请教这么简单的三维实体怎么画?
本帖最后由 tender138 于 2024-8-23 14:28 编辑data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAdEAAAHoCAIAAACZ1EKpAAAgAElEQVR4Ae29Z5QbVRbvy30jVVDOWapS51ZJKjkbHEg2YKINmGSCSQaGZJIJJngYMJmBYTAMJnkYsgkmGAZMMMEkE4yNAePUtvveddd6d633+b0P89Yuye12d6taJVU4VbXX6g9qVanqnP/Z51enztln7wPyPRX8QwVQAVQAFdBHgQP0uQ3eBRVABVABVCDfU0Hm4jAfFUAFUAH9FEDm6qc1PuRRAVQAFUDmInNRAVQAFdBPAWSuflrjEx4VQAVQAWQuMhcVQAVQAf0UQObqpzU+4VEBVAAVQOYic1EBVAAV0E8BZK5+WuMTHhVABVABZC4yFxVABVAB/RRA5uqnNT7hUQFUABVA5iJzUQFUABXQTwFkrn5a4xMeFUAFUAFkLjIXFUAFUAH9FEDm6qc1PuFRAVQAFUDmInNRAVQAFdBPAWSuflrjEx4VQAVQAWQuMhcVQAVQAf0UQObqpzU+4VEBVAAVQOYic1EBVAAV0E8BZK5+WuMTHhVABVABZC4yFxVABVAB/RRA5uqnNT7hUQFUABVA5iJzUQFUABXQTwFkrn5a4xMeFUAFUAFkLjIXFUAFUAH9FEDm6qc1PuFRAVQAFUDmInNRAVQAFdBPAWSuflrjEx4VQAVQAWQuMhcVQAVQAf0UQObqpzU+4VEBVAAVQOYic1EBVAAV0E8BZK5+WuMTHhVABVABZC4yFxVABVAB/RRA5uqnNT7hUQFUABVA5iJzUQFUABXQTwFkrn5a4xPePgrwRTF8R/qA/x4Qvj3DC6J9Ko41HVUBZC4yFxVQWQFubNn/dMyxh/q//p8/Of4nFVgW5yvlUbsinmATBZC5Kvc3m9gNVrOeArlpAvuZj/nenTqxy9FPpU7tpDe53KsD3ORivZ/g97ZSAJmLzEUFVFMgPafbuZXxvhrmJpRyBxYd/VRuqpA7sOj+wE9vcGVnFmwFF6zsiAogc1XrbyPqi1/aRQFBjF2ed/RT4TvTfBkmcGvMnSbkeyp8pRz4Z9yxi0qe3mkXQXqwZ42sADJ3ZF2wY6ACjSvAV8rBhxOOPVTi/PZ8oWZR3GRpnCsxF7AriNEbc45+KnoNh6tqjWtrvTORuchcVKAlBWDq4L0AtZnNHN0zGBA15k6Hce7AX/KsDsduKvhIAlfVBjSx2wdk7r7+YLe2x/q2rkDm6B5qM+t+L5A7cOgSGTep5Oinsgfvx9x8TyVzVC+1mfW8E+QmlVovAF7BdAogc5G5qEBTChQqifPbHXuo4MMjD1rrMRemeg8qutb46Z/c2Rm4qtaU+INeHZC5tlPQdE2OBW5dAb4shpemHf1U7PJ8vs6WB26iNM49ZOg4t3p3fkzZ/2TM2UenTulqvTx4BRMpgONcfEigAsoU4CaUvK+GnVuZ9Jxuma4uz1xYVSuKkZuzAO6FfD1wy1wfD5lUAWSusv5m0mbGYqulQPbwAvO9m/3Ml9vrkFDvytwEuXHuwK8S8ztgguKhJC/iXjVbdEZkri2aeaCH44dWFEie0enoo/1Px7ixo/OxxtxDR5+xhYW4X1nPqiA3EVfVrN8fkbnWb+NWKIO/rSoA8wA3Sd61N+b4YkMxa2rMPWx05sKq2pSi6xPYMZxt7HxsF/MqgMxF5qICoygAMWueiTr6aEW7yBQxF6Z3x5T9z0adO+nUXFxVG6VFzAvcfE8FmWvl1jW1aRJS+Nx0gf3cy6x3Zw9vaMQ6UOwac5X8CkbTt0mralfgqpplOyYy17JNO9D58UPTCtRi1rwCMWuUXoQbL62hKffATZwHbr+h+1PVuA1K74vnE64AMheZiwqMpIAgxq7gazFrSg1N4A7p6sDcPVRzscTSx/ZQWxjva6EmWD+kGPgvaQogc0fqb2be5UKahZmxPBCz5u9SzJrz9sWsUVoRblzZsYfKzOxV+sPq+bmpUhze7zzZOrsqmrss/spwBZC5yFxUYD8FIGbN+wHqFzYzq0lcVnt1i8zN91S4sWXfcxHnDjp9otzmC8MhggVQpAAyd7/+pkg7PNl6CtRi1qweIWaN0srWmHtES+DmS2L49oyjn4pfWneTsdKC4fnGKoDMReaiApIChUriAilmzUNJVQItcmOluYUjW2Iu0KFQSVzY5uinQvfiqpoVbBWZa4VWNPa5bYG7NxKzRmk1gbm7qcxRLTNXWl1IH78v64/SkuD5RCmAzEXm2l0BiFmzUopZM1vNadMac1ubFB4MC8hu+aWX+RpX1cxtschcc7ff4D6Jn5tQIDtDilmzdvSYNUovzo+Rxrn7J49QepEh53Pjyr4XIs5tdFrVx8OQu+C/miqAzEXm2leB5DwpZs1TDcWsUdoPgbm7qCEJe5ReZPj5sKp2J4TujV+Cq2qmNF1krimbbXhXxG8UKbAvZs0NjcasUXT9avwEYO4x+yVJU3qRkc8vVOIXSatqS9N8U/s1Rr4suqXrogAyF5lrOwUgZs2zUafCmDVKOcVXyo4+WhPmVlfVZkurai9GuPGK9yUrrQuer6ICyFzbEUdF6zHjpSBmzRdSzBqNoyZWmZs+VoNx7t7hWPZggf3Kw67z5vbPLmzGdrFPmZG5yFwbKZA+sdu5jfa+3EzMGqVQ4CtlZx+dPk5D5sJetfEl78uS08UJajpdKK0snt+4AshcGxGncbOw3pm8IMaulGLW3KHTHGiNucdrjkK+LIbullbVFrTlC2jPpCuAzCW9hayHP/1rBDFrHmk1Zo3SYgNzd9JpfYafghj/cx6ioOn1RFGqBp4/oAAyF5lrcQVyB0HMGnqTq8WYNQN9psEPNebq6EgL0X63075/R7hxo6dra7AWeJrqCiBzLU4c1S3GXBfMHNNDbWbdqwPc5KLOJQfm7tB780L2EIH51sN+7h01LbHOauDtBhRA5iJzLapANTRMNY15xYBxHy+Wndvp9BzN53MHOnP1g7SVOURtYbRevhtyX/y3QQWQuRYlzl53ogbtwGKnwbLSUlhWil1m2GatGnONCH0L1b8v5einEhc0H3PdYiZBTnWQuchcqylQHeg5tzLGBiUA5m6jUycZlMRXEGOXSatqSzINJocnh0rWLgky12rEsba9jlq77IwC/YPbpUHMmlFvPeQEviw6tzKpkw1irvSikzq5y7mD9q2IcmMNmF0ZIgj+W1UAmYvMtY4CyXkdjl2U/8kYP8Z4xNSYO9dI5uZ7KtlDC8x66SE0Re9VRITsiAogc61DnBEb2CZfQsyaxTlHPxW9PscLzaTpVV0oQpgLe9UmlDxvhKjfWO2CP6iunoUviMxF5ppeAcjVuAJi1qRO6ySnr/JlkfqDSZ1i8Di3KggvloMPJh17qMS57eRIZM+SIHNNTxx7Gu5ArSHOyxde5jtPVuOYNQN3bPADMHcLkzqVmMeAIMYWwu7nyC1ZXFVrsBG1OA2Zi8w1sQJ6xqxR2v34kkj9ziRPJ4a51VW1uV3OPtr/NBFT3koltcb5yFwTE8caJthcLSBmjTRqC/81Q2bcbmDub2zyDLKYC6tqh0uuHR/7criqZoQbOzIXmWs+BfhKOfAPKWbNueT6/ANzf2WT84hjLqyqTSx53gpSm1mdY1A093y12K+QueYjjsVMUGl1IGbNf6SYNSqlMVdagAbPB+ZuZpPzOho8X+fTYFXtYXhuJc8htIQ6C6Lb7ZC5yFwzKQAxa35l3e8G9Y9Zo7RP1ph7JrlEg/mZqzlYVVusVVI4paLZ4XxkrpmIYweLrFvHQiWxABIvBv+W5EXjtzzULefeKUK+KFK/sMmzyGVutQqp06Tkx8tjvBGRgEaV0XonIHORuSZQAIK23CWlQrjUsJg1Sjs/XxTpTS5TvLlnZxboDS7Xh/7cQbhXTfPugMzVXGKlfRXPH6IAxKx5LUT9YXDMmiGlGvVfYO5GV2I+6ePcakW4SSX3u0HqFzZzZO+oVcMTWlEAmYvMJVoBGIL96HZ96stNFVoxdP1/C8z92ZWYb5p9X+AN8mjCsZtKEjwHrX87qn5HZC7RxFG9vc11wVrMmuWmdOAH5m5wmWuvLS+I0etgVS16AylhK8xlsY2UFpmLzCVRASlmTRY6/yKzdn5ekJh7vmnGuQO8SJ7R6dhFBR6P46ragCYqfkDmkkgcFRvYjJfixu2NWUNOsIK93giN6wnM/ckNmRqU/9bwn2Rm9tIbXe73DcgjZ3jdtS4AMheZS5YCELPmSylmzaEFra1f0+sDc390Jy5s0/Qu2l2cmyzlS97oyszEVTU1+wgyV001tesANrly6qQu53ba+1KYm1Aye5WBuT+4EwvMytx8TwVW1R6PO3ZRBEaNMK95IHORuUQosC9mze2ExqxR2sl5QWTWu+MXmZi5gF1BjN4gBYO/jiMkGLzShiDtfGQuEcQhzSx0Lk/NS2kPBZ5VBYu0SI25F5ubuVVLSJ7Z4dhNBR5N4Kpa610DmWuRHt66KRh1BYhZ84Gf3ujKkB2zRqk+wNzvPPFL8kp/SOb5mSN7qV+kSBeTTD/tY6zCyFxkrpEKVGPWeN4xQcwaxR1VEJlvPfFLLcLcfE8ld1DR9aGf3uDKzjT38qbiplTV8wSZayRxjG17g+8uiLWYNQ+aI2aNYrkEkfnaUsytrqr5l8cchKWeU9w0qjJU6d2RuchcAxSAmDV3myxmjdKulRdE9itP7DLrjHOrCgykWI5djatqzfQdZG4zqinufoY+V0krLSQpeF2KWXNCN2llU7M8gsiu88au4NW8JjGGlDynw7GHCj6cMEVcTaKaAJmLzNVVgVrMmk/MF7NGcb8VRPZLb+xKazI331PJzOqlNrOet4LcRFxVU9CJkLkKxFLc64gZlRBScnA52kX5zRmzRrGGgsh+4Y0ttCxzYVVtStH1sY/+wZ09HFfVGiUJMrdRpRR3OQTuIAVgEvDmaswa20wCCiL7uTd2lZWZC6tqY8r+p2POPjo1twv7SCMKIHORuZorADFr/hV17qRTZo5Z00h32u8cQWTX+mJXc/t9Oeg5ZJnv4YF6CzxQYVAviJapl0YVQeZqThyNWs4sl4WYNeu8zLeerMlj1igWXBBda33Ra63P3KoyiXPbYVXNqp5/6j0skbnIXA0VSJ0sxax5McKNt98yS6Hi+tQXvc4uzIVVtWN6qN9YzxshC4QoUvyIbRjKyFwNiaNds5F/ZYhZcxXv6KfCf7FIzBrFmhcqro990UU5xT9suPcSeGVYVVvrY9a7bfda03CrIXORueorADFrlsUduymzZGDUBF6Fiusjf/R6ezE331Phxkoh53fQqZNxVW2EzoXMHUEUTXpgw49Bs98dRjofSjFrbJ5BtlBxrfFHb7Qdc8GZoSiGl2RgVe2yPK6qDenRyFxkrpoKpI+VZvTeDnIYfaqn4vrQH7nJjswFyhQqiQvaHf1U6L4UX0Znhn29DJm7T4shjyP8V5kCghhf0Obop4IPWDRmjfI3Ffd/ApHFWWUyKr8LyddPH9dDbWG8K3FVbR9nkLn7tCDZdgkvG8SsuSfl6Kfif8Z3yX0W5X4/ELnZ1syFvWrTBPZzyVnwEIFwM9aneMjcfT1EH8WtdxeIWfNGiNrCpI+3dMwa5SNQ9+pA5Fa7MxdW1caVff+OOLfT6TloIRVkLjK3JQUgKfdPbpcdYtY0x9zbkLlgYHxJDN8hRe+0/ZsQMrcl4lhv0KqoRsmzIGZN4Ik4P6as6Ic2OdnzTjC8JGOTyo5ezUKlOuMfujtt51U1ZC4ytxkFBrbYRzEdbP3xr+ftYPgvyNz9DCx9QrdzK+N9OWzHrYmSqSBz9zOI0Z/V9TuYfX4L03PPRSBmzSno9C5nP55VwfBfkblDJcpNhxAc7Fee7MF2XFVD5g41CPugs7maZg+RYtZ8Y7+YNcoft8DcO9LN6WztX3HjS94XI86tTHq27VbVkLnIXAUKVGPW+F6wZcyaJpj7Rii8FJk7soHxJTG0VFpVu6gtXxj5HEs+eJC5NmrsViwYYtZczUHMmiV2jVnTBHNfD4XuQubW72KCGL8kD0Z1Z5ov2WWvGjK3vkEo72OtQI3k32LMmuZax7syFLobmTtKF0vP7nZuo+HlaZwtvF+QuaMYRHOdzUq/gpg1a/z0z66MzWPWKH8Ge1eGQ/emrGQMGtUle4jAfO1hv/Tmpll/VQ2Zi8yVU6AWs+YtjFkjp1I9EnlfCYfuQ+Y2JB03oeR9NQyralbfzYjMbcgg6nUqK38viPGLIGZN6P4UL9ripU/11vS+FA7dj8xttItB1I57IWpH4kIrr6ohcxs1CNU7JMkXHLD++CUYs6Z5C/G+GAk+kCS5oYkrmyDGL5VW1W637FItMrf5HkWcvSqfcByxChCz5k2MWaOCYfheiAT/hsxVrGT6xG7nDtr3XIQba8EXLGSuYoMYkVOW+RJi1mxwuT725aYULVMpoyriez4SfAiZ20wXg1W17zzsZ77cVKutqiFzmzEIo/qw1veFmDW7qcA/MWaNOlbhey4SfDihdatZ9fqwqvaa9L51bI+V6ojMVad3md0mIGbNrVlHPxW9luMFu3ina91qvhXR4CPI3Oa7GKwr3J9y7KES57Vr3Vi6XR+Z27xB6NZIWt+oFlJ6J52aizFr1LQH34po4B/I3NYkFcTYFbyjn4rcluWLVhgNIHNbMwiVlq20pqrM9SFmzVce5mtPFlOnqN2a/meigWVxGfHxUIMKpOZ2OXfS/mejFojUjMy1NXPBlHdI2y7Hlxq0fjytcQX8T8cCjyFz1eli2cMKzPdSRhKTr+4ic9UxiMb7ISFnYswaHRrC/2Qs8DgyV7UuBl6Mq4LUr2zmaBOvqiFzVTMIHfqwWreAmDWPxR27qeQ5HWpdE68zXAH/8ljgCWSuml2MF8vBh5KwqjbfrKaLzFXTIIb3OgK/qcWs2eDKHNFLYPGsVKTAE3H/8piVakREXQQxtlBaVbvZlKtqyFx7MTd9XA/1O+NZhTFr9Gj3wONx/5PIXE2kTp3S5eyj/U/GTLeqhszVxCCIGA4MWYUXxPjFUsya+zBmjU6NHngs7n8amauV2tkZBfont2uNP3eQmfZMInO1MgiisMuL5dB9ELEJY9bo2S6BZXH/M1E972i3e3GTSp53gtRmNnOUaSbKkLnWZy7Y5aog9TuTPs7Eq71mpEngHwnfCmSutl2Mr5SDjyRgQfgsc6yqIXO1NQjDSZE5QopZ85EfY9bo3xbBR5C5evQvXhCj10CyvuiNOfJ3riNz9bAJ/Xt79Y7Js6WYNY/H+YoFY+IZpWrj9w0+nPA9F2n8fDyzFQWSp3c6dkkRmsi2dmSuNZnLl8TIbVLMmmswZo1hTRx8KOl7Hpmrn/7ZmQV6g8v9gT93ILmrashc/QyilWe4ot9y40u+5yPOHRizxuDGDf4t6XsBmatrK3CTi+7VAXoTue7nyFxdDUIROps7uRqzhv0KY9YY37LBB5LeF5G5ejcEbLNcJm2znEfiqhoyV2+DaI6kDf6qFrPm+QiHMWuGuCcb8W/o/pT3pXCDbYenqagAXxa9r4UO+O8BBC4dI3MtwtyBpVsIM1qyQphRFXugUZcK3ZfyvoLM1buL8UUxvDTt+F/OP/3fDmSu3uob1dl0vi+8TD0uvUydTeLLlM5qkHO70L0p70pkrq69nq+U/ctjzp00OO30UwSmU8Nxrq4GoQUOIGbNR34aY9YYMXsg36Chu9PelSH5c/CoigpwE2D7D73JlZ1RyB1YROaanm4qGodal8KYNWopqcV1QnelPa8jc3Xq+LkpRfYLL/uFtzqfwE2WmDuNuLTBOM7VySDU79KCGL8k7+inQhizhrwRbrW5w0vTnjeQuXp0MYh3s8nleTM0sHpcY+50ZC6p3UN9JmpZ030xay5uy2OaXi2lbsUwwnekPauCrVwBf9uIAunZ3ZAtbXls8H5LblLJ0U9lD0bmkto9GmlaQs7BmDWENMSoxQj/NYPMHVWlFk9IngNrZeE700OyAiNz9Xi/aLHxTPHzWsyaNRizxgQWFf5LxvM2jnM1aylBjF0FCSNiC/nhb3vcRGmcS142a5zP1cwgNBjRwyN9NxV4DGPWmKPVwksynneQuZo0Vs0Jt79uTj9kria6m2Jkqkoh+ZIYXpKBR/rVGLPGNLYUuS3rXh1QxQDwIoMVGHDCTc/uHvz94M/cBGmce2hh8JckfMZxrgk6MMSseQFj1pigpYZ06cityFz1W22wE+4QwQf/W2PuYchcDd64Bwttvc/ZQwTmaw/GrDFjy0Zuzrrfx3Gumtgd4oQrYxU15h6OzEXmKlEAYtbspH3/jnDjMOi4ml1Xpq+qeCiyOOv+DzJXtYYb7oQr01jceGluAZkroxEeGqwAxKy5FtKNRG7NDnGCGXwafiZZgchNOdeHfpJLaKKyjeiEK1P+GnNn4DhXyShPRlBrH+LHlAP/lGLWmCStnrWbo+naRW/Mudb48wXVBnpNl8TsP6znhCtTL2DuHio7E5mLzB1NAYhZ87EPYtbMNE36aBnTt/Oh6PU510fI3NYeObJOuDLWxY0rO/ZQBHYi9FtozSBGA6iMTYx4KH18N7WFgW3jE0sjnoBfmkiB6KKc62MfjnObbrJRnXBlrlxj7hHEDVyQucQwdyBmzb0pvoxBx4lplxYeq9HrONenyNwmm7IRJ1w55o6VxrlHInNbsGAZfc1+CGLW3J9y9FPxizBmTZNdlEAbiF7Ludb6hm9LJbCopBWpQSdcmWJzY8uO3VTmKGQuMneYAhCz5q0g9RubPrZHxobwkOkUiF3NscjcYQY/ajs27oQrcyl+jMTcWchc5Q0gI6sFDmWO7KV/drkwZo0VDSN2Fc9+7sVxrqJ+qsgJV+bKwNxdVOZo4sYxOJ9r5JtsYr4Us2YZxqwxshVk+m2Lh2ILefYLZK6CxlXqhCvTQDXmHoPMteJwRqbh6x3CmDX1lLHS97ErefZLZG6jzG3CCVfGWvhK2dFHZ5C5MhrZ51AtZs12OnVyl31qbcOaxq7g2XXI3AaY26wTroxRVZmbPg7HubYf52YPLTDfeNh13ix50ZRlLBgPNaFA7LI8+5UH53PlpWvFCVfmynyl7Oyj08fXDfYo81tND+F8bgMPYfWeE6lTpJg1z2HMGl1l17QLyVw8fmme+RqZK9fWLTrhyogPzN1Jp09A5qrHLxm5CTwEMWuuk2LW3IIxa+Q6IYFt13SRgLnfInPrNnfrTrgyTVNjbv2g5jK/1fQQjnPrGoSKukPMmifijl1UEmPW2OmhG78kz3zn4TEx80iNrooTrkwn5cWycwctk0hC5reaHkLmas7c3FTB9YmP/slNYLgNTW0LLx6/uI1Z70bmDrcEtZxwh1954Btg7nY6PQfnFkZ64g3IZL0PtZg1b2DMGs2fbQQaT/wiZO4I7a6iE65MowNzt9Gpk4hzDcJx7gg2IdOQCg4JYvzPeUc/FboHY9ZoJjLZj/DEgjb6Bxzn7tf66jrhyvRHYO5WhkB3TGTufgYh04SKDvFiOfhAEmLWLMCYNZoorKg5jDo5cWEb/SMyd68BaOCEK9OyfFkE5s7FcS7ZAxOZJmz8EMSseRtj1uztaTZo8Xq2kbignf4JmQuWoJETbj3l4Y7IXBl1rHQIYtZsdLk+9OemFK1UL6xLEwokzm+nN7hwDU07J1yZRuHLIvUHkzq1U+YcQw7h3IKawzGMWWOIERN708S5EnOLto5Ar6kTrkzT8yWR2sKkTkPmWvRNE2LW/CXj6KdiV/E4rpHpCbY6lJjfTv/ssnPaZq2dcGXMCZj7O5M8HZlrReZy40veFyNOjFljxcaV6dWjHkrM76A32pe5OjjhyjQBMPdXNjkPmWu5bgkxa76VYtYcLMhYAB6yoQLJczroTTZlrj5OuDJGBczdzCbndcicY8ghnM9taT43dWqncyft+1eUG1c2pP3wpiQrkDyrg/qFteHcgm5OuDKtX2Pumchcq4xzIWbNIilmzc0Ys6al55ZMtzH7oeSZHdRmli/ZaQ1NXydcGQvhiyL1C5s8G5lrCebyY8r+5TGIWUPeU1TGCvGQzgok59mLufo74co0KF8U6U2u5DnIXPMztxaz5kd3dmZBpsnxECqQnNdJ/WqXca4hTrgyNgbM3ehKzG+XOceQQzifq+y9OH1CN/UH43kdY9Yo080Q4zb8pskzOqnfbMFco5xwZZoYmLvBlTgXmWveca4gxi+VYtbcnebLdpqhM2+TGV3y5Omd1O+M5edzDXTClWOuIDH3fGSu0d1AppFkDkHMmgchZk0CY9aYswVlGle7Q6lTO6ktjLWf0MY64cq0HS+I9E/uxAXIXBP2WG5y0fNOkPqVJTBvs4zN4SHDFUid0kX9YWXmGu6EK9PEwNwf3DBIIow5OJ87yrxk5iiIWeP+wJ87CGPWjKIVacZteHlSc7ucWy3LXBKccGWamBdE5ns3BFNF5pImQd3yFCqJ+e2OPVTg0QRfwS0PCFzFCliWucQ44dbtvD0VYO56d/xiZC5hz5x6bQYxa26XYtYsxJg1illTT1W7fZ862YLjXKKccGUsCpj7nSd+SV7mHEMO4dzCCEDhJpS8L4UhZg15yZQMsRK8aXMKpE7qcm6jedE6L0mkOeHKtYsgMt944pcic4kf50LMmu887JfeLMasIb6x5LocAYVPn9jt3G4d5hLohCtnAILIfO2JXYbMJaAnyLQTxKzpo30rMGbNCMN/Gd3w0IgKpOdYh7lkOuGOKHvtS0Fk13ljlyNzSWWuFLMm5+inIosxZg0CVx0FwJVqB22BBdiaE+6qIDe+JIc5onp3lblX8qQVGOdzoXfti1lDXrRN0iwGy9O4AlX3VbMzl2QnXLm2EET2C29sITKXqCehVBiIWfOpj8aYNeQ1jVyPMkNp0yd0O3eae5xLuBOunIUIIvu5N3YVMpewrpKeDTFrvK+FuAnmeWkiTEM5u7d3UdPHdzv7TMtcMzjhytmeILJrfdFrOLlzjLBPG88tDAe6xkwAACAASURBVMSsuQtj1qgzfUmacRtenvRxPSZlrlmccOWauFBxfeqLXofMNeLBMrxhIGbN3/bGrCkgcVABTRRIH9vjMOE410xOuDI8KVRcn/iii5C5MhrpdYibXHS/izFrNKHM8Mebnb/JHGM+5prMCVcGGoWK6yN/9PocaRZou7kFiFmzyeX+TwBj1pBmi9YrDzB3F8WPMc0+NPM54cozd40/eiMyV0YjrQ8VKolzpZg1/8CYNTjI1UOBzNFmYu4+J1yrrCe7PvRHFiNztQZrnetDzJq/YswaPUBjveFq0zUC5u42xzjXrE64dfp7tcnc/wlEFmebbj6NfmiLuQWIWfNy2LmNTp/YrZGOeFlUYLgCmVm9jt0UN5b0uQUTO+HKM/e9QOQWZK6sRsOttvVvsodJMWu+wJg1OMjVW4HMUcQz1+xOuLI8ca8ORG5D5spq1Dphh1whddremDXEjzWGlBz/tYACmSN7HXvIHedawQlXlieed4LhJRnSDMmycwsQs+b6asyaHF/ENL16D/FIM3RDypM5QmLuOBLnFizihCvP3LeD4duRubIaqdUxIGbNkzHHLiqJMWt0EVythrPYdTIzCWWudZxwZc3bsyoY/isyV1YjVbpcbprgWuujf3BnZxRUuSBeBBVoTgEymWspJ1xZnnjeDIXvTDfXdtr9ympzC+DyspXxrsSYNTiZYLwC2ZkFmM8lKeas9ZxwZeDoeT0UWorMlX0uycg3+iFBjF2Wd/RToaUYs8Z43IzeXtpZAjFXzs4oOPoJYq4lnXBlLM27MhS6G5mrTX/gK+XgQ0nHHipxYVseY9ZoI7KMceOhERXIHi4xl4xtXVZ1wh1R+eqX3lfDoXtTMicYcsgKcwsQs2Z1gNrMZo7pMUREvCkqMKIC2cPIYO6AE+5VfF6wkQ+P95Vw6D5krtpDsMwsKWbN+xizBucTiFOABOZa3gl3xKdd9UvvS+HgA0mZEww5ZOZxbqGSOA9i1gQfwZg1xOHGEGsm7abZQw0e59rBCVem0X0vRIIPInNVGudCzJo70o5+KnYlz9vpdUnGwvAQaQpkDxFgDc2g+VybOOHKNLrv+UjwIWSuGszFmDUydoaHyFGgxtyJBqTas48Trkxz+56LBB9OyJxgyCHzzS1AzJr1bvYLb266YIhkeFNUoEEFjGKurZxwZdrCtyIafASZ29o4N3k6xKzxPxslPz6ejCngIZsokD1YmluYpOs4125OuDK25H82GngUmdssc/miGL1BillzE8aswRUzcyigP3Nt6IQrx9ynY4FlcZkTDDlkjrkFbmzZ/1TM0Ucn53UaIhPeFBVoQoHcdGmcO7nYxG8V/8SuTrgyQvmfjAUeR+YqH+fmpgnsWh/zPcasMcfgTqYP2O1QbppOzLWzE66MUfmXxwJPIHMVMndvzJqwUQ43Mi2Kh1ABeQWqzM0dqO041+ZOuDJNEHgi7l8ekznBkEMEzy0IYuxyiFkTxpg1Ch9UhlgS3nS4ArmpMM7VlLnohDtc9oFvAo/H/U8icxvDx76YNRe0Y8yaARvCD+ZSIDelCMw9SKtxLjrhyttDYFnc/zQytwHm5g7cG7PmaIxZg3O4JlagNregDXPRCVceuPmeSuDRhP/Z6Kin6XwCcXMLmVm91C+s+/2Apm9kOquMt7OhArkpRd9z0QP+e4D/mSintusCOuE2YlHBRxK+FchcmXHuQMyav2PMGhMP7hrpDNY+h6+Uo4s4Rx/t+sgfvyTPfuZz7qDjl+b5sjpxFNEJt0H7CT6c8D0XafBk3U4jZZwLMWvulGLWXGGvEJ+6tTTeSAcFeEFMndZJ/+CmfmcSF7TzJYAsX4bVYOdO2vWpr9UQz+iEKzNoG3Yo+FDS9zwyd5gu+Z4KxKx5JezcyqTndOvQMfAWqIAWCmQPK3hfC1U9bYbnQMsdWAw8Hnf0U4F/JLimdgOjE67SVgs+mPS9gMwdxtzs4VLMms8xZg3OJ5hVAW5CKXRPytFPeV8NZw+pH3qpUEkf18N+4XVup+N/VjbVgE64SoGb76kEH0h6Xwo38UNNf2Lw3ELy9E5HHw2LDGPLmtYTL44KaKEAXxbjC9qoPxhmvTs1t6uRUM68WI5dycNUwye+TGOeOeiE21zbhe5LeV9B5u4d50LMmhsxZo1ZR3bN9QFL/apQSR/b4/rU5+yjo9dwfEXZoAGmGp6AqYbg3xOcbIBddMJt2mxC96a8ryJzJeZCzJqnpZg1Z2DMGsSu+RTITSn6n4zB5OyyePNOjYVK+vhu9kuvcxsdv7ituuA2hC/ohDtEEEX/hu5Oe1eGFP1Eh5MNmFuAmDWfSTFrDi/oUEO8BSqgogLgB3ZDzrGLcn3oz8zqbf3KMNWwkHdKjmVDLohOuC3KG1qa9rxue+am53Q7tzLeVzFmjfkGdy12ALP/nBfE5Bmd9E9u6lc2cV7ND0ytSuUOKvqXw8A5+FCyOtVQc8JdmuaL6nj1qlVUE10nfGfa86admYsxa/bOZZvIarGoVQWyhxc8b0p+YH/NcOOUTd02qmGhkp7dza7zOrcx/ieAv7Gr0Fe9paFJ+K8Zz6pgo/rr1T11mluAmDUPJxx7qMT5GLOmJTMizYAsXx7wA7tP8gN7SdYPTKUey40re94IHfD//Q/me3fmKBXmLizfQDIVDN+e8bxtS+ZCzJr3AtRmtkHPGBkR8RAqoJsC4Ad2Sd65lWG+9aRO7soLmr/jDzjhJuZ3QGKUfir4tyRGjm66xcNLMp537MfczNE91GbW/R7GrMHhrXkUEETwKPjM59xJxxbySv3AmmPEUCdcQUzP7ma+9ji3MokFI3s1NHcj+/wqclvWvTpAWn21nFsoVBLntzv2UMGHMWaNeXCj0jsyaYbeeHlyUwX/M9HaJl2144HVK0Y9J1xwk7gGwuW4P/BnjsSpBmX9KHJL1v2ebZjLl/fGrLk8r8NLWT1Txu9RgcYV4MeUI4tzjt2U+/2AnnOpozrhgjuw9BgIPoBTDQqwG1mcdf/HHsyFmDWvYswaBcbROBfwTC0UAD+weR30Bhe1mU3Mb9fTPatRJ1xBTM/pZr7xUH/si1imhRRWumZkcc71oZ+0Gqk/twAxa753s5/5ctPqB/uw/QssaXZg5/JkZxY8bwUde6jwEs38wOoYvFInXJhquI5z7JJG4kfgVMMow5rojTnXGj9pyb1UZm7yDClmzdMxjFljZ4qZpe7cxFLwwaSjn/K9EMkerO8QoYVIuJCBYgXMOIfuS6FXg4yxRa/PuT6yNHNzU4oH/PcA78thPV/NZBTHQ6hAPQXAD+zSvHMbzX7lSZ/YrfOSgwqRcAUxfWI3852H2sLApjjcqzbSm0R0Eef6xGflcW7uoOKf/o/D8b+c8Uvy9Wwdv0cFDFZA8sGCyDI76NgVPC9qs6lsJARUKz7ghJue3WqEfikJkLTotzqQmYlTDUOnGqLXca5Prc3cAyGzdPRaztFPxS9F7A61AINZU58C9ilYbppQfSsPPtxksoYWtRrqhKtGo+SmCr7nIjDVcC9ONezX6aLXcOxan84vMaNaiJrzuTmJublpQuLCNsTuqNLjCXoqwI0tR27Jgh/Y6kDGoNWnek64KuggiKmTu5j1Uh62c3GqoUbe2FU8+7nXyszlJsM4Nzcd1iISF7RDkI7LcbS734NXhd6lxsjIVsXgi2LyrA56o4ve5Eqe3WHU1OeoTritN0otzuRuyv1uMDsTA6VWYgt59gtrM3dSydFPDaz/Js6TsHsF37ox4RVQgeYUyMzsdb8LfmCRW7MG+tI06oSrxgMV5k+el6Ya7k4PT4XZnIwm/VXsSp5dZ23mTpSYOygHX+JcCbsLEbs42tVbAW5SKfiQ5Af2XMRYV3GlTrgqAE4QU3O7mO+lUL/zDRvaq1CR1h5CscvztmMuTDLM34vdgt69zvAmxwIYogBkXrg879xOs+u84BugfTywutVswQm37jUbxhBfKUduAq8GzzvB7Aw7TjXELsszX3uMNICRGkvNNTRugjTOPXRo61af87GrOdIc5Vo3a7wCWQpIG2Qh7Pd2OnZZXn8/sMFqqOCEO1KPHXyLRj7npgu+F6SphqW2m2qIX5pnvrEDcw8bytx8TyV5dge4kV2D2MXBvlYKAFz+DXCBmLOymXQbQVWL56johNtiSeDn0lQD/aOb2swmz7HRVEP8kjzznYc38EVnpKemBuPcOpklk2dJ2L0OsasVdFTonCOZCPmX5caWw0syjj3wEk3C1gAtnHBbbwWYalicA5XeCmbrdNLW70LUFeIXtzHr3ZZm7nhpbqH+zFHyTAm7izjSZliIMhQsTOMKgB/YOR3ULyz9syt5JhEjOA2dcNV4IuamC96Xwo5+KnxnWqvEbmqUs3EbkDkzvqCN+d7yzN1DyTsGJud1wiTD9TnEroyt4KFGFMgc2et+L+DYTUUWZ/kxem/hHbGEOjjhjnhfZV8KYupUKYHxZjZ5Vgdpw0BldZHle2JBG/2DtZk7ruzYQ436cgexx/qp6I2IXZxkaFIBbnIx+EgC4oGtiOam6hsPrH4n19MJt3UwQYD2m7Mw1bAqmB1pDab1Wxh+hcQF7fRPdmBuAxsrk6cDdiM3IXabhI7h1mxUAcAPbCHv3EGzn3vTJxjqB7Y/fA1wwt2/AM21SPZgwfuKNNWgXQ55NcrZXO0S57fTG1ykDeRVXUMbW3bsphpMapI6TcLu4ixOMjRnT7b7lSCmTupivoGcjPE/5/my5ll4G1XYUCfcRgtZH3y8IKZO64QcGb+wMCdO2Cp/KxVMnCsxl7BAl2oylx8jMXdWozHlUqd0wWj3ZsQujnZHUSB78F4n0/vJCp1FiBNuK2Cq/hamGm6VphreCGWHudi3fn1DrpCY305vdBkVYaNeldVm7i4qc3RPvZsN/z41t6u6Fx5Hu8PFwW/yPRVuXDn8F8kPbBVxm6nIcsKtP5Jt3JCyhwjeldJUw18yBoanaLzA8mcmz+mgN9mBuccoYG6+p1LFbnhJBrErb0B2O8oXxcS57dRmlt7gSs7rJO2dl0wn3NaNBNJxntFJ/+yiN5Iou6IKJs8GP0JLj3MrZUcfnT5WGXMBuyfDaDe8JENav1LUwHiyigpkZvW6P/A7doN/CyF+YINrR7gT7uCiNve5ts2kn/K+FsoOilrV3NWM+lXyzA5qM8uXiJn6l95FVJ1bqJSdfXT6OMXMBeyeJGH3dsTuKDObRpmvbvfNHVgMLIs7+in/07HclKJu9238RuZwwlVrquG1EGygWGLKqYbkPJsw94QmszylT+x27KbCd6RxtNt4/7fSmXylHLuKd/bR7FofPLmJDERnLifc1s0DphrmdULE959dyTOIm+GRr2ByXif1q+XHuTvpVjLrpedI2L0TsWuz0W413ut3kh/YxW0E+YHtP1o0qROuPJgaOQpTDX/JOPop78qwiaYakqd3Ur8zlp5bEMvOHS0xN99TSc/uduyiQksRu3bBLqyVvwxr5USnUDS5E24jYB31nOyhBc8boaqjEYGT7MPLnzqtk9pieeZup9MnNjm3MCBZ+gQJu3cjdi2OXW58KXxH2tFPed4IkRzpyjJOuANdrOkPMNVwphRUaIMrdRrpUw2pUzupPxjSXptUXUMTy85tdOqkrqZbdOCH6eMl7N6TwrndAU2s9IEviYnz26nfWPpHd/J0oruu9ZxwWzckcJr+qzTV8Ep4IP9h65dV/QqpuV3OrdZmbll0bmVSc1VgLkwyHNfj6KND96VIc69T3TLsdsHM0T2uNX7HLggvx1eIiAdWrwms6oRbr76Kvs8eVvCskvJ73kxKXLch5bcFc6k/mNQp6jAXsHushN37EbsWmWTIHVQMPC75gS0n1A9scKe1vBPu4Mo29xmmGs4Cfyz6J3fq1E7StjWlTpbGuSJZz3VV5xbKIrWFAen3X+1t5d/MMT3OPjr4QBJHu63IaPhv+Uo5ei3n6KNdn/gyxxDqBzZYJfs44Q6udXOfYarhTpiX974Uzk0nJbRm1evfuY02Ni3ecElVZW5JpH5nkqerydx8TwWwu5MO/g2xa8rRLoStOqWLWe+mtjCJBW2kOe4M7xJV5xnnTtq/PEb41MeIhTfqy+zhBc9b0lTDYlKmjNJzup3bLc/c39jkGSozF7B7tITdhxC7JsNu9tBCNWZK6K40N6FkFA4U3de2TriKVBrx5FqqpM2wNArrOkaHhYQNLDssz9zNbHJex4jt0eKXmVm9zh108O8JUwyUWqysBX7OTSiFlkrvmyvNExsQnXDVmBXkxtea3vdCxNiphuqmQdJeVlSdWyiKkMz5LE2YC6PdWb3O7XTwEcQu0aNd8ANb0EZtYZjv3alTuszi7YdOuOo+6bMzCp53gpCt7ibDphrSJ3Q7d9IWZy69yZU8RyvmAnaPAuwGHkXsEondAky+uz72Ofro6HUcabYuwxR0wpURp+lDEI1zfgf1KwtPXyOmGtLHdzv7LM/cja7EfA2ZC9g9ste5jQ4si+MkQ9OdQYsf5qYU/ctjjn4q8Hg8dxCJ8cDq1RqdcOspo8r3MNVwN8wy+Z6P5Kbp6tVQ9fEn7dmv8twCvcGVOLddlaaSuUjmiF7nVibwWJy0XX0yZbbwIfADW5Rz7KJca/ym8AMb3BbohDtYDe0+Z2cW3O/CVEP0Bv2mGjLHgIO/pZkriMDc8zVnLox2Z0rY/Sdi18hJhlr6wh/d1G9s4oJ20715oBOudpAdfuVa4o/fGWa9O3WyHl4NwNxdFGnheFQd5woi/aM7cWHbcLm1+CY7s0D9wYATJTkpYNVY9tVCKy2uCVs/X5cCWt+Z5sabww9ssA52i4Q7uO4GfgaHlntTMNXwXCQ3VduphszRNmAu8707vkAn5uZ7KtkZBWoL438SsavraBe6zT3QbbyvmCma6mDQoBPuYDX0/5yZ2eteHYCphkUaTjVkZvU6dlt9nMusd8cv1o+5gN3DJew+FSNth5/+dqzDHfmyGL+ojfpDej00YiVahTqiEy4Zb2Mw1XBeO/gUfueBALAabKDIHAXMJS2BscpzC8x3nvgleRU6hhKzAOz+zvifiSJ2NVS+AJHeXGt9zj46drWZ/MAGawJOuFJkAE09GgffET/LKwDvTPdJUw0roqqnv8sc2evYY2nm5gWR+cYTv1Rv5sJo97AC9RvrW4HY1WSSAfzAnpL8wJbFcweayQ9scIdHJ9zBahD1OXNEr/v9AIT3VNWtO3OExNxx1o0rlhdE9itP7DIDmAvYPbRA/cr6/oXYVRO7/Jhy9EbJD+xDf2ZWL1EdVVFh0AlXkVz6nwzbFy9oh2mrbzzpOepMNWRm2oG567yxK3j9G6x6x+whArWZ9T0XIc0jzyhBWrkvhEY9o5Pe4KJ+ZRPnms8PbHDd0Ql3sBokf+YmlIIPJB39lP8ZFaYasjMLMLdAmFONmvO5MM79whtbaBhzYbR7iED9wvqeR+y2NNqFzfJSCoDw7RmOsFczpchAJ1ylihl+fubIXvcHfthBfk1LKwfZGQVHv+WZ+5kvdpWRzK1il97k8r2A2G0GuwNrGt4XIybKql0PE+iEW08Zwr+vRkpybmWYrz3p2U1ONWQPtwFzXWt90Ws5w5sze7BAb3R5X0TsKsAu+IH9OQ9W/o0HEolq4Lujs2GgE67Ogqt+O5hq+Js01fBUM8mcaswlLHCzqnMLhYrrE190kfHMzfdUctMF+meX9+Uwzu2O3hMEMX1CN/u517mTji3kreByh064SrwtR7cQQ6+WOaoXkpb20bGrlBln9jBpnGtx5n7kj16fI6QJAbsbXN5XEbtyo93cVMH/bNTRTwUfSXCTzeoHNtjk0Al3sBrW+MyXxPiCNudWhl3nhamGgpxJD1Q5e6gdmLvGH72RFObCaHeahN2VYdLiXAyYhYEf+DHlyOKcYzflfj+QOdLEfmCDNUQn3MFqWOwzN7EUfEiaalgeayReaPYQAdbQJpIVDETVuYWeivsDf2QxQcwF7E4V6J/c3tdCiN2BHgh5q+Z10D+7qM1sYn6HZXIqoxPuQBNb+ENmVq/rIz/shxxtHswezH0/ELk5S1p7A3Z/cHveQOzCG1l2ZsHzNuRnDS8xvR/YYEtDJ9zBalj7M0w1XNzm3EazX3rTx9edasgeLI1zJ1l7nLs6ELmVOObCaHdKkfne7XkzRFrACz37BryaPQivZhCxf7q2YfT0rBc8SGYU6E0uz6qgWbIL66yPJW8H9vz3BKQmeWLkLen2YO67wfCSDJkNDNhd74ZuOZas/dc6yMWL5fileRgXfKXaxkodit3gLdAJt0GhLHla5uge1yc+cLm5cqhXQ266NM4lbGVY5flcz1vB8O2EMrc22v3O43nbTtgVxPTsbvZLr3MHHbtiqFFaoBOiE64FGrHFKtRcy7fT7Bfe9HE9A14NuWl2YO6qYPiOdIsKavrz3EFF5luP552g2be0NqJSbprg+5fkB/ZQkiNsVquR8o9yDjrhGuo2O0rr6F42blIp8A9pquHx2lRDbiowl7RIeGqPc98IhZcSzVwY7R5UZL7xuFcHLIxdbmw5ckvWsYdyrw5kjrCIH9jgTo5OuIPVwM8DCmSO6XF9Kk01XJ6v7oloxKts4Oc6fFCZud7XQqG7SWcuYPfAIvuVx/1egLSYQ603OfiBnd1Bb3LRm1zJs63jBzZYGXTCHawGfh6iAEw1XJp37qCZrz1/+t9OqzP31XDo3tQQCcj8l5tcZNd53e9bCrsQ+3l1wLGHityStepSITrhktmhSCtVZlYv/bPrgP8eoHr6iRZrqvY49+Vw6D5zMDffUwHsful1f+C3wGiXm1TbouP7VzQ3zVJ+YINNHJ1wB6uBn0dUgK+Uo4ukQPsf+TPH9Ix4joFfqs3cFyPBB5MG1kfprblJJfYLr+tDv3n9OnmxHLuCd+6Q/MObjXqnVDdDzkcnXENkN9FNIdD+6Z30j27qNzZxAaGB9lVmru/5SPAhMzEXRruTSuznXtcaE2JXENNzutmvPM5tdPzSvBXigdVf7EYnXBOxz5Ci1gLt91PhO9Ikv7mqzdznIsGHE4Yo3spNuYkldq3P9bHPRKPd3HTB93wE4oE9mCQtikcrbTHib9EJd0RZ8MuqAtzEUuh+SB7sfSlMfqB9tZm7Ihp8xHzMhdHuxJJrrc/1iQmwy40rh5dkHHsoz9vB7MyCxTueIMYW8o5+CvKPmD+MusUbq/5rikYVr7komCrQvsrM9T8TDSyLa6Sv1pflJpRcn/hca33EDhv5opiY30FtZumfXcl51vQDG9zK6IQ7WA38vJ8CgzdYDtv1u9+Zuj8J5O+uNnOfigUeMytzYbQ7oeT62McSiV1IzPd+wLGbiizO2SEuJTrhynddOx+FibXqBsuHE6bbYKk2c5fHAv80MXNr2F3jZz/3ktOW3ORi8BHY1Oh/Npqbalk/sMEQQSfcwWrg5wEFYIPlbdIGy3eDJt1gqTJzA/+M+5fHBgQy6QcY7X7oZ78wHrvgB7aQd+6k2c+96ROazH5qulZAJ1zTNZkOBa5NrP3C0htdybNMPLGmNnMfi/ufMj1zYbQ7vuT+wM9+6TUsRZggpk7qYr7xOLcy8T/n+bKog1mTcAt0wiWhFUgrQ+aogYk102+wVJu5y+L+Z6KkNVhz5QHsvh9g1xmA3ewhgvdF8AML3ZcykftaczoP/hU64Q5WAz9XQ6MEHpUm1p6xyMSayswNPpLwrbAIc2uj3fcC7Fce3cLBgR/Y7ZIf2KpgdobV/cD2X1BGJ1yE7GAF+Eo5djXn7KPZtT5IwGMVT0G1mftwwvdcZLBwZv/MjSu7VweYbzxaRyfiS2Li3HbqV5be4Eqe0clbxcIaMgB0wt3/8dOQaNb9CS+IqbldzHo39QcTv7jNYhNrajP3oaTveUsxF0a748qed4LMtxpiF1KZfuh37KKiN9rCD2wwU9AJd7Aa+Dl7aMG7MgwTa/dYc2JNbeY+mPS+aDXmAnbHlj1vB5nvPKrHhcsdWAwsi4Mf2FMx1S9OfgdGJ1zy20i3EnITSqG70rCF97VQ9jDLTqypzNzQfSnvy2HdGknPGwF2VwWZ9W61yDgwXeVa6xucxEnPShl7L3TCNVZ/cu4OW3gXtFFbGGa9O3WqxSfW1GbuvSnvq9Zkbm20+2aI+b5l7A6errrIatNVDfZkdMJtUCiLn1aopI+Tsun00dFrOb5i/ZzcajP37rT3tZCFrYQfU/a8EaJ/cDe9Hwz8wF6x8nRVI62PTriNqGT5c3JTiv6nYo5+KrCsljXS8lXO91RUZm54adrzhpWZm++p8GPK3tdC9E+KscuNL4XvhOkqz+tWnq4atdugE+6oEln+BH5MOXJTzrGbcn/gz8yyYI5UmRZUm7l3pD2rgjL3s8YhwO7KML3B1WAWHPADu6Cd+o2lf3SnTrP4dJV8E6MTrrw+lj8KOVLnddAbXNRmNjGf0FQOmraC2sy9PeN5y/rMhdFupex9VcLudNmgM4UKJH9eI/mBLcrZYbqqrr2iE651PWrrNvr+Vc7M7PW8HXTsocJLMtw460/djiiL2sxdknG/awvm1rD7cpj+2ZWrg93cQcXA45If2HI7+oENNjh0wh2shg0/78uR+nwke7DsMGV/TFtPK5WZG7k1614dsJ5M9WoEo90XI/RG1xAzgsyj13GOPtr1sQ8yjxYq9a5gh+/RCdcOrVyvjrUcqdtpdp03Pcc6W3jr1XfU79Vm7s1Z9/s2Ym51tOt7IUJvclUTMcG2xVO6mO/d1BYmsaCNL9klHlg9U+PGlzxvhkAfm4WPqCeIjb4XxPSJtRypscssniO18WZVm7mLc+4P/I3f3hpn8pWy7/kI9QubOrXTuzIE2xaXpm0VD6xeO6ITbj1lLP999mDB94JdcqQqak2VmRu9Meda47fhq3RuapFZ7/4f/+//cL8byB5q2W2LimwLnXAVyWWZFpdoMwAAGpxJREFUk/fFxnvLBjlSlc8+q83c63Ouj+zFXPADk7Yt0j+43asD1G8sMjffU0EnXMswtPGKQF84b29svHm29omUEU1t5i7iXJ/47DLOrfqBfeJz7N22yItl34ooYNe6ETpkjGngEDrhDkhhnw+Zo/f6RN5gu9h4ilpZbeZey7nW+iwTXVhGSti2uFzatvh4fHBoXV4s+5+JUr8z2cNtOcOATrjKXzZlzMwUh9AnUlEzqczc2FU8+5nFmQt+YNfnHLso1xp/5uie4XIDdp+KUVtsh110wh1uDNb+BvrCIskn8hNf+li7+0Q22NZqM3chz37hteo4lxfE5Omd9I9u6jc2cb7ctkW+LPqflLBrGwcpdMJtsMtZ4zTwiTytk/7BTf3OJC5En0gFDvhqM/cKnl1nTeZmDy943gA/sPAdaW58adSeA9hdHqP+YLIzrT/JgE64o9qDlU7Y1xeWNtQXrFT31uuiNnMvy7NfeSw2zoXw9femIHz9y+HqxocGdefLYuCfcedWJjPTypGT0Am3QXuwwGnQF+6T+sIryvqCBequVhVUZm780jzzjXWYC+HrL25zbmWY7zypuV1NPEsAu49J2D3CmthFJ1y1uiLh14G+cEke+sK3TfYFwiuoW/HUZu4leeY7jxVy1krh69m1PmcfHbuKbyUeGF8SA8vizm105kirYRedcHXrqEbeSBDTJ3Szn3udO+nYwpb6gpG1IMafRG3mXtzGrHebnbngB/a0muHrAbuPJpzb6cxR1sEuOuHagSC5aYJvRdTRTwUfSXCTi3aostZ1VJu5C9qY703MXH5MOXqjJuHr+ZIYfETCrgWi4qMTLjGDJu0AwY0tR27JQiqH1QHrvaJpp9uoV1aZuYkL2+gfTclc8AOb11kLX39uO19UPx4YYPfvCecO2tTJSNAJd9ROZfYTIJXD2R30Jhe9yZU8u0OLvmB2iVopv9rMPb+d3uAy3dxCdkbBs0oKX/8XbcPX80Ux+FDSuZMecTNFKw2pz2/RCVcfnQ28S+bIXvfqgGM3Fbkly421aSoHTfVXm7nnSszVYJCokQrg+3I/+L74XtApfD1g928Sdo8ZYQ+bRtVU5bLohKuKjMRehJtcDD6SgL6wItpgoj9i60JywdRm7vwOeqPLFC8j4PvyZ8n35RtP6qRm/MCablfA7gNJZx8NKSRMMjOITrhmaakmyslXyrGFvHMnzX7uTZ+AqRwUbCprQm2VmZs8B6aBSGfugO/LDsn3RTTgBYovijC+7qNhlzrx2EUnXPLbqMkSCmJqbhfzrce5lYlfkufL6i9jNFkw4jtF0/VSm7lndVCbWZKZm5tKiu8LYPc+CbvHEY1ddMJtuncR/sPsIYL3lTCkNbkvhWlNdGsstZk7T2IukUnA+DHlyGLJ9+U9UnxfeEEM3ZNy7KLSx3fr1uSKboROuIrkMsvJ3PhSeGna0U953gjZNOioceNotZl7Rif1G0ta4kXwfTmzg/7ZRf3CJs8hy/cFsHt3GrB7AmHYRSdc47qlduyGVA4XtlG/M/QP7tRpmMpB26nbEdtRbeae3kn9zhDF3MzMXs87kh/YkgyZvi+A3aUSdmeTgl10wh2xt5j7y0IlfWyPq5rWZBHXynZ2c+tg9KNUZeamTu2ktjCEzMRzE0vBvyXB9+Xfkdx0gWRD4QUxfGfasZtKzzEeu+iES7KpNFe2emlNmrsa/qoVBdRm7ild1B/GM5cXy7HL8s7tNLvOCxQTTLAaC9i9Q8LuiUZiF51wW+lOBP4WtrPfIJfWhMAyW7tIajN3bpdzq6HMFcT07G52nde5nY5dnueN8ANr2mIAu7dnHHso8Bc24g0InXANkV2jm+7bzv4rmzhPLq2JRgXAy46ogNrMPanLuY02inQQA+m5CMRAeijJTRo9lcOIihj7JWB3iYTdk/XGLjrhGtv06t49O7PgeUtaxrhd2+3s6hbbDldTmbnpE7ud2w1gLsRAujXr2EO53w2aPinDAHbn6odddMK1TG+HZYwHpWUMvbazW0Y6fSqiNnNndzt36MrcfTGQNrqSZ5HlB9Z8Ewpi9RECySm0n2RAJ1wdRNbhFrVljG00+5UnfaI5ljF0kIW0W2jA3J20bm4omSOsGwNJECM3Zx39VOoULbGLTrjaP9L06POCmJ6zdxnjCt6oyT09amr+9lKbuSd0O/v0YC43qRR82OoxkAQRNs71U6nTOrWwZnTC1UJV/a+Zmy74/m3uZQz9RTPwjmoz97gerZkLL1BX8M4dNPulNz3b6i9Qghi5Kefop5Knq4xddMI1sNepdWtuXLm64up52/zLGOYfwDbYrGoz99geh3bjXEFMn9jNfuVxbqPjl9omBpIgQrqgfip5hmrYRSfcBrsHsafBFt757dRmlt7gSs6zyjKGPbCrMnMzx/Q4dlH8GPWjI2YPFnwvSC9QDya5iab0A2u+Awti9HoJu/NUwC464TbfEGRAITOr1/2BH1I53JTToq+ZXR/Cy682c49Wn7n7XqDeCmZnFggXVKviCWJ0EQej3TM7WrkFOuG2op7hv80dWAwsizv6Kf9TsdwUzMJrQISa1m1AbebO6nXsVm2cyxf3f4Eywxbe1puk7hUKleh1EnbPahK76IRbV1syBrAyxeMr5ei1nLOPdn3qSx/Xky+YEjcyFbTPIbWZexQwV5XwXZmjet3vS7nwFuML1N4OVqhEr5Gwe7Zi7KITrkl7NS+IqVM7mfVuagsTX9BGSAApk4pJQrHVZu4RvY49FDeupflcbnIx8A/wA/M/E81NJToemAFNWKjErpawe07D2EUnXOKHsfUMKXtYwftaCFI53JXGVA71VDLX92ozd2ZLzN2XC+8zH6ROsPlkQj1SFCqxhbyjn0rMbx/V2tAJd1SJyDwBMlLfAxmpvSvD2UPtuoxRrwuY+XuVmZudWYBx7njlfgWCmDoZc+HtnUNowKRq2D1XDrvohEsmT+VLBRmpL26j/mCY9e7U3C4eRx4NdAd5SYk6qjZzZxQc/YqZC7nwXsJceAqAW7Wh2BXSaPe8kbGLTrhE9bSGCiOI6eO72bU+Zx8duxpTOSjuEQ2JbDTB1Wbu4RJzJzQ6zgU/sL9mIBfem5gLrxkLi12eh0mGC4ZiF51wTdH9BhcyN1XwPxN19FOBRxO5A9EPrJnuMFhPYj+rzdzDGmUubKQ5r536laV/cifPwFx4zVtY/FIJuxe2DRgZOuEOSGGKDxCJtJqR+v1A5qheU5QZC9m0Amoz99CGmJuZ1ev60O/YRUVvyOkWhKxpjcj/YQ27CwC76IRLfnsNlBAikZ7VQW+EjNSJ+biFt/mRx4Ck5H9Qm7mHCDCfW39v7r6NNE/iRho1LSx+CYx2q8Gqw0vTfNEEKeDI7x6alhAikb4LqRwit2VVcWnXtLR4cbUU0I+5sJHmmr0baY7FjTRqArdqDdHruAP+e0Dk1iz62KnVPTS6zr5IpP+KEp6RWiMF7HxZtZl7sDTO3T8XGWykmdsFG2n+wI006qN2wHxzU4qOfgq34Q8IQuAHiER6pW0ikRrtIUCgAeR7KiozNzddYu7kfauu4Af2quQHdk8KN9JoagTIXE3lbfXigpg6qYv5xuPcytgoEilid5gCajN3GjC36unCjS+Fl6ZhI81roexhuJFGwxFuFQfI3FaxOKx7qHXBfR7o96dkVjvUuh1eh2QF1GbuVIm504XEBe3U7wz9gzt1GvqBaU7bqoUhcwnsaTDyuANGHp5VwewMHHno1BcItISBIqnN3CnFP/1vJ/u519FHRxfhRhpdLQyZO2DWJHwAD/QL2qnfWPpHd/J0HHno2hdIMIB6ZVCfuQf89wD6Zxe6dtdTXLvvkbnaaavsyoVK5pge10eSB/oi9EBH2u6ngMrMBZ/8Y3vYL7zO7XT8kjxfQi/R/eRW1nUVTi8iczWVt8GL56YUA09AKofAE3H0IWlQNFudpj5z8z2VmkNMH+1a48cBr272hMzVTeoRbwQe6Ityjl2U6yN/5hj0QNdvtDFicxD7pSbMrdY2d1DR/2SsujkKvcR0sABkrg4ij3gLXhCTp3fSP7qp39jEBe34ejeiSvhlVQENmQs3EMT07G7mGw/1B5M4vx03pGpqdshcTeWtd/HsjIJnVdDRT4XvSDcTOVrhDFK9YuD3ZlFAY+ZK9iS9c3GOXZR7dcC+iXu171rIXJ17HTexFLpfSuXwUjh7CCaRwsmEhhTQg7nVnpCbKvj+HalldmoikYT2zNK5x6p+O2Su6pLWuyCkcrg079zKMN94Uid1YYCLekLh98MV0I+5cG8p8AL9g5vazCbP7sCkI8Pbo5VvkLmtqNfob6XpMvZLr3MHHbuS58WW0q02elMccFhIAX2ZKwnHV6QIzXuk3BCYXE89Y0Lmao2w3HTB9y9I5RB8OMHtH8hJ61vj9S2jgAHMrWqXPbgW+ya8JIPBQ1WxJ2SuKjKOeBFI5XBb1rGHcr8bzByBqRwamrgcUUn80jDmghuvICbP6KQ3uuifXbg5snVbROa2ruHwK/BFMTG/g/qFpTe6kmdhKgekbasKGMncqn1zY8vh2yENpfflMMZvHt7nG/8Gmdu4Vg2emTmq1/1+wLGbiizGVA6tsqZBzS1/mvHMrUqcPUxyctxDRW7C/elNGjcyV8XuCkmkHk04+in/M9HcVPQDa9ImVWwRy1yKFObCVEP1Je5XlvnenToZ/W8UWzkyV5VuyVfKsashiRS71pc+vhv9wFRRFS8yoABBzK2WiRtfCt0Dfua+FVEMETLQTo18QOY2opLMOfslkbq4jS9jhCbFD34ZefFQVQHimFstVmamNI+2i4pei0F4G7V7ZG4rvTp7aMG7EpNINWpsrUht898SylyYaiiJiQvbnFsZ9itPenZ3voDWMIoCyNzmOjM3oRS6C5NIjWJdzWmLvxquALnMrZaVm1AKPpSEpYzlsWqateF1wG+qCiBzlVoCbOFd0EZtYZj17tSpmMoBsauHAqQzt9qLMkf3uD7xOXfSscvzOMtWjyzI3HrKjPB9oZI+rsf1qc/ZR+P81Qj6qLc9Ei8+RAFzMBemGqpRRXbAajIEhEabGKYAMrdBq8hNKfqfgsjOgWVxfHlqUDQ8TS0FTMPcaoW5ycXAY1Lik3/ghveh70HI3FF7BT+mHLkp59hNuT/wZ2bhFt6hJjSqgHhC6wqYjLlQYemtEAI7baPjF7VhTP4BI0DmDkgx/ANfFJPzOugNLmozm5iPqRyQtoYpYELmSu/UkHJtIe+oplw7EgcsYEDI3OGorX6TmdnreTvo2ENBQKVxGH3RMNzUayBbfW9W5lYbCSbmnoaJudD9KUy5hswd3nW5STW/F9+/IxjNY7g++I3+CpibuaCXIKbndDPfeagtTOI8W6dcQ+YO7j/wJnQF79xOs+u86Tm4hRfHtqQoYH7mVqcaKuXo9dLayLvB7IzC4L5nn8/I3FpbC2L6xG72K49zGx27LI+pHOzTBUxRU4swt6p1bprgewFSroWXpm04bYfMzfdUsgfXbCD4YJKbWDJFJ8RC2koBSzEXWk4QU6d00T9JKdfOtFfKNZszlxsnBWLeQ3neCmJ6aVtRzFyVtRxzq1MNY8qRWyCTiuf1kH2SYNuWuRCa47x26leW3uBKzsMtvKRMXJoLhbqV1prMrcqXPUTwrgw5+qnIbVl+jPU9hOzJXNgXvsbv2EVFb8jZoZV1QwPeSCMFrMzcWsq1eR30Jhe9wZU6tdPa8aftxtzcQcXA47ApEeIfTSlq1EPwsqiAugpYnLlVsWCm7w4pWN+LVnbStA9z+Uo5uoiDHTGf+NLH9mCcT3WhgFfTVAFbMLeqYPbwAmxG2i29hFYsONVgB+ZCKofTOukf3NTvTOJC3PmNU7fmU8BGzN2bcq2d+o2FeKknWS3lmuWZC0/NN2CCHnwBx6MfmPlwo+n40SwXtxdzq60CeQHug5Rr/mctlXLNwswdaDLvK2H7OKKYBSJYTkUK2JG5VYEyR/S6P/A7+ujY1Zw1tipZkrkQN/mSvHMrw3zrSc212quJor6KJ1tDAfsyt5pyLb5ASrm2zgtZtU2ecs1qzBXE9And7OdeyA+ykOetOAVvDYhgLRQpYGvmVpXiJpaCf09A1oB/mjtrgJWYC9u4V0Qd/VTwkQQ3Gf3AcOrWOgogc2ttmTlGyo61Q4qKUhYVPbgIOdkazOXGSnsId1Pu1YEMRkYeloGJEGPDYjStADJ33/OTL4uxy/LOHbTrU1OmXDM7cyGVw9nSBpZNruTZHXzRlE++prsi/tAmCiBz9zG32uS5A4uBf8LupuDfE+YKTGVq5maO7HWvDjh2U5FbstxYC3pP2wQoWM1RFUDmDmUuSFaopI/vZtd5nVuZ+ALTON6blLnc5GLwEZhP962I5qYJo5osnoAKmFoBZO5IzB1IuXY1bDCFHLFHmCDlmumYy1cgqZ1zJ81+7k2fgKkc6pqiqRGDhR+iADJ3FEOHlGvPwgJ66D7SU66ZibmCmJrbxXzrgTeJS/K8ORcth/Ql/BcVaEQBZO4ozAURBTF1Uhez3k39JqXpJnVtxyzMhRibr4RN8RhrpAvhOaiAIgWQuQ0wdyDl2g2Qcs3zdjB7OIkp18hnLje+FF4KAd48b4TI1FBR58GTUYEmFEDmNsrcqri56YL3RSnl2h3EpVwjmbmQyuHCNup3hv7BnToNUzkos7omOjb+hFgFkLnKrV8QU6d20htc9CZXch5BKdcIZW6hkj62x/WJz9FHRxdxuIWXWBZgwfRRAJmrnLkDKdduyzr6Ke9KUlKuEchcWIFcHoN91Y/HcwfhFt4mjU0fFuBd9FEAmdtSN8geInheDzn2gCe/4cm4iGIuP6YcvSHn2EW51vgzR/foY814F1SAfAWQuS0xt5Zy7cwOajNL/+ROnWJksEFCmMsLYnIezL1Qv7KJ89r5Em7hbdXGyOcIlrBxBZC56vQHSLkmrcj7XogYtZmKBOZmZxY8bwUde6jw7RluHG7hVce6Gu/PeCb5CiBz1ewV2RkF97tSyrXrc/ovFhnLXAiJ+WAStvC+EMkejFt41bQr8jmCJWxcAWSuyn2DL4qJ89qpLQzznSc9R9f9rEYxlxfLEI9tG81+5UmfqGuVGzd0PBMVIEQBZK7KzK22K+Tvul9KufZ0LDdFp/V6A5griOk5UjCg7XTsCt4aKY4I6ZlYDKsqgMzVhLlVc8kc2etaI6VcW6gHj3RmbvZgwfc8bA8JPpTkJmEWXg0Nyar0sWe9kLnadhW+JMYvaoP37i+96eN6NE25phtzYcFwScaxB7ZBZ2aaIOKaPfs21ppMBZC52jK32urcpFLgH1LKtcfi2mX30oG5sIV3fjs4xm2Q9uCRGu6HzM6GpUIF8j0VZK4ezK2aWuaYHnatz7mDjl+qSfRCrZmbmSVlp99NRW7KGb4BBHsvKmBSBZC5+jEXNlCUxdjleedO2vWJT/XdWdoxF/IVLYN8Rf6n9FsSNGmPwmKjAvIKIHN1ZW61MXIH1qIQwOrTBNVWn7RgLl8pR6/lnH2Ql1Pr+Wh5S8WjqIA1FEDmGsBcMJ1CJT27m/0KEiUkLlQn5Zq6zOWl8GkQqX2LlBQOUzlg2nNUQA0FkLkGMbcanEwaRTp2Ue73A607AKjI3OxhBe9rIUjlcFdaxZG4NcYpWAtUoBUFkLlGMrfacrkpRd8KKeXavSlufPNTDaowF3Zz3AO7Obwrw9lDSUyH0Yq5429RAcMVQOYaz1wwAkFMndzFfO+GWFzzO/imfLBaZC5fFuMXt1F/MMx6d2puFy9gPDAybEON91nDQYMFGFAAmUtQv+Ir5chNOdhrsCqYPUzxGLN55gpi+vhu8GPro2NXYyoHgkxioKPiB8sogMwlroNByrWXIS0uhEMcqyAcYnPMzU0V/M/AzEbg0UTuQJ1CQ1im/2BFUAGlCiBziWNuLQ766Z30zy56oyt5RqMZG5UylxtbjizOOnZLK3hH4RZeEi1BaX/G88lXAJlLbk/jxkphDfop76vhRiLSNs5cvigmz+qgN7qoX5qfPibfuLGEqACBCiBzyWVu1VyyhxY8b0op1xZn5eOgN8jczBG9EFh9DxW5Lato7oJA88UioQKmUwCZSzpza1MNZ0sp134Aj4J8HY+CUZnLTSoFH4ZQO75/RXPTMZWDCZredEDBAo+qADLXNB2PG18K3ZUGYv47kps6AjFlmAupHK7knTukkJKzMZWDaRp91A6MJ5hOAWSuybpfdmbBvTrg2EVFFw116hqZuYKYOqmL+QY2GWsUz8x0Ro8FRgUMVACZazLmwlRDUUyc3w6bF77xpAcNWoczN3uI4H0J3M5C96e4ic3vcDPQQPHWqIDFFEDmmo+5VRPkJtTy7PqfjOUOAr/awczlxpfCd8BEBGyvmKF4e4XFrByrgwqQowAy16zMrdpQ5ihIuQb7x67ks4cWHP1U9mAhcUE79RtL/+hOnt6oby85FoklQQWsrQAy19zMhamGkhi/JO/cTjNfe/70fxzs515ptjcn71hmbbPG2qECxCqAzDU9c6u2xU0q+Z+JHvDfA3zPRXXL7k6sWWPBUAFiFUDmWoS5+yysYLkaYWAtVMBCCiBzkVCoACqACuinADJXP633DUUt9NDGSqECqIAiBZC5yFxUABVABfRTAJmrn9aKHoZ4MiqAClhSAWQuMhcVQAVQAf0UQObqp7UlH9pYKVQAFVCkADIXmYsKoAKogH4KIHP101rRwxBPRgVQAUsqgMxF5qICqAAqoJ8CyFz9tLbkQxsrhQqgAooUQOYic1EBVAAV0E8BZK5+Wit6GOLJqAAqYEkFkLnIXFQAFUAF9FMAmauf1pZ8aGOlUAFUQJECyFxkLiqACqAC+imAzNVPa0UPQzwZFUAFLKkAMheZiwqgAqiAfgogc/XT2pIPbawUKoAKKFIAmYvMRQVQAVRAPwWQufpprehhiCejAqiAJRVA5iJzUQFUABXQTwFkrn5aW/KhjZVCBVABRQogc5G5qAAqgAropwAyVz+tFT0M8WRUABWwpALIXGQuKoAKoAL6KYDM1U9rSz60sVKoACqgSAFkLjIXFUAFUAH9FPj/AR7Ugy9DTYQvAAAAAElFTkSuQmCC
四角标高不一样的
本帖最后由 mokson 于 2024-8-23 20:52 编辑
在实体中,按住 ctrl 然后点角点,会显示是蓝色的圆点,可拖动它改变长度。
还有好几种方法,能画出这个简单的实体。
jltx123456 发表于 2024-8-23 15:40
REG 面域 呀
多谢大师!成功了。
mokson 发表于 2024-8-23 20:44
在实体中,按住 ctrl 然后点角点,会显示是蓝色的圆点,可拖动它改变长度。
还有好几种方法,能画出这个 ...
非常感谢!但还是满足不了要求,拖到角点时另一个交点也会移动,能说说其他方法吗?多谢了:handshake 本帖最后由 开心无惧 于 2024-8-23 14:46 编辑
可以根据你的要求切掉 开心无惧 发表于 2024-8-23 14:44
可以根据你的要求切掉
谢谢!但很难精确的切,因为不是一个平面 画任意两个面,然后通过两个面放养 aumyshow 发表于 2024-8-23 15:08
画任意两个面,然后通过两个面放养
谢谢,我试了,但只能生成曲面,生成不了实体,不知道咋回事 tender138 发表于 2024-8-23 15:21
谢谢,我试了,但只能生成曲面,生成不了实体,不知道咋回事
REG 面域 呀 三点一个平面,你上面有四个点,要么是曲面,要么是两个面 放样还是扫掠来着 lzspain 发表于 2024-8-23 19:21
放样还是扫掠来着
只有是实体,怎么都可以
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