Planos

Nessa seção exploraremos construções para diferentes tipos de plano
Barra de Ferramentas
A Barra de Ferramentas disponibiliza as seguintes opções para a construção de um plano:[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAj0AAADbCAYAAACGEyC3AAAgAElEQVR4Ae29B3gUR7ouPAKcz967/z1n8z3XxmF3/414j+3dY99dr3fttY131zngBA5rGxuMTTbBBNsE2xiTDBIZk4MCWSSRBAiJjMggchAgDJgMeu/z1qiGUqtmpmc0klr0188jdaqueuv9qrvf+eqr6sCJAwcwrkEDtAgE5E84kDYgbUDagLQBaQPSBq64NjDqueewb9UqBIY99tgVVzkRcCJgpQ1IG5A2IG1A2oC0AbMN9KxTBwHzgGxLA5E2IG1A2oC0AWkD0gau1DYgokfcmOLpkzYgbUDagLQBaQO+aANlRM/Zs2chf8KBtAFpA9IGpA1IG5A2UN3bgNNjFVH0HDp0CDt37sS2bdsq9Y9lsuxoZHsdH/F7HaPX8QmH4e89t/dJdeBw7NiLaN68GK+8gkr9Y5ksO9qzpjpwKPdy+e8V4fDK49C16NmzZ496YZ87dw6VvbBMNj5iCPcw8jo+4vY6Rq/jEw4j33lu7pPqwGGXLpcwZMgl7NsXub4VcZZlsmxiOHMm/K96r98rXsdXHdqhcBj5DnPzvPEih65EDwUH/6p60Th4w5h/+rhX8RGr1zF6HZ9w6L51a1ua94je1ufc51YxKTUOjUuv6WWh6KjqhRjCeXw09qrGqHFo7vRaH/cqPuL0Okav4xMO3bdubUt9f7gSPXSbV4WHx1ktYiAWDV6vvY6POL2O0ev4hEPn3RB+P9x9Uh04ZPdSVXh4nGwSA7HYvD1ev1e8jq86tEPh0HlHhN8P97zxKoeuRA9jeLyyEAtvGvPP6/iI1esY48Y3cSLQt29Cm4fNxlc0hwZ7S7KXgH/lXaorh6++ChQXl7f2ibmeWGyiJ+57JTGwSuVis7PX8fnlXi5lqHLs2GwsHMZGqMmhiJ7YuIua2iSXDVP/ef1BFDe+I0eAQCAqL7Ek8B2HBjkieq580ZOVtQrPP98Rc+asMiwf36btXon7Xo4PQsSrbPjkhR2RsjInhcMylMR8wORQRE/M9EW+wCRXC54r/ib3kOjp2XMk7rqrAd57b1BkQ5XzrM3OPFbeRUTPlS16UlNX4PrrOyIQyMK113bEhAkrytVkKqIdnirchyObV6m/bwvLF01uw1cdn4f0Pl68GPyrbE/klcJhuRp6OS82ORTRU04ynZeb5HpF9Fy6VDow1IaRx+JeWrQAcnPjvtx5oQ2fmwflypUFuPbaBggEChAIjMf99zd2Zp2wfRvGcnFYgqy6iJ7DZw6Xm0sbh1d699bvfvcSAoFDyjkaCBSiTp2XUFyOt6iNw3ja4b68LMxp8xwm1vstMl77v5je6CFMb/yQ2uaxOa2fwb7lc2O2uQ2fm3s51oIaNeqEWrWuQY0atTB/fmzPIhtGG4ccuMzxPAUFwM6dwOHDwKlTQSEUK95Y0tvwVQSHsWByprVhtHHovC7a/smTJ/Ff//VfqF+/PvgeO3PmDBYsWBDzPWPiE9ETgfWsLIB/sSwmuV4QPatWrcJrr71Wqgo2jOVqoNOmAZ99VqqM8uzY8Lm5yRs0+ByBwLSSFwpQo8Y15YER8VobxnJxWFJadRE99bNexpKD5Ys9snF4pYuet94agKSkoQgEihEIDMPrr/eP+QFuNkwbh7G0w292bcbUdx7AjHcfxoaJ/ZWw2bM0E7sXTcWOOROwZepwrB/bBzm9W2HaO3/D1IZ/xbGCjSaEiNs2fG7u5YiZWk7+27/dV8IpULPmv6kXpCWZ9ZANo41D/nY8eBBYuRKYMweYPh2YNQtYtAhYuxYqAP/kycSLIBu+iuDQSo7LgzaMNg5dZhdK9uMf/xjr1q3DmDFj0KVLF7Rs2RLTp0+P+Z4x8VWI6PnDH/6AzxL4EgwxAKiAYFNMVJTx584Nhqr87Gdm6dG3TXJNnIloANFLL51i+PDhePzxxzGXlTEWG8Zy4ePPnb//3SihfJs2fG7sPGTIFNSsya4D2m4kbvvxXTh15ED5wIS52oaxXByWlFMdRM/IrSPxzOxnUCulFooRf9SxjcNEi55LF87j/KmT4DrWpSICmdl1dM+Nf0cgEMA9tR/H0W3rYoVVKr2NQ7ftsGB+BiY+fzs2Tx6KwxtX4MjGFTi8IQ+F63JwYNUiJYAofrbPHo9N6YOxbvSXWPZlc0ysVwcv/qMl/vf//jMaNvwq4gvIhs/NvVyqklF2srPXokaNd0Ki53/8j05YsWJllKsun7ZhDMchvT0bNgQFz6hRwNdfA6NHAxMmAFOmBH8kr1sHnD17Of9wW5s3bw53qtRxG75Ec1iqwDh2bBjDceg2e4qc5s2bhwTsPffcg6SkJEycODFim7Plb+KrENHz8MMPo1OnTvjwww9x/nzsDxsbaH3MBK9FRXnJ1Xmb60cfBZ5/Pih8Fi82z0TetuGr7Aa6Y8cONGvWDB06dMBh+mAdiw1jeTl87nuP4M47G2DFigJHabHv2vC55fDLHhn40f+sg7/+8VUs6NMO0xs9iL05c2IHEeUKG8bycojNm9XILQofbpdnseFzy2Gkci8UX8C1g67F9N0z8db8t9FqYWds2gTs3g3EOm+pDWMiRM+l8+dw5thhFG3Px6F1S3FwTTaKtq/HxbNnIlWtzLmKED0rh3bBipROWPjxv7Coy1tY3P2dcgUx2Th00w53LpiMtPp/UAKHQoeiJyh8VuLwhlwUrqfwWYz9ufOwe/E07JgzEZsyhijh0+TZVkhKGlwiMoaga9eMsC8hG75EtEPTWHzGXXvt/0YgMASBQG/ceON9uHTJvRi3YYzEYVFR0LtDsTNoEDBwYPBv8GBg5Ehg6lQgPx9wRBWEIE9PS0OtmjXx2g034P5bbrE+o0OJw/zQTzSHZnnxbMfKoZsyatasiZUrV4ba1h133KFEz9dffx065iYfpjHxVYjoefDBB3HhwgV89dVXaNSoEQ7SJ5igxQRPw1eE8b/5Jih25s8HHnoI+Oc/3YO34asIjOEQpaen44EHHsCkSZPCJSnVABLBIfvRA4EpKpamRo3rwpbr9kR5ODyxbwdmt35G/WLlw3zbzDEqHmHtqC+AcnglnNhtGHkspuXYMSA9HXjzTeDPf1Y/E0OeHvar8ljbtupn5fQJs1Gz5rVISroKDz30XtRibPjiaYd8cPNXK6Hu2QPUm/YGPlj0MSavz8b4VfNwVco16Ju2FjNmADk5wTiHcA97J2gbxnhFz6ULF3DuxDHV9XJwdTZ2Z0/H9jkTsHX6SGydMQp8yR/ZtCom4ZNo0XN0yxrMbPooFnR+DXPbPo+Vgz7GvLbPY9eiqU5qXO/bOIzWDo/v3Y5JL/xOeXK00KGX58jGlSHxU5ifi0Nrl+LAyoXYmzMbuxZOwfZZY7ExbaB68QQCl0LdyD/96X1hX0I2fPG0w0iEdOvSDcOHjcBLL3XEhx+OwqZNsf1gsGGMxCFDsBjXwzY/fHhQ8KSkAPyjCKL3h91ee/faUf/r979HcdAdjQGBAEZ26hSWP+Zgw5doDu1I3R+1YYzEoZucv//97+Mio8cBpKamokaNGspDmpKSEpEvW94mvgoRPffff3/IJTV27Fg8//zzyKf0TcBigk/EC9sGqXdv4Pbbg2eoHdg+LQ4T26WV3kAfeKC5agj33tsEnTt3xnvvvYetW7dasemDiebw3/7tz6EHYCDQEampMQZCaWAlaxs+tzf5ofU5WPDxv0KiR7nr1+cot3xWh/ooKmd3goZqw8hjrpb9+4GOHYNquk8fYPv20GUh0aOP8FynTrjtqjsNjlti/vz1OoV1bcMXjUM+zOmtOX4cIMSNG4NChvqLD/j2qZPwxwl/Q9rKXIzLXYzhS+ei3ZxeqJFcA0OHFmPcuODDnu7906etsEodtGGMRfRcungB504ewze7tuDQuhzsWTYLBfNSMbJ7O2yeMkx1yfAlvTF9EDZPGY6dCzJweNNKXHDp8Um06Mnu8R7WjemFBZ1eRU6f1lj2ZQtsTE1RQcMXTn9bihu3OzYOo7XD6e/WxarBXXBwzZJglxYFz6ag4FFren4oetYtw8HVi7Fv+TzsWTJDcbt1+tfo8s5HSEpiNzLjkjph+PDssHMr2fBFa4du6850X37xJZIHJMf8EjTLsGGMxuGFC8Dq1UBaGj9bEhQ8yckA/yh8xowBFi4M3ktmWdy+4eqrcalE9EwIBDD+ww8j4rfhSySHTnzx7NswRuMwUjlr165VAcxa9DBtvXr1lOD+8ssvI/Jly9fEl3DRw5EIFD3mMmvWLDz00ENYxIivci4meBq+Iox/660A30V6ufFGoGVLvRd5bcNXERiJolWrSQgE0kpehml48MHOkcGVnLVh5LF4lxo1rkIgMEt5emrWvCHebELX2fC55ZC/mpf2bF5K9Cj3/YY85I/rqwIxt80aGyor3g0bRlccUuwwsHzmTGvRZURPSaqkpJrKzo8F0tAh8A907pxsvV4ftOFzcsieZwZeHjgA1UXFAXgLFgCZmcDkyQDnneTDm79chw0DaqZchc8XjsbEvOUYtWwRhi2Zg+SF0/CPSS/ipRGfg+79ESOCLwLe6pzVuOSHmoZVam3DGE30FF+6pGJ0TuwrQGH+cuWFKMhKw9aZo7F8dD/84N/vRFKgA264rjZWjxuIDZOSsSE1WXkoKIQK5qcrb8bFc9G7uhIpevYun4us9i/h0Ops1TYZNLzwkzewZ8lM1c3FeJl4PJE2DiO1Q8bqTGv0oPLc0JPDe0PF8pieHsb15OeisET07M/LAoObdy3IwLbMMdiUNhCfN+6Gm35UBx889Aw48ivcYsPnbIfhro12fED/ZPTq2SvmF6AzXxvGSBzq67/9FliyBBg7Nih0tOihx4dCiD+YV6wo2+074csv8cp3voNxgQBqBALYtWuXztK6tuFzw+H8+fORlZVl5Uef4/lwaQjmm2++AQVItHQ2jG44tFYYwODBg/HBBx+EnCc63Ztvvonu3btb66TT2NYmvoSLHiozdm85l7y8PDz22GPIyMhwnopp3wRPw7sxfiwFzJsHXH998Ic430/673vfc5eLDV+iMWokderUQyCwr0T07MNvflNPn4q4tmHksfIsL77YD3f+z//GimWRvUxuyrDhc8sh4w5WDOxsFT18wO/OnoGFH/1L/dJm3Ee8iw1jVA7ZXcU+0whLONHTosUIBAIcjj8eDfgr0XKPmdna8Dk5zM4GZs8OBmAyEJMxChQtQ4fyoXM5VoEP8YdHNMYzGQ0xKmcRxi9fhpHLFmLw4lkYsHAqes2biKtTrkH3gTuVi5/XMi96h1atCgorE5vetmG0ip7iYlw4cwonD+5G4YZcFaNF8cIX8Oapw7EpY7ASNa8+2hKBwPqS+2E9/nrXW8in6HEKn6w09VK/eC5ytGkiRc/cdi9gy5Th2D5zDOZ+8By2ZY7FnNbPYu/SmaoLdsqbf4nLC2njMFI7ZLda7lftlNhiNyA9OiHhUxLbQ8FzOH+56t6ip4eiZ++yWaqLcMfs8dg8eQjWj+2NtaN6YnnfD1R3cjhXjw2fsx3q9hDLetjQ4ejeNfaXn60MG8ZIHJp5MHKD9xBjeRjbo4UPt9n1xYGtdLw7ZyUo2L4dg12+vG343HD429/+VvUCzJ49u4xIYLwMg+n130033aRiQM3pEyZMmKC6lG655Rb88pe/xHXXXVcmjebChtHGoR52fvz4cRXLtHfvXjAGddOmTUpc5ebmIjs7G88880xYMcYeDec0LBpHuLWJL+Gih9/hYCCzbWHlXn31VQzlUzXOxQRPw7sxfixFNWgQDKXg+8n843vGDWwbvkRjZH04FP3++1/BVVe1DU10NnbscldVtWHksXIvXboE+zfKmZENn1sOVw7poobYau9OuDWDSWc0eUQ90OOBa8MYkUM2JiroKEs40cPLNm48im7dRgZzaNgw2EDD5GfD5+SQo0/oweGvUh2QSYGjH9x63XTwTNWFNXpCDywZ+AGWDWqLBcnNMPurxpjW518YNbQ1mo1+E4HkAJKTi5Xw0Q99/tqlm5+BzuwSMBcbRqfoOXfyGxzbuUmNJmJciRI6U4aHuq7oxVGiZlIyXn/8QwQCeSWiJw93/aoe8idePs907E7iaCV2gzGeJZLwSZTo2TZrHBZ3b6TEBYUCR0DRw8O5cFS3UVYalvVsjoVd3ir7djQJs2zbOIzUDlNfvAOb0gdhT/YMHFy1SHVhKeFTIn64TQ8aR3AdWrNE8R7y9CycAooeirf88X2xbnRPrBvVE5NevKPMS1VDteFztkOd1u167Jhx6Nihk4obdXtNpHQ2jJE4NPNi/BpHc3HkFt8P5v3De4D3GAfPug2PMPPW2zZ80TjcsmWLEizsEnr00UfLiASKHo7qpcg5ceIEFi9erNKPHDlSHWOIBGNoOBhGC6HMzEx1rIABTY7FhjESh9OmTcPPf/7zkOjS4qtVq1YK63333Rd1Ph6KHw5n1/gckErtmvgSLno4edDfIwxfpruMw9B69OhRCpTbHRM8DR/N+G7zZbrCwmD8znpLuAR/WP/pT9Fzs+FLJEYi0EPR58yZg1mzlqkp7WfOXBYdXEkKG0YeK/dCX2+bNq6y4S8fdq/QRXz0aOlLbPjccpj92bsqeDWc2DGPM8h1VosnlUgqjSD6ng1jRA6///3omQKXR2+5Sf2DH4R9SdrwOTmk2DF/nWqR41zf9lENtB3xGkanf4UJecsxNmcJRizNwsBFM/HVwsnoNzUFg4a2xD+/qoNP3302JJq0m59dZNrrY1bLhtEpeih4OPpOiZ3JQ5VHh8LFFDta9GT2+xi1al0PxpXVSLoWU3v3CgkinabjW+3Q8a32roRPIkTPuZPHVXfSTnarbchTQctcU1SkNfgD9i6ZqQTYthmjkNnsMexaNMWkKOq2jcNw7fD4nm2Y9vYDyjPGEVkUMxQ2jN0pXL9cjdji+sCaZWj4xFto+Pi/sHf5guDcPUtmBj09cyaoeKn8CV8pTw+75aa+/Td8s3OTFasNn7MdWi8MczCjRSu0rn0LTlBhON0nYa6JdtiGMRyHtrzOnAnOzUpvKe8pff+w/dPrOX48sHRpcCJD2/XRjtnwReOwadOmakALu6UoXoo45MxYTNGjD//sZz/DF198oUREnz59wNFSTo+K7hZzCg0bxmgcJicn4xe/+AWuvvpqJX7efffdUHm//vWvo8YBc74ejhJ/4oknMGzYsIjix8SXcNHz7bff4p8uhjtxDH7btm3VDIuadDdrEzwNH834bvLUaT7/HPjlL/Ve6TVDMOjtWRZFW9jwJQojFbYeil5IhRbnYsPIYwlZSJJl4a98xo/QHcwhzuSRPT3sTnROCWDD55ZDziq7e9G0sN1bpujhNuMaln7RVI2o4aRrx44dw+LF0b+JZMMYlkM+9RxxbhaK1KFInp4y1zBP5m1ZbPicHDLwOJrwaffKgxjw3I34bN54DM6ejUl5eRiTk43hS+Zh4KIZ6Ds/HV/MHYeus0ag88yBWP+jmvjiq+OhBz9fAKbXx4Rqw+gUPYzd2Zc7T43AYkCyTexoQaPXfVt9UEbs8Nwvbn4IgUAz9ffzmx7GpslDVXAzP7nAYe7OJRGiZ/3YvqoLSLe7OR88i+2zxqn2OfXtB7B99jgUzEtTQp3ex6lv/RUXTp10Qgm7b+MwXDskjxT59PRQhO3LmY0DKxeA3VxK/Kxdqu6Hur/7E+65ZQD+eOsA/P32P2LP0lnYvXi6uobYGRuVP76fGr5Ob8+slk+q7i8bSBs+Zzu0XWc7ltmpM97/7e0opOB5+ulg35EpfDgzfFJS8EH9v/5X+DHjjsxtGMNx6Lg0tEtNwecZu3XNHxIUPoTLgGcGPju9naEMImzY8EXjsFatWhg1apQSApzRuFev0rFPWvRQFFE8dOvWDQ0aNAiJjjfeeKPUfgR46pQNYyQOKVboRWL31sKFC1V3limwfvjDH7oe9b1//34lfjhgyszDxGziS7jooauME+LZlgEDBoCR1+3bt8fbb7+tlOQIBhHEsJjgafhoxo8hazX7cqQZmHku0nmWZcOXCIyMhYo2FN1tXW0YeSwhSyCAC0Un1PTsdOkyWwbIsouDwzjNAFn2g/PFyz5xc7Hhc8vh1Lf+okal6JeM2zVH1Qx94b9x/XU/QyDwNpKSaiE11R5sTKw2jGE55AM6jDgx683tmEQP82TelsWGz8khf30yxI6ByvxFarrmKVaa9s1B0msvYO1//RInv/9dZHw9AJPycjFaBTHPVUHMfean4fM5YzD5g5dQ+J//H0bdcy9+1eyTUqJHCx8+/M3FhtEpejipICfwY9cWR2CF8/JowRNunZXSHddc/WZoArtaNRuCx4KjuiarMpwTGJZX9CjPyjt/w4EV80MifEPGEBxcvUjtz271tBIg7Gqjp2dj6kD1KYi1I91Pr2DjMFw7ZJD/nNbPqZmXOe8OhQw/LbF/xXzV1cUg57mjknHfzxvjT7ctwJ9uzcJ9P30HmYN6qhmaC+ZNUvFHjKHioAB21dHTQyG3c0G6NRDbhs/ZDs02EW57fo8v0PAXv8ZuNqK8PI5hBh54INhvqi/60Y+C81vxvrjmmkoVPYTAT1Pwx7Eexq49Plr08xzTxLrEyuG4ceNw4403hgRA3759cdttt4X2WT5Fz7333os///nPqFOnDq6//vpSXVl/+ctfSu1Hw2zDGK4d6vLNkVnO/Ikv0nln+mh5mvgSLnr4S/nJJ58MYWLfIpUY3WF33XUX+vfvr/oPN27cCHorYq2YCZ43Tzw3UAhcBWzY8JUHI92SH330EZo0aRJ1KLrb6tgw8lg8C0fncHgyu6jY1bun6RfY0H2yEjKcpIsxHeYIIHoW+IJlDAnXdAnz5WsuNnxuOOQ8LdMbPxx6wbgVPDpd7f/ksHAdCLsKt9/+kgmr1LYNY1gO6c6q5y7IPCbRwzyZt2Wx4XNyyIm0ObycopPik+8T81fqfzZthtvfHI1/vLcEc+59HMfZRRcI4PgtP8HOv92Jgvtux746t+DM9ddi7r334Y23RuHhd+ai9ms98Fz3CaHYHtqadqe4MhcbRqfoYfqL58/hyObVqntl85RgF5fT4/NJo474Pz+8HY2fa2318lAMJSVxng8Os2Y1aiB/0gA1nJ3z+NALQq+SuZRX9OT2b49VQ7uq9jiyZ0+0e6MhOjRsin4dO6pjCz9+A2u+/hxq9Nn0karrbs2Iz5Dx6j2ug5ptHIZrh8rT05Ldub2xdcZI7JyfoWJ79uXMUfVndxf/Hv7N7bj31uH4863D8PCvfqO65OgZ2jF7ArZO+1rh5I8EHdMzu+VT2Lt0lkldaNuGz9kOQ4nDbCxLGYhXfvr/Y0ufvkHBQ9HDv65dgZ49L3dz3Xln8BsRnDDqD3+odNFjDmPnvWT+iOB9RS8QR0c6eprC1Pry4Vg55EhpelE6duwY+rvhhhvAcAjdLaU9PXqfs0P/x3/8R0joMPb2hRdeKCWULiMqu2XDGK4d8mp6eohvH4d4WpYf/OAHOOqMe7Ck4yHt6WncuHFYvCa+hIseAmXkNZft27fj7rvvxuuvv672OWdPVzbUciwmeN48sd5AxDd06Bh07NgTHEqf6MWGLxaM2dmr1CRbXLP/9Omnn1bD9xKJ04aRx6ItDNpj/7WeqI4vTN1NxV8x9BrMfnW0ejGGGwWkHwR8CPAlyBcuJ70zFxs+Nxxyvpa5berFJXr4QH/g9hcQCCwreSkW4O673zJhldq2YYzI4U03lbo+3E5Moqd27csPfEeGNnw2DmlTfkSRdqQXTnt9/tr9M/zklc/wQOMsPPreUtRrvgavtd6GN9oU4NVWW1C/5Qa80HwNnm2+Ek++l4PH3luMv787H3XfnYMHGk3BVW/VUyKKgpfCl6NYnPrMhtEmelg1dj9xckEKBCV8jLievq06o0ZShxK7JeOp+1+9PGpLj96alIxnH3wGN1x3m/p79m/PYoOav2eoGklFjwfjh8ylPKKHcTL05HB2Y4rqju+8h+SP89Rfp0YfYkdOFpb1aom8AR+GYnro6Vk/phc4nxQnMHQTs2LjMFw7DHqeHlAeGnpr2FW1a8FkNePy3qWZqouKXV47F89C82ffRdOnGmHbvGmqW6tgLr08o7GFXVsT+isPj/b0TGNMT0Fp7jSPNny2dqjTm2t2vawePQbP3Xwb1nbrXlrwUPQwQvgf/7jMU+vWAOPcONT27beDE3+a3V9m5sa2DWM4Do3LrJv8IcEfcXQ2Ob2nFP6cBoKebz5H3S42fOE4XL9+vYrh0V4cenL0n9l95RQ9xEIhwgBidhFxm04KZ3dRImN6WrdujZ/85CdKaLEXaKfhBuNoMVvAtOaMw/wZE0ThxDxatGhRBqtOy7XJYcJFD703zz33nJp7gH1s7Jbhi5tKkp+kYNARR3HFu5jgafhwxrflP2XKFHznOz9GIHBTyfDfAN5+O/qIGlte4Y7Z8LnFmJ6+ArVq/VSNxqpR4zb85S8NwCF8iV5sGHks0nLkCLBmTXD6dWc3FV+U/GXDm5xiZtP3/1jqV4528+q17uemSKJwcs7lYsPnhkPGJnBqf+25cbPeMu1rLPzkTcxu9RTmDOulAupuuKEFrr76u5HoKHUTuWqHHToA/CUaZXEtepgX8wyzxMohZ11mrBVFaPev85H02ku4++0MPNh4Ph5/PwcvtFiHN9psV3+vtt6M+q3y8WLL1ajXIhfPtlyCp1suwJOtZ+PJNlPxZPtJuKddd/y5d3M1SzMnOWQsF2O6zMWGMZzo4XUcacURV0r4lAQ10+PD7/Fc9uAAP/7enWVGbSnPUMl8PXzhc6g7h42zy+fA6sVqJmdOdGgu5RE9HInFuXjYBg+uy0GnRi1Coqdz4y6Y1vpFzGv/EuZ3fjUU08OJFOlBoXeIAcdugpptHPJYuCX1pTuwbvQXWD+ur/qYKL+rtTMrXXUfMrhZ/5GXXQsnq3M75k5U3Vpbpo5Q3Yv8AKjpFroAACAASURBVKkWPPT2JHr0VvPmKepjwddc3Q4/uO6PyGnfIagUtIfHXD/xRHCiqXAVdnE8Vg6jZclufQp8jtyil9P53KMHnCO+yjNzebjnIUc/ccoYp1jRYkh/HcEUPfS2MOyE95EerZWTk4PvfOc7am497Q1K5Ogtk8O0tDQlXuih+u53v6u63bi+8847UbduXdVzxDhhjgrnHIA897e//U195opfHtD4zDyd26aNEy56SCpjel5++WWwMlzYx/jJJ5+obQ6JK8/HSE3wrl42Ru1vv/0fCAReLvlFSIdEjnrJ0ZiJWmz4wjVQZ5m33/4iAoHCEnyFqFPnBWeShOzbMPJYuIUz9PLXCz0B/OUezoujb+5Ia4oi/uLhr//ly+2/eGz43HDIlyG/Bu1G7PAFM79jA/WretfiaaWqzq7XaIsNYyQOVX7duwd/iUbI3JXo4a9Z5hVhseGLxiF/FNP1/sseL+FXLbri/qZT8cj7C/Bks1zUb52Phu0L0PDDbXij/Qa80XEt/tU5F290ycabn83F232modGACXj/6+FondEb7ed2RY2vrsXE7RPCorRhjCR6mJESPhvyLnt8OFFe04+QFEguuW+y8NT9DYOeHoqc1BTVHXNZ6IxRwcv7cueqdsK5fzgHUHHxpTI44xU9FAz01NDLszl9sBqa3uO9d9HpnQ/R8Z0OaNHgOeT1b4/sz5og7eW7MPn1P2LrtBHI6dtGeVBWDemqxPvkf/0JH7TsizVrwn/Gx8ZhpHY4p0095PRurcqhKONX1DkyrmDuROVxYjcW76OdWWmg2OEQ9a0zRkMJnrSBKoBZCx6ul/drozxa4bxSNnzR2uH119+My5+5+BzpPQah2BQ65ja7tyI8u8oY1XLAhjESh5YsSh3ifcS5efgVdlt8D2MZ+ZV2TgrqZrHhC8chv0oe7ivkHBHFdy9FAkWPHiau1/SumGJJCyHO08NRVtdee21IFDlx2zDGyyFHeFPU0JPDoe38owhjzxHPxbOY+BIuetasWYNbb70VnNhILyRSe3tOnz6tRnft5sQdcSwmeBo+nPFtWV977Q+UFyXYp696YRAI/BXt2/e2JY/rmA2fW4z33tsUgcDQkof3ULz+ev+4MES7yIaRx2wLPQB0NlGkcE4XihbdRRVW3NTLQvIbeaV+4fAa/uqhR4iuX87YSzFlW2z43HDIX/OrBn8SUfTwVyq7wBZ1bRhxJlkbLvOYDWM4Ds3rwK5eNkAqSMsSUfTwGl5b0l1suTx0yIbPDYcd8z7Cz0bVQYNRPVGvxzjU+2gOGnTKQaOua9G25za065uPDgNXofPwJegyYR6+nDUZXy0Zg+QVgzFgdV/0Wf05eqz4BF2Wf4gPst/HdYOuDfsldhvGaKKHFeRsyhS2uqtrxeg+ePwv9fCj/7gD9//+OQzv3Cwodkq6rxizw2BhfkOKE+8xdodfXufszpGWWEUPp+tYvy4fs5o/qYSWng9oxYAPVSzM6okpWD42RW0zNmbVkC5qtBY/SZHbrx0yXrlHfYh0fqdX1MSFSUmcPG4AAoF/oHXraVZdYeMwUjvcv3IBpjV+SM2vQy8NhQ9xEg+7r+j94je2KIRUd9a0r9VoLf5IUCO2VPBycH4eXs+5hhgrFG6x4YvWDmvWvMYQPZ1w5/dqY8hjT2BFp844zweHKXr4ccRyftvRhjESh6zr+PGpanqEpKSrUavWNWVmVebnXDgbM5+b/JFnPjPpEWcMHWf4cHo/bTza8Nk4DNf1pPM0z+ttPdNyuPqaMzIvX748rFfFhjFcnhpPpHW4GZkjXRPpnIkv4aKHBdsEjent4Zj6nlTocSwmeBreZvxw2d5wA7u1ppeICi16fo/u3QeHuyTm4zZ80TCy75JzF/Gr9I888plS4E88kTgh5qyEDSOPORd2O7H7iRNvacETVuiUfHeGN3dKwxUY2GqrEjm84Xktu8B4o/O9zSHqkX7l2PBF45DYOeSX84eU8fTk54IBorOaP46lPZuB3+cq72LDaOPQWg4f2ozx+fGPg09EjnW1TUHAYzxHEpmW1/BaF4sNnxsOrxp4FV6c8xraLu+Ejgu+wgcT0tBh9Dz0Ss/F+CWrMWXdMkzbMg/TCqYjY0cqJm4bi5GbhmHohmQMWNtbiZ7P8j5Gl+Xt0WFJSzw14x94JpMDG8p+9dqG0Y3oYfX5xXQlfOanB1/K6YMue3SmDFOfpaDQ4ecTOC3BNzs3qw+S8ntdbpdYRE+3buNLAqXr4d+/8wukv/Z/lYChmAj3lz+2D9Lq/161zVWDPkZuv7Zq+oTMZo/jhdv/hEBgXOhZxQ/N2tz4Ng6jtcNpjR5SEyRqjw27uugR25Q+WMXsUASpb5dlDFGjyyiMzNFa+jp+O2zq2/dbcWmObfiitcO33uqB66+/Tz0Hf/3rp7Bt9hykt2yNzvfeh+dq34pP7vkjJr/6GnYysJnxoy7idjQe29qGMRqHd9/9jtGl+iU+/XR8GR74o44aLdxnKtwOY7fhi8ahrZ4VecyGMRqHkfDYvr0VKX20cya+ChE9NgCmt4fD2tk/x6jrWBcTPA0fi/EffPANBAK3IhA4UfIwSVU3Fj+RkajFhi8SRsY80ZUX6avoicKm87Fh5DHnwgBjBihTsNDD4xQ8SuCkBM/p0Vj05LD7a9SL0zF+1Hn1EXFOTMeh/hxUwb5sCp5IzykbvkgcatyLur6tfqFq0cMZZ1cO+gj8wCIDRo9uXauTlnttw2jjMGJBbHecpfmNN4A6dYBatbQSD27zGM8xTYxt1IYvGoefrfoCd0y6G40XtUD75R+h59o+GLh2NCZunooF+xZieWEOFu1fiLl7ZmP6zqlI3zEJ47eOxshNQzE4fwD6r+uFXqs+xWd5H+HjnHb4cGkLtF70Lmqk1LB6e2wY3Yoe8nrh7OmQ8KE3h3/8sjo/NXJwTTaKduTj7PGjcA5Fj2gT42Qsouff//3uUi/BNvWbhxU7WgQxKHjCM7/C2hGfqnbKz0NwZubs7o3Q5+nHkBRgd3xwtNmNN/6zzEuVUG0cRmuHx3dvxcQXfhccfcVZlUf3VDE6FDb80bBhQn+1pmeHnlEOS9dCh2l1en6pPVwAs6bRhi9aO+S1Bw4cAD9V4FzOfvMNlg8egsEvvowmv/w13r7vrxjQrz+yF2ermYV1en56oUmT/vj00zQrbzod1zaM0Ti8+uobDG/UVDRtav/oKQcnMQaSz1A+I81nJru++GzkqNeKeB6adazo7Xg4jIbJ/Mo609I5wLAZswsuWh76vImv0kQPCze9PZxC+nPOBhjjYoLnzePmBtJFMMbopz/lF8EDSEq6Bddd92O0aFE1gcwc2p/ooei6ntHWbjhk1ynn1uEwS/Nm5U1LAcRjdEDwxtXz7fCXC/uxGcS3JPDfWDUoD/yWHuNEOFohSm9CCLYNXzQ7163bCD/+bh183OwrNYMvXyBT3voLVg/vDo5aSfRiw8hj5V0idm/FkLkNXzQOmy9tjT9m/BVNFrdC57xu6LX2K3y9ZTSm7pqGJYeWYNnBpVh4YAFm78nE9F1TkbZ9AsZtHYURGwdjcH5/fLWmJ75c1R3dczvh45y2aJ/dDK0WNa4w0UM6KHyObl0XnGBv3TIUbc8Hv6lmm2wwBvpU0thEzx0hgRIINMc79z6ErA/rK+8NJwPUQse5Tn3pLuWh1J4efoF98ut/UgHO7789CjVqXI1f/rIRTp8u6ykjSJud3bTDgqx0pL3y3yEBYwobLXAirdNfuQec68fmwTN5tuGL1g7N66Nt79u7DzOmz8Sn3T7Fi8+/hPbtPsSE8fxmFGNWeiMQSAZjJS9dsvMXL4fduo3FNde8UuKNS1LxJjasfObl5wMMXuZzUg/20M9QPl/pDYo0jL2iObThjvWYDaObdhipHMYdrVy5MiRahwwZogZG2TyekfLhORNfpYoeKjRGlnM8/VNPPYVUTjAV42KC580Tzw3Efsx+/fqpeYJiLD5qchs+J8YFCxZUyFD0qOBKEtgw8pi5cKQWR1dR1FDc0INjChz2VfNG5mgf3rTsv96+PfiNGQ7bvND4/eBFZqYut234nByaWT35ZMeSWKhjav3Snfdg/fi+OHU4dk+imW+kbRtGJ4eRrg93ripFDzFdM/AaNFvSFh+v+BT91idj9NZxmLE7E8sOLcPSg0uxYF+WEj1TCzKQun0Cxm7+Womegev7od+aL9BzZVd0z+2Izss+QLvspnho8l/wdAV0b5n8XbpwDudPnQgKnUg/mc2LXGzHInoyMtao7q1rr22I3/zmBfVxVMYcLenxPtJf+W/Mbvmk8uCsHdkjJIDmDuqB5/7rSfzr4XewoHdbZL73D5V25wL3H2UuTzvcMS8VE5+/HTm9WoRifPgtLeXNCbPO6dUSE+vVUQHO0QQPKbbhi3QvuzBLxCRr16xFixafIykpy+gavC6id8CG0c29nJ9fgI8+Ghx6KYcDxrhIhgnQ283uff1xX3p/KHro7aEHnHFAtsWGryI5tGGIdsyG0Q2HkfLlVxsY9qE9O4888khoO9J1tnMmvkoVPQQzc+bMuMSOrogJnoavDsZ3Yqxfv36FDEXXHEVbu+GQX+Cm6GHQMQUOb1YOcqP3h4HNHJ3A+V347Szr1Op08fDrrXEsNnxODs1sb731aQQCR0secsfwuzqPmqcrZNuGkcfKu1S16Pls9ReomVIT72Y3Q//8QRi/fSIyd89C7uFcLDmQjQX7s5C5awam7EzHpG3jMHbL1xi2YSBS1vdF39U9lOjpurwDOi1rjbpT7scvxv5cdYnZeLFxGEv3li3PRB6LRfTocjmtvnO5dOECDq5dgjUje4DxOtPeeRDzO75S8p2w3OAUFUm1kDegI86eKP2NJGdezn0bh7G0w2M7NiiP6PRGD4IB1eE8Pvya+vTGD2HyG/eiaJvl44ROYCX7NnyR7uUw2cR0mCOIv/vdTiHPW82aN0R8WdowxsKhG3CMj2TQMru71q4NxjXyByMFD0dyrVoVjMe2ecNt+CqaQzd1MtPYMCaCQ45G40dF+U2wlJSUqALTxGRum/gqXfSYQOLZNsHT8NXB+E6M/BJ9VS5uOOR3YjiknAKHI7gZfsUudkJ3/WOaI43iWGz4nBya2T7+eGsEAo2V8KlRozEGD55hnq6QbRtGHivvUtWih/gXH1yKmim18OycevhsdQ/M3TcPuYW5yD64GFl752LmrumYvCNNBTGP3jwcQzekIHltHxXE/PmKT/Da3JfUF9dfmfdyRDpsHFZ30ROxwiUnT+zdgYm9PkNS0nuhF/M1V9ePa8Z1G4fxtEOObOPMyhPr/RYcKj/j3brqj9s8NqvFE+AEhrEuNnyR7uVY8w+XvkOHYWreGY4Emz59XsRnlg1jPByGw2I7ThFEjzjHKjCmh3/8EWl7NdjwVQaHNtzhjtkwJoLDkydPgt8O47fAtMcnHIZIx018InoiMRXHOZNcNkz9l4gGEAcc6yU2jE58vCH5FXTXAsdWUsOGQcVkOxfhmA1ftJu8YcOeuPvut/H55/YPcEYoLq5TNoxODuPJ2AuiR+P+an1//H3mP5Xn55k5z6D50mbovrorUjYMwMTt4zEwvz8+yuuAdxa+iWcyn8DvJtZRaV+e9yKy9oUfxqzzt3HoB9HD+nN4O+N1dKAyP4tR3liFRD1rTh7YhcINuWp4P7fLs9hsHO1eLk958Vxrw5iIezkWLHzOUgjxz/nMteETDmNht3Q3q4ie2LiLmloaqEERx6j3j32uIT9z6CXRY1gSqQWT8Pmaz9FocSM8OvNR3Jl6B/6U8Uc8PespNFncGJ+t/hTzXQgdM0+bnf0ieshDv37jVcBt7doPY8WKLSY1rrdtHPKYVxYbPnlhx2Yd4TA2vmypTQ5F9NgYKscxk1z9y8u3Nzn9tc8+GzObfubQq6InZiO6uMBm5+bNi1Xcg4vLKzQJYy+I5cyZy95afT8Tt1cWG4dex+fb52GcjcZmY+EwNjJNDl2JHn4IrKrjUFhFYiAW/fDRa6/jI06vY/Q6PuHQ/U0e7j6pDhyOHXsRQ4ZEninZPRPxpyQGYtHPGHPt9XvF6/iqQzsUDt3fO+GeN17l0JXoOXToEPhX1YvGYT6AuK2PexVfdcAoHLpvPZoraYfuOXOmDMchOe3S5ZISPvS2VPbCMil4iMHm5ZF72b1FItlYn3OfW8Wk1DjkXo6f3+rGoSvRwwaxZ88eJS6qwuPDMkksMTgbp973Oj7hMPJN5cbGwqE/OKSd6WVh99Irr6BS/1hmOA+PftZIO/RHO5R3Svnt7EUOXYse3ugUHnRZsX+sMv9YJss2Hzq2ba/jEw7Dtxu3NhYO/cGh7f6OdIyjofgxYw5x5UcS+cftU6dOqZFSka6N95zXnzdex0fevY7R6/iEw9ifhzGJnngfDnJd2WBI4UQ4kTaQmDZAwUNxQ6FTWFioPML86DG3+f0miiGmEb4Tw7fwKDxW5zYgoseYS6c6G1Kwy4PIj21ACx5+y46zIWuxw1/o/EAh11r4+JEfqbM8F6QNlG4DInpE9MgvYGkD1bINaMFDD8++ffuwa9cu1aXFmVsvXLiAoqIiJYIofE6cOKE8PvICKP0CED6ED7+1ARE98sKrli88v92oUt+yLyd2W1Hw7N+/X4kbChsKHs5szL/z58/j8OHD6hzXjPGRbq6yPErbEk781AZE9IjoEdEjbaDatQEKHnZbHThwQIkaip+LFy+GBI8WPhQ5FEUcRXL06FF8++23InykvVe79u4nUVLRdY0qeipzlJaUFT4SXbgRbqQNBNvAli1bsHHjRvX15U2bNqm4HU55wC4tCh/9x316e+gBYnwPv9acn5+PzZs3q497Cp9yT0kb8F8biCp6+MDgHx80Fa3AJH9xs0obkDYQrg3Qa0MPD59HBw8eVEKG3hubh0d7evSa1zDmh7E/9ApV5FD2cPjluLRtaQNV3waiih4+aPhHRawfILIOxgwID8KDtIHKawOM1+FLg0KH8zodOXJEeXc4hVokO/A8r6Xw4XWM7+EzzY1YipSvnKs82wvXwnWi2kBU0aOVKUWPLMKAMCAMVDYDfNhRtLALi14aDk3nHDzsvoplYR4UTLyeaz7b9IM0lnwkrTAgDFRfBkT0VF/bCXJhwBcMUJgwNoeCh/Pw0FPD/VgX5kPvDgUPY3w4tw/z4XFZhAFhwB8MiOjxh52llsJAtWSA3hkKE47U4igsxvLQQ1OeRX/njR4fCinmRzHEsuRPOIi3DYjXsDx3ZeVdK6Kn8riWkoQBYSAGBvgS0V1ajMVhEHIiYnEocCh0KKIY3MzYIIoqzuMjf8JBrG2AsWKcCoFB9myvOlYshqYuSSuRARE9lUi2FCUMCAPRGaDY4a9tChPOqkxhwvl4+GJxDkvnCyaeP+bD/Ojt4cjUrVu3Yvv27fInHMTUBnbs2KG6SvXIQHa9UgSx7bINS9dp9Pu9slOI6KlsxqU8YUAYCMsAXxIUMRxSzhcIY2/YpcUuLh6Pt+vBdh3zo/jhn7ycwppETrhggO2HXh7Gi+m4M7ZhtjFpWy4IrMQkInoqkWwpShgQBsIzoAUPuxcodEyxw3P8s4mXeI/plxGv19vh0ckZYcAdAxQ6uv2yLYvwccdbZaUS0VNZTEs5woAwEJEBig/+OuYLg7+YZREGqjMDbMNsy2zTbNuyeIMBET3esIOgEAZ8zQA9LYyD4Pw7fFHIIgxcCQywLbNNs22LN9EbFhXR4w07CAphwNcMsAuAAaCMh+C2LMLAlcAA2zLbNNu2tGtvWFREjzfsICiEAd8ywF/ADAJl4LJ0a/m2GVyxFWebZttmGxdvT9WbWURP1dtAEAgDvmaALwLOccJ5ePhikEUYuJIYYJtm22YbF9FT9ZYV0VP1NhAEwoCvGWCQJ+fM4Vwn8lLwdVO4IivPNs22zTYuAc1Vb2IRPVVvA0EgDPiaAb4IGPPAOXlkEQauRAbYttnGRfRUvXVF9FS9DQSBMOBrBrTo4ey2sggDVyIDbNsierxhWRE93rCDoBAGfMsARQ8nceNnIGQRBq5EBti22cbF01P11hXRU/U2EATCgK8ZENHja/P7ovIierxjZhE93rGFIBEGfMlARYueSxfO4fypk+BaFmGgKhgQ0VMVrNvLFNFj50WOCgPCQCUxUBGi5+L5czhz7DCKtufj0LplOLAmG0Xb1+Pi2dOVVCspRhi4zICInstcVPWWiJ6qtoCULwz4nIFEiZ5LFy/g7PEiHCvYiIOrF2N39nTsmDMBW6ePxNYZo7BzQQaObFopwsfn7a0qqi+ipypYt5cposfOixwVBoSBSmKgPKKnmELnxDF8s2sLCtfnYM+yWSiYl4qR3dth85Rh2Jg+CBvTBqr1lqnDUbAgA4c3rcQF8fhUuHUzMjJw8803Iy0tzffzL4noqfDm5roAET2uqZKEwoAwUBEMxCp6ii9dwvnTJ3FifwEK85djT85sFGSlYevM0Vg+uh9+8O93IinQATdcVxurxw3ChknJ2JCajI2pKUoIFcxPx+GNK3Dx7BnX1SkqKkKDBg1Qu3btMn+5ubmhfNLT09G2bVs1+27o4BW0kZeXh3bt2kWtH1/y9evXR2Zmplpv27bNkyy4rU95wYvoKS+DibteRE/iuJSchAFhIA4GXIme4mJcOHMKJw/uRuGGXOzNmQOKl60zx4AenI0Zg5VH59XHWiIQWI9AAGp9/+8bIp+iRwuftIFB4TMvFYX5ubh47qwrxBQ9TZo0gfPlzZfZI488Ai18RPQE6SRfZ84ERSXX3PfiIqLHi1apWEwieiqWX8ldGBAGojAQTfScP3kcx3ZuwoFVi7Br0RRszSwROuy6Sk1RXhwlaiYl4/XHP0QgkFcievJw16/qIX9iiegJiR96fIaqbjDl8XEhfMKJHlatT58+oNjh4hQ9PMcuHu0h6tWrV6irh2m7du2qPEP6PLuCzIUvZX193bp1y4guMy0FGIXZrFmzQteY5TEt62F6rMyuJ17frVs3hYllOq81sdCLww9psg6DBg1S3hzWQYs/3bXFY07cWiiadQ73+RHm07t3b/WnedBl6LqbuJxl8XrNsb5e19m87uWXXw597NY87sxP86fzcnKkMTnXrLPM0+NkpWr2RfRUDe9SqjAgDJQwEE30UPDQs0OxQ7GiYnQcYkeLnsx+H6NWzesRCHREjaRrMa13r6CXRwueScno+FZ79ReL8IlH9PBlbXZ16ZepfmlTMPDlqfd5nl4j7U2Ktu9sQFpM6DLpYWFXFHFQVOgXtn7pO/f19fq8M3/uE5PZvUVRYWJmGh7TGPQ1FFoUSbpMXWfnvrNM5kWONCaNUV8fjSN9faT0Zn0i5af5pN3Ip3Pfid3cF9FjslG12yJ6qpZ/KV0Y8D0D0UQPY3f25WapUVgMTGZ8jhY54dZ9Wre2pvnFzQ8hEGim/n5+08PYNHmYCm4+smlVxK4uvpxt3VvOlyRfiOYL3zSu8wXvTGueN1+oZh70HGkRYx7nNl+s9MBo0cRjxKcFh7M853nb9c4ymJ8pEpwCJxxP2htm1tGZt23fmT/TaA741XJi0SJEX6/PU5g4r3eWb9bH5Nz0POn8wpWny420FtETiZ3KPSeip3L5ltKEAWHAwUA00XPpwgUUbVuPXQunqPidDWG8POEEkD6eldINV1/9JgKBYtX9VatmQ2SldFd57lwwGUXb1oFl2Rb9stRdMuZaexF4nU1Y8JjuDuF1Or0zrS6D581tEw+viSR6KMzoUdGLKWR4nfNantfXmGn19c61KRJ4zikqmAc9PyY/elt7a3iN5iNa9xDTOjHrMvfv368EneZTYzWv0WkpWLg4eTXr4zxny4/pb7nlFlW/Nm3aRA3o1nmQF+ne0mxU7VpET9XyL6ULA75nIJroIUEMOD6yeZWaa0cNRbcIn0/e6YD/88Pb0ehZu5eH4icpqUZI9AQCNZA/aQA2pg1S8/jQm3Rin/1L73wh2jw9TuOZQkaLHR3/4nypmmmZj3ne3DbLqA6ix+ltMvGb2xQQWvxoQWSe57YpYPQ5LWSqQvRoDKa4iybceI2IHs1c1a9F9FS9DQSBMOBrBtyIHhKkhM+mlWp4OoWP6fHp06oTaiR1KAlgTsbT9796edSWEc/z3IPP4IbrbsMN1/0Uz/7tWWxIH6RGc23LHKPihhg/ZFtiFT1Mz64Xvtj14hQykUSP2dWir+dad7WY3S/6PF+sTsHB8iu7e4vlOb0vGqNtrUWM9saYaWznNAfhupv0+UR3b9k4N/k1cTu3RfQ4Gam6fRE9Vce9lCwMCAOA+vI0Xf98MURbKHw44ooTEKqg5hKPT1JSkuHBAX78vTsto7Yuz9ezMX2w6tbaljkWuxZNxYHVi9VMzpzo0LbEK3oobLhoEeO2e4vX8IVqBgk79504yR/T6+4gXabGoEWX9qo4922iyVkGMUSK6WF6ChUttLivy7F125kYbaKCedEbpEWUE6OTE+e+UzSZWIjNWR/n9ea+DaspsJxcmfvELd1bJiNVty2ip+q4l5KFAWEgRtFDwpTw2ZBXInyGqWHrPZp+hKRAcomnJwtP3V8yP0/JpIRqxFdGUOhwFFjB/Azsy52Hwxvy1Nw/nAPI9tLVBuLLMtbuLS1CdEzLwoULVZCzFiWRPD26XL50dReQc/i0TqPXWhBwiLa+xtn1ol/6GpMWQMxDX28GQuu89Vpfr7E466DTUQxoDKbQ43mzTjznxKjz4Jqi5d1331V/Oj8tgHQ6Mz+NS5+LJnqc9eF1kfJz2tRtXA+vE9GjrVK1axE9Vcu/lC4M+J4Bt91bJlGcTZmCJejxGYa80X3w2H3P4Uf/cQfu/8NzGNa5mer+YrwOu8L47S2m3bNstpqUkCPC+OV1zu58pSxuREt1q6tTtFQ3/BqviB7NRNWvRfRUvQ0EgTDgawbiET0kjF9MEHU/eQAAH99JREFUV8JnfroSNpe/szU4KHRmjg4KnaWZOLhmCb7ZuUl9kJTf67oSFxE93rWqiB7v2EZEj3dsIUiEAV8yEK/oIVn8cKgWPvTm8IvqO+ZMxO7sGTiwOhtFO/Jx9vjRsEPRryTCRfR415oierxjGxE93rGFIBEGfMlAeUQPCaPw4Rw7B1cvxqF1y5TQOXPscMTJBn1JtFS6yhgQ0VNl1JcpWERPGUrkgDAgDFQmA+UVPcR68fw5nD91Qq1RXFyZ8KUsYSAqAyJ6olJUaQlE9FQa1VKQMCAM2BhIhOix5SvHhAGvMCCixyuWAET0eMcWgkQY8CUDInp8aXZfVVpEj3fMLaLHO7YQJMKALxkQ0eNLs/uq0iJ6vGNuET3esYUgEQZ8yYCIHl+a3VeVFtHjHXOL6PGOLQSJMOBLBkT0+NLsvqq0iB7vmFtEj3dsIUiEAV8yIKLHl2b3VaVF9HjH3CJ6vGMLQSIM+JIBET2+NLuvKi2ixzvmFtHjHVsIEmHAlwyI6PGl2X1VaRE93jG3iB7v2EKQCAO+ZEBEjy/N7qtKi+jxjrlF9HjHFoJEGPAlAyJ6fGl2X1VaRI93zC2ixzu2ECTCgC8ZENHjS7P7qtIierxjbhE93rGFIBEGfMmAiB5fmt1XlRbR4x1zi+jxji0EiTDgSwZE9PjS7L6qtIge75hbRI93bCFIhAFfMiCix5dm91WlRfR4x9wierxjC0EiDPiSARE9vjS7ryotosc75hbR4x1bCBJhwJcMiOjxpdl9VWkRPd4xt4ge79hCkAgDvmRARI8vze6rSovo8Y65RfR4xxaCRBjwJQMienxpdl9VWkSPd8wtosc7thAkwoAvGRDR40uz+6rSInq8Y24RPd6xhSARBnzJQEWLnksXzuH8qZPgWhZhoCoYENFTFazbyxTRY+dFjgoDwkAlMVARoufi+XM4c+wwirbn49C6ZTiwJhtF29fj4tnTlVQrKUYYuMyAiJ7LXFT1loieqraAlC8M+JyBRImeSxcv4OzxIhwr2IiDqxdjd/Z07JgzAVunj8TWGaOwc0EGjmxaKcLH5+2tKqovoqcqWLeXKaLHzoscFQaEgUpioDyip5hC58QxfLNrCwrX52DPslkomJeqRM7mKcOwMX0QNqYNVOstU4ejYEEGDm9aiQvi8akk60oxZEBEj3fagYge79hCkAgDvmQgVtFTfOkSzp8+iRP7C1CYvxx7cmajICsNW2eOhhI6aYOwITUFG1KTg3+TguuNqSnqfMH8dBzeuAIXz55xzXdRUREaNGiA2rVrl/nLzc0N5ZOeno62bdvi9GnpRguRIhsiejzUBkT0eMgYAkUY8CMDrkRPcTEunDmFkwd3o3BDLvbmzAHFy9aZY0APzsaMwUGPjhY7FDrOv9RklYbCiN6gwvxcXDx31hXlFD1NmjTBtm3bSqXnL/hHHnkEWviI6ClFj+yUMCCeHu80BRE93rGFIBEGfMlANNFz/uRxHNu5CQdWLcKuRVOwNbNE6LDrKpLIcYoeva88PkOV8FEeHxfCJ5zoocH69OkDih0uTtHDczfffHPIO9SrVy8UFxeH0nbt2lV5hrQHKS0tTZ3T//Ly8kLX161bt4zo0ulk7W0GRPR4xz4ierxjC0EiDPiSgWiih4KHnh2Knc1Thkb36GhxE26tur3Y1eVe+MQjenr37l2qq0sLGNMrREGk93meXiPtTYq278vGUk0rLaLHO4YT0eMdWwgSYcCXDEQTPYzd2ZebpUZhMTBZxeqEEzQxHA/F+KhRXasidnWFEz1OYeL09JgGZR6MC9Iix5nWPH/mzBm0a9cu5EHS+dBzRDGlvUX6uKy9zYCIHu/YR0SPd2whSIQBXzIQTfRcunABRdvWY9fCKSp+JxSkHIPAKRPfU3IthQ9jgnYumIyibevAsmyLFiS6G8pcaxHD65xCRh8zu7h0emdaXQbPm9smHl4josdkpHpsi+jxjp1E9HjHFoJEGPAlA9FED0lhwPGRzavUXDtqhFY8sTw2kaSCmwepIe70Jp3YV2C1AUWILZDZmdgUMtym2Klfvz6OHj1aRsiYaZmPKXTMbbMMET0mG9VnW0SPd2wlosc7thAkwoAvGXAjekiMEj6bVqrh6RQ+5fL4UOykpqj5e5jXtswxKm6I8UO2JVbRw/TsnmL3l16cQiaS6JHuLc3albEW0eMdO4ro8Y4tBIkw4EsG3IoekkPhwxFXHHKugppj8fiUzNsTFDuDVbfWtsyx2LVoKg6sXqxmcuZEh7YlXtFDYcNFixh2i7np3uI1zngh574NpxzzJgMierxjFxE93rGFIBEGfMlALKKHBCnhsyGvRPgMizxsXXt0OCtzRlDocBRYwfwM7Mudh8Mb8tTcP5wDKFJwcKyih5MT8kXH0Vg6/mfhwoVqNJeOyYnk6dENgUJHxwPJkHXNSvVbi+jxjs1E9HjHFoJEGPAlA7GKHpLE2ZQpWIIeH0dXl56Jmd1XaYPULMz89hbT7lk2W01KyBFh/PI6Z3eWRRioaAZE9FQ0w+7zF9HjnitJKQwIAxXAQDyihzD4xXQlfOanBz8/EfrO1uCg0Jk5Oih0lmbi4Jol+GbnJvVBUn6vSxZhoDIZENFTmWxHLktET2R+5KwwIAxUMAPxih7C4odDtfChN4dfVN8xZyJ2Z8/AgdXZKNqRj7PHj4Ydil7BVZPshQHFgIge7zQEET3esYUgEQZ8yUB5RA8Jo/DhHDsHVy/GoXXLlNA5c+ywiv3xJaFSac8xIKLHOyYR0eMdWwgSYcCXDJRX9JC0i+fP4fypE2qNkm9b+ZJMqbQnGRDR4x2ziOjxji0EiTDgSwYSIXp8SZxUutowIKLHO6YS0eMdWwgSYcCXDIjo8aXZfVVpET3eMbeIHu/YQpAIA75kQESPL83uq0qL6PGOuUX0eMcWgkQY8CUDInp8aXZfVVpEj3fMLaLHO7YQJMKALxkQ0eNLs/uq0iJ6vGNuET3esYUgEQZ8yYCIHl+a3VeVFtHjHXOL6PGOLQSJMOBLBkT0+NLsvqq0iB7vmFtEj3dsIUiEAV8yIKLHl2b3VaVF9HjH3CJ6vGMLQSIM+JIBET2+NLuvKi2ixzvmFtHjHVsIEmHAlwyI6PGl2X1VaRE93jG3iB7v2EKQCAO+ZEBEjy/N7qtKi+jxjrlF9HjHFoJEGPAlAyJ6fGl2X1VaRI93zC2ixzu2ECTCgC8ZENHjS7P7qtIierxjbhE93rGFIBEGfMmAiB5fmt1XlRbR4x1zi+jxji0EiTDgSwYqQvSkTkrFpImpvuRTKu09BkT0eMcmInq8YwtBIgz4koGKEz2TfMmnVNp7DIjo8Y5NRPR4xxaCRBjwJQMienxpdl9VWkSPd8wtosc7thAkwoAvGagY0ZOGSRPF0+PLBuXBSovo8Y5RRPR4xxaCRBjwJQMVJnomiOjxZYPyYKVF9HjHKCJ6vGMLQSIM+JKBihI9EydMwsmDe7B/5UJsnjpcrX1JsFS6yhkQ0VPlJggBENETokI2hAFhoCoYSLTo+bZwL4Z+0R192zXFhknJpf72r1hQFVWUMn3OgIge7zQAET3esYUgEQZ8yUAiRM/pIwdwcM0SbJ0xSomcfh80Ru9WjUoJHi2A9ufN9yXPUumqY0BET9Vx7yxZRI+TEdkXBoSBSmUgXtFzuugQDq3LwdaZY8qIm0iih+JnX15WpdZRCvM3AyJ6vGN/ET3esYUgEQZ8yUAsoufMscMozM/F9tnjywgd7cnhOproUcInd55rvouKitCgQQPUrl27zF9ubm4on/T0dLRt2xanT58OHausDbcYKwtPecrJyMgI8ajrZfIcb95mvvHmEc91InriYa1irhHRUzG8Sq7CgDDgkoFooufs8aM4vGEFdsyZGFHolBY974bt3jLT7c2Z4wolX7xNmjTBtm3bSqXny+yRRx6BfiFXtehxg7FUBTy6U1HipKLyjUajiJ5oDFXeeRE9lce1lCQMCAMWBqKJHlOkuN3u9wFFzzuuRNLeZbMtqEofCid6mKpPnz6g2OHiFD08d/PNN4e8Q7169UJxcXEobdeuXZVHQ3uQ0tLS1Dn9Ly8vL3R93bp1y4gunY5rNxh12Xz5a1zOfIl59OjRSszx3MqVK5XgmzVrljpGrG3atCnlzTpz5gzatWsXytM8r3ExT11m/fr1cfTo0RB8ptGeNJapeaHHTJ/TwpIXmbyaeTlFjfNa53mTX9br5ZdfDuGiUOnWrZvCQtym7ULAXW6I6HFJVCUkE9FTCSRLEcKAMBCegcoUPS8/0gJJgZr4zx/ci/yJl0d27Vk2KzxAl4KCGZiip3fv3qEuGp7TL1j98mZavkz1Ps/Ta6S9SdH2nYC1uNDXm+e1MKPosb34KTi0CGFaU0ho4WAeYxrdjacFD+ujRRXPs/7c19c70zvPU/Axvfae6fT6es2TE7+5b26z/pGudfKr02pcGofGZfIZ67aInlgZq7j0InoqjlvJWRgQBlwwEE307FmS6cpjY3qBKGjyJw4odV1mv36okVQfgUAxAgHgV7fWKy18lmaGRcsXoq3ryPniNEWPMzP9UtUvb2da87wpJMx8TDFhHue2G4zh0jBfLVqcZZi4dJl8iVMEUWCRA3p5zDgmsxzb9aY44fWm6GIZ5nnzenNbYzHX5nU87kzvPG9ey22z7mYdneli3RfREytjFZdeRE/FcSs5CwPCgAsGookeZrFnaWzC56s27+LLFm+XEj2NnnsDgUCyEjwUPUlJNcsIoz1LZloR65en7oYy11rE8EKnkNHHdLcOr9PpnWl1GTxvbpuAeI32RJjHua2vMbHpbV0mX770Junj5lp7NMwXv87XKfh0WcyXmMz66Tx1t5mZVmM2xYe5rc+bQsq8PpoQceZlXsu8ned5zMmJ7saKVpbG6mbNvE6ePAm2dVmqlgERPVXLv5QuDPieATeihySxC8r05kTapujp37ZJmfRJSUkIBMbhmqtexNvPvF/mPPO0LXx5Ol/8tnSmkNFiQHcLOV/AZlrmZZ43t81yeE0k0RMNo5sXeTyiR3dFmVj1tq0upvgwt/U1lSF6TLGjRaFZdzdcabzR1iJ6ojFUeedF9FQe11KSMCAMWBhwK3p4KYOOI4kdfW7BoM/AP71vrtu81hBLh39hPcd0toUv7miCgtdpIcP07PLhy1svzpe/Tqu7hczzieze0uVzbZZhHje3zRd/uGtMQWDrnjLzs5VpCh3b9eZ583pz2yxDb5vX2bCb57ntFJBm3c066vzjXYvoiZe5xF8noifxnEqOwoAwEAMDsYgeZsth5qaIsW3burds6fQxzvvD+X/OfHPEipwv23hED4UNFy1i2PWjvQqRRA+voRiIFNjsBOoWI1/2ZgyNU0iYL36Woc+b3hwzja6bKSBMIaOv1/Vmnqb40NeTj3gCmc2ynJyxHDNY3CzX3NaYmFa6t5wt68raF9FzZdlTaiMMVDsGYhU9rOC+3HkRhc+s/l3APy1qbOttM8egcH0OzhQVRuXMraAwhQx/3ZvxMwsXLlQjnrQ4MNMSgE0c8CWu42V0jEw4sG4x8nqKFp2vKcT0OY3RxMVj+hpzSLqZRsfz6C4981w40WOm4fW8dtCgQaHRYTZeTPxOXsxzo0aNUvnosk2ho8WWrhPFDm2iBaF4emiZK28R0XPl2VRqJAxUKwbiET2sID8lYRMzPDakU3P15zzPb3PxG12njxysVhxVJVib6KhKPNWxbOne8o7VRPR4xxaCRBjwJQPxih6SxY+HOoUN9xnE3LNk9NaWaV/jwOrF+LZwny/5LW+lRfSUl8HgCDEZvVV+HhORg4ieRLAoeQgDwkDcDJRH9LDQ/SsWlBE+m6cOx/6VC/HtwT1x45ILgwyI6Cl/SxBPT/k5TFQOInoSxaTkIwwIA3ExUF7Rw0IpcDZPHqo8PycP7MK0adMxbuz4uPDIRcJAohkQ0ZNoRuPPT0RP/NzJlcKAMJAABhIhepwwpk6ZKqLHSYrsVxkDInqqjPoyBYvoKUOJHBAGhIHKZKDiRM+4yqyGlCUMhGVARE9Yair9hIieSqdcChQGhAGTARE9JhuyfSUyIKLHO1YV0eMdWwgSYcCXDIjo8aXZfVVpET3eMbeIHu/YQpAIA75koMJEzxjp3vJlg/JgpUX0eMcoInq8YwtBIgz4koGKED2+JFIq7VkGRPR4xzQierxjC0EiDPiSARE9vjS7ryotosc75hbR4x1bCBJhwJcMiOjxpdl9VWkRPd4xt4ge79hCkAgDvmRARI8vze6rSovo8Y65RfR4xxaCRBjwJQMienxpdl9VWkSPd8wtosc7thAkwoAvGRDR40uz+6rSInq8Y24RPd6xhSARBnzJgIgeX5rdV5UW0eMdc4vo8Y4tBIkw4EsGRPT40uy+qrSIHu+YW0SPd2whSIQBXzIgoseXZvdVpUX0eMfcInq8YwtBIgz4koFKET3Fxb7kVirtDQZE9HjDDkQhosc7thAkwoAvGago0VNcfAkXTn+Lbw/uwfE923Dm2GFAxI8v21hVV1pET1Vb4HL5InoucyFbwoAwUAUMJFT0FBfjwplTOHlwNwrzc7E3Zw52LpiMXQun4MDKhTh1+IAInyqwsd+LFNHjnRYgosc7thAkwoAvGUiE6Ll47ixOHz2EI5tXY39eFgrmp2PrzNHYPGUYNqYPxubJQ9U+z50+csCXPEulq44BET1Vx72zZBE9TkZkXxgQBiqVgXhFz6Xz51SX1dGta5UXZ9eiadg+exy2TBuBjRmDsTFtIDakpmBDarJab0wfhK0zx2BfrgifSjWwFAYRPd5pBCJ6vGMLQSIM+JKBWETPpQvncPaboyjakY+Da7KxZ8lM7Jg7CVunj8TmKUNBYRMSOpOSscH425iaorw+QeEzD6fE4+PL9lYVlRbRUxWs28sU0WPnRY4KA8JAJTEQTfQUX7qE86dOqGDkQ+uWlRY6kyMLHVP0cFsJnzR6fEareB/p6qokI/u8GBE93mkAInq8YwtBIgz4koFooufkgV0oXJ+D3YunYVvmWGyZOlx5bNh9RRGjuq8Mj45T6Dj3gx6foPDZlztPYnx82eoqt9IieiqX70ilieiJxI6cEwaEgQpnIJroObZzE/YszcSW6V+r7qt4hI4WPi883AqBQE385Pt/xupxw7B1xqhgjE/RoQqvpxTgXwZE9HjH9iJ6vGMLQSIM+JKBaKLn7IljOLhmiQpS5kgsJXpi8OxowZPecwCSkhogEChGIAD8+tZ62MCurswx2L9ifnAeH19aQCpd0QyI6Kloht3nL6LHPVeSUhgQBiqAgWiih0WeLipUQ9EZi8NgZTfCJ39iMlaNTsaigcmY3z8Zr/7zLQQCyUrwUPQkJdVE/qQBqquMo74OrVuKcye/sdawqKgIDRo0QO3atcv85ebmhq5JT09H27Ztcfr06dCxytpwizHReHS5Jg+RyujTpw969+6NYh9NFCmiJ1KLqNxzInoql28pTRgQBhwMuBE9vOT00YNgDA5HagVHaZUenaU9OqvHBIXO9C+SMenjZIz5MPiX3jUZSUlJCATGIRBogFcfax4cyp42SHWdsQuNXWm2hS/2Jk2aYNu2baVO82X2yCOPQL/wq1r0uMFYqgIJ2BHRE51EET3ROaqsFCJ6KotpKUcYEAasDLgVPbz41OH9atSV8vikXfb4rBmbjKVDk5HZKxlpXYMiZ3jrZAxpkYyBTZMxsFkyuJ/WhR6f95H6xUDl4WFQ9LbMMdi1aCo4MuzE/gIrxnCih4npuaDY4eIUPTx38803h7xDvXr1Cnk4mLZr167KM6Q9SGlpaaXKz8vLC11ft27dMqLLTOwGI70rZ86cQbt27UL5smyWqz0vxDx69Ggl5nSZWtxpnPo4y7eJnoyMjFD+Zlqmd3p6YqmjWd/qtC2ixzvWEtHjHVsIEmHAlwzEInpI0LeF+7AnZzY2ThmF5SMGYVbvFNCLM65jMka0ScbQlkGRk/J+MviX/F4ykt+n+EnB8A8GIb37UCwfNRLb50zE7iUzVLwQPTzs2iq+dNFqAzeCgheaooddOGZXl365m14hCiK9z/P0GmlvUrR9J1A3GLXgMbuXKFDMcilK6tevj6NHj6oitODROHUeum5O0cP89DlmwHqwa1DnZ4qeWOvorHN12RfR4x1Liejxji0EiTDgSwZiET3nzgGHDwMrFu5F5pA5mNR9NEa2H4RhrVMwuHnQqxMSOhQ776Ug+f2BSG46BCktRmJQm4kY8ckMTB+SjY1L1uFMUSH4CYtoSzhB4Xxpm6LHmadTHDjTmue1sGAaczEFg3mc224xOq/jC5kiR4utSGXoa01hY+IOh4F5si70Jun8GfdEj5M+rvPW57XnSR+vzmsRPd6xnoge79hCkAgDvmQgmui5eBE4fhzYtAlYsgSYMQOYOLEYw/vvwZDOszGw1SikNB2E5PdTgl6dkNAZjORmw5HcciwGtMlAcod5SOmyCoP6HMSoEWcxe1Yx9u1zR7l+sevuHXOtPSDMySlk9DGzi0und6bVZfC8uW0i5DWml8Y8p68xseltXaaZnuJC4zK7oMKJDmf+bdq0UQHb+jjL0F4hXa651l1oOn96fugBcmKjoApXRxN/ddoW0eMda4no8Y4tBIkw4EsGoomeggJg2TJg6lRgzBhg+HBg0CAgJaUYKV/sQfKHs5HcYpTy5iQ3HYwBTYchueVoJH+QjuQP5yL5kxUY8MUeDOh3GsnJxUhJCV4/ahQwezZcCR++2G1Bwk6DmUKG2xQVuqvIFAe8zkzLffO8uW2WEU30uMGoxY4WLdE8PRoLBYwWLuE8Pc68TOx6W0SPZkLWVcGAiJ6qYF3KFAaEgRAD0UQPPTyZmcDXXwfFSnIyEPobUIzkHruVF0eJHCV0ZiP54+VI/rwAyX1PInnApcvpjWspnEaOBObOBQ5E+fA6X/xuBIUWMkzPrht2f+lFiwft2dBp9fB283wiu7d0+Vzb6uEUKlqU6O4l1oF10TiZTzjRY9bBLNfc1vlL95bJimxXFgMieiqLaSlHGBAGrAxEEz3s2qKnZ/x4YPBgengM0aNETDGSvzyE5E83B4VOnxNIHnDRKnRCYqlE/FD4jB4NZGUBhYVWeOqgTSzYUmshw/Q6XoXptIiht8SN6OE1zngh576zfDcYnaJE70fq3mK5ZiAy9+nB0p4inYeuFwWRmd55XoseiipnnZz7zjpW133p3vKO5UT0eMcWgkQY8CUD0UQPSWHw8vz5we6tYNeWU/gAyfT6GJ4ct9sUUuPGBeOFiorsJuCLOxZPD70YfNFxVJSOa1m4cKEa1aTjVbRA0h4UpzggEi0wmIcpTGwo3WJ05kmxQpGiu65MUaLL4TEd/0Oxs2jRotCILxtuM70p9JifM38nHh1Qrcu+EtYierxjRRE93rGFIBEGfMmAG9FDYg4dCgofembCCp8YRY+O72HXGbvQ2JUmizCQaAZE9CSa0fjzE9ETP3dypTAgDCSAAbeih0UdPAjMmxfskopX+FDoDBwY7CobMSLo5Zk2DcjJAXbuTECFJAthwMGAiB4HIVW4K6KnCsmXooUBYQCIRfSQLwofBh/H6vHRYmfo0GAA86RJQe8O44W2bAFOnAA4PF4WYSDRDIjoSTSj8ecnoid+7uRKYUAYSAADsYoeFsnRVm48Prr7SgudiROD8/xkZwP5+cCRIwAnPJRFGKhIBkT0VCS7seUtoic2viS1MCAMJJgBip4TJ05gx44dMeXMiQU5zw7n2zG7urRHhwHK7L4aOxaYMiUYD7RqVTA26Gz0SZhjwiKJhYFIDLBts42zrctStQyI6Kla/qV0YcD3DGjRU8BZCGNcKHzmzAkKH4oc/nHyQk5imJERHIq+cmXQM0ShU1wcYwGSXBhIAANs2yJ6EkBkArIQ0ZMAEiULYUAYiJ8Bip5vv/0Wu3btCn3p221uFDF79wa9OBQ5kycHu71yc4Fdu4BTp0TouOVS0lUMA5yPiG2bbVw8PRXDcSy5iuiJhS1JKwwIAwlngC8FzlWzb98+nIsjwIbChxMLMhh5927g228ZHJ1wmJKhMBAXA2zTbNts43qW67gykosSwoCInoTQKJkIA8JAvAzwRcAXw+HDh8GPUMa7SNdVvMzJdRXJANs02zbbuIieimTaXd4ietzxJKmEAWGgAhm4ePGiinnYvXs3uC2LMHAlMMC2zDbNeB5p196wqIgeb9hBUAgDvmaAv4DPnj2LwsJCHOREPLIIA1cAA2zLbNNs2+Ll8YZBRfR4ww6CQhjwPQMM8jx16pQSPeXp5vI9kUKAJxhgG6boYZuWAGZPmESBENHjHVsIEmHA1wzwlzC7AE6ePKleFnxhSJeAr5tEtaw82yzbLv/YlrkvXh7vmFJEj3dsIUiEAd8zoIUPfx0z+JPxEPzFLEGgvm8aniaA7ZZtlG2VbZZtl21YBI/3zCaix3s2EUTCgK8Z4AuE3QGMg2AAKF8gHPLLuU44yRtnt+W0/vInHFR1G2BbZJtk22QbZVtlm2XbZRsWD4/3HmUierxnE0EkDAgD4KSCwe4u/oLmHCec3I0vFHYZyJ9w4JU2wDbJtsk2yrYq3h1vP75E9HjbPoJOGPA9AxQ/2vvDX8/yJxx4sQ3odur7G9bjBIjo8biBBJ4wIAwIA8KAMCAMJIYBET2J4VFyEQaEAWFAGBAGhAGPMyCix+MGEnjCgDAgDAgDwoAwkBgGoooeZwLZD0A4EA6kDUgbkDYgbUDaQPVvAwExYvU3othQbChtQNqAtAFpA9IGoreBQM86dcSTEYhOlDQm4UjagLQBaQPSBqQNVN820PmHP0RgW1YWutx0kwgfET7SBqQNSBuQNiBtQNrAFdkGPvzud7G0f3/8P3a7CJS4+RoOAAAAAElFTkSuQmCC[/img][br]
[size=150][icon]/images/ggb/toolbar/mode_planethreepoint.png[/icon] Plano por três pontos [br][/size][justify]Com a ferramenta [icon]/images/ggb/toolbar/mode_planethreepoint.png[/icon] [i]Plano por três pontos[/i] selecione três pontos no espaço. O mesmo pode ser obtido através do comando Plano( <Ponto>, <Ponto>, <Ponto> )[br][/justify]
[size=150][u][icon]/images/ggb/toolbar/mode_plane.png[/icon][/u] Plano[/size][br][justify]Com a ferramenta [icon]/images/ggb/toolbar/mode_plane.png[/icon] [i]Plano[/i] selecione: três pontos, um ponto e uma reta, duas retas ou um polígono. O mesmo pode ser obtido através dos comandos: Plano(<Ponto>, <Ponto>, <Ponto> ), Plano(<Ponto>, <Reta> ), Plano( <Reta>, < Reta> ) ou Plano( <Polígono> )[/justify]
[size=150][icon]/images/ggb/toolbar/mode_orthogonalplane.png[/icon] Plano Perpendicular[/size][br]Com a ferramenta [icon]/images/ggb/toolbar/mode_orthogonalplane.png[/icon] [i]Plano Perpendicular[/i] selecione um ponto e uma reta perpendicular. O mesmo pode ser obtido através do comando PlanoPerpendicular( <Ponto>, <Reta> )
[size=150][icon]/images/ggb/toolbar/mode_parallelplane.png[/icon] Plano Paralelo[br][/size]Com a ferramenta [icon]/images/ggb/toolbar/mode_parallelplane.png[/icon] [i]Plano Paralelo [/i]selecione um ponto e um plano paralelo.
Tente você mesmo
[list][*]Construa um plano p a partir dos pontos A, B e C e, em seguida, construa um plano perpendicular ao plano p. [/*][/list]
Tente você mesmo
[list][*]Construa um plano p a partir das retas f e g e, em seguida, construa um plano paralelo ao plano p. [/*][/list]

Information: Planos