Übe zuerst den Umgang mit den Werkzeugen![br]Setze zwei Punkte im Abstand von 1: [img]data:image/png;base64,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[/img][br][br]Lass dann ein "regelmäßiges Vieleck" mit 4 Ecken zeichnen: [img]data:image/png;base64,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[/img]

Einen Kreisbogen erzeugt man, indem man das Werkzeug auswählt und dann nacheinander den Mittelpunkt, dann den ersten Eckpunkt und dann den zweiten Eckpunkt anklickt (gegen den Uhrzeigersinn).[br]Erzeuge oben einen Kreisbogen:[img]data:image/png;base64,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[/img]

Das zweite Quadrat hat wieder Seitenlänge 1: [img]data:image/png;base64,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[/img][br]Das nächste Quadrat hat Seitenlänge 2:[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAYQAAAFKCAYAAAAdXygXAAAgAElEQVR4Xu2dB1xVxxLGP0SQau9i77333nuLvcUkmm56Ly+9GZNoYhLTE00sicaa2GuMBRVLFAFRQAWpAtKkiW/m4L1Bg3DLqpdz5rwfD6O7c89+s/f8z5aZdbpKFxzwiou9CF/fw2jeojFq1PBxwDssWre0betf8PBwR+cu7YvWjTvg3fqfCERY2Hn0H9ATrq6uDniHReeW5Huu1lf2fs+dBAhqHeKo1uztKI7arjtxXwIEdaoLENRpyZbs/Z4LENT6w2Gt2dtRHLZhd+DGBAjqRBcgqNNSgKBWS11bEyCoc68AQZ2WAgR1WgoQ1Gqpa2sCBHXuFSCo01KAoE5LAYJaLXVtTYCgzr0CBHVaChDUaSlAUKulrq0JENS5V4CgTksBgjotBQhqtdS1NQGCOvcKENRpKUBQp6UAQa2WurYmQFDnXgGCOi0FCOq0FCCo1VLX1gQI6twrQFCnpQBBnZYCBLVa6tqaAEGdewUI6rQUIKjTUoCgVktdWxMgqHOvAEGdlgIEdVoKENRqqWtrAgR17hUgqNNSgKBOSwGCWi11bU2AoM69AgR1WgoQ1GkpQFCrpa6tCRDUuVeAoE5LAYI6LQUIarXUtTUBgjr3ChDUaSlAUKelAEGtlrq2JkBQ514BgjotBQjqtBQgqNVS19YECOrcK0BQp6UAQZ2WAgS1WuramgBBnXsFCOq0FCCo01KAoFZLXVsTIKhzrwBBnZYCBHVaChDUaqlrawIEde4VIKjTUoCgTksBglotdW1NgKDOvQIEdVoKENRpKUBQq6WurQkQ1LlXgKBOSwGCOi0FCGq11LU1AYI69woQ1GkpQFCnpQBBrZa6tiZAUOdeAYI6LQUI6rQUIKjVUtfWBAjq3CtAUKelAEGdlgIEtVrq2poAQZ17BQjqtBQgqNNSgKBWS11bEyCoc68AQZ2WAgR1WgoQ1Gqpa2sCBHXuFSCo01KAoE5LAYJaLXVtTYCgzr0CBHVaChDUaSlAUKulrq0JENS5V4CgTksBgjotBQhqtdSdtUuXLsHf3x8BAQHYuGEz3NzdMWBAXzRp0kT7caf/lst6BQQI1mt2Y43g4GCcPHkShw76wffAAXTs2AFdu3bR+mWNGjXs/wCDWrD3xc/pKl2OqJ28OdjnlR9++AFz585FWloaLl++jJSUFM2gt7c3PDw8UK5cObz00ksYOXKkfR9kwNoCBNudHhQUhNmzZ2Pv3r1av0xNSQWccu15eXlpfXPYsGF4/vnnUb58eds/yKA1BQgGdfzNms1vXvyFW79+PRVxQvXqNVGubDmUKVMWzP74+Iu4eDEOIaFn6AvoicmTJ2tfvjJlyoiSFiogQLBQqBuK/fjjj1rfDA8PR8OGTVDSuyTKUt9kCKSkJGv9MiYmBtExkfTvDfHqq69qcJDLcgUECJZrpfuS/MY1ePBg+Pn5oVatumjbph1KlCiB4sVd6Ke41v7s7CxkZWUjNS0VBw/uR1xcDMaMGYNvv/1W9/qoaqAAwXolf/rpJ7zyyiv0UgI0b9YSNWvWgrNzca1fFitWDDk5OdQvuW9mIfh0EI4dO0IvKaXBEOndu7f1H2jQGgIEgzo+v2a/8cYbeP/999G2bQeai20GTw/Pm6rDo4XU1BQcICicPRuK+fPnY/r06aKmBQoIECwQKU+RwMBA9O3bF05OTujXdxCNCDzh4uJyUyMZGRk0WojFunWr0ap1K+zatUt7sZGrcAUECIVrZIgSW7ZswaRJk1CqZGn06zcIbm5uFrU7NTUVf/y5mt7UnLFjxw7Ur1/fonpGLiRAsM77PC25dOlSDBs6EnXq1LOoMo8Y/PwO4pCfrzZ19Nprr1lUz+iFBAhG7wHX2j9z5kxteD1p4jRaMLZuMe706VNYv2EdPvn4Y8x69GHtTU77H/2W678K+PsH0qgqnMDbA66uriJRAQqcPnMabdt3RL26DdC5c7cCRwY3mklPT8cG6pfpGem0thAtOluggADBApGMUKRRo0Y0zI4nIEylB3kxq5rM87Zff/M5erRqjOfG9oOrS3G40LoD/86Fw7WL/0A//DfFrsFC+3eDgSMmOhaJiUmoW7cmnK+tzVgluIEKbz0ShBcWLMHQISNIL+tHn/v376FpTV8EBgZoC81yFayA3UCIjIx2yG2nSZeSERx8BjVr+cj2s0K+BZcuJaJFi+b0FlZfmy6y5Vq65CdcvZyEJ1qWpkW+3Ie8E/12pt/0SwMA/70zLQAWpz87O9Nv+m/+4UVBvkzgyOVDHpDYckMOXCczKxNXsq/QtFwJq+HrwM26Jbe2NCABa4PicO8999OW55JWf0ZIyGma0lyDBQu+wqhRo62ub7QKx/85SaNWFzRsZD18tW8tEcUhgcBziBkZmXChxhV3djaaX61qbwC9Pc2a9SC6d++F1q3aWlXXVHjzlvUIDgrAk41dUCLPAOO6h7s2Osh91PPf5z73c4HBoHCm3xokCBYuDA6ykzuCuB4QRX1AYQrdMdrIyJaONfefFISkOuG+mY+aXxyssZOUdAk/LfwOkydNxYwZD1hT1ZBl09MztO9ciRK2TWU6hYWec0ggpFDASljYeVStWpn2Kpc2pHMtbfTFixfRtl1rtGzZBj172LZFb8XvS5EcF4VZDWkboKUfnKecBgrTg59HFNp/Mxyc4KIBwpmmoXL/zNAwjR9MdWz4yDtW5erVHG2bpLP2oiLrLAU5YlFQCnZFZuC+ex/S4g2svcLDz2Plqt9o99wHNB062drqhisfFHhae4muU6emTW13ovljhwTCxbh4HDp0DE2bNoRP9ao2Nc4ola5cyUG9enVpGuMqxo2baFOzv1zwKWqWdMGo+qWQQ/a0TkH/l9s5rl77fe1P/Pf8Dxb0HG0kYV53yIWEC+1o8vZwpx+3az/u2giDp6j48Wpan7CpIbehUlraZfCCZ5kypWTKqBC9t5yKxvxdgRg1ciylpLD+IeV3+CD27PkLvr6+aNOmzW3wbtH+iF079sKdvlcdOtqmlaSuKNr+N9/96NGj8ccff2DqlHtRsqR1c7Wmt7CnH74fD909EdkUuHb5cjrS0i+bU1+k8X9T4BvnR7p0KQkJ2u9LFOiWjas5V5FDhLhKb82MEn575p+bXfzQ19Yg6A1bm2qiP9eoVg0+PvRTtSoFLdWAN0VRc+AS/3sx+ndHukLPnEVkZAx96VqjOC28y3VzBQJIq96jJ6EdxcZ06dLdaqnW/bEaFy6E0yJ+osVbqa3+EB1VsHtRWXIZ6aM3/P777xg7dqwWkNav70CLG8UP9NVrfqeHewL+2vQnGjVsoKW44Af6FX6wX7ly7XfuQz77SrYGgdyfK0i8BoaExEv0pb2EOEqNER0TSz8x2jCCRy9s70rOFa3+zVJnceAR/7jR3GeJEm6oVbMm6tWphbp16qB6tarabp5ceDjf8V1NPCw/f/4CevbqbNU2SoudoqOCHGQ2ZvLd2E9J7AYPHgafatUtbl1AgD92/bUdU6ZMAefmkqtwBQQIhWtkiBLJycl48skn8csvv6BXz75o1KiJRe32PbCPpuYo+OeFZ/HUY4/SdI51b7waGAga2m8aWWRRaozMzCxtSiUmNg7RsbG0h5x/KEdNbAySklNyIUOgMEEivxtlOHhQNlYOsCtXrizq1mI41Ebd2rXhXdKbRhec9uDOwEGAYFHXMhc6dPgIhowehzKUt2jI4OHk08Kz7CYkJGDV6uWoXLmSFjDp4+Nj3YcatLQAwaCOz6/ZERER6N+/P729hqNx46Zo07qt9rad35WYmIDDRw7hzJlg9OjSGd99OZ8W79UluOORAMc3ZPJPZiayCBK8XTM+PhHnI8JxPjwC4REXEH7hgjbVlBcQN44ieFTgTmBwd6cfepjUq1cHTRs3QfOmjbWFSm3q6TbuRBMgWPel434wd/4XeOfDj1GpUhXKsdUetWvXuamRwEB/ilA+qCVi/PXXXzF+/HjrPtDApQUIBnZ+fk0/evQo/ve//2Hr1q1axHJtSnLHmU7LUrprfjOPj49HQsJFBNEW02TKMDl14jg88/hjNEVze3LQ80iCpxF4S3E6/U6h1Bmc/fIcAYKBFnr2nAYQBgRPT+W3FsGjBi9PT1pn8CIoNEUzAkPD+vW0RGmmZGm3slsIEKxXNz4+AYuWLsO8z79CBvm3fr0G9AJSVhs1lC5VGvEJ8Yin3XKxcbEIpUy8PDLgZHjjxo2DJ/laLssUECBYppNhSvEDNCwsDCtWrMBHH31ECexStajj4loyMX5rp2kdemOrVq0Knp71CPr36Y2qVSrfMX14NMB7pxkSDAjO2HomNBQhIWE4HRqCqOgYbdcTTy9dIaDdOHpgMPADo1KlimjWuDGaNmlsXnPgkYMpaE5lAwUItqnJa0ynzpzBJ59+jq07d2mbBjjJHUOc+2Q2/fBOM86++8wzz9AoorbAwEqpBQhWCmaU4jwHy2A4tmE5ti36HOeSMrVAsRplvTDuzQWoWKECalT30d60He1iKPAup8u0y4kXqM8QHELCQul3qAYM05pF3vvmKSMTHGrRiVvNCAxNaeRQls55YDCY0n+raKsAwXYV+YWFpwvjaDSwfv5b8D9+DFGpV1DNuziaNmuOUf/7nEYHlWXNwEaJBQg2CmeUaqc2LMHOj55CymWKYKRGlypdGuN+/Pu2zrnbozVPMfF2VxMgTgYE4vjJAPBv026nG6eVSlDCOR418A/vmmrWuBFNLTWBK58NoWC9QYBgj0f/rbtj9uMI9d2OtMxseJZwQa123TH041VqjBvUigDBoI63tNkhW37F3o+e0OblOZDMndJjj/xhj6XVHa5camqatu7Ab5gn/E/Cn86LDjt3XoMDTyndCAfeqcRgKEMgzB01NEH9unW03VS2jhoECGq6xb5Pnka47xZtxMeHOFVt2wP9Z69QY9ygVgQIBnW8pc3WGxBM7eYYCT6Pl+FwnhalTxAY/E8G0glwcVp8BC9I511v4AhpbUqJAt4aNWiATu3aUcxGI5vAIECwtPcVXE6AoEbHvFYECOo11ZVFvQIhr5M47oEXzxkOwafP4ARNKTEgLqelUVxE7sgh78W7lEpRNHeDevXQsX1btGjWVHtDdbEw6liAoOYrIkBQo6MAQb2OurVoBCDkdR6vNTAYUlJScJymlBgMgUGntHTVN25j5eA3BgMHvHWkEUObVi0sAoMAQc3XRYCgRkcBgnoddWvRaEDI60jOmMtw4DQa/rQIfZhiNKKiYrRo6rxrDXzqGYOBYzE6tGtLcGirrS/c7NxfAYKar4sAQY2OAgT1OurWopGBYF5voCkjBkNSUjIOUhqFAwcPIYIipDmKOi8YGAAMhuqUJoHB0Kl9Oy2vPMMh79kHAgQ1XxcBghodBQjqddStRQHC9a5NpqkkztJ65Ng/OHDID2EUGX3jOgMDgMFQhQL2GAoMB96pxDuTGAwCBDVfFwGCGh0FCOp11K1FAUL+ruURA6fx/ufECRox+GnR0TxiyLsAzcFuDAYO4uvYoR3Bob323yFnwiTbqYJvjABBgYg3mJBdRuo11ZVFAULB7kylnUgMhpO0+OxLI4agU8HaiIHjGkwXp79gEFSm9Bh9e/dCmZJlEEXnIfTu01XSX9vxbREg2CHeTaoKENRrqiuLAgTL3Gk6/CcwKBi+fn5aJLSWX+cGMJSjhGyVKlRCTcrrP278SC1Ft5ytbJnGN5YSINimW0G1BAjqNdWVRQGCde7kcxwSacQQTEnYeI3h2PET/wFDVhZF1lJitgljR6N/317w9KD1BQtjGKy7G32XFiCo968AQb2murIoQLDNnZx9lcEQEhqGfb4HaBH6mHlXUkpKmpZbqU7tmpRevCb69OqBtq1bwZV2Kd2K7Kq2tcDxawkQ1PtIgKBeU11ZFCDY507OAcXHg/KupB27/tIO9YlPSNSAUK5cGW1kwNNIrVu2QO8e3VGdMsgyGOQqXAEBQuEaWVtCgGCtYgYrL0BQ4/A0WnyOo8OFduzcjTV/rNcWokuXKUUjAs4hC+3ktnJ04lzvHj3Qp2d37XxoW5Pnqbljx7ciQFDvIwGCek11ZVGAoNadPDrYvuMvbN62A6lpKf9Jh8FZVevVqYNePbqhRfNmMo1UgPwCBLV9k60JENRrqiuLAgT17vQ/EUipMILg6uaM3Xv3IzIqSlt4Nl0c8cyjhbatW9OIoRudSFdFtqfm4wYBgvq+KUBQr6muLAoQ1LvTFKnctn0LLR3Glh078NfuPf+JX+Do5vK0vjCofz9069oZfHCPbFH91x8CBPV9U4CgXlNdWRQgqHfnjakrLtLaAge07dj9NwJo5HBj8rzy5cqhS6eOGDpogBbgxhHQcgECBPW9QICgXlNdWRQgqHdnfrmMeDdS3MV4+FLivJ0Ehlg6qCfvNJKXlxca1q+HYYMHab9vlklV/d06rkUBgnrfCBDUa6oriwIE9e4sKLldcnIKYmJjaRppJ/bs3XddRlWGAOdFGjZ4ILp1kSkkAYL6vilAUK+priwKENS7s7Bsp3x0J48WDvodxvpNm8FTSnlTYOROIXXA0IE0hVSqlGGnkAQI6vumAEG9prqyKEBQ787CgGD6xNTUNISEhWLt+o103nNAvlNIQwcNpDOe6xtyCkmAoL5vChDUa6oriwIE9e60FAj8yZxOm09s27hlmxbpnPdQHtMUEo8UunfrYrhdSAIE9X1TgKBeU11ZFCCod6c1QDB9Ok8b+dK5CxtoCokjnm+cQurckaaQaBdSaQNNIQkQ1PdNAYJ6TXVlUYCg3p22AIHvgqeQQsPCaAppA00hBdJoIdN8c7wLqX7dehg+xDhTSAIE9X1TgKBeU11ZFCCod6etQDBNIUXRFNLmLduxfdeu66aQOPcRH8IzeEB/9OzeTZtC0vMlQFDvXQGCek11ZVGAoN6d9gAh7xQSn7ewftMW2pF08T9TSL0ICCOHD4UbJcnT6yVAUO9ZAYJ6TXVlUYCg3p0qgHDdFNIG2oXkH3DdFFJJimju3qULxo0eoWVS1WPKCwGC+r4pQFCvqa4sChDUu1MVEMxTSNE0hbRtO7btpCkkinjmOAa+vCgXUod2bTF29CgtWZ7eDt8RIKjvmwIE9ZrqyqIAQb07VQIh7xQSp71YvmoNLT6nmqHgTmc2t2jWFBPG3IVqVavoCgoCBPV9U4CgXlNdWRQgqHfnrQBC7hRSKnwPHcaKVau16OacnBzt5l1pcbkB5T+aNHYM6taprZvIZgGC+r4pQFCvqa4sChDUu/NWAYHvlI/mPO7vj99WrsL58AgzFHgHUg0fH0yeMA5NGzfSxWlsAgT1fVOAoF5TXVkUIKh3560EAt8tryMEnz6DpctX4HRIqBbtzBcvLFerWhUTx95Fh++0KvJQECCo75sCBPWa6sqiAEG9O281EPiOGQLnzodj8W/LtTxIeSObq1aujLtGjdDOWHChkUNRvQQI6j0nQFCvqa4sChDUu/N2AIHvmncbRVyIxLLlv8Pv6NHroFCpYgWKah6C3j27a+c2F8VLgKDeawIE9ZrqyqIAQb07bxcQTHd+ITIKK9esxd79B7TT2ExX+fLlMKhffwwa0LdIRjULENT3TQGCek11ZVGAoN6dtxsI3ALOmLpu/aZrGVP/zYFUtkwZ9OnVE6MoqrmopboQIKjvmwIE9ZrqyqIAQb077wQQuBWc4mITpdHesHkrMjIzzA3jc5r79+mN0SOHF6npIwGC+r4pQFCvqa4sChDUu/NOAYFbEp+QqCXFW73uz+uimhkKw4cOxhA6W6GoLDQLENT3TQGCek11ZVGAoN6ddxII3JpLSUnYvWcfVqzOjWo2XTx9NGbUSPShhWaOW3D0S4Cg3kMCBPWa6sqiAEG9O+80ELhFKSmp2PX3Hiz9bcV100cVypfHxHFj0IUO3HF0KAgQ1PdNAYJ6TXVlUYCg3p2OAAQTFDZs2YrVa/+4LlMqn6kwbdJELXjN2dlZvQCKLAoQFAmZx4wAQb2murIoQFDvTkcBgmn6aN2fG7SF5rwnsHEivPvunoZmTRo7bEI8AYL6vilAUK+priwKENS705GAwK2Lj0/ASholbNu587rgtdq1auL+e6ajXt06DnmeggBBfd8UIKjXVFcWBQjq3eloQOAWxsZdxK8U0bzH19cMBc591IQS4c2cPk3LgeRoh+wIENT3TQGCek11ZVGAoN6djggEbmUUHbTzy9Jfr0tzwQvLbVu1wj3TpqB8ubLqxbDDogDBDvFuUlWAoF5TXVkUIKh3p6MCgVsaceECfvh5sZYQz5QltQSdy9yVEuFNnzJJO47TUS4BgnpPCBDUa6oriwIE9e50ZCBwa8POnsO3Py3E6TMh5vMUPOjktb69emHCuLscJsWFAEF93xQgqNdUVxYFCOrd6ehA4CypAYFB+G7hzwiPiDAfx+nt5YXBA/pj1IhhDhHNLEBQ3zcFCOo11ZVFAYJ6dzo6ELjFPF3EKbN/+nmJlgOJIcFX6VKlMIEO2Ondo/sdj1EQIKjvmwIE9ZrqyqIAQb07iwIQuNV88tqe/b5YtGQZRTanmIWoWKECHr5/hnYU553ceSRAUN83BQjqNdWVRQGCencWFSBwy9MuX8b2nX9pKS7yBq41pYC1xx96EGXLllEvkIUWBQgWCmVFMQGCFWIZsagAQb3XixIQuPXJNDr47fdV2Lrj38A1FzplbWC/vpg8YdwdW08QIKjvmwIE9ZrqyqIAQb07ixoQWIHYuDh888NCHDt+3LyeUNLbG5PHj0OvHt3uyHqCAEF93xQgqNdUVxYFCOrdWRSBwCqcOn0Gn32xANGxsWZR+Gzmhx+YiSYNG9729QQBgvq+KUBQr6muLAoQ1LuzqAKBdx5to2mjhYuXXbee0LxZUzz20AMoU7q0erEKsChAUC+3AEG9prqyKEBQ786iCgRWgncbLVux6rpEeLyeMLh/P0wcP/a2ricIENT3TQGCek11ZVGAoN6dRRkI2npCbBy+/vEn/HP8xL/rCSW9MWX8ePTs3vW2rScIENT3TQGCek11ZVGAoN6dRR0IrEjgqWDMX/AVYggOposP1nmE1hMaNWhwW9YTBAjq+6YAQb2murIoQFDvTj0AIZvWE7Zu34Gfl/x63XpCi2bN8NjDD2gRzbf6EiCoV1iAoF5TXVkUIKh3px6AwKpwfMKy5Suxfdcu8xkKvJ4wdNAAjB9z1y1fTxAgqO+bAgT1murKogBBvTv1AgRWJoa2oH79/U847u9vXk8oVaokpkyg9YRuXW/p8ZsCBPV9U4CgXlNdWRQgqHennoDA6gQEnaL1hK+14LV/1xMq4YWnnoCPTzX1Al6zKEBQL60AQb2murIoQFDvTr0BITs7G1u276T1hGXIys4yCzaoXz9MnzoJfOrarbgECOpVFSCo11RXFgUI6t2pNyBo6wnJKVi0dBl27f77utQWjz44E61btrwlu44ECOr7pgBBvaa6sihAUO9OPQKBVYqMjsZ7sz9CVEyMWbQmlCL7xaefhDuduKb6EiCoVhQQIKjXVFcWBQjq3alXILBSa//cgCW/LTefx8y7jniBefCAfsoXmAUI6vumAEG9prqyKEBQ7049AyHx0iV8RgvMx0/4m4WrUL48nqcF5lo1aygVU4CgVE7NmABBvaa6sihAUO9OPQOB1Tpy7B98NG/+dQFrfXv3xMzp02mB2VmZoAIEZVKaDQkQ1GuqK4sCBPXu1DsQMjIy8NMvS7WAtZycHE1Aby8vPDTzPrRv20bZArMAQX3fFCCo11RXFgUI6t2pdyCwYtHRMXj/k3mIiIgwC9igXj28+MxT8Pb2UiKqAEGJjNcZsRsIWVlZV9Xflv0WL8bF49ChY2jStAGqV791wTH236ljWwjd+hv2z30aWXTgOu0nhHvJ0hj27W7HvmkHv7vgU2cQHh6Frt3aw9XV1cHv1vbb27B5K36mrah8jgJfzs7FMXHcXRg6cICSjKi+855FxIGt4LxKHOtQpU0P9HnvV9tvWGpi18492o6wDh3b2KSG0wHfww4JhEx6gCUmJmlvI+7ubjY1TioBCX6bEbF8Tu7Q/2oOirt5ov6zP4k0diiQkpqK9MsZdEB9aeU7b+y4LeVVLyUl4deVK3E6JMRsu3y5cphKabKrVqli9+eFr/gYKUG+4AeQk1MxeNVrjdr3z7HbrpENxNGLtLNzMZQpY9thRw4NhEsEBC8Bgl39+zog0FeveAkPAYJdigKpqWkEhHSULVdae5Dp+QoJC8NPixcjndYVTFfrFi0wbtQouyOYI37/GEmBvppZDQj1CQgzBQj29CeeWSnm7ExAsC1brVPSpSSHHCEkJFzC8eMBqN+gNqpUrmSPRoaue27nShz+/HnQ1CCNEIASXiXRf/5WQ2tib+PDws4hKioW7dq1oIeii73mHLo+p7L4beUqbN62w7zA7EFTEtOnTELnjh3gRP+z9Tr85UuI8tuOKzR65emoSq26otvrP9tqTuqRAr77D8PNvQRatmxqkx5OV+myqeYtrhQXexG+vofRvEVj1Kjhc4s/Tb/mZVFZvW+NsKicV7WYmFjMnvspzp0/b/7rOrVq4aXnnrbr3ARZVFbfN+1eVBYgqHeKI1kUIKj3htGAwApuoRHCD4t+oQXgbE1Q52LOmDZ5AobQArOTk22jBAGC+r4pQFCvqa4sChDUu9OIQEhOTsaX3/6AQ4cPmwWtUrky3n39Vdr44W2TyAIEm2QrsJIAQb2murIoQFDvTiMCgVU8dvwEPvhornmUwCODmffcjf59ets0ShAgqO+bAgT1murKogBBvTuNCgSOYJ47/0v4HT1qFrVm9ep4+7VXbMqGKkBQ3zcFCOo11ZVFAYJ6dxoVCKyk35FjmDPv0zzBas54aMa96NWju9VCCxCslqzQCgKEQiUydgEBgnr/GxkIlyn+4uPPPqfpo+NmYevVqYO3/vcyOFW2Nf7kkAoAACAASURBVJcAwRq1LCsrQLBMJ8OWEiCod72RgcBq7jtwEJ9+scA8SuC0E7MeegBdO3W0SmwBglVyWVRYgGCRTMYtJEBQ73ujAyE1LQ1z5n4G/4AAs7iNGzXEay++YFV6bAGC+r4pQFCvqa4sChDUu9PoQGBF/9qzF19+8515lMBJ/p545GF0aGd5UjUBgvq+KUBQr6muLAoQ1LtTgACkpKTgfdqCeur0abPALZs319JjW3qIjgBBfd8UIKjXVFcWBQjq3SlAyNV0285d+PbHheZRgpubG56a9QjatGppkegCBItksqqQAMEquYxXWICg3ucChFxNkyg99ntzPsGZ0FCzyHyi2jOPz7LovAQBgvq+KUBQr6muLAoQ1LtTgPCvphs2b6HjNpdclwn12SceR/NmTQoVXoBQqERWFxAgWC2ZsSoIENT7W4Dwr6aJiZfw9uw512VC5e2njz38YKGjBAGC+r4pQFCvqa4sChDUu1OAcL2ma/5YjyW/LTePErw8PfH800+iccMGBYovQFDfNwUI6jXVlUUBgnp3ChCu1zQ+IQFvvjcbFyIjzf8weGB/3Dt1SoFJ7wQI6vumAEG9prqyKEBQ704Bwn81XbZiJX5fvcb8D2XLlMHc2e/Bw8Pjpg4QIKjvmwIE9ZrqyqIAQb07BQj/1TQ84gKefflV8xZULvHck08UGKgmQFDfNwUI6jXVlUUBgnp3ChD+q+mVK1e0xWX/k/+ms+jauRNFLz9002kjAYL6vilAUK+priwKENS7U4CQv6Zbtu/QAtVMx7TzSWqz334DFcqXz7eCAEF93xQgqNdUVxYFCOrdKUDIX9OExEQ889Kr4OM2TdcD992jnaiW3yVAUN83BQjqNdWVRQGCencKEG6u6bzPF2DP/v3mAs2bNsErzz+bb0yCAEF93xQgqNdUVxYFCOrdKUC4uaYHDvlpB+jk5ORohdwpv9FbdMRmrRo1/lNJgKC+bwoQ1GuqK4sCBPXuFCDcXNOU1FS8/PpbiIyKMhcaP2Y0xo0eJUBQ3xX/Y1GAcBtELsofIUBQ7z0BQsGa/ki5jdZv3GQuVMPHBx+++9Z/po1khKC+bwoQ1GuqK4sCBPXuFCAUrGngqWC88e771x2x+b8XnkOTxo2uqyhAUN83BQjqNdWVRQGCencKEArWNCMjA68TEM6E/JsWe2C/Ppgx/e7rYhIECOr7pgBBvaa6sihAUO9OAULhmq5a+4eW8M50cSqLj95/B95eXua/EyAUrqO1JQQI1ipmsPICBPUOFyAUrumFqGg8RzEJmVmZ5sJPPzYLnTu2FyAULp/NJQQINktnjIoCBPV+FiAUrilvO31vzsc4dvyEuXCnDu3x9GOPmqeNZIRQuI7WlhAgWKuYwcoLENQ7XIBgmabbd/2Fr7774d9UFjRdxNNGPH3ElwDBMh2tKSVAsEYtA5YVIKh3ugDBMk0TL13C0y+8jOSUlHynjQQIluloTSkBgjVqGbCsAEG90wUIlmv63pxPcOTYMXOFfr174cEZ98oIwXIJrSopQLBKLuMVFiCo97kAwXJN/9i4GQt/WWyuUKliRXw65wMtSE1GCJbraGlJAYKlShm0nABBveMFCJZreu78eTz3ymvm3EYMgvffeh21a9YUIFguo8UlBQgWS2XMggIE9X4XIFiuaVZWFp579TVE0IlqpmvqxAkYOWyIAMFyGS0uKUCwWCpjFhQgqPe7AME6Tb9buAibtmwzV2rRvBlepZTY++c+g3DfLcim09aKF3dB1bY90H/2CuuMS+nrFBAgSIcoUAEBgvoOIkCwTtMDfofx0bzPzNtPPT09MO/DDxDw/ZsCBOukLLS0AKFQiYxdQICg3v8CBOs0TUpOwePPPo9USo1tul58+ilk7lwkQLBOykJLCxAKlcjYBQQI6v0vQLBe0zffm40TJ0+aK44aPgx1IvYJEKyXssAaAgTFgurNnABBvUcFCNZr+uuKlVixeo25IqfCHugWg4gDW2UNwXo5b1pDgKBQTD2aEiCo96oAwXpNjxz7R8ttZLo8PDwwo54Lov12CBCsl1OAoFAzQ5kSIKh3twDBek05fcVDj9G6QZ7sp9PqFEdG0AEBgvVyChAUamYoUwIE9e4WINim6fMUoBZ69qy58qAyaSgZEyhAsE3OfGvJlJFCMfVoSoCg3qsCBNs0/e5HikfY9m88QlunaNTNjBAg2CanAEGhboYxJUBQ72oBgm2a/rVnL+Yv+NpcuUbSaXRyTxIg2CanAEGhboYxJUBQ72oBgm2aRkZF4YnnXjQHqFWMPYmuJdPgdPWqRCrbJul/asmUkSIh9WpGgKDeswIE2zTNys7GY08/h4vx8ZqBCjH+aO+ZCjdnJwGCbZIKEBTpZhgzAgT1rhYg2K7pu7M/wtHjx81AaFkiCSVLFBcg2C7pdTVlhKBISL2aESCo96wAwXZNf166DGv/3GAGQiPnRFTwdBUg2C6pAEGRdoYwI0BQ72YBgu2a7tr9Nz7/+lszEGpfjUe1Um5wkWyntouap6aMEJTIqF8jAgT1vhUg2K5pSFgYXvzfG9rCMq8hVL8Sh+ql3FHC1VXSX9suq7mmAEGBiHo2IUBQ710Bgu2aXk5PxwOPPo70jAwNCD7Zcaji7QYv9xICBNtlFSAo0M4QJgQI6t0sQLBP02deegXnzoebgVDOwxVlvdwFCPbJqtWWEYICEfVsQoCg3rsCBPs0nffFAuzZt98MBG/aZVS5lKcAwT5ZBQgK9NO9CQGCehcLEOzTlNNgczps05SRe/Fi8CnrLUCwT1YBggL9dG9CgKDexQIE+zT9e+8+fPrlV2YgFC/mhNrlSwoQ7JNVgKBAP92bECCod7EAwT5Ng4KD8eqb75iBAFxFvYqlUa1tD/SfvcI+4wavLWsIBu8AhTVfgFCYQtb/uwDBes3y1ohPSMBDjz+F8tEntF1GvAW1ToWSqNG+lwDBPmllUdlO/XRfXYCg3sUCBPs0zaacRvc+9Ci8z/mZgVCjrBfqdOojQLBPWgGCnfrpvroAQb2LBQj2a/rk8y8h8+gWMxCqlPZEwy59BQh2SitTRnYKqPfqAgT1HhYg2K/pe3M+QfiWJWYglPd2R7Pu/QUIdkorQLBTQL1XFyCo97AAwX5Nv/tpIQ4vmW8GQmmPEmjVa6AAwU5pBQh2Cqj36gIE9R4WINiv6ep1f2Dz/DfMQPByc0G7PoMFCHZKK0CwU0C9VxcgqPewAMF+TXdS1tPf3n7SDAQ31+Lo1G+IAMFOaQUIdgqo9+oCBPUeFiDYr6nfkaP4/oWZZiC4FHdG1wFDBQh2SitAsFNAvVcXIKj3sADBfk1PnT6NeY9MNAPBuVgxdB84DP0/lMA0e9QVINijngHqChDUO1mAYL+mkVFRePvuYWYgODk5oTuNEAZ+tNJ+4wa2IEAwsPMtaboAwRKVrCsjQLBOr/xKJ6ek4IW7el0HhI59BmL4vLX2GzewBQGCgZ1vSdMFCJaoZF0ZAYJ1euVX+sqVK3hiaGdUzYzRUlfwCKFV974Y+8V6+40b2IIAwcDOt6TpAgRLVLKujADBOr1uVvrpYZ1RPi0SOQSEYgSEJp16YvI3m9UYN6gVAYJBHW9Js48cOYIDa5dgz7KvEZOahWJUqTKlCBj20lzUqO6DJo0aWWJGypACQaeCcS48HOfDI3D06HHExMahU6d2qFWzpqZlm5YtRCcLFeDkdidOBuDj5x5BVtJFJGddRSnXYmjYsAGmvPM1OnbsCBcXFwutSbG8CggQpD/8R4H4+HgsX74cq1atQviZU4iLuoCrJbxoaJ6DYpmp8KnfBBXKl8PEcWNw14jhcHZ2FhULUGDNnxvwy9JfERsXh4ukbVpaOr3V5sDdzQ2lSnqTluUxaEBfjBk5ApUqVhQtC1Bgn+8BLFy8FGdCwxDwzxEUc3aBs7sXrlxORgnqhg1addCAMHnyZLRoIZC1tjMJEKxVTOfl9+zZgx9++AE7duxAVlY2fKpVh5eXF9zcPbS52suX05CcnIxzZ0NRtmxpDBs0EOPHjKbRQkOdK2N9806HhGL5qtVY+8d6RERGo3btOvD2Lgl30rI4QfTy5ctISUnGhcgLpHU6unbqiPvunooeXbtY/2E6r5GZlYXFy37TTkr754Q/ataqi9KlS8ODtHRzc9f6ZWpaKuLiYhFFLzCdO3fGtGnTMGnSJJ0ro7Z5AgS1ehZpa+E0pcFfIj8/P9SmL1yDBo1Qnt5eXV1LXNeu9Ix0xMZE42SAv/blGzKwHxZ8OhcuxYsX6farvnnOyMlAqFC+Eho3bopKlaoQDNyv+5isrExt1BB8KhDBp0+hRdPG+Gr+XNStXVv17RRpewyD9z+ai6wrOWjerCUqV6kKTw9PFKP4A9PFC81JSZcQFhaCwKAAVKxYAfPmzUO/fv2KdNtv580LEG6n2g7+WS+99BI++OADdO7UFY0aNdHeZgu64uMv4vCRQzh3LhTzPvwAk2gKSa5cBdbSNNGjTz2LcuUqoH37TgTWCgVKk5qaogHhr7924IH77sHc2e+JlNcUOHr8OGY89BguJaWga9fuqFrVp0Btsmg0ceFCOLbv2ILmzZtr059Vq1YVPS1QQIBggUhGKLJx40bcc889NAT3RN++A+Hh4WFRsxMS4rFp83qUK1MKP3z1BVo0a2pRPT0XOhV8GtMfeFibJho4YEihMDBpkZ6eTg+xzYi/GEcjro8xbPAgPctkUduy6a3/3gcfwZ8bN2NA/yHatJull5/fAezZuxuvvPIK3nnnHUurGbqcAMHQ7v+38dOnT8fSpUtx1+jxNLVR2SpVTp0KwsZNf+Dd117GrPvvs6quHgsvWrYcjz33Enr37qdNb1hz8Rz46tUr0LdXd/zyzRfWVNVl2ZCz5yhH0TDUrFkLfXr3pw0Mlk9LptGawh9/rqEYBdA0UhhNfbrqUiOVjRIgqFSzCNtq2LAh4uMTMHnS3Va3IjMzE9//sAC9WjTAi0PaWF1fbxU+334Cq/cew8wZD/9nzcCStq5c+RsyM9Kw9OHBlhTXdZndZ2LxxpJNGDpkBOrWrW91W/f77sGBA/sREBBA06CyTbowAe0GQsiZsKuFfcid+PfU1DTaCROOylUroUzpUnfiForMZ16ihbhOnTpoX7h+NF1ky7Vs2SJcTY7Du83pdczg1zsBTrjk7IXpd8+0SYndu3fiyFE/zG5VDGUMvp1+RfhVbI68invvub/QNa38xA4JPYM//liNTz/9DMOHjbDJH0aqFBwcosVw1KpV3aZmO+3cscchgcA7Di5fTqctaSVQXHa/FOjcUNqVce+90wgKXdGBFkBtudavX4vQkGB80bYYRY3aYkE/dZ46CpSt7IPRo8bZ1KhjtL9+167teL6xE+p5GVvMr85cxbFEJzz88BPX7SiyVNiLtB6zeMlCzJhxP6ZNvcfSaoYtxy/SxegLfONuOEsFcTp3LsIhgZCSnIKQkLPwqV6F9suXtbQ9hiyXmJhAQTzN0LJFa/Ts2ccmDX5fsQSpFyMxu2UxGPsRBrx2AsjyKIMpk217AO3bvwcHD+7H282LoZKbTe7QTaXFZ6/i7zjQC8tDFm90yNv48+fPYdXq5Zgz5yNMmCAxCYV1jICTQdpaS916tm17dqJgJYcEQlzsRfj6HkbzFo1Ro0bB29QKE8kI/169enXk5ORg7BjrvzQ8Gvv+uy/RulZF/G9gMyPIVWAbP9kZhJ0B5zHjvgdRooT1T/R161YiITYaC+/pAZd/t9kbUtetp2LwyabDGDlijLawbO1l2ml06NAhtG3b1trqhitv9xqCAEEffWb06NHYsGEDAWEi7Z0vb1WjzlLU8pq1K/HsQ/fh8Wm2TZNY9YEOXvinVevx2kfzMWjgUC24z5or8VICVqxYhtbNmmDp3LetqarLskFh4eg/5X60ad0O3br1tKqNOTlXsHrNSiQmxiMyMlKLuJerYAUECNJDNAVWr16NiRMnagvLvL0vbwRoQRJx6oWNG/+k7YDA74sXoWlj6x6AepQ/OCQEYydPRzLNxzIUSpUqbXEzd/9NC8pH/PDN/HmYMkHgmkbpPSZOn4FDdGRmv74DUK1aDYu1DAw6iZ07t4G3VH/zzTcW1zNyQQGCkb2fp+2pqamYNWuWFovA6wgN6jcqFAoZlMLi2LEj2O+7F2//7xU8/fijouY1Bb77cSGeoNQVrVu1pamK9jT/7VmoNiEhp7Fj51b079MLX3zyEeXqkd1xLJrvwUNaoB/NaKJXr34WjWAjKT/Utu2babdMTSxevFi2nBba+3ILCBAsFMoIxXivNucyCgs7S0BoiDo0WihXtly+TY+KiqS93f7g6aLOHdthwbxPKKBNMnWaxEpITNRSV2zZvpPSW9dC06bN6O02/618iZcSEUbbIzn/TjlKGKhFfDdtYoQuZ3EbP/70c7w752MtbUXTJs0oYrmudijOjVdGRgbO0G63oMAAXE5Pw1dffYUxYySliqVCCxAsVcog5TiFxcKFC7F+PaWjoDw8nAPGy9Nb2wPOi87JNEWUkpKE8PDzSKcMkyOGDsbdkyeiXZvWBlHI8mZyVs5FS5Zh9bo/abRVHNVr1LimpTeK017vFMoay3pygkB+o+3XuydNE43H0EEDLP8Qg5SMio7B4l9/w4pVaxAVHYsaNWvD24v7pbc2+uKpS9aSU7efPx+mpb6+7777aGfRBNp6bv3CvkFk/U8zBQhG9XwB7fb398eaNWu08xCiIsKRlpGlpRnmk6k4HYCXpwe99VbDtEkT0at7V/qzbUEsRpD+QmQUdu/di5+X/KodkHORosG19NcUG5OWlgY61wUVK1fGgL59cNfI4ZILqoBOkUp6/b1nH5YsX6GlwI6JiUUJSn2tpb+mf8vJzqBA1Gro3KULpkyZQlOf1i1CG6E/FtZGAUJhChn031PoEHM+G+HEtrXYuuw7xKVlawFnni7F0XTkdEp5PQDdu3QudJ3BoPL9p9l8sMv58+ex8YMnkJBxFZk0H16GUuu06DcSLQfcRQGB7Sii3vLFZyPrejIwCHv27cfyL+bA6fIl7cS0kq5OaNG8Bfo+9BJatm6LOnUsT4JnZC1vbLsAQXpDgQrwmcq/vXo/LlxK14Dg4uqC2ve9hXumTBblrFQgJzsTS0fW1R5gWQSEkpSnrcODr6HRyJlwypPX30qzhix+5J/j+OnFmSidGo3U7ByUouPSug8YioHvLYazq0wR2dopBAi2KmeQegyEtW88iNikNK3FWcVc4Dr4Ebz87NMGUUBdM01AoKPnzEbb3C9AsEXhDVu2YsMnL6NyRox2kp9HCRe07T0I/d8VINiip6mOAMEe9QxQl4Gw8Z1HEBGfbAZCXKu78PnHHxqg9WqbKEBQp+dPvyyB3y9zUSUzVgNCKY8SaNljIPq9+4uMEOyQWYBgh3hGqMpA2P7+LITGXjIDIbhmb3z/5XzZvWFlBxAgWClYAcU/+HguwjcvQdWsXCCU93ZH02790fcdAYI9KgsQ7FHPAHUZCLvnPI7gqETti8dTRv5VuuKTD95DdZ9qBlBAXRMFCGq05H741AsvI/PoFvhkx2n9skppTzTs0g993v5ZRgh2yCxAsEM8I1RlIOz96AkERycimw44NwHhuScep50xkizMmj4gQLBGrZuXTaYdcE9SFHiJ0/vMQKhRzht1O/VF77cWCRDskFmAYId4RqhqAkJY3CVczrxiBsLk8eMwesQwI0igrI0CBDVSnqZcUe98MAceYQc1IHC8cq3yJVGrYx/0enOhAMEOmQUIdohnhKomIEQkJCPpcpYZCB1p3/yzTzxmBAmUtVGAoEZKTgeyaPFSeJ/304DgQvuhq9MIoWYHAYK9CgsQ7FVQ5/VNQLiYnIaY5HQzEMqWKYPPPppN+f5L6FwBdc0TIKjR8otvvsOevftR+sJRDQiers6oXMoTNQQIdgssQLBbQn0bMAEh9XIGziemItMpd1GZE4u99+ZrqCcRoRZ3AAGCxVLdtCAnr3vp9bcQHhGB8tEnNCCU9XBFWS93VG/fW6aM7JRYgGCngHqvbgJCZmYmASENqTnOGhD4unvyJAwfMkjvEihrnwDBfilDw8LwFq0fcGqVCjH+qH7lIqp4l4AnnZ3uI0CwW2ABgt0S6ttAXiDEpWQgLhNmILRt3RovPvOkvgVQ2DoBgv1ibtqyDb8s+xXpNFJgINRBAip7u6KEi6sAwX555TwEBRrq2kReIKRkZCM89YoZCKVLlcKnc2ZT+mF3XWugqnECBPuV/PTLr7D/wEFkZ2drQGjikoQybsXhSunEZYRgv74yQrBfQ11byAsEjkMIScrG8cpdtDbzOsJbr76MRg0b6FoDVY0TINin5GU6TpPXDy7Q+cgcjMZAaOuRCndnJ7gIEOwT91ptAYISGfVrJC8QQDnZztEI4WC5juYGTxg7BmNHjdCvAApbJkCwT8zAoFP44JN54ONe+aocF4BOXmkohhw6X0JGCPapm1tbgKBCRR3buBEI8dnO2OH17+lodWmX0buvvwpnZ2cdq6CmaQIE+3Rctvx3rNuwEbzBga8Gl+lktOIJyLmSLUCwT1pzbQGCIiH1auZGIGS7emBNsX/P++WTv95+7VXaflpbrxIoa5cAwXYpeVTw9uw5CKXzvvkoV756eiSiYlIortB6gowQbNc2b00BghoddWvlRiCU8C6FXRV6IuLCBXObRw4bgqkTJ+hWA1UNEyDYruSRY/+AF5RN00Wurq4YV5VSqZz2owXmLAGC7dJeV1OAoEhIvZq5EQjuJUsjbfBTWLlmnbnJVatU0YLUPD089CqDknYJEGyX8ZsffsLO3X8jKytLM9KwQQP0c41E7NHdAgTbZf1PTQGCQjH1aCo/ILR8fSleeeMtZF77chaj4x9fePpJtGnVUo8SKGuTAME2KS/GJ+DtDz407y5iKzwiLXtyI6IO7xIg2CZrvrUECArF1KOp/IAw/LvdeP2d9xF46pS5yT27d8esB2fqUQJlbRIg2Cblrr/34PuFP4O3nfLl7e2N/73wHC6smIsLh3YIEGyTVYCgUDfDmMoPCCN/2IP1m7fgx0W/mHUoW7Ys3nvjfyhHv+XKXwEBgm0946NP5+PQ4SO4cuWKZqB927bay8fRBS8j4qAAwTZV868lIwSVaurQ1s2AEBUdg5dp2ig5OfesZQ5Su+/uaRjUv68OVVDTJAGC9TqGnT0HPi7zYny8ufKjD9yPbl064cCnzwoQrJe0wBoCBMWC6s3czYDAW//mfb4A+w4cMDe5Tu3aePm5p1GqZEm9yaCkPQIE62X88efF2Lpjpzn2oGLFCnj1+edQuVJF7PvkKQGC9ZIKEGrU8FEsm3HM3QwIrMCxf45rkaOcV4YvXlx+cMa96NOzh3EEsqKlAgQrxKKi58LD8TFNF0VGRWupKvgaMWQwxo0ZDTc6h2Pvx08KEKyTtNDSMkIoVCJjFygICJybfvYnn+K4v79ZpPp162qjBC8vL2MLl0/rBQjWdYnFvy7Hhk2bkXEtMrl8uXJ4+rFHUZeCIPnlQ4BgnZ6WlBYgWKKSgcsUBASW5cAhP3z82efm6FHnYs547OEH0LVzJwOrln/TBQiWd4mIC5Fav+KDcEyjg0H9+2Py+DFwd8/NritAsFxPS0sKECxVyqDlCgNCGm0FfG/Oxwg6FWxWqDFlP33p2Wfoi+tmUNUECPY6/rffV2Hd+g3auQd8lSldmkYHs9Cgfl1tdCBAsFfh/OsLEG6NrrqxWhgQuKF/0/m2n365wNxmHiU8/fij6NCurW50UNEQGSFYpmJUdLQ2Ojh3Ptw88uzbq6d2Ql/eszdkhGCZntaUEiBYo5YBy1oChGQ6zvDd2R/hTGioWaFmjRvjKZrvLVnS24CqyQjBHqcvX7kaa/5cD16j4ot3rXFf4pGnaXQgIwR7FL55XQHCrdFVN1YtAQLP8e74azcWfPv9v6MESod937SpGNCvj260sLchMkIoXMHTZ0K0fnQ+z9pBj65dMWP6tP+czCcjhML1tLaEAMFaxQxW3hIgsCSJly5hzrzPcCr4tFmhWjVq4PFHHkJ1n2oGU01GCLY4PC0tDZzE7qDfYXOeLI5850C0Jo0b0ZkbuWsHpkuAYIvKBdcRIKjXVFcWLQUCjxL8jh7D5wu+Rip9sfni4X2/Pr0x4+6p1w31dSWQFY2REULBYv29bz++/+lnpKSmmAsO57iD0SPNO4sECFZ0OBuKChBsEM1IVSwFAmuSRQFq33zPaYp3myXi+V8eJbRo1tRIsuXbVgHCzbsALyR/9d2P4GMyr+Tk5iyqXasmHpo5A7VqVM/3hUJGCOq/UgIE9ZrqyqI1QOCGnwkJxWcLvqJUxVGaDpzjqFmTJnjskQdRplQpXWljbWMECDdXbNmKlfhz4yakp6drhUpQJDLnxurWuSP4MJz8LgGCtT2w8PIChMI1MnQJa4HAOY7+3LgZi5YsNevG5y1PnTQBwwYNNLSWAoT83X/q9Gl8+fV3uBAVZQ5Ca09blh+4dzpKF/ASIUBQ/3USIKjXVFcWrQUCNz6eDjSZ+8WX2vDfdPlUq4YH7ptOWwcb6kofaxojQPivWtExsfhl2a/wO3LUfBpahQrl8eB999LIsjEtJDvfVGIBgjW9z7KyAgTLdDJsKVuAwAvMRynx3fyvvjGnx+YF5hbNmtH2wamUqbKSIfUUIFzvdo4zWLF6LTZt3WY+/IZLjB4xDKOHDy800l2AoP5rJEBQr6muLNoCBBaADzNZtGQZ1lNyMtPFb3sD+vahfDRj4eZmvLQWAoTrvxoc4b6EEtjFxV80TxU1ouCzmffcjRo+Ptr6U0GXAEH9o0aAoF5TXVm0FQgsQsSFC/j2x0XwDwgwa+JNWVCnTZqI3j2760onSxojQPhXpeAzZ7Dwl6XgQDTTrqIqlStT35iAVi2aw8XFpVBJBQiFSmR1AQGC23XcIgAAGQlJREFU1ZIZq4I9QOAF5hMnA/ADHbXJcDBdHLA2g94CGzWobygxBQi57o6J5XWD37R1g8xrqa09PDww/q7R6Nurh8WjRwGC+q+PAEG9prqyaA8QTFNHO3f/jZ9p+ihvwFrL5s219YRKFSvqSq+CGiNAgJaf6Pc167Bxy9br1g169+iOSTSVyLuKCpsqMmksQFD/1REgqNdUVxbtBQKLcZlSZPMb4eZt283a8HpC3969MHbUCC21sREuowOBR4y79+zFr5TaOu5innWDBg0wfcok1Kldy6qIdgGC+m+NAEG9prqyqAIIwFWcD7+A7xfyekKgWR8+6GTIwP4YNngQvDw9daVbfo0xOhA4RxFnMuW01v+uG1TC1IkT0aplc7hasG6QV1cBgvqvjABBvaa6sqgGCNDy2vN6Ah+azqdgma5SNEUwcuhgDOzX96YRqXoR1MhA+OeEP8FgFS0ihyL7Su4Z3HzM6piRI9Cvd09aNyhBf1PwrqIb+4EAQf03Q4CgXlNdWVQFBBaFt6Lu2e8LPg0rOiZG04nni8uXL0dTRyPB88iWzh8XRZGNCoSAoCCsWLkG/JvzXfHFqSn60ZThyGFDrFo3kBHCre35AoRbq2+Rt64SCCwGPxC279hFC4trkZCYaIZCtapVMHHcWHTU8SlrRgQCbytdsXoNjvufNO8o4iDF7l274K4RwylIsaJV6wYChFv7SBEg3Fp9i7x11UBgQS5fTseGzVu0M3NTUlM1jfghUatmDUwcOwatW7Yo8rrl1wCjAeHsuXPajqLDlBbddPoZ69KhbRuMvWuUFnxWUGqKwjqBTBkVppD1/y5AsF4zQ9W4FUDg1BZJSclYS8ckbqS0Baa96PxwqF+3rjaN0K5Na93pbCQgnA4JIehvxYFDfhoM2Od8cRr0cRRvUK9ObRQvXtwuHwsQ7JIv38oCBPWa6srirQACC8QPiLi4i9p0Ah+/aXpgMBQ4D/4IOhilHb1Jutj50HAkZxgFCAGU1JBTlnA+q7ww4MSGY+mwGz4b2ZJI5MJ8J0AoTCHr/12AYL1mhqpxq4DAIvLOIz43YdmK3+F78JBZV4ZCtapVMXhAP3Tp1BEetD1VD5cRgHCcdhP9STDgHWU88jOBvl6dOhoMmjVtghI3Od/AWh8LEKxVrPDyAoTCNTJ0iVsJBBMUws6exeo/1uPQ4SPmFMi8plCxQgX0pyM4e3bvCj55rahfegYCw51HBH9u2ITA4GDNjyYY8Ihg8ID+aNOqpba1WNVOMgGC+m+EAEG9prqyeKuBwGLxdtSIC5GUzmALbUs9AD5snS+GAqcy6Nm9GwYQGHh7alG+9AoEHglwXiI+GCkkLMwMdfZV86ZNMXTQAO1sA5UwYNsCBPXfBgGCek11ZfF2AME0UoiNi8OW7Tuxi3IfJV66pOnIb5Oc+Kxb507o07OHlt6gqF56BAL7jEd2O3btxnkKOMy+FmfAMOespRyF3rB+PW3NQNXIwOR/AYL6b4IAQb2murJ4u4BggsKlpCTs/OtvAsMO8MPGBAVeXG7TqpWWNrtF82YoXsBJWo7qAL0Bgc/P3rVnD+0kOoxEiinhkR5fHHTWtnUrLS1JnVq1lCwg5+dTAYL6ni5AUK+prizeTiCwcDzvnEbJ8P7eu0/bqcKLzqaLtynyA4ankNq0aoHy5YrWFJJegMA7hzgn1U7aHXb0+Amkp6eb1ws4J1Wnjh20g5CqV6tq99bSgr5MAgT1jxoBgnpNdWXxdgPBBAWOaN6zb782Ugg+fcasKe9AKk3ZUdtTnEKvHt1Qt3btIqO3HoAQG5s7RfQ3+SaMAs/yLh5z1HHnjh0pBUk3bUOAPUFnljhVgGCJStaVESBYp5fhSt8JIJhE5ocNv4Hu2LkL/1DqA1O0K89F8xRSa9q1wusKvIuFM6c6+lXUgZA7RbQXB2mLcAKt8ZimiFj3BvXqoWe3ruhAqUdKlvS2OR2FNT4UIFijlmVlBQiW6WTYUncSCCw6L1KeO38eu+n8XY565dO28k4hcRAbp7poS+sLjr7gXFSBEB0Ti1PBp+F76BA4a2neKSKOEWnauBGt7fSgHUUUY0DrB6oXj2/25RMgqH8sCRDUa6ori3caCCwmv4kmJ6fgAOXT5x1Ip06fvm4KiXewtKSF5k7t22vHcjrq9tSiBgRey+HpOj7HgEHAh9owoE3xBTxF1JE079KxPXwoLxGP2m4XDLgDCBDUP2oECOo11ZVFRwACC8oPIX4YHaMH07YdO7XsmXkTpvGCM89bc66c9pTygsHA+94d6SpKQAgNO0tJ6Y7i2HF/c2wBB5+Zrga0lbRH165adlpvb69bvl6Qnx8FCOp7twBBvaa6sugoQDCJmk2jhXO0mMkBbMdofYEzapou3vvO21HrUYI83oXE5zZzBlVHuYoCEHhKjlNW+9L0nCkXUd61At7ZVb9eXUpf3RnNm9zeKaIb/ShAUN+zBQjqNdWVRUcDAovLb6oczcyjBd8DBylVwmkkJCRcN43k5uaGls2aaSMGhgKvNTAw7uTlyECIjIrWdg35Uw4izkMUS2DgnV6m6SFeG6hftw5loW1DoG2KShUraltKb+cUkQDh1vdeAcKt17hIf4IjAsE8hUSjhUiKU/jH31+b5z516rT5eEZ+UPG2R286ppGnN5rR22zd2rVQi8BwpzKoOiIQIiIjEXaWQEBTcEG0NhMVHaNNzeWdHqpRvboWDNiGFu85Pbmrq8sdhyv3ARkhqH+0CBDUa6obi5dpUdF3+XfY8cUbiEvNQDE687ZimZIYP3+NdtKVihTG9orFDy6eRgqklMsH/Y5QwNRJnA//98xmExh4NwxvjWzcuKH2uzaNGvit93ZdPO0SeSECi6Z1xaXMq8ik6fhSLkCXqbPQZcos7Xzh23mxRpxU8DiNBngHEUeF3wiCMmXKaKOCju3boRVNv3l4ejhMhHgc3e/GOc8i+LAvEtOzUNbdBQ3bdsbwd35AhUpVbqeUuvosAYKu3KmuMXv37sWGDRsQcGA3gvz2ISE9h6YHrqK8hytaDbwLtWpU1zJYctIyR7j4gZuSkkrTSCe07an81ms6t5nvTwNDMWe4lnCl3Dr1tfw6PFqoVqUywa3SLW1CEGX/3LxtB41ggnFo3RIkZtJ2WjijZPErqNu0BRq3745+fXppx0reyish8RKioqJwgX5OBgaB7yshPkEDat4Rgbe3N2rSqIC387ag6aGqlSvfklxEtrQ1hgLjtlFcCi94H9+1idoSjcuUMcOLztqpSr5sPWA0uvfshQEDBsCToqblsk4BAYJ1eum+dExMDLZs2Yqff16EPXtOUGK5lnBzq0xv05VpPjmHdvZE0j70SPp9hILCOmDy+LFacJgjBIZpO5Ho4XaBMqfy9McJmgZhMETSA9B0mcBQzLkYahLU+MFXh6Kd+WHCD74yZUor8zHPwe/Y+ReW0nkPW7bvoSmsFmYtizu7IT0jWtMyPf0ErXVUwdSJ40nLntq9qLp46yi3PzIyGqE0IuBF+LMU15GamqZt580LAs4sW6O6D5o0bqwBk88wcJTpIdaDQf/bytVaSpOcq06kpTs8PTzpvAw3pNCaUiodx5qSnIyKlSpgzJgx2k8zWkeSy3IFBAiWa6X7khwZ/NZbb2Hx4iW4dKkqvUFPobesdvSwr0ZAqKItMGZkRNCZyOGUzGwHwsN/o3w1mXjo/vtwz5TJDqMPP+T4YccBVfwWzGAIJTBEXLhw3T3yGgMvNDPMahEYahAg6tCooQqBoWLFCihJb8r2XL+vXotPv1yA4DPZqFJlJMVHDLmmZTX6XBc6QCZG0/Ly5SMIDV0CV5cAjBo+DK+//Dw4J5CtFweOxV2M10DAC8Vnz52n4L5wxNPCu2layLRYzJ/BU0M84mvSqBEaNuDpNE5IV/yObCW9WZsZBu/N+URLpFe1qg896JuTlh7UP7200UtmZgaNEJOp3ybhZMAJWhSPxsCBA/HOO++gQYMGtkppuHoCBMO5/OYNXr16Ne655x5686I003WeoAdY35sWvno1GzEx63D69Ed0ZsEF/LDgc23/vyNdJjBwQFUQzZNz7ALPm/PDMe/FowYGgzP9lClbBjV9qtOJbVVQidZJypUti7L0wCxHf2/NFAQHcs14+DGa0vBCvXrPEWCG0QPW46byxMfvRkjIZ4iPX4f5H3+IKRPGWSwln0cQn5BIdeNxkR76MQRC3jXEEd6R0dFmCOQdDbBx3kKqgYAijXkajRePHQ0EfJ+8FfaBWU9qgYnt23VC9eo1Kfbh5rCOj7+I4OAg+B0+iPvvvx+fffbZLU2yZ7GjikBBAUIRcNLtuMXAwEDcfffdCApKQ6tWP6NUKcsOuY+L24x//pmObp2a4OvPP0UFBzzERgMD/fDWVN6iynP5F2h3Dc+lX6Q36bwXg8H04+HhjkoVKtJPBXqgl6etlpUIDqVRliDBowcGhDNNPd14cQrvR596lqY29qBly58ILCMscmFycgCOHZtCU1eX8T0BllNB5HfxltsUmh7hN/6LtAbACef4ockjIv6dQKmoc65wm6+fEmJbPPLgEVCVypVQl6aEeGrI51pW0ludjM4iEfIpNO/zBXjlzbfRuVNXtG/fySIzWVmZ2Lp1M2kSiV9++QXDhw+3qJ7RCwkQjN4DrrX/zTffxBtvvIk2bX5EtWrTrVIlOPhFBAbOxuIfv8WoYUOtqns7C5vWGDjC+ezZ8zSXfg4hoWfpLZrn2KOQnJKS78ihmBPtryrmpG1hrVihPMGhIspSxlV+S/Xy8oQXz2PTDhwv+mFI+NGC57gp99CU24No0uRzsulkcTNjYlbCz28qHpwxFS89+zRS01K1uXGe89fmyOmH7zOJpkair4GAwWBaD+A23jgS4IhtjhvgNRKOyajJP7RWwGsGHEtwp+MzChKHR3c9BgwhuAH9+w0ucGRwo52YmGhs2vQn6tOUka/vfot9YOSCAgQjez9P27t06YqjR8+id+9geuu1LnNoWtpZbN9eF9NGDcKrMyc4vKJX6Q5Nb9BJScnaNtWzNI0URQ/Y5NTLSEnP0IKybrx4asm0KM2A4D970jw2p25gWGi/6WfrwRP47c/N6NXLn/47/7f8m4nEC/e7/2qG8mXT8MrMiTQvTg9/WihlCCTTvSbRb37gX825qq3p8Cgg73qAyS5Pf7nTjqqSnu4oV7qUdjYBLxgz0BgC/O93MqjM0k6y3z8Ydz//NsFgIG0Ztn6BeOfObTh+4h8C/gUaqd3a3WSWtsmRy9kNBFrE4e+Xw12JCZdw/HgAvR3URmUaHst1cwU43qBhw0a0o6g72rVbY5NU27f6oFrJVHwwqKFN9e9kpRx6sPJDNfVyBhKTU5GUlo7LtMB+hV5Ls+nBm32F3rrp3/O7tHd/+j/Cg/n3qjNpiEp3R//+UdrisbXX0SNTaafUUsxsVhpuzpzHiS3wPfL/538Rm7SHfHECVXFnJ5Sgh76newmU9vLQfrRRjgY0a+/mzpZfdTIaPx8Mw6SJ01CBpu+svXiBeevWTVi5ciX69u1nbXXDlT/ge5jWEEugRcumNrXd6dChow4JhMwMWmij+dWSpUrSg866N16blCjClc7Swehjxo4iKLxOOzLesKklhw4OR2LceszrWhoudzZDhE33b6p07dmLbC2ZXg6y6G08i8FgggMB4gq/nd/kU/jvPw24ArdSXdCly1823UtIyDyKHH4K0+sWh49H/mLyc70YPd354e9MEHDR8jjRb1rTyP0zA8CaySqbbvWWV/rKPwVH469gxsxHbQqEjI2LwdKlP+Pxx57A3dPvveX3W9Q/IDYmTttdVrZcGZua4nTY75hDAiGDgHDxYgItjpakeV0BQkHePUtbMkffNdwuIBw8OAJJcX/iEwKCaxEGQl6dzB2b/nCFAJFFI4Vsjoy+BgUeNeTwn/m3Nn2T+zMvkIBQsisBYZdNX6q8QKjh6aw98IvRjzPvhtJ2ROX+mf9eg8C1kYHp7b+IDQIK1EgDQkIO7rvvYZuy15qA8MTjBNjp99jkDyNVio6KhXNxZ9phWNamZjtRdKhDAoEjMI8dO0kPubqoUlVdoI9NKjl4pUxaZK1Ttx7FGnRGhw5/2HS3W7dURc1Sl/Fu/7o21S8SlcxTNrkjhFwAmADBsQ8MjKv48lAUgugcn/4DIujh7WZ1044emYLoqN/wwcD68CyeOw3kfG0kUFzbHpsLBtP7f1GbBrJGkLWBcVh46CwmTJhCC+PWf4/9/Y9j2/bNWLduHa2P9bHmow1Zdt+eg3CjqcbWbVrY1H4nmnt1SCDExV6knQWH0bxFYwo48rGpcUaq1L17Txw6FIyePY/Tm5h1h9enpp6iReWGuHfscLw4fYxhZMudXro2fXTta8C/vvx9Az7/eTm6dz9A5z+3t0qP7OwU/P13G/hQOp4VH76UZ9rn2vw/rwNYZbFoFz4UFIopz76JHt1703Zo6+Nctm3bjKBTAYiIiNB2h8lVsAJ2LyoLEPTRxebMmYPnn38ezZvPp+2Ssyxu1NWrWTh58imKWv4eK39fjsGDB1lcV68F9+7dh0GDh1EE8EjS80va1WN54rrw8EU0sr0fLzz/NEXZvq1XiSxuFyex60G5iZIuJdMi/WACrOWpRaKjI7Fx03o0p/QVu//ebfFnGrmgAMHI3s/T9pCQEEyZMpV2ZsVRLMIv9MXrYJEy0dFr6QF2N4YO7Y+FC3+87Vk7LbrJ21yI00PMmPGglgKkRYtv6HjJaRbdQVLSMRw5Mo0im10ol9TPFMNg3ZZViz6kCBb6+uuv8fjjj5MezbXgNEuy7HLw3tatGymOIwULf1qIwUMGF8GW3/5bFiDcfs0d9hM3btxEqSvupVmQ1jRKeJgWlvrcNN1CZmYsRchuo3QLn1BumTQtGV4bOjxFrlwFTp48ialTp+IM5TGqW/c5TUs3t2r5ysOjrLi47RQs9y0lutuBH3/8ASNHjhQprymQTHEYnFKFs++2atWWkhHWRbly5W+qD48Mgk4FUlzNYTz33HP48MMPRUsLFRAgWCiUUYp9/PFceiAtpCkgJ3rQT9DmwDnTaW6202xKbhdNP1GUL2cTpVJeTV/Qypg1axYmTZpkFIksbueqVasxb948HDx4hoKiRtHPELOWzpTt1KRlSoo/HQu6iP49hXScgNdff83izzBKQT8/P7z99tvYtWsXBddVou3RjWk7uQdFiHvCnbKe8oggjaK6OcFdQKA/RXWnaCmw33vvPVpDdJxjVB3dXwIER/fQbb4/nu5YsWINli37GTt37qMRQn16s/WhzJLVNSDkZuc8TwvPZ9GvXx/tza1///63+S6Lzsft2LFLm0rbunU7PaQqmbXkRHesZXr6edqddAadO7fA5MnTcNddI7UHnVz/VeAEnXWxfPlycBLGSEpxzplOvTinFKUOSSYQMAw4vUc9OvN5/PjxGDt2rMDAyo4kQLBSMKMU5y/fSso9HxV1AdGUMTOITiTjudv6lAyNUwDUqVOPHl6jKC9OTaNIYnM7IymR3sqVaygDZ6B2QE1ISCg4ZUYDSjVdtWpV0rMqRowYirZt29r8GUapyCna16xZgwMHDmhahlPKEc7qyqnLa9WqpfXNHj160OYGWTOwpU8IEGxRzUB1eP42PDwc69Zu0CK+Bw7qR4ukPGKQYD9ruwGnqWYtd/+1l9YLzmH4iMEE1joUPFnKWlNSnhTgraQnjvvTNt196NS5PaVdaSv5iuzsGQIEOwU0SnV7O4pRdLKknf4nAhEWdp4C13raFH1ryWcYpYzEG6n1tL3fcwlMU+sPh7Vmb0dx2IbdgRsTIKgTXYCgTku2ZO/3XICg1h8Oa83ejuKwDbsDNyZAUCe6AEGdlgIEtVrq2poAQZ17BQjqtBQgqNNSgKBWS11bEyCoc68AQZ2WAgR1WgoQ1Gqpa2sCBHXuFSCo01KAoE5LAYJaLXVtTYCgzr0CBHVaChDUaSlAUKulrq0JENS5V4CgTksBgjotBQhqtdS1NQGCOvcKENRpKUBQp6UAQa2WurYmQFDnXgGCOi0FCOq0FCCo1VLX1gQI6twrQFCnpQBBnZYCBLVa6tqaAEGdewUI6rQUIKjTUoCgVktdWxMgqHOvAEGdlgIEdVoKENRqqWtrAgR17hUgqNNSgKBOSwGCWi11bU2AoM69AgR1WgoQ1GkpQFCrpa6tCRDUuVeAoE5LAYI6LQUIarXUtTUBgjr3ChDUaSlAUKelAEGtlrq2JkBQ514BgjotBQjqtBQgqNVS19YECOrcK0BQp6UAQZ2WAgS1WuramgBBnXsFCOq0FCCo01KAoFZLXVsTIKhzrwBBnZYCBHVaChDUaqlrawIEde4VIKjTUoCgTksBglotdW1NgKDOvQIEdVoKENRpKUBQq6WurQkQ1LlXgKBOSwGCOi0FCGq11LU1AYI69woQ1GkpQFCnpQBBrZa6tiZAUOdeAYI6LQUI6rQUIKjVUtfWBAjq3CtAUKelAEGdlgIEtVrq2poAQZ17BQjqtBQgqNNSgKBWS11bEyCoc68AQZ2WAgR1WqoAwv8B43aTOJmicMcAAAAASUVORK5CYII=[/img][br]Das nächste Quadrat hat Seitenlänge 3[br][img]data:image/png;base64,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[/img][br]dann 5, dann 8...[br]Erzeuge eine Fibonacci-Spirale. Viel Erfolg:-)