index int64 0 1.74k | image stringlengths 1.02k 414k | question stringlengths 31 488 | option stringlengths 38 473 | answer stringclasses 5 values |
|---|---|---|---|---|
200 | 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 | As shown in the figure, use a ruler to measure the length of the rectangle's side. What is the length of BC in cm? | A. 3; B. 4; C. 5; D. No correct answer | A |
201 | 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 | As shown in the figure, the area of rectangle ABCD is 6 cm². What is the length of CD? | A. 2; B. 3; C. 4; D. 5; E. No correct answer | A |
202 | 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 | As shown in the figure, point B can be represented by the coordinates (2, 2). What are the coordinates of point D? | A. (4, 5); B. (5, 4); C. (2, 2); D. No correct answer | B |
203 | 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 | As shown in the figure, point B can be represented by the coordinates (2, 2), and the area of the rectangle is 6 cm². What are the coordinates of point D? | A. (5, 4); B. (5, 3); C. (4, 5); D. No correct answer | A |
204 | 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 | Lisa arranges several 1 cm edge-length cubic blocks into a rectangular cuboid. As shown in the figure, the images are views from the front and the top of the rectangular cuboid. What are the length, width, and height of this rectangular cuboid respectively in cm? | A. 4, 5, 6; B. 5, 4, 3; C. 4, 3, 2; D. No correct answer | C |
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 | As shown in the figure, Lisa uses several 1 cm edge length cubic wooden blocks to form the following rectangular cuboid. What is its volume in cm³? | A. 10; B. 18; C. 24; D. No correct answer | C |
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 | What is the volume of the rectangular cuboid shown in the diagram, in cubic decimeters (dm³)? | A. 0.024; B. 0.012; C. 0.02; D. 0.027; E. No correct answer | A |
207 | 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BdbWNQaW1kHL17X7Sb4he453yQLrlJYHlj6Tjpo3HPaZPRhWtTiw9G64sH9VmJGti89ueWAptE+aPw33YC1evT5876KBcMicoXDaf5eHv7R0nHrT8vCjSwfDthf05aV8Wvb7suWaPvQ8/PrapfmH6f5XLs73YpUt1/RxajZOuWFZ+P7FA2HHi/pLl2nLsNfEkrDV+QtrC6yds8DShs2a7Pcr129o3VidPe65w7YH68Tsg0S/V+CXLdvkoce9cOW6cPjcoXzDZjD7fNLXypZt8tC//YosKs5ZaHuw/nHLirB+Y0vfG9lzMZCtG46/bhoG1qLsG//2hX35B+q3ZrZ7bHnewvD1cxeG7bLIKru9LUOPf4vseWj7a+Kb2fhG9prQKLu9TUMbHltlz0PlgZWtLLV1vnV2/8dlEXdCtnHz2+uWhOOvb9fQ4z5i7nD+XO9x6aL898fno3z5Ro7s312P+9hrloSdLl4UvjOrf+Q1odtK/0wTR/5Y7THvf8XisE22Ht539uI8vEuXb/LoPBfHZq+DH2bvi4PnDIX1NRdW5YcItfX4z6yQh9esz7cY2jh03P/oecNhRvamvmbJ2vz3Zcs1fSzOHvecbEtaK/o/3Lg0P/ZdtlzTh/bs3rpiXdj3isGw52W2Jd3WoffC5YtX13OIMNsqV2BtcV5fPt/t0GwLVXvT2zYOzcY+2YeoQnaniwfy35ct1/Shx33AlUPZenggbD+zPxzU+VrZsm0Ye1w6GLbO3hs/vGQw33tTtkwbhtYNP7howAIrW2fUiUnuNWGSu2GSu0knude9W3qqq3sOlia5a11kX7M9W20Z2cssn29z3VKbg3XyDUvz3+vrZcs3dmSvheyXbCNvQzhSk9xnD4Zl2YtBX2vVayJ7rFrfrM3+T5PcNQfrrFvt87lt7w09XvXUkuw1ceL1OkQ4PL0OERJYjsAyBJbhLEI3GWcRLl/b7idZz7ECq+1nEepISn4WYRZYmoPTVgqLmf1ZYGWfSW2f5K7Q1iFSLtMwjRFYhsAyBJbjMg314zINZtRlGlr8mtA6h8s0mGl/mQYCi8CKCCxDYDkCq34EluE6WIbAciOBxR6s6YvAMgSWIbAcgVU/AssQWIbAcgRWAxBYhsAyBJYjsOpHYBkCyxBYjsBqAALLEFiGwHIEVv0ILENgGQLLEVgNQGAZAssQWI7Aqh+BZQgsQ2A5AqsBCCxDYBkCyxFY9SOwDIFlCCxHYDUAgWUILENgOQKrfgSWIbAMgeUIrAYgsAyBZQgsR2DVj8AyBJYhsByB1QAEliGwDIHlCKz6EViGwDIEliOwGoDAMgSWIbAcgVU/AssQWIbAcgRWAxBYhsAyBJYjsOpHYBkCyxBYjsBqAALLEFiGwHIEVv0ILENgGQLLEVgNQGAZAssQWI7Aqh+BZQgsQ2A5AqsBCCxDYBkCyxFY9SOwDIFlCCxHYDUAgWUILENgOQKrfgSWIbAMgeUIrAYgsAyBZQgsR2DVj8AyBJYhsByB1QAEliGwDIHlCKz6EViGwDIEliOwGoDAMgSWIbAcgVU/AssQWIbAcgRWAxBYhsAyBJYjsOpHYBkCyxBYjsBqAALLEFiGwHIEVv0ILENgGQLLEVgNQGAZAssQWI7Aqh+BZQgsQ2A5AqsBCCxDYBkCyxFY9SOwDIFlCCxHYDUAgWUILENgOQKrfgSWIbAMgeUIrAYgsAyBZQgsR2DVj8AyBJYhsByB1QAEliGwDIHlCKz6EViGwDIEliOwGoDAMgSWIbAcgVU/AssQWIbAcgRWAxBYhsAyBJYjsOpHYBkCyxBYjsBqAALLEFiGwHIEVv0ILENgGQLLEVgNQGAZAssQWI7Aqh+BZQgsQ2A5AqsBCCxDYBkCyxFY9SOwDIFlCCxHYDUAgWUILENgOQKrfgSWIbAMgeUIrAYgsAyBZQgsR2DVj8AyBJYhsByB1QAEliGwDIHlCKz6EViGwDIEliOwGoDAMgSWIbAcgVU/AssQWIbAcgRWAxBYhsAyBJYjsOpHYBkCyxBYjsBqAALLEFiGwHIEVv0ILENgGQLLEVgNQGAZAssQWI7Aqh+BZQgsQ2A5AqsBCCxDYBkCyxFY9SOwDIFlCCxHYDUAgWUILENgOQKrfgSWIbAMgeUIrAYgsAyBZQgsR2DVj8AyBJYhsByB1QAEliGwDIHlCKz6EViGwDIEliOwGoDAMgSWIbAcgVU/AssQWIbAcgRWAxBYhsAyBJYjsOpHYBkCyxBYjsBqAALLEFiGwHIEVv0ILENgGQLLEVgNQGAZAssQWI7Aqh+BZQgsQ2A5AqsBCCxDYBkCyxFY9SOwDIFlCCxHYDUAgWUILENgOQKrfgSWIbAMgeUIrAYgsAyBZQgsR2DVj8AyBJYhsByB1QAEliGwDIHlCKz6EViGwDIEliOwGoDAMgSWIbAcgVU/AssQWIbAcgRWAxBYhsAyBJYjsOpHYBkCyxBYjsBqAALLEFiGwHIEVv0ILENgGQLLEVgNQGAZAssQWI7Aqh+BZQgsQ2A5AqsBCCxDYBkCyxFY9SOwDIFlCCxHYDUAgWUILENgOQKrfgSWIbAMgeUIrAYgsAyBZQgsR2DVj8AyBJYhsByB1QAEliGwDIHlCKz6EViGwDIEliOwGoDAMgSWIbAcgVU/AssQWIbAcgRWAxBYhsAyBJYjsOpHYBkCyxBYbiSw5k7TwNI/ZNv96tolYcdZA2FgVbsD65YV68IOWWCdfnO7A2tVtoY7cE4WWLMHa39TT3U3ZIG1dZ2BdcmisHxtu59kRewuWWCd0vLA0mfSUfOGw97Z+25liwNrY/Z2mNm/KszINvrPbnlgLcsC68T503QP1i4XLwonz18Wrs22oK5e0s5xTTYOunIobD+zP1yYvajb+lzoeTg3i+1tL+gLx2XBef3StaXLNX3oeZi9eHXY87JFYddLBsK84fLl2jD0XvjXghVhy/PqCawzs8DaKdvIG1y9PqzLPlXWZF9r29Dj1nO9UxZYJ92wLKzPfr+2ZLmmDz0P2sA9fO5Q+Onlg9nnUztfE/q3X7V+Qzh3oe3BOuOWFfn7pWzZpg/9+y/O1g3HX79k+gXWkqwMf3zZYL51uk3Lh6Jiu2yU3da2oedh25Kvt23oOeA10ZevH7TxceuKevZg6f5PzsLitJuWhb/8t33j1Oxxaw/6djP78rA47ablpcs1fehx63WgPZozZtnh0ra+JjQUFFudvzDb+F8cTm/pa+LUzmvip1mnHDF3eHoFlr7ZoTUb8q0GBiOORSVfY7R76DWhrckqaf0zZ2hN2D/7ADlkzlCrx0HZ2O+Kxfm8v7Lb2zT0etBzcUgWGGW3t2XoNfGz7Hk4MHs+Di3c1qZxcDYUm2fesiLU3FfVBhYA3J50GGDxmvX5IUINHQ5o41iUjQUr14f+LGTLbm/6iP/2+rVv5bqwMBt6XRSXa9MYyMaC7HnQBo5+38b3R3zMOvlhMubkEVgAAAAVI7AAAAAqRmABAABUjMACAACoGIEFAABQMQILAACgYgQWAABAxQgsAACAihFYAAAAFSOwAAAAKkZgAQAAVIzAAgAAqBiBBQAAUDECCwAAoGIEFgAAQMUILAAAgIoRWAAwzQ0PD4f//Oc/4aKLLsp/7XXoz11xxRVhxYoVnXtslzVr1oTrrrsuXHjhheHiiy8Ol1xySbjllls6twKbhsACgGnunHPOCa961avCy172svDKV76y5/HSl740fOQjHwlz5szp3GO79PX1hRkzZoQXvOAF4eUvf3l44xvfGA455JDOrcCmIbAmwd///vd8xacVYC/jxS9+cfjhD3/YuZfm0pbi4OBg53eT73vf+97Iv4+e83322adzCzA9nHLKKeEOd7jD/zQe//jHh5kzZ3busV1uvPHG8K53vWvkubjzne8cvvnNb3ZuBTYNgTUJfvWrX41akfUyPv3pT3fupXmWL18e9ttvv/CkJz0pnHvuuZ2vTr4PfvCDo57zr3/9651bgOmhisB67GMfS2B1nos73elOYfvtt+/cCmwaAmsS/PrXvx61IutlfOYzn+ncS3Ns3Lgx/PnPf853xesx3vWudw3nn39+59bJ96EPfWjUc77FFlt0bgGmB80b+uhHP5q/lnWoT+NjH/tYeN/73hce97jHjby2/+///i/fU6XbtHxcVhsZW221VT4PqY0WLVoU9tprr/Dud787bL755uGTn/xk+M1vftO5Fdg0BNYkKAbWHe94x3wl9/SnPz087WlP6zqe8IQnhO985zude2kObS3e+973Hnk+bu/A2nrrrcNmm22WP+f6d9l11107twDTw4YNG/KJ2unQ12666abwiU98YuS9dpe73CWPB23krFu37jZ/Rl9vMz3+OID/FYE1CYqBdY973CNccMEF+Qpw9erVYw6tBJtGW8mKqvh83N6BtXbt2sY/52inhQsX5nvB43tNgfXZz362c+v4FGjnnXdefgjyhBNOyH/V4XxtJI1F76Prr78+XHXVVWHu3LnhhhtuGIkW3ec//vGP8Lvf/S784Q9/yNeFmzIHU+9Tzd/UxPx58+bl49Zbb+3celta3/b3948sr+8rnimo+1qwYEH+9WuuuSZce+21+V6tbvT4dNbl6aefnj+Ok046KZx55pn5ny1bf+jszPh3auj50/eT0vMzNDQ08pxpeX1PRbp/PU49Di139dVX365zWNEdgTUJioF1z3veMz81ukrLli3Lw0Ur1PG2vrSs3uBaidx8881h5cqVnVs23ZIlS8L8+fPzof8eS1lgTae5H1oxauWrDxANrdzY4sVUpA/iT33qUyPvNQXWROZ16s8dffTR+d6v5z73ueGBD3xgvmGoX5/znOeEj3/84/nt3S5loPfFF77whfC2t70tvP3tb88njGtd85e//CX/s0984hPDve51r3D/+98/PP/5zw/bbrttHnK9ULQce+yx4Q1veEM+f+od73hH+Pa3v911/TMwMJDvnX7Tm94U3vnOd+aHRX/xi1+M3PajH/0ovPnNb85v06HWeFuRAkjL6kzDRz/60fn6/D73uU948pOfnB+SPeCAA/LHn1J4KWzj86FpCP/97387txrNSdXfqe9Pj0ffx0477RTWr1/fWcIouvQ43/KWt+T3pT2S//rXvzq3YiohsCZBVYGlPS2agK03nuYKaAWm699o60krQYXKwx72sHxORfHNqzfpWWedlf+ZZz3rWfkKQStbrTC1gtMb/tJLL+0aCtpK0krnPe95T/73f+tb38q/rq2sb3zjG+GpT31qvgLW0KG2r3zlK/nWVUpR8vnPfz5fMWkuSHw+9N+vec1r8vvWyl+ROB6tWLVyee9735uvjLSC1lZlN/vuu2++nJbX9/+zn/2sc0sIP/7xj/Ov6TatAA877LDOLaNpy1Fzx7Sc5rXc7W53C3e/+93zDwvd94knnpgfZkkpvvQBp38vDe1N0FZ0kbbk4/en5b773e/eZgtXdtttt/yDRMvpV21BA91sSmApIL70pS/l7+X458qG1mNf/vKXb/M+F80Je/jDHz6yrN4jeu3qEHx6H+nQpSK0Z2uitE7T3iNNuYj38chHPrLrfWjP20Me8pCRZR/60Ifm607RBqfWAfE2rZOKZxFq3Thr1qz8fRqXKxs6A1Fhqj1ckYJL6724zIMf/OD8e09pnV2872c+85n53r+UQlRhGpfRSUJad2PqIbAmQVWBpYBQvMT70Rytn//856PebBqa3zR79uzOn7KLEH71q1/NYyBdrjh0Pz/5yU9KI0u78dO9TrqsgVZk2oJL7yMd+v60Qoq0AklXumVDK72JTLRVLGpFFv+cPgx0kcAyCjut4NO/57jjjuvcOrGzCLXXT1/X2UXpsunQbZo8nB5a0IfAa1/72lHLnXrqqZ1bXTpPRkOhXAwxXasnfRx6HemCiEA3vQaWPsyLr0W9z7QBpZNStP5J1wMaes1r71RKH/jpa1V7qx7wgAfk/62NE92X4kEbKXEZjVe84hWj1l3j0d+rvUbxz+vviRt/Ke0d0rotLqco04bMqlWr8tu1bvrABz4wcrvWobouVkp7/LURGJfR0GN60YteFF74whfmG6vpbR/+8IdH3sPa26bLv8Tb9N4tBpzWlekJCRo6s/OPf/xjZwm7IOoRRxwxcrvWOTpZAVMTgTUJygIrhoc+gLuNYugUA+t+97tfeMQjHjHqvjW0pRQpDN7//vffZhmtYPTmTLf+4vjBD35wm70nOoSXrgwf9KAHjfzdY92Xvhc9FqkysPT96dBA+md32GGHzq2j/fa3vx21nFbsmusQTeQsQm2pp8toaCs33RMXh4Itrrhl7733HnX7dttt17nFLF269DYBqOdS109LKczS51gfUvG5Bcr0EliaKqDLpsRlNRQN2hut195ll12W/6oNjXSjTuuF4sk4xcDS0HvlrW99az6XS/el17fu6773ve/IMoq3LbfcsnMv41NwHHnkkaP+Hl04VRsjqeIeJK2/dCgvGi+wyp4bHRLUmYdaN2oDdM8998y/Fm/X+vnAAw/s3INtFKaPVd+Pwk/0Pi5+Tmho+Z133jlfRvS4tHcx3q49YQcddFDnVkw1BNYkKL5xtKJ5ylOeEp73vOflh/bKhg7jaTd7qhhY6dAKT282/Xd6ocw99thj1HL6gNZuaB3q0krw+OOPz3fNp8solrQSTBUDKw5tccYV5jHHHBMe85jHjLpdW5Tx6tCKGsWbVvD6O+Iy+m9t7ek08R133HHMyaWp4or1Gc94Rh6URbrvdLnvf//7nVvMeIH1pz/9aVRI6fvVSk7zHhTKulCpDrmm96E9i5H2MqV7D3Ux0/RQonb564Mv/fMaxYvM6ro86e277LJL5xagXC+Bpfep9kzHZbUhqAAqztHUHCftJYrLaWijReuAqCywtKenuHdKh9AVcOlyupp68bDYWPT36r0f/7w2/LRRlVIYpu9B/R2a9hCNF1iaQ6VpDPF2hac2nIp09fd0I0hTDuJ7XfNTNb8q3qYYiyf3LF68ON9AjLfFofWONpDjxrYOO+qzId6u/+5ljx8mF4E1Ccq2TCYyihMXuwWW5lVpDoEmamrFojeyaC6TdjGny37ta18rnSekyZ3pcloBpT+XrCywtMLUiiGl2EqX0SgeEitOctf9bsokd23N6TBk+ndpEm1KK9EYnhoKvvSDQMYKLO0p01yn9HZd1qHo8MMPH7WMVsZx75LmzqUfXPoe0pVicQ9XHJrEGunfXoch4m06JKqfHweMZaKBpde55iOlcaBo6jaVQa/fdF2kQ2U//elPO7feNrAULJpXWObss8/O9/bEZTXt4OSTT+7cOr5inGjdormekW5Pg1ChVZwGMF5g/fOf/xy1EaV5q/ozRVoP6ySAuJw2pPVciMJUk+zjbdqLprmhoj1scY+8NuD0/o7/FtoQV+CJDhfGjT39qnUXpi4CaxLUGViaNNptUrjmGaXLagKoTpEuo59lls5p0ptbK5WoLLAOPvjgzq1OZxXFuRZxaPJ3quwswk29TMM222wz6u9KV6ySznvQ0N67orECSyu2dGKsPgiuvPLKzq1OK0+tTONyWkGnW8jaaxZv0zj00EM7t4R8Lkh6Wxz694orcUWh9ijE27QXrIqzP9FsEw0s7fnVHtO4nIZOIul2CFrrnM997nMjy+o9rL26UTGwFE3FveKR3mMveclLRpZVeKQnoUzE3/72t1GRpqMAmqwv2uuj38fbtM4sboiNFVg6uUVn98XbNDQnTXurdLKN9txr6L/1fad7mPS40/WfTkrRBpZu0/pWZ1SK1q9xQ1CPXxu88fePetSj8vvQhprOKoz3nQYapiYCaxKUHSLULm19SGovUNnQHqTi1mNZYGlCajfaSkuX1dygbvRhrS2ldHmdihyVBVbZqcHaG1acqBnP1ImqDCwdokt3/WuFFiNSe+ri1eLjKLs681iBpb1v6W26f4Wn9h7p745Dvy/+XenkVB0GTB+zVuaiU67TM6u0FRtXwBo6lCuaLxK/pqFDrcB4JhpYOiyfbqxoHRU//MvocL8CJC6fxoIUA0v/nW6wpbT3RnOz4rIKJZ1x2Att2KVzTRUfcf5Tuv7VhqPOFkz3zstYgaX1rmIq3tbL0NSNdI6UJsrrZ57G2/UZoMev9VL8mi5ArUtgaC6Zfq/vRRtomjCfHmLUZ0FxGgmmFgJrEhQDS3si4htDx9a7jaKywEp3Y6f054uHtsb72VrFU4TTydjFwNJjKB5qE62oi4cl6wwsHdpIJ69qHHXUUfltus/079HpzMVDmjJWYJXtfdRKumwUl0v3Umkie7oVrQjV96IPnbjLX4cGdOp2Op8k/vume7n0YaY9jsB4JhpY2jDS+z0uN5HA0sT2uLxek+nGXjGwdCi/2yVFFBg6HB6XVWDtvvvunVsnpjjZXe9HXa5Gj0tTKOLXNXeqbO/YeIGlvfXxNg0dLtSeKg0dSo1Dv3/2s5+dD72PFVP6WbSRnjcdKo33o40rxZTmccavae+VpnnEyex6LNo41qFUnQQUv6YzGssuaoqpg8CaBGWBVcVlGjR0ZksZhUe60tLoNgciKp6CrGtLRcXA0gomvc5LNNmBJdo9n/592hoWff/p17v92KFeA2uiozgJtjgx+Iwzzsg/SOLvtXdM0aUPtvg1rWw1r0OHCeLXtBIvboEDZSYaWNoASF+LGor6bopns+k9/MUvfrFz620DS2cP631aRnt14t4aDR0a6/UQoWh9pMiJ96P3yS9/+cv81/g17aVPD91HYwWWDs0VT6jREYbTTjstPzNQG0lx6Gru//73v/MY0n/r1/QSFtrw1dXw40k+2sOly0zEPVPaGx/PotSer/j36ZCk5n7G3+vP6axFTG0E1iSoM7DSvSRFusJvuqwmuHdTdtmDNMimcmAVJ/Pr8IBW8NqKjF/Tc65DeWXGCqziJR7i/A3N+RhraOVbPBNK1w1L93TpkEx6cUP9t6QrVkVX+nuN4mUegG4mGljaE1Kcs6k9rmXzDUVfT6cU6ANfF+yNioGl91+3162uX5debkav+d///vedWydOe4d0hfN4P5oL+upXvzqPJf1e6y9dbqXMWIElOpNYz128XSecFK/9Fek51/dSPJko0twwTZLX/WjPn/aqxcs3aA+VYk60ARbnlWnSe/oc6QxEhRymNgJrEtxegZVOiNTQ5Ri6vek1bynufo4jvRjnVA4sSbfuNBSX6ZWodbi024TdsQJLK7F4CE9DKzntUdoUWunqMGW8L32QxJW/RjwLS6+NOA9LW7TpB5UGV2/HRE00sESvO+0picvqQ1+RUVxnaEK85memGws6HJae1VoMLA1FRXG9p+tA6TpPxeV02HBTaC9S8SSbOHRYPs5pLBovsC6//PJRe8K0EZeeNRlp40tHAnSyjdZJmjupCz2nivPd0qHnUc+daM+eLoNTXEbPu6Zz6PMAUxuBNQlur8DSFlAaB9ot3W0Fo5VFer+KLa10ojoDS/er+/9faBJ5Otk97oKPQ2f4dDNWYGkSenHSftzCTOkaQvrg0mFAnbmos47KfiZaelglHXo+4rwqfYClK/N06EzF4gob6KaXwNLrStehS19v+okCurSA5ozqbD/tbdLZhvp6XEbv3+JVycsCS+9JnZmoC4zqMJ3mcOq9orNl4zJ6H6Tvv17p8W6++eaj/t44tJHV7dD6eIGljSP9Pr0/7UXSVdW1N0+PR3vd0gnsGmV/pzb0dP3BdLk4dN2sGE7FeXFxbMocNdw+CKxJcHsFlnb7v+51rxu1fNyKi3tzdJ+6hpOCKV2uuMKsMrC0Byjdc6OheQmilVG3PU1j0WNNz0RKh/YaaWXVzViBJfp9erv2YulDIn6feszFH7ejLdGyENLPHEyXi0Pfo1bikX6+Y9lyxev3AGPpJbBE7+nij3ZSGOmQmH7+pS6nkG4caWiuVnGPUzGwtKEXN3q0DtIeGF0rLj1jVkP3/79c303rAc27Su9TQ4fhxrqkwXiBJfq+0hNVNLQefP3rX5+HVPGafFpX//Wvf+386dG0RyydL6ahz4X0x/zosWjDMF1GY7PNNsvnfmHqI7Amwe0VWKI3YnGXuVaQ2vWs05o1WbO4t0eHEos/B6/KwFLsFLdu9Wc0B0kr2LL7nYji8xxHtx+hE40XWPqB1ukkcw39G+oDQivl9MdjaOjDRCv5MpovVtwjpqEfAp0qu2CrRnrpB2A8unyBflZd+hrSzw7sRpOw9UORtacpPcReNhRHeu+UBVExsBQ4en8X11/p0JyubtfK6oXmOBUvOaP5mHofd6ONvuKZumnsiCa7awMpndvZbehxjrVu1vq1+OO3dL294mVktN5Nr8OnobmyXANveiCwJsHtGViiidrd5iUUh+Y/lP10/CoDS9KtxeLY1K0zhVs6x0lDHwLjbRGPF1iiyydoIm+6XLehuRdaGXdTPPlA47DDDuvcanSadvHv0xZyMXyBseinO2gupva8aONFG1bpz7brRvN/9Oe0B1wbEJpzpPeS1iN6j+nSKLpWVbcfaVMMLG1U6HIFukK79pDF+Yd6jeuwt36cVbfpC73SoXntrYqPWden02UQxqINH02QV5jpz+hxl/2MPwWo1k/aINKy2vDSulCPRdMqdGhfQTveJH2tH/Rc6D60QatrH+rPxSu2R5pIrx/Ur/Wyvi9N2ufiotMHgTUJ4kXk4nwovRk3NbB0Ebr0voofzN3o79OWa/rDRtOhlYMOCxZ/SGqkuRfpFq3mAXQLrHjhzPg9lq1stALuNs/of9lLE39kRvy7NadhvEOO8WcVxj/T7YfNao6UDgcUD5HEoQ8UTWrVrv2xxL1T+vs09MFVPFtL33M8vBu/r/Q0eGAi9EGuWNf7V+sAjV5+zp8O/WmvjS7aqZ9ruv/+++dhoHmUYykGVnpmoOJNe3h11qFiQWGlEKySLneis4Y1d0w/C7TbT7uI9DzpMcU/o+9fe/+60Q9z154+/cxRzV/VJRO0LtYk+/RQ/1g011Lfm/4+De1h09ncKX1f+vdKv6+qnyvUh8CaBHqz680RV3B6k2zKLl5tPWkydbwv/drLm01vXu2d0spN8ws0n0eTWrWHa7yVruZGaWUQH4MmqGolU6S4UHjF5fQ9dlvh6HvX96KJnJpzpDOTNGehbHL4ROnvis+P9lyNtZKM9CGS/pluP05I9Jh1xqNCStfZ0nOoPQL68Jjo3qXic6n5GGVRpg/G9Psa70MCmCrKAquKw3/AdEJgAQAqVRZYOswOtAmBBQCoFIEFEFgAgIrpsLaiKgaWrpulqQhAmxBYAIBK6VIJui6dznrW0Mkh+hFSQJsQWACASumHR+us2/izOXVpg25nKANNRWABAABUjMACAACoGIEFAABQMQILAACgYgQWAABAxQgsAACAihFYAAAAFSOwAAAAKkZgAQAAVIzAAgAAqBiBBQAAUDECCwAAoGIEFgAAQMUILAAAgEqF8P8YbsK8ajqa5AAAAABJRU5ErkJggg== | Lisa used several 1 cm³ cubic wooden blocks to form a rectangular cuboid. As shown in the figure, the images are views from the front and the top of the rectangular cuboid. What is the volume of this rectangular cuboid in cubic decimeters (dm³)? | A. 0.024; B. 0.012; C. 0.02; D. 0.027; E. No correct answer | A |
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 | As shown in the figure, a cylindrical piece of wood is cut vertically along the diameter of its base into two parts. Compared to the original cylinder, the surface area increases by 60 dm². What is the area of the rectangle ABCD in the figure in dm²? | A. 30; B. 40; C. 50; D. 60; E. No correct answer | A |
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 | A cylindrical wooden log is cut vertically along the diameter of its base into two parts (as shown in the figure), resulting in two rectangular cut surfaces. What is the diameter of the base of this cylindrical wooden log in decimeters (dm)? | A. 6; B. 4; C. 5; D. 3; E. No correct answer | A |
210 | 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 | A cylindrical wooden log is cut vertically along the diameter of its base into two parts (as shown in the figure), resulting in two rectangular cut surfaces. What was the original surface area of the cylindrical wooden log in square decimeters (dm²)? | A. 18π; B. 48π; C. 72π; D. 132π; E. No correct answer | B |
211 | 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 | A cylindrical wooden log with a height of 5 dm is cut vertically along the diameter of its base into two parts. Compared to the original cylinder, the surface area increases by 60 dm². What was the original surface area of the cylindrical log in dm²? | A. 18π; B. 48π; C. 72π; D. 132π; E. No correct answer | B |
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215 | 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 | As shown in the figure, the area of the rectangular piece of paper is 630 cm². If the largest possible square is cut from this piece of paper, what is the area of this square in square centimeters? | A. 30; B. 70; C. 441; D. 900; E. No correct answer | C |
216 | 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/ZxreTi3L577xYZoKVF2A1KkQHnNOZ0r4KFrCM4YCWrRsinzcTxjkBEhQmNJFQsWAmYUVI27QJYbgGQaqYJ3HNFq6rqVFHq74DicZ1oDMGburRBYkLlrQBSE1SdQC2rO1fk5BjWSMVtvHVHJvmLTgSx0XSCdUIbSdS9Eq90SASvYUdbI3YPJ+tJ0ixsZLAPHkvaKI0KvKfjJef/5N4MIVhBxXtFLTq3nBg0kJhvwGYEj/h2imoWfx4A0o/NHoBREIYq0VLI6RG4royCVFqmpcOPmOKNzZhkI2p462gY/X5AyV5yTsfQ7+46MzP7ZShHgjJE5lh7vuqOSfcWmIhTaK175H+JChGHdUGYIlzrzHnAbPtWP/PsgeMQTLVNQorkpvc6Prm6RKUCKFKosBDG54StIlxLOvWtVhqDbSDDTwUNVU6y+5vjTxjr+3aKg42fHhuBlGH5GhjmF5y5Q4oKx66ZDZhmwuWKM+mBuOG7jidSNizFS3xHMfO98BQRWnMzorDPPqrbOJahkX7FpoLak5HxWCzasCCoViVmUoYipTYs1+rLHwGpJn0YZnRq8d10+Y6BKU/sghaIhu6ikxU8QE4QcE3X+zne8syE0BOVO3xzYLzUerZo6kFhfuRaFQOE4AAn+5te/acYTQfvZeBunocKzLMQdvGoFq4Ti+1hHD5g75pGCrPF1XQQ/MJ8U1l1H1957jb+a0JSuo52GSvYVKwc1SaFL0S3OuCEKoUu1IfrT+bFsHEU69gWLIAd//tOfm89K5UEwodYFDj3cpUVcmQT1iGARtCJhHHcOkBeipZojW5HBhMe9GRCcHD/IJmQZMo54rARlL3hQxUNwo1hcBwHLZ5ZVy+ecfU6TsRknwSw3qIN541oYW9mTQO0cIkNxvMY8Mj5B07nHXFtXVLKvWCmk95QtbzWKsIqCfGPgtSJpCz6eLRPeskVKgbJjxqDTRDpP0SEyZB8+uQCTa1UgR96x7Zz2gdMWF/72wo2MwXZtKwfOB7kIOFsFFG/0/BtbASyUfx+ch3ENIFBKOYInUs0NyAEBxz8sMZaCMzFgngxZdQGfcR3AsREF5hYrCcwr88c2WVeO17mae4JE2D3riEr2FSsDkubDInGQfsdCtTiRKHL1Hum3NLxNHNrrhmyLuFnKvsJqsD1Kmj1ku1J4xJYDZEjRIx8FwDgHsH3Hs06g4tMCrjGIFlQdUsbmpHedlF2HUGx3nY0v+wgZC/6yOYFdtjEEgaddH3CdkLhX1F1YO+w72Q11L5AILAr96fmsEyrZV6wE/GL/YxRZIvXouqG84mFhiCIeV2xxhurMhUDh8bdtApbi26/tUfcCS6mN4/gj+0BOiINK39U3NG02KH/KOCCAGgs2jrEHwbGri6YLCqdxvVg4XqHKzYupbbSCu9ZUwYPaFwDgTW9+U7NPWQClL7sRFNg/pfNtu6OSfcXsYKFYtIgiSJ56oxIBGbsBh0JTaJt6Mw4Cty/KLXrF+bcUowUd/+FpStqu2wURgaBim1Qj0lgWjtE2kShFLIDEfQRIyivGi5JFglSvYzCmbLEgNJ/zXp+VOSFi5IaM52g7TMcOUYZy1roZBXa1iJK+dsHdHHDtKPrI5pB+TpG2D8hb8VmtB0495dTmOvp9tGbKLIylcZJlpvds7HRUsq+YFTxcCzj8eWQUBGEhhkesw4Pq9v5lwaMNTx4Z2zaSzL1ZqAuUKhJdFgiSjYRcjIWXQMgKYScgbOSHlJAeQnIOPicgRAcQnzuCFxJHYAhdwEPuvGwZlO0ZY+MhWAgMAoGXwCLATA0C9kk5g4KqYOh4Keqhgi0LpX0tIogQA1EojhrLMuDVGwedXDEnkLu6kDFVi0Hwxs1jse2zbQvtVFSyr5gNlOVxxx238X20xCG1UPXUFFVKpXovu2VZIA6LGJGFak4hxaciS0jONqak+YgaqSJdAUetQNDQH+7eAceAkEpBCU9pf1TTQLaeO+Q6IEBBV1FTRpH71Mo2bJeyl1UZ3yG49vH/Btqg5KlultlchVOBWhGZXUR0RMGWCAlLR8eOr+w62WVqVe1UVLKvmAU6T6hXKjUUGjUZN0dRgQgQESJmi4/ipbqmkE0bttEVOBCdwIJ0ebaCwZywX6oakX74Qx9uzp/FQQGnwcJ5G4+pMKZTO3ucs/GPYjZQ4ohPEKT+BQBZB/KfEoyGwOaJ1krZiccsrAoK8ogcZI3mlzmg9df4yTA0DLg+FL3fI3yB2dedjEr2FUvjm9/4ZqOa4hZ+NkKQPCUZ6bT3+D4lXOqSV9tFwn5XciNTCoQrmCAvhAYW9BzWDJKwTecpyMliqNu//b0/c0AyyH6qepURTSV7CtYxDsHxCUiI2DkJAKyPKdlNCscctQ9gobgOXnPD/QMyjdRSYteYd667+WSusY2MifcifSLB97KAnezhV7KvWArUOosCLKhorfR9LHILW+dNXyeL94bNE2CjCBgW6hhRtSElp+QRGNvE8VHgFCsFPkW5IhCZCwvK+Sgql2QkSB7RTLWtWGJTyd5xl2QVjlWgpPTZK66PekLpuHm/WkP4/AH1CYpaIOGvz0Gwro+MsevuZMredWclUe+uG+vIe10PmYBj9LPWTHWInYhK9hWToQMDkVC40ZmBVNIOHKRLLQoKQ1CwTAkJuSBUxIPwS/rbKTe+rUXs7tko/rESZBa5pEUJ8pR1wyALj3po3wdQAscz1kfeB6oz94auNj542gcb4p4Kwa25yey005prlNvGKtjKrMBnHL+ghWj9Ph4S52tpELQt9pzML4LK0PgQD8SHOcXaQezUPUtH66iAQJCoiwjo7QC1E1DJvmISkJ7UN25WQiYWHCB2Ch9RKyxSb2OwYFkvgocXW0RXDVDnFmWupcCrVZAEi1tmYNvIKmcRU4mOGcELMqE8nVduP3kXkAirZAqMrXOZAoF4mSDl88ja9TS2LB4dVsa0y37rgmt5yCGHNHUC4OO7zhB2Si74/j5jPGxHoMjp6jLHBBvXlBWH9GWB9m17rrPgYa7FEzZ3EirZVxSDnUDpQarq0+IsspQSR7tgDuLuTF06UmnbRnIWpO3mqj8EREXrwkDQOU+IBItdFkLJI5J2944gwFrKzQzaQLhTrRjkM5Xsnc9U+0gm4vNtIH9j62/Gt90B1YYxcz1kBhR1/IcxQb2vZtNGvMd1QPKOwXadW0n7pGt4zDHHNJ9hVyF31948Q/rmHrtHv/7YeW0nVLKvKIL0O+yZUPUIMqwbC9/iRfysB2SddoEMwSIGn/PsdgGDCrPocrKDFBYpJY+QxsjZQtf77v2hPPvAUgprohTIKe7KLYUxnUL2xrSLrHMh+A7VTChhtZhQ6mMFdYRNMTsftprxzL2RyrWJecBaMjdYieaKp5vmZF2ClyzD3FWIjm4wQcc8MxdYOqwl89zYlbTsbmVUsq/IBgJ1m3l02lgsYd0gIqrIwvC78N8FAuTdRwLeb+FRe4CYqS2Lzvamqugc8GqjW6irsNcFHSrxDzNKwYaiKHOtjxQyG7ZJKRyv8Z+CuDY56pbFE5kZEh4jSNYJW2usR78N80qAMB7IXYZATFDjgvUQBAufNbcAuZu3jtuNYUjfdgQOX10nj/wIUbPdUcm+IgsWAvVOKabWjRZEpIzILBpeeduq8DO11AXpsoKdbackaFvU4irgXAQqZCOwlMB5IowpQQghIvsIbCXQ1jrFAqJO41qVQs963BiXC+PiOAXQqbZTwHgprrtWKSKQIGGkDAIaYTEE9ZL2zVOKtu62ddzOl6XDFrJdVqCsgxU5NSPbSqhkX5EFpCG1tYhBQVb7nIVnEfne76KnPRcWNLB9FHPBNqXrujkCSFnRV2FwTDX2QTBBCCyEZW6gcZ5TP480gqBKgOyp9FIopva1vI7BNf/ZT6dZVtS2uYCElxlrKttxdMHvEbFgFtlmKQRvc1pGYl44bvaS/cr8zEFChKCZMv5bCZXsK0ZB/cRiooYpHiRtUVBCCl0IELEsA/aI7XRBoEH4FqbAUmqFIByBQhCRvk+xUgLsgLiBrBQIo6RoHZiq7GVhfVnVEGRwUYSfCseLKF1TNZHSIjFbJiwzylvtQN0jEDUQhd9lwKYyp1l5LCjzy/74+0if1WS+yMqmdlNtBVSyrxgEclJ409McBCfdVdiy2FgSblpqp9pTYIG102z7p76o/vB3pe+5LZBIC9EgedsBpLFMYHKcCoRp5pELHTnpHaW5mHJTFRJzzaYENvUBxe2poJDtO/xxRBrXIbK5IfDm2xaS+UZ959QQSuFaEi5Rg5IBCgD2ZU4KfDIk2UR7jm4XVLKv6IXFRdlQ82ABxA0w4WmyX+JBU3MCQVF2tg+yB0U0C41SFXzGIFDopmj78oiI4kxVYin04PfZC0NgDQiUpWBhCbIlQLBT9gU6VnKL1l1A6jFvAkhekHZNIgh0wbWX/URwBtmBIGnOmWtzzzdwTK6pDDCEjeMw51039qHxDLtxu6GSfUUnKGIdDya4IpkiKpJkhyhQSnER7zOf+cyG+OaGBc+L5fv6ylOlNgUfim/oTlTH7pgo+D5SUACOBT0FAsgUhY7AZCalatu1KL2DluUw1qHSBUHQ9c5R4F1QADdH+morssHozx/bRzxAzbVHuq6nuWAesFzmhG37hyzxhE7BSs3B71l39u/mLdlZPLZ7O6GSfUUnpPDa2oLQ9DNT1kgO6Zv4Ulsqn8oeIj5K3KL1uRJoz0Ny9skCiG6LVPG1YTFaiDmqVNCY+ggCoLan9NwLYAJSCZBOqdcvs5nSrqkuknsjWheMa86xmlOExFBNgYVonJG74G2usdBAt1Zp62YfCBc2jmNC7LrKzDmQXcoEWTrmu+yCwl+m8LwrUMm+4n9A0YTqldaa3GwUE53iEwgU/tJb8C2IaFtLQcUhX4U0N7/k3NbeBQQZt9d3QSCR6iOE3KAiNUdMpUEowMOd8vgEFgciLsEUsud7O8dSGJMp7aGAAEtaPQV0hC/T6gNCF1SNWTQKIGdjMnYTVw4EREImzRYdk/lmLHwPAoH5Hz34WjandFbtKlSyr/gvSOEpaEod4UthLTYdLCY7UPVdHRD+LjCkassijsVCMQkIQ35tFyxGarMv5acMdW1MUbGC2dTWRERDdZYGC+Mb6jQXiK00C3EtWColQKhskqmYku0YP9fBnBqytyht9pwANlcrJIEQYqYNxB51B3YYr94cFBT8jeDRmFBqye0qVLKv2ICJLD2N2+upae1mSBqkzZ4M6Pd9oHQsCgQcaS4rJgqtlHCQfy6GyJQyFAhKA0iAr4w4SkkxwFZoF4DHMOWGMQqzhNxYDgJ0X82iD8tYOLKqqTdwgcwFufZdb8GVCKHCSwKfzwkmzk2G6dlLslLWous3tD9/Z2c6N0Dw9i84GFtj3C5Eb1VUsq/YAJKnytguSJ8lw1vWjmZCI3De5dhNTYIG8txvv/0aotfWRglR9QJBFN2WBVWFBJcF4rCop8AdlqXHwCIpJQiKuYTsBb/Sc3K97WesaNoF11vGN6UdNQV7RoG0NIAOASnLjAgNZK9VeGwOB4y5wGzuO79oRnB3MNLXDssuK7XYdgUq2Vc0oHQ89ya6DJAYxRs3OelLN7lLCosWFkXP29Q2aAFT4ssCGdkuK2SKLdQFxDjU4dMHxWLkVOIdO36kUTKWpWTPUiu92Yiin9pWaH5EAX0ZmG8K/67tlBuYjG0XkbMnX/CCFzSZR3REESI57be8+yOOOKIRKQKHayHA24/AbZ0IBCVzYFegkn1Fo8qkx7xHJGrysmAsHAuCd68omxZkc8CuoKaic2eOxWCBUVJhNchEeK5DHTo5QPRTWzER1FDxuAsypJKbpEptHKRW6vEL9FOCMTXufKZkBCmcn/lmO6wVdZgpihmRh0gJqMs4P3NYW6jMSrMAxZ9z3AIZK4e4MP8g1ooalfkT9udWRSX7imYh6JSx0BByqJVQ+Yj+iU984iihCRqygyAZC8DNOQiahxz+sa8KXm5LL1FvtqNI1+7ooWIFlGXJRsCb0rutpoE0SoCMS+5QpSZLCtBaFaPWkgMe9NQbsMyVZR8j4Fhlju3aCUItCaSOg8fePp6YG+zEqCUZT3N+DETQG0984+LJT35yY+ewu4gXmSsQHAII0TGn/TQ3KtmvOdgrSBfCh4zFJQiYwFSQDghtb9L8PhUtSLAnqB8FMejqVEBylJKFIRgoeo2BF4zo+1rd2AjLPiWTreJ8p9yO7xy6Ojr6IKjEGOWgtBsn7oHIhWs+pTAr0C5TlAUEykfvI0rzMNT0EChv81em0QViQf3J/sxBQWHsmrEzzVHvp+DNf8HNPBRAEL5AbKzNf6LJfrYiKtmvMUxWJIUkkYMbkahufinFY/IipNQ+sLjHeottQ2Dgg3epbfZF9EsLBoJN2q7ZBhJG5mPevExk2Wf0CEJTnpuDjEr2jWSo1ly4HrlkTx23bYwxyIxKghXIApHnlF7+gLlCFY89CkIgio6YLiBlc8oxsYDM0ei4Sc+Lmj/5pJObzLKdRXShqTX94v+DkPUiM7Ad2VO07bp3wnloW51y78VmoJL9GoPHGJ0kJrB/zh1PGWSV+LeCpW2SKSyEtDuDrUN5Uc58VQ+1UiBD0n0dOoje3/vUWgqBRWtoqX+ewjYcV87+UlCLgmRXcOsCkhNkc+sYJWTv2pUUZxHjlN56wSq6U6ZCsMgNeuZTXyA2njH2sgSWFPLfe++9JwXvPggkts8OkuEKJJS+86DoI0uZUuxfNSrZrylMUotH7zGFEsVCCtVkpWiomDmKqgHq/aCDDmoWB0Kyf7aJxdhl9wgUyCSnYyJgwdl+6Y09KShCi7kUzqXEu/b+3E6iErKXjZUoe4Xp0gDpmpgnSHYqzL3Sm8tYjWOBDNEKXoKp83KMstauOTYFhJG5SyyZa1EbYXdaS5S9v+cG/s1CJfs1he4JqbsFQD3zXXmPlAnl7caTku6PHFBCFgJCpLiGiqGCDDKYYhFQ5RZhqS2RQppf2gkitS+xZpBRFAvHgOzHrI6AY//Wt/MCA6XqOEraQGHK+KRA2M5pChD4UHFbIDr44IOb+WPMzGU1D+JlLsK3XuI+BvuwlqKuQGgccMABW673vpL9GoKK53/yp9NiKuJhg0h/S3u0c2GfFoa2TOqzS/1YkI5pmc4G6lwqPzUz0YKoGNd3d2UXHLfxy20DRRK5mYBjyQ2+Ctm5NhSlHNZdLqbcSJaCZSerKRnbNsyjPjIV5L2MV1qLIHBKssQhuMbGjX1jvfD/46Y08845Uv5zZsbLopL9mgEhKSQhJYsA2fLPpZ8mqJ8pvWVU8RConjHSotqWsWECFODU3nmwWIcUZBfYTrktj7KW3KCK7HP68tlYAmWuveIchx5C1oUo5k+Bc5Z1lXQK9YFgGTp2ASnIXe0pWonngseGyBbAV5048SgRx3XUUUcV3ym9SlSyXzNQQ7xfKt5zPRA9hSWNRyg89bGCloBgG8h0buXiePitT3jCExYPetCDBrt0coDMoh+6FMbFAi4JfLIR45gDhJfb2557U1VJzz/1T/mWgFVxxunTivZqMMYz17rKgcDRFwQRrflE3Pi6Cg/d3dMvetGLNkhfvcAxsXlcX2JhjsA2ByrZrxFMdraNBRcLJJ5UabJajAKAVkh+at8kjWeMWED80FwveQzUkG6d61//+otLXepSzesGN7jB0v+kgrcq7Z8CNofzzAVFLbVPu5D6EMEkx/bJJXuFwdxgQ4WWBELzQSDJaVlsQ0bJRjHf5oJz1QMve1NrasM+jdkcWWIb7DfrxnohTuzf2Lj2kfXI8g4//PBZu4GWQSX7NQKP3MQ3GXWbmJihnCkQz7AJn5yCY+34vUWTQuErOkOkySb9sq1mjgPx3OUud2lI/vKXv/ziGte4RvP9Va5ylaU8YsevnRJxTwHyLLkb1TjnLnB37bqfYQy5d9AK2lEoHIPzytl3QJY0NWgi5KgNzQFdPKxIAVMQ4p/PnWXKdo1nmhHI8nj0BJHaBSB1bctRf4mbu9hGjk8NZRUBpxSV7NcEvFwTVLtctNkh/Uc96lGLq1/96s0TKtsFU5+xiKiXIHcKxoRnP1i80TWzzI0klKJt3P/+92/I/YpXvGKjlqiim9zkJs3vLnvZyzbp8lRYuLKaKUVffehUaS4EPsElB5RuzjOHclsvXZMc60uQzj1GMFd49VOAMBHkHDAnXQt1pRRaeedU0MbQvlhBSJ1gcB7mULswLGDKMqwrpC+TtC68rJ/DDjusIfxdjUr2awLqA1mYtCYgHxOZXvrSl95Q0n1eql5wLYXUSaT9SJ/SE0Bsm4KZCmrxIQ95yAaph+dsm7KGO93pTs3fvB796EdP3hfSFqSmeKgKfCXFWqouR825Jjk3NBmTMbI3LjKgHIXrXHJsoQAVXZLdBJZ5kmYbagwUc192wZbKyX4C1kI6Vsg9iriCpn9N6JEKyFx3lmJ6X+FboDFG7Du2nNZUgSFsK9dvV99oVcl+DaBvnrJSOJL+moxI+jKXuUxDoPH1JS95ySWf6IbPSlVNel7pMtZKgB+/5557bpC5BdKG/T74wQ/eeM/d7na3yY9KRnACSNuaGoNFTF3n9qMbo5zgQDV2nXMbyGKsbxspIcMcsPFyLRw1GQKhFOaK4JrbijoE9Ry24lgWhHRzi/qI3pxPH6wnw6TC7UumS+j4+5hAECjM0/ee+t5GSEWm6/rKoLbCPzmpZL8G4CFKM8HzWx73uMdtEPwee+yxuN/97td8f93rXnfwIWCUlYnMZwbqJ31ODgLmLVM4uZ0jT3rSkzZIfCjYSJEFBcrfe2984xtPvmkFCU9Rm8Yw9/k3iIRiH1PZCDenI8e4jhXCEYuxH4MMLvc8ouBc2orr/QhuaotmCvMX+ebcbSywIGzkOwTBg6VJsKTFdOdL3ctkZQqC5wknntBYWGM3+CHzmFeuhc/IDOJRIOoWufc/rAKV7Hc4THqTjHo0sZF1ECY/nMJnx/Dt+wjXAgjSsj0v3r5UNSUBk9uCRCb2N/RcHdt76lOfukH0vh+D4ODO2yjcOmZqagp8bspnjVduVkGN59w0JfiMqV/XbqzPHoHldC4hpNxiNZVb6oW7tlo652ixNMdkIX32SRcoewGiC6wuGZoAmwai9vaJC/uNTC6no8u2dW7ZtnkSGQb7TdDwLz6ntgHPgUr2OxwWddzCz3oJRb/77rs3qWkQtv/i4/dd6p7CeeELX9gs/CjgWgTIJQXv3isgiPRZBfr5I+jw4XPhmBW8bnjDGzaftY1c66INhb6SxxsAxUbp5oBnn0OUUv6xwnEO2bOOxrYjqCCuMeULlCwLorRGgiTj5qKpcJzEw9QH8XkKZdd4Oe+09kCcIH9rI80c2J6unyBAFDiWHDvKtYxAI3uSPfj87//wn3UgGHS1iW4GKtnvcFASFObTn/70DaK/wx3u0KT7PPywEHRnhLo38VMgEL6lbVFs7JN21w71Ih1m8VD1AoOF2rVAkEEcy0Mf+tBiMuG3U063u93tmm14yQxKt+O4LeK+J272wXmNES8YI+M11nMv4Iz5+7KzsX26zmOPA6D8c9Wl95UUPIGFsqw3LXNi2yDsqUDSbMa+sY956drLdHxNW1ZlJayzCDhjdlxAgPBcHmtLnYMoIp4IH3PB9pbpXFsGlew3EcjIRd8sKGaZ8EggtW4sRkRELSJe5EyNPO95z2veww/vI07qh+pJU2DbM5G9dBwgCMWtLpUpCFzpSldq9qOnfkpnTIBqvsc97rFB+A94wAOKt2cxsrZKvGXKDBHkWAt8/rFgIvuSYQ1hjOxdL+M/RkrIOKeAKYMpbZcUtKKeMxXOca67bM2/qFW14Vj557JagQXaY2dMc+0jQda5uwZHH310YwOZJ35H3UfHmvlG3Q/VxlaFSvabBGr42te+dkNKz3rWsy757WohsDztaU/baK+8853v3JA1BcP6iA4Lk1IPMVIKdZ/TIQIUUrQEUjRIUFEqvM4UxuBa17pWs/3b3va2SxF9AFE+7GEP2whmt7rVrbJ88hTUGMIfU+ApBNEcBcsKGSsGuyZjds9Yn717Fdq95204FhnRGAgBhFsSAJE0y6e0yykFAtYpNce8CMhkuoIbUfLy41/eWILeo6HAdWrfRJULtpXA4rMyRutL1hwBOpoX/NtOqr90js6BSvYrhmiuX9eNQsjI6+53v/slf10dqJpnP/vZGyR4m9vcpiE0fi1yoeTTlrOAz3j/kLpvwwT33lDyJnVbhVpw8RiEm9/85lnqMhc6gp7ylKcsrnzlKzfbV3fIvYs0IBCxtnLJyvny/FOftwvGRlAdIjDqkWUxNN5jrZcC1lhxFiHJuMbAUkprL2OIm8iWUasCVW62VAJqve9cBHfq3nXUOUQ4OPcp/56xDfPPenDNZM+uXwRrv7cOpwSVZVDJfoUQvfWEIyCv3XbbrflK1a4aFEv44re85S03rARfkVrf/w1FwhGYctV9CmqQOkpJk6pB8LZ5netcp+hmnlzIJATV613ves1+nAOVWAJqnV2SCws5p4CocDr2Ptdj6KYbZDHUQWP7cWd0FxALtT6mmv3d/OjKzLrg/UREbodSGwgX2bL3VgVZk2vbBe2saVblOIbGORcyLXYOUmfxGP8QFJS9ADBWX5kblexXBOmaZ7ogHupat4vWrfg5VzVPQVoA5YsrCJlkyNtEdlffkHqJlsgSdR9g66SdHsggnnfDq1cX4Buv4vwtKJ7pzW52s2Z/Xsa9BBRmTgdNwGIeuzOSevS+IVC1Q4U7HUBDyt61bXdHpZD9mBdj0DmSWxh1DSn6qcGbMGB3zPlwtBSyLoEEuVL3XYGO+JHlRk99yUPvxnD2J85uxp2dKtCaW2GNUfkl2dMcqGQ/MxS2FAqDbKj4SK8tjlDNYyn3VKTFWGqa6lIwRYTxiAMFqSG7Yll1H3C+97znPZvtIHokKk03yQXDZbothiCzSB+x8PCHP3xU0aZAYH2FvTYQec4YIdEhn1baP9QGOubZKwIO3fRD+Y/5xIqigmUuFPhlLVMgcJmHY4FyCthJgqu5HwFQ5tEVTK0D85CiZ4XNCS2eHi4omJn31L79IH61E8c4t201hEr2M4J6jgInwt1nn33+x8fU3+7vU3vDh5ASffTR8wcRPLLQSkfBjLX5wTLqHnxGW6VtyDJ4oil0QVBRrJYhRToVAtwDH/jAZv9eyD+3TsDn1SLXVdPoguAyRnoyqT4rARxb341AoHjYp6BlUu76HCIOnTVjBWhzJPf5N+oQ8RyZUhgHxcuSAJwDxB1FXrWJ9njY71S7aQrMI0V89prMTZah9z44AfGvKqvpQiX7GWACBbF53ehGN+otED7+8Y9v3vPkJz/5kt/Mg7ait5ik/gjEoqLsET0FOHRTh/dZKP4pw+Uud7lme1PUfXp37CGHHHLJb/8X1KQ0m2c9VuwsBaXrcQxXuMIVmuPwbPwhXzuFYzGG6R3CfaDYLOYhnxsRIVzv7QJiGFJ6iLiP7FkFQ1kBFT1WsPaenAeygaxnrPOnCzEG6iLm2ZwwNq6XVse+oOb6rCqj7oP9WT9h3wim5rqONVlU7pjPgUr2S8Kkj5ZKLyQ+pFjYF95Hac6FlOhvf/vbb7QEUhAWpnRZ1oHoxvr89eZT3BaMxx8HSZao+7gb10ubaU56rJYgEFE77X7nZWAM3K17zWteszkedZRcoqLsLch2dtYF4+zYh2BhD2ULsr2+QCyY9D0bRy1oKGtwPYd8ddfWeeYobccg6ym1H4wh6yKnXbUEAp25bdtDNlZAhpUTwHMxFrQUYVlorg/7xrEaQ4HPmAjwcx7PECrZT4SL6Db/IDWEmPOsFUo7SGcOpESvECqFlfJbvBRUpOUeW+DnI488skknTfouUnVeFg7FnXr3/M8ceLZOjAl1X/K0RAuAxUQJ5XrmubDI0kcs6NzJgePIfTyC9w0FNhngUKHWuPdZTUNkL4j0KVZE4rob2z7Eg7/G4PhlYblPywzw5SnZvuOfgrivwFwZutmsDep+TPCUwDrqqjtYR2pUBMy+++7bzGvrTQNDqH3WptenPlnWJjwVlewnwGRh1QSpIf3cNirRPMg511LoQ5voTToLgFKjvPjWyAXRIV1BgHJUqHPHJoWmyMYz934qxQthSYl9Lp6ImePdp8fDrlIQy/XJU1CYjg/5jd19WgKLL33EwmMf+9isjIUqy3nEgMA61LppbKn3PrsHcfR55gJJX4FWRtE3zkh86O5c9oJAMjYOMj0CorSIyR4yl+IejGUhaPG9iQ/nNsUOYmfmzksknWY8xlp9JsZLJmyeggDkbyw3awdPKOBb52FfybJdj9i/ho6xu6fnQiX7ArjobJogC/YNsiyFDh2fL+0DT9Emesem2IPQkTjSZ41YpCamjgOFxBQKeyailjwLBwmZnPxq26EYBYy0M0fa7HdtdWfCxvGoXzieZRWUBWHROBbHNQfYGfe+972b4/RyH0ROoBY0cx4LLKgOKU3XBNl0wTn2fVY25rNtuLaOK213TeEaDJ2fbDRHGdv/UOtnFxCjuZhjg+XAvEOWYTNOBbtnrIYhi3H8BxxwwH918URxGaG71s7vnLPPacSSgMyPbwdE68pa93vByfoiPJyLoGUbc83vIVSyz4TJETcGBaFNrexTlLahW2cKuogekDMyBhOKKpF2ayUUlMaeN+J8+L8UJgLQD2+iR7HVc3WoQC8tZdSKyWvixj0FjgcBCSJTVH0XpP9UpcU1h59vYT3mMY/ZuBfBdR0jMufpvIe8b3AtLOw+pey6uB5dEED7CnaIpOsYba9PGSI1pNQHGZ5rOAbbLylsIr4QC1OUdxuyAmMq4OT48jkQcKNomsI1IGo8DNCab2dh5nRkeVS5AOwajJ2nwrHrrvEBubMHI2AJ1tbcqlHJfgQWbfrYAa2VJsMyCF9bD3op+oieekKG/k6pKwqFkrBALNg++yBgkZqIzs/2FBORvwke6p73GrAYvD8K1IrOjsc+TeA5C63Sd9mH4OWYliURSvj5z3/+RpByXccyEYtTyj7WG64uI1D2QRBGEG3wcwU116GNPmUt+CDWLiC0Pp/ceNrmWHFQIDevcsEmNEbOcVmYSzJURD93e65r2GWLmfchmMD4xBMywbVx7bzHcZmPRIBxGoLrZH6ZQ+aea2mtUvYCeU7NZFlUsh8ANROWi9d97nOfJpovCxMjCKYEfUQPCDBsBr/3s/ezQai73JtfEDTLwiSmzIKwQ92rVZjcSIQFEF0u1HEoeap+6AagZSBgIQBBZg4/33kqrjsHYzt2/4PsRxqfjn0bFrNMqk+FIuG+Yr4x77Io+sjetrosCWTuOPvsDnN7jGCo1hKbUr3BPpclZoTqnAiLVZKgm/v6up/Ynv5H84EHHtiso9TqMqYCbDr//DwUOIlG89Z1jOYJa8jvnS+BtuqunEr2HXABXvSiF20QK/WnZXIuIArb9RqzBQJDRA8WxXHHHdeockSicIR0LHqKYqy7hZ+PaLpSW+CX+qfk9u+ZH7oIorvFg8fSIEjZlnZslEJqj6gFs2X9TuNzi1vcYuOayOT6bBiwyC3Oofcgh75MQSHPNXJt2pDOh+pPsxcBu0ule3+XXSar63sej/3b3lDmhbjZDn21gDa+8tX/PG7ggvOXu1dC3claS4XGqmDtdRWcrR2Cxv7NeyqedRPzTMCX7bhORA3yHsrkAvx81pnrbn0IKOaRTJ9tNNUWzkUl+xaop/RWe8Q6dpv5FHgUr+3nKKcxoqc0FI6QAwLizetnlmZSWiZqmop2wcRzM5VJTlHJElI7QVHsEY94RHMMnj0TY8TCSRWnBbAZ/mPAYnO8jm8ZcmBZ3fWud23OyWvs2fiU8VDnDbi2iKMLPttVcEV27UI6mANtsne9qcWuG7W8v2/eIp2ha6Sgy17IDdjmV5DjVAguggVLo8viWgXMb1l22xI0F3jsSF5NIxR3+j7XDlEb/1x+cI7WJFEWVlcQvCxwzApaFpXsE6QPL+NR68UeUm/L4JGPfGSzn/322++S33RjjOiBsnPDhonphahNVJMT8ZtgJTDxkH8ECEqEx5l6914eKdyeoGyFVVk4fbBonbOsRvrfpZhzgOQ8Gz8Ktyy8IdtOt8bQw6xsT+bRdTyygy6LAqFTim10KXuWlv9r2t4+0hVMugI8whkqyvKsEa73jcF+BA5k3ybMXLBRwpbL6QqaG7KvLvtE0GW5ODf3IZQ8L6kP1pVra4xlTOwutTRBQ2dOWg9bBSrZ/xsic/ooYot82R74MUSRloLsQw7RA0KPdBQhm8BIxueRBMU0l61yr3vda2OcqLkUSMf+kC5VSz32ecargPFxTPY/1TcWOJ773Odu/DetsWfjj3WqUG99T7NEcu2iuSAtcLfhvNqWHyur/S8kwfH0FUhlQH0FZteP95zzvBbzSdY49UFo9uUY2YE5z9ifEzIHmTB1Hf36XZCx+ruAzs4RQKdaLUSjOXnUUUc1AZIFKZg49wg21stQNrks1p7sEUP68DK3+q9Kzafg2QaZdCGX6IF/aNFTCCYxEqAcqC2FWqRiUQkAyGQZCCaKtHvttdclv/l/WAihfgQfxOK4KElKdqr6K4VzPPGEExs1NtXPp7Tiv2rJ9oxdFwQHpNeXylO/CLQr6CG7dpHZ+6nJ9hzsUvYsoq66ACXalZEgrKHOGnOyr86Qgs2BBMdaefsg83NnqZrCMtZPCYy/ICiDIH6MvazCnOwKNn5v3sZ1YJX5bF9NawhqWFwD88S6dt1sX6AXUKxPqv6II45YqQW6tmSPmNJHEesmcVE2C1L82HdbLZQQvUkYC9jkRQjsBam4lNEEDZhcY979MrCY2t0NyJAi1eFjgVP8c3Q05YCSMgb2LXUuBUWX3ind92x818B49xGBLFHga0MgQuJtsMLaQcqcaNtjiKGt0gW6dsYFSFXA7xuHc79wblaLJSVvTKd0jjhW8xGJDt3oNRcIHlkKkqWkXU9CqA3BqyvbUXQlBgkWZNzVDZUDWVCMuznpHhVighhRnyEUHCse6Cuqz4G1JHsLJ314WdejiDcDHkFg/yJ7oIToAblSKlJMixVRWEgmj4W/ysmTwv4ce5c/HRBsqCjpq4muiDxFKZXA8bBhEBQ1N3R8XaCG99hjj425otbSNVeQCCLrKpaCa9zlgyP7tsWm/uA6pugie0XEdlAgWLrqCIirz3O2XQFiLPOi/PtqAUMwR+Omotxi5lS4vrIl+5PpCrLExtB1d126iuI+47OOmWiZA9ama/HXv/y1CcAyYNfb9Q0xtCqsFdkbaP/IIhYu1ZaTtq4K8VhkvbxQSvRgsUtRpZsmOcJnOSAe9sFmqWhj27YkhoDgWE7UJlUsK2j713MCCVv4VF7JcYLjetCDHrQxb1ybrnbHIdIMW6v9N10dbUWtOI5YU7TJ3naowzS4mAPIoj2OCoOpJZFCsLXtodoKUkLy7WMaQxTOBdpli5tjIGysZYSJ5Cl6AiQHxpLinovQxxCPXHCs1qmfBRzBhcXTzo7nwtqQPWUVN894eVDXKoshOdDt41iQ/hSiB4tQ3zuSQZgmvUlu4lC0UwtKpUBQU1vmEA7C4wNTutRUFzHNAcRnH14lY2M8ZYBxrwGh0FXEZ3OkmVoKZNkushozFkMKgaTd5dQme+paoS9VrD5HPbdB5XYFOHNMp9bQdRPEkXVpw4IgJhixFHNJtxQEgzlu3iBNYz91TQtG1s5mwLWNeSBYh0gzD57znOf8T1Y3F3Y82bv46cPLEH7fYtxs6ORwTIq0U4ieErHgKTnK0WR3MwoiQw4WwJg9ZRtzFMlM4DnqAfzT0z98enPsApiFMGYvTIHtIjpE2Ge9dIF/GwV9hVvXsA3WWVfGSD3zgNvjbezSYidyFLhTIpelpYGCZ94mYDaV8UvBZyYI2nDdBYahriVjRIFGp1cOKFTXTp1EoJgb5rOmA/sIz1sAXxY8+1VbTAHWoBqAICULsWZ1bDkP17jLUpoDO5rsLbi0wMbCWcUEnArKMo7Nq4ToAWlQA/FERhMFCSALAcAEGiLKuDGEcrN4EMwUOOa5e6SdA4XDlnCMrmWXdbIMjI0agjHUfpeS6xCosPQRC9po20DOXZ0VMqC2p27xt4MDXzctghqHdIxd27RgKBPSSpiqaN8j+q6OJB0/QwrSuCDTdj2hD97HpmIh9t1INhXOQ1ZDpAnQ5vvc9qTxs49VCIs2cJBAbf0KXjIKP7vm1mKpXZaLHUn2BlDKHWpZMZbS3YoI0nBHbWkKKlhQJL4iFr4sxeCFINuWQRvS7PB3fTXZphRM28QzNyhvWQt/n9Kk7OYM2jISREV1j41ZgCK+9a1vvRGo2YKp9WQhC6Dt9kSK2r5SAvY7xeo0CzNf01ZLpJ0em6wntXUo+nYLIWuC2m+DtUIcdAHZyUwEF8c1Bu/hOZtLc9sPsgTE50mRxsOY5wbkKRDEc7qMcsZlCMZYRmm+OTcKX4boegua1tIc2XYbO47sqdP0UcTaK+dWhHPCJKZYpnjrFjJbITxAExXhWBCf+Pgnem/mCVik1JvJZWEhgCm+pQ6QVXfVBJAkFU4BUeQU0ZhVlQvbRqIUcs44KKTd97733ZhrnmKaBiHXgxJtq2PKl7JOIQCk18s1TX9uK3vBPG0j9HNq4QjezqNd+7A+7KsLxpEyt+8cEBhI3vvb+5kK6wDBu7HM2lBoXWW7cArj3dWamQLRC5ZdvfkBttcY51h3UZQ17vZrLgvqL3zhC1fyyIgdQ/Ymmz7oUPNzPIp4q4O3Rw1QeKwB6oBfT+H7pwvIkEVg4qTpPVAOJhgCoTJ8hsWQQjChpBEAZd2lqvyOt7tKxdUHi8XCs3B09Ahac5COMaHKBeGxbItKUxNKn42fKnCZ18knnfw/Ss14p8rc+2RWAcSdevKpZ2+sEXZ00CB21z69BkijfROWbdpvlzJFsgJG1/N62pCtmBP2maOEx2AbAobA6Fqad7n20Zywzy57KIr61oKXuZFadMZdkDfeBJObo5xHCvNEhmrOWku4SqZqW4KysfRZ2YvMam4rDHYE2Vvk6aOIPfpgs4otuxIWtImBBChRix7ZIXaLh0Lib+prt5BNKHdXWqwmleeq9P0DaO+xDSrF+NpXl5eIJPosgc0C8nKMCNFiNCYW7bL+q/NiiVFxY6m7h1vFc4PYhqkHj9SRbErGsgi/S4MTsovMADGwFeIcBLMIDt6Tjrnv00c6IPW2epd52X5XMVpwMz/G1CgyNJ9sp21PlYKaFcxkLGwMgmNMVa8aArLjaMN5E02CUtc8cNwyHONifTkvIsF7zR1j5voRn4KAa+Nl3br+9uuaEk0CwZTupxxsa7I3UNoXY5HN/SjirQzEYbJ4UfhSXkRnoph07TTTxDNpLexQkb6nUKgLv0uBHJBmdDpIpRFCO0OgZoZS2s2GhUOdGgNEvWy3hvO2gI8//vj/UuJdYM1c5zrXaeaiDDPNLFlP7SKs36VWje9T9W6fUVNxfWP/iMAxBQThsAEFBx1a6fVErMimy5qiov1tqCPJOjvrzLMaa6Wr6JwL50SxOj72o6+U7laCbK6dhXXBtYp51RYVMZbGzVwUGNvj62/EiTniOgsWRJn56jOIf25sW7Kn3NOHl3nkLnW3LqAcqBBFMerbgraYTFQ/dxXmUiCMSMERu7S8ncIiHhPQIhdEuiYgNZj61FsJxog1JZixtKjf0iJ4IPx8QaQdGFNQgDe96U035qVn4weQfRoYBU4pfBCBY0O8AcEq1G5K9oJK+OrIEmkEnG+q6gV5WVn72iEo2zGHhrIWHj8ikj0gqCkwH+3Hnd6yGfNqaJ+7EuZzu0ZgrIyDtRbXin2YWl5+bw0hbgTu+6Gbo7xfpu2reWDdWo8ybvO0K4teFtuS7NNHEVNQ/tHI1Im4XWEBmSyUAJVHkSAKi8rXrlvmh2DCpZM8dzHKDmIBbGUIaMhWGs06sHCnFP4QleBhnPsWM9K++93vvkH4D37wg5vfIY12oVVmROEGZFPhVyPjKLqmZM/eCfKW9kethYcvGKV3w3qv96RwvXjQQ8+CIqYEIscWx1MCqte+HY/5aF9Dd+luFQiuXc0GhJB1JuALpsRP2qqMnNNuJEE4vc5tEGbuoBWoox5AWBlv1mrb4psD24rsDXj68DI+fTrg6wQTy80Yiq+IBHEhaKQtxRwaF+/xeSqUYu0idgudlyqI6NpBSu3Jh7xYO5QMErO4bVeqTqWY0FsNjtk8sqgsWAGTmipVmhS6xcqK6fqs/ey5557/NVdDNVrUaXaAPMIDd00sdEC48bhhhOlvIMDL5FxHRb4IWgJ8agu5bhRoClaOaxZ2URuum7Fx7Ut9ecFPYHF+VDyrcKtmfZQ0Ujemxkn2Y4y1Qo7VoAQ/6yvtoHNNbIe7gKyR91gNAtF7j/nj5Toaf+MuEw0Lby5sG7KXFqWPIh7713E7HXqoLSpkZZKyWrxMMkSdtuG1YVJRptQiwlOo9XNKzhatiYiUEAgibyszkz4yCEHDPim4KOKFFyko8Xqpna2k7swfRG/RIW7KbaxImQLZUuLsliDiNtxwFTUld0obH6rXYo7MwBgbfzCmrh94n+sLgqnxRVLxXqRgXYD3UogB18xnUgjYMpuUpALOxTVG0mO1iRTGMLZr/hmPkjFcNRyfgCNwCtDWijnJHTBHjaW5TgDIeFyTdoAM2A7xY64QOGnARNaChEDNhgmLdAiCg/UnYAsytuv4BFvZ45SMaghbnuxNzHhgmJfWtrTzYF1BWUjlEbcJbbEiUhOEus6ZbAEq8Q+/L3/4EoJJlWQbjk3AQB6UD9IXoExkJGWhsSC8J9TproKxE5AQJBKgSnN7nQU6AY5iZq+1gbCvdrWrNfOX/SjIyn6QuusGxibsGPNb8JCxaeNjB/jn195jHKPwa/yCWB1ztOshNuOcFhoRkaDmWreB7JCO/eZkOLIWc89YORZ2k337/a4CoWK8nDsSFfiMieMzFgI5shfc+7JZsJZSOyZgLBE5keXziN8cXoaQjZlrK8BEpmY/go5r0RWUl8GWJntRNH0UsX7mrsm6jkBM/EPEQQ0gG2RAFZjYQSKrhAk/lqp2AbFSUhYfInQelKFjZ2lYrALErgoCzksqjiQQpDt2+/z5FIgEgTsnxJNCMW+33XbbmMuedIrc2QdgXgsWPidbkhXZb1hj/sMRcvc76hnpH3LIIc0YsQ6ioIeIbMc5APJCxj7TttWQjXM0d9rH2wWBheoVrM07x5UGlM0Ce0NWY/ycFxKOm+FcL/OfCGFZTTk+mZZxS+H6m5e+Glvbl0Uvw0fG0/EKmsZTcHLtXBNfu2oHy2BLkr3BfPSjH72xMHb1o4i3IkR9pEmhWMQmJ0VggiOEzYBjmMtXpAoRjiDA6jD5WQpSbgsZ6VlgCIqaylGgcwCZIlnHQnxQYmOBNIjAeaTHaV7f8Y533JjXno2PrLwAkTpfdYA2+TqGUO5gu8jCZ9knvjeGCCMsPNcGcdheCgHBuSCUsWAtQ/R558NuEKA3qyCPqMNXD4uEmmZ5GKdT3nNKE3DmFgXmdReJ64ASdGVbjiMC6lT4vIBljCNDd119dQxDXV9TsOXIHqmnDy9D+ssO6k6DCYEATXh+sZeCmhel4Ofo4Uaeq0qvKcpVL3zn6vpLz5Gn7AXxWPDOkyplaVkYyG1VRWFjSE1S0MiVGhuyLhw39Y0g237+ox71qI357eF3SNe1Y6f0KUXXmzfeBXaaYCgbiPewkyjwtHaDPNlTrI0hX56IQKLG2XFRtALEqmCsEB5rCKkbD334rjFSpdRdYzWfuYuWXXBd5ybaAFLn9bODZLHOUUZinvDsnbcb9MztsPXmwpYhe0omfRSxYhb1UfG/kEpK9UPRm0AWAY/ZguG/IkaBk8pfFQGyOnaFzQJIkaJjZ1FcrApWEHLwlZUSQQB5zQn71iVDaVqo9t11wxLIQpCVTCX18/fff/+NRyx4GF7YOX3gQQ8RNCJ3zqwk70P0ac1BIPE7yrxrPphHPmc/xlDwmPuGJ/s1d5EpUmfb2Zfjsl/j6PeyJ8HFMe0KCM5dvv0cIFwE3LjD3bmbO87XPHUdI/iN3StTii1B9ooR6cPLFGTnLk7sJJgYBx98cLNQKEykI823QCnf9KaaVeIjZ3xkly3IPiBiChy5IdkgE2NkXCwgpMYemKOuIcjaJrsEoSPTruK4YxKEEFr4/7Kwq171qs2c73s2fgAZ5tw0aBs6feLcKHvnj1i7VLHMD+lQ8Y4H0c0hDuxLcHPzHtFh/J1/FEzZTwI1otuM+lIJBExBZ9WQFRt365awlb2ZQ16UvgxnTuxSskcUWijTh5dZnBXDoGijhkEJWFgIRjqfFutWCddubuWxKrBaECxik+lYWBaZlJlNIVDKAhAjJT6V7Kg2is02zWNk1rZl/I79hkyk8wJSCB3rwDF1AQHkkL3rIuA4V0IAsbYLfYSU40S8AoFjMo+mwOdsT5AwH4KoWErISnBD+HP76quEIGV8Vg1K3jWSfRpD80cAcA39TePFnNhlZG9xpQ8vc7OUCVoxjp//7OeL5z//+Y1dg7QsKouaqjN5KIVVgxqjnrcznIMsST1AjUOQRNK8U4QtKARxCqgltQ8LWMEVoVK0solQsLaD5MO6YWHe5z732VgL7WfjAxIdsnFSsG94vmmtwD6QMdWviCvoRYaRgxgr23Re4aurXzg/1kTUiATMkrHaakC6+GnVcI1lbLJxWZW5Z94Jlu59Oeywwy555zzYdLJ3gh5vEGpe+tqnZiq6wfMMv5yip5p49bxOXn7fTSEBqXP4pSbaFMvMvuPuzp0G56a7BXlFim2sEG4EU3/LqQfwXxVNWUhRS/A5gZK1E7AukHwQPvJPO3Ls1/XNhczBfnjPofBlg2PtfLIaZM3KYK8qgFOYMgAEL0CZY0hfUHF+Ow2u/9z1ii645sbXNTJHzAfXx5r2Yn3NYakFNpXspaEeWBYTel0eRTw3EPuhhx7aTBQvqopqo9Z83261S2EhywiQDfLwGQRUmmJTeghxnYDYpfg6KVg/sirKXRBA5rIA6pud1lbmYMxYGnGnZBfc2RlCKH02PpItIXtkceSRRzaf68uY43zYODqHvFdA0mZK/cs+3B9ADERWsg4QwKyTLriuXvGekmvSBiKPorS5o+vJmPudAK1TZ1uSffrwMrePezRxxTQgAOpSuknVU3CUiCCA9IcUt4VL5fGS//XPfzVfTba+yd0HE77dC76OsBjZIcZf6i8IUMHRPieDElBlYzFe3jtU7xB8Y63oSuMfl5J9EEl8LwCZN641hc5+QSaCDsVPiJlL7RrDOsJ4dbUUu86EEovFSzBluSwDBE8AEL3mhbVM3XvJuucMsisneyeRPop49913zyo0VfTDolcAMxm8eM0UPfvGAu/rxw4gHmpU2yAFIWUvhQWxTmqvFMaGzYFgZVoUG9WMaBVox+wUayTuN6H03XFbep0EHypdBuI6Cxp+xy4QeLazr75KGJeu8THn4xUtksuCohdsrV0Czlq2hgV3gWROm2zlZG+yB9HXV33V1/SXzK0EMr/a9DANbDCk3oZajZudZEDqFu1MiLhF1rIzin0M7FQWmq8CMYuQh28fAnSXHTgVm2LjdE3c+qqv+ip7sYT46wgB6SAFryAJv4sXolHEpxp97z1e8fcglfQz8XtfY9s+G9/HK94bf4vv01f63vje7x1/++/pK31f+l5/Sz/nFX+PV3rssb30797vdzEO3tc+X68g3rayl6kpmipQq7tEg0OADcMW83n7os79/aKLL9o4nnjZj32o9bBd41x89fJ3jQHbjuwr5oXCmknqLllpoJfv2QXp7/wc3/OITSb2QfjIPGVerr9RgcC3NUnjjj4/8xXbfdgmoe35rP3E1ziWOI70e/uMny0Ir/g5XvGe+Kyf49V+v/fEK/19+oq/xzbS33W9L352LvFybv4W5xjnmX6N9+lgSd8X3/sa3/PN4+f077aVHqff256vrkH6Ob/z/jiu2G/6dy+f8bXrPemxp6/Yp/e0xyc+42/pZ/w+fe/Ye9L3+dp+db2v/bv219if79NX+jnvSY8rfva++J0x62oc0ZBgPVD9SJ2HT8EHIbPeoqAOut4EBWsr3X7sLz0W+0xfLLe5u90q2a8h2AFUHw8YsVsEKXj+irj8ZUqGYqmoWHeow1gvFD3hoRhPhQf8nYXjXgZ1EjWarWSjVbKvqKioyASBxF5hv8iAumwWpL8Vu5oq2a8ZTEIpqE4cyoNK4evuxJtjKirmBAtUputeisiOWaLbBZXs1wy8d6lmPMaVRcO3r214FRXDcAOaeoobEHXqWDceXrZd1k4l+4qKiooMIHWFU368l7qWALBdUMm+oqKiohDb0fasZF9RUVGxBqhkX1FRUbEGqGRfUVFRsQaoZF9RUVGxBqhkX1FRUbEGqGRfUVFRsQaoZF9RUVGxBqhkX1FRUbEGqGRfUVFRsQaoZF9RUVGxBqhkX1FRUbEGqGRfUVFRsQaoZF9RUVGxBqhkX1FRUbEGqGRfUVFRsQaoZF9RUVGxBqhkX1FRUbEGqGRfUVFRseOxWPwfe/ALqgWTlScAAAAASUVORK5CYII= | As shown in the figure, using a protractor to measure one of the angles of the triangular glass fragment, the measured angle is ()°? | A. 40; B. 50; C. 60; D. No correct answer | A |
217 | 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 | As shown in the figure, a piece of triangular glass is missing. What is the missing angle of this triangle ( )°? | A. 105; B. 95; C. 120; D. No correct answer | A |
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 | The three angles of a triangle are shown in the figure. What type of triangle is this? | A. Right-angled; B. Acute-angled; C. Obtuse-angled; D. No correct answer | C |
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 | A piece of triangular glass, with fragments shown in the figure, originally was a () triangle. | A. Obtuse; B. Acute; C. Right; D. Cannot be determined; E. No correct answer | A |
220 | 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3RT8sMIsC3TqqaeGqZYKSxa1aNFCNm7cGL4/9cADDwR/0qZOPmTIkHJrhdWGTIo6yTBzjuL31A7/Gol7do9L5fsVc1Ixykj3gm8sZIWo9QGpRVWnforWgakXs3gAS++y+ibLEAFWlckaDz/8sHTt2jWs7Al0abHfvHnzaCF+wCJfddVVoajOyqG6pjbn4SXAwglhSd5Uo01tcFFXjd69e4fnRfF+zXtPl/u437L8B0MDG2jxvbL8Yv0bEokWNTccAWl3E/Cw8NMHgrOiYoVOJmOwnrYuxqfwOVmESvGaojXL9AJiv+yyy8KXLTZs2BD8gFU/L7744vASwFpjmWlkI86DDz4Y6uD6IqktLuqqwcg/fUkDXV0lff8nstpFHc+SbbM+SoUeQ5+T5qW4a0hkhaXmgaiQ06H+xEGIt9xyS/hsq43P6DHmRs+dOzeIElHfeOONIYyXwumnnx727XpfTL0855xzQlyg0YwFE4YOHRosNcepqy0u6qphRaj3nee+bebYMFhFxb1wYEvZ++3KEG6J5yH2Ob7qz7BA8po0kab5ZctI1QWJFjVv1TjcfPx5ELoPLFbPVyXbtWsXvoQBNgO8//770cfhaDCjaI5lBorrp5xyitxwww3lLPUXX3whZ599dviwHXAuBp8QX7f1OmqLi7r6aF7gGbP9w+7tsnRE91AU517St73ho8GhqJ5OuDYfVZVV+U2lyVFRN2maL3Ul68RbaoSjwrQi1QcJFMeYMtmsWbNQ/FZ//WWNbFYBpVj+3XffhS4pvqxBfRnLTB3trLPOCqJm1VCFz+Kcf/754UVh0ZeNXks8s9QEF3XV4J5z/22+AJsvti8pCo1narWLupwve74pq4ohYnucks7veFZJftOmkpeHsJtKXRnrrKhT67beeLtNXZcGLIrENGgxfTLezUQ31EUXXSSXXnqpXH755dL06IM544wz5Fe/+lXo1qKOTSMZombpXeW9994LcWktt+i5QS1FbXFRVw97z3mp4qzf3t27ZEzvNvJVq9QCiEfdgiF3pe3b5rgqvZgL8qRJXgEboQhetp15sqJOzU3XB2Yf3uLFi0MjFoNF+FQs7o477ojqxRqPBq3CwsLwxUe+/shQUbqqLrnkktCYxhcz+OrFueeeW671m/7tK6644rhvOsddJnBRV514tSf+HAjnufKyXzl/tpQMuCUS9vQ2Z4RFGhTS0ZJX5ZRZabXOBXlHRd0k76i8M09Widq+TREn34+irqzfXyb8+eefl8mTJ0cfkUsnOurNrVu3luuuuy7lU+Z3wQUXBAGTDsfTQNapU6dyn8nRl4peS7r0a4KLujzxDybofeZXi9Bxp/BiZklnui+VbXMnyYxO5xwTd7c/yt51ZV9ZscdWyKr8o6U2U4/GatdRg1lWiNrCA6CuS3/l2LFjw1tZ/dlmmCfC1G4P+yLQh8cAFMaAk4aFPm26vCgB0EhGxqC1HDjWOivueFhNXPxbWo3BxV9s9l7rYJ+aYtOOO6Uif55fv379yjWYApNBFo/sFc3bZrJI8dDO0Swz4nFe+z8ULHP50jaWu24azBItar25Wjyi1ZluJsZwMw86HRS5li9fntpLDw+PurN+3cKCH/V0RpbFPxlbl6ilZhEChN3Y3cL+f5ZJ910on979e5nevZkUP9Jcvu55pSx64ppy8eb1uVqm5V0iJb3+JIXdmkrRw5cfF6e6bn7fFjKlyx9CuunCmVWmFhs3vcNZsmrSm+E5UAog39mXRFSHrsBlumqd+IYyUGvM4BG6oSh2M6FC68l8HxrHZAvqwFhyRE8rN/4UwyiSs63+rOvNQBK2OY7iPA4/0mUYKL/Ex+k56soVjuhTLqO5q39XOuBmObRtfchrmueAbqz0xey6aTBLfPEbYau4mZRBHZfRXLm5uWFcNxMwGJPNL35MymDfOvztdl5eXojPb/fu3YMf+6TLcFEccfWXOPwSv65cvy5tJL/9lY3Gjbj3Cnn1nsvltQ7NwzZOt/HnV+PpNuGE6XH4aVwbFj+uMmfjaFqvd7wq7A9v/cdy6b1y92VRXPYJG9npT8H/pXbN5Ktn24eJKCyjFPWgUJeupEGsrMEss9Y68aLWPknb2uk4dYXtDo0GmgR3fL+0CjpyGVJ2VtSpQYWN1bb1HvWzsK/9xxqHfU3P1pni57D78XSd8nB/EIHeJ3uPLfjZ5wH2Ja1hYMNtEfhEcJzmCz1fZei1cpy9Zj3/ySSrit/6EEAfht0H+zDJcBU9XBV6HH3AlR3rVI7eQxWZwjNSS6jPTp8b4Kf+wK8Vf0XE01HUjwZWqChOOv+TSeJF7TjZhovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKFyP8DHHPQDu3y6+EAAAAASUVORK5CYII= | As shown in the figure, using a triangular ruler to measure the angle ∠A, what is the degree of ∠A? | A. 30°; B. 95°; C. 110°; D. No correct answer | A |
221 | 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 | A piece of triangular glass (as shown in the figure) has a missing angle of ()°. | A. 105; B. 95; C. 110; D. No correct answer | C |
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223 | 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3RT8sMIsC3TqqaeGqZYKSxa1aNFCNm7cGL4/9cADDwR/0qZOPmTIkHJrhdWGTIo6yTBzjuL31A7/Gol7do9L5fsVc1Ixykj3gm8sZIWo9QGpRVWnforWgakXs3gAS++y+ibLEAFWlckaDz/8sHTt2jWs7Al0abHfvHnzaCF+wCJfddVVoajOyqG6pjbn4SXAwglhSd5Uo01tcFFXjd69e4fnRfF+zXtPl/u437L8B0MDG2jxvbL8Yv0bEokWNTccAWl3E/Cw8NMHgrOiYoVOJmOwnrYuxqfwOVmESvGaojXL9AJiv+yyy8KXLTZs2BD8gFU/L7744vASwFpjmWlkI86DDz4Y6uD6IqktLuqqwcg/fUkDXV0lff8nstpFHc+SbbM+SoUeQ5+T5qW4a0hkhaXmgaiQ06H+xEGIt9xyS/hsq43P6DHmRs+dOzeIElHfeOONIYyXwumnnx727XpfTL0855xzQlyg0YwFE4YOHRosNcepqy0u6qphRaj3nee+bebYMFhFxb1wYEvZ++3KEG6J5yH2Ob7qz7BA8po0kab5ZctI1QWJFjVv1TjcfPx5ELoPLFbPVyXbtWsXvoQBNgO8//770cfhaDCjaI5lBorrp5xyitxwww3lLPUXX3whZ599dviwHXAuBp8QX7f1OmqLi7r6aF7gGbP9w+7tsnRE91AU517St73ho8GhqJ5OuDYfVZVV+U2lyVFRN2maL3Ul68RbaoSjwrQi1QcJFMeYMtmsWbNQ/FZ//WWNbFYBpVj+3XffhS4pvqxBfRnLTB3trLPOCqJm1VCFz+Kcf/754UVh0ZeNXks8s9QEF3XV4J5z/22+AJsvti8pCo1narWLupwve74pq4ohYnucks7veFZJftOmkpeHsJtKXRnrrKhT67beeLtNXZcGLIrENGgxfTLezUQ31EUXXSSXXnqpXH755dL06IM544wz5Fe/+lXo1qKOTSMZombpXeW9994LcWktt+i5QS1FbXFRVw97z3mp4qzf3t27ZEzvNvJVq9QCiEfdgiF3pe3b5rgqvZgL8qRJXgEboQhetp15sqJOzU3XB2Yf3uLFi0MjFoNF+FQs7o477ojqxRqPBq3CwsLwxUe+/shQUbqqLrnkktCYxhcz+OrFueeeW671m/7tK6644rhvOsddJnBRV514tSf+HAjnufKyXzl/tpQMuCUS9vQ2Z4RFGhTS0ZJX5ZRZabXOBXlHRd0k76i8M09Widq+TREn34+irqzfXyb8+eefl8mTJ0cfkUsnOurNrVu3luuuuy7lU+Z3wQUXBAGTDsfTQNapU6dyn8nRl4peS7r0a4KLujzxDybofeZXi9Bxp/BiZklnui+VbXMnyYxO5xwTd7c/yt51ZV9ZscdWyKr8o6U2U4/GatdRg1lWiNrCA6CuS3/l2LFjw1tZ/dlmmCfC1G4P+yLQh8cAFMaAk4aFPm26vCgB0EhGxqC1HDjWOivueFhNXPxbWo3BxV9s9l7rYJ+aYtOOO6Uif55fv379yjWYApNBFo/sFc3bZrJI8dDO0Swz4nFe+z8ULHP50jaWu24azBItar25Wjyi1ZluJsZwMw86HRS5li9fntpLDw+PurN+3cKCH/V0RpbFPxlbl6ilZhEChN3Y3cL+f5ZJ910on979e5nevZkUP9Jcvu55pSx64ppy8eb1uVqm5V0iJb3+JIXdmkrRw5cfF6e6bn7fFjKlyx9CuunCmVWmFhs3vcNZsmrSm+E5UAog39mXRFSHrsBlumqd+IYyUGvM4BG6oSh2M6FC68l8HxrHZAvqwFhyRE8rN/4UwyiSs63+rOvNQBK2OY7iPA4/0mUYKL/Ex+k56soVjuhTLqO5q39XOuBmObRtfchrmueAbqz0xey6aTBLfPEbYau4mZRBHZfRXLm5uWFcNxMwGJPNL35MymDfOvztdl5eXojPb/fu3YMf+6TLcFEccfWXOPwSv65cvy5tJL/9lY3Gjbj3Cnn1nsvltQ7NwzZOt/HnV+PpNuGE6XH4aVwbFj+uMmfjaFqvd7wq7A9v/cdy6b1y92VRXPYJG9npT8H/pXbN5Ktn24eJKCyjFPWgUJeupEGsrMEss9Y68aLWPknb2uk4dYXtDo0GmgR3fL+0CjpyGVJ2VtSpQYWN1bb1HvWzsK/9xxqHfU3P1pni57D78XSd8nB/EIHeJ3uPLfjZ5wH2Ja1hYMNtEfhEcJzmCz1fZei1cpy9Zj3/ySSrit/6EEAfht0H+zDJcBU9XBV6HH3AlR3rVI7eQxWZwjNSS6jPTp8b4Kf+wK8Vf0XE01HUjwZWqChOOv+TSeJF7TjZhovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKGi9pxEoaL2nEShovacRKFyP8DHHPQDu3y6+EAAAAASUVORK5CYII= | A piece of triangular glass, with fragments shown in the figure, originally was a () triangle. | A. Acute; B. Right; C. Obtuse; D. No correct answer | C |
224 | 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 | As shown in the figure, use a protractor to measure one of the angles of the triangular glass shard. The measured angle is ()°? | A. 40; B. 50; C. 60; D. No correct answer | A |
225 | 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 | As shown in the figure, a piece of triangular glass is missing. What is the measure of the missing angle in this triangle ( )°? | A. 105; B. 90; C. 110; D. No correct answer | B |
226 | 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 | The three angles of a triangle are shown in the figure. What type of triangle is this? | A. Right-angled; B. Acute-angled; C. Obtuse-angled; D. No correct answer | A |
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 | As shown in the figure, a piece of triangular glass has shattered, leaving behind fragments. What was its original shape? | A. Acute triangle; B. Right triangle; C. Obtuse triangle; D. No correct answer | B |
228 | iVBORw0KGgoAAAANSUhEUgAAAf0AAADFCAYAAABekiv8AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAFnTSURBVHhe7Z0NmJxVdce3n2M/Utvi2g/caru10WKwqEBoRBqLCRSKiQJCaowQrJKCXSgRUrQuGBRMVQJKxBUUSCCAIm0KkVQTIpKQopgoEYOYWEiERENN/NgyVW739878d8/eve/szu7MZmbn/J7nPjPzzvve9+vee84999xz20KT8rWvfS0ce+yx4XnPe174yEc+Enp7e8v/OI3Gk08+GX7zN38zfPvb3y5vcRzHcQ4ETSf0ERwnn3xy+O3f/u3w3ve+N/zP//xP+R+nkenq6gqnnXZa+ZfjOI5zIGgaoU9v8ayzzsp6jAgQfjvNA8oZihoWGsdxHOfA0PBCH2Fx0UUXZcL+rW99q5uImxgsM8cdd1z5l+M4jjPeNKzQZ4z+fe97X9Y7nDVrVvjGN75R/sdpVninv//7vx/WrVtX3uI4juOMJw0n9P/v//4vLFu2LBMOf/VXfxXuu+++8j/ORACny6lTp5Z/OY7jOONJQwn9m266Kfzpn/5p+Iu/+IuwatWq8lZnIoFSxzv+3Oc+V97iOI7jjBcNIfRXr16dCXqEAYLfmdh86lOfCi972csyBcBxHMcZPw6o0N+4cWNmwseUf/XVV7sQaCFQ8hD+juM4zvhxQIQ+Tnk452muvQfWaT0YvnnRi17k795xHGccGVehv2PHjmzaHdPvLrjgAg+s0+Jg5cGxz3EcxxkfxkXof//7388C6miuvQfWcYCpe4RRduXPcRxnfKir0Kcxx3yPGZ/QuR5Yx4lhmIcy4jiO49Sfugh9xmkx22quvYdedfKgbNDbd+uP4zhO/amp0Mf7Ho9szbX3yGvOSGDIh+Efx3Ecp77UTOgTbIW51x54xakWhn186V3HcZz6M2ahT2/+1a9+dWbKp5fvc+1bnWLYv2dH2PzA5rBjz/6+XyODnj49fsdxHKd+jFroMxZ74oknZk56jN/7fOtWpxh2P9gT5nQWQltbW3+aNHVRWPP48KKfMX1fetdxHKe+VC30McG++c1vDs95znMyr2ufbuXA3rVdoQNBP2lqmLe4J6zoWRRmHzKpJPwL08OyrcMrhZQnvPkdx3Gc+jBioU9P7JxzzsmEPZ/ube30s+/uML/QJ9zbF4TVu22vfm94aMn0UMgE/6ywcmd5cw4okHjy+8qKjuM49WFYoa+59gh7xlzd2coZwvqFmWCfvGRLeYNlb1jb1ZH1+AvTrw+PlbfmwVAR0zwdx3Gc2pMr9BmjX7JkSTbOyti9j7U6eTzWMy0T6tN6ckT63rWhq4Mx/kKYu2pveWMayt0LXvACX1rZcRynDgwR+pprr8A6PtfeGY7imgWZ0G/v3lTeMpS9q+aWzPwd3WHTMH59lD/iPDiO4zi1ZZDQv/322/sD6/hce2fEbFsWjkCgT14SUgb+ElvD0in09tvC8csrD+6jeL7kJS8JN910U3mL4ziOUwsyoU9vHkGPwPe59k71bAlLJiPQ28PFG/K78fvunl/q7U9Z2qcCVAalk/LoZdFxHKd2tGHCx5Tvc+2dsbB16ZSsF1+YtTLk9uOLG8LF7SgHU8LS4aR+H1OnTg1XX311+ZfjOI4zVtrwzP/Rj35U/uk4o0TT9to6QneFQftN3e2ZcjBr5VPlLflggUIhdWXUcRynNgw7Zc9xRop6+23TloVtOXJfTn+5nv4Rxx57rC+96ziOUyNc6Du1o7gpdJen5k3v2ZaOu7+2qyqhz1RRpo165EfHcZyx40LfqSn71i8sheNt6whda+M5+cWw4WLM+4W+/4aZt2c47bTTwgUXXFD+5TiO44wWF/pOjSmGbT0KvdsZzl6xOexiSL53V9jYc2qmEBSm9+Sa/1No6V0P/ew4jjM2XOg7daBP8K+cEzozx77BqXBYd9hQOShfkrPOOsuX3nUcxxkjLvSdutG7a3O448p5YcbkyWHGvMWhZ92jYX8VPXwLvXx6+772g+M4zuhxoe80DRdddFE4+eSTy78cx3GcanGh7zQNePDjye+LPzmO44wOF/pOU/GBD3zAl951HMcZJS70naaC6HxE6fPVHx3HcarHhb7TdCxbtsyX3nUcxxkFLvSdpoOV91iBz5d/dhzHqQ4X+k5Tcsstt/jSu47jOFXiQt9pWjDxf+pTnyr/chzHcYbDhb7TtKxevdqX3nUcx6kCF/oNSu+ujeHBagLUNxgI4h/96EflX/WD6XtLliwp/3Icx3Eq4UK/AfnRF88Nk4hTP2tl2Fne1mwQJ//d7353+Vf92Lhxoy+96ziOM0Jc6Dci+9aGrnYWqGkPXWv3lTc2F4888si4rYw3a9as8N73vrf8y3Ecx8nDhX6DsnPlrNLytNN6wmPlbc0Gvf13vOMd5V/1YzwVDMdxnGbGhX6jUtwUujvo7RfC3FWjWIu2AXjiiSfGbWU8FIxzzjmn/MtxHMdJ4UK/gdm7am6ptz9lSdjSpD59XV1d4bTTTiv/qh87duzwpXcdx3GGwYV+Q7M1LJ1S6u3PWtmcLn3juTIeCgY9fsdxHCeNC/0GZ9/artBOb7/94rAh6u0Xe3tDMxgAcLI77rjjyr/qx/e//31fetdxHKcCLvQbnp1h+fH09tvCtB7j0lfcFpZNnxuaYbh/PFfGQ8E48cQTy7+qpHd/2N+8oREcx3GGxYV+E1Dc1B066O0X5oe7sxl8xbBlyZRMEZh67aPZPo3O1VdfHaZOnVr+VT8ICDQ6BWNfuHt+IRy/vFkjIziO4wyPC/2mYG9YNbeQCfkpS7aE4s7l4XiUgI7usKlJeqbjuTLeRz7ykfDqV7+6/GuE6JlOWRq2ljc5juNMNFzoNwtbl4YpWW9/Vjjzze2Zc9/8Ure/abjpppvCS17ykrqvjMdwQnUKRjFs6u7IlKpmDojkOI4zHC70m4Z9YW0Xwh7B1JcSjn3NwHitjMc5ONeIFIx9d4f5hfJzJR2/vGnDHzuO41TChX4zIRN0X2rv3lTe2FysWrUqvOAFL6j7yngI+5EqGDuXHx/aOrrCwvIQSlvblLDUbfyOM248++yz/Z9KP//5z7NtwHe7D7DN7qPj9F3/xce1Oi70m4oBM/TcVY1vgsacf9ZZZ5V/DcDKeIy71xvM+5j5KyoYxQ3h4va2zIGvuOHi0vRIlKqutcGN/I4zPkioKwGfP/vZzwYJb9XlZ555ZtC+gv1l3dPxIt63VXGh32zsXRXOPubccFcTBOQnFn4qSt599903bivj4dBXScHYd/f8UOifFaFgSKTjgzvyO874Y3vwsWDXd32iBNx6663hhhtuCF//+tf7lYL4OCv8Wx0X+k5NYKpcT09P+dcAF110UbYKXsx4rYy3fPny0NHRUf4VUxLy7Rdv6A9ylJn6y739KW7jd5xxA8Es4SyhbYU3PXirEDz44IPhhBNOyKboPve5zw2nnHJKtk2wn47ls94OxM2CC32nJqBhM1bPmL0lLwzvN77xjWx7vVbGI1/C8mJpeM973lPeOpiSOT8av7dOfe1dwR35HWd8QDBbQW2Jt3/4wx8OL3/5y8Mv/uIv9ivpc+bMCd/97nez/62JX8el8m1FXOg7GSxPW02oXCpVbJ6Xx3zMBz7wgWwcP4Y4+QjmWsI1YUF43vOel+WfvwDPzrByViHhqV8MGy4emCXhwXocp/7Qw1cPXiCkY2GPCf/000/PevfUz1/4hV/IPg866KBw3XXXDRH2btYfigt9J4PK8rKXvWzE0+kQrG9+85vLv0qQB/Pw4zywAqSi5NVyZTzOwdg952HoYNj4+1ncg/ZwcWreo2IikDxYj+PUHQl3PiX8rcBHeN98883h6KOP7lfIlWbOnBlWrlwZdu/ene0rga/8oFj0+NrChb7Tj7zdpS1XIm9xm7w8li1blrQCjHVlPM6DkvGiF70osyaMLPxuOebBC/8lrH/yyWwoYHDaHK4+Wo2KB+txnPFCgl7CHr75zW+G888/P7z4xS8eJOyf//znh3/8x38MDz30UHnPAYEfKwze4x+gdYV+7/bw8KPemMcQHz/2dsdJ7+STT+73jBV5i9ukPOYRzqkoeVZ5kFZusZVXqGKTF9YJlIk434qU4x1MOnhymDw5J3W2h4IaGA/W4zhjRvXb1mfVZbtN0Du/8847M2c9K+xJhx9+ePjoRz8afvrTn5b3HsjLwu9Uu9LKtJ7QL+4ODy4/N0yd1Fd4Zq0MT5U3OyXoKWMiR9Bbjj322CHe9nmL2yiPeMz/lltuSVoBpDyktPGU0F+7dm2mnJAXvXz2GXnFLi9WNFxEw+KWsKR/+p4H63GcsWCFr62rtu7aes7Q34c+9KHw0pe+dJCwx1fntNNOy9oAwfFxG+Hk00JCvzdsX70oHNOuqGt9aVpPaILp7uNOSsDTE0/NradHn1rcBiEe5wGpKHnkKeWBymsT6BMzHuN37Mt57TjdiM13Ze/8kTjo7V01t7+3b6f1OY4zcqi/VrCrPoMV+oA1cf369Zknfn87XU74C1166aXhJz/5SXnv0vHUfZunU5kWEPp9wn7d0jCnU8K+EDqnHlaKvNYkQh+h+MQTT5R/1R8JeEzvFjTsCy64oPyrBJU0ZbZXHoyRW1avXp0J7XiogCk4KA9qIEiqyI8++mjmNEh+TL/DwqD9xEgr/WM900a+bsGg3r4H63Gc0UL9VBKqv9pGe0OsjylTSsuGK/36r/96OOaYYzJTv+AYLIY2P2dkTGChXwy7H1wezp06qb/wTJq6KNzx8O5QXL8w68EVutY2Re/tfe97X1XT6aoFARyb3BnDj6fT4WWPt30syOm504OP88ibkpcKw8vYHMrDZz/72fKWEHbu3Bne/va3Z+ckn6effjrbrsZDicZjRN65e1eFuX29/MlLtpQ3DM+WJZP7y0/7gjVhb3m74zgjJyWc1V5Qfx9++OGsvfjVX/3V/vpG+qM/+qNw3nnnhR//+MfZvjHkQU/fdhKcykxMof+Tr4aPHDPgiDXpkLeGngf7hH3258A87GaIXw95Y+e1AnN+bHKXgGdszUIs/djbnoqXMtuTB73zeErexo0bhwwVUHHR8nHM27NnT/jnf/7n7Pzz5s0L//3f/13ea0DDV4Oh3xXp3RU2f74nvOOwsrWnY3745PrNYcee/blKX3H/nrBj8x1hoY7JUiF0zlka1j2yJ+xvBm3RcRoAW0fj3j3C/O677+4fu2fePQF3fumXfim86lWvGtQJ0LGC3+Trwr46JmhPf29YNbcQCp0nhstWbw+DDMnlBVba2uaGJpH5GfSMcV6rB3nT7FICnl5+am59Xh55U/JSYXhRbojqR/78zznIjxSP2/E9bgRyuX9x2kP/9FvCYJVmgB23nJ4+Jkunh1vyDnQcJ4ntjfMdcz5K/a/8yq8Yxbotq///8A//EPbuLdnVVNdV3/kdC3ubt1OZCWveL+7eFXYnemPZAit9Basw/+6mWkWNQp4aO68WetmpGPmpaXYS8ITMtRBPH/N/TF4e9Orj+fzkSd78j2n+4x//eGbNeM1rXtMfP1uV+Ctf+UoW3nf79u3Zb7YryYHPK7zjND4IZ+rsvffemyn4CHl69b/8y7+cfaeNW7FiRf++se+PHcbTSnsu8KujBRz5LDvD8uPRJnMisTU4mM/xYI1709WQF/M+b6oejnvxgjmY5VOCPC8PTcmLwQLAHFwqOsMDa9asKf9TAqc/FIlCoWRi/63f+q3senTt6v1T+R3HaVwklOndX3zxxeE5z3lOZsa3sfPPOeec8Pjjj2f7AceQ4vbOCvm4x+8MT2sJ/XJQlmYOrZoaO6+ETOQWhG3KwQ5nwdjkLgHPcrgWnAvxBQBb6ZQH29QLxwEPZeCLX/xitp2EgP/zP//zcPDBB4fbbrst20/w31FHHRUmTZrU3wNQwhSIksCYP45+oPPTGIDu1w4J8F3/A9v5bbfZ747jDNQTC9tUt20d49OmmK9+9atZ5Ey88a2w10Jd//u//+t1cBxoKaGfTdfqK2TNvGQqlYOKE5u98sAZJjbn58W8z5uLjxCPF8zh/AhygmSoAQAqts1DlVhT8v7rv/4ry4tjP/GJTwwy1335y1/Ohg34D5OfFtOIEw0GPYU/+ZM/CYsWLRrSwEjAa7tthNhurxdSDZTjOIOhnuRZGVWvUnWOmTko6b/7u7/bb7VTYkx/y5YtyXxtHvp0xk4LCf0d4frpFLTJITljq3d7WNdzbphxwT0NP9afmvKWh0zusZJATz9eMAfYFlsBJODjZXOvvvrqTKlQ5ZSAt3mwncaAVfxYCQsT/WWXXTYowAbBOE499dRs3fu4UVDDsGTJkuxc8X9YA175yldm/6cUIZQKKQBqOPTdNlKQ16A5Tqtj644+qS98WgU7ZtOmTeEv//Ivs04G9VWKPB0DFsmJhxkt5JmXrzN6WkfoF9eEBZmg6AoDARwNT60Ms/i/sDCsL29qVDC1E44y7pEj4FOe8igJLG9rsTHvLfT+qaBxMCAEPEMLFio9pvY77rijX+CD8mCqHflwTfxmLE9z7QFFgDm4nZ2d/fNz6eHrE2HPuP73vve9sH///rB169ZwxRVXZB707GMTz4PZDf/6r/+amQlBvQ9INU5qVNgnVgAcxymhOiJU1219ievPD37wg/D+978/WVdR8LHqVfLF8bpYP1pH6D/WE6ZR6HKj8G0Ly46gUJ4aPjM4EF1DkpryhhJAjzyez483fJ7ZPhX05x3veMcQ5UECPvYnuOmmmzLnQpnp1SCcccYZ2Zx7hD0BdhDcgjWxWTULJYKef9wo4NxHL0De+pZ9+/aFBx54IFx++eXhkEMOGXIs9/+GN7wh3HDDDUN6/jQkSlYB0LaGobg/PLquJ5w7ozO0F1gY6Igw+7I7wsOp6SiOU2ds/aDeqI4Dwj7eRqeEOtjeXoqHokSgnauuumrQsGJc7xquLk5AWkfoqyfftiCsSbWd+1aFufzf3h02lTc1Mnle+Jj94/F3QEl497vfXf5VQmb7WEkgT4R1POaPwEfwx2Zw61zI+B3KxHOf+9zwxje+cVAefEf7Z1oezjy2QcBhD2F/7bXXZkqBsMLZNiycB8dAlIc//uM/HpQXifF+4ncvX758UI+CvJSnTfrvgPOT+8MVJ7wpLOr5XLjnnnvCiivnlRaH4r4mzQxLH/KYgM74QZ1QvbN1hW0S+LICMGuHqbcMw1lHPdLf/u3fhn/7t38bVBet9QCUv84BqW3O2GihMf2tYWkWR70QZi3/bhSJbW9Y29WRFc4pS7Y0RWheSHnhI8hx9Ivn88vkHisJmO1TQX9QEOKpeoCAj/0JGOvHA5dxdZQIFsWxwwaE2OSYk046KVNUbGNAQgm45pprhgw1AI1KLKRtY0HPn+EF1tWO19smoaQQ6INhgpQ50eZLakh6t4Zl08u+DoW5YZXLfWccUb2Q8AcUf/ub3j31jPpv6x+9fToBOOsJ8ovrdR52P6c2tJDQt6umTQpTF60IDzyyIwvPqvj8k2ZeH7Y1sMSP579LkKd65PH4O6AkYLq3yGwfKwkMBSCgFShHsB8V217L9ddfn3nm4lBH71tg0udaZs+enXnb28aAnj3KBt73jO9ZZElQRVfDoAYAoR9bG1B2br311mxRIMb37blIhx56aBZUiNkGGvMH8oOGb1S2LAmTy/cy/XoPB+iMH6obqiuqh4BD7u23357NzInrHNNur7vuukHDbDYPoB7n1T3V+Yavm01GSwl9evQPLZ0ZJkWFs63QGU688kuhkYdMGTtPme3p6afG3xlPj8ffcapLKQk33nhj0myP8589pyof29DeUQBQLjgXvW3BefgPBQNlwD5rvHeZn0/P/P777y8fMVjoqicfV3a2216+/rf7YclYunRppmjEvQ4SK3jhDIhVwQp/8ogbpGobnGr2rZ61oUv30ZV0RXWcUVGp3Kpe2Pqh/em9E6/jD/7gDwbVMX4TwnvDhg3ZfjH2fJWEPlT6zxkdLSb0S/Tu2hzWr7gyXHjhlWHF+s3h8SZYPaXS+HvKCx+hmxLk8VQ9VWaNy1tBx7g556R3zDbty5x7zskwAr18nQOPXXr6CHuUC9sQ0LPH/P53f/d34a677sr2B+VbC6xC8NRTT2XCf/r06eE3fuM3Bl0LiSGFj33sY2Hz5s3ZfQquRfnEDZLuX9v02363+9cUOaL2pWpWCXScSlBmVYaB8muTsGWb+sIiOUTZjOsVSvVHP/rR/im5Nm+nMWhJod/oIGwwRVuzGBBkJ2W2p9edGn/HfB6Pv9uperZiEwVPZntVcIQfAXRe/vKXZ9s45vWvf31mPidfXR9DAXjUcx2/8zu/M6Qh+MM//MNsmg7CXgqCzh0rJWPFNk7AWvwLFy7Mhh5wLoyv7RWveEVmgvzud7876Lj4uxL52+dj7wf4r/YUw6buks9JW2FWWOnr+js1QuVVZVrlmyTlV2UbvvOd72TOtvEQGvUeJcAO1XGcPdZpDFzoNyiEuMV0ZkHA0HtnDM2SN1WP32yPlQeEs42FT8Ukb8z2OOOp0rMNE/gLX/jC8NrXvjar6ByrqX9o80Tg6+7uDr/3e783qBHAexcnHgJz3HLLLYOEu20Iat0wkBfXru+CIQcUKYYW4pkDJJ4H3vLEFrDXGiNBzzmUP582smBNKe4OD2pIyr33nTqhIFZAeVbSNtoB6vqb3vSmQfWG4Trah0svvTT88Ic/zPYFjkspDc6Bx4V+HdB49khBKMfr1tOrpkcez61HgKbM9nlT9VAeENQWevNWSVAF13x+BdBh6IDhAIQk98Nv9kPYszAGY+NWgGotbMbxDz/88MwPISZuDPS9Vui5qKGxwhkeeuihbLyRmP+/9mu/1n/duocjjzwys3qwrKcaPMG12uu1+fLd/h4dPwlbb1kQXnvCvHDhhReGCxfMDod1doYZ8xaHnnWP+hr+Tl1Qmaa8x2WeMk17wLr2tDuqJyScc1Hq7boc5MUxqud81k0hdkaFC/06kDfOnkfetDni0LOqXIzG3y0oDlRKFA5LnvKAkoDHLZXSKhCY7xH0KAoch5Mgjn9UYPbbvXt3NhauBgAhr2h6JI4hKl6slFDx1bhYAakGohYoHz51Dp3HwnXgRDhjxoz+67aJRX3mzp2b9WxQcOz1xddrv9eqcdv70JIwvVC+HjfnO3UkLsvUWz5Vb775zW9mkTFVN4iUSZ0n/DWKaTwNlrpl67nN32kMXOjXidiEXgkqWkpg582t/8///M+k2V5T9WKByzS2WHmQkqAQuiQcdLTsJcJf6+hTeTHvMayApz6VPw6+od4yn/SiibxF6Fw1IsoH+M12KRK1Qnmp0QF7ThJR/ng3+BnoehHy9h50bzgfEmCI+OG6ByBPzqG8+VT+taEYti0rLQ5Fau9uhnBRTrOicqsyrXJ955139se+oC5QPxD6hM1GIbZwrPKhHqou1q5OOLXChX6dyBtnB3rYqbn1qbXyMUWTYjT+buHYlBUgT3mQkoACgBc+AXbI99577y3vUarM7IdXLhVfgkgJ876m5dkeP/vS62emAE5+qvz0hu09st0K6bFiLQpCc4mPP/74/rC/asAU659rxWFR128TTkpve9vbsrUCBA0j92EFf00prg1d6u0fsSxsK292nFqicku9UR1FMT7zzDOHKMF0Boirgblf+1LXbD2wwh/YXvO64YwJF/p1RCb0GBzKYm/7PIGNoE7Nrd+4cWPSbK+perEVAMUhNZ+fELYIewQekfWsQP785z+febcz9i1NX4IQheaSSy7JxvaZHodJX2PkNqEIsB2F5l3velf40pe+1D+dp57gkEf8/lNOOSWbN0yDxbXEFornP//5mcPkrl27suh+eB8znU//6545HmdFniERBoWeF580drVr4B4LPdPK11lhEaji/j1ZGXlyz/6miSTpNBa2zN52221ZO2TLPglnvf/4j/8Y0q7o2Ljc8xsFoHb1wakVoxD6xbD74TvClfNmZCsoTZ48I8y7cnV41L2MhiATemy2R1AjsOMxf/ZDAMcVC9M84/sxqUV3AEVDU/VU6RBqUh7Yxtx7YmQToz52uEP4H3300Zm3viq+PsmDtbFxPNR1kh9DA9/61rfC4sWLw5/92Z/1NxZKHM+xWAUwDxKSl305V2phnWqgl8I6/ShM9MgPO+ywTCnhGSOs42shsVgPwYeYqocSoudEXvRkmIecGvNnKICFQwguZBcRigW+7e0M7v3sDfdfe2G48BPDBYPSAlB9adbK8FR5a4liePy+peGth7VnESYL7Z199bAzHHzwMeHc5Q8Ok2/zwvNNKVb81n/2N6T2byX0LCSAbbm032kf/v7v/37IIjkoynQYUO6l2AL5gc3DaQ6qE/rFbWHlnM5yKNsoTZoZrm/kGLZl6BXFveN6giBiHNz2oCGOdidSZvs8JQFzc8psr6l6dhlbwMKANz+J/wleY68L5zYUBsa74x4x53nnO9+ZRdlirB7UmKpRAXrLXNenP/3pbDzc5mETwhgFgF44ige9CxblwGkIByFi8fPsPvnJT2bz6Bl+4HPFihXZevwMGxDoB0vES1/60kwQc0+p6XhK3BezEFj4Y+fOncn7ED/+8Y8zCwazJThHnBeOTLzXf/qnf8qsCoJGkKS8eL5qcPn82c/WhYVls/2USus87Fwejs/OVQhzBwXb3xvWLizXQabwbdwV+lXE3q3hU7PaGz6c9Gjg+dn3Azxbu03f9WnfhX0nrUbqvlVfgTJOyNxYQWZI7+abbx40FY+87FCA03xUIfR3hpWzWPSjEDrPvqO/Z9+7a2NYOrMUu75w4s3h8Wxr40KPOV5trpbEvXQappTZnv0QUqm59SmzPT16hHUM5uZzzjmn/GsAnAg5hvNTQenhs9wlQpHt9jqZcjN//vzMKhELexoCBNv69euzwD4ibkhtIwLkjzXgC1/4Qray3ute97p+h7m8xPg65yOIDs8GqweCuqOjI3MOJPEdCwRDBoVCeRGaCon9URBQGL7yla9kPRp5HMfXLuFswYJBQBKUD2ZYxPnjI8D0RIYIUsMW9hnx+eyzz4RtPdPLivO0sCwpnQeC8RSmX2+Wgi4OHFuYHnpSx25bFo7o+7+iQtGElJ7d4F6rEkgIDX3epaT/W4n4/uNnQKeAwFXxKpXUU9oVpreqrtjnqnwQ/rHi5TQ+Ixb6++6eXzIlzl3V19eIKG4Ldy5v7Nj1Is+prRZQAQhNmzLbsz1WCJYtW5YpBDEI7JEug4tg5X7iMX9N1eMT8xz7ILytMkGlxhxOwJpYy6fin3766eHf//3fh5ixVenVmNhKnxKc9BSYCUCIXqJ5YUZkfi/j6factUj0vrEYYNVgbjGWiccee2zQ1CJdX3ydunYpAbpP4Plv3bo1CzFKdL/4vJhF//qv/zpceeWVWThii/IcOO8z4fE1i0pL5nacGpZ/3YzH9+4KG5eUBHvhsO6wwVS24pYlYUp2vkKYlTOPr7jh4tDOPhX8AJodW+bsp5JQWSXpnbYa9t7ts6EdQRGPQ1RTf2iXUI5F/Fz13b4Hp3kYodDfF1bNLTU2XWubv/+AFltN8JxqoBedmqqH2V7j7AIlITXmj6BGCMeKSd58/tSiOwh3FAry4T/M2YLpNkzNIxBNyiOfnjEr1hHC1kIFVyOqyh43Bkr6HcOxjA/iiIhCgdmesX2W5cRHgYaIMXnM/igF9O75TqLXjzMdPgNECPybv/mbLEIYAh5hjCkS50PW448Fr+CadP26Pn6Dtuk3jaUV1kDvBsvIe97znuw642fHNfL+uZZ4QR/l10/v9rCu59ww4+BJYdLB+Md0hvYCY/SpsXlZ2vrOM/kD4aGcarh+oawf00LPgIlgQmDfjZ6nvqvHSdI2+575PujZtwjcu71vFHCCaqUUV5xeiUqpcqvnBnnPT/87zcMIhb48iY8IyybA3KG81eaqBSe0lJNentkes3Rsts+LsIfgjRWTPCXBxtOnR4q/AL8ZU7f3iKMdpnYUkHjsG4cdBC491dRzUeMJVHRVdtsw6H9BI6Hj7H4x3BcKDl7xRAXEIoAXMc+GTyV+M6aPFzHTAFFeUEw0Nh/D+XQN+k2Kr0fbQP9xHEn7gP3OmD/xEnBqxCnQPksS85uxsHDN1rfC5mGRF/6ePIfYp1aGWeW8Ky24s3dtV+jo26fwqmvCVjY8cls4+/gjwhGzF4QLr1zR16g/ELYPNjg1Dfadxd9TAklo37xnP1HhvkmCOnPGGWdkbYMtq1j6aBdsvVfZJykf1QnRis90IjBCof9UXy+jVECOXz4xwoPFq82NBoR+yts+LyRunrd9asyfCkgvPRbA7Jeaz0/Pk2l3KByc2w4x4FjHmDTnj8fBGUefOXNmpv3btfPjCm0rP8n+1n581yfJNhDaRtKxtcTmF18312HPT7L72N/6nnftJAu9IpQwGlMUMvtsScxUWLBgQVi9evWg1fyqpk+YK88Faypb24r7nx4csre4JizQNRWmh+ub3AJg30P8PoAhr49//OPZDBW9x9S7axVQihlWo11QGVIidgXDYIJnRPlXAvvd1gv73WkeRjymv3P58aWC0tEV1kaD+sXdXw9bm0wXoMet3vFIUYQ6S8psjxKQZ7bnnLHZHoGQUh5w0EtN1YuVBHqTeMAzhdJaGOgFMx0Ps10s7DHrY55m7ry9Lyq9KjMVXQ2lKr62qXHQ/8BvsMfEn/oOysfmYRsSmx/btZ89hn34bve1/4POq212f3ucsNt0HOe3220egPC/8cYbw5w5c4YsPkRihgGLkhAHIM8yUYkd10/vz6va5fQHfAHk4Ncbnu4rg5TDp5uo1693pOdvywTTPlkzgRDRDGdxr+eee26/chy/r1aAe2bpaKb8xqtfMtsFS+K2bQOmW/tc7bNiG8NaFtULktNcjFjoh+Km0N1RLjSTpoZFK+7Jxn8+t3RO6Cz0NSZLM2NiU0Gv+7jjjiv/qgyL1CCwGYu2ML6bMtsjlBHOcY+cBgkrQ0xKeaBRprdvFRMqGWPhOAYy9YxzxAoG4/eYyAm/awNskHDQw5xHhbcLZdhKbiu4KrVtYFXhLfzWtviTZ6Bj7LH6BH2PhXsM25TIi/2FPU73E2/Tb+C7PZ/Q7/iedbySPbdgO++RmRYp4c9QAFMOcaKMnzNJxL/D+oVlj/+2MGvl4Fn7lTG+AIWpYfaZp4b5b5sdjph8cGnlvkJ7OOayDUOdcxsQPRO9Wz0/hk/wUcGB0z7rf/mXf+l/R4OeZZNh79lS6Z5orwiji++LfSYkfHlQjuLya+sHnzZ/nV+fdj+nuRi50O+j+PiasGhqaXqeTYXDFobV0UBhcf/jYfM3G7v7H682NxzMnx+p2R5Bhydsymyf8idAAKNUxMoDjRnnVCWkojKfHocxPMbJX4oFY/tMrcMpLl5Bjp492j1z2+2a18Oh8yoBFT+u/Gow9Bv0m2T/t8eShP2d2s/+z3+2QSfpHNoWf+r7eMDCREQp5N3FvSwSVhksA1hjNNXPXp99XvDsD+8K8xWWd9o1I56Hv3fNgpI3f1t7WLBmsGjv3X5bmNvOf4UwvUls/vaZ6Bnhq0IMCZwnp02b1h9amRkw8YIwzYTulUQd59OWC75rP30HrB4ollgPVd5oB2gv8PNJWSyd1qEqoV+iGPbveTI8+cQXw6IX9hWohLk/fPWyzJloaCSxxoNeWSpULtNW4vXsMb+jJODAZckz29P7TjnppbztIaU80Ishb3ruTBljH36jgGg4AHMx18CUPFVyJXr29DiJgIeFoNqeD/trXzU2MWp07L7AbzVScWOl/UHbSRDnxfOz+yqvFDon5O0znhCs6PLLL8/8LVKBg5jjv3z58iwyoK7bMnC/z/TP3Sd1zP/soCiYxf2PhtXvfVu4+qsmVsC+9WFh2TpX6KuLKRV8y5LJpTwnLwn57oGNAc+CZOtTXLcYzmKoi3tC6KvcQCOUh5Ey8N4HXzP3Y+uChU4Mi0MxTq9yQkIJQsn88Ic/XN6zVMfiZ+e0BqMQ+iWKa7syc+MRKXf+x3rCNArctB4TWKQxoeDnjb+nps319PRkJvWYPLO9DYkryBPBbc32gAZulQcJARa5YOoaFgKUAlkD6CGy9CXe+igjVHD17AmyQ5AbprUxjU2MpuFLHWMbJV0nqEGy27Sfvtv/gP/iMUPg3dhzKx/OEZvG7Tk4jt/sp/3jc9YbnVcg1JlaiFc/5Yr3ox4pCbM/FhyiAKox1j3xmX1/5lvhllMHBH9b26RwcBYK++DQ3jknLN9qrW3FPoE+pbRfBee9Td3lsKtlod/7dGms/8knnx6I9Ncg8Cz0XPVd6P2yaiTOk9wT5n1tt/s2E7pf3UcK9qEtYEqvHVKiLSB4FFNI6TRoX9Gsz8QZG6MW+o/1lJb+TAr9LUvCZAre3FVhX3lTI4OJPBUqlzHxONqdlASc5yyY6xHYsdmeoQMEMlq4BeGdms9vlQfM9XxH2DMGL2WARoDgGZjwtMKdrej0KAmhGcfUp5JnwqPvU2k4bGPD/hKoNi/9B/xv87XH812/7XH6rv+4P8yydh9gOwnYFudt5xcLNZhss9vrCefUueLzYvYnzDDvFCsMgt8K/xNOOCHzOsfCY+9vgN6wc8NN4dK3vC7rvc2Ytzj0fP7hMCQwlhTvvpQbnW/f2tCVmff70ouPCbOnvTzLs7O95ANAvIDLbHSgAwzP0T4TFL/4Gd111139az8wNCblMP0sGxfKkG2PuHf7W9+ZOooFkGGk7D2aRDRK2gg9gzgPpzUZc09/iHm/+Hi4Yy69h0KYf3cziPxSBapm2hwCvxqzPc6Csdme3nrKn4BzESULZQMlgvwYs9S5OA4nHM5PxUbIS2jgoX/ooYf2KyQSOCT7mwZwpI2g9uO4WJjpP7uP/o9hO42PhHYe9rp0Ph3LfygDEu78zzb7HvifbboOfVcaL7je+BosjOW//e1v71/BUA21wiAzjMMiQro38rD3UhnjvNfRHTYlJb61BMwKgwP89Yaty08tDdE10BQ/7lvPwSKhBiyUxEwJ7gvzvp6fLbvNBPfKPeja+VQd4r7xC8FXJ3uPfUnlB98G/HtiON7m5bQeoxb6BOy5fnq5R9B5YrgMb/4Vl4UTO0vbOrrWNrRHsBUUoPH3eNocAVZS8/lREjD1W2S2jx1lNOYfO+nF/gScm23si/c3x6lBw3zHfyxxyfNF0CPwqeR8Mo6J49jevXuzymzvzzaSquipxjMP22Aqbwlc2+AKbeN/e5w+9T1F6r94G/mq4cvDHmOv40DAufUM7Xc+ieuPgmcbbCWUv1NPPTUT/jFD76fY99xLn7vvmFv29B/qvCeK25b1WwKmLduWsAQMrPI3rQFD++lZ6jkKZhQxO4XrJnZFXM+bBXt/wv4mqiVDdwTV4l5VdnAaxYdEAaF0jOp6nJ/TeoxB6Pex96HQE6+6N+mQ8Naehxpa4NMDiGPbw0inzQFz6+mpx0oCPXp6aTEoDvGYP8eiaHzmM5/JrAx8Rwmg928rJFHo6MHTk48FA+ZYVssjvKbtAQsrbOIKb3+PBPJS4yFQcM4777zs2lE42EfnR/jbc0gZ4H9mEBBCl54uvgeE3OU3i+KAjrPHc24rwLlnHBpRwLRuP0ve6l0dSGEfPyeuQ9ev/3RtKHQ4YDHH375bEsod47IIfxs8aSg7w9rFZipeX8pz3huZJaDxhD7PDUuOVTTj54zQp05w3d3d3f3PmP1SCmojo7rEPUh54T5wyGX2DsNDtj1gPQvNzKlU7pvtOTi1ZWxCv8yA88+ewZHAGpThlqSNe+Q4YKXm86Mk5C2Da+fAA2Z7zkkIYAsBRJjnj+CyzoRUbqJoEUCH/GJhz3Vecskl2WIyqbFs29iBGo9q0fEcq+MxTdOg0sgcdNBBmcBlehDPMz4Hx9ttCGqChdh7UUK5QvgzcyLVQyMvXQ8OjCxwg+MS74DYBITlPfroozM/B5wXpXzAaO59tOhcNK66Zl13Cvbnf3pnKCzMtMB6wzPRJ0MAOHNieSJccR6921f3T6t90x1p1XvvqgFLQNfa9BBccVN3ybzft8/FGw58pdYz4lPPV5+gd40yrjF9HGBVN8Du3+jY+xS0HSiGKMncnxJtA717lnjWMfZZkVT+qFfa5rQmNRH6jQyCKNWrZ6w8tegOznWp8XcEbzz+zu+U2Z6pMSgEVnBR6Tifxvw5ll49PWQWnbHaN7HliYOPYKdSq+EnEZQHb3162NVEdhttJddxajQQ2jgHESkQ86Kui3FFnNSGg544+ypADQoYvRN6ssqLZ6pIYWq8QJ8oUMQbYE178rMNO0IT5YE8GNPUddv70DbYs2dPZoHhWXNdb3nLWzIfCvZBkNh9yUP5jIRq9rXwHPFCR9G0Tn4knDQpMyyFjMJnkWL385//JGxfvSgcc9I14eGfDlxDdj12Gl9qxcwMrbXRl6YsLcXwb3D0rK3Qx5GvUc37lCt7bXFZicspHQKWwKVsqyyQ8F/AumHboErlrtJ/Tmsw4YU+JnR6oTQGlrxFdxAaCAy7djwwZ9+OvwtM+bFSgbmWc+JUBKpoeNzTaE+fPj0TMgwl2OEBYmATVYzKjemOSq0ePj1qvL6JCDiaMK6jRcJP94CAZRxaYU+1xjyewgjQSqDcIGB5F/E9IORZcleN2Qc/+MHMMxm4Bp2fZ8u7YB9mKHAtYBtQLAkoSlhJmCoHOp5PNabcA8oD/hOso0DjSWCjV7ziFYOWFgWOUx7jAUog13f77bdnZUzlQYnG/1WvelU2LY39YrJ39tPvhK9t/UHf50/L0+8G1unHQe+6RweEimXnylllS0BHWLi+OZxxBWVL5n3qpSwAjYbKE+WWpLIVK5rUC+oM5nz7/kks9mSHHW094bvNx3FEwwt9TLfMPx0paLyxwGa8PDW3HuHAtLwYO21OIJwR1COZz0/FQ8DpnPxGuSBfeqc4GFnNnJ4uVgCEfVyxMXcjiGjM4vsaD7h2Eg2TbVQAgcua+1znSIQ+JnnbO1XeggZOawTgJ0BgG7D7MZ0Nocw+nFuogeOToRVFwcPfQdMllYcaRKZ3MafbOsqhJDB984YbbsgUDND5dfx4whg2zwyn0aOOOiq7J5uIsoanNsMt9vnreWTX/cQXw/tmzw4zjmnv97+Z8sHN4ZnU/exdFeaWI/+1L1jTFOF5Lc0i9IXKIvCurPJKp2HGjBlZ50Tvm4SlB2VQ71tKuZQHEnny6TgxDS/06dmmTOh5MOYpE7qgMlBR4rn15EneVlsGjb+zWpeFsebUfH7OF8/np0fMOVnnnf/ID0VCgpue3Be+8IXMPE2PNLX6HSZclIzvfe972THiQFRmNSJqUAAB+ba3vS273kpCn/1t46t8gP80tMEzY9ya/BDW8ap0HIPJlv9ZX59lgEHXA3xHQcNPgv0Y90fZADWOwPg5Qwy8T9B2OP/887N3JUWO69Oxdr96wnmkaAHPBidHho5e85rXZPdmE+WYSGyUUYZghtIbvnP3ojB1EvtPC5/4dupe9oX1C2UJiKfxNQfN1tPXd3udjM2jxLGapn3HtBFnnnlmf6AdsHVLeZJsnXAcS1OY9zFvxuPseSCw6XkzVmzRlLxYYGMqZvw9BkGdpzwMN5+fSodQoSdKRZ03b94gBYLGG+dAhH08Zks+eLF/4hOfyKblCPIUVGj7u97YBkSNCnB9WCi47kpC314r32mkdA986p1IWDMtEWc1bdf5sQTgc8H5mJbFuDfY6xNYAzDxYxa3wyzKk6EDrEhEwothKVysQBL6HDPeQh9S5+ReN2zYkAk0hjds2SExrISzF5YBqywqD0z+d190TDhp2dYhEffsanyNOE1vJDRTT7//nZj3i/UJ6yNKnH2vRHJEEbaWMtUjJUtqm+NAUwh9nNboKVsTOiBI0YbtuDjQS0tNm0vNrZfZPnbS41ycM1YeiHKHM118TpQEpuWxnd4YlZZrUC8TcFyjd8qYvg3IQkL4sz2u2AgcNfy2ktuGop7o3Donn2pIEfoEmOH6hzPv22tWPvoumJLG2CUBR7S/3ZepShJ0xLKngQe7jz5ZWAQFin1ZW93+r+vnnb/yla/MPP11HViWUCgwn2Jp0DXoHNqv3uh6dW59F/T8cfhkoZmU8GdWA71ClF2mUgqVod7t68L9j5ppbMVtYVm/896SsKUJZuGkaBahr+vSJ7172iYsT/Y9UoZnz549ZFiRsqB3SRsRl01bbhzH0jSOfCkTOuTNrUdgx/OaaeQR8LHAxiSaGvPPm3PPvvE5cQykV8kYK9dEb0wgxDkH3tjx1Dsc+5j6xvSi1DxsGmVVXlu5x6tC6zycV0m9Ze757LPPzu5jpEJfecSgHOG7IKVM+9j7ZKgEHwfOxzg2U/SAfdR46jgUMPwn2BeHpx/84AfZdpsf1hgUNMZNERAoZG94wxvC3Llz+2ciSOkC3cN4wP1wrtTzstfAd5ZYxiFRMedtoofIQkwIQ/t+yJNz7Fy7uO9+F4R5/atn5k/jawaaTegDiiZDefFUPN4nFkFZEEHvnk8S+ahcKsXlxXEsTSP06dUjyG0FgLwxfwR2ymzPtnhuPQ27nGMsGvPnHBYaFruGvoYOMBWr9wnMZ6dBTgVdwezPCmsIewkvUGNA5RWqzCIlCOqJzh2fl97JSIS+vXbuT0oDYC1gjJIhEKbMofhYpYxjdc7Fixf3r1THe9SQifK350GBkNCnQdW+ugflybVcddVV2cwMEu9D90F+qbzHA3ve1Hfgu8oLDn8MOzH7w4ZlVWIb94YyOsQ/pnd7WL1oaimoTxOstleJZhH6gAUGaw2dCPuuKOP4otj2KFUObFuh8mzLtuOkGJPQj8PN1hvM9vE4O6TG/GnYEMzxMrgIlZSSQAVLjfmjIOQpDwgqKizHWSdBhAaVmTH9uGdP1Dg0+LPOOmuQsBepCmsr9YEg7/w48mF94b5GKvQFzmYoRLxPLYVKQrGjR8+UPp1Tn7xjPc/Xvva1mdIhOIc9D45QRLJjX5wNrYIw0mdJo6o8OSZ1H/XCnjtG2+21WRD+TEOUM6NNDF1g3cCyEteBUmCfmeGqQav1VWY8n0mK+Pz4b2iePkI/rs+1Yrj75v9K+9B2XnrppYNicJAYlkFhtcOKVrgD79uWx5GW55HuJ1LXn7qv1G+7Td+HOw5S2yBvu1M9YxL6sbCrNXGFxfMdgR172+eN+WOCT5nt8xwD2feaa67JCpgKmcb8mZMObOf8OIpxLezPdVKhMBczbp+KOMcYPh7nBH+xU8TIz/ZG7PdGRc9mpOZ9PU8lIHAOJnq89THZa/xdjo2f/vSn+6fMCd6Z/ucd2v/J1wpKvPzV00fBktCfyNiyI98S5vJTTmPlE2dJ/ieSoZ0l8eyzPw3bNz4UnojeF+i3FR7jWV5T12PfOTBVVpYO/E3qNc01vm97DcAziq8NmD7KtFOceO37IKol72T58uVDjhkL5EXierAGCZ1D/8WwPb5+7UuKj7d5cJzabv7X9zg/PUO2abvNS9tJNn9nbIxJ6Of1jmsBjTQOc6NZklbQ8HF9sdk+T0mgMmrMX4WMz+uuuy5TCBhawEGMRhSvf/ajQNJobtmyJZt+pwUw0ODlPc5YHT1TxZUHm78KP6jwNzK6xmrH9O09C76vXLkyG0tngRk1gjj0UQZU6YGekZ4vS9Dy/MHmp4YNQY9VhX3p6StIz0SC+7blxf7WJyZklF+UVJ4HZdLOGDniiCOy548Pg56nsPnx3TbS8bnrjc4p4u9YfQhSRLlQGaHuU3fx50hPYxwd9lpSz0G/+U+OkmzjGnkXdnou74O2iPIvB974XseKzU/v0Apg2/7EsI+SbedtWQDqnb5XQvvZRF48J12j/Y9z8unUjjGP6SMMY4/4WlHNkrQIiNSYvxayiRWTlJIAmO0RLhbGnTGVMtaGYw3XQEElTyoyCgCKgCoyiYYHIUY4XawEtkALFWxLMxRwXeNIhb4aGD71HHh29p3QGHzoQx/KLCLqlSKM8FIXRJ/TrAdi7BMuF5S3fXYMvch6YKffTUTsfcfPQSDUKddYm+KZIyT8S+hlYq0iDyAf5RV/1z7jCeel/PApYarroPyhzDCkQ11k/QU+UbqxJBG6uhZwbpVbPQ8sTlyHro3/4+eDBRDF3z5zrg1zPuXcKge1grzi/LguW++A30xh5d2TaN8YXtM1Cd0b2P90r9RVAmqhZJHISwoXyQbJUjtAh8m2Cfpey+fgDGbMQj/PI75aGCaIfQQwo1Nx47FHtOXUOHtqzJ+ClFJMUA5SSoI9JwmBwX70HK3goFeBEIrDY6K5o8kzrvilL32pvHcJKocKvBoJC/81Q2HXNVbT0wfde949IvjplUvos1SwDdeLUNL4P0Jf8fmFfX4oWxJumLHjQD8TAd0rz9SWJVu+4uf91FNPZYo0s0x4zrHZH8FEnbZWFBp4W3b5rIeQqoTOLfhtFcLxhmuhbbH3b7/zPwlLC46imnVC4plTNnnWtD/2vqzgqxXkp/clAW259dZbsxksUpJJhNfG8inyrsneM8Gu4hkISnSCCLMt4uem+9Z32gK7LXXdzugYs9AHBPBYNWkaotT0uEpL0sZzVxHK9MjjMX/2SykmKSWBAsZiMnhyI/wJlKMeJaDV02MiPwqzbTTR3FkAA+FkCzCo0UyhQp1XsRoN3Ue1Qh+4Tz0L5aNPKjre1zLzo9zZ4R38AJjeyH+YpbWMKPCclQ/wHvRuiKkP9v+JQFxe8soP29Vo6hlQVwhCZE3NJJRWPnEExAlW5RfIg3cE5DPeQlf3ofvkGvita2S7/rP7Afva32NBzzBVt9mm8zCchzDVc1V5pHePLxCCWMKYT+XBp76PFftMLDqvAojp/duEEkBnh/sTyo9k75s2EkXcHm/vmfYyngWlY20+LDNOJ41jsNYQh6IV/HHGk5oI/TyP+EogMCwcSx4jXZJW8fRtowR5ygOKSTxVj4aPc0pJIC+0cnpBRx555CDlAYcghBDTgeyYqJLGD2kUbQVWheGTipKqzGyzFTO1TyOh66tG6KuhSEF+eo88Z43JEnFPQgbInzn0et4ESgI1YEA+JFlgKCOYVicq9pmmnrHKHei9qbxh/cCLH+VXDb8d96fBpi7ZWSY6VnmqfI8nug+w92u3UwbsNdoyUguUtz2HngXbWC8kFTeBdgX/H12PPYZrtvdQS8iXZM/BFE6CXDE8yToadGiYZsx2FBOul/VAcI4E3atF2+gIyXE2lVDWQfvrGuz9EpiMYFlXXHFFNtxAvSU6Icemzu2MjpoIfaBxYIrMSGA6SkpJyDPb2yVpBYWXBj0OiUue9PbjMX+UidQ5pSQgQBAkeDtzrG0k0MoR9uqBWqGPGZ8pZnhBa1U4oQKN4LKFnIpOIea7kqXRC7iut9qePu9MjRzw3Qp14LkjgOhlaAU9Cw0DFhX8K971rndl27ge25ixpoEW3CEwTbxi3kSB+6W3HZcXW55UzvTdPn/gP4ZQEP6KrmgTz5r6hPXLKuQcxzMfT7h+W1503/E92XvmU/vVCvJU/roeXQO92ZNOOinzLZDVhITZG2HGmHeehYSyX+trTcE5sJoR0Im22A596T64Vl07ToaCY9lH9w+0A7SD1Ed65bSF+EGxXYm2IVX2lA/3ThlbuHDhIIss14lMIBqnUxtqJvTVIx+pw1RKSeBlp5bBJc/U+LuC4sRm+zzlIXVOnGjIG6FuhwsojPTc0TLp+asCKBEu89prr82uKRb2qrgq5OTFd7bbyhLDf+NR6WsFlRkTMc8DoZ83PSpuJATblPR8sK6QH4veSEGzx+L3oXX88dQW2odPIuup1xErfxMN3bctWypD/LbbUo2uBacrntcZZ5wxxJqF8KduYmmxoaXHC65V5cjeF8T3AfZ5AN/j+x8Lys+eg84BIZHjZ0cbwhBTPAUVdE3kQ4qve6woT+WrvKlbCGdh/4MHHngga0O5fqbWWrSfPrEMMKMqHlaNYX/ul2sRygPrB1YQ/Hgs+E7h58NS205tqJnQB3rj9MpjELZxjxwNM6UkyGwfg7AmnxjG3hHyQAGiQKEEMN2PNdLVY+c/TdVjIRKc7CjUNGSc0/Za6PUTBx8TsdXWSeSLdQDTk9WQVZBTBRr4bn83C7of28BpGzMXiHbHc+E52h619rH3zNAJz5zAOQgYiJ8JEeWYw0xlt+ez+/F+6ElhPt20aVN56wCYCLmmSy65pD/uPMfH55pIDHdvqfvnt96TPqkH1A9mnNCQx+UfKwwmYep5qpHXOfLOZxt9/R9fQ+o4/tN2PuN9KsG+9rwStFDpnHZb/NuCSZxes0ziSvxmGW3Guyudp95UunZdl7WUwdatW7PpydwHsUVS8Bxpv2mvaVfpqaP4UHdF6n5Tzx9LAKtH4nQL2k6ninJYrxlirUhNhT49v1SPHKFKjzw2B6IkxPH02ceO1wo0Uzv+LuiZ4CQSz+eX8qDCAxS417/+9ZkpirwoYLISsB8R4nBsSa1rj1BDWKEsxHN+44I80VCDqSToDWixF8zpWEYsHKdKj1lz5syZ2b6YOhmrswIbsygNJ9vtugWcT89X58aywvQ+8qGhwJQI9FxkeaB3gBLCsUrOUPRc9Gztc2J4hXfKkr309FUXSAh/emZMYdXzjyEvvT/9VgL7n74r8VvXlAdKJ/EXOD+fmJb5zqdSPHwUo3NZ7Lb4O8nWdax9dDzi3j3bcEpj2ppQPsPd13jC/dhP3RttOBY1Oj62Ptp7BxRrHO64Z3xx2J8hUob97Foiavvt87TtA9CZQsCzABZgGbnwwguzTgCyxakNNRX6gFMQHvcWXjgCWD1ykackyGwfKwnMEEiZ7SkoFBgKkHr2VHZW4JMTCudAY0VQsACLTMfsT8hcFBA8vm3FJaGt48HKmJKdPmYLLJ9KjVSha0VcOZleiVcy79Q+K6YlMf6HVYbnr2cCPJePfexj/evlk1gMBiWLMoPjE2Z5zHzCPlOSvQaUCBYxwvSI8EGZ4ztT9VAIZLrk2nWsPd4ZQM/FNuj6zicWMpZ6lie6TfhWEE8Ds2zcw4vfWfwOdA7qOdvt+QUKNhEsmRHz/ve/P1MyiMFAG4MSyTVxfj5JDPnoO/+fcsop2VQxpt5SXhAo9jqFvS6wZUbJXh95YOXC8mefB1H18CPhmrW/Lb8kvjcSqWsjoNkxxxzT38NWW8z/ui/aVFufbUIJoj4SWVPoPMAn+ei8gIUJp0KsrLxTlA6sB7fddlv2v1Mbai7083rklabNxUoCoC1SSS0cSx7xOC3n4pyYmiicFC4+OSe99nPPPTdTLoiYp+EEhD29dpxP4uUsSQcddFC2NCkCLnYEs4U3/k6aSKhS2vvEUY4xdywfl19+eTbexicVFoGvWQxqzAWmdqwp7IsCx/GEy+U94yGuhkXoWcbPV79pNO69996st4Eih+KH448gP12DkjMU+3zVEOvTQj3jWcdTs1RfGJpB+GuFQhG/Nz7tbwt+IdRvzMT08vAhQAgwlIOfRiqw0EgTgYloVxgmpPzigIu1Ki53gmdAiqEDQEfD5q2ePpavuO3T/ZIakfhdMHTJOL06TGCvXd+xtOBYyzs/9dRTs2memsqshBLE0tZxW6DypW3Kk/b5k5/8ZKakMe+fxbic2jJmoc/LjAU5jS+aWgy9dP6zUMkrme3jvBEQqTF/euoIdQoRAh2zGufC455V7qw1AXMVAocAFHaePQnlgAqN2Q7NM4UKa1xZ4t8TATV6qqS28leCfXUMpBrPFOyvY+y5dO7Ufyk4n21o9OkMJn6efOo7/5Hse4T7778/U9aOOuqoQXWHhK8FPXF65gQCEsqXFL8LGnoad+o2vXIc3zT7op4Jqx+r2eExTo/UWpmA8mPLLZZJhgTxaeB46+/AdxKmbu7fmrb1HPVcGwl7TXRu6OTwTLhH7tW2gbqPVF2mfaVdvfHGG7NhOrvYEx2vu+66q7zn4DImUtuEzuvUhjELfUzfsSBnfD3VI+c3Al6mdcHxCNoYlAR6jxYqIqZ/62kPFDoENg6CmHc5Pxq9naP99a9/PTMjI+xVIJW4LsxJ9FrtClfCFjw+KaCpgjhS4dYs6D5VKW3SM7HPwQoI7SfYbv/Xsan94v/0W+g7/9lnrmOE9ouPd0roWekZ2ufEJ//Hwk9gVWHILGUpY8YLAhzLjpw2LViC6GVjFcIPg2BLcR42oQTQ28dJE7M9ZnzM61jjmG3Ad9oiPpUQPlgfsEywuiBDdbGSr4SlgjaIIajNmzcPul/un7aL/GJLA9fD+H28HdN4HJETVJYbCTpeKD301lGEdA8M3TA2j6Mi6Lqtc7T9FFj0iInCMycfrCD4hfDOwdZPi8qbnpES5B3jVM+Yhb5M6/F0LcbvqQwxCGJM+pY8JUF5x0oC2mg85k9BREOlcUBZsCEk8UTFMRDrgwq0EpYAxoQxW+L4I1TY9EkjYCusLZD6brdNJHRfPAObVEH5buE3+/NO9Dzsp5L2Iw+9S+0H/M92bdO+fCrx25L6n08nTfyM4uep9wx8xs+T33feeWc2dp4S/ghaetIoCLQR1HV6hJiE6dHH+yshhA855JBMeCJsCf5yww03ZENLOOvZ6WaVQOFAiNNJoE1i1gHhb7lWOaDFCTM1JmaEHefCKZhhAbsPQYxoZ1jKl3aK5XC1up8S145VBHhmJAnMRoKFfvCtob1GiVE8EiWGX2OLK9hykYLgWgpQxLOOA6/pmeg7UN/VFqjs6T+nNlQl9DFvpcLtpkLl8uJSPfK8Fe7ylAQcOXDeicHET2UEzkElxiRFQQMKDNeL8KcS20JM4hoYf2NIwFoDJIj4hLxCx3YVdv7nu46ZSMT3rkrJdpvss1BltbAd9NzsMcLmof3B/iZvvaN4f7tN78L+5wyF54IgisuunpeeHc9V++gZ61Mw1k0vHAU+nurH7Bf8LhD2ONja/5RwBKV3SC8eIc+0wZSVQHDdXAPJvl+uM742CwKMWCD4n6B44Ixn484rcR2Y6hXzQVYCxqnxE4o7OvSWaYfsvaMYKK6BnmUjIQErWM+C3j3vUPfLu2MmAqgsgJ677im+P6Y0M+ZPHlgQFBFV+8TvDXh3tiyyT2o/Z/RUJfTpcTNWkxcq146bA0KZShAXLMbfSRYqopQE+4KVd6wkUGnRHjELcpwUAAoI+3KNmB5V+ZSYaoT2yVRBa8a35yQP0DYVQn7b/fjOf9o2UQtnfE/cpxpc/Rb2u31uefBfKh+w/+l7Xl78VymfvONaHdvAikrPWtvy9iE/HMBQ4LG6xcJfCXM4/9GeMOaLsx7WNqxyeeic+m4/2W7fu66NT92jtsWgrDDrhMWcMGlzXfF185tpi/SE8Vew2HzpdND5kMDkPlEQIO/8B5rUNeG9T8Ay7gGlx3bqbJnhWB3P/ZEsKDw8MxtBU/vYGT6pa7DbU+XUGR0VhT7CMzat0yNHe42pJlQuZvRYSeDl0liwP2Eq9bIpIOTLGB3b+I2nN6Z6GhV6DpyH7VwrZkQWybEVloTJiv3xBrbzTm3BchxndEixtyFmme7FOv40+HYeuwQiCjh1m7H9GNVLWz+p47YDoe0SCHxqm+A3x8Xb2RZvJ1YEJnmNz3OdUgDoYOAQXGlYQXnRcWFoQvfLVGDNPW8U876ei0g9I/XSUXZoUyE+BuxxvB8roHEOJLwzc/iZEQDaX/ulzu3Uj4pCP2Vap0eOuYdodxYUBAR57IVPBaAnHo8JoTmSP/DCSVIS4gUelDfmPoYSGOdnWVvGB9mH4+i1o1HH41E0LCSCvtjIWGALKOe3hdVxnJGhemPrksAEvnjx4iwmAyZ09aAlTOnlYxZHYed4tQWC+iqhoE/gEwGq31IG2MZ3m4dgm/YT2g9TNDMI5JmvhOBHaOPgVw0Mg2rIACUCJ0MRX0O94R71bmz7J+zz4lP7sMoi7weFjTF/YfPQM9VxNh/A+58hVJ4FfhIptK8zPlQU+nmmdXruqWlzeaFysQzEgXloDBDeUhIoMBRMKQkEwlFhYGweRxoKDsqCtT7gpMO4WzwmR4NCZcNsyFCACj3EBdRxnLETC2ErHJhCy6wau648Sb1+hC3jxnFkTVDbIDiH/Z3nFc7veFt8LNdJW8OccKYbqu3Q9dExYZy7WpgphMe68sGCMN7oXvUMdN/WGqP3pU8LUxjx0cBpkU6WYF/laY9PfccRko4awziy7Oo/Ef926ku/0MfkzjhcrIVifrNaKrAPzjh5oXJTU/VwDImHCpiqZ4cKePkUJq4DJYH9USRQPLgOrlEFBEWAuNbymLUVFWFPhUNzlxaah87pBc9xRkcsAIQVOPqPufuM3dNO2Horpf3www8Pn/3sZwdZBlVHSdRn20Ypf9D31HmVB/Cp7fgQoHDQZtCj1fUwvs/YPfvpWJvHSCDADHmRCCUr5SFuY+sN1y2Bb69fw6gkvmsfwXg8kS5pu5mhAewr7PEcS7L/A/EK6LApfj//6xpS+zv1Z1BPn/nrcY9cpvXYSU898rgAY9ZKeeErVK7FTtWzhYEVqfD2pGFgnq09N8KeysSqblRU9RSUqMAMPdBoxAvikLyQOU5tscKC+mUbc9U7wX/UTcy+eOgzNc/WX+ozwpdwypiX7bHKW6jtsftY2G6vxR6PVYKwvvTuaUfsNdC7x28IOIZ89FkN+BspT5yHJTjHE67b3r++V0LPlZlPXDfvAnQsz9C+hxjtx3g+wp7hYGZtgf6r9lk6tWOQ0FePPB5/Z1xf4+8WNDiC3Vg4ljxQCix58/k5nnwoDJjpcP7heKJ9oSWqcPAfUz5YLIcxeltJSeRx8803Z4EhNK4n8goY5+Q/kgqj4zijxwpZ6qEVDraO8Z2Fk+hpM5MmrtMIYhR/hueYCy9SdTnOF6xg4pNrEQh0LIzy/5GTIR0J/IkII6zz8ElbYs8xUrAUKDY90/w0pm2fyXjAPdj7535YS4FrQihjghfaDysrgY/o2Nkph7ZdxdJLe00nS0MsAsdFOpHcv51ZpedKXnqmo3m2zugZMqaPV3zcI5fZ3oaWhDwlgYKQN1Uvbz4/ATz4xFcAhz1VDHrrxGqnBy+ToE1MKyF8J2ZDXQcFy1Z4sAVLhc9u47sKpOM4o8c27KprwKfaBFvf6AgQKwOHL2bY2PpNz5+eIuPCdl0FCSc7Pi3I29Ztwb6ElsU5Le7d44vELII4P+Vlr3c4dO4rrriiP386K1gwxxNdN9h3wLOjE8d1MazCkAqLjglWv8TCimlfMyuUF0ltKveEpUSdNNp2LLooT0RkJAgSClusEOha7LXpu1N/2mKzfV4UvLwV7tiWFyo3nqonx0Ab+Q4THuNnaIR2NSUqH5okS6fG61STGCNjSglmI5ZgtNjKqcKkAmtTvN1xnOqh7qTqHMT1S59q6PUbGEok4h7TamOhzJQvZgAQnY99hBUg+q68bY8aQYagi4cTcDCjHSEqndA16fqUt7aPFFbb03kOPfTQ/tj+us7xQNcO+uS54NxM26rrw6pCkCJCGtOeM6OCpZV1z/rUc+CThXRoh5WH8qGHTzhz2nkpUexvryPOzxk/2pjKFsO2uEcusz1C2pKnJBAql0Jke9+AKQ9ve5aeRGEgT0xN6gEwzo+lgDj4CuFoE3li5sdEh3lQxFaFavBC5zhjo9o6pP1Tx7E2Ps589O7pJNj6T8+fSJq0T8zcsdg89R2hQ3x/LIU2VgCJNoa1AeJOQ4rUdVaCDg4Bf3QuesKi2rzGin0ugt43SgimeXwNCMbDcATtO+Z827ba42xe7IOFBisBw7nkgUJGR8wuQy5S12G/NwrIKimMUkoa8TpHSxsCO55brx55PFUPYZyaqocGnRcqF8dAPTQSgXEYS0MjxHpglQIqOnlhJbCVk8RcWZbaxFxkp/XoBU2kl+I4rUhch1m6ldUucSSjp2/bA8zS9FQZFrTDjupcAAIpFROfQDsEimFanVD7VCvwDWApX86HvwKhbcFen9OYUA70nlQual0+DiRtjN8Tmz4mL8IeAplevCVPSUBrRKlgji5e9+THfkzDk2WAMXs0RQLrINht5SRh9id8I+Yo643vOE5r8PDDD2cOv4wXx349TLHDYsj/Wg2OTgC9VhtdT/sSa594ALYnW2sYM6et03kZlqAX7DQXVkGbUEJfZvt4bn21U/Uo5PF8fmD6HmM85IUiwTQOwOz25S9/Oeu9W2FPxZTnLho+pnxCX1JJf/jDH2ZOPyzCgSLBd/3WpydPnpovMetGdVjf8aKnntNGUffvvffebLouTsJqL5TovWMlvOqqq7K1/nH+s//TnrzxjW/MrIm0Pfv27cvaODofnItzci4+42urJtExwSKKn5LOjXM0EUOxUHKuPXv2JI/1dOAT74YyIOdDBP1EsyRn3vuaNhdTzVS9WEmgomJFYLEGKhshcEHaE0575KOKoaAYfGLKU6zr7u7urKKff/754bzzzsvG8vjUbz5JeP7y25MnT82XqMOq2zjA8f2d73xntp3fJIQ5Vj/Wx1e7YduOOLFd/9GxwZeIwECY/MmPNoO2hU+dI76uahPDBlpHnnPjR4B3PIHEdK7UcZ4aI0me4Gcma7TG9ycKmdCX2T6eW89Np8b886bqUahZmIFxfP5Hw42PBTTqadOm9VcMnHPiIDuePHnylJdoLyTQ1YboN99ZJEbb4pkA45E4NwKfz9T/nho7MavDrhUwocz75c9selzKbM/0jdRUPfwA4vn8LEpBb//II48cMlxAD18aE163xHROPWxPnjx58uTpQCZ8yeL1BiYKg4Lz4G0fz63PG/O3U/WwEHAsY22xtcCCQqGHx9QOAkAQ4IHjmIbDp/3O3FZtU2LJyrxtHOfJk6fmTHG9Tm3nN9PvqPN816fdx7YH+oz3UXtlE/nGx1SblA9tF9eh67NtGd/j4zw1RmJohuWgWRwKkFfqsE64nj7gIZ8y2xPxLjXmj6Md8+ZJKAuxlUDEXpD2t+M4juM0GsiqiTaeD4OEPmDKx2PeEo/508snbCXRrdCIYiXBcRzHcZzGoy0222/cuDEZYY8xfy3QgJMD4/nxPo7jOI7jNC5tKSc9evEE0BFMx2MKDZGlCKMbB+FxHMc5cBTD/j1PZu3Sk0/uCfsHFpQrUdwf9rsx0nEy2lJT9QgkgRf+tm3bsh49PX+C78SBevKxlXCY9LTXRsdxqqU3bF/XExbNPiy0F9pC26SDsxU3J0/u7PtdCO2dM8K5PZ8Pm3fsCKu7OkLX2vJhjtPitOGAhyerdcJjjJ4oegTWodfPAgrVsSPccnpfBTx40pCpEJMOpmKWU///k8LBM+aFK1c/OlRLdxzHMRQfXxMWTaXtKITOOUvDukf393UzLL1h1+Y7yvuU2p25q/aV/3Oc1qYNYc80Ennf80kIS8z+9913X3m30VIMu++YGwrliteWULeL+x8N65aeGjrK+xQO6w4b9pb/dBzHMex9aEmYTs++rSPMX/V4JOxj9oYN3Ydl7c+0noGlcx2nlcm89zHvsyIUvW96/Sy3WDMe6wnTKgh9sXdt14Dgn3598CrqOM4gHru+LPDbQkf3pmEEvngsXD+9EI5Ytq3823Fam8x7nzn49O7x0K85IxT6IewLd88vlPZraw99ddpxHKfMzrByVrl9KMwNq6qwBha3LAlTfFDfcTLaCMbD4jl5gXXGzIiFPruW4vGT3BznOI4obrg4tJfbhkJfO1Kd68/O8JnP3F/+7jitTba0bl1xoe84zpgohrVdsgK6U57jjIUhEflqzoiF/t5wx5vK+7l533GcfjaF7na1DZPDki3lzY7jVE2DCP1i2L3GOPLNWhl2lv9xHKfF2bcqzFUb0jYtuBHQcUbP+Ar9E64IDzxig/M8Eh64Z0W47MTO8rQ+5t0uD1s9Xo/jOMK2IS70HWdMjK/QL7SHTgXmGRScp5Q65l0b7h8SaMNxnJbGe/qOUzMOvHm/9+nwyLqlYU6nHHW8t+84jsWO6bu/j+OMhcZx5CtuCz3TBzx0fVzfcZwSNoZHW5i18qnydsdxqqVxhD5sXRqmaF/30nUcp8y+tV398/Tbjl9efYegWPRhQ8fpo7GEftgSlkwu79uXht3dcZwWoRROt9Q2dITuTVWIcKyIZy8NW1zqO44LfcdxmoPitp7+2PttHV1hze4RSPHi42HV2XNCzzaX+I4DDSX0sxjZ2rcwP9ztgbccxzH0bu0JMyeV24hJM8PSjbtCns9vcfeDYelJh4WFa33ZTscR9Rf625aFI0Yg9Iu714SujvJ+bYUwa6W78TmOMxSEec8cxfZoC4X2Y8K8C68MK+65J9zTlz7XszgsmH1IOHjqorB6u08DchxLnYR+Mezf82R48pF14f0zzVz8KWeGns/dMyhAzyMPfC70LDoxdMpsV+gMZw+7TrbjOK1O767N4fN9Av7CeTMGYn/MmBcuXNwT1j3ydK4FwHFamToJ/R3hltNNEJ7hEhUVTX395rDLa6rjOI7j1IX6m/cdx3Ecx2kIXOg7juM4TovgQt9xHMdxWgQX+o7jOI7TIrjQdxzHcZwWwYW+4ziO47QILvQdx3Ecp0Vwoe84juM4LYILfcdxHMdpEVzoO47jOE6L4ELfcRzHcVoEF/qO4ziO0yK40Hccx3GcFsGFvuM4juO0CC70HcdxHKdFcKHvOI7jOC2CC33HcRzHaRFc6DuO4zhOi+BC33Ecx3FaBBf6juM4jtMiuNB3HMdxnBbBhb7jOI7jtAgu9B3HcRynRXCh7ziO4zgtggt9x3Ecx2kJQvh/N0k3YvQpQRsAAAAASUVORK5CYII= | As shown in the figure, using a ruler to measure the side lengths of triangle ABC, what type of triangle is triangle ABC? | A. Isosceles; B. Right-angled; C. Equilateral; D. No correct answer | A |
229 | 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 | As shown in the figure, triangle ABC is an isosceles triangle. What is the measure of ∠B in degrees? | A. 25; B. 35; C. 10; D. No correct answer | A |
230 | 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 | As shown in the figure, triangle ABC is an isosceles triangle, ∠B = 25°, then the angle of ∠1 is ( ) | A. 95°; B. 145°; C. 120°; D. No correct answer | C |
231 | 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 | As shown in the figure, using a ruler to measure the side length AB of triangle ABC, from the information in the figure, it can be calculated that ∠1 is ( ). | A. 95°; B. 145°; C. 120°; D. No correct answer | C |
232 | 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 | As shown in the figure, the protractor measures the degree of ∠B as ()°? | A. 42; B. 50; C. 60; D. No correct answer | A |
233 | 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 | As shown in the figure, in the right triangle ABC, ∠A = ( )° | A. 42; B. 90; C. 48; D. No correct answer | B |
234 | 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 | As shown in the figure, in the right triangle CAB, ∠A = 90°, then ∠C = ( )° | A. 48°; B. 58°; C. 45°; D. 68°; E. No correct answer | A |
235 | 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 | As shown in the figure, in the right triangle CAB, ∠C = ( )°. | A. 48; B. 58; C. 45; D. 68; E. No correct answer | A |
236 | 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 | As shown in the figure, what is the degree measure of the angle measured with the protractor? ( )°? | A. 110; B. 100; C. 90; D. No correct answer | A |
237 | 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 | As shown in the figure, ∠2 = ()° | A. 52; B. 70; C. 72; D. 38; E. No correct answer | B |
238 | 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 | As shown in the figure, it is known that ∠2 = 70°. Then ∠1 = ( )° | A. 52; B. 70; C. 72; D. 38; E. No correct answer | C |
239 | 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 | As shown in the figure, use a protractor to measure the angle in the diagram and calculate ∠1 = ()°. | A. 52; B. 70; C. 72; D. 38; E. No correct answer | C |
240 | 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 | As shown in the figure, what is the degree measure of ∠3 using the protractor? ( )°? | A. 40; B. 50; C. 60; D. No correct answer | B |
241 | 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 | As shown in the figure, in the triangle, ∠2 = ( ) | A. 95°; B. 85°; C. 105°; D. No correct answer | B |
242 | 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 | Calculate the degree of angle ∠1 based on the degrees of the other angles shown below (). | A. 95°; B. 85°; C. 105°; D. No correct answer | A |
243 | 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 | As shown in the figure, use a protractor to measure the angle in the diagram. Given that ∠4 = 45°, calculate ∠1 = ( ). | A. 95°; B. 85°; C. 105°; D. No correct answer | A |
244 | 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 | As shown in the figure, what is the measure of ∠B using the protractor? ( )°? | A. 40; B. 50; C. 60; D. No correct answer | B |
245 | 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 | As shown in the figure, in △ABC, what is ∠A + ∠C? | A. 150°; B. 140°; C. 130°; D. No correct answer | C |
246 | 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 | As shown in the figure, in △ABC, ∠A + ∠C = 130°. If ∠B is cut along the dashed line in the figure, then ∠1 + ∠2 equals ( ) | A. 130°; B. 230°; C. 270°; D. 310°; E. No correct answer | B |
247 | 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 | As shown in the figure, use a protractor to measure the degree of ∠B in △ABC. If ∠B is cut along the dashed line in the figure, then ∠1 + ∠2 equals ( ). | A. 130°; B. 230°; C. 270°; D. 310°; E. No correct answer | B |
248 | 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 | As shown in the figure, what is the measure of the angle using the protractor? ( )°? | A. 67; B. 50; C. 60; D. No correct answer | A |
249 | 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 | A triangle paper has one of its corners torn off (as shown in the figure). What is the measure of the angle that was torn off? ( ) | A. 50°; B. 40°; C. 67°; D. No correct answer | C |
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 | A triangle paper piece has one of its corners torn off (as shown in the figure), and the degree of one of its angles is measured using a protractor. What type of triangle is this? | A. Equilateral; B. Isosceles; C. Obtuse; D. No correct answer | B |
252 | iVBORw0KGgoAAAANSUhEUgAAAR4AAAFjCAYAAADrdWTJAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAACohSURBVHhe7d0LeBTlvQZwISEbSAKhgICCRAFBLgoKkgoCURRU0KgoyEWjokRFTS0ICuUiWvTkKFqooaSKFW1UqByFYw5iSS0tEbFERY2CGDViFIp4bVrsOd/h/c83YYFcdjez387svL/nmQf4b27szryZ/a7HKCIiwxg8RGQcg4eIjGPwEJFxDB4iMo7BQ0TGMXiIyDgGDxEZx+AhIuMYPERkHIOHiIxj8BCRcQweIjKOwUNExjF4iMg4Bg8RGcfgISLjGDxEZByDh4iMY/AQkXEMHiIyjsFDRMYxeIjIOAYPERnH4CEi4xg8RGQcg4eIjGPwEJFxDB4K2apVq/TfiBqHwUMh69Onj9q7d6/+F1HkGDwUkqqqKnXMMceoX90zU1eIIsfgoZCsXLlSgifzpDa6QhQ5Bg+FJCcnR4Inockx6quqT3SVKDIMHgpJRkaGBA+OX8++SVeJIsPgoQZVVFTUhA6OC/tn6EeIIsPgoQatWLFCAicpoYn82bxZE/XDt1/rR4nCx+ChBo0fP14CZ0SXJNU80QqfVUvv1Y8ShY/BQw3q0KGDhM3szBQ1MiNJ/n7l2b31o0ThY/BQvcrLyyVocKy+pJV6YOJg+fuxqYn6I4jCx+ChehUUFEjQdGmZoP46obXa9+kO6VJHbX1Rof4oovAweKhedvtOdveAevOuoVL7abd2Urv18iz5N1G4GDxUr/T0dAmZBYNT1MfPLJDa/bdNlFrn1snyb6JwMXioTmVlZRIwOF68rJXa/+YrUv9o+xs19XdKN0qNKBwMHqrT4sWLJVzQvlN6TQf17+rv9SNKnXp8S3ns7msv0RWi0DF4qE7Z2dkSLuN6BtQ7C8foqmX6uBHy2OldfqIrRKFj8FCtfvzxR5Wamirhsmhoqvp09f36EcuW4ufkMRyVH32gq0ShYfBQrUpLS2uCZf3YdPXN+6X6kUM6t7IGEz40c6quEIWGwUO1WrRokYRK99YJ6rXrOqn/+/eP+pFDbhg5QD7m7F6ddIUoNAweqtWoUaMkVCb3SlbvPjBWVw9XvOJh+RhMHv3mq7/rKlHDGDx0lOD2nQezUtXudUv0I4f73wP/VOnJTeXjfvegNcaHKBQMHjpKSUmJhAmmRrxyZbr6/uO39SNHuyKzu3xs9k9P0RWihjF46Cjz5s2TMOndNlFtmVL/ol+/++V0+di0QILcKRGFgsFDRxk+fLiESU6fZPXBkut1tXbf7tlds0bP2qeW6ypR/Rg8dJjq6mqVnJwsQbL03DRV9crj+pG6nXuKtV5PzgVn6QpR/Rg8dJgNGzZIiKCnqmRcuqr+Ypd+pG6/+vnV8jnt0wK6QlQ/Bg8dZtasWRIi/dsnqjduP01X6/fZe2/UrNGz+Y8v6SpR3Rg8dJjMzEwJkOv6Jqudy27R1YYN6GxNGs2bePicLqLaMHioxnfffacSExMlQArOS1N7Nj2rH2nY3Gsuks/r2bGVrhDVjcFDNYqLiyU80Ev156taqwP7v9SPNGz7H5+Xz8Xx/jt1j/shAgYP1Zg+3RqTk9mxmdo2/UxdDd3JbQPy+ffefq2uENWOwUM1+vXrJ8GR26+5+uiJO3U1dLeNGSSff0bXDrpCVDsGD4n9+/dLaOBYfn6a2rd1nX4kdH96+lfy+QlNm6g9X1TpKtHRGDwk1qxZI6GRmtREbZ7cTv34Q/hbFGPS6LEtEuTrPHrf3bpKdDQGD4lp06ZJYAzt1Ey9Pfc8XQ3f1UN7ytc5/4yTdYXoaAweEj17WoFx2+ktaraxicRz+TPl6yQlNpXpF0S1YfCQqqqqkrDA8cQFLdXX2/+kHwnfP/buVq0C1qTRZ35b+zo+RAweUkVFRRIUCAxsY4O2msYYfdpx8vWuOGeArhAdjsFDKjc3V4JiRJeko7axicSyGZPl66W3aMY1eqhWDB5S3bp1k6CYMbCFqlyTr6uR27PjTZndjq9ZUvyirhIdwuDxuYqKCgkIHL8f3VJ9u3OrfqRxzj6plXzNGy8faRWIgjB4fG7FihUSEG2Sm9a5jU0k7p8yWr7uCW1TdYXoEAaPz+Xk5EhAXHhSkip/aJKuNt6uv66Tr4vjb1s26yqRhcHjcxkZGRIOszNT1OfFj+pq4+HOqV8HawnVu3OdCzSKDwweHysvL6+5K1l9SSv1Q+V7+hFnzLzMWlSsb8axukJkYfD4WEFBgQRDx5Sm6vWbe+iqc7b+YVlNsFVWVuoqEYPH18aPHy+hMKZroMFtbCLx7+rvVZdW1oqG+b/4ua4SMXh8rUMHa1uaBYNT1Bcbn9RVZ+Wee4p8jyF9T9IVIgaPbwW377x4WSv1zz2f6EectW7JbPkeWKMHa/4QAYPHpxYvXiyB0KVlQsjb2ETiX/t2q2NbNJXv9fjSB3WV/I7B41PZ2dkSBtndA2rXY3foqvMw8/2KM46X73XJ0DN0lfyOweNT6enpEgb3DklRezf/QVedgbdUuKPCGj84Vs6dIt+rRVIC1+ghweDxobKyMgkCHOvHpqunHvuNLH26d+9e/RGR2b59u8x0T01Nrfn62If9hZXLZMsc/Hvt86Hv1UXxi8HjQ4sWLZIQ6N46QW2ZMeSwoMBM9UmTJqklS5ZIQGESaW1HaWmpjAPCkqnDhw+vuYOyD4yIxvexw+yCHtbjE0dnyb/J3xg8PjRq1CgJgXE9A2rzw7dKe4/dtd7YY8SIEXL3dOQ6PA/daO002jatua6QnzF4fAaBYN/h/MewVPXVtv/RjygZXbxq1SqVl5cne6jjbVJwqAQfeAz7cE2ZMkXac0pKSurtLt+9pbhmjZ5XSzbqKvkVg8dn8BYJF39Ck2PUH69qK6OLQ4W91e23WuGuLIhJowOPs3YanX7DRF0lv2Lw+IzdvtO7bWKjtrGJxIKrzpbv3eXYdF0hv2Lw+AwagnHxT+6VrD557j5dNePN5x+V741j586dukp+xODxEYyhsdttHsxKVV+/t0k/YgZ2J+3dtpl8/zk/y9VV8iMGj4+gARgXPRp5N05s3+htbCJx63nWpNGBPbvoCvkRg8dH5s2bJxd9//aJ6t0HxupqiKo/UiWFd6lLz+yhevQ4U116V6Eq+Sj8Uch/Xj5XfgYcmE5B/sTg8ZEhQ4bIBX9d32T12QuLdTUE+zaqGV2tHqnDjkBXNWPjPv1BocEs+E5p1qTRgoce0FXyGwaPT6ArPDHRWpRr6blpYWxj85l65sreakJhqdotNzjV6qvy59VNdhD1fUS9Kx8XumsGdZLPzRrQS1fIbxg8PlFcXCwXO9p3Nl0bevvKNxvvU/Nru6t59xHVF8FzzGBV+KGuhWj1PTfKzxJITJBAJP9h8PjErFmz5GLP7NjMoW1sNqo8BE/gevXSN7oUItxtYZ92/DxPPfGYrpKfMHh8AlMgcKHn9muuPl+/XFcb4Zu1avLBr9d5/hZ1QJfCkd2rtfw8Y88/W1fITxg8PoA5VHb7zvLz09Q/du/Qj0SqWm1b1FcFsgrVB5GkzkHLbx0jP0+LQLOwp1+Q9zF4fACzxXGRY02c0tyTdTUy1btLVeGErirQ+mK1ckeEqXNQ1ZaXatboeXn9oYmq5A8MHh/AbHNc4IOPb6Z2LrtFV8NVoYouTpOvc+hIUyML3z14/xM+DF4c1qW5fJ0br7pUV8kvGDw+gOUrcIHfdnoL9eWrT+tquA6ob/dUqYo3X1VP3zdadQ3Y4RNQk9eGN5bH9sDEwfI1OvwkTVfILxg8cQ4rAFoBcYx64oKWzm1js2+bys/SY3kGF6owe9RF+YvLZHkOfI2tW0MdV0TxgMET54qKiuTCTk1qorZNP1NXnXHgrXw9lidPRbK014Fv/64GdkySn2/mrTfqKvkBgyfOYfF1XNhDOzWLwjY2b6n8HgeDp918tUVXwnXnKGvSaI8TOugK+QGDJ85hexlc2DMGtnB8Gxs7eALXv6TCHENY47XHFsjPh4Nr9PgHgyeOYfa3fVH/fnRLWQ8nbAe+VXv2fFvrIMF9G/NU50CWKox0MM9B1V/skt0u8DP+533zdZXiHYMnjq1cuVIu6DbJTdWbdw3V1XB8oVZfaTUgp2Xeqp4q3W11nVd/pcqLZ6j+aeHPTq/NjZkd5Xuc2ae7rlC8Y/DEsZycHLmgR3RJUh8/s0BXw/Ph6glBXef6SDtenX/rU2rrl5Hf6QR76f6b5OsmNG3S6E0FyRsYPHEsI6OLXNCzBrVQ+998RVcjgLdbB9+24a1b1VfOb0H8zfulqmOKtUbPbx5dqqsUzxg8cQpb0Nh3KH+49CdhbWMTC1f1tXYavXBYpq5QPGPwxKkVK1bIhYw7iXcWjtFV9/rdHZfKzxtoliCL0lN8Y/DEqfHjx1t3ECclqU9X36+r7vXlay/UrNHz/B9W6yrFKwZPnOrQob1cxLMzU4xvYxMJvBUcdZI1aXTCpRfoKsUrBk8cKi8vlwsYx4vjOsr2wV6w5BprMfrWaS24Rk+cY/DEoYKCArmAu7RMCH8bmxja9d/LZU1o/OzYA4ziF4MnDtntO9ndA+FtYxNjB/Z/KXPK8LNPuyFHVykeMXjiUHqrVnLxLhicor7/+G1d9Yb5F/eRnz2jY1tdoXjE4IkzZWVlcuHieGliZ131jrd+N7/m58f/heITgyfOLF68WC5aTLz8YMn1uuodP1S+p05tZy1MP3/2LF2leMPgiTPZ2dly0Y7rGVBVrzyuq96SN9TaabRPtxN0heINgyeOoAs6NSVFLtpFQ1Md2MYmNkryrUmjOCorK3WV4gmDJ46UlpbWXLAluX101Xsw4PGkdGuNnl897J1eOQodgyeOLFq0SC7W3m0TG7GNTd0wEBHrJEcbvs91/a1Jo8PO7KerFE8YPHFk1KhRcrFO7pXciG1s6oY7kWh83do8N8Nqq0po2lR2QqX4wuCJE8HtOw9mpcpgPKdhMTFTPWVYH/rYFtYaPVhJkeILgydOYIqB3CE0OUb95fYzdNVZ2B7ntes6GZn7hUmjl/ZoIf+nS0aeo6sULxg8cWLevHlykaJ956Mn7tRV52AjwL9OaC2HqdnuhddZO42mJCdxjZ44w+CJE8OHD5eL9Lq+yWrf1nW66hyMCbKDJ9L1m8NVuf63qnmiNWm0uLhYVykeMHjiAO4GkgPWbhBLz02LbBubBrz/8DU1wVN251m6Gl3/2rdbjcywdhq9duI4XaV4wOCJAxs2bJCLE0tKbL37XF11Dtp00LZjBw8OhIIJ942xNiQ8tnVLXaF4wOCJA7NmzZKLs3/7xKi8DUKbDsJm8+R26o3bT5O/f7HxSf1odJU/dU/NGj2bNrl/JUUKDYMnDmQOGiQX5g2nNm/cNjZ1+OS5+yRssGh8xdO/kL/jrZcJWNZjYAdrjZ4777hdV8nrGDwe991336nEBGt6QeGFbdT/HvinfsQ5b805R8Kmck2++nr7n+TvprrVYfY5x8n/78ROHXSFvI7B43Ho7cFFid6ftxaM1lXnYIoEggbHd7u2SbDZ7T2mutU3P3Ro0ujOnTt1lbyMweNx06dPlwsys2MzuSNx2p5Nz0rIvH5zD11R6r388VIz1a2OuyyMT8L/857583SVvIzB43GnnXqqXJC5/Zqrb3du1VXn7Hh0qoQM/rTZY3pMdavjLmvq6S2tgO3v3Vn3dAiDx8MweRIXI44VFx8blTYX3OkgZHDnYwsexWyqW714zuU1/1eu0eN9DB4PW7NmjVyIqUlN5O2P09CmYwfMkcthYN4W6qa61RF8ndKsSaOFhYW6Sl7F4PGwadOmyYWILWE+L35UV52DNiOEy9tzz9OVQ0x3q2M09uQ+1qTRrMGDdJW8isHjYT1OPlkuxNtObxGVbWwwbgfhgnE8R4pFt/qTU6xJo4FmiTKMgLyLweNRVVVVchHiKBqfoavOwbIUGKmMcPnm/VJdPSQW3eq4q2sVsEYxFxUV6Sp5EYPHo3Dh4QJsk9w0KotzYYY7QmXLlIw672hMd6tXf7FLjelqTYa9auylukpexODxqNzcXLkAR3RJiso2Nrseu0NCpb42HNPd6vDI5afI/zuleUBWXSRvYvB4VNcTM+QCnDGwhXRvOy2UyaDB3erR+Blqs+PpBTVr9GBWPnkTg8eDKioq5MLDsfrqnrrqHOzHZQdKQ+N07G51U5sHYpBk1gnWGj1Tb5iiq+Q1DB4PWrFihVx4WAz9w8LbdNU5n69fLmESylsou1s9GuOI6rJgREf5/x/Xro2ukNcweDwoJydHLrwLT0qS3Ric9u4DYyVMECoNCe5Wj8bM+NpsXXyDLGqP52DrVueniVD0MXg8qEvn4+Wim52Z4vg2NgiP0ms6SJggVBpyWLd6CB/vhK+2/U/NGj1zZt+tq+QlDB6PKS8vlwsOx39PdX4bm0juYOz1mEO5Q3ICfq68QdZOo6d0O1FXyUsYPB5TUFAgF1zHlKbqoyed/21vt9ng7Vao0POFz0FDsyklcy+rCWCu0eM9DB6PGT9+vFxs2d0DUdnGxu6lQgNzqNDzhc/BYapbHVspd29trbyYn+/8OkQUXQwej2nfro1cbPec3VKmNTgpOEAwSjgc6AHD55nqVsdseewhhufipwP76yp5BYPHQ4LbdzbeMUxXnWO/ZcLgwXBh2gQ+12S3+qqbrEmjiQlN1d69e3WVvIDB4yGLFy+WC61Ly4RaZ4w3FuZ8ITwwXSJc9hY4JrvVP3thsbR14TnhGj3ewuDxkEsuvlgusstPDjg+IxwTQTEhFOGB7upw4fNNd6vj7eC4ntak0YsvHKWr5AUMHg9plZYqF9kDWemO31Vg6QuEBsbwRNp2ZLpbHZZfYa1JFEhqxjV6PITB4xFlZWVygeEonXuRrjrn09X3S2hg8a9IxaJbfeeTs2vW6MFSsOQNDB6PWLRokVxc6EJG24bTsLwpQqMxXzsW3eq4U8PUETw310yepKvkdgwejxh5/nlycaFNw+ltbII37fuh8j1djYzpbnW0LeWPtCaNtklvyTV6PILB4wG4mFJaNJeL6+FR7etcETBSmGiKsAjetC9SsehWf+uRG1VSgvV2q6SkRFfJzRg8HlBaWioXFWZk/22R8xf0zmW3SFjgz8aKRbc6RnBjpw08R3m3O79MCDmPweMBdvsOtvENZypDqOxN+5xYYiMW3erohbvrrFbyHJ1wfEddJTdj8HjAsCFnyUU1uVeyrA7oJLTpICRwYO8qJ8SiW/0vc8fUrNGDHkByNwaPy1VXV8sYFVxQSy/urKvOQS8WQqK2TfsiFYtudXzPU9slyvO0cOFCXSW3YvC4HBpLcTGh8XT7I86vMWxv2odxPE6JRbc6vuct/a0G+FP79NJVcisGj8vNmzdPLqb+7RNlKQgnoW3EXm3Q6S56093qsG6aNWkUR2Vlpa6SGzF4XO6sQQPlQsISEE7fPWBOFsIBc7ScFotudez1flK6tUYPJtSSezF4XAxzjxITrAsJc5KcZm/aF42dSGPRrY6G8pw+1ho952Y5v2wIOYfB42LFxcVyEWEDu/eWOT8+5W8/O0PCwem3cBA8291Utzo8Ob67PGcI7P379+squQ2Dx8VmzZolF1Fmx2aOb2ODJSUQCjic3qnCZq/vY7JbHetQY78xPG8rV67UVXIbBo+Lndn/VLmAcvs1d2yMjS2cTfsihTspfA+T3eq4u8J61HjeLr/sMl0lt2HwuBTeJmBJT1xAT17dT1edg0ZfhAIagaMFd1L4HjhMdavjLd6SC9rL84b5bRgHRe7D4HEprC2DiwftO1hzxklo7K2Z1uDwSoZHemvOOfJ9THarly+9QZ43PH9r167VVXITBo9LYbIjLhxMftz/5iu66ozgHienZ7ofCWtD43uZ7FZHe9jIDGuNnilTnB90SY3H4HGpU0+xlvS8fUCq49vYmBxjYy+parJbHc8Xtv/B89emdbqukpsweFwIW7XgosGBLVycZnJUcay61V+fP7pmjZ5Nm6L7dpLCx+BxoaKiIrlgUpOaODqHCmLR4BuL2erotRvYwZpci2EJ5C4MHheaeuMNcsGM6JLkeOOv3cWNwYPRgrscvMVC+47duBzt73kkTBqdNaiFPI9dT+yiq+QWDB4X6n5iZ7lg7jyrtePtIvagvo+euFNXnIE7KYQavr791ir4QOjgjsdUOw+snzZInkcc2IWV3IPB4zJVVVU1F8u66SN11Tl2KDjRU4YZ7Ufe1dgHZr2/+8BYecsT7j7sTsHPxjV63InB4zIY5o8LpU1yU8e3sUFQ2KEQSU8ZdqPYs+lZtePRqer1qd2OChvc1eBOCqFm8s6mLt/t2qZuONVao2fQwAG6Sm7A4HGZqydNkAsF7Tvff/y2rjqjZtO+X2brSsMQVvg8e9+t4MMNdzUNWTWxmzyfOLhGj3sweFzmhI7WcP9fDG2rK87ZvuACCYzd65boytG8dlfTECz90SnNmnpSWFioqxRrDB4XqaioqPnt/Me5l+uqMzDJdPPkdhIeRy4Y7/W7mvpg7BAWycdzeu655+gqxRqDx0VWrFghF0jHlKaOD+6zN+3bOq13g3c1b9x+mqfuauqDn/83F7WT5zU5kCSLq1HsMXhc5MrLLpELBHuBO72NzYeFt0mo2GssBx+ood0Hb8Gc/r5ugAGMaKzHc8s1etyBweMix/4kXS6Oe847Xlecgzud4LDBXQ3aP7DustNzwdwGd3djulpr9EyaNElXKZYYPC6BAW64MHBs/o9rddUZuIuJ97ua+uCtZX6WtdNoSkoL2YueYovB4xIFBQVyYXRpmeD4Gsi48LzeVtNYf5t3Uc0aPRs2bNBVihUGj0tccclFclFg2c5orYHsZ58XP6qyTrDW6MnNzdVVihUGj0u0TLUmNC4a3VVXyEkYCjD3rBR5jo8/rqOuUqwweFygrKxMLggcbzxyk66S01699QyV0MR6nktLS3WVYoHB4wLY9RIXQ/fWCWrf1nW6Sk7DpFF7jZ45c+boKsUCg8cFRp+XJRfDuJ4Bx7exoUOwRtBtp1tvaXv37qWrFAsMnhhD125KsjXGZPEVfXWVomXd1V3lucaxc+dOXSXTGDwxhrYGXARoe3j7sbt0laIFI7jxlhbPeX5+vq6SaQyeGPvlvQvlIujdNtHxbWzoaGhDs9foGTLY+YX0KTQMnhgbMcRanvPqvim+H+RnAp7jJ8e0keccB3b0IPMYPDFkte9Yg9qWXT1IVynayh+axDV6YozBE0MlJSVy8qN9p/ype3SVou2LjU9KDyKe++zs0FdjJOcweGJo7uy75eTv3z5RFuOi6MPzjLWGlp6bJs99ciDANXpigMETQ0MGnCYn/5T+LaO+h7lfoU0HS3+gNyt4aZA/X9VatQpYk0bXrFmjP5pMYfDESHV1tQo0s7ZeeWLqMF0lJ2A2Pmb4oy0He7YHr0OE5V+xPAgmjU4ef4U8/1yjxzwGT4xgaQac9Njfu+KFR3SVIoVJoNgOyF7QPvhA+GCZVywIFrzoGe508Bq0bduWa/QYxuCJkTvzbpOTHu07Tm9j4wf2NsnYnRQ7XxwZNrJu9JN3y2Lvdb2NxV1ncrK1EDwa+skcBk+MDOh9spzwtwxqoyvUENytYADgzmW31LpIPXbJqFyTH1aQo1cLr0NeXp6ukAkMnhhAL0pCU2scybM/H6OrVJt/7dst3d/YYufIhertrXfwOD4uEhjHg9chIyNDV8gEBk8MFBcXy8mOpTgr1/9WV8mGOxbcudS2zxfudHDH8/ctLziySD1GLicmWo38WBeJzGDwxMDPbr5RTvTMjs3UP/d8oqv+hTYYtMWgTQZtM0eGDdpw0JaDNp1oDDsYMmSIvB7z5s3TFYo2Bk8M9Ol2gpzot599nK74D+5W7E0Fj+zyxoHeKfRSmdi91F6IrV+/frpC0cbgMWz//v1ykuN4cfY4XfUH3N1h/AzG0djbKdsHwgfjbjD+BuNwTMK6PPZrUllZqasUTQwew+yxI6lJTWRb4XiHKQpYcvTNu4YeFjQ4MJIYI4oxsjjWM/P79Okjrwvufij6GDyG5eZMlBN8aKdmcbmNDQIE6wodOUXBPsruPEuCyG1z07AGM16XESNG6ApFE4PHsG6dO8gJPj3rBF3xvlCnKLi5IX3r1q3yuqCHi2v0RB+Dx6Cqqio5uXFseGCqrnoTGn2xHTIagWtrr7GnKHhp8fpOnTrJa7Ny5UpdoWhh8Bj0+6efkhO7TXJTT25jg+7sj59ZUOsUBbytwnIT9U1RcLtp06bJ68M1eqKPwWPQ9VddLif2iIyAI4Pfoq2hKQpvzTkn7CkKbmZP3E1NTZV5XBQ9DB6DMjq2lRN7zkWn6Ir72FMU3ssfX+cUhapXHo94ioKbYYY6Qgev0dq1a3WVooHBY0hFRYWc0Dj+9PDtuuoOP1S+V+8UBbTXODVFwe2wNg9eoylTpugKRQODx5DHf2tNRuyY0lR9/d4mXY2NWE9RcLOioiJ5nbBGD0UPg8eQCZeMkhP6om7NYzJYLniKwpYpGUeFjT1F4R+7d+jP8CesHGCv0bNpU2x/QcQzBo8hndqly8l872Xm5gPJFIX1y+udooD2HNNTFNxu1Cjrl8T06dN1hZzG4DGgvLxcTmQcpYW/0NXo+G7XtjqnKLx+cw/XTFFwM3uNnm7duukKOY3BY8CvH3lITuQuLRMcnypgT1HY9dgdnpqi4GaYKGr/osAvDXIeg8eAy84fKifxZaekOdJYi7dGaK95/+Frap+isHCMTFEwsaREvLLX6Fm4cKGukJMYPAa0a5UiJ/GDk4foSvgamqLwwZLrPTdFwc0QOHjNMjMzdYWcxOCJsuD2nTd/f7+uhsaeorBt+pmHBQ2O4CkKbK9xHtfoiS4GT5T95y+t35xo32moq9qeooAG4LqmKHy6+n5uh2MIGpfx2hUUFOgKOYXBE2UXnD1ATt6rTmutK4fDmjz1TVFAV3i8TlFwu1mzZslrxzV6nMfgibKWLQJy8v76hkMnL6coeAMGEOK1w4BCDCwk5zB4ogjbpeDExbHtkakyRaG2JSXsKQqYSuG3KQpu16GDtXAb1+hxFoMniu656+dy0nZvnXBU2KB3Cnc9fp+i4HaYLIrXEJNHyTkMnijKGthXTtrJvZKlvYZTFLzH3nyRa/Q4i8ETJVjbpUVykpy0q5beyy5vj0LY2Gv0YKEwcgaDJ0pKS0vlZMXi4WyY9LaxY8fKa5mbm6sr1FgMnihZtGiRnKwc+ep9aFjGa4nF4MkZDJ4oGT58uJysGAtC3obdX3HnitcTd7LUeAyeKEC7gL2YVElJia6Sl2EQIV5PbPxHjcfgiQKEDU5ShA97QuLDkiVL5DXt2bOnrlBjMHiiYN68eXKS4u0WxYfgNXowgZQah8ETBfZaLgggih8DBljz7vLz83WFIsXgcRi6zu2GSC4WHl/sNXrwi4Uah8HjsOCRrhhESPEjeO7d3r17dZUiweBxmL2UAnYqoPhjr9GDBeEpcgweh2HAIE5MDCCk+JOXlyev7+jRo3WFIsHgcRAHmsU/rtHjDAaPg9asWSMnZXp6Ott34hReV2xvjNcZrzdFhsHjIPs2PDs7W1coHuXk5MjrzDV6IsfgcVC/fv3khFy8eLGuUDyy72xx58M728gweByC7lWcjDjQ7UrxK3guHtfoiQyDxyFFRUU1vwUp/uHtNF5vvL2m8DF4HIJFonAijh8/Xlconq1YsUJe74yMDF2hcDB4HIJZyzgRufmbP+CttT10gm+tw8fgcUBVVZWcgDiwZTH5AycDR47B4wB7aUzswUT+gd5LvO7ozaTwMHgcYI/rwJ/kH1iXB687joqKCl2lUDB4HIAGRpx8aHAkf+HYrcgweBoJv+n4W8+/sAYzXnuuNhkeBk8jsVvV37Zu3SqvP3q4uEZP6Bg8jYRxOzjx2L7jX9hvC+cAOhkoNAyeRkJPFk46jFwmf5o2bZqcA5wcHDoGTyNgzA5OOBwYy0P+hPlaOAew3C23MwoNg6cRMEoZJxz3WvI3zFDHGkw4F7hGT2gYPI1gt+9wM3/C2jw4F6ZMmaIrVB8GTyPYv+VWrVqlK+RXXJ0gPAyeCAVvdYK1lk078OU76vmHV6l39L/JUv3Ra2pN4b1q5syZ6t7CNeq1Hd+qA/qxaML6y/YaPdxPrWEMngjFap5O9UclqvDWTJUmoZenNuo67VOb77Ofl+AjoLpOeEZ9YCB9sKURvuf06dN1herC4IlQLBaCqiwpUs+uX6/WzBmsLyoGj+3Dx7NUINBODbu1UK05+Bytf/o+NbprQD9Px6jOeRsPRlN0Ya8tfC/svUX1Y/BEAL0Y6DrFSRaTXowPC9VgBs8hBzar2Z2zVMG7R3RlH/hSvZzXWYfPYFX4oa5HSfDyKNu3b9dVqg2DJwLYMwsnF4bJx2RvJQbP4bbcp/LW1nE/s+95NU6HwcGbnqiz1+jBPutUNwZPBLBLKE4u7BoaEwyew/ywa4f6tM42nA9V4WA8VwE141VdiiIETkzPDY9g8ETAbkTEPukxweAJgx08k9Xab3QpioLX6KmsrNRVOhKDJ0zB7TtoYI7JVAkGT+i+WasmH3yu2s3ebKRbHdC4jPOD62/XjcETppKSEjmpmjRpIn8ihLDmrtE5OgyekO1bO1kFAgfvdqLdpRXEXqNnxIgRukJHYvCECSGDkwrzs+zfbPa/je02wOAJzYEtan7nzipvo8HUOejll1+WcyIhISE2nQ8ewOAJE1aaw0mFAMLbLiwEZk+dQC8XGp6jjsETggNqy/yuKqvwA2NvsXDXi4Gl9lIpOLhGT+0YPGEI3roWb7lsaES0AwkHJo1GdU9tBk+D9m3MU5kGBg2C/QsoOHCaN28uf2LyKB2NwRMGe90VhM+RbTo4+ey3YTjGjh0bvfBh8NRr38YZatgMM6GDwAl+y427X9z1vvDCC/JvrtFTOwZPGNB9jpMJ3el1sedw4Yha+DB46rRvW76aMONl9WWU31/hdbW3rbYDBr947AnDCBu79xO/sOhwDJ4wYFAYTqSG2nGCwwc9HI5j8NSqodCpfve/1HoHNnpFg7E9lgsHlj6tbViFvV4T1+g5GoMnRDjZ7L2yMWWiIcFvuxxvYPygQJ0pX9vMoDj3O6C+fHmG6tpugJrws5myJMaRxzXnH6/S2s1Wmxt5J4T2vD59+sjrivOhvr3U7B1msRg8HY7BE6Li4mI5iXD7HOrbJ/s3HtqEHNlz651VaubNl6r+7Q7Nug60G6aumblEvfqF/hjfOaA+eOZK1Vk/H/UdPfLf0p8TGWxlYzcg4zwI7mCoTbi/rPyEwRMirLGCE6i+9p0j4cSzfzs60rvxWZlajyUfjjr+onb49s7nM1VW63Ny9FH2mf6UCGAVArvNBnuoYaH/UGAQIT4nKm+5PYzBE6JIt6q1e8Jw4DcmeQ/uVuxhFGjnC2eazJIlS+TzuCHA4Rg8IUBPhR0ekYxOthcNw5IJ5C1o07HfXmGsVrgjkfH59rmDCaRkYfCEALfZOHEwRiMSOOHs35hcGN470CVu3+migTjSCcEDBgyQr2FkVLtHMHhC4MROkfYYIAw244Ayb7B7JtG205h5ePYaPbzjPYTBEwK8P8eJ05hlDvB2zb5lD7ediMxD47F9l4p2msbAMqj4Ojj27t2rq/7G4GlA8Dq6ofZk1MXeeRS9IuRu9tw7NCY7MfrcnlaBBeGJwdMge6M23K00Fhom7S7ZhsaAUOzYay7hjqexv2xs2I0EX3P06NG64m8MngbY83EwGNAJ9la3OTk5ukJuY0+HcPI1wiZ/dpiF2zMWjxg8DXB6GcvgEdBsZHaf4B1inVzYDW/XsL0xvi57Nhk89cI0B/skdGTKw0E4Ae23W9zq1n3sHsxoLFuKyaL42lyjh8FTL0wAxInidGOw3XDJcR3uY9/h1jf5M1L2eDDc+TjRYO1lDJ564D0+ThSn22Ps8SFsaHSX4K1potHtjbfWdhe939foYfDUA3c6OEkwYhl/d+po3769nIBOf10ejTuOO+44WbIUR22PO3HYs9VN7rnvRgyeOgS37/Dg4fTh9zV6GDx1wEhjjOfgwSNah597NRk8RGQcg4eIjGPwEJFxDB4iMo7BQ0TGMXiIyDgGDxEZx+AhIuMYPERkHIOHiIxj8BCRcQweIjKOwUNExjF4iMg4Bg8RGcfgISLjGDxEZByDh4iMY/AQkXEMHiIyjsFDRMYxeIjIOAYPERnH4CEi4xg8RGQcg4eIjGPwEJFxDB4iMo7BQ0TGMXiIyDgGDxEZx+AhIuMYPERkHIOHiIxj8BCRcQweIjKOwUNExjF4iMg4Bg8RGcfgISLjGDxEZByDh4iMY/AQkXEMHiIyjsFDRMYxeIjIOAYPERnH4CEi4xg8RGQcg4eIjGPwEJFxDB4iMo7BQ0TGMXiIyDgGDxEZx+AhIuMYPERkHIOHiAxT6v8BJWbFS2Nfc90AAAAASUVORK5CYII= | As shown in the figure, using a triangular ruler to measure the degree of ∠3, what is the angle in degrees? | A. 30; B. 50; C. 60; D. No correct answer | A |
253 | 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 | In the figure, there is an isosceles triangle. Then ∠1 ( ) ∠2. | A. >; B. =; C. <; D. No correct answer | B |
254 | 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 | In an isosceles triangle (as shown in the figure), ∠1 = ∠2. What is the measure of ∠1 in degrees? | A. 150°; B. 70°; C. 75°; D. No correct answer | C |
255 | 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 | In an isosceles triangle (as shown in the figure), if the vertex angle ∠3 is measured using a triangular ruler, then ∠1 is equal to ( ) degrees. | A. 150°; B. 70°; C. 75°; D. No correct answer | C |
256 | 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 | As shown in the figure, the protractor measures the degree of angle ∠B as ()°? | A. 80°; B. 60°; C. 85°; D. 70°; E. No correct answer | A |
257 | 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 | As shown in the figure, in triangle ABC, ∠A + ∠C = | A. 150°; B. 100°; C. 130°; D. No correct answer | B |
258 | 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 | As shown in the figure, in triangle ABC, it is known that ∠A + ∠C = 100°. If angle B is cut off along the line in the figure, then ∠1 + ∠2 equals ( ) | A. 80°; B. 100°; C. 260°; D. 270°; E. No correct answer | C |
259 | 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 | As shown in the figure, in triangle ABC, if angle ∠B is cut off along the line in the figure, then ∠1 + ∠2 = ( ). | A. 80°; B. 100°; C. 260°; D. 270°; E. No correct answer | C |
260 | 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 | As shown in the figure, the measure of angle ∠1 using a triangular ruler is ( ). | A. 90°; B. 60°; C. 45°; D. 30°; E. No correct answer | B |
261 | 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 | The triangle in the figure is a () triangle, and ∠1 () ∠2. | A. Right, >; B. Isosceles, =; C. Obtuse, <; D. No correct answer | B |
262 | 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 | Given that the triangle in the diagram is an isosceles triangle and ∠1 = ∠2, find the length of the third side of this triangle ( ). | A. 3cm; B. 6cm; C. 12cm; D. 8cm; E. No correct answer | B |
263 | 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 | As shown in the figure, use a triangular ruler to measure the angles inside the triangle in the diagram. Find the length of the third side of this triangle ( ). | A. 3cm; B. 6cm; C. 12cm; D. 8cm; E. No correct answer | B |
264 | 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 | The figure below shows a rectangular piece of paper. Using a protractor, the measure of ∠1 is ( ). | A. 50°; B. 60°; C. 65°; D. 70°; E. No correct answer | A |
265 | 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 | The figure below shows a rectangular piece of paper. After folding the left side, ∠2 ( ) ∠3. | A. >; B. =; C. <; D. No correct answer | B |
266 | 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 | The figure below shows a rectangular piece of paper. Using a protractor, it is measured that ∠1 = 50°. After folding the left side, ∠2 = ∠3. The measure of ∠2 is ( ). | A. 50°; B. 60°; C. 65°; D. 70°; E. No correct answer | C |
267 | iVBORw0KGgoAAAANSUhEUgAAAS0AAACgCAYAAABZujpcAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAEk8SURBVHhe7d0L2HXlmAdwh+GjxIgwkcYYooSUohLFVc0w1NS4CMPlykylXB2EciaHlCgmVIZxZpRDjiHjVCJGzgYZjUOZcT7nsOb7Pd97f55vfeu4937f793v+/yva137ffdee61nPc99/+//fT/PWvsaVUFBQcEcoZBWQUHBXKGQVkFBwVyhkFZBQcFcoZBWQUHBXKGQ1grBs5/97Op//ud/Fv4rKFi5KKS1AvC85z2vusY1rlHd4ha3qD7wgQ8svFtQsDJRSGvOgaT+7M/+LJGWzd9IrKBgpaKQ1hxDOkhdIav999+/ut/97reevA4++ODq5z//+cKeBQUrB4W05hS/+93vqnvc4x6JoP7yL/+y+t///d/03pOe9KT1xHWHO9yh+sIXvrDwjYKClYFCWnOKI488MhHT9a53verTn/70wrvr8La3va26wQ1ukD73+u///u8LnxQUzD8Kac0hXvva165XU2efffbCuxviK1/5SnWnO91p/X6Pf/zjkxIrKJh3FNKaM0j3QkU96lGPWni3GWpaD3nIQ9YT133uc5/q+9///sKnBQXziUJacwQk9Nd//deJgO5617tWv/71rxc+6cYpp5yyfobxVre6VXXxxRcvfFJQMH8opDVHOOCAAxLx/Pmf/3n1rW99a+HdYfjwhz+8fqYRgb3kJS9Z+KSgYL5QSGtOEAtIbe9973sX3h0HqWHMONqkl2VZRMG8oZDWHCBfQPr0pz994d3JoBgfM482aebXv/71hU8LCpY/Cmktc9QXkM5qBtAMZBT0pZuTqreCgqVGIa1ljPoC0h//+McLn8wG//mf/7m+sG+bVsUVFCwFCmktY+QLSBHMYgARPuABD1hPXNTcrMmxoGCWKKS1TJEvIH3Vq1618O7igcqKuhlVt1gkWVAwLQppLUPkC0gPPfTQhXdngz/+8Y9p+/3vf582KWi8qmtZx0XZbbnlltVrXvOahW8VFCwfFNJaZsgXkO6yyy6DF5D+5je/qX72s59VV155ZZoN/OIXv1h9/OMfrz74wQ9Wb3rTm6p3vetdiYTOP//86q1vfWv6/33ve1/1zne+M23e93rWWWdVBx54YLXTTjtV22+/ffXQhz60ev/735+OhUwd29KJn/70p+mcCLCgYClRSGuZIRaQ3vSmN91oASmC+NWvfpWI6fOf/3z17ne/O5GSVBKpIKXPfOYziZS+9KUvpaUS3/3ud6vXve511Q9/+MN0IzVi++pXv1p985vfTK+XXHJJ9dnPfrb6r//6rzRTiZiuuuqqtIZr6623TksiPOYG8X35y19Ox7jooouqf/3Xf60+9KEPpXN7RYDOidAQbSGzgsVCIa1lhFhAqrZE3SAoJPCpT32q+sQnPlFdcMEFiZA+8pGPVG94wxuqz33uc6n2hCyQklXv3/ve99IrYnPTNJJCbr/4xS/S0x4c0/v//d//XX3ta19LpIXoQkE55i9/+cvq9a9/fboZe8cdd0w3Xu++++7p/NpxxRVXVP/xH/9Rfec730mE5ztIFIF99KMfTQSHyOyj7fZz3oKCWaCQ1jIBxXTDG96w+ou/+IvqxBNPrN785jenewTdbiPV87lZPSTj9R3veEf1f//3fyml+8EPflB94xvfSOTx7W9/O+0b/3vO1oUXXpjIi+JCXkEkSOuTn/xkdemllyalheg+9rGPpRQ19vV60EEHVTvssEO18847V0984hPTsS+77LL1ykpqqU0I1XeRlf/VyOx36qmnJjJ7y1vekr5DQf72t79duPKCgnEopLWJgVQQhxrSPe95z5SKScOoGnWjt7/97dVPfvKTRAjISRqIrILEkIr/1aikgtI++yAHrxSVdM4xECFSocTsS3HlpOX4VJx9qCWKS7pIzT3oQQ9Ks4rSRU+OuPzyyxNxasOrX/3qRIrUofM4HzI777zz0jGllNromlzbueeem1Sf9BUBUokFBUNRSGuJ8Yc//CE5NlJBSBx63333TWSw1157JfVDoVA90jZ1J8pEzQghUVb+R0gIz//I7d/+7d+qH/3oRyl9QwyOYx9kRO34DFk4NzJBWhQcgnEe+1BfjmcfqkhKZz/EZb+jjjoqPdL57ne/e7XffvslBYXgECpSogK1ERk5L4WHNP2NGF2Ta9NuhKeN2iR9dV7tQYIFBV0opLVEoFqQg/TrxS9+caoLqRtZH3W7292uute97pVqQsiFYuG8iCPSLIRCGSEipEQtIa+oZ1E71I3ZP2khwnjjG9+YivMUFmJ52ctetr5wj1iQxUtf+tLqla98ZVJqzkO5Se+8h1ARq6K7Y1BK2rznnntW22yzTapz+Z7zqYkhNrUt5KVdSEo7ENub3/TmDZSjdJE6cy7kqH0I77TTTktqTwqrzwoK6iiktYi4+uqrk9KgbBCC4jR1Qblw6NNPP726zW1uU93lLndJRe8gJ06PiDg2h5dKWV6AIBATcqBMkA+l4n2v0jjpHmXjOJzfOX0XAcTarBzIob6QNPZDJr6rZuVYVJd0zvXsvffe6Rn01OE///M/J5KjBik9kwEIUd0KGTm3azIrqU6n7hYpKtJyTZSYNiM75IxUXaMNwc/qnsuC+UchrUUAtYQ8ON573vOe9alSqCiv1Mttb3vbVMtS3DYLJxW0UWTIwXscmONSSK94xSvSe4gBoSGGIKMmIEbf70ITadVB3SGOHMhUbeu6171udbOb3SzVvJCufWMCASEhPERkk/45lzYhb9cirdRPjidlpL4cxyuipCaRJPL1LHwqrWB1o5DWDEExICWqAsFYrxQO6FWqx/msh7r3ve+dCMu9fklNvWXdcgTpE+dUo5KO2Z/DIw3KLdY/ISrE2AXnR5BdQDBUThekfG21Jk9FvfnNb17d+c53TjOM8VRUbdVm33XtrsU1IUlpJ7JV7KfkkLLUEUkhMYTs1bV7H/GbyaRGHR9ZK/AXrE4U0poSCuvICtlI0RAAJaHGo9ZDMUkH1aFsPj/kkEPS+qfddtstkRxH9CrtoyqQ0Zlnntm5Gh55cfqhK+bb4NyIZBpQgXvssUe6/ccaM7WzOhA3Inc+tTrK06trpsCoS5s+MykQfeY9fanf1Lz0rfZKmZGXlNMYFKweFNKaEBwFIaknqdtIxSgCJBJKwgJQ6knxWn1HkVvh20yhmtDJJ5+cHI/SQHw5ASExs2xdcL5pZ9ukmpThNHDtCNRkgsWxtvpTUdWvqK2Aa1XbitTPpIFlFOpi1FfU8fSZV/U7r/raq2untnyuD323rMJfHSikNQGQldrNC17wgkQsiIsDqeFI/cwQqtlQBF4pCU6lWC0llEr5UVUFa2lUE5CYek4XKI9p0ySE00eOfYg0EGnUn4oa1+D6qaImIHR9gbD0KaWJSPVzKFQKTL1P6uyYUfBHXl59T3qpTwpWNgppjQDHE9Xf/751KR0njAI756EsKCTFYg4YdRo1KWuarG9yP9+DH/zg3nrUEJhhpFYCFMiQlebqYepGyBbJxgJQZDsJXF9OfFRR/amoQ1SQPkVIyMrfivlIX4CQXuprfRqFe+3X19JT16D93lPQr08cFKwcFNIaACmY1IbzqMNweqTEcbyPPKQ4HNer/5GX/dW5zJJZlHnta187PcHBfhxw2loMR0Y+2heKz/m83wV1IftJ0ay/ktpxfikZEhsCCs01mA3UH46VE5f3xzwV1TEQf760QTCgsNQLEVKQk0AgYFC29tGOIDHKVVqu7wWYMtu48lBIqwNIhbNIRdRe1GWoCkVi66+8L40LZ0JU3rd4VGpoP84YKRP14T3wXUshxoBaQYrSJLCcQNFa2xzPuakUSqQLHF1tyFopBX9O7ticfkib7OuapYTOFQrU93Plh0yHPBXV8fSLa2gCInMuRGS2ErFGPU87zDQiMuoqlon4GzEbP98bovQK5gOFtFqgNqKAzgkQhQguhUJCcYsLZSKSc1ZE4n1ObBW6hZIgVQqn9XfA52PTMeeOledBMuCcHJTjIyTt6kOkstJUSkZdKCYUhkDbTSqYREAo+iuUZx1DnoqKfLShDa5X6ohg7avNAoixcc3+jydZIDn9ob+kpgKIgn1OqAXzixVDWh5JzDnathe96EULe24MZBT7nXTSSUkZPe1pT6uOOOKI9LiY448/PikQThKF4EgDqaqnPOUp6TvPfOYzq2c961lpO+6446pjjjkmLb7krD6vg6OZZQSqDvFRc13gkJSV/YM8Fa1t1AflJV3qA+KwnAAoFqrNhMEQSM2QAiLXD8hOSup9/dME5OEZYfqC4nTbUdTfnB/59QFZBalSts6LPPUj4pIuCgbqYdSWDcE7fuyLqNsmPwrmA3NJWqbT61v8zFbbxlGavmdTe0Eut771rdMCSbfVWK1uu+Md75heH/awh1WPf/zj0+sTnvCE6pGPfGT12Mc+trrvfe9b3eQmN6muc53rrD+X9Up32O4O1Y1udKMN2pBv17zmNdOizEiXFJwRT6ShTd+xXf/610/tQ1aRAiFdBMBhEYNH3DR919YG7bE1fceWg+qxbgpp6jt95pYeM6Me19z2PWRvRtH7xsN3fH+rrbZK46fml38332584xunezTXrFmz/j197no9YdVTXuN4NorO/ttuu211+9vfvvqrv/qr9KrvrJHzeQSUsrVvyxFzR1rqMLZ8TRNQRE2EFBvCaYOV1g9/+MPTPXRI6dhjj60e8YhHJHX06Ec/uvqnf/qn9aSCGNyCowCulkOhNJ3PhrzqRiBNuta1rpUclAPFc9ipHrUZNTKqINKppu8ju1ApFI5Zw0DTd/ItIHWSTgU222yzTiduArWH6JCHNrmdJyfvpu8ZN33jM9/xjK7tttsuBQakE7OOTZt+a3pfuz2HDBkhUEtKHA9pBXkJSM5j9hZ5IToBqet8ZSukNRNEZ4ras4DCNQKSnqgXKWZLIaRt0g6phFfKRkqj4OtJCvbrg5RUW6mIIFnFZoVhQDaOpw3Sz6hRNdWF+kD99M0aBlyLc0gj1aOc2zV7r+/GZClxTnaT4pxzzkmkQRV5jpj0XjonOEwK4+e4rsstQ8bQuMYY6m/XKfA4j/6W3vpewYYopDVDzIq0OKfCtSI2g/a/NMs6IEbPqNV4FKo5k6Kz/ymcmF7vA6KKtBWBIRa1F+oqlBLyC5KiIB1XTWYIkF3MUKrdmMFrm4HL4XqklZxYgdoEgbZKTbv6NfooamFe1Zl++KN1D/FTZ4rr6oJ9XKeNIqKOKKXnP//5ExMI1Wd9lmO7Lv3idiJqWH+qF3pP3UtKbsx9Rz9YvoK8/V+wDoW0ZohZkBZiuuxzlyWHpRysBZL6cTpGzPAZNXIygygaS91ycFhO0AdT9Nqbqy3Fcs4UUCCmfkDbhiCWACANhEVZgFQ3jtUGSglR+q77AV0jQpXq9i15QOJm4aSxCN8rUjDLaubOwts+6Af9Dup3fv1HzYnykpbr97Fwfv2aI5ahSLddM9UV5Oz8+k8gsh8VrU43yblXIgppzRDTkpYFkIzYbFYoDSRl5k1hm+HbHN9tNyI0h66D6ghnCNjvxz/68QYRW1S3KlybYwaT2uJMAelL0zm6YKYOUdmQJ6cDBMIJ+8A5kY5bZCgNr0gnJgbaQGnFExioUSTg++4dBOcfmqYGzDgefvjhqWiuZueHNKjBodBmRNTUh8bCGFKT0kLLH1yr8dVuNmAcqVXKTx/ki2RXKwppzRDTkBZHkDIgGqkYp7NQEYFxPg7JmRGBqNynWKQy+Vor0Z5Si3QzYCmFNofa4lyx1CGHdlF9oUK64PtSQQ6GQJAgstXunEjbQOnFuiWOS3Vw6j64XtcmhUYGzkm1UWng1TXWEekbVdgEfaLfojDutWu9mePF0gVt71uDpU+QkiBlbZ1x8n1jbxkF4tefPrOMZQxprkSEny1HrBrS4kyxzodjM3qvnF70lRpwZEYdqU44RRe0w5onJIIIfUeqmdeWKIEtttgitbv+E/e+J9WjTqRe2uLcfYSJaLSfWkAc/vfdPO1cDESfaC+iRF6Uo3oawo36XBNcn7YCtaP9dSALSivG2Y3leQAA16iPfF9NcIiyi6Dk/BS0YxgnY8cmfObaKDb/uzaEtloR/b8cseJJi/Ofd+55KRIjLjUUDsMgEYb77qSHnIADRnpERSCELkgpzP5RD4wdacVqbw6VO5unk2q32bJ4n7P5fqSmSIfikC4hgD64Nmni2NRyMYD8kW+dYALeR2xBeq6XsgIqx3hE3ZDa9VTUGGv3baqdgZqfG6mNjfccd0h/6WMTF0DJSo2NGTKLSQltoL6tzPe5Vf7WovlstSH6fjliRZMWR0IkNoSEnNReGL5ZJIbO8M3mcZxcWSECxttECI4bThIGjaT8zZmka1KW/LvIMNZt1dUWZ9cOSy+QpRRl6Or0eYHUE2kFEARSoJSoHGk6tZvDJEasV7No1eRHpPQIXxBCLlSt1E/fNYGqrt9pwBaiFqgGSIEJGpE6IkM2Ykwo9PpEzEpH+NlyxNyRFoe39c3yxMyRfZEJw2b0yEPhlVGqsUhnxqZUnMt6oCh4O5ZzcSZGbwauKTo3qS1AdJwKaSI/baJEpgXH1B7tdHztQxIcH1FyWtdCHXJ478daNef3Hd91DMeaBlRt1LocyzUj9XiMDFJA9HUIOLFsBIG5wZs6RST6iVoCf4eSGgrnd73aYjMmjieoSR1tv/7Vr5MNIVzBarWgkNYSg/xXcBc9/S0NkcoxdPcPUjVqV4rKkXYMRagnDh01DzUdSweiptUG5wrlkKstDhGRnOMMKaQHtEea6NiUi5qQ2hFl6fpcM8WAnHwmTUZelI9zSpvs4xqkmq7LPvbltI5DzSAKqoMaoQIRM0Lrq701wfU5DyAb59UHxqYJ2nuf+9wnrb63Kt4tVMYV6bpWQUeaPymQpj4yARMqmlpGrlQXEtN/0tLVQlyFtJYQ0ka32SAPDsmRFVZFdO9JI9RAFGM54zTwfaoE0VAjAYqCAzapwcc85jHJGHK1Rf0h1SGQ6jiX60QgyMRGIVhvJW1CJLmS64JjRB2uD45JMWmvtAppI0bn16fa5DNtHArqSLsRZBOQsn0EIbdihTO5h5E6NMbSRO2aBlJU1/SZSz+TbIStqHOyHQrUWBtXwQmJrnQU0loiiLyK4l5Fbs6DrBCLaCyF85noDvbNZ/nGAtE0qSJEINVRK6sTV662OMUQcEhpjGMiCKkddUABBNkhsrblBF2wripWuI+Bc8W1B2nrZ+qWavE5EptEidWhfUGsliO4R9H9hta/SeumhT7VD4CITdQgQoqT3UjZ2ZJzUaD297qSUUhrCUBRSc/iKZzISXQUMRmgdIhBUgQ5fMZIczBQDperpz5wToZPGSBCZCJCS6nqCLVFLbQB2UnDKBlLMJCWFC7S0zq0Wao0tvYU0/5j4ByIuQ3aqK3GRNuRmD7uq0M2gXJDGnHd1I5V/34YRKroBm3r4CaFPo4gFkC43kNabCYIi7LTHimjtJmNrFQU0lpkqImQ9pxP9EdcUfNQm5AySQebCrVIjVPkkl+9hqOZaeR4Q8CA1UIoDQbtvMAB6qkatRWPWJGWBDikNnoP8YnyUbweArW7sTUXpDVWaWl/PhPYB4SuHylFytc1Dl1GgPQoOEBczk2hGuuDDjooPa1hyy23bH0qah0CUYyHMdNnSKkOAUcqyHYEP4TFpoyNMdEuNrdSa1yFtGYIhmYLw6OgPM2SEyAKBVMRHeEwMiRirU3XbBzDRDTSMAaMMBSKHdNxhhTGpWxqIZQRR0B6IrL3m3D00Ucno/BoFoavnZyag4rqlNVYuIZw8KFAqm31pDZwaOcaA4RDbfmea6NAOX6f0wsqoF/VKn0/apRI/alPfWp6/Iy+VCfsUo2CkdofFcVGtKFL/bEztiX4mbQwngiYjRkr5KUEEJMKKwmFtGaI6EwGhbAYnvpC1B3MhEnTGBQDRWRdj/ENJKN867lpVtFx3avGQDkL5+iD9igoIzrfkR52FYeRqLVH6jOm8fNUtG36vw/aMJa0nEdaOQbIB3GNhXFRhwuYfRQg9Jc+b1I8Af1lPF0f1WacQXpvCUv+VNR8ZjaHa6UqBTPt6DpfQLuQHPuKsRWQBE1Biu2plVKAKwmFtGaI6EzRT0FUKijyinYiIcPihD7jEAhhiEFJLUR1ZEXpqHVQWQzTMYfAjKE2dKWUyEzE5wiHHnpour3nbne728KnfwLyHFsDUkcaq5omIS1KgzodA0RB8TZBcKA0pWGIt41MqDWBQD8jDgTkO+B78VRUmwc4hhpnH0jPceMmd2keldRUMsjhe4r/+onKUxMVEF2LYIjUBCv11JyQ5x3Rj8sRc0laahjWzDAUhokoGJ9UgzFxXk4fNSE1kDa1JX2LmSDHsh+njAJ6FICnBYeJtAppOZc0KWYSKYYcSHNsgZzzq7OMAfXjeofCdXDSSNuGAin1qbPoEwHH2LX1vfcRl3bn+xhrT0W1nku/7rXXXqlWqa3GM5ZWCHTGgKIN0msCVYfkfF9NS6rIxhxHkHM9yE+fXPD+C9I6rzbCnTcU0pohPP/c43SRjagnTWDsFBEnZ1TU1VVX/unXjEVWxfomiKAUVdQlGJ0UIK8pMdppjFG05jQcJZYoBOLRwxZP5hC11W3GwLGR1pgZxDHrtEBfmtQYC4Fl6Foq/a2vjMMk9SKzi/E8eOm34AbGkOqmwEGgQKZtsG/eZgRIdSEshGlmUVulh/4X8BDiSiCuQlozgqjqQXHSAHULjs3oEBZHFaHf/o51P4c1BlIdP1rKGKWC0okAp1HPoNaGzE7lkBJJNWNFfhOQYzz7PJwrQBXErUJDQTmNaSfSUhAfCtekn8fAeIxNQQEhIBZqaGzfI+/dd9+92nzzzdOPgSATYDOOZ0xCTY+BNFQJAaGyFbYRyzkEGe93LQeZFxTSmhHIcVPcCtiUVtSzKBkGo8YhQk8CUbVJcSAdEZbjqYFwpD4wZmTKeCk/KqPrew984AOTgdTVlmsZuxxBH0llhgIxjiEtbRoyMZHDDOXQpSM5pLvSL2kc0pMyU9V90GdUEBWLtDzqJpaggPJBHpjGQjtck3FlF+pa0kiEKKWk9Ca1w+WCQlozgAhHUW2zzTbp0bzvfte6x5yYUVKTUpinMmYBjsFJkBWHiXqTc9i6wIBF8FztIZIudUJthZHkaos6sx5qTLrnWGOWI7jOMcQoHc/XtPVBekXVTALFdgs8A87bNxsc66qkcX7xSP3TUgk1zllC2wQmKguxskV9aYKF/SA0NjuvKKQ1JRAHRcAoEJa7/ikr952pH4hy7k2bFTgHguQwVAgylD4y1LYaC2LRRgtMm9QA8mmrq4EV3oykrraQBCU5FJRdLAcYAtc2Jp1B4GNSNYrjve8Z/zA95G9869DPxgTRNqXc7EGAkBL63ckTTjihevnLX56UNPuRvg1Ra0Pg8dmR+murGqv2sR19OjZVX04opDUl4hEzZL3FhG6DEcWQixkbRVCEgciaVEkUYIcuXQAExcCpJsZuHRXybIJUw75dpKQ21VVYl5qGoeRqCwlJUYeCA0mdh856jllcqh/t31afa4K2T+K4kRa2QZ8bm3qaZ5wFNeu2/GAGUjHZQqF5NcschfhJEWsA2R2iouSoP+PvfW1gq+pqeVo6TyikNQXIbaRh1oqikp5JORAAg2EUsZ5JPcF0dL14jRCQkBRhbK0BMTpPGxCE4w+J3oit6/x77rlnMpQDDjhg4Z11RCHdGVJLC4jwQ9cMjSEtxN3VF3UYsya11IehqT7y0B41JjAG0Yd+nFVarv7m8wgErrftEThDgJAsfQj1i5Bdoz6ksLSJTcTfiFXQnTcU0poQUgQGhpgYHRXllRMjLmuy6gTlfyvb80WDirKIjdIyC9iliHL4DudpUm+/+uW6G6TzpRF90OauGlWutvJJgbincSg4ydDCNyceSkR9tbk6OHJfDbAOfURltfVRE7TLdcRDFq3RCtKjOKVqyEPQGEOiSJDNREAywcHmzKDmQGQmhdgLZUnJCTJht9JZtjxPKKQ1ARgtaW8Jg1kkTqyuJNpLDd3M2mYIDF/Nw+cMCElRYFIJ75P104D0d4y68Q4BAqIc29CktpyHUhwKTjL00SmIZejsIecfui+orY1dOc/JxxB0QIpmltCPvvph3RzUKmLW7/7ug30EOqQjyJ122mmJvIx5W4lBkFT8p/altciNwousQGF+DBFvahTSmgCMhSEgHlGMcuAADEC0J8H7wIBOPfXU5PBmeRgORyLbJ4XivALsmOJ4HZREW/rWprYQtog+BEja9Q4BRx46e2jfoUsF9I81TGPA2Y3RWFBzbofya9UHH3zwTFSNNF77BU6TL667ryaK1CgthCU1doxYliOIGMN5QSGtkUBQHJbBMATynDFIrRSmpYdDIqYoF8Z3xhlnTB3pGB4H51zqa2NVRAD5dM3w+fUZBpOrLWnyUHKhTLuK/jkQ0RD1pPiuH4fW1ozbmNQZjPHYxbRSMk932Gqrrap99tknERb1OFRpgiBGAeekpJbJZlyDICOIah+baoO+sQ/7UNPyN9ulUI2HfhZI5wGFtEaA4ZD6nNqAM34GIyWTFj7lKU/prMFwLqRmf1DfkXJQH/EkBcYlbRyi1gKMOl+0KfqKomMK5DlcX153y6G9YTShthCuCD5kVlAfuNVmCElz8CFkSDmYqR0CfYLUhwQWcE1SqUlm2hD7TW5yk3TTeX4dxnZoPY0qtCA0f9IGckJmyCaIxt99StPYqa0hT2m9MYtlMMZcH05qM0uJQlojIKqZPhYp3RPIoBiTGgMy2mGHHdJ9ZQgjCqQ5GJoo51YL0RIJ1vdTpGVInIRk75rC51AiZNNCwbiFaBK4JtPjbee2XovR+P2/AAIbOolAFeVO2AZ9MWSdFoU7VL1xWMFmKDixwDRWuT7vec9Lj1x2L6q7Feqgkrrqh4Dc1DtjBjqH96xLQ9iuvWsSQoBgCxY9S82pLN+NVfLsWpBSXhjaj5sShbQGAlmpPzFgkVeaI3KJUAbb3xYNesQuA+pa/8MBRPumNIGhWrMDorOZpyYgFJ933bTL4T/+sfHPvgKOndetcoTaMhMWaVb0wRCYUetqd2AoaRmbobfvCDBD629A7bX1QxsEMItH3dZ1/PHHL7y7MbSZMm9SfdI4S2oQDlJWSpCG5wHK/8gnllW0gbKPcXIu42S8oqAvmLpGQdIdC12r+pcDCmkNAIKwgBRJMCLGJDohJsZkVbPIF53ZpHzqoLLyoizDMsPDoRiTaMhhOU0dMVU+pOAuBR3rdOCaKaI2hREzie6hA23iAMi8D9od0/5dGEpa9hmi8ozRmHVJ1KBxHgMK2iyhm+ctIO0DhdPUF0FkUkF3VAiY6ljGZFoYUzaLNKWJAiiyYttIdNa3Fc0ahbQGgFExRq/SJg4i+vnb2hpRC8aQVh1kvpTTMa3bQYZR6M8RKeEQpQL2J/nH3kgM2kA1NIHzu9ZcbTH8ITODai8mMvqgv4es00IsUSfsgrQ7VOwQmFwZczO1sdp1112rbbfdNj3FYeiyE/bTVrszfvrXUgkq3Li7hkmWtAQcU1poDNiG4EtdmR3V30ODyqZCIa0eGFA1KiuNKaOI1hyUAVFEgWlIC5CE1NI6r7ZjUE1jZ3moOkXXsbNfQPW1pQuc0/WG2hLBhyzwlI4MSSWHLnkQOPoK+xzVmAkOQ8Bx2wi7DYcddli6aX6nnXYaVTcDKXPbtapPCmRUtxoXEjMu+YziWFByro8NyxzYMVXHttziw16aamnLAYW0epDXsETeWE6AwBRY8/RpWtIyo8Q4ockJqZhvXT7ZsUVmkbRrWrwJFExbcZZhu95cbSGQIcTAEfucbsiSBwQ4ZFmEVG9oaoXgqLe21LgJygc3u9nNqh133LH1OfB90IdtyyGMA/sDSt+YDJ0BbQObiHsTHd94Gr+ocQ1Rw5sChbQ6ICVUL1GrkbYZ5DAYyqteAK2Tlu8PmSUbAlF4zDKIJlAPXbOCbUCkbSrglre8ZbrmQw89NP0faW0fHDPS6jYMIS1p75BUxm0yQax9aKsltoGD+9UdM4We/z4NpGdNNUgpNXVlOYwywqzsylghWTat+M++kRXFrB8mUeeLjUJaHaBMRB+DafAYjRRDVDrnnHMScZndi4iXkxZnI7+llmPTjDoYkrTATNE0KQEg2rHtoTKRXVORPdTW9a53vTSJQJ0MWWrB+fpSvyHrtNR3+kiLcjIzNkRlSonGLFRVPrDUBWHtu+++U61z0r+UvEK4mmkd7Epdri8VHgLt1G/WZlkHxqaVPag5wZm9s+82lb0pUUirBZxbukY6SxUsbWCg1BPC8gpmdRiaKE5tqO8wOPtHsZzzifSTQESNZQ/OIcpOU4QFx4s0dChMryOaJoTa8nuJwPj76m5UFgfswpBCvP7vKpYjLGpsaAGewlBfGooHPehBaaZwl1122WA2eCwEJiQRi3q1d+jTMPogFc9J0PUpewTZ6x9povYjL8GR2qLuqK2+JRVLjUJaDZA+xZosZKNGg6SoCkqLisrrCaKzWoBNNI+CPbLj6Ixm6BqmHKIhp80VAkNSSxszq9UEqnHsUw4Yc5MCqKstTtGnftRN2kgw4BicpguO0bfMwnH6UlHQ9jFLCp797GenxcRuhh4yAdEGKbUFx3nfIizXNjaVB7apf33XGKuF6kcKzbgLqHnd0f5SUsV4ipStU8x8QJBUHpm2fjZLFNJqAFVBPZnCVgfyt5SKIVEo3muCKOV2GikNo1AviBrFJGmDGpbUtA5Oyrj6VEgXGDRSHeLMgS6ndkMwQwq1Ja3oSmM4AYfoSncpwq7aEjLvKxbbZ+idAUi5qb+bQE2qY1lAevLJJy+8Ox6uj3019QOl3qdGAzKCqD+5ZgSkjy2VoOAoOWPepNKpUakn4mXjSE05wPmRH0IdepP7UqCQVg2IirMgH3UkCgkBSXdI6JjBaYOoybHtZ/DraZjPh6yZoqS6fgSCoTm+zd+TgHG7xqGOCtKWJpWnmMuQqC3Og7j70qW+VLcvPaQ6qbwuGLe+iQH9p6/7bqsJcHDqSh0rv5VpDBAKMqViukApxcROG4zfv/zLv2yQAiMZC0hlBuwNMVJOXbaihmu5QygtxKfmZUYzShTLAYW0ajDAalacjqLhoEjIgDNqaqoPjkHqI8A8TfJ9/5PoCvRtU+qi3ZBpfOCQ0lgRcRIweG3pS7EC9qOi6ote/e+JBoyJ2nLcvlTLNSKeNlAhTTNpASqxL32kxPpqQ1QOhx1S4NbP7r1EWhaSqnOOhdIBwu66tgByM8ZNa6a01xqrSOnq8LmgKYCqjV74oQtblRsyE2wQn0DIptRQjTe7feELXzh49nWxUUirBhKZIUrNRCdKi9H7vysqMhBqAylFNCOv84K0aBWGyuGaopfvctYha50Cl3/z8uQEXQTQBSTLSIfWLdTocjIOhNq6wQ1usM5J1kb5vB5Xh5Sl7WkSgJC6yJs6krK2QVCQxvVB7Whofe+II45Ia7H80OrYmiBQn2YH+yYqciCspv4WQPMiOUJis7Ecgg35H5Q0pIl9qpq6cswYP2ki20do09TtZolCWhkMqDoPhcAAGAvDVOvwOJWuvB5pGWyKTMpST6EYqeOrjUWBvsnopY9j6kwBxxZxJ42GsURjCJAbtVhXMLnaevrTn56O2UU6HMFx2tCntDhYOGgTKIQ+YpGe9qX8AamTmULFd0FiLNgH4phEnbGnprRckDMeaqYUs+uNPvcZO6OMbU2TKHUIFFJNNi8tRHzeQ362aWeuZ4FCWhlEFqRBEksPkQ/Dp5gYGzKztaWICrN+Rsxgk+WRcsWyCcSHDCkV+9SLr4zZZ5MCcTK2ruJ1F8yUDl0aIHLrrzpCbXksCxXUVQvhEPqlDa6jbZ0Wh+REbYV8jjzkBm7pVSxN6QIiiEcPHXvssQvvDod+larW0+qhcD1sp15SoGQRkwBCwTk+O8hR/78JCO2d73hnGg/krE/YAyKUnjoPxSV13NQopLUAg8KwqA1kZQaRwSuCckSpDBjMmKWpIzqzXjiN7zIIhqC42WRIis5tda4xkNJyxqHpXg7F4aEzRVRSfSaV07idRT9YEqAdbSSPeETxNkeWErXVrPQfVdsGgWLIpAmS7wMVu/POO6eUUD1rDPFQQM4xNBh0oa3WSV15EoRzSOEsiekrutehv2wghbXglOIXWJClCRu24Rx9gWCxUUhrASKIqGLgDJSoojjLCPI6VRfaSCuARBzHeq76wEsfm+T/pNB+dSrXMgamxSmYISkqJ2pSSs95znNSP9z4xjeuvvLlr3TO3nG4trSFgmhTjcapK/UUHNqWpkBcZ58D2s8C0u222y6prK4aWh1S10jZZgXpf9usLCVH4bMzfd5UnB8C39fv6oF8QABnR1EX07ebEoW01kI0lIYwSCrFQEkLDRTSaruJtY4+0gI1gbpSQ2TqUZxoknpHGxg3IxuS/uRQyxtae0EceTEYzLB5IKK+QGCurQ3Sx7ZlDV2kxXHaVJjxtDwF4bTB+HaRXuAZz3hGKrx7RtaYBcKCkD4cQ3J9oFhlAeykDmOFqIJwBJOu6+8Ce1SmoKoo/4svujiRr3JABItJ09xZoJDWWlAV6gFSGYSDrDgiWa+GNXSAhpBWE5zLzB+lpcCrFtO16HIMRHskXCeWPsQaqL6lFBxDhK9PyT/5yU9OfeFHHRBE22yZgNCW5m2UHl79s+oHa0ngqqt+Ur1tbarStI6Nw5mRbKuFAecfMltq7C1tuNWtblWdcsopC+/2g8Mjllmk+mAM2AQi0o+IUGqbw3Ujf/tQW0PqWF1g82YO9YFygfF1TgV9S4L61uAtJgpprYVoT/2oPRlws1KilcFqi/RNmIS0GHaePoXxcSozZ/6fFgwQAY+V9Zyf0fY5N2OuT4fnaovDtxETUm1TTMhuHfn8sPrs2YdUt12zrn8322yzaoed71cd++pPrv1kYzhX1/IPwemb3+hOxV3T3e9+9/TMsEMOOWTh3X5QI2ppfX02BI7BBsIWcuizruUks4CgEbdkIStKUypPuXdNsCw2ws+WI5akVQbegHBOi++oHVHFYFFfbdGSwuBUVAxDtd81r3nN0aSl3tE0bc/pTQo4fptKGQvGp3g+5pYiqUDTLGEd2lpPhUJtucVHHa+pL5EyFdHUJu299NJLqq+dvXe1Zs1W1U4HHlE98YlHVIfe946pKL5mzQ2rvc/+WpV/U192radT50FaXWATe++9d5oJtuq9riKbYLwoTm2eBaydM/YIuKlvpINdd0zMAmqWJo3CJ5yPkpMNINJZZQNjsepJS8GauuJQDEEEkRZ5j4O31QUQk8jDoDi2nH/LLbccRVocrG+Jg1QGqXL6tlm4MaAeOUN9jVUXXGdfZBWBKdQcHNltPcj8pJNOSo7YBDWvpmtLSutjZ1eH73dK9emr/uS4V155RfXKE/+2WpOM94DqTZmocn1thX8Eyen6anX/+I//mEjxpje96aB6ZtSaZkEi+tF4D1nJr23Tqi3226bmpZj6yySV2UM1Ru3Tf4r0XWvoFhOrnrREZZ1vcDgzw2MI0kJKS1QR7eoqwqyTnJ9MR3jIxyyTKfGhxVfnGEpEZm7USZDptBFOGuy6xswume7ue2SLFLG+XOKYY45JBoYEOHYTjEHTZAHSuvT1p1WvrS2al7ZeeOEbqjPuTNmuqY5fyEw5nzFsc2RT930pspufzRRef7PrJzXRB0TMTtpmQIeCPekHwW/oxImShmvqQ16T1Ue5/USgzqHYTjm7Udr9i+yU0hKcTS4YR2NTD1JLhVVNWiIZgxOZkQflEz/LxKlFGgNOHlM69o2ZE45hIJGd/dVextQxzCJOEqmkk5SJ77ZFyCHQfhF9iNGDiIykuwqw+kuanacznMJC08033zz9mG1TqqX+1OSonKmppmjaX8p84dGMd9fqZQtc6lxta7M4qrZ1zagZYzOFFPOTnvSkhXfbofbomBTlpNAegY9tsb2x0IY+RYYMI8VnM4hREDKWCMqiZzYttaWoEBYy1jaTUmeddVa6ToGZnwh6ZhbN0I5R7LPCqiYtqkDUthlY5GPgOEXT2hoOx1k4B+UjtYwCZYDDGnSD31bHAdJ+0lsikAOjoSraUq4hYJRk/tCpfNdC7XUZKjVWj9xu6Qm1RSnW4XhNBN625EGU/9nPflRdcMRa493x9Cpc3Xnb1KP+6uorY37Pe94zpYR++j9XJ3UITuzFOE8Dqh6BaFtO9GNA4dVnEoGtaiNlhKDyNWsCLDsXgI1/1Ez5QdO6PuqUvbITNkdhGWcz0pMQ7bRY1aTFKagHA2jZA+cxcByzKxVi0CRyzIhxrCAgqoERIQSkJkLVFzAinbYZszGgDBkQdTFNeqItyHdI2inK2rfNyURyTpK3J9SWlfLPf/7zN1KIHMU41MGZ66Tlu6kI/POPV0/eak31iPPX9TsioSb0bR3S9a5UBhnf//73T09gtbyhK72nULW1rW42BGxEzUpQm1ap6A9qq06yrgE5NfWHFf7aQGlph42ttsFngjCfYHNqtkoBspFNsdB01ZIWklFgRCgisIgTRUcD0RVpgbEZSAQnYgU4D6elKDiu49Wn30WooXWvIaAukKhI2FbP6YMUWBQdov4Yb9ctMtrjunNQW361Z6+99tpookKfUS311I1yoqpyRJr3vfMeXm1zxAXrlzxoP5Krg1NTHG2k7vPDDz+8uvWtb11d97rX7Zz9U0My3pPO5lI/+oWzS8tmBcdqmwQwU2rJibHVRwGEpR/1iz4w6dRWXzUuArRjKU3Yl88INuwAkS0lVi1pIRL3aHF2JMUQERGH6orK9qM04jYXAx5AgIxenUgklm42GVNbBJwWUlr3SYq8Y+prARFYfwxxStcQSrMJ+jRPSUJt3e52t2tcqCnNiHpX9Km+rCsaY/T5i19TPWbHJ1YXZvyK4JrqYpQzRd2GU089NS1tuPa1r53u32uD9FGqNYmDcnrtUwMaMhs5Foi8SSkJnN5HavpBfwYxsRV2inyQV1+qyyfYhevXF4K8G6v5ELtZSqxa0iJvERSikfLEDKJByJ2tDmSnFub7Bi13KgqKM/vMwCKOesrlXJNG6iGQtiEM18FQxwKZIuWmWlIdlJ3rbQLFpz9zUqe2LAzdZ599ql/9csOU2XHqyz84ep20LvvsBdULH3Vc9ZGMO0T8pluFIo1vS3ulRdZhWZYRPzjbBKTHsfvUdxMELWTlWupKclbQx0oSdTXJprUdwUTdK8ZDW5QFpNRD7jOl0pC6fjZW7NgYu766ql5srErSMnBUgtSDMaqRGEBqwP9tT3Gog4OHvIb999+/+pu/+ZuU+iEuzl+fWWK8PqvXuWYNikR0VOi96sp1T5kYiugf0TeurQ3O0Vbg5jR56qxfpGDqRmakcoj69ZRzI6X1ux9Upx17ZPWqj254SxJybpo4oTjbbl9yPstTrNq/613v2jiriaSkQpPUbagbhKkPm449SyBtAaSpTiqVVztTyjBLOGRM67A/kjLWVJVxcTwExk6k30uJVUlaCq+RuiEqA+FvhHLGGWesr1ONrQ9FZ1Jw0h3GkkPEF9k4kyhPiVBtk84cDYH6kuvRlqaZoS4gHSTe1Q+IW2G6rUbH0PPz/v3f/31aUqC2lYOT1/uL2luv5K6+qrrw5GOqZ5791o2CyrvfcV71vR9uWNBG2hRGE/TJwQcfnJ5CIWWliutgI8aniQy74HuITr/Nsm5Zh2CIkAVGtoTcEUhdDcoMBAN2Dh+44AOD1waC60FSUuPTTjstpZx8hc+of7Jf9bKlrGutStLS6SKtyKS4KPqIppzEIIgqjMDrGOSk1QQGFAVY0cvfSIxzcDCKYZJa1BAwcOTFAMekOVIHSrQ+mZCDE3CeJkUh1c5vm+HIN7rRjTZabKpN0sP8+rU1qYerr6jOP+Go6m1fXzfrmrf/u1+5sHrGo06oLq11G7KMvs6BzI477rh0I7exQjB1qI1RqGNuChZ4tFcfs6/FgJQOwbJXgQJJ5cSIzOv1JeMnfVPbQm6ud4zSQvCCuWMLtq7xwxd+OAV9m2zF50u59GFVkhYpbYaPcTFQhszARceupQ596CMtztvk2BxVzYDjIwh1iMWI0oweOSOLMY6FlLSraT1QQHs5RZNq5DSMP/B3f/d3ibSkZxBOZFxE9gBn+NQn3lads/8NU78q4m+zzTbr+9nm8c67nfCW9fcfOpa+bKqzUIUvetGL1h9Dja0Ozod42MRQKK5TG4LeGEIYCjZK4SAqNsq+moKbNtdnUO1HrVJbXevU+uC6qE7H4SuUm3Y5NttoWn+3WIixX45YlFYZxOh0jotIGIPBQBbTzOpFZzaRFmem4vrg/IhTm5ALowhpPytI16RiSKZLQeXQfg5TX4KQg/M2pWTa7/1waARH6agl5SmhffJJiosuen/1yqP3SwTn1prdd9+92mOPPdLftt12263aZ5+/rc78zJ/GDDFTE02kg1h22mmn6lrXulaqP9YVJ5IUzIYWzNmRPkSQs65RSr30tdoRJR5r/7qgfxFTE6HNAsobAgvb1C5qFpGp61KAi0HYTVh1pEU1uJ9KNEVSBtl75G/TOp8x6CItMr1NgbUBuagraSvnQAqzdA7XHE43tFjMsZFLmwNJq5uirrQuV3cHHHBAIi2rzwNIPVcDUhEpSQCZ52kI0uA4OaRBefE/4Bqdy9IGz/LPAwHyQnTONwTUoPNSxld++9PVh09/VLXDFkdX/c/C6IbaoRRZsDLmrmVMXRVpILfFUOmADI09krIZD0V4BPaCF7xg5sG1DauOtEQEEYyTSllECtGDkXTNEil8Ih0G0RbJukiLw44pgNbhuwiBFEc0ngc1qwK+PjEThJCG1LvUx6iWtsI+Q64Th+Nqeyw/0EeeBkr5UDegmJunoBsU4teCk+QFX0Enrztqj3PUI762POxhD0szhRa4CgQBioxy6Ep9A1SwwKavvvXlj1QfevlzqqMPvO3C0yYmIy39wjb0Jxs0xtM4v+8OWcIwKdRgLadB2vpVzZIvsZ1p0s8xWHWkxVmiiGhDWIxGft62SE60QxSWKkRa1eSwbaTFMMfOQrWBQ2orgmXo2jOLdV+UE4KwWrttmUAOKociyGtVAW1ERHUjRo65mn3gAx+YfpLLPX+gn/NlD0gryE+gcMxI3/3v2vMAok/qDqu+9dznPjfdsB3jQ+UhK/squNdnI5tA9bhehLcBKV59QXVEOu5w0vJ9ky7szxhqt/6cBfRHfUJjllBOQFRxL6LUlT8g/sUkyxwxjssRi9IqEYGjiQ6MVUoiYosebdO2VA6DDYdBEk0LUKUdtrojq084x6yBaCgEkl29iRENrVG1ARlTSoyxiZBy6EP7ceg6KCoOWQ8EZrxiESRSU1y3cWDXgzRDQUopkRb14POjjjqqeuhDH5r62JIJNS7flWY+4AEPSMsYXvGKVyRyBH1hPZh7Chm5X9ShtK5zneukp5JaLNmXfnFETqndzan5JdUzthpGWmYjY7ZYOopQ++pUk4CN900kuK42Vd22GBeiT51DsPc/OzCW+mgpsKpIS/RhMJxc1PYqynE6P5nEiNoK8QZI6sERqYGY5RI1RR2yvs3JkdbY5RNjwdBcB/LSPrWgadIMhK6vpAFdx2H4+rKpjuV7Psud3XHz4vuRRx6ZZgD322+/9D8lZn9p+PHHH59UGAO1kl7h3a9Xr1mzJpHVbW5zm/TZFltskYr1Fq2GQSOyRz7ykem3Cv2/yy67pLaqbd3lLndJ3zcZYNybIFCZpNH+7vsxv1GdvUc7aSFt5QhKhO2oyc0qrW8DIqmXIlw7O2Xv+l9dt35dAhYVj5Sagh8bc4z4/U5LL9gam2MraltLgRjj5YiZt4ozKJ6KeAaMU4n60jm35FBTDMs+nMfAiFgIQL3B/hukBmuhziJ62h+pUTt1OM4sC+h9oB6kVlIfCoWanPT8VAsVSim2RWZwPs5Qd0hOwPFzRcFxQg2J0J5hdYtb3CKl3/rPs6yQlMc0uy/Qk0933XXX6iEPeUj1tKc9LY3TS17yknQc42JBsPsZ/c7iPe5xj/X3ODom4/a4GQGF0yFhwYpKC+PncAH7RN1qWNq9MWlxfgHEcT1IT9o9pqA+LdisIJrD+QUWqT9CyoOzei27Dx8wBvbnG2yf8mbb7Mki07hFTCDmE14FfNfbpdJmhVVFWgaCMalLcDADJQJy7DBQpGQ/A2GAERxDlw6e/87zN7o/jgLzHmflmAgvX2sEonuXwy8mkLNI71nfyANJjG2LPtFnjtGUCgakqoy7nmbro5zMESjiiHYcdthhSTUhGY+voajc7rPnnnumWSmpjMAQYyTaR92N8xm/nCylc9JIZGe2kCKgeIx11Bs5qtoW46feXJ9r8zC++hh3I0jrcdXr1jqy8XcMJL6Uq8RzIA421wX9FjOxMpAgMd+NAKev9AmS4xMRsI2zvpTKIzF+hOiXipxXFWkxfrUEyocC4NAMi1NxhCYYKJ97NbiiVT7t7n11F85qAOvH4ZizKrJOA+2UciEPxib10QdjwNGRh+tsK7oieyqlXvPTR/kaLxMTHBv0J7WFYPz6jTVUgoq6SVoRvxaifNTCOExEdOosJxnOQwnkv7uIqDlWPR1Si7HA9eY3v3lSaBRFW3mgCfr0iis+Vj1ue060f3X6WttoSqs2BfRVvRj/xS98MS3r8Jn+Q7ABfqCPpXhsOfq9DteM4Nm57xhv5IawpImzmBTqw6oiLWTFQUQKHc/gkRAJL80bikh1GAXHZ/x1AwmQzwxApB/jEIsJRErec1LpVV4cHwL7qmUw+joRQKThMfMX0N85qUsnQo1QPZTWvvvum4gR8nVa2qrdzh2qzd8cJYAI/R+1LYV5bUCATX3v+8YeYVF4j3vc4xY+6QZiot6Q/wc/+JrquTuvU1pDZw8XE8hI3ZDN1YvxMgDKyTgYP8GHLSMiZC/FA/0soIQSzhFBWi3QOFF0xolf8SnbYmNVkRaVJeKK+HJ+DoR0/N2mhjgVxzbIBief8WEgnl8lPZGSSL/q0+cIkiNxOs4jLaJytEGtyf5NxrFUoJ4YsutzDYy1b+YpgPj0JxIJ5RNA4oxa3Ymhg35znojGlF+kMdSZojmF5FEu4TgcxLEj8uvjCDDS9uhvbfHZve51r2TQjhUTLXVIYbSZYqPCtDMcIU9jcyhsc2zXazz12bpr7i7ELxaCwGUB2sW2BQqBAKF61SdNML5sL0jK+BgT39EnxqJtiU7sa2yUThxHYBH8qTR9vthYVaRFwoqSnMWgiDg6mbO25eIiNGKTDhkoBp6v0QoH56SeyfToRz86GVNA6pKrESrE+b3P6RgJ0mN02sNJyW1kGeS4VBCJXSPj1R51o74CvutG+oidI9dB3SLrOI5+tm/0CWNHHK7VMgap2oEHHpgcQ38gd0X7IB/tck7E5XOQomizmUjGbImDX0HO03hwDv0r/am31dj5rlnHgHGmHLRfmxEnVb0hFpe0kBPC1EfIAclrD5tFoAKgaxJ0cxum7BFaHfqRQkTwbC9P51wb2+2b3bSf/tAOY8CXEJg2tJHdLLGqSIvaEY1C6TBqasvrLAgiOjOKvcDY6iqkDk7IQcxwIbOQ7pyLk0Zbkaf9QrksJhg9QtEO/SYqdylC5C7NZMz1epfvcjCpMiAss1T6BVFyQDALSCFZvmDa/aUvfWlKQ5C6PqEg/A3GUV8gQ85nGl7h3TIGN0LXl58YB23jtE1jLZCYsbQIldLT766diqkvH9gQsyEtY4oMOL9goZ7nWhGMwr6/kZO+dd1spgu//c1vq+9/b8PbeRxfUApc8qlL0nnGgh0gJzaJSKlT/WVM+yYAZoFVQ1qMgiNSRoyQ4yABnZ8P5DRoIi0qYFKSYRwcXVGbwVJmisw2UU7kRwhSpD5inAYiKMJQ/0FkXcVm7WXA2hokBf5m1NE3nA/xAGJQBOZAniSKPA466KB0zRG5EY3xsvTCcaLWRWEhS2Rzy61vmRRTPntLOVAVFPXGKmkdjA+S89073elO1f777T+ioD58cWlASs4uqEXXg5AtN7D5W0agf/TZpMHUNbn2uu0hlTPPPDNtxuj3v5vs+MbM2LBN18KnZAfa3Ueo02LVkJaILNIyeLm3V/9zsPg9Q5GjzbCHoE5aiKStrjANyHcETD0wcIaoDoHMXBNlpg0MqU/qjwESdVzn02dUS1MhHhAdBSR9CEL1GmQL0heOioAizXbs6EfX5PrqsK9j+K70kzLzwxRmHeNcUiUKkcJrq1cie+2LWozrsfyBYot1ZH349eWvrO6f2rtHdcaXNnxKLfWJeNgAJ2dzxoiCcz7B0nkWa5JGvalp/PVRl2pug36nApUDqFEK2TUZJ33IJgSRxbiWHGEfyxEzbZXIyShFA4ZkC8dn2CF125xwCKIzg7ScCxkuFTgqB3UtHEIkZViMitrwHmU2i3qZczkPZSCNZchNhE9NaIN+iKhPrRkLdaWm/kFA+vEf/uEf1hNcHY7lMzdCW1FvlTsScl3eN6ZNM8IcTz9wNv1TX3hrJtG5LVTtRqSFte3OJ1RnrU3l9AnSFhRN4HB2Y9NXI5wlKNf6msFpQFHxEQrrjW94Y/Idak5w5E9enZN9LSair5cjZtoqslXdQ/4tmot0alscKqbYp0V0ZpCWAY30ZlOBVOeokWK6dqme1Izq8Tc1oyDLwOvpxBAwWKSFwGwcNBQPiPbUn75m6EAFUR9NQDj60YJTyrENJ510UnX7298+pXSciWo5963nJsfJSRnBqhWqC7lubW1zZmTl3HlBPqBvfI8tOV/U2KIv2ZNj6+tJ+3KW0A8xuzpr8B/jZLz1AXJmW2bTh6fWkyH8bDlipq0i0XWs2oVN4ZWq4kSLVdNiMDGtvNzAqZGN66cETONTBhQZZ1Rr4egKw2owQxEpF7JBTPo9CEQBOdSfY3eB4nELj9nYJhhLfe2XdCwgdUztjhk0tRrLTZxPykLZUdZ9oB7dVO2R0P42e6hm5jic03XpI4RgbPXhYtdwJoU+XiwC4TPIWWCmIBG5/xHZYtv8qiEts4RmYhigKMGQGbq6SNcTGKgEJMT5+updddJiMPVZrOUO9QgyX2rF0RGZfuOslITUi6JBTl21CyrDtVMgiuxUVTiQiNyXtlDE7j30hNJ6fUn/ur9QX7sfERkhSOBA0k8psfMg3S64BtfiepE35bD99tunWczTTz89ETDbmXV9cCmgLxYrVUNaUUPlRxHs+FMhrRlBmkbGM0AGKh0yG6WuopjbBCmOyGFQRHZ/d0XrOmkxGMa+EpDPeCEgykxBGSEhB6ln24wXJaJPEIIUXWo1BJ4l77ae/DcJtUPqpp+lhRFIKB/HNk7aUUcoS59FmqxwzMkEMERnYgCxuvfRkyQUl+cZVGefSp5UKfIn9UBBgS+xC8qWj3ldTKwa0kJOIoEOVXPR4TpeRNfhTWDAUoIAxxszIIqueW1nJULKx3ClUhQrMot72Kgs/e7z6AcROl/Q2AWEgrSka6G2YhGoWb5cgfk7gg9HpTKkRxRArHXytzZqq8+1vQnUm3M0/fDFPIGKrKthJBUzzZawvPjFL55IjfEDtWB9zJ/0qfco3roynjVWD2ld9vk0UDrVJk0k/aWKoYyaYCAoLRGEwhgzVWzf5VrvWEzE+jL9qiZExSB/qSa1OrQPKTL3IjJQZGWhaRgsdZQDKTq+WUHnoryQGIIcO1saxLgSSKuutNij9xC2zd+TTBhQrPzI2PIlBEYUeBJImwiYFcIGliNm2qovffFL1cUXXZyKhZxJjUpEMHOmKN8Eg+lzdRyDQkVEoddn3je1zRERYO4YnFZub3DbtjZCc46m/fOtrZ7k/ab98y2uoQ7tado/32I9VRNiH0SRb/Ge2lFbjS9ulcqPIZ30aBrrpjyqxuaXdE488cSFb20I3xtDTm1Q/HeetkmAeYHgUK8dqsupTVJIsg3lkoD91THZM1XaVY+lVPkGH2LnJnT4FSVblNaMgKQMBHKREooQ/o7ZpYgUood6B1VlMCgxEd9+6llkMBhQ+yMvm/cjvzd4Rx99dPoFY+mN39nz5AHb1ltvne6N87enR8biPK+xeWJn7OM1tvjfMTz33L5IMz+GmTSf2+KcNm2wWQPl+HEuqZzN97XH57FvvnnfxpGlflIuNS2vvu/Vtdo8Djn+zrcHP/jB6Ry+5xjxfedWp4pzx7k8yM/mu/FebPl1+d8+1msp3keb4/Om79viGP6O79S32GfsVj+G13wc6/vE1vZZUxubrsGrLfrDj4cgYE7uNSY37na3u6U+N0vLTj0WKJ4G63/3gHraq/fi+LEZXxMVjp231Wd+qMT3g1gWc1uOmGmrEIuoQwHZpAyxUQ9e4zObfSkSxIQYEB7iogjAZ4q+yA7BiV6Ok3cqQwiFYFPczf/O/69/3vZ//l798/p7bZ/H+5YLdH2e/930ua3rGDaf179T/zv/P//cs9zz/+uf1/+3v83/8V7+d77l7zVdQ7Tb303HqL836efxfv53/J/3nb/r7cw/jy3/3MYGwx4pVuSCiDy/zESGDcn4DOkgtSBWpIa81BQdKz9+PjaxRRvzcy7mthyxLFqF7EDaUV8tLxWjrEjjtpSrYDYQ9YfOOhZ0Q1lDHUqKWC+NCMr62STVUq7eXynY5KQl/zfbJc+npgx2V02nYPEwzT2hBX+CwGuiQnlEKUQG0bcsomA4NjlpiTSK76btY5lEUVQF8wyTFeqvUYtVv22biCoYj+WZtBYUzDFkD1JDM4S2pXg88mpCIa2CgoK5QiGtgoKCuUIhrYKCgrlCIa2CgoK5QiGtgoKCuUIhrYKCgrlCIa2CgoK5QiGtgoKCuUIhrYKCgrlCIa2CgoK5QiGtgoKCuUIhrYKCgrlCIa2CgoK5QiGtgoKCuUIhrYKCgrlCIa2CgoK5QiGtgoKCuUIhrYKCgrlCIa2CgoK5QiGtgoKCuUIhrYKCgrlCIa2CgoK5QiGtgoKCuUIhrYKCgrlCIa2CgoI5QlX9Px+eZLnenc8oAAAAAElFTkSuQmCC | The figure below shows a rectangular piece of paper. Measure the degree of ∠1 using a protractor, and then fold the left side up. What is the degree of ∠2? | A. 50°; B. 60°; C. 65°; D. 70°; E. No correct answer | C |
268 | 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 | The volume of each small cube is shown in the diagram. What is the volume of the small cube in cubic centimeters? | A. 10; B. 1; C. 0.1; D. No correct answer | B |
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 | As shown in the figure, the volume of each small cube is 1 cubic centimeter. What are the length, width, and height of the rectangular cuboid in centimeters? | A. 6, 5, 4; B. 4, 5, 4; C. 6, 5, 3; D. No correct answer | A |
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 | Given that the length, width, and height of the rectangular cuboid in the figure below, find the volume of the rectangular cuboid ( )in cm³. | A. 90; B. 100; C. 120; D. No correct answer | C |
271 | 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 | As shown in the figure, the volume of each small cube is 0.001 cubic decimeters. What is the volume of the large rectangular cuboid in cubic centimeters? | A. 90; B. 100; C. 120; D. No correct answer | C |
272 | 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 | As shown in the figure, using a ruler to measure the length of the rectangular cuboid is () cm. | A. 10; B. 5; C. 4; D. 8; E. No correct answer | A |
273 | 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 | If the rectangular cuboid in the figure below is cut into the largest possible cube, what is the side length of this cube? (Unit: cm) | A. 10; B. 5; C. 3; D. 4; E. No correct answer | D |
274 | 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 | If the rectangular cuboid in the diagram is cut into the largest possible cube, what is the volume of that cube in cubic centimeters? ( ) | A. 64; B. 125; C. 1000; D. No correct answer | A |
275 | 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 | As shown in the figure, use a ruler to measure the length of the rectangular cuboid, and then cut the rectangular cuboid into a cube with the largest possible volume. What is the volume of this cube in cm³( )? (Unit: cm) | A. 64; B. 125; C. 1000; D. No correct answer | A |
276 | 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 | As shown in the figure, a cube with a surface area of 24 cm² is cut off from a rectangular cuboid. What is the edge length of the small cube in cm? | A. 4; B. 6; C. 2; D. No correct answer | C |
277 | 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 | As shown in the figure, the volume of the small cube that has been cut off is ( ) (unit: cm³) | A. 20 cm³; B. 8 cm³; C. 40 cm³; D. No correct answer | B |
278 | 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 | As shown in the figure, after cutting off a small cube with a volume of 8 cubic centimeters from a rectangular cuboid, the remaining volume is ( ) | A. 400 cubic centimeters; B. 8 cubic centimeters; C. 392 cubic centimeters; D. No correct answer | C |
279 | 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 | As shown in the figure, a cube with a surface area of 24 cm² has been cut off. The remaining volume is ( ). | A. 400 cubic centimeters; B. 8 cubic centimeters; C. 392 cubic centimeters; D. No correct answer | C |
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282 | 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 | The white part in the figure is composed of 4 identical sectors, and the area of the white part is (9π) cm². What is the area of the shaded part ( ) cm²? (Unit: cm) | A. 6 - 3π; B. 36 - 3π; C. 6 - 9π; D. 36 - 9π; E. No correct answer | D |
283 | iVBORw0KGgoAAAANSUhEUgAAAMkAAADOCAYAAACUwya9AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAyoSURBVHhe7Z2/bhVJHkZhAAlmA/BOQsbIhKMVSIS7khMHM5oEaeRNRyskR6NNjUhInTmzxAPsCJHvJA4ISP0KCJ4AHsGj7879TPlSfft/d1X1OdInZq7vtd2/7uPuqq6qvnYBAFtBEoAakASgBiQBqAFJAGpAEoAakASghkpJ7t69e3Ht2jVCks1UVP4k/yJ7e3tkgFDL4fLo0aO0JIFhoJbD8fbtWyQpEdXy5ORk/X/QByQpFCQZDiQpFNXy2bNn6/+DPiBJgegMolqq0Qn9QZICef78+aqW9+7dW78CfUCSAnn48CH1HBAkKRCdQajncCBJgbiW1HMYkKRAXEvqOQxIUiCuJfUcBiQpENXxu+/+vvqXG4r9QZLC0L0R1fG/v/22+pdu4P4gSWHcvHlzVcf///EHNR0IJCkM1xFJhgNJCsN1lCRul7x79279VegCkhSGaviPH35YSeJ2yePHj9dfhS4gSWGohsfHxytJuOQaBiQpiKdPn65qaEGQZBiQpCCuX7++qmEoyfcPHlDXniBJQah+//7llyuSnJ6eUteeIEkheA5JKIij1zV8HrqBJIUQu9Ry3BUM3UCSQnD9YpJwydUPJCkA3QdR7fb+9c+oJIq+fufOnfUnoA1IUgCuXUwOh/p2B0kKwLWLyeF44OPr16/Xn4KmIEnmfPz4cVU3tTticoShxt1Akszxog8xKTZDjbuBJJmjmm1rsIfxgEdoB5JkTJuziEOd24MkGeOaxWSoyosXL6hzS5AkUzyX3XNH2kSf455Jc5AkU1yvmAR1+eabb1afpTu4GUiSKarVf379NSpBXTxMhXo3A0kyJFwRpWtcb+a/14MkmaEH86hO//v99+jB3ybUvBlIkhmuU+ygbxs1+ql5PUiSEe7R0uVW7KDvEn0/VnncDpJkhGsUO9i7Rpdt+p48Oq4aJMkEt0WaDGRsG2q/HSTJBNVmyMusMG6bcIMxDpJkQJcxWm1D/atBksS5f//+qi5jnUXC6OdoQQm4CpIkjusSO6iHjofSa3ki+AKSJIzX0tLI3dhBPUbYD1+DJInidX2nFERxlzD74gtIkiCet67EDuSxo5mO+tmMEv4LJEkQ12JzXd8p4+H0gCTJ4d6s8Bkjc8X7RGe2JYMkCeGGepfZhmNE81XYL0iSDHO3Q6rixbaX3D5BkkTw9scO1Lmz9GfCI0kC+LEJQ0ykGiveP0scLYwkM2NBUmiob8uS758gyYx4m+fs6m2bJa60giQzocezaXtT6clqE++rpYiCJDOQsyDK0rqGkWRivJ25ChLG21L6GQVJJkQz/7SNJQjieL+VPLweSSbCvVglCaIs4dILSSbA29Z1WdIc8rdvv11tY4nz5JFkRHSt7u1K/T7IEPG2ljYFGElGwpOmlNgBVWq8zRrNXApIMgJuf+gSJHYglZ7w7ry6u3MHSQYkvLzK6S76GNHlpWuhhfVyBkkGIhzq/v2DB9EDZ4lxTbQkUq4gSU88UUpp+hTcpSXsJs5xFDGS9MDr8yqcPerjwZFKTlOCkaQD4aWVkvI8kNQSipLLU7aQpAWbcizh3sdY8bJFSuozHpGkIX5OofLzTz9Gdzxpl7Ctom7zVC/BhpREf1h3dna2fr/sJDk5Obn83ZSpV1RcQjSezfVN8W79EJIcHh6uvsfR0dH6lWqykSQ8c+g6OrZzybAJzyxKKj1hfSQ5Pz9ffXZ3d3f9Sj3JS+K75YrkoFE+fcI/UIrO5nPSVZI3b96sPqfLqzYkKYl6WTZ3TMkjdnOJutXDfTLX5K4ukvgM0vZzIhlJwgGIDmKkm01hphwT1kUS/55N2iCbzCqJ/hJ5dmAYLqnySdjId8aeFdlWEjfS23wmZHJJJIYXoQ7DEJK8owGkm/tUGaP90lYS/y77+/vrV9oxqiThMJHNcClVdrQU62a70ul7adZGkidPnlz+XBGOhnbUXtnGIJLoppO6B/1U2qqocLGCkrKjA3OzDRNGl9w6fpqeddpIsvmzDg4OVq+fnZ1deV2/YxW1kty6devi9u3bq4TftC76K8KdcBKLbgB7Dn7T6HjycXjjxo3Va03w56vui/jr275frSRdoscDLH2SE9keXW77MRJdU8f79+8v3/vq1av1q1fR636P7qPEqJVkG7qfoVOkTpV+f1VomC87OnuEI45j0eW62rF191+aXm6Fkmxrd/g9VQ37XpJUoTaK7nvEuneVpc41X1qqerwU/WHtOjS/iyT67yr8nspLsvW/X+EPDomK4nV3N3N6ehotNMkjurcVa5yru3/oO/NdGu5Vl1JCcug96gmLMakkITrbxIRhRmFeUa/Q5mWUxBhzAlcXSdyrFcOSVPVwzSbJJuFARkWNuthOIWlEbYxwfylTrcLSRpLwvkgVtV9f//sVdR8ck8ePH1/+fIU2TBrZFGOuNbzaSCJ8QzF2pvj06dPl9lSRpCRG17L+PRTuu8yTzXklc0/vbSuJ8O++SdXrIUlLYjaHtyDLdAmHlqQyS7GLJJ5LEn5O7ZQm3ycLSULCoS/agbEdS/pl87IqNbpI0ofsJDH+/RS6j4eJunHDnqpUputugiQtCO/0c1bpF/2hcS1T3+9I0oGwzUJPWLuEk6bUq5gDSNKDcBiMuvtiBwX5kvAOuYYR5QKS9CRs2CNKPGp7uEYprqtVB5IMRNheUW9N7GBZYsLh6amu0FgHkgxIODaMxSW+PJsk94eNIsnAaKCdt2XJ8+pdgxwvrzZBkpEI7xzHDqJS48urEuQwSDIi4cDJ2AFVWsIbgyWBJCMTDposuZ0SzgosDSSZCG9fad3EYffumBOf5gRJJsTbWJIo3ibNDiwVJJkYb2cJPV9ey2quyVBTgSQz4KnDua4wGV5iLQEkmQmLkuOll/fVVHPM5wZJZsTbnJMovg9S+iVWCJLMjLc7dkCmlqXuIyRJAG977MBMJf4dcx+H1QUkSQCNjvX2xw7QueOGeklDTdqAJImgR5q5BrEDda54eZ8ltUE2QZKE8FD7VOajLK2rtwokSQx3DccO2qnjfbKUrt4qkCRBXIs5ly5yV2+p47HagCQJogcVuR6xA3jseLG4XFYzGRskSRQvMDHH8Hr2xVWQJGH8/PkpRfF+yHXRhjFAksRxXWIH9NBxbxaXWVdBksRxb9cUD0plH8RBkgyYoluY+leDJJmg2oz1fMfwoTnwNUiSCb4bHzvI+8a1p7EeB0kywjWKHehd43siQz/WuSSQJCN870SPL4gd8F2i77fU0b1NQZLMcJ1iB3zbuC3CZdZ2kCQzvNbwECOFqXkzkCRDhugS9lrFSx/h2wQkyRCfTfqMEqbezUGSTHG9YgLUhVq3A0kyxT1dP//0Y1SEbdHn6NFqDpJkjGsWE6EqHsTIZKrmIEnG+PknMRmqover0Q7NQZLMUc2aLr6thr7ez32RdiBJ5rTpDna3L7QDSQpAdWuyQj017gaSFIDqpucVxsRwNMxe7+PmYXuQpABcu5gcDvXtDpIUgJdI3TYpS19f8lKlfUCSQnD9YoL43gh0A0kKwfWLSaL5J9S2O0hSCH5efEwSvf706dP1O6EtSFIQqt9mVzCXWv1BkoJQ/XTDMJRE63VR134gSUHExnJR1/4gSWGohuHawdS1P0hSGKqh55h4uSAtvA3dQZLCUA09RMVdv3reCXQHSQrDdeRSaziQpDBcRyQZDiQpDPdwuT3CLMT+IElhaNah6ugHgzI0vj9IUiCupcJU3f4gSYG4ltRzGJCkQFxL6jkMSFIgXvCBeg4DkhSIV3eknsOAJAWiuSOqpWSB/iBJgWgYimq5t7e3fgX6gCQF4nslSDIMSFIoqiUDG4cBSQoFSYYDSQqFWg5HcpLoFyL9Qy2HiztCpqJWEkJSzVRU/qTPnz9fvHz5kgyUo6Oj6OukWz58+LA+UsdnOh0BMgVJAGpAEoAakASgBiQBqAFJAGpAkpl4//79xfHx8eR9/tAe9s7ESA6Lof+G9EGSCdnf3+fMkSHsrYng7JEvSDIBFkRtEMgPJBmZg4ODS0kgT9hzI2NBDg8P169AbiDJiEgMziL5w94bEQtiSV69enWxs7Oz+n/aJ/mAJCPx5s2bS0EshgnPMOHrkCbsoZEI74lImE1CST59+rR+FVIESUYilKAKf11nGkgXJBmJJpLQPZwH7J2RaCLJ+fk5kmQAe2ckdnd3GwmAJOnD3hmJpmcJJEkf9s6IWAAJE0O9Wvq6esIgXZBkRDypqqr3SmtxcRZJH/bQyPhs8uTJk/Urf3F2drZ6XT1ckDZIMgEWxUNRLIjOJJA+SDIRYUOeNkheIAlADUgCUAOSAGzl4uJPHUm9beByUJoAAAAASUVORK5CYII= | The white part in the figure is composed of 4 identical sectors. The area of the shaded part is ( ) cm². (Unit: cm) | A. 6-3π; B. 36-3π; C. 6-9π; D. 36-9π; E. No correct answer | D |
284 | 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 | Using a piece of wire, you can form the following square ①. The perimeter of the square is () cm. | A. 5; B. 20; C. 10; D. No correct answer | B |
285 | 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RYT2IH4TAe8I+6HnSPoNCmUfokNqeJ6YU8RcphZkWcd1FMY9EhJAoSSEkBgolIQQEgOFkhBCYqBQEkJIDBRKQgiJgUJJCCExUCgJISQGCiUhhMRAoSSEkBgolIQQEgOFkhBCYqBQEkJIDBRKQgiJgUJJCCExUCgJISQGW0K5eF9uXDwr+cN75N09hyV/9qLcuG/37GrXWLx/Qy6ezcvhPe/KnsN5OXvxhtC8/cii3L9xUc7mD8ued/fI4fxZuXjjvneVdMKMUD6ZHpMPj5Xl3tOq9+6h3P7XPVmoPpV75RPy8afT8iT4GumJJzI99qEcK9+T/96alNE//FZ+++GonP/nTSmd+Fg+naZ1+4Yn0zL24TEpf/utlP76iXzyiVf+WpJvvy3LiY8/FTaF9pgQyursOTl2blYgkeDJF3+QlyInvTV/TrqhKrPnjsm5Wc96MxPy+vp3ZPz6A3lwfVzeWf+6TMxEPifZpjor546dk9nqglzdu15+vvcfcnf+gVwff0c27L3qOSb6efh9UsOAUHqVNjQs06icB5fk/Zc3BOe1NByJWZXp4SG5uhC+Jctn4aoMDU/7D5nZwq/kpeGbwXUPnLTnn+dcnZbhIa+jhNdJNlm4OiTDfke7IX/6xfty6UFw3T+Zcf2Q/NN7WZ0eliF2tBbSF8rqF5KPdF6fdmcH3xyT4Qofdd1S/SIvzeb1qd6R8dfXy96wU9wcGxaaN8tU5Yv8sLQ0hepT+brgeZS/+7v84F+4KWPDFY7emkhfKD1RHC81PcHaCeVCScajBxGTZTFXHJdG81blf7eKsucVb+iVq9TmfhdK4w3nPJOsMSfF8VLjqKGSC0/b/Jl8XK61BCmNN/U9YkAof5iSfGE2fBPSTihnC5KfCp55ZPn8MJWXunmfyPTwL2X9hm1yrNy4yjlbyAvNm2V+kKl8QZp6mgcenKe8offecGprVgr5qdC7JIqBOcoZmchNysPwnU8boXw4mafH0wszE5KbDKz7cGqXbHinIDMtcSAPZTJPLyLrzEzkxG8KC/fkX4gqCS57eN7m4GDQvx5OSp4drQUDQokOPCQTdyKzIs1CWb0jE0NTjWJKlslDmRqakDtVz6PYtU42vPyqvPpqvYz+G+adkKEpWjfzPJySoYk7Ul24KnvX/17+oaNtTxx/43uUVbkzMSRsCq2YEEoMCStjh2RSXR2sfr9/SfxFucUZmTw0JhXGd/XOk4qMHTov//l+Xubnm8rtSTk0Vp+rJNnmSWVMDk1+LV+f+7Vs2PCy/7B8+aVXZM/fZ2Rm8pCMsaO1xYhQgkW5Xx6VAwdOSvHK5/L551ekePKAHBgtc/fIarB4X8qjnj1PFuXK5559rxTl5IEDMto0V0myz+L9sox6df/HPxfls88+k3N/O+n1u1Eps6N1xJBQ1qk+fSTzj54yRGFNqMrTR/PyyN8BRfqa6lN5NP9I2BTiMSmUhBBiCQolIYTEQKEkhJAYKJSEEBIDhZIQQmKgUBJCSAwUSkIIiYFCSQghMVAoCSFkSUT+D8p5cRUqdaFHAAAAAElFTkSuQmCC | The diameter AB of circle ② is shown in the figure. What is the area of circle ② in square centimeters? ( )(π = 3.14) | A. 314; B. 628; C. 320.28; D. No correct answer | A |
286 | 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RYT2IH4TAe8I+6HnSPoNCmUfokNqeJ6YU8RcphZkWcd1FMY9EhJAoSSEkBgolIQQEgOFkhBCYqBQEkJIDBRKQgiJgUJJCCExUCgJISQGCiUhhMRAoSSEkBgolIQQEgOFkhBCYqBQEkJIDBRKQgiJgUJJCCExUCgJISQGW0K5eF9uXDwr+cN75N09hyV/9qLcuG/37GrXWLx/Qy6ezcvhPe/KnsN5OXvxhtC8/cii3L9xUc7mD8ued/fI4fxZuXjjvneVdMKMUD6ZHpMPj5Xl3tOq9+6h3P7XPVmoPpV75RPy8afT8iT4GumJJzI99qEcK9+T/96alNE//FZ+++GonP/nTSmd+Fg+naZ1+4Yn0zL24TEpf/utlP76iXzyiVf+WpJvvy3LiY8/FTaF9pgQyursOTl2blYgkeDJF3+QlyInvTV/TrqhKrPnjsm5Wc96MxPy+vp3ZPz6A3lwfVzeWf+6TMxEPifZpjor546dk9nqglzdu15+vvcfcnf+gVwff0c27L3qOSb6efh9UsOAUHqVNjQs06icB5fk/Zc3BOe1NByJWZXp4SG5uhC+Jctn4aoMDU/7D5nZwq/kpeGbwXUPnLTnn+dcnZbhIa+jhNdJNlm4OiTDfke7IX/6xfty6UFw3T+Zcf2Q/NN7WZ0eliF2tBbSF8rqF5KPdF6fdmcH3xyT4Qofdd1S/SIvzeb1qd6R8dfXy96wU9wcGxaaN8tU5Yv8sLQ0hepT+brgeZS/+7v84F+4KWPDFY7emkhfKD1RHC81PcHaCeVCScajBxGTZTFXHJdG81blf7eKsucVb+iVq9TmfhdK4w3nPJOsMSfF8VLjqKGSC0/b/Jl8XK61BCmNN/U9YkAof5iSfGE2fBPSTihnC5KfCp55ZPn8MJWXunmfyPTwL2X9hm1yrNy4yjlbyAvNm2V+kKl8QZp6mgcenKe8offecGprVgr5qdC7JIqBOcoZmchNysPwnU8boXw4mafH0wszE5KbDKz7cGqXbHinIDMtcSAPZTJPLyLrzEzkxG8KC/fkX4gqCS57eN7m4GDQvx5OSp4drQUDQokOPCQTdyKzIs1CWb0jE0NTjWJKlslDmRqakDtVz6PYtU42vPyqvPpqvYz+G+adkKEpWjfzPJySoYk7Ul24KnvX/17+oaNtTxx/43uUVbkzMSRsCq2YEEoMCStjh2RSXR2sfr9/SfxFucUZmTw0JhXGd/XOk4qMHTov//l+Xubnm8rtSTk0Vp+rJNnmSWVMDk1+LV+f+7Vs2PCy/7B8+aVXZM/fZ2Rm8pCMsaO1xYhQgkW5Xx6VAwdOSvHK5/L551ekePKAHBgtc/fIarB4X8qjnj1PFuXK5559rxTl5IEDMto0V0myz+L9sox6df/HPxfls88+k3N/O+n1u1Eps6N1xJBQ1qk+fSTzj54yRGFNqMrTR/PyyN8BRfqa6lN5NP9I2BTiMSmUhBBiCQolIYTEQKEkhJAYKJSEEBIDhZIQQmKgUBJCSAwUSkIIiYFCSQghMVAoCSFkSUT+D8p5cRUqdaFHAAAAAElFTkSuQmCC | In the figure below, the area of rectangle ③ is 314 square centimeters. What is the width of the rectangle ( ) cm?(π = 3.14) | A. 3.14; B. 6.28; C. 15.7; D. No correct answer | C |
287 | 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 | Using a piece of wire to form the square below, and the length of the wire is equal to the length of AB and CD, and the areas of figures ② and ③ are equal, what is the width of the rectangle ( ) cm?(π = 3.14) | A. 3.14; B. 6.28; C. 15.7; D. No correct answer | C |
288 | 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 | As shown in the figure, the diameter L of the semicircle is close to the circumference of the small circle on the left. Which of the following lengths is closest to L? (π=3.14) | A. 40; B. 30; C. 50; D. No correct answer | A |
289 | 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 | As shown in the figure, a 4-meter-wide path is laid along the outer edge of a semicircular lawn. What is the radius of the circle composed of the path and the lawn? () meters. | A. 16; B. 24; C. 20; D. No correct answer | B |
290 | 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 | As shown in the figure, a 4-meter-wide path is laid along the perimeter of a semicircular lawn. Given that the radius of the path is 24 meters, which of the following formulas should be used to find the area of the path? (π=3.14) | A. 3.14×(24^2-20^2)÷2; B. 3.14×(24^2-20^2); C. 3.14×(22^2-20^2)÷2; D. 3.14×(22^2-20^2); E. No correct answer | A |
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 | As shown in the figure, the diameter L of the semicircular lawn is close to the circumference of the small circle on the left. A 4-meter-wide path is laid around the semicircular lawn. Which of the following formulas should be used to find the area of the path?(Use π = 3.14) | A. 3.14×(24^2-20^2)÷2; B. 3.14×(24^2-20^2); C. 3.14×(22^2-20^2)÷2; D. 3.14×(22^2-20^2); E. No correct answer | A |
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294 | 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 | As shown in the figure, multiple small cubes with a side length of 1 cm each are combined to form a large rectangular cuboid. What is the surface area of this rectangular cuboid in cm²? | A. 22; B. 21; C. 20; D. 18; E. No correct answer | A |
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296 | 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 | As shown in the figure, quadrilateral OABC is a right trapezoid. Then ∠OAB = ∠ABC = ( )° | A. 45; B. 60; C. 72; D. 90; E. No correct answer | D |
297 | 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 | In the tiling pattern shown in the figure, which is composed of identical right-angled trapezoids, the angle ∠AOC at the junction is equal to ( )°. | A. 45; B. 60; C. 72; D. 90; E. No correct answer | A |
298 | 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 | In the quadrilateral OABC shown in the figure, what is the measure of ∠OCB? | A. 135; B. 130; C. 120; D. 90; E. No correct answer | A |
299 | 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 | As shown in the figure, quadrilateral OABC is a right trapezoid. The 8 right trapezoids in the figure are completely identical and form a tessellation pattern. What is the measure of ∠OCB? ( ) degrees | A. 135; B. 130; C. 120; D. 90; E. No correct answer | A |
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