMUfU5piHKQc80ZPb9aTjrgUnfrQA4nrx+tJnnik68kUmRQA7OPWl9+9NUj/AApQeeaAFIo5pMgUdvegBc0meelA5peaAE2g+1HkTE/Krn6A1d05YmuMSKCSPlz61qPsQkHKj6V1UaCqK7ZhUrODtY54QTmRY9jh2PAYYrP1SxvraUXBsZ7hUKjNviRky3O1fp369q6qe58mPKNvHoDVF/EBQHbBvA65YD/P41r9ThbVmTxEnsjy/wAXarDbaWzTrdxTCPZAjRGMsxUkuQRwQzIMHrhgKPhxPdLf3WmSC4uLCdBcRXLROvzgAMADjr0PuvpXf3OsSTEr9naPuoLMAf1AqE6z5sTRzrKw6fLNjnuQQOPqDWlOlGnsyXzSHG3DPm3keRTxgIGx+IOD+dJIqK3lyXce712kDP1BIqqLqHy1Ro5SOgXzgcD24FRmeLPCOoB+X5gOPpj+ta3CxM6lQCy5Unhg3X9KY/l9pQw9Wxx+vNNLs7Bt0wX+LOOPyo3lCMnOBkFW/Tkg0Jg0MIBJACk/7BpuBnuD+tSk2hI/furHruhc4/EAg0/7Ixy0UkcqdismPzB5H40aCuZes3k2m6DqF/EVMtvbSTIHyVLKpIBA+leVTfE3xdb6XbanLpemLaXLMkMm1zuK9ePMyPqRzg4zg49R8V2rjwjrZMDgiwnJKsCB+7br7V4fqOuaZdaFc6JGkCxWtvbtaXKrLunlQ4cEE4UHzp2+6vQZ5pkyZ9AZBPP6GlPA4Un60nDcjec+ij/GlVcdWZT7D+eDTAXduHTGOevSmbkB69felKuvO8YNM3k4G4fnRdi0NnODwT1o3Yb7ppMg8AZJp3Y/L0rxWemAc+mKUn1zScgD/CjB/wA9qQDtykdaXjjFM4HHfNIcc80APwSePw4pT7UwEkkZ/Cl3c84/E0ALk46YzSg98im59RSnHb+XWgBd3H9KXIPHH4UnHY0mCDknPNADu3WjjsRTT69+nFID9TQA/NJ75pAcH3FLn0pgIeuM/wBaBnOcDNLnJo47/pQIM/gaTv1+tISO5o6HFADjj8aOtJx6/SgHPWgB3TrmlzTc+/Sj+VADsjPUVo2eomE7ZsunuckVm8UcevNVCcou8SZRUlZnQSQ29+m5FBUjklePxFYWpWLQyDAAYDIIPUevNaFjHdQL5m4Ih6q4JzVi9aCeELO4dCcjHVT7V6tOUpRvJHDJcsrI5R7WRzgQgMQSCRhfw7flimtYYjxuCkYJV42Ufgx4rQjjClhBcljuyRtzn8COlNWRot0W1I8gjGe/rjHB/A1XKh3ZkyWskQEj2+Yz/Er8MfY5/wAaXGGBaNgMcDYr/wAsVpoAASXRwPmGVMTD3yuAfyqrcrhnLSGNDghmI5/T+tKw73K4MIcbrcZPXapX9M9aXyozl494wejEY/Uih4+VVZCzt1DLgkfyNNeOTdgEHA7ckfyouFh6EgbBHFK46/ODj8hTZIZWYMbdU455Of1qN0wACfcblIH9QKdGk0JWQIuPd8g/hQFivd2UV3aTWtxBvhnQxyDOCVIIIyMEcGuYb4a+ElIzpW30BuJef/H629bu7wTWVoLj7PDdyMrzxqMqNvCDjgtng9eO9V7Iz2mrz6YLh7yBIUkWSR8mMknKsQBknORnoBWbqJS5TrWCk6Ptbq9r212Ttvtv0/4F9sSvnlw/fkD+opGcMxJjUt0ycZp8UBlXG9UTuWXgfjjIpksLx/8APN89NpB/TrWi0RxbjRtBJ8vHuCRRuJzy4HuQc/oaZk8/KQPTpThIuzHltn65ouKxsAkHnJHXp1p2fQr/APXpmT1wMZ4xijp05PTpXjHpDwffH1pQQAACfTFNXsQeOnHSlzjjPGMdaAHZ5xkZo/ycHtTSRg9ueRmlJ+6MfpQAo6AUY7YH4U0Z29vXml3d/QcgGgYbjwaOR1yaXdkYJzS55PPTmgQHk44x7U0HvRw2cGlxz9KADPoc0ZAGKSjPOcCgAP3eM/Q0gyPekPqDRk+/NO4Dt2DkUA8/0pCOPWgcH+lADgeKQ/l70Y96O4zQIUj3FGOeDikzigE4oGO5HWkHB/Cjd6/yoBxgdqBDs4FXdNjVrks2PlXIB9apx7C67y20nnHXFb0Atthaz8vnqpHzV0YeHNK7ZjWlZWtuQ30jxRsYyQQMnvWE14d+7Mbhv4X+XdWhqd3dWpwLcOD3DcVjFpJTnyAqnvuyM/hmvSbsckY3LATzXJRJIyOmSD+XWnqzojRSFJdwxtdeT/n8Krqzg4ZVAx/yzfmpJLh8IGlyo6B48nFFyrDdstu0fkxyooOQGwV59DTrhJWCMsQy3JI+YfzqJACGMhcKW4wSAfqDn9KQPIuBBIpUH5lba4H5DIpALHDLI5QQCNgNx+XI/LHWpQhb7803mL3BDbfbGM/yoki8xlMbbSRyCGx+YIqIxXUUqM8SsD0VZcZH/As5p7CtcTyT552TWzSDkjaA368j8KetlcXEmM2zEjlS65/xpLh7aRcTbhMOqmE7SPchSP5VHO7LiNRMo/hKJvXH4f8A66AsVrzSfNQ2t1btNG2eJEDgcEZU44PJ5BBqrbaXZ6ahit4FgUnBZQQT16kk56+prTgkBQqLx8rwVdcYP40yS+dCQJIc7sAbjn8SM/yqeWN+a2pp7aqoezUny9r6fcUpc7uZy20YHOP5U1YnZS3lBx/sgN/WtX7RC0as0CTE/eVVBNMkhtpVEoYwg8A46e2CM0WuZ3aMsKd4UqFOMdaXy5CCwjJU++7FXGsJmfZHIr55GU2n/CoprO5RT5kTY7hVz/KhIGzSXBycGlyMjPekz1O3t+XNL1759B0rxT0gAyc9/TpSg4GcggjOaaTjHGcHtS9AQD2z0piHZ9Tx70AjIwD+dNyN24N07CgnPRRSGPz1Hp29aTHQ8H6UgBx2/HvSk5xnOc85xg0AOztByc/hSE5Hp2A6YpBnPYHHSlIHrn8aYAPU/wAqXJwcHOKTuTkUnvyO+M9RSELk8fLzS5UjGf8A9VNPHOT9fWgn2/CmArc5H5Ug47kimZyOCR70oY9CM+tMB2/I5FA+9xmmb8kU8NkZ7UAOAzSZxj37ikOc4547YpfQelAhRxz3pBxx+vejnP8AnmjrQMXHJyOPel9hSHIOaXjj3oEHbrU1rNJDcJJEu5+gGM5qHP4U+KRo5A6MQQacXZ3E1dWOifZKM3ECjI5BOayL3S7TG+3cweuOR+Va1vIby2EjKOOMDvVe4gDZA6+h4r2INSSZ5zvF2OVmuUQmLcsm3+KIck/XNEaxyx4iUiTGCWOGce/rWlNAsTZClcdgcVWlhjmO3dI/s0g4/rRystSRTi82BiTGy5GCx+YY9qIozKWYzvIyj5QgVCPzGac9ncebuijj9PvZB/A1JDFMrE7EUjgKqnn+dTbUq6sMXz0Qqj+Wg/hDBsn1/wD1imG5kUBwYkJG0yuoI+hODinXJDjzRFGZOhIGCPx4JqLcJVLPJhQOY5Oh/XP60O62DRkjTXcMwlwAuMZCLtP4irCyi6UhWZGB5ZdrAfUE1RM8duc2+VbPzEZ2n8O5qd9R84qCiAjqwO1j79eKSlZ6g432EuJJYCI5JInU8AtAxz7cHinm2D4WKFo17OhJB/w/GonuYd/ztcPEOMq6ncPcdQfpQLmKRsWtwYD08uVio/AnNO6FZmgBJJbhN8cyoMbZVJK/U4qhvR2xDKGJGCC4b8s4zUUytFl57bcTyZlkJ/UVGZIZXLsBI5672yD+Yp7bCt3J5UGRutJFZeGCZX9AeKY1wiEKPtAx0VpcEfTPB+lRm4mLfPL5C/7POB+Iz+tOikBBK3mQB9123D64P9KLg0aQGevQcj2pSf8ADj1pmTwcH+v+etLkAdMg/jXjHojiOMEDgdOn+f8A61KW+fOcj3+n9KYT1BPP86cOm3A65xSEO+nB9aMAjuR0ximgD2X179v07UuQ2ADke/8An/OKBiE5HUceg+UUuGz15FJwScdff+dLycY6UALtz1U5/nQxAHWk7ZHI9Oxo6jK4OPoM0AB3Hp/jScjAHP40pA56Y60hbjrnIPApgOBxweD6U0nPH8XWlPXA5H1pDnBzz+GaADPzDqQfbpR/nrSc5yMY7+tKc/ifXvQIaRzgjFOVQMnoev0pu7t0H0xTgQeR1pgKSBzgfnTskdeg9KaQc9T1o6cE8etADjjPHUdqU8+9NyT269qXPPf6mgBeRn196X3HNHY/yoBz24PqKAEHv0pc89KTPP09aXHTAyc0hE0F1LA26J9p9q2bK/juV8qUL5nq3Q1g4weMYxxnvRnacqDWtOtKD0InTjPc6Oa3UcgYXvxkflVCbT4JMlVGf7yHmobfVJ4gqufMT0PWtOCe1vANqhZO46GvRp14zOOdKUTnruwuo+Y7g47AoKoyPfo3JjkI9irV2UtsPusu4Y696zbnTs8xtjHYitWrkKXc57+0TkC6jO7pkDOPqKaXIlDwSRSKeBGDg/kSP5Vqy20ka/PEsmPReKpSRWRZSYCh7ELjn8qlpmikii4eVtptZFPcEkAfhipPsvykGGMtjpu5qWRY423x3UyyKON/OR6dKjkiuLgEhopEI5GcfpwRSt3HcriKN4yFMT7W6chwfrTmbYmCNo7E4I/A0+K1uICGSNuOMhxIuPof8afI00qjNpDLjgEqV/Q/0NJRXUG2VTIYV3RzBf8AZbt/Q0wyCaXLKE55IIK/iKmMLiUDDR+qkLIPz4P50xi8DsHTeDxuKYH+FS0NNF2URT2YCzBQP4gQcVRNvGo2/akY54G3I/TkVYSaNoSyb129dozj68GqTmQOXz05ySOPyq201clJ3sbLMMnjPHJ6UHnoOM8UikgHGQffjP6UHDAnBORya8Y7xV5OCAex55pS2Bwox0NA+YAEdOfTFGMnGDwOfb/PFAxAT17dsU8ZwSc4A54ppLeZww/DrQeD3A9/8/zoAUMcccA9eRQW5BONx45/wppGTkg9eTmlwVHHHUH60APz6EY6gGkPBwDjHbGaQkcHPNBODyT9CelADiTuznPU88UNgjJHBOB70gbjHI+vpSY+YkDnPIzimA4Njr07YFLjuFI+opvJAGc+9BI9Oe/FAgAI69utHf3pS2FAY5GMZzTQ2f4s57/0/wA+tMBWGRknmkAIUnPPsOlLwCRz26UDBXqB70AAPPWg9MY9qXHXr78Ug6nB/wDr0ALx70vrnv3JpDgAckd+KUcdDQAA8d6Udcg/hS52g8Y96T2x+JpAKecY5oB5Hr3z2pByexoxnHBP0oAd6c9qTPv+mKQDmjjPB5pgPwfQEH3pUdlwUbDDkEdj7Uwn169j1oOcg520CsasOtTINkqrKPfg1Zjv7ObGWaI+jDj86wfbOeKDx1xW8MROJlKhBnVxxQzDMcgI9RUF3pHno2JCrdmU4NYEcrxuCpII6YOK07bW5Vwsq7x6jg10wxUXpIwlQa1iZ39hTwq7T2QuWzwy7SWHrg45qsZLNpTDMssTjja0P/1q7CC9iuVzGefQ0y7tLS/QJdQpIB0J6j6HtXQnfWJlfW0jkjBGpCIsqOegjcrn8OlRo0iScGcDoRIOK0b3wvPEN1hcO8ec+Sz4x9D0rNbT9Vt1Erx3BA+8ruSD9RyKLvsVo+ojTRPKEmjZR2l25UH39KR0jkBJjlkXGN1u2c/8B/8A11HFaPIfM2NFz/F0/P0+tSta+UDvg69HR8E/iKd7iM+WO0aUhZZYX7B48H+lOjEkLb4LpGIGMOnA/OrhdJUWN5pSVOVaQZI9s96qu80cvyFJA3JKpj9RU8qWo+Z7F75gpGCR1weKapAIXOSRyOnvSH7pGCBjIyOc0uO+3A56968c9EXdhdwIIPvx+NCgYwByOwGaQZJOfmyO646f5/SkJ3MwIyAPTk0gHZGTgEde3X0pcBgGbPPZsflQCAQN3A6Z6U3H7vIznOOO5pgOfj0IHQnj8qauMcMMnqfX0yacX43Mx5HQelJlgQCudxwQaAFLE9B7+n+f/rUnJB4PT0HNOGWyST7n+dNYgvkKBjr2NACMMkDnrjqRSnJIOeoyKUnGct+HftSEgDA4PTBPT/69AAAeBn1xkUvI7e+DiggEcHOB0WlHIOBgHnmgBNw5xxntQTljnBJ7YzRn1z7e1NHHA7e1MQpZsjA56dM05Tgdhn0poPB+Vhx2NODDOccigBx5bIwMdOe9N5B74/OjPdc5PTA60uTzyMe9AC/kD7GlAB59qbu+nvS9+OOOcUAKTjp6+tJnnv707rgjOCeO9GAF/nSATqvK4NGQ2B19sUoGMD06Um3sT+PX60ALjjIwT3xS9OOx7U3PHBAx+FL/AA9+vb+lAC5B6DHvScZyTgUHkevf2ozyee1ACkgen0oHB9u1GQfTn0FB57k/oKBCYAAz19zThngd+nTmkyucFvakB6k96YD4riSN9ysQR3rZttVWbakyhW9QeDWHuwM9/TvS7sAdfrWlOrKD0InTjLc6ks6L8rEr2pguyDjd09RWRaao0OI5ssnvyRWsghuVDxSA5r0adWM0cU6coMrXNhYXr+YytFKerxNjP1HSq0ujwn/U3p3f3XUYNaXksPTFV7qFpIypX8R2raxmYU9jJbnBQBc/eQ4qs8K7gViCuP4k4P6VqC5lh/cyTLk9Aw61EwjZT5kbI3qp4oKM4EqWHBz0PQnvj8qXcoJ4yT1HTPt3qPzCOOOevI/T/PalVcJkBCAOcNivDPUJc7hhzz06cD8qbuGzoDj1FIrAqCAV5457fSkG7gA8dxn8uaQDvlJbPToOP8+9KMknDKQOAc9+9RL8oUHGMcAingrgA/Ln5egH+f8APrTAfkcHP49zSbcOSeM+h4P+cUjA46KD7f8A1qUbP4TjuMN/TrQAoJAwQDk0mY1BG9dxB4OQaczbeDkYHQZpNwKkbgQc46euKAFHI+VueoOM/wCelKCx6fXsB1pBxjnGfxpMgtkL7nPH0NADiTnOOTxgnpSc4Ug5ORS5yQCNwPegHc+MZ3Htxx9aBAPY59RmkKh0XjH0NIGBAJGD6YzS8qfX8OKBiDOOABjpnt/jThnoOvr2pB36Ag9fSlGCBgkgn/PFMQnc8c56jvS55zjA/KjZlSCOe/HBpuDggnnP6f0oAcGweBnH9aFBxge3HUUnBUE9DxjOMUoILcY7Zye9AD1J65Az1xRwe/TpxTeoOcU/jqRnpzQAgz1+UDH50ue2BzSLnPTkHt2pemOBjv3zQAoPfjpjgUcAnj8aBkdPxxwKQHK7QPpgcGgBcAAEnb79KMH0b1wOtGQwOOoHP+fxpATkZH4YAx+tACgNkDjGeoNJjjuSTjIoLDqQTnoc5pSAQSenTp60CAZGeevGPWjnqMn6UoAPHqeR/wDWppwB82eeccUALkgnPY9qTdg80EBeR19cc0YYEZ59x25oAAcgkN+RqSOZopN8ZI9e1RY446e4oIKn+IfXg002tgaTN+x1RZUEcp2v2PrWgwB6nIrjwcHlunqTmtWx1VowEnO5fXuK7KOJ6SOWpQ6xNSazhuAQQp9QRmsS8sXttzRZI/u5yD9K2y6MoZD16EVG53KQ43L64rvi09Tld0cj83GXcEDk8YJ9P8+lOdEYkkDjj7vJB/z0psSjhgOAc8Hj6/pQMEb22gtxhT+FeEesOA2lQevXPHb1/WjaCNuQPTj/AD1prAGQ4xz91u+Pr+NA24UZ5Ixjn6c/SgB21sEMOM+mO3Wl3EHkZz6A8nj+v9KRSOpzgdeT1pcKAQeDgk4PB4PpQA3f8u1cDAOMcY/ClVt2CCregVs/ypQWbLNk445Jx/kU18sxY7iCckEZ6+lACjJfrxjPPGP1/H8aVsfeYbjgZHr+NIpySRyAO46/4nrT8EcjPPUkYH05+lJgJu5PBBOTg9/x79qToSCvPJwBzTjtJ+Y5OAOn1xUZxuzgEA9+1NAPBJYnknGe+RTuvf7vAVajVn+VcjgclQcflzinrnGD8pzx+OKAG465HHTnJpeCcr1zyc9PxoOevTj34oI+8Ac84+v9PegBQcsAePXpxSkZweuOPw+lM3DAIzgDggZpQfrk0ASggHJJx60mSOCeM44FR5bdgHaxHXGMU4+pGB168n0FMBCASMjNGSSdzHqO/wDP8KO304xSg543Z560CDLNyPTryaeCCDk9OPWmk+gxzzilBb+nB/KgAYcAZOe3FKME9QCp9aaRkZBzxzk9aUHBGT34weKAHA8lh17kjpxQcEDpg54xTM4I2nA55zTx93HAA7kf5xQAgzkAeuSKdznnH50wZI6g9Me1OHTkcnnI9aAFx8oIwO+eMUpYYXIzzwBmmg52nBGc9D0pM9sgfQ0AOycdPakz7g9qPukj8O9AbAyMH6c8f40AO7E8fUUFe5596RskE8emOtJzj73A9qBBkDO4gAevajt1HT0oIOM55HYtSZyxPXnI70AL0HH44pOV6kZoB4OevFIFGBxgjsTTQmaFhMwk2bgFathTxjJrmMsjZzjB7Vt2Fz5w5OCBzmuzC1Pss5q8PtI//9k=",
"path": "images/3pts_ADE_train_00003105.jpg"
} |
depth_point_192 | images/5pts_ADE_train_00004070.jpg | ADE_train_00004070.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 171 y = 213),Point B is located at (x = 321 y = 124),Point C is located at (x = 38 y = 191),Point D is located at (x = 106 y = 114),Point E is located at (x = 104 y = 223).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_25><DEPTH_44><DEPTH_64><DEPTH_36><DEPTH_74><DEPTH_29><DEPTH_49><DEPTH_59><DEPTH_70><DEPTH_59><DEPTH_44><DEPTH_64><DEPTH_64><DEPTH_36><DEPTH_74><DEPTH_49><DEPTH_49><DEPTH_59><DEPTH_67><DEPTH_59><DEPTH_64><DEPTH_36><DEPTH_36><DEPTH_29><DEPTH_49><DEPTH_74><DEPTH_11><DEPTH_70><DEPTH_70><DEPTH_59><DEPTH_64><DEPTH_29><DEPTH_49><DEPTH_38><DEPTH_3><DEPTH_49><DEPTH_35><DEPTH_67><DEPTH_70><DEPTH_70><DEPTH_74><DEPTH_44><DEPTH_58><DEPTH_72><DEPTH_70><DEPTH_31><DEPTH_49><DEPTH_11><DEPTH_29><DEPTH_67><DEPTH_49><DEPTH_36><DEPTH_74><DEPTH_74><DEPTH_64><DEPTH_64><DEPTH_67><DEPTH_5><DEPTH_63><DEPTH_5><DEPTH_78><DEPTH_0><DEPTH_19><DEPTH_25><DEPTH_44><DEPTH_66><DEPTH_32><DEPTH_63><DEPTH_11><DEPTH_59><DEPTH_64><DEPTH_57><DEPTH_94><DEPTH_0><DEPTH_23><DEPTH_1><DEPTH_39><DEPTH_121><DEPTH_54><DEPTH_49><DEPTH_38><DEPTH_0><DEPTH_42><DEPTH_98><DEPTH_42><DEPTH_94><DEPTH_1><DEPTH_2><DEPTH_81><DEPTH_29><DEPTH_29><DEPTH_29><DEPTH_42><DEPTH_98><DEPTH_1><DEPTH_19><DEPTH_44><DEPTH_74><DEPTH_49><DEPTH_64><DEPTH_END><DEPTH_END>. Since point E has a higher pixel value on the depth map, the answer is that point E is closer to the camera. | E | long | 5 | [
"B",
"D",
"C",
"A",
"E"
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"path": "images/5pts_ADE_train_00004070.jpg"
} |
depth_point_193 | images/3pts_ADE_train_00015836.jpg | ADE_train_00015836.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 177 y = 138),Point B is located at (x = 144 y = 147),Point C is located at (x = 15 y = 143).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_30><DEPTH_70><DEPTH_11><DEPTH_59><DEPTH_59><DEPTH_59><DEPTH_60><DEPTH_59><DEPTH_59><DEPTH_67><DEPTH_20><DEPTH_38><DEPTH_3><DEPTH_40><DEPTH_29><DEPTH_74><DEPTH_29><DEPTH_69><DEPTH_74><DEPTH_31><DEPTH_5><DEPTH_14><DEPTH_70><DEPTH_70><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_20><DEPTH_20><DEPTH_81><DEPTH_76><DEPTH_84><DEPTH_81><DEPTH_54><DEPTH_58><DEPTH_68><DEPTH_53><DEPTH_30><DEPTH_46><DEPTH_0><DEPTH_19><DEPTH_2><DEPTH_68><DEPTH_80><DEPTH_80><DEPTH_19><DEPTH_40><DEPTH_54><DEPTH_46><DEPTH_40><DEPTH_44><DEPTH_9><DEPTH_25><DEPTH_44><DEPTH_50><DEPTH_2><DEPTH_24><DEPTH_45><DEPTH_94><DEPTH_50><DEPTH_45><DEPTH_19><DEPTH_76><DEPTH_68><DEPTH_78><DEPTH_50><DEPTH_72><DEPTH_55><DEPTH_12><DEPTH_12><DEPTH_53><DEPTH_31><DEPTH_25><DEPTH_32><DEPTH_1><DEPTH_94><DEPTH_40><DEPTH_33><DEPTH_55><DEPTH_94><DEPTH_41><DEPTH_42><DEPTH_25><DEPTH_8><DEPTH_9><DEPTH_60><DEPTH_71><DEPTH_98><DEPTH_119><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 3 | [
"A",
"C",
"B"
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"path": "images/3pts_ADE_train_00015836.jpg"
} |
depth_point_194 | images/3pts_ADE_train_00005369.jpg | ADE_train_00005369.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 18 y = 204),Point B is located at (x = 318 y = 135),Point C is located at (x = 293 y = 195).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_67><DEPTH_13><DEPTH_7><DEPTH_6><DEPTH_17><DEPTH_17><DEPTH_5><DEPTH_70><DEPTH_17><DEPTH_5><DEPTH_6><DEPTH_80><DEPTH_12><DEPTH_61><DEPTH_80><DEPTH_85><DEPTH_35><DEPTH_6><DEPTH_5><DEPTH_13><DEPTH_41><DEPTH_12><DEPTH_41><DEPTH_1><DEPTH_16><DEPTH_98><DEPTH_119><DEPTH_63><DEPTH_6><DEPTH_58><DEPTH_24><DEPTH_76><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_19><DEPTH_78><DEPTH_1><DEPTH_78><DEPTH_13><DEPTH_19><DEPTH_58><DEPTH_45><DEPTH_64><DEPTH_44><DEPTH_1><DEPTH_0><DEPTH_74><DEPTH_69><DEPTH_86><DEPTH_50><DEPTH_74><DEPTH_45><DEPTH_50><DEPTH_41><DEPTH_0><DEPTH_41><DEPTH_45><DEPTH_69><DEPTH_19><DEPTH_50><DEPTH_33><DEPTH_2><DEPTH_32><DEPTH_78><DEPTH_0><DEPTH_66><DEPTH_72><DEPTH_84><DEPTH_25><DEPTH_57><DEPTH_94><DEPTH_78><DEPTH_32><DEPTH_16><DEPTH_63><DEPTH_82><DEPTH_39><DEPTH_58><DEPTH_78><DEPTH_0><DEPTH_44><DEPTH_44><DEPTH_58><DEPTH_33><DEPTH_78><DEPTH_19><DEPTH_9><DEPTH_41><DEPTH_16><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_16><DEPTH_57><DEPTH_94><DEPTH_94><DEPTH_42><DEPTH_94><DEPTH_END><DEPTH_END>. Since point A has a higher pixel value on the depth map, the answer is that point A is closer to the camera. | A | long | 3 | [
"B",
"C",
"A"
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",
"path": "images/3pts_ADE_train_00005369.jpg"
} |
depth_point_195 | images/5pts_ADE_train_00012034.jpg | ADE_train_00012034.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 215 y = 170),Point B is located at (x = 259 y = 214),Point C is located at (x = 242 y = 199),Point D is located at (x = 258 y = 133),Point E is located at (x = 53 y = 224).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_43><DEPTH_85><DEPTH_78><DEPTH_0><DEPTH_3><DEPTH_3><DEPTH_3><DEPTH_31><DEPTH_31><DEPTH_3><DEPTH_83><DEPTH_74><DEPTH_32><DEPTH_41><DEPTH_31><DEPTH_49><DEPTH_59><DEPTH_3><DEPTH_31><DEPTH_67><DEPTH_11><DEPTH_72><DEPTH_41><DEPTH_0><DEPTH_59><DEPTH_31><DEPTH_29><DEPTH_3><DEPTH_59><DEPTH_70><DEPTH_58><DEPTH_63><DEPTH_2><DEPTH_2><DEPTH_31><DEPTH_49><DEPTH_31><DEPTH_3><DEPTH_67><DEPTH_3><DEPTH_84><DEPTH_29><DEPTH_41><DEPTH_2><DEPTH_31><DEPTH_70><DEPTH_11><DEPTH_70><DEPTH_11><DEPTH_36><DEPTH_74><DEPTH_19><DEPTH_44><DEPTH_41><DEPTH_35><DEPTH_80><DEPTH_6><DEPTH_43><DEPTH_50><DEPTH_30><DEPTH_68><DEPTH_12><DEPTH_76><DEPTH_1><DEPTH_17><DEPTH_85><DEPTH_10><DEPTH_27><DEPTH_98><DEPTH_29><DEPTH_76><DEPTH_24><DEPTH_45><DEPTH_16><DEPTH_26><DEPTH_8><DEPTH_98><DEPTH_42><DEPTH_42><DEPTH_66><DEPTH_44><DEPTH_81><DEPTH_2><DEPTH_1><DEPTH_27><DEPTH_98><DEPTH_94><DEPTH_121><DEPTH_94><DEPTH_32><DEPTH_2><DEPTH_1><DEPTH_57><DEPTH_16><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 5 | [
"E",
"A",
"D",
"B",
"C"
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"path": "images/5pts_ADE_train_00012034.jpg"
} |
depth_point_196 | images/3pts_ADE_train_00006378.jpg | ADE_train_00006378.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 174 y = 171),Point B is located at (x = 320 y = 215),Point C is located at (x = 140 y = 189).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_17><DEPTH_5><DEPTH_5><DEPTH_5><DEPTH_17><DEPTH_61><DEPTH_23><DEPTH_19><DEPTH_55><DEPTH_7><DEPTH_5><DEPTH_67><DEPTH_67><DEPTH_5><DEPTH_20><DEPTH_12><DEPTH_45><DEPTH_41><DEPTH_14><DEPTH_31><DEPTH_67><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_22><DEPTH_1><DEPTH_41><DEPTH_2><DEPTH_25><DEPTH_33><DEPTH_5><DEPTH_5><DEPTH_67><DEPTH_17><DEPTH_67><DEPTH_23><DEPTH_2><DEPTH_41><DEPTH_32><DEPTH_63><DEPTH_30><DEPTH_41><DEPTH_57><DEPTH_81><DEPTH_9><DEPTH_0><DEPTH_78><DEPTH_61><DEPTH_32><DEPTH_42><DEPTH_1><DEPTH_0><DEPTH_25><DEPTH_66><DEPTH_25><DEPTH_39><DEPTH_50><DEPTH_57><DEPTH_94><DEPTH_16><DEPTH_25><DEPTH_19><DEPTH_19><DEPTH_25><DEPTH_25><DEPTH_33><DEPTH_94><DEPTH_94><DEPTH_94><DEPTH_16><DEPTH_2><DEPTH_41><DEPTH_2><DEPTH_41><DEPTH_64><DEPTH_1><DEPTH_14><DEPTH_16><DEPTH_42><DEPTH_23><DEPTH_19><DEPTH_19><DEPTH_25><DEPTH_19><DEPTH_82><DEPTH_41><DEPTH_1><DEPTH_94><DEPTH_16><DEPTH_98><DEPTH_36><DEPTH_74><DEPTH_74><DEPTH_29><DEPTH_74><DEPTH_31><DEPTH_19><DEPTH_25><DEPTH_32><DEPTH_14><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 3 | [
"C",
"A",
"B"
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",
"path": "images/3pts_ADE_train_00006378.jpg"
} |
depth_point_197 | images/4pts_ADE_train_00012873.jpg | ADE_train_00012873.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 145 y = 220),Point B is located at (x = 109 y = 109),Point C is located at (x = 292 y = 202),Point D is located at (x = 49 y = 143).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_70><DEPTH_40><DEPTH_74><DEPTH_64><DEPTH_1><DEPTH_19><DEPTH_0><DEPTH_1><DEPTH_57><DEPTH_42><DEPTH_70><DEPTH_69><DEPTH_74><DEPTH_36><DEPTH_1><DEPTH_25><DEPTH_41><DEPTH_1><DEPTH_1><DEPTH_94><DEPTH_59><DEPTH_69><DEPTH_74><DEPTH_36><DEPTH_1><DEPTH_44><DEPTH_2><DEPTH_66><DEPTH_94><DEPTH_94><DEPTH_59><DEPTH_69><DEPTH_74><DEPTH_64><DEPTH_1><DEPTH_25><DEPTH_41><DEPTH_73><DEPTH_39><DEPTH_16><DEPTH_59><DEPTH_69><DEPTH_74><DEPTH_64><DEPTH_0><DEPTH_45><DEPTH_0><DEPTH_73><DEPTH_61><DEPTH_42><DEPTH_70><DEPTH_74><DEPTH_74><DEPTH_64><DEPTH_1><DEPTH_19><DEPTH_1><DEPTH_73><DEPTH_61><DEPTH_42><DEPTH_67><DEPTH_59><DEPTH_49><DEPTH_76><DEPTH_1><DEPTH_2><DEPTH_0><DEPTH_75><DEPTH_68><DEPTH_42><DEPTH_74><DEPTH_74><DEPTH_11><DEPTH_85><DEPTH_57><DEPTH_25><DEPTH_19><DEPTH_60><DEPTH_27><DEPTH_42><DEPTH_19><DEPTH_19><DEPTH_78><DEPTH_36><DEPTH_72><DEPTH_44><DEPTH_2><DEPTH_33><DEPTH_41><DEPTH_16><DEPTH_16><DEPTH_94><DEPTH_57><DEPTH_57><DEPTH_0><DEPTH_1><DEPTH_1><DEPTH_39><DEPTH_57><DEPTH_57><DEPTH_END><DEPTH_END>. Since point C has a higher pixel value on the depth map, the answer is that point C is closer to the camera. | C | long | 4 | [
"D",
"B",
"A",
"C"
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M9Khe53YwxAKk1yl1rk987Czgdscbm4AFZ07kpm+vyw/54wnP/wBb+dUqTe4uZI6LUfEVvCoRZFdx1VOef5VkSalqdwuIUS1iOSHfgn6Z/oKyW1OOA4sbYKR/Gw3N+f8A+qqc1xPcOWnlJJPTNaxpJEObZfke0VvMnnkupfrgf5/KnWuoPNewxRxLFCWGVUYzWQTj7o/E1Y05iNStyWOd4q7aEnWeEl/0Jmx0lcE/jXWRj930xXM+EMixuFPa5cfrXTD7p/Sud/G2arYaynFVmUbjk9KsNk1AU5yTVzEhwxgUjc44pCMHBOcU7GaiKGy14miuYrbTLiOUiKMKoGOhPX+Qrc8OkHR4JGAJd2dj75xVzWLIXHhyUkLujZCMj0BqHR2hg8PwPKVRFjLMx4AGTWkXdsl6IvahbNdeHJYYk3S+YHx6DmvKZIoL2TUY433pCmAVPAbvWzq/iO78Qu+n6U72+nfcmuOhkGeg9qrQ2kFjHexQIAixY+px3qW+VvuOKuaHh1F/4Sm2AA/4+VYY9ojT/HLu3ih02gqIk5zTfCQMvi+3IHAG78ov/r1L4xGfFdwT2WMf+O06C/er0FW+AuXkEi+HNFZEBYpnH1JPWmTSGO3mfP8Aq4mYfXHH64rXvQB4e0VDx+4Xp/u//Xrn7q8t7aOaGZiGuImiiAGctxXPvUa8zX7JV1bSRZfD+eUAZjjST/eZmB/liuE8IaheWt5eC1lCRywFLgYB3r6c++K9P1otN4NntCeCCucekfH8q8t8LQlpL1+fkjU5/OtqMvck2RUXvJINwSNh3JwKrSAFelS8luuT6Uky7OpBY9h2rdGJjthLpx/tVVZgZCfrU0p/0yT61TbO/Oe9bIRbsF3O57DFX3HH4VS03rJ+FXXPBHtUyA6P4cxK2pXL4Hyp/UV6aVJQV5z8NFzPe8dv6ivTI0B+90rOfxFLY6DRV26cg9Sc/nWiw6cVV0pQunp+P86u5BGK45/EzVPQjk3FMdhQina69RjgVK2NhpYlzJwe1Q9rDT1OE1xCNXkc85Y/h6Uzy1yjAe9W9SRzrFwWX92pI6d81Vb5QexxzTjorlS1ZHKAqE96z1cCR8H0FQ6prdpZF0kmBbrsHJrmpNZv7hSbaARxn/lrKcD/AD+dVGLkJtI6ma7jiO55FVV6knFY194rtkYR2oa4kHQIOPzrl7maIsXurqS7fP3VOEH+fwqtJqEqrthVbdP9ngn8eprWNJdSHPsad7qF/dAm5mjs4v7o+9/j/KslrqygYmOJriT+/Kf6f45qm28kFiWHqxqMlQOcn2UVvFJbENsnmv7i5AV5NiD+BeAPwFQ7QOev1qZLaeRGKxmNQM8qeauQaNMy5MTy4IB2HgZ+nWqsIzNxc7VGT6AVIbZ1RnfCBV3EHrj6VpRwxKskcqOCm4fL8vYEcfj3qnexEW0Y3sY3DbWbP3Rzj888UJAZ/nAHhPxNWLFy1/aE5B3jr+FZ2/J56VasW/0y3wc/vP8ACqasiUd/4RGba9B/hu34/KulPB4rmPCTYOog9rt+K6k8nOa5WveZsnoRvyDUWOPrUj8OabjApsBjL82aKcTSAYHNJDO31OaGHQbv7RIsUYG4ux4HBFeaS3V74iiithut9IhAAUcGbHc+1PvdQu/FN4s15mGyVsw2mfve7VrGAvZkJ8qAEccYpSlyt23Elfcha3QacIrRVQIwAx2qsm+VbolCC77QvfHAFF1rcWj3tpaNCskLkeec/MuehH05NVNaa5t9RktIWxG9w0cny53D69vWpjBv5jctTpPBbW58XrCMtLHFJIWGNhBAA57msnW/EbS69ck6bFcwxOUllIIcgcZAzgYAHB6ipvh3F9n1mAgY/wBGZevrJioNRwNTveAd0759+TW9KKc7dkZ1G1FNnb67HHFZaWibdogyCowCNq1yV9CZAgGPvDJxyBmuw8Spth08f3YAP0Wub8sSOoPTOa4ea0ro6LXQ/VImOhFVYn/WFiT6KRXnPhOLFlqz+iIP0Nd74g1G303SVM5O1/MXpnORXD+HHSLRNZfIxuVQQevFa0r+zlcmduZGYfu4Ax6moJGzipGJNQyAqQDwa60jnMqb/j5b61XAyHqyxBnbj+I1EFAiY++K2RJLp44kPvVlz8pqvY/6tv8AeqxIuUPoBSe4zsfhgv76/Psv869M2kooH415x8L1yl83f5R+pr0kHCCsZ6uxUdjotNG7Tolx1z/Ory5RvU46VT03P2CIdiD/ADq7tHB5rknuaIYelOhA3Kec4zTW7j2p8H3+/wCNSM5jUij3U5I5Lk4HesqaNZMRMBtdgp+hPNbl9GBNLgAEOeKyGTdLGO+8fzpvSKK6nmeoQ/YIEuba0zbzM3lXEh3Hgkc+hrCmuXlJaSV3Y++a9L0nTDr3g6XRwFLzxt5Rbs2SR+orhn8PfY0i89jubOUH8OCwIP8A3ya6IST0ZMlbUxiwHCjn26mm7JNpKrjaMknrj6da34ILYeYrKFVQQdpGeELdvcfrVRg8bvEYIwrp8jhstjuD265zWqRm2Uv7NkdSZJCmMfeGM+1Vr9ks7UJEArE43A8n8av3V0sMW+UlyeFQnk8d/QVhzSSXMoLnOPuqOiiqTERefOBnzHB+tXYdT1CNRtmbHbJ6VAsYByOT61KoHoT75xRcLGjZ+II0mLX1hDcF02FnHOMY6j+ualv0tbrT2urNUSSHDOm3JI6E5z+dZhiVx8yn86Z5clv88LHAGCtCaBpmacdcGrVi226tzxxIOlVX689fap7Q4uIT28wYrR7Eo9D8JH/SdUXHP2o11m3jjiuT8KbRqWrAdBcZH4iuqZsYrkXxM16DG96jY8kVN7moyBg07AMAJ7UFTjrTxnApGXigZVsIHlmWUx/Uf3Qa37eA+QIjgsSa5eN7geMbLaGFusq27jPDb+o/z6V1wkS2h86TPlo+4nHOAe1YTWi8y0zjNe0zOmX2rsudlwFB9FB2/qf5VbvJIrqd7lHV4zd7ldehFaerss/gC+jTBWTLr9Msw/lXOR5i0OJF9yPwzVRd18xNWZ0fgxQNbhA5AhAH4yZ/pXOatJJ/b12oc4N04xgf3jXQeBvn1mJT18uIfmWNc3cBpdfmA6teN193rahpNkVNkeneKJg9xaxAYxF0/HH9KwguJlX36VreKCP7RjA6iIdP95qyosfaYyelcF3odBleLrE3GhEswIjjkYfXpXDaJas/h29YuRHHNkgfxHaMV33iKY/8I7PzkG3cj8TXF6SQnhK+JyN0x4/Kuqk37P5mM/iMnOOtQyZ5JqYAkcCo3Qg4fgn3rpMTHkOLlxjHJpba0vNQnjsrGON5pFkkPmSLGoVELsSzEAAKGPJ7VZNoZpmC5J3EfSrekSWGj+IIHvJ4hA1peRO0wcx7pLd0UN5fzYLMAdvP0rVElBLS+0+7FteRRKJYvPjeORZFdc7cqykqRkEcHqCO1WXU/Z3bGAAeafqeqabLqNiLGODy7bTxA62xlMO/zGb92JfnAwwJz/FuPeqT3MkwYbQq4+v/AOqhgeg/DCPFvennJK5yP96vQhwcV598MVJt9Qcknc6ck59a9BUAsKwm/eLWx1Gm82EOM/d49+at4JA9BRpUKtptsDwdmeKtPEELHv1Nccm9zVIpvUqADaQckjnHrTJVwS1OQMpGTU9gOf1PcbqUAYO4istUP2iH2kX+da2on/T5h/tms9h/pEXpvX+daSXu3GtzG8Dts+wDPJJx+tcdrsg+0YYLwz9TjPzy/n/Q4rrfBMg36evUjP8A7NXEeIZJVvGCBj/rWGIy+cSSA/T7w/OnS1qsqfwGVKwd440DAuwKlUwCAACpz7NxTryRbRGlklV5Om3PX/61XbKNhBJJPMXVcsWYDgYwcfXFcxqN0b69aQAiMYCqe1dbZgio8j3Exkflm6e1OChVPp3NSrFjr1PU0HAG49B0FFwsN+VVy3C+nrTPnlPGUT1p2MnfJ07Co5JuOThRQBMsDj7k9PzcxdVEi+1ZMmoMpxHjHqafFq8yHlQRTcWF0TXIQvvQbSeqnsaigYCaNf8AbBq4l1bX42n93L2zVFAUuUBGCGFVHazJZ6L4WONW1YdMyIf0NdaOetcf4YH/ABPdTHr5Z/SuyIrk+2zVbCf0php56Uz0qxBimt0pxPFMc8YFMBbpWs9KnvUUNdQ6gJUDdMiTp9MCtOUs1uSOC2SD6VjJIJdLhtuSnngHPfk1su37vA5wK5ZP8zUyr0hfCkkeGGQRt/4Cf8apWumXF3ZW6JHhSCSzcDByKsa+88eh24i2jMg8wkdFwM1zV94tvbu3h0/TsxW0YWISsuGb3x2/GtqUeZXIqOzO60SGx0PUN/2nzWWNVZwwGHGemfY1owr4T+1+fJaRNLv3l2cZznOevrXnGi6QBFN/aK7bgy4Mkqhjj15rUj0+3aYo81oQjAYEIG/nHHHpVN2bsyVqkdp4injudSjmiIMLwrtYEEHBOen1rLTIlTg85I/KojBDahIoVCIBnAGOST/9atLRx51+epAibJ9OMVyta6GyOa15lbQZkGcrbmuXs8DwXMR/FcN/MV6bqPhe2uDc29xNKiMu3Ckbv/rfjXC65b6doHh46d9tjefzCwVTywznOPWummvdt5mU3qczBuZ8JxgHJqOQxRE733YznB/rVFruaYlIEIB6k0q2DMQ1xIT7V06Ix1Yx75QCkS7geTjgfnUDWxvSDMm4jOOwFacdtFF2HHc1Yykcce2JX3jJOOvsPepnV5dkdWGwvtuZuVkt3q93ZaL+vnZPKh0y2h+Yr83Q8nFTT7Ft2CgDjtU9yoSZ0U8A8Y/lVafaIWI60RlzJMyrUnSqSpy3Ta+4734YA/2ZekjH7xcfka75PvZ5rhvhpxo9wfWQfyruFJFRP4iVsdxpRB063xxhBVubHX1FZ+mSt/Z0AwAPLGOKsFyRgkYrmk+iLRBNnP4VIpO0AjnjrUMowvJ7dKsRcnDZJArPsUc3qYC6hLznLE/rVE83MX++v86t6gQb645yd5x+dVQP9JhPow/nW017gl8RgeDo9v8AZb/3uT+ZrjNaleS6+yqWy80uPTmQ5/lXe+DlT7HpbDsvf/gVcfKqTaqNy827zv05JaUgDP4GppfxGy56wB/D73nh7VriOQxRWsQYDH3yBwvtxn8xXBxW+0ZYc/1r6E0zTUg8JwwyJuNz+8lBPUHp+m2vF9Z05tL1Ce0kGDExBx6VrTqczaJlGyTMR1529upqIgHLt90dBVhlPTu3JqldSfNtB4Wt0jIhnm6sTgCsyadpT6L6UtxMZGwPuioa0irEtiUtFFUIBwcg81bjcuY2Y5OeTVSrllGJpI4y6xgty7ZwB68UAei+F/8AkYdTA/55xH9K7IdM55rjPDItx4guGgu/PEturH93t2kHGOtdjjDYyTXE0+dmq2EdsHFMGSM4NSMOnY0hNU2kCEP0qNs9Kex4pjfdxSbGI7mKO0i8s4e4Iz6cZzWsXVbdxgcrxnrmq05TbAAQWDk8fhTmBYbcHLcKPWuXc0ehQ1gg6GWXqP8AEVjKlragukaq82wPxu+bHUenf861tVQppskO4ZUHk8AfN71x93q1vEzHcJ2bGRGSsZwMDLdW/CuiitDOo9TstEs59V80qpDecQWLg4A9+n51o23hPUIJfNkKOoccJySMjqP8K4/QvEerXERtrOE4XkLFEqgD8a3v7U8VRIWW2uDj0VD/ACNNxs2Cexzt18TtBnvfMS11ERYAAMaZ6f79bFj8QdNgsRd2EFzJNKrKEdQu3nHzHJA6eprmNKOqiw8Hl/tf/CNCyk/tHdu+y+X9ruPM3fw7tuMd87cc4rT8FWNq/hCwnMStM3mZY8kfOw/CrqQhTV7Ci5SZJNqXiLxDLs8w2sL9o8rx/vHn8gKqat4btdM0zezmWZ3wxIwD/U/ia6tZlgGFHze/asTxdIW0+Ek8F+lYKrJySWhbgkmcgFVUAUAKPSo5Hz06CntymBULL8vNdSMbjGfjJp0d1JHGVWQgelRP8xVFxk+vao5VkhbY4GM43L0NW4qS1RVOtUpS5qcmn5OxLvLZJPPcmmT/ADWzGlUgimXB/wBHYUJEN33PSPhkudBnP/TYD/x0V2h4PFcf8Mxjw5KT3n/9lFdjyT04rKfxFLY6zT33WduozwgH6VcA9TVPT1K2kRPTYuD+FWyQCozXLK7ZoiG4Ulc9qltm3szEj5TgYpk2WQ470+GLYzjs3esxnOaiQdRlwOdxz+dU2bE8f++v86nvGZdQuAf75A+maqyEFoz0wwP61vP4RR+Io+D1zZ6VgH7gP/oVcrbQtJdXW3AM1y0WT2+dv6kV0Xgm7i8nS4i4yY8Dn/erG0V0l1GFdwOdRYkf9tB/9es43UpMt2aR6pcQ7Xgt1wFVVQD9P6CvKPirYiDxGkwAC3MKnj1HB/kK9WjuVutWfZkqh4P4cfyNcb8WrRH0/TrjH7xJWTPsQT/Sow+kiqmqPGJvl3sOw4rDvH2xn1PFb12MRkerVzl+cyqvpzXpxOVlLFJTsUhrQkSiiigAq1A+VCAYKnrVWp7c4YigDt/AuBrFztH/ACzHXvzXoZP70jpivPPAzf8AE6myf+WX9a9D/jJrml8TLWw7vTXPy5o3EdKAfl7ZqWikRnOcYppBweaezc01iOaLDJpl23QUkgqT/Or6Zlki2xnKEHcTgYrN1jxbYTTFNMs/tUnTKLx+f+FZ0tvrWqbWv7oWtuVz5MPBA9P84rHkUUnLQfM3saPjXVdIj0i5tkeM3TRhQq8kHPJwOn415bbklctHjn7zjJNdvd6XY2Wi3bxQZfb99+TnI5rj3/eOeOM4ranJWsiJJ31JIHVZ0baXweeAePp0r0PSNKs7tI7pLaVI/vfP5WMjsdvIrjtK0z7ZKFmuBDH2CLl39gK7e2aHQ9J2W9iVkeURIsjAPKx/vEZx3PNY15WR0YenKpNQgtWcG/wn2Ej+284/6df/ALOus0bTP7E0W307z/O8rd+827c5Yt0yfWr32q7S6W1vkhDyKxjeEnBIxkYPOcc5qpcOIi5ZsBQSx64H+NZ+1nU0kzSth/YNX6q6ad01/wAOhCVkdgp6HrWR4nO6xtwT/FWpo2o2Ouyto8kEVlqkRYWs0Z+Wfvtf1Pv/APqrH8SZNrAHBDhiGU9iOorXkamjm5rxZzR9jxUEjelTOeBVSdikTEfe7fWupIxuVZm3ybRyAeR/ePp9BU8Eh3CKXmM8E1BbxHAI4LdPYVHPdENmL/Vrx9atN30EXCPJlaM84PB9R2qKbJjPoaHk3FGHdc0yZj5Zp9RHqvw2GPDDcZzOf/QRXXZOTXJ/Dhf+KVB/6bN/IV1x69Kwl8TNFsddYqDZQ7v7g6fSpCFDAgGm2sfl20WW/gH8qmHyqcjFczZYxx6E9KsIMkc1BICpAPepYz++C1nJWGcjdkvqM5PXzG/nWfqKSSQNFE4SR1wjEZAY9DjvWlepsvpvVnY/qapXKeY8QBwQ4H6it5fCJbnK6HpetNGtpdXywPHK0RWNvmXb0IA4xWdpWharDqr2j3CSyJMWEilgT34AHHNd9p1lbpf3Eixr5n9oSDeeT908Z9Oao+HbeE+ObiUplxITk/7pqHWdm/Iv2exv6CJVuWVgo2qBkZ5OGySD06fzql8SLc3HhnzTjMEqN+e4f1Fb8MKQ6lKIhgFmJ7/w5/mT+dZHj7d/wiV3/vRf+hmsacm2maSSPn69YjIx/Ea5y95ufwrpb8fMf941zl4M3B+lepDY5JblPFJjNONArQkYRg0UrdaSgAqWD/WfhUdSQf6z8KAOz8Ef8h2Uf9Mv6ivRyfavN/BJx4hfP/PE/wAxXo7da5pfGy1sA4Oe9NdutL2NI460hkbHIoPK0dOaM8cUwL+g2EFzEIkAiTj7q8nmugu9Ogt9MmEEReZhgE8seRVTw5YiKzWVjlz02tkY9eK09XvhpunzXIUFkX5VP8THgD865nvY0PPNZWe5sns7aIu7Ph8fwgGsqy8JSyfNc3CxjrtQZP510Nvffb9PN0Qq3MUv2e4KLtD8ZR8dsgEUw3GbWRA37xhsHrzxQ5Sh7qGknqzC1eKKPTnVQRHEv7hc8jnO4+5/wFXvDt7JrmnS2l27F4SrCVT84I6EHseMZqe8t4m0W5nkXexj8qIY/ixyfw/rWN8PnA1S+gZuWtg/4hh/jVaSpyQ4TnTqKcXZnXWtg4uPtN3ctczKpVCUCqoPoB396r3enSXsghjbbvLSE+w+Uf8Asx/AVqyELGcHnFW9ESOa7fOMiCLGf9obv/Zq5+bkg5I3qVJ16ic/yS+5LQ8k1RhoHiMyW4ZXt51aLJ5GMHJ/z3rp/iEqxa0yoAElYTrj0ZQf61z/AMTofs3i+Z14WWMEfgNp/UVq+Nb2C/udPuLa4jniNlEoZDnlVCsD75BrspvmpwkzjmrSaOWYVQvT8oHTLVcYkAms683Om7gBTk+preO5kyWQCO0kYdSAoNZBI+Zc/LmtCR/9HP8Avis1jlc1UUBf3KRBtcE+WAR6U6bHlEmmoo8uMgdqdN/qSM0+oHsPw4hJ8HxuO8r/ANK6toiccdq5j4cTqnhK2jIwGlfk/Wux+0R7trMAORXNKceZmqi7HRRIfKj68KOPwqU8dqliwI1A9BSsEwOoNYuJRVkbdgHIAqaIH7QPTtVe5zuwBjmrKjFwn15rKY7HIXWf7RuAeP3jfzNVmYedCPWRf51dvv8Aj+nP+2f51Rk4uLbPH70fzraT9wS+ImspR9uuQv8A0EJP/Qaq+HFP/CXXDgfLuP8A6Cam0451Ccd/t8uP++TUfhwZ8S3LZOQ2Mfga5m7RZt1R1UZzqsnPPP8A6DWR49GfCN3z3i/9DNasX/IXc9st/wCgisvx5j/hEbv6xf8AoRp0egTPn6+HzH/eNc1fcXR+ldNf/fIx/Ea5q+/4+T9K9SGxxy3KlAFLjikHWtBDW60lOcc02gAqSHmT8KjqSH/WfhQB2Pgs48R+5hP9K9HJy3tXm/g848Rr7wt/SvSSOOBXNL4y1sMyN1HUUMO9JjrgUDGMpx7UgNPP3CcdqZnjpQB0fg1Zbexms5m3NbzNEOMccMP51pa/bLPc2FrIMozmRh67R/8AXqvpM6HXdRREYZ2Tcjg8BPz+X9am1h5m8Q6eDt8vynYEdc9/wxXI3ePN1sbW96xyN5Etnf8AiS3UEKxtZE4/iOc/1rJz5ZDNlcHv3NaHiGSf/hNpYopGEM0QSRQeG2txn6VX1GGMzSZUN5Yyp9DVxekb9iXo3Y6HRorO7jtkmDGBWdjxnJPArzbweZbbxjeW6xGQhGiJ3Y2AMOTxz06V3Gk3P2f7IgLcoxbHTrXOaBGF+Jeu7OgaQj8XBqo2XMl2/UJa2Z2l0uEOOpHFJ4WNxPdObqZZJFKJuCBeAAAMe1PmBYHPUCotA3LeS7SQPNHT6H/CueXwNFxfvJnCfFVcatbP3KSjP0f/AOvVLVEWK3s0VQoEQAAGOwq38TC8l1ZueQVl5/4HVfXSB9kGf+WQ/kK66WkIIxnq2zIIyCKoXY/dMM+lXNwweapXrDyuOmRXQjIilH+j/wDA6oOMIKuO2YAB/eqqyMUUAHpVoDQtxmFP90VFccRGpoB+5X6VFc/6sip6geseDJQvhyIZxyf510fmjaxB5xXF+G5nTQYcDjn+dbEV+x+QjnPrXmVU3NnXC3Kj2dE+Qf7opCKfGcheRyKYSvI3CnJiRSu3Cso7mr0eDID3FZl+Uk2BMGRXHANaKoRNu9+grNMppHLX4H2ubsd5zWc4BvbRSP8AlqOPxrRuctcTvjkuR1rNlPlXluzY4lXv71o5P2dibe8O04Y1Of8A6/5v5GovDLZ8R3Y/6aH/ANBNQaffgaxKu3IOoTYOfY1D4Yut/iy6XBHzt0/3TWbXusvqjtouNVfjgk/+g1l+Oz/xSN39Yf8A0I1oW0qPqsm0hiM9P93/AOtWZ4+lRPC1wjZDO0QUY6nLGijo0EzwO/5c/wC8a5m//wCPr/gNdNfD5un8Rrmr/wD4+j9K9Wnscktyp2oHWjtSr1NaEjXGTxTKlP3qQ0AR1LCcSD6UzAp8Q+cUAdd4SyPEUJHUxN/IV6b6A15h4UbHiS2548ts/lXpwBIFcs/jNI7CFRRTmGenWm7e9AxhAPUUxxk1IRj600gUAdT4ZCT395MwzgKv6k1P4jYQ6lp7AYbD8/l/jUPgze9vevsA/wBJZQR3UDjP61Y8Run9qWMLffILYx2yBXO1aNjS/vHC6mTP4jllPVUIHr981VuAUtJpHb7xHXqeatb5IvEWomd90TjdF/sjceP0/WoNSiVdLyr7lZgRVLoiH1HafcvHd26ggK0Oee4zWZoMqjx/r83UbuPzFWbQBruHYGISIDH51naKf+Kv1sn++F+n+cU2rXfl+pV72R3kkmcn2qjpd40d3IFUEeaD/wCOmo55WMXDH0p2koAjvjnzAM/8BrC+haVmcH4z1G3vJvIIkWaB8YLDDKW5I/ECovEJzexAfdEYxTvG9tEuoWUkagMyc47/AD//AF6parci7uy68qi7R712xV1GxhLqZzttzzxVW5fdDj3FT8see1V7pcKD6mtkjMrsSIsDrmoC7FOTzVl/9WPqarsPlA9RVIDShfESj2qO4bKU2MsV4FE6MsYz3NK2oHrXhe2V/C1ozL8x3Zx3+Y1bFmBeFeAAR+dM8KkDw1ZkngKxPp941oxNHPOHB4MgOfoa5KkLt2NYs9VVH8rLdcdqz55UiyTuHHSp5p9wRy+0McYHYVSe92kKX3ZPRq4pU2bqRQjh33scquxy4yT3/wA5rpyC534Iw3Jrn4Ln7Pqq2Ug3CTG0kdfTp0/+tXQv5wbCBPLzhsHJzVKNlqJu7OKu7ny55vUNkfjWNf3P723yx/1ykfnTr7WYUuZoLiyJ2NgyKewrCvZFN9ZGJy0LvlT69aIRdxtotaZJ5urFxwGvpj+hqhZXU9prd1PBw6z/AJjnIrQ8PW+6ZZWb5ReS5/8AHql8MW6SeKLvzl3ASM4XPscGrckr+gkr2N/wrciad2OQ4Yq4K4wcHP6k1t+J1jl8L6tvUMFtwwyOhBPNZ2mQLBqjopU4JHHYAHH6ED8K0PEjL/wiurYP/LqP5ms4zUpXRbjZHztfH5vxNczqHN2fpXSX5wf+BGuav/8Aj6P0r1YbHFLcqZpUPzUw0sf3q0EOP36Q04/fpDQA2nR/fFNp0f3xQBrxWFm9nd6pqInktrXyYVht5AjvJJvK/MVYAARueh7DvkbXgVLNPGN2NOkkktTZ7kMowy5MZKn1Kklcjg4z3rCtL67tpJbSKwj1CC6jUSWsiOysyklWGwhgwyeQehI6Guq8FRanJ4tu7/UNNltUe08tMwNHGoUoFVc+irjrnjvWc2uVjW5356VG2QKs4UjnFRyKADiuVuxrYqlznB6U3PHFOeM5yRin7BVJgzrPBK7NOlDclpif0FReJ38vxHYSMeDDtwO3z1L4FkafR98ihX3nFZ/itpZNejaMblhjUAAdyT/hWc9tRr4kcwyrPqkznoirx6ksxpNRVV03gYw4GKWO4V552UAHChuOMjP+NLfxyy6RNcsV2RuoI9c//qq4q9iZMbY2Ny9/m3R2AgQkr2zWJ4d2nxPrzOeftG0D1OTXX+HbyaPU3aMqQYYwQwz0WuS8Nx+Z4g1mbPS+Jzj3Y1OruvIrTQ3NQumt2WLAAxuFXNGnR7dsgcsW69eKp6lHG1uJNoLhgB9M1QtJGijZVOPmcA1LpWjoNT11Oe8ZZ+22EfBXaO/+1VPXhHDfKsahR5a8CpPET7tQsFJGAEx7/Maq68+7USPYda6qa0RjN6mXna3HeobtgyL2GaexwcA1Xuvuge4rYgiclkJB4BqNhwOe1KeEFDAYGfSmMvRuFjAxzUU7kqM+tCnApsoyoxzzSEeu+GSF8NWRMnBjOAPqa247hVVZG2hhjj1rm/Dm8+H7MKONn9TWoJSgKtkcdSK55LUtHCx+OvH8vh2TWl12L7PDOI/L+zxeYSNuXA8vG0F0B56uODzj1vw9qN1qHhqw1G6O+V7WN5JAoBZyoy2OnX8K8Ht/FEEGlR6P5OdOawlhn/0eMytMxLhg/wB4KJBFxkZCdM17n4dniPgTQ0UFXWxi3AD5jhBz9KdaKSVkOLZo2N7JLLFIXJYzLtJ69a7TT2DxvuB37yCT3xXB2O1by2bci75lHPQ811tncrHfvEzBTuJXJ655P865ZLQ0T1PNPEBCapPwQjMefyrm9PuDDqNvFM37uOTdz0HFdJ4pys0jYJUdx61x8Ks9wGKn72RnvxTowumE5HSaPMZFkYP8n2uZhj6tWn4eJm1C+uFYr0XcOvSuKsZmRWMbMGad+PxNdb4Mf7Za3UbHbL5gOR6YFRXp8qbLpzuzpfD04k1q4jcjkZXPfitXxKAPCWq/9ew/nXNaVGYfE8iqTlSAPyFdH4lbPhTVuf8Al2H865YpKasbN3R886g3P/AjXOX3/HyfpXQ3/Uf7xrnr3/j5P0r2qexwy3Kp/pRH1oI/lRH1rQkU/wCsoNB/1lBoASlj++KSlj++KAOk0O2uI9RtroxlYl/iPHb/AOvXp9jdoYAGbnpXmcBin1KC7SeJUCBfJJwy/LjAHcf/AF67axDSIAuWwOorzZzk3d/15Hr4rC0aMU6bvq+qd1/MrbJ9nr+NunUKyhlOaQr1PasiKadPlGfXDVKl7KwHy5HrS5jhsW5sMMClSIhMEioPtKMuTxxTlvcnkDFWpisbkd5YC3KW99HbvIfmUnoPrTbgRTXSEXSXClQNyMP8964W1gFwspVriI78jD5GD9c1v6Lpkj3SxLeOquQoLxK3bPbFaOHbczUg1O0Wz1Exoo2soY4A96pXIcwGH5gjNkr2OK157SWebdHdQN8rgs8bIRg85wTVZby3e2W0ljjjnRwRL5hfcMcgZGf/ANVK0twTVi7pMIXVJ1XgCJB/46K4XwvI7XuqYJ+a8Y/z/wAa7eynQXUsse6XC4JXscd/wxXJ+EU0uHSru4mmma6kuXJVI3wgB9QMH1qYJrmv5FSa0Na4XdF5TBsLycHvVrRLN7qBYFgMrhXY8c/Me9Vre806acw/bMH3cZ/UVu2+oWlrEkdvGjbFGZFwWY1d9LMlb3OG8aeGLixvbC7KTBPNWOTcgAB6joT71ymuqV1SQbs9K9ivymrWcto0j4JV95J+8CCK8o8Q23ka3cRu2MY57GtacruxEkYHOajl+bGR3qcIfM6fTFO+ySScEbAOSTW5JSMJkUbR0HOTUZglPUdK30WKOPG2NsD3qN442U4iAP1piuZCg4z2peTgHoSBTwhVaZ/Eo/2hSGeteHgBoFoo4ATI/Or00ZLLjkFh+tVvDa7/AA9ZsBzsC4qzqxKQQsXMMTyIJJF+8i55Ix3rkm+W7OrDUXXqxpJ2u7HUweE/DBt0DeHtLJCjLG0jyf0q7/ZiwJFDAAkKKFREUAIo6ADsMVj6XbWNv4ntrLQrhZbWSCSS7jjnMkcYGNrjnG4nA7nHYda7EwnbscjkdcVlGTkbYrDqhJJPRq+qs92tVd2277WZyV/bbdRtwCTmVeD1HIrVZpPtQiHDq4ePJ6jo39KuXNpG1xCWQfKww1Pa1DXUEpXBidgT7EEU5HKjzvxVcj5rdOd0u4msG2bzr+AkY3MuBWrqzbvNkKKV8wxg9Tzk5qhbQAX9qTwPNA/Q04vljYHqyHRV3a4z4ziaY8/8CrY8ASH+2rqIngu5x+FZmipjV5uM/wCkTf8As1XfArhPENyT1Bf+VKorxl6DjpJep1Tn/idkr1EjZ/StLxC4/wCEP1QnqbcfzrFa4I1F3HXzGz+VX/EU4bwdqLKeGtx/SuFL3kdfQ8NvSOPqa568P+kn6Vu3hyB9TWDd/wDHz+FezA4JEH+FIrbeTS9vwph6VoSO3AsDSlhmo6SgCTcKfCQZQPr/ACqCpIjiQH60Aa+mnOo2n1Of1rvLW8aIlVAO7tnAH4151ZM322AqSCO9dtbuGREHA9KxqRT3KTsbE13PJEuGIIOelV59Ru4Io/n4A64Gc+9SWpDwDuelWJLaF9okjLgckhsY/DvWXLFaWHzNk1vdP5SSmWOfcoJXbjBq8wVXUt0btjpWDHYGOGQQu29eFTu3NOtJ23BZZOEzkE1k4djRM344TCCPJlCgc7VDj9P8KtWF15b+akq7FI56c596x7O+v7NGWKQsvYSJnFS2l0VVlkiXnOe+efeqTvqZXTNgzqIgIoGJ3EOQMjk+341WsLDbqMpZA0eOFIz6VDbtDbkyqAm3nCdT+FdHZ3dibZGd0SQqd2T19Kt3aGkURujklhtYFBdTwAABXGeCHuItNuGVW8rzZC3tyK6u91NpoHt/syAE5LqTk1JoehQ2WiiyadRI7F3BXGMnOB+lEEoJ3G25GTq8wl8W3qrCsmWwBsB6KM1TEFk13572UDHglAu0H8q6F9GlTW3vvtFvIHkdiA208/WqT6VcxzeZJEzbifu88Zqoyi0S0ZNvDarIZD9qSIA/LFcuuD271xPiRnjvVLXEsrdMykE9a71UktkuVliI3grgg8deRXA+Kh/xNG+gOPrmriveJexlurEhg+cgE037QfmUtjHvUkeGiUHJJHOOtUsEsQe2TzWoi+m5l3Aghunz9KahkkBK5YA4PGapqcg0qTMgIBwMg0CLEu8tgqR9VxUTKNydOuTUt7dGd4iOBt6e+aeEku72GNAGYjA/XmgZ6r4VwdAtmQdFHA56AVrSNsvbBexnQfm1ZenaQlraRLbX0yOEAIyOcjqQcVNLHLBNZ3Et0ZBDMrLHtALBTnrn0Fc7aLSPUrKytrCMx21vDBGSSVijCAnpnA+gp8oVmUDg8muUfxjJt3jSbzbjPyYIIzjIOeRkio18b27uwNlchkHzZKkD8Qay0NZOUnd6s6ebGYwe7DBqATKiFWPzFWAPrxWU/iSNZkiktbgMfmKhMkDP14q4twl7YNdQ29wV2koSFGeo45pSJPMbwbp5IyeBJu/GkhYf2laDIA8wnn/dNaeoaVMzloFQluTucDBrKFvdWF5E10PJxHI6SZDDhW5/A0khtofoX2VX+1JcOZ/MlZ4miwFBz3zzUHhoKurTSpM4kYsSgTHHrmt/QbnWri2t7eaxsGTaH+dEAbnsAf5Cs/T9Q1C3mW1a1sTEspUSxQIHPPTcPyrS25N9jR3GK8KM5Y/eye4Oabrlw83h+5tlYjMJOAevGasSQ4Lz3KJbBRj94+KjhjtpYpS08DgoVGJh3Fc1kpKR0J3jY8fnbcoNYl3/AMfP4VsXA2FlUZ2kg81jXQP2jnjivSicjIaaelOpvarEJmkzRiigApyH5hTalgjd5PkQtgZPGaALunnbfQHGef6GuttZNrAnpXJ23yz2/wC7Knd94k8100SMUB9qzmBvWLgKMevFWp7gKxI++BhR6msO2vGhQK2R2zVs3UbDk8kdRWVmVctK3mlJEYrLuyRnkGnPp5bJGCzcnNMtiguVJcFsdc54rSmmOweWc1LKRIHRuMjFIxiPVj+FQCNl6Z/EUuSPvrn6VzvES6GDqeRYAiI+9mnjyR13fhVTEXXODT9rgZWTI9DU/WJk+0ZcjurdDySfrV4auvykbuOM4zmsUk4+YcfWkAUn5WYH60nXm9x+1kWrm8aVcBc/WoPMfKEmRAOflYimlXHv+FIcYxg5+lNV+6GqrNC31KaC2JedpQ38MvzY+ma4PxiytrZdoIcMgOE4rrQmcEc47GsLWdCbUZhMsxjcLgDGRW1OvBSuxuqmjkY2hU5w6475zVaWOMtxMoJ/vKRU9/ZXenymKZcAnIYdDVMue4BruUlJXQJk6WrkEhgwx1XmoGiZDhgR9RT45hHCwHysfSlS4fBy2frzTAgJzj2rX0i8NvfpGtnHctKu1QxII78EdKoGYOfmjQ/QVd0QqfEVpgYVXA/Ok1dDTsdoPFF3BDBA+mXMHzbi6HfvUDGPwxUiTWfifUjJbmSOQIN8cqHk+oPr04qxtcakSp6rjHYcGotMtc61BAXbbIpztOOa5ny7GqvuXJvD90fKjiu4l4x8rPhR1JOecU2LRp4ypOpWgwx+Us2HH/fNbs2nypMiRksjA4yTlRjBH8qmvtHe3iDQgsAF4H05rL3X1KuzFGl308Pltf2YcrtDeaSSM/TvU1sNR0ZHlN3GAhPyrISCB3wRW88EMWkWWYh5szKu9TyOw5rpdX0y1i0q5aO3QER4xt68VN7lHlNnr9vLNvuNQ2qSW2MSpYn6dq29e+w6r4OuLu3nSS5gSQqVkB+Uj5hjr/8Aqrl/EOm2i3GPs0aklWIQYxwKkj1QQeGrqyESAPBIgZQBjjNbpaXRm2a+hWzx2O7aVIQL9DurP0lNutW7ZIVrsbvfDV1NgpbSIGPRnY8fWsfTIla8tgRj/Sm5/wCBVinqx22Ok8UaINdgS2S4WEhlkDMuQcHpVdPDlxqNrLHLPY/a8r5cgt8KAPvEjPU/L+XvW7dnGzA524/WodPmeK8HHAO1ifQ1lCrOC5YmsoRk7s8CubFrO4uvMZWLSn7owOprCvv+PgfSun1neLqcMMMJWyPxrlrw5nH0r0o3e5zPQr9qT2oNA45qxDs4ppJNB96SgAqa3Z1clXK8c4OM1DUsIyxoA33n1Ka306G4T/R9wET+SFP03Y59a7b7LBBCkbjJwO1cXEZ5Y7E+Yz+XKgSNm9j09BxXYWmrPbWP+kFJ7tm3bgw2gen0xWMlcaKtyttJGUUjGT1OCPxrJ+zuSVL4QHANb/8AbUTMI3tgBLnqOBk9eOtS3Dacbh7ecW6MoU7gCDjAPX3pLTQZVsTBEyhSpAHXNapClflbORWCJLTEhicpGG4dgMAen14qSGWM3q2v2hzvXcjKMk8cDGetJxY0y+tw+cMc/WrUc0bYBPPoajMW7qM0ht2Byo/OvOscZZKA84A/Cm/OnRjj2AqESSxHlOKljut3VdppWHclE6ng5A+lKVR+n86YQHzk4+lM8rnhz+VILlgJgfKT/wB9U056Ff1qJSIz8zEj3FO+0wnjbj3NKw9GKVUdSB9TTcEdCDQdh6p196Tds+6gpWJIbm1gvIGiuFV1b26VxuqeGJrTdLasZouuMfMP8a7fe+fuEfSgo7DJbr6VrTqyp7DUrHlBUjim/N6V13iXRQoW6topC7N84Rcj6muUK44PBr06VVVI3RrGV0IufcVqeHsHxHaAcgyr/Kso4rX8LKG8TaeCcZl7/Q1o3oUem3EflaofQoD09qm0C2afXIGwuVVj/n86u3luGu5nLBVRQAPXir/hqGOPUpH3AK0Wdnv6/r+tcckbJnQLBDvJK8kcCnvEqWxJBHIGMVaYo2MEAgdB3rPvJ2ZUAJC5wazSsimyQ6cs17aIQSihGHoMVq6qVk0q4U9SrD9Kzra5YSRnB44HtTdRvWSCZSQF2nr1NC3E2eW6+2+8WRhww6e4FZpgB8NpKRln+0c/RRXRz2sd3KkjEbCOuMkZHaqs9l5XhNVVeE+1knuAQAP5VsmrEHVaLAz6LCCPlOSD+NZmmWTLLa3GVKtcsMfRq3NFLLokCcnCc+2TXN3viez0y2RLRVmvY2Y4PKxnPUnv9BWMdblxTk0kdbqV5DaBHmkSJQuCXOKzbHVbS4MrQXCyqD82OxrzbVdXv9WkE1/LK6D5Q6pwPoBgUljfT2YP2a6CqTnBTafxqowR0Tp8q1epiaxPOlxKskMqt5jHLoQSM1zdzFI8u7YR+Fej3Ou6gTsZYLmMj7rhTWNdzWk+Wl0doCf4oCR+hyK64zORwZxPkv8A3TQY2HY1t3SwRMCm4huAGGGqtdp5ESPtGWOMHtV3RPKzM2mkxWn5KsoIpjW4x0B/CmIzsVNbjlvpU7QDuv60iRhSSAelAGlperPpV5vWGOXcNv7wZwPat/8AtGIRCOfS3AHIIc5UE5IAx3rkAP8ASEHvXsFlqcV3f2kzlTEy7CGHBwlY1NNSoq5wn2iwcuJUuEjx8m0cj60sz6e6obe9kjIHzCVD/MVs3DxTatdP5MDLk4Xyxg+lVnjsGkiWa0jUGNiSueT271Nx2MlE8wP5d5CwViBu4LD15rQ0qCRZJTutZJFX5HMmGU+o/KrF5oFgmnxTIHDSMwGGyMD8KpWnhjz4p2FzsaMDHy9aOZdx2Z1a27x58mQqP7p5FNM86HDwtgn7w6VeATaDkjH40ihHzgg88Z71jKnGRm4JlFp94K5wfcVBjDZ3ZrVeFMfNtPpUT2qE5EeRjPK4rP2HZkeyKQZlbKkn2qX7Uw+8v6VYFrGOdpBI6ZpptYwSctx71LosPZMiNwCOVGKZ5kbjJTFSi2Qn77n2HalW0XcOcr70vYyF7JlbzSpwHAFPS5jH32yfbipfsaybgpI5/Kj+zVOGLsQvWl7GQvZMZ9oh/vNTfOhz0Y1MNMixlWI7ml+wqrbt7bcdBR7Bj9kyuXLDjOPes2+0CDUiXKFJf76DH5+tbZtrcgBgvrz3q0Cg7DI5q4UnF3TGqWurPJtU0+bTL17aQFsYKsBwwI7V23w80qzjgk1i6kUzkmKCLuB3P17fnWnrmkJrNksKyLG6tvRuvPv7VW0bTbmx0qOC5UJJGzZVuQck4Irt5rx8zRLU7W4s1MaTytGsRHJB5Ue+OKm002dtcs5vUQBMYcgD86xGMgsJt0hwMMoByCAe4pbHTPt8Dy5B+f7hHD4GcYrGWi1LR2yS2jLG4uonMnAVXzk4zVa9khjjUmeP73rnnHtXK/2KGLJHLJbg8qyknDfSpYNDnvbOWJr2XzAw2kk8cHB/nUcyHY6GK8jExC3MKrjI3HHPpUOozL5cg86NyV52HJrm4/BupMN/2hmyeUL9cVpssUtuUdQm4Yyckg0Jp7BYxWQkhVkDY59Me3NGq3SW/h3bIQjNFKFBYZYkjoO9Z+sahFZ5is3jmm6Eg/Kn1/wrlZ53eQSzymWYDG9uij0HoKuyW5dOjKevTudDfeK7y5tDZwFre0IAKqfnfHqew9qxFjkfawiWVO6JIM0RRHO6Ka3n3DBDdfyOKDEin5rVk90Jx/WhR7nRzxprlh/wSaNUjyVNzCT/AAlsj+lLvJP+sRv95cU2N8LlZHA9xRtaTcwVXxycdqoxbuR3C+YOYQ2P7rc1mzzJbtsjFwkx+6uf51ZuHEm6OFB5gPJzwv1qKGBYwf43JyXPU1V7BGDlsQRW00kgkmcySnjLc7R7VFrOlagTGsdlOYgN3mBCQa2LaCSW5SONSSSMYrrCDEecqenpSjLW463ux5UeWBJY/laNgR2IpwfHUV6hJDb3YxNGkg9HAb+dcLqtnFDqEyRLtQHgDtW8ZXORoxy4NOiQP5hx0FStbj+9TFUxhxnO4YqhEDptuUOP4q6+3eRfDVoQckztjHUCuVuiFkj9Qa7SytyNFtFIOPMY4rKrokVHcqWczPId6jJTr+IosZYGvVSbDL93J6dKtC1Aj3LwdhGPxrN8vyrjOPutzxUKzKZuajKltp1qhwVUsR3qG1utsFy2SBx/jUOpbZNMt+fug/zqrZt/ocvJIZgKjlVrlcx1yYAPynafQ0SL82AATgDFMJbB7ADgDpTmhb5yBn0xyRVEEoLMuCD0/Sno0mMkkj1J56Uzy3BALEMeefeplEmQqszc8kikMURbhnZwRjnkmhov3JKgEgnGRg81L8yqSxI56d6IWV2IbIbPA9P88UhlZoWhdWkVgrDHDc0kSLkH5trdOe3pV8RopO8ls9AfX1qE+WgKknHGBigRVeJdp8onJ7Z6806GNhywyvT5jUjMryqFI2ZzhV/P+dPdkXkImCec8+nalYCMAcAK2CcjB4pvkEP6sD1Bp29doVQQP1pC4IA28YAOT1osw0GeQihsqc469hSvECc984HPH4fnSrjFOYlsn9AOKfKxaEqmJEUOi5Izj0A/yalDW7xKCVweT7VTC7uqk/SncKcBcH3qlECw8dqRgF/wNTWl01im2FVPzbstnr+FUSCeh5puZB1oaQXNj+152O428GR3weP1p0esSomzZGB/sjGaxFYk980rsyRs3XaCcetLkQ7s15fEosVNxMwVV9/0FcNf6/d325FY29tzwD87/U9qyGvLjVL7fcHKpysY6D2pjSwSOUDusg4DbcqKbXLojelGLXNPbsK0sYZY5GaJD/dXJIqWJWUMsdzDIjc+W64/Q0RwXSpuEi3Ke/P8+ajYRbsSxNGf9n/A0KKRc6rlp0HuoH+stQvuhIpQyp9yZkz2bp+lNVAADb3eD/db5f8A61JJJLAhe4hRk/v4/qKdjK5IBMck+XIOuQRVV5vPGIF2KD8zA5z9KgdhO27Y0cP93PLf/WqQHPONq44UUm7GlOHNvsPVeMAbU9u9OUkEHoPSkDZOGPA7CumstL0tdjzySlzg4dcL+lQbylGG5csXltLWMrHGDtBOUwenrVn+1eolgB9wc1fjWzmTasiHjor/ANDVafSw2THIM9gRVK6OCWrIDc6fJ95QhPquP5Vj6j4cs9Qmaa3vWjkbqMhh+XWr8+n3Kgfug3upzVWSKJAN8TIwHUgiqTsSzl7zwxqtqSURLhfWM8/lWFOs0LMssbI47MMGvSYi5PyyOB7Gm3MglBjnjjnT0kQGrVR9SbHmt0cxxt34zXoEE4FlbpjkAH6cVieJtIsoYNNaziZJ7qV1eJWLD5cAEA/WrqQzxIIwPN2qFJRgeR+tKTUkgRoSqjoMAfd5/Os9IA9wA+dhb8+tAnlVSHjdSOOQRTo7tNwJIyB0rOzRVxuoKTp9uuPX+dU7dWW0lHQbgavXMnm20YXB2g8fjUCfu4mUYOSOPSq6DOozRv2+tKYwRwaZg9MGqJHo7b93f3qyJiqnAAz71WEZ9hUgWpsh3ZKZWZs9PpxTGZizNnBOKb1p4AJz6etHKhXY8SSZ3F93v6UmSeOTR973pwVfT8RTsgIjGQeCQPSjY396p9hX5sBh6g00n2pARfiaXNP2gnPFIUwRzTugGdDkVKJDgYA+tIEAPPP1pcAdqAFBZgW3YHTrikxmgAk8UrDZySM+maQw25BOBuPem7T3H5U4MOuTQWU+ooAZx0yaRgEOOc+hqTKnNRyA4yoBPoaAM250u3uZTJ88ch53xtjNVZdIlGCBDcAdmG1vzFXZ5btTjyQo9R81LC13/FGCPU8UDu0YctmIvvRywN6sMr+YpqR3RYD5J4zxnIIFdPuPfn1qrNY2sxJ2BHP8UZ2n9KBqfc5WR7f5vMhKEdWjPH5GqECtOWkkJ8lT8qnvXT3elSupVXEqEY2yjn8xVWDRpI41XdjHQHnbRfQuLV9djKK7SGkGfRDQFeZ/lVmPoBXQw6HbA7pGaRvfitCO0jhTEahR7VNjV10tjnrbSp3YeYPLXvu61ufvAApgLKOm1gTVgKwGCc0mduecfSjlMZ1HPcg+1W5Qh1KSA9GGDV3zCAgindcjpu4qszlTjk57imMiM+9gQcY4OKEjMureXSZDbXx6jFS/bgVIliYfqKobiBgOePWo3mlU5K5HtT1A0P8ARZM4RQe+PlNMktEKfupCp9G5FUBex4IYFWP97il89i42uAO+KBXMr7DqUOoNd3GJGj+WHyxlQvXp25qhPNcrcmSWJGZiC+BjmunFzIhILBgemRTpWikQCRUbIzhsGnu7hc5Ya5NDKwZ2KEcex9avnVbO7jELCMvjOXQJz9RW1rPhSzg0iW6VAs4xgrwBk+lcDNbyxSlWYcGkrPYfqbYmtd6II5AzdgQRj9KnS2Ds4STbtXd83ua5osYySSST0z2qe11Ge03+XKBnHDDNWGh6KPmHOaUAU0SKOD+GKfvTsc0IQAH0p3OPQ0wyf3VH4mk8xj1IH0piJMUA8kDtUYPqc/jSjnJXP4UgJA2Onen8/wB7ioQXGMj8TUmR65pXGKGAPU/ypchj6CmhhuGTxTgc8KQKQCH0FATIBJGP1oJ4wTzSZ45NAAEbJOc+1NLHBUgYPtT9/NIRnk8GkxibjtxzjtzSZXPHWk55xxj3oBHRhj3pXAeHxxzR948c+1M7g549KUSnpnHoBRcdx2CSegxSEnGBzTd+KacE5ouIkDZ6jBqKRsewzTs5HH8qaw3KT+tMAbaw70wLt5ByPemAmP73I9qfHJnOMHHWmApIAOQRTcgjg5pdwbIH60wr6rj3FAC5zxSEP2P60/auDjFNx6YoACT6/lTQBgnj60Hmk6dRxQApxjqKjcAilbaOMnNN6kjdSAj5z1pCGHNPKHrTSVHBOfpTAicljzUQZQeRk9sVOZcDAwPpUbgADaME9aBCENtyJAv+ywyakMmY8FQSO49KhKqq/eOfSo93PWgDoNb1ZLmw+ywkF+Mk9BiuOngfzCzqCM9q0Gck5NRuRjJxiko2G9TDeFHk5yufXioJLVmcqFU//qrbYI/3lBHuKi+xwliyEqfUGrEf/9k=",
"path": "images/4pts_ADE_train_00012873.jpg"
} |
depth_point_198 | images/4pts_ADE_train_00010554.jpg | ADE_train_00010554.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 282 y = 181),Point B is located at (x = 27 y = 167),Point C is located at (x = 102 y = 154),Point D is located at (x = 163 y = 214).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_44><DEPTH_74><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_3><DEPTH_49><DEPTH_3><DEPTH_31><DEPTH_74><DEPTH_15><DEPTH_78><DEPTH_74><DEPTH_3><DEPTH_49><DEPTH_70><DEPTH_5><DEPTH_69><DEPTH_74><DEPTH_31><DEPTH_15><DEPTH_72><DEPTH_49><DEPTH_3><DEPTH_67><DEPTH_17><DEPTH_5><DEPTH_29><DEPTH_38><DEPTH_31><DEPTH_74><DEPTH_69><DEPTH_35><DEPTH_17><DEPTH_45><DEPTH_121><DEPTH_67><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_38><DEPTH_3><DEPTH_83><DEPTH_67><DEPTH_43><DEPTH_28><DEPTH_5><DEPTH_75><DEPTH_70><DEPTH_35><DEPTH_64><DEPTH_66><DEPTH_20><DEPTH_70><DEPTH_85><DEPTH_44><DEPTH_58><DEPTH_9><DEPTH_66><DEPTH_70><DEPTH_15><DEPTH_77><DEPTH_61><DEPTH_16><DEPTH_98><DEPTH_0><DEPTH_16><DEPTH_2><DEPTH_94><DEPTH_32><DEPTH_15><DEPTH_75><DEPTH_61><DEPTH_16><DEPTH_1><DEPTH_16><DEPTH_121><DEPTH_121><DEPTH_98><DEPTH_119><DEPTH_11><DEPTH_35><DEPTH_68><DEPTH_57><DEPTH_41><DEPTH_1><DEPTH_1><DEPTH_94><DEPTH_42><DEPTH_98><DEPTH_74><DEPTH_60><DEPTH_15><DEPTH_25><DEPTH_44><DEPTH_19><DEPTH_2><DEPTH_41><DEPTH_1><DEPTH_94><DEPTH_END><DEPTH_END>. Since point D has a higher pixel value on the depth map, the answer is that point D is closer to the camera. | D | long | 4 | [
"C",
"B",
"A",
"D"
] | <DEPTH_START><DEPTH_44><DEPTH_74><DEPTH_59><DEPTH_59><DEPTH_70><DEPTH_3><DEPTH_49><DEPTH_3><DEPTH_31><DEPTH_74><DEPTH_15><DEPTH_78><DEPTH_74><DEPTH_3><DEPTH_49><DEPTH_70><DEPTH_5><DEPTH_69><DEPTH_74><DEPTH_31><DEPTH_15><DEPTH_72><DEPTH_49><DEPTH_3><DEPTH_67><DEPTH_17><DEPTH_5><DEPTH_29><DEPTH_38><DEPTH_31><DEPTH_74><DEPTH_69><DEPTH_35><DEPTH_17><DEPTH_45><DEPTH_121><DEPTH_67><DEPTH_59><DEPTH_3><DEPTH_3><DEPTH_38><DEPTH_3><DEPTH_83><DEPTH_67><DEPTH_43><DEPTH_28><DEPTH_5><DEPTH_75><DEPTH_70><DEPTH_35><DEPTH_64><DEPTH_66><DEPTH_20><DEPTH_70><DEPTH_85><DEPTH_44><DEPTH_58><DEPTH_9><DEPTH_66><DEPTH_70><DEPTH_15><DEPTH_77><DEPTH_61><DEPTH_16><DEPTH_98><DEPTH_0><DEPTH_16><DEPTH_2><DEPTH_94><DEPTH_32><DEPTH_15><DEPTH_75><DEPTH_61><DEPTH_16><DEPTH_1><DEPTH_16><DEPTH_121><DEPTH_121><DEPTH_98><DEPTH_119><DEPTH_11><DEPTH_35><DEPTH_68><DEPTH_57><DEPTH_41><DEPTH_1><DEPTH_1><DEPTH_94><DEPTH_42><DEPTH_98><DEPTH_74><DEPTH_60><DEPTH_15><DEPTH_25><DEPTH_44><DEPTH_19><DEPTH_2><DEPTH_41><DEPTH_1><DEPTH_94><DEPTH_END> | 282 | 181 | 27 | 167 | 102 | 154 | 163 | 214 | null | null | 109 | 65 | 16 | 173 | null | {
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",
"path": "images/4pts_ADE_train_00010554.jpg"
} |
depth_point_199 | images/4pts_ADE_train_00011390.jpg | ADE_train_00011390.jpg | Multiple points are circled on the image, labeled by letters beside each circle. Which point is the closest to the camera?
To answer this question, let's think through it step by step, and we know the image is 336 x 336. First, what are the coordinates of points in the image? Second, what is the depth map for the image? Which point has a higher pixel value on the depth map? Remember, higher values indicate that the point is closer to the camera. | Point A is located at (x = 100 y = 148),Point B is located at (x = 123 y = 211),Point C is located at (x = 311 y = 173),Point D is located at (x = 320 y = 126).The depth map for the image is <DEPTH_START><DEPTH_START><DEPTH_41><DEPTH_19><DEPTH_19><DEPTH_44><DEPTH_64><DEPTH_74><DEPTH_29><DEPTH_31><DEPTH_5><DEPTH_70><DEPTH_64><DEPTH_19><DEPTH_44><DEPTH_64><DEPTH_72><DEPTH_40><DEPTH_49><DEPTH_11><DEPTH_5><DEPTH_59><DEPTH_66><DEPTH_36><DEPTH_44><DEPTH_64><DEPTH_74><DEPTH_58><DEPTH_60><DEPTH_59><DEPTH_35><DEPTH_67><DEPTH_42><DEPTH_64><DEPTH_44><DEPTH_49><DEPTH_35><DEPTH_84><DEPTH_84><DEPTH_56><DEPTH_17><DEPTH_67><DEPTH_76><DEPTH_80><DEPTH_60><DEPTH_36><DEPTH_76><DEPTH_76><DEPTH_63><DEPTH_25><DEPTH_61><DEPTH_17><DEPTH_78><DEPTH_60><DEPTH_9><DEPTH_58><DEPTH_2><DEPTH_44><DEPTH_44><DEPTH_19><DEPTH_0><DEPTH_82><DEPTH_55><DEPTH_50><DEPTH_61><DEPTH_25><DEPTH_40><DEPTH_69><DEPTH_77><DEPTH_77><DEPTH_82><DEPTH_23><DEPTH_82><DEPTH_83><DEPTH_11><DEPTH_19><DEPTH_18><DEPTH_57><DEPTH_14><DEPTH_16><DEPTH_19><DEPTH_62><DEPTH_76><DEPTH_77><DEPTH_61><DEPTH_119><DEPTH_45><DEPTH_15><DEPTH_64><DEPTH_32><DEPTH_33><DEPTH_29><DEPTH_44><DEPTH_40><DEPTH_24><DEPTH_73><DEPTH_71><DEPTH_37><DEPTH_37><DEPTH_21><DEPTH_8><DEPTH_83><DEPTH_END><DEPTH_END>. Since point B has a higher pixel value on the depth map, the answer is that point B is closer to the camera. | B | long | 4 | [
"D",
"C",
"A",
"B"
] | <DEPTH_START><DEPTH_41><DEPTH_19><DEPTH_19><DEPTH_44><DEPTH_64><DEPTH_74><DEPTH_29><DEPTH_31><DEPTH_5><DEPTH_70><DEPTH_64><DEPTH_19><DEPTH_44><DEPTH_64><DEPTH_72><DEPTH_40><DEPTH_49><DEPTH_11><DEPTH_5><DEPTH_59><DEPTH_66><DEPTH_36><DEPTH_44><DEPTH_64><DEPTH_74><DEPTH_58><DEPTH_60><DEPTH_59><DEPTH_35><DEPTH_67><DEPTH_42><DEPTH_64><DEPTH_44><DEPTH_49><DEPTH_35><DEPTH_84><DEPTH_84><DEPTH_56><DEPTH_17><DEPTH_67><DEPTH_76><DEPTH_80><DEPTH_60><DEPTH_36><DEPTH_76><DEPTH_76><DEPTH_63><DEPTH_25><DEPTH_61><DEPTH_17><DEPTH_78><DEPTH_60><DEPTH_9><DEPTH_58><DEPTH_2><DEPTH_44><DEPTH_44><DEPTH_19><DEPTH_0><DEPTH_82><DEPTH_55><DEPTH_50><DEPTH_61><DEPTH_25><DEPTH_40><DEPTH_69><DEPTH_77><DEPTH_77><DEPTH_82><DEPTH_23><DEPTH_82><DEPTH_83><DEPTH_11><DEPTH_19><DEPTH_18><DEPTH_57><DEPTH_14><DEPTH_16><DEPTH_19><DEPTH_62><DEPTH_76><DEPTH_77><DEPTH_61><DEPTH_119><DEPTH_45><DEPTH_15><DEPTH_64><DEPTH_32><DEPTH_33><DEPTH_29><DEPTH_44><DEPTH_40><DEPTH_24><DEPTH_73><DEPTH_71><DEPTH_37><DEPTH_37><DEPTH_21><DEPTH_8><DEPTH_83><DEPTH_END> | 100 | 148 | 123 | 211 | 311 | 173 | 320 | 126 | null | null | 71 | 100 | 36 | 8 | null | {
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",
"path": "images/4pts_ADE_train_00011390.jpg"
} |
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