Ausgangspunkt der Überlegungen war die Frage, was man von einem Würfel (a=13 [size=85]cm[/size]) weghauen muß (Steinmetz) um einen Dodekaeder zu erhalten. [br][br]Im regelmäßigen Fünfeck (Flächenfigur des Dodekaeders) stehen Diagonalen- und Seitenlänge im Goldenen Schnitt Verhältnis. Damit gilt das auch für die Kantenlängen von Würfel und Dodekaeder. Ich verwende die Verhältniszahl des Goldenen Schnitts, die [br]»Goldene Zahl« [math]\phi=\frac{\sqrt{5}-1}{2}\;\left(\cong1.618\right)[/math][br]zur Konstruktion. Die Seiten eines Basiswürfel erhalten Walmdachaufsätze.[br][br]Koordinaten für händische Konstruktion (ohne ggb-Commands) [br][br]Basis Würfel - [math]\left(\pm1,\pm1\pm1\right)[/math] 8 Pkte (Punktlist iCube) +[br]Walmdach-Gibel - [math]\left(\pm\phi^{-1},\pm\phi,0\right)[/math] 4 Pkte + [math]\left(0,\pm\phi^{-1},\pm\phi\right)[/math] 4 Pkte + [math]\left(\pm\phi,0,\pm\phi^{-1}\right)[/math] 4 Pkte (Punktlist iDach)[br][br][img]data:image/png;base64,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[/img][br]Der Umwürfel (Punktlist iCube') entsteht durch eine zentrische Streckung (Dilate) des Basis Würfel mit dem Faktor [math]\phi[/math].[br][br]Für das Ikosaeder gibt es eine ähnliche Konstruktion wie für das Dodekaeder. Die 12 Ikosaeder-Ecken haben die Koordinaten:[br]Jeweils 4 Pkte in den Koordinatenebenen x=0, y=0, z=0[br][br]Ecken - [math]\left(\pm 1,0,\pm\phi \right)[/math] + [math]\left(0,\pm\phi,\pm1\right)[/math] + [math]\left(\pm\phi,\pm 1, 0\right)[/math] je 4 Pkte (Punktlist iIko)[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOYAAADlCAYAAABH/osVAAAgAElEQVR4nO3deVxU57kH8CdFcUQdmBnMTYIx4hIR2WFYBhRFxF0RRJBNdhWSaBNNSGoUxIUosrjghhERBRHcwQUFxRiXqHFJNDFr26Rt0rTepG3a3Pbe3/1j3jMehgFmhtnAcz6f30ei4FLOt+/yPOc9BPXrxPuAZxpgNR54LhLYdqz1r1OwMpZ+Nd1S/V1PxcbqnWt5eeb+lwiX+sX73vbUi8z9FzDqtWovruXldQmmgNRCr1V7zf03MOrVs2ECBoUpIBUuU10CTAGpcFngJcAUkAqXBV4CTAGpcFngJcAUkAqXBV4CTAGpcBnhqq//uUtfL8AUkApXB1d9/c+or/8ZxcU/qpKV9YNW6colwLSgCEiNd3UFmL7pyiXAtNAISDVf5gAmwDTC1V1h8oH2RKTdCZgA0whXd4dp6UifBGACTCNcPQmmMZEKwASYJr16Kkx1pNzFAROQmT9duQSYFpqNkYWqvBl+UJW06Zc05rWp1SifEI3NM5ab/YYUIsDs9LIEmLoA0zccTH4EpAJMi70MCdMUwAwJU0AqwLTYSxNMSwZmLJgCUgGmyS5tNjky5tw0OxpLgykgFWBqdRlzF1GAKSB94mFa4ja9AFNA2mNhPnz4P2b/RwowTQtTQNoNYNbX/2z2f6QA03wwBaQCTAGmhcMUkAowBZgWDlNAKsAUYFo4TD5QAakAU4BpYTCFEVSA2a1hpgYcR0rAUQFmD44As5vATHqxAqmUi3TKRQblIoNWIoWykSLbgOQuIhVgWl4EmBYOc37AcSRRLpIpF2mUiwWUi4WUi0WUiwxajmTKVubF3QLMHhQBpoXDjJOVIJFykcpGygUMZSZLGmUjjeFM0hOnANPyIsC0YJhxL1YglnKRqGHE5GAuoOVIYTDnU7Ze01oBpuVFgGmhMBMCjiOKctvAzFCbzk6j5ZhCb6lg6jNqCjAtLwJMC4WZGHAckZSLGMpFAuUiiXKRwsPpQ7kgXp6hlUikbMRTtgCzB0SAaaEwI2QliKBczKVcxDGcyTycfJQJv8pBImUjgbIRJ8DsERFgWijMmBcrMItyEcVGzTg2pZ1PuZiiBjNctA1R1sVIoGzEUjYSA46qfu1ZWQmmBRwXYHazCDAtGOZMykWEGs4EyoUHD2WI9WaEWW9BHGVjHmUj+qm3W6HlR4DZfSLAtFCYiQHHMYNyMdOqADGiHYjpVYgYysU8ykUof7S0Wo9JvQoQQ9mYS9mI7LW6DcikwNNICjwpwOxGEWBaKMy06Zcwu9dGxIp2IF60C3NFOxD5q7WIolxEUy5cKBdPsczlUFK2xpFypqgUs0XbWv3e/F9/VjYb2V7jzQ5SgCnAtGiY0YoGpE2/hHjRTsSKdmKOaAemWq1HOJvazmGJolyMo5WIoGxEUDbmjdiNtGktbWBOsN6CtGktGlAmg4haxUnytNmRCjAFmBYJk0usogERou2YZLUeMygXMygXs9rkLcyibMQwlGnTWlQjKQdw6n/tUf1aa7hD2sC0BKQCTAGm5cKc1oKIZ/ZiUp8tmGldgmm/WovplKvKNMrFdFqJGZSNWb9aiVinShW8af7H8ZysBM/JSvAU5bZC+Rhm29GyI6DaIK31Go9mRxdcdnTBKUcXVHqNxz49YAswBZgWCFOJJ3rUIYSLtiFctA3T+5QiVtGARP/jSPQ/jpgRexEzYi+iR5ZjSu+1mNl7HeKc9rcByCH1HrFXA8xxWsPUBmmzowu+J8JPRPgHEX4hwgMinCTCQUcXAaYAszvDVMKJVzRgtmgbIkTbMUNUiginGo3o0qa1IKz3akzvvQ6ze69r93PU8xTl4lcUj18R4Sk9cPKRxkqexudE+AMR/kqEvxPhX0T4NxE+JUIDEeqJcFjytNajpwBTgGlWmPMUDYgX7US8aKcKZdq0FswSlSJCtB0zRaWY8V/lHSKLctqHKb3XYlbvdUhSnOgU5YYFDTiWV4M1KYVwcwyAm+NorEnJwZqUHLg4jtYZ5x0ifEWE74nw37zR8j9E+D8iXOPhrJM8LcAUYFo2zIhRhxjKXYgW7UC4aFsrQOGiUoQ/s1erETCs92qtQWrKmpScVh9rO5IWEeEjBvOPbMT8GxH+SYT/4Y2a9SwniHBAi2mtAFOAaRaYsc51mMfqk1GiHZjB1pDaTkV1SUcgO4oVEX7FomkkdSXC+0S4x2B+S4Qf2Kj5d4bzFyJ8pwbzCJEAU4BpeTATnA+zpoGdiBLtwKxnOp6qmhqk+kjq5jgaVkSqqS6H1JUILUT4kI2KvyXCn3g4/8amtT8zkCeIcIwIhwWYAkxLghnDmgbSpl9CjGgH5oh2YI7TIYsEqQ3YOCI0E+E6m85+RoTfsU2gP7Np7SOG9BjLUSLUEaG8k00gAaYA02QwVWGAOtpptVSQXE5kFGBDrwE4Q4TLbNS8T4Qv2Mj5LRs9v2NIj7KR8jARaolQNsxHgCnAtCCYDNFsA6HcsKDBZCAbpi7G2alL8KHMH3dlAbg8YBQaiHCRCFeIcIsIH7Np7ZcM6O+I8Hs2StYSoYYIVUSoth6IHQM9sNt7qgBTgGlOmIafrpoC5Kmpi9HIYbRX4LrUD1elfmiRynFW4o16IpwlQhPbCLrJyicfE+EThvQzBvIgQ1n+VC+8ay3Flt7DUNp7WCuQu30mCjAFmMaFGftspcFR6gKypG8o9oS9rhPE4xkFOD11MS67ReG2LAC3ZQG4JvXDFakfLkh9UG/niRpbN+wRj8b+yZmoGy7HCbbjep4I7xHhKhFusOntbTaaVhFhPxEqiLBT9jze6fUCCns5oriXI8pD5qpgVg4cgf0DR2Dr2JfM/r03dwSYBoY5c1QN4kW7EC/ahRjRjnaRzX6mvE3t0hAgt01cilWicSjoG4KKsDc6/fz6qa/gDBsV78gC8IHUD1elvrgs9UWTxAfH7Tyw39YVFaOnoXJyJg5lrG+93nQcjRNEOMNwXmBA32Prz3MMZDkR9jiORnlIFMpDorDDa5LqY2XmYo+1FBXWUtT1HYR79go0jErH2qgLZr8PBJgWFl1hxjjXqlDOFe1AuKhUI7Q5Tocet9x1UMPUd8q6QjQW+aLxKOkb2u4Ulb9evC71w/tSX1ySytEo8cYROw8ccJmO/ZMztdsMchyNM6LncL63GKeIcIoIp9mPlUTYTYQKKxvsHzhcDePjbLN3xJbetii1tkO56FmclXjjklSO61I/3LVXoP4JQyrANBDMBOfDrZoGpvcpRWxAW3BxigaEM5QzRaWI1LAR1NX147aJS5EnGoeNfUNQzkbNU1MX47LbnFZT1PelfrgolaNB4oVDdu44OCUL+7TEyE91+jv4QOqHB7JAXBE74yQpm9er2Si5zdoO+6xlqLEeiIrh8nZxlodEYbd3KHY87YQy8Wjss3XBETsPNDKkV6V+uCsLwEmndLw957zZ7w8BpoXDnPdsJWJFOxAn2oko0XbM7aA+OefZvYgQbcMsUSlmqvXBGmpDZ9vEpdhoE4j9AwJxi0G8IfPHVYaxWeqDE3aeOGDriqrJWajUA2MrmC7T8aHMHx/LFDjqMgvHWYtfZUQmykOisHOYF3ZZS1BpbY+DfQZi73CfDnFWJS1HU+OPaGr8EQ3Fzdg8wBd7xAE4aueBcxJvvCeV4xpDesIpDct7IFIBpgFgcps8yqaB9ksh3LoyXLQN03gjqqFA8ksa3HrxitQX77H14lE7D1SIXbB39FQc6CJGfpolPrgvC8QHUj9UpOc/BpuS83hNOcwLe6yl2G9tj2pre61hNjX+iLqi6zhUdB3F/q9iywBf7Ld1wTE7D5yXeOOy1FeF9LhTGn7TQ5AKMA0BU4umAfV1ZZzCMCUPrqRxW+aPD9l6kV/SqLNzR7nYBfsnZxoUI5eajPW4JQvAA/tANLtFtB5JeTDLQ6KwtbctKqylqLK273BKqw6Tn/riZmzyfxUVAfHYLR6NA7auOG7niSaJD95nSOtHpeOYgZCGh/9JgGlp6RymdmUO/rpyhqgUb4Xu0RtCZyWNk6ykUT05CwX9vFHST25wjPzUuc7EbVkA7skUOJlR0CHMncO8sMPaDpU6jpgdIS0LWIB9AfF4VzwaVbauOGHniWaG9LrUDw2j0nHUKQ1v6YBULv8diP4Eokcg+huI/gGif0AufyTAtIR0DFP7+iO3rnzF5i0UjFqs882vqaRxhVfSOGbngYMu01E1OatNOcPYuSyV474sEHdlCrybtq412te2dgiwqzA15WRxM6oCElBl64qTDOkVHtI1URfw1pxzGr/f4eG/hYPD1yD6A4j+CqK/g+hfIPofEP0bRL/AweEnhId/L8C0FJgxigbEPVuJeNFOpCpO69wYUDRgPtb0T8Ce9K06TVHbK2kctvNAzZSXtC5pGCO1GetxRxaABzIFGt1ma/wcU8PkZ19APPbYuuCQnTtO2XniAkN6TxaAU6MysCbqAt7kISX6FES/A9GfQfQTiH5mIP8XRP/HfvwPiP4JufwPAkxzwwwfVYNEXtNAhGi71iB1udE1lzR8cVHqoypp7BG76FXSMEZOu87GHVkAbsn8UZX+jsXB5Ka7+wPisUs8GuW2Lqi1c8dpiTcuSuW4IvVTIQ1/4QSIHjCY34PoRzaF/YWH8z/s459B9BcBpjlhxjjXIYZ36PIsUWmnTejagjyRUcCmqAG400FJY187XTfmTHX6O7jOapc3pP7tfh5XMjEXTHWkm/1fw+r+M7BL7I86hrSF1Ujv2StQJk6FvPd53vrynwzn4+msEuYjyOXfCDDNkflep1s1DUQ8sxfzNDQN6AKyo5LGeSOWNAydAy7Tcc9egY9lChx3ndU+YLUNIHPC5Kem6LoKaZk4AIft3FXdRtekfiD6AUT/zdaZP/OA/sx+7i9wcPi9ANMcyZhzE3GinZgr2oGoDpoGOgPJL2ncVitpnGEljYNTlIV+S8bIT6NbBO7LFLgh88c+Xu2yu8DkZ57XPrxhE44y8WhU2Logr3882wD6nm0C/cjWnH9jHz9iu7ZfCTDNAjPyJiJE29ttGmgPJFfSeJ+VNLgpKr+kcZCVNLradaNPyrVobu8oB9PX46bUX2PtUj367MyaGqY1nYE1nYM1XcVoqwOwoocg+hpE34DoO7YZ9AOI/sJ+/I792pcCTFMnM/N7ZETe0Ng0oAlk/dTFWpY0zLNW3D5xKXJFY1EgCkGJjebmdm3Dr10emfKSQWHWWA9E9ewsk8JMSXwAazoNa7oEa7oOa7qDp+ghiL4C0e9B9C0bQf/IPv4diD6Hg8MnAkzTgfwzMjO/V8Hs6EmP1g8SP56iPi5puGOvEbtudM1K0RisE41DYd8QlOv4rCY/l1jt8p5MgT3p6zr9fG1A7mQtewes7XHsGTczwDwFa2qENV2ENV1DL7oNovsgegiiz0H0BYi+ZB8/BNFdODjcFGDqG7n8j3Bw+E5VMHZw+G84ODxCePi3qs+JdTzcBiUHkw/ycddN25LGBakPGuw8W5U0LAGj+qiZJwrGxi6Mmocy1uO2LAD3ZQqc62Qay0XbnVmuZe+EzfO4vGCLyWBu6J/IYB5n09oLsKb3YUU34N3rEOS960D0MYN6D0R3QHQN4eGfCzB1B/lbtk74nlcs5mpSv4DoXxg56C5i2UnoMaIdrVBu2fwXFCy+0EFJwxfNEh8cZyWNHWJ/bBFPRPGA2dg8KdfsCDsaNd8RjUNR3xCdTzg4lleDBla7/FDmjxNqLXhdhblzmBd2Wtuhru8gPLAPRMuCzUYFWZFWhbX947GqXyzG994AazrGcDbCmprgYlWGK1Jf3JcpkNh3JYiug+gKiC5BLr9n1Pu3R8KUy79m044/sh00rrXqP6xQzOUXuPW6qGoa4EBuHlOEiws2qdaL19VKGtyDxAcmZ6I8fSsKB8zHJnESCgckYsOoV8yOr7NRczV7VnOHU4JOX1vFapf3ZYG4JWu/dqkeXXZmdwzzQmXf53BDptxcMhbKE8U3sbp/HFb2i0V2vxhk94vGbK8aWNNRWFMDrKkBM/u8istSX3xqH4Tkvm+B6ByIzsHBocXo93CPgxke/i2IPmJrgj+q9Tzy26v+w4rGP2FkrzN4u38qto8tVpU0uMZwrqRRyytp8G+6Lc5LUDxgPooGzEeJs+59sOZIjmgM1ovGo7jvBJ2+7oDLdNyTKWuXJ1zDjQKzPCQKO592wgWpD27LAvC+kaa0zSxv9IvGrtRK1X+XFPwWPu4XYE1HMcqqEJelvvjEPhBpfZeC6ATk8tsmuY97HEwHh0/YGuALtoP2g1p71f/wUP4Cop+w0GaTxpJGla1rhyWN7ZNWoWjAfBQPmI8N/RNQrmUfrLmzfeJSrGGbQLp8XaNbBO6y6XxlB7VL9ei6M7t/dhYqbV1xReqHB/aBeM/AOJu1SEnBbxHe52WUDIjEQ/sg1I9KN+l93ONgEt0E0W22e/Z7tsbkt1f9S7XGVK47f4Jnr/OqkkalrQsqA+JRl74Rh5eWtXuzVaRvRfGA+SgRJ2HjgESLXle2h1OXz+fXLi+4Rer85+laxzyUthFH7TxwjeFsLmkxCUh+9gfEo1nqg0/sA3F6VIYAU9+Eh38DohYQfcB20L5ko+Z3rDjM7+Dgujj+AqI/4G3fPNSlb2z1jTxZcq7dG61wQKJqXVlg4etKQ+SQywx8yGqXh1xmGB1mU+NPqE0vxDmJD27J/PGRTKEzxP1pVVjXP14vlM2NP6JWkYhmqQ8e2AfiE3uFAFPfyOVfgKgZRO+z6ewnrEj8DWuh4jo4/spA/pmh/RopiZ+1+cZ2BLOIrSs3dZN1ZVfD1S4/lilQrkXtUj26NLNzMJsaf8LR9CK0SOX4WKbQuoRSV/QBKtKqsKZ/PHL6xeLNfjF6wzwv9cHHMgU+sQ8UYHZtxGwE0SU2at5lxeAvWbcG173xJxZlF8dT9ADFBb/VCeaxvBps6J+Avd1kXdmVHMpYjw/Z8SFNWtYu1aPLBhAfZlPjTzhk546rbErbWQmFGyXz+sfh7X7zkK22uaMrzCapD+7JAvCZfZAAsyshusBGzRZWd7rDisMPed0bX7F8DqJP0ItuobjgC51hPilpcA3HHVmA8lQ6LWuXhoR5MG0jTtp5Ko/I7KCEUuqfhzX947GSjZJdQamCKfHBXVkAPpIp8GrkWQGmvpHLb4OoAURnQXQRRFfZhtAdVkb5GMoHYu8jy2Yt/HsfhI/7bY3faAGmsnZ5lT13qUvtUj267Myqw2xq/AmH0wvRLPHBh7IAfDAmQ+P3a1W/WCzvN69NCaSrucmO5lwW2SjA7PqoeZLhvACi9xjQGyy34Nprv+p/8Pa24wWYNaiekoV7sgB8LFOgXofapaFhNjX+hFpFoqquqP494xB1dZTUlOtSP3wsU2B1UIEAs2uj5hcM5imG8zyb3l5QJbzPMhy388RNqX+7GwtPGsyivhPatOmddZuNu7IA3NSxdqkpXYXZUHwBR3gllIsLNhsUoKYcTi/EVakf7ssUWD9mowCzqwkP/xIODi0MKD8nQHQCT9Fx5PiuwHE7T9xgONW7TJ4UmPyGA/6LiA6mv4MbUn88kClwTerX5T+nqzCbGn9CWcACnJV44yYroRgbZm36RuUoLQtE6dgSAaahgbr32gKvXluQ6F2BpMQ7aGp8hKbGRzicrixkX2c4bywsfeJgHsurQY5oLNazFxFxo2aNywx8yADUuczs8p+hbcmkPZiVrATClVDusJY9Y8I8mFbA+mUDsUOAadgsm9OIcxJvXJX64XxGiQolHyc3RfqIh3Orf/fq5ulKNI2aFyXK2uV9mQJ79ahdqkfbnVl1mPvTqpDfPx6r+8dhRb9Y7ErdjxpbN1yV+qnWm8aCeaK4CS1Sucnb8no8zLn+zZ3CbGp8hDqG8yp7eqIxaAlKBiShRJxkdjSmSo5oLDawUbPGALVLQ8BUjpJxyO0Xi7f6xah2XKvTNuIEr4RyoaTFKDCPFzXhgtQHn5q4La/Hwwyx3oxoUXanMDmcdXbuuCz1xX1ZIC5LQ7FxQAK2drM+WH2zbeJS1QkHtba+quND9K1dqkfbnVkO5uNGgVjebutPqhxOL0STxAcfyvxxY8wCo42a5zM24YF9IB6YsC2vR8NMjrivE8ymxkeoTd+IWjt3vMda0Fqkuj0a1Z3DnQu0oW8grkh98UAWiNuyAIP+GbrA5Nrp3tCAkstesQsuS33xsSwQl400pT3HYJqyLa9Hw9R1xGxqfIRN/jnYMmAiDtm5q3o0b3tEmx2NqbJhZAw29g3EHXZ8yClXza8+MDbM5safNI6S6jmcXojDdu64ztabLUYooZwruYiPTNyW1+NhJkfcbwWzI5Q7U/ep1pUlA0JRY+uGi1I5PpIpcOcJwnmGV7vc386rD/SNpp3ZLcMUrf67msHUNjXpG3Fa4s1OPTBcCaVWkYiLUjkuSuW4K1PgS/sxJmvL6/Ews7J+wLLIs53CrCm6pnxaRJyEDQMSsDu1EtXRv8FBWzdckPjgvn0g7nrEoNrAN6ql5fFr2xX4wAC1yza/vxYbQLrCbG78CXvEo3FB6oM7sgBcMdCUloN5Weqn6hJbaqK2PAEmS6n/KhQPmI+NAxJR7JeD5sZHOFnSiJqM9Tho64ZmiQ8+kinw9cCxqElfb3ZAxspB9tr2j2QKHDFA7bI9mKXDArFJ5orSYYEGgXmq+AIOGriEwof5AWvLywvaIMA0RDIz/6wVTO6IkLX9E3Cw6KoK5rE85VuTq2zd0MRwfmE/xqJe8GPIXGC1yweyQIPULjXB3DYsEAW9hmB9ryHI7/UCNo+dgo1jQlRZFxmN/LLqdlNa2agR56G0jThu56l82ZEBSih8mFxbXr6J2vJ6LExuR1Z986c9mM0s21P3qT7mYHI4D9i64rzEG/fYeqO2h+Hkapef6FG73L58kyob3lyjysplb6qyNjgBBX0CsKHXELzTawjW9XoB66QjsM7VB+sCgx6nE5gdIa1LL8R5dupBV0soHMyjdp54n7XlbR1bLMA0B0x++DCP5dWgJn099tu64pzEG3dlCnxlPwZ1GRvMDspQOcx79cGupKXtAtMna4MTsF40HmtF45Df6wWs6zUY64a4tgapB0xNSKsVCbgk9VU9nNBVmHV2HqpjLLebqC2vx8LMyvpBBTPFsbBDmJpQaoJ5LE95KFWlrSvOSrxxVxaAr+zH4LCF4ty2vATblpe0ArZiWXa7eZ/VLu/IApAdm9wKVn5wYpdg5ovGYbVoHHJEY9sH2UWY/NTZuaueQtG3hMLBPM1ez/epfRBOmqgt74mA2dEasz2U7cHkcFa5TMcZiRfuyALwtf0Y1HXych1TAtMna+PSVbXLOueJWLnsTeQEx7E2vRBs6RvaBZjZWLksGzmiMcgJjsWaqdOMDrMoahFOS7xUB0d3BeYpiTcusra8UyZqy+vRMLOylG/tag9mRyg7gsnlgMt0nJZ44TbD2Th1idmB6ZtDzqG4y17bnhuXpkK1IjgO60TjUNw3BEvdpiBkUhBCQoIQHRmOrLR0rVHykxcTa3SY+WXV2ByVqTo4uiZmCbZWnsXWyrN6bf6clyiPsbxvorY8AaYeMLctL8a25cV45808bB8VjAaJFz6U+eO+TIGK0GizI9M1q+LSWO0yEB9I/VvBygmOwyr2IqItNqFw83aCm8/jhIQGqYDmxGZ2CNLUMPPLqlsdHF0dvQTryqqxrqxaK6R8mGcl3nhgH2iy7p8eDZN7excfJteS19z4CBW1N1BRewObK8+qsqasWpUVK/OwfNnrnWb7qGDU83Du62Y4d44ah4/sFfhYFojKUSEqXFkp6XBzdUKOaAzy2ajJR8nPq65TsEE0vlOUK5dlI3fBIpPBXJ+dj2O8Uw9K3ypQ4dQWaVPjjzjP2vIeCjC1T1zKA8SlPEBk4g1EJt7A7CkXVevL0OfeRcLEXSqY+22ntMLXUbSFuXzZ69g2Khgn7DxVHSKVoTFmB6dtmiU+uM86fd6OS1XBDBkTBDdXJ4S86IqYQT5w9XaCqw8vcidMGOWGIlEI3hGNwxq2udMZzJXLsk0GM7+sGiVRi8A/OFodZmdImxp/xLnii7jHati/NkFbnkXBVAcWmXgD02JbdM6UiQ0qmGHP7WkF84DdVGwYkIjlc3IMCnP5stdRGDK71TlC+7sBzry4NNxiz12eGB2mQhk9Mxxuo53g6uoEV3cnuHo6wdXLqQ3O+ME+WCcahzxRsGpzx9Jg5pdVo1w8GpfYQwkHY5Z0iJOPlIPZ1PijSdvyjALz0JVDOHTlEHJrczHvzW16A9M3YR41KphTJtS3grnPdgpWerxi8BFTHSd3jtABC8e5d9R43GbnphbGL1DBdBvp1BYmh5MHc8IoN+SIxuIlmT+iB3khKyVNK5gd7swaAeaWqEWtDo6uil6sFU4+UlO25XUJZnRxNDrL7GUFJgPpP/04RgTvxYhxe1Uwp8VcRPzza1Qw99hONspUlp+NIbNbnSNUOzHW7ADby2Xea9tXBM/B6tiXsCQsBpNfcIersxNcXZzg6qYBJzd6eis/dvN0gpuHE6LDw7WC2eEGkBFg5pdVozBqIep5px7oAnNdWTWusba8lQGrBJjqWZSeiASfZ0GxBEogUBKBkgmUQqBUlhTlz3m+Gozxv5mD8b+Zo4JZHq3daNkVmBxO/jlCpsS5KjYLeSwdfR5Xu3wgU+CUXQAq+k3C3n6TsbffJOztN0kJkz9qujvB1YMHlBc3Tye4uTthTuQMi4WZX1aN7V5T0SxRllDOy+foBLNBHolPZYFY4/sb1f0YmXhDgDkttgVD05xB0QSKI1Aig8lHmcZ+TFb+urlgLl/2OgoYTu4cIUPj3DQiEltZymwmYU8/fibjXfZxe19f4xyKO6x2uU0ShFUDFVg1UIGcgQqsHKiAn+twOLuNgLP7CDh7jICz5wg4e42AszeLjzJOvkMxSj4UI/1ewHAnhmkAACAASURBVML0ZIuGWfjmO6i0dVEdHM0voXSW91lbXr7vco33piGRdjuYFEFKmNyIOZ83Yqa0HjFpPmFIprPZYCpxhrc6R+iiy1S8E/IS1oe8hA0hL6Eg5GVsGZmsBmyy1jh32IRhu00YNtqNw0a7cSiwG6eCtWKgAm8PVGiEsSouTfkUhiwQN6X+iBvigjR5MNLkwUiVByPYeTiG+Q7CML9BGOY/CMMCWBSDMCxQLYpBGK4YhOEBg7SG2WHJxIgw88uqsTlqUauDow9osd58Jztf1ZZXOzy20/u0q0i7L8x5BIrnjZrJakAZTEogg8HMjVvC8mvkh2QhPySrFbItTgs14twQEt7qHKGbsjCUi1OxR5yKd8Wp2C1O1QhMmxs8eYgrEoe4IIElbogLUuVjVWnv63aOCsY9e+Vr2w84T0DOsjdbJSJqKobLBylx+jKc6kC5BAyCl9cQDA8YpNXfudOdWSPDzC+rRnHUolYHR3cGMz87X9WWd2REnE73rD5Iux/McAJFESiGTWc5nPMZUC7z2c/HETyXBLeBmZ9divw3S1EQtVprmPtt07HfNgOVtumqqANbvux1vK0hG0LCW50jdFU6EUsGT8FLgycjadh4FTAO2cvTIjq9sV9PSsfrSek6YeByxHki7rHXtq+IS20Dc1F6Cob7DMIwHw04efHxcsQrjp54zdELi7X4O1sKzPwyZQmFOzi6RosSShNry/vYXqH3/ast0u4HcxaBIgk0l42asQxnAoPIJYH9fAxhSLqzCqaLfIJGYJpgrlyZ1wrXqmcjkfNsJFY+G4EVz87G8mdmY/HgKXh58BQsGjwZicPGa0TJx8k/R+jUfwVhadIiLEtapDcwfbI6Lk312vYToye1Qdlq1PQZhGH8kZOLnzLjRg9HuqObCufSaXO0/nu0WzIxEcz8supWB0dXqa033/WarmrJW1dW3aotzxD3ckdIuyfMCALNYThjGM443gjKfTxPOe0NW7RBBdNqvH9bYM/Oxtqy6jZRh5nkNw3z/aYh0W8aFkyPxcJp87CA5bWkhR2i5OPknyN02XWayUBy2cNql/dkCmwLmdMuTG7kDHEejrgXXeDr7qhEKh+E4T7KjPAZhHR5MNIc3fCyowcWO3pqjbPdDSATwtwYtbDVwdGlb21oF2aDxAsfyQLwqYFgdoS0+8EMJ9BMUv4Yyaa10QxoDMM4j308V/k54cnHHsMM9UDK+BikjI9B0vgYZM1/DS/Nf1UrmIZKXlxqq3OELrtOx+o47Qrzhgj32vaPZAq8FZvSIcycZW9ikaM7ljh6YrGjhwrjCJ9BiIiaikXpKVi57E2ky4OROkSJU9u/hyXAzC+rxqaoRezdm/5okke1C7PKeybuyQLwhX0Q5oXtNDjOySkHMDnlAMIzjnVDmFMINJVAMxjOCB5QfuawX5tFyMr6QQVzeOwkjQhNCZPDqX6O0BoT4Fwbl47b7LnLo84TO0X5elI6Xnb0xBJHT7zs+7jBXVPS5cHQpomdS7s7syaGmc8QciWUg2xKqw5zXVk1brG2vPhJuzoFNjnlAMIyN7TJhNeWqMKV89QTXRyN3Npc5NbmdhOYk0gZDic3es5mELmwkTU85VhrmPMsAyaHU/0cobVxxl1rcrXLD2X+KIpf0CnMLN/xeMXREy87euDNpIwOYXb2HKamWArMjW++0+rg6APRizXC5Nry5kWnawVM36g70gWpWWAmuT6nhDmZ4ZzGgPIzXfnzDuGPj7TnYGqL0hQwOZzq5witizcOTn7t8pbMv1OUy5LSkcWmsS85euiAUnuclgIzv4w79eDxwdG/mTAe60aOQMHIF9u05b06cZzBMXYEUxekZoF5XuLzGCcHVD2TCPKY11stpi0VJodT/RyhfCPgLA6JUL22vVpD7VI9GfJg/No3BEscPZHpO04PmJ3j1LgzayaY+WXV2DI3ExdYCWXfIJc2MLm2vJywULPBVEdqETAvSHzQJPHB2ilz4J4W9Bgoi0N4IOTzXm+z/WzJMN9e9jpWxaVi56jgVucIbQmJNCjMw84TcZfVLldqqF22l5XL3sRrSdocI6I7To0bQGaEmV9WrTo4+oF9IKqfd2sFs14eiU/tg5AXNtEiYGpCahaYFyU+OCnxwvHi8zjf+AhlYmcsGzQEK+Y0dViw5WCuWFFkkTC57BgV3OocoYrQaIOgzOPVLk92ULvUhNIwycYSR08s9Ztg8TCLoha1Ojh651BnFcz3WFveQddgi4PJxeIe+5oW2wIPRTn8px9BwLQjmBZzEdNiLmKuT4EK5ushiRYNk8PZoHZUSVdh7hk1Hh+y5y73jBpvcpjJQ1yRydarfJyWCDO/THnqAXdwdPMzPiqYFyRyfGofiFpX860xuyVMVeZdVMHkPyhd6jAG2UmvWzTMt5dpPkeoKzBb2KsPPpYp8BstapeGhvnStAgkDXFV1USX+oVi5bJ2SiYWADO/rBp7xS6qg6MPRi9B+jsrMN/nObzkNxiZ/s/D87XgVo8WCjC7AHOTQyCWjAjDG1rgNCfMt5e1PUdof2iMXijXxKWrXtt+fHSYGaaxrXEuZDiXMZyWCnNL1CLUsRLKS/LBrR815B6YSCbYZQwUYHYVZuFzCqyx8KksP0Vq5wgd0APnQVa7vCtTaFW7NBZMDud8NZyWCjO/rFrvB/MFmDrC5J4u6S4w317W9hyhKh1w5salKncYZYG4rUXt0pgoNeIc6oUVQ5ywysPLImHq+2C+WWECQG5troXCbOkQpjY4LQUmh1P9HCFtYBaFROAuq10edA61CJgrlymbFxKHuGKBo3vbDSALgRn2WpTeD+abHSb/0oTUWDA76kec8NoS+PoEwt8nCOPfisSYrBDM93kO6T6DMDt9EiJWLUTqhhVYumUzlm3Z3C1gvr1M8zlCncGsY7XLmzJ/5GhRu3yZteAZGyaHc/G0SIuFaTXjKb0fzLcomJqQdgazM2D69CLK4wPgPdYRvmOHqmCOC5YgdJwM4+K9MP6tSFVCWCJXLVRlGQO7+DdLzY6xPZz8c4TUMc5/ORbzF8cidU4YbrDXtl+T+mnZsO6BJY6eyNKrBU+/5C7ItDiYy9JS4BUk1vvBfGPD5NrycmtzVcfFqjp/tGmora//GTMXlxqt2VdTfBhMv7FDERCv6BAmH6d6xmaNx5iMQMzInIoZmVOR8Mo8vPzrBXj51wvMilPTOUIrl2Vj3IKgx9Mt3iaFz3QxshW+ncJcIB+neqZyod4tePrFWDBL39yA0rc2YNtbG1AVvRhV0YtxMHoJamKW4Lx8DprkUbjkOxefyALxqX0QPuflC/sgvR/M1/ZenfbGW6rMfa0cc18r7/rzmNrC5HfgTHvjLdPBDB4KhRYw28PJwWwvHNgZmVNVYE2FtoB3jlCm5/NtNyj4O4dsujVuYVCHMBeqnrv0xKtJaRYFU1tgD9oB9hnLQ3tlLfcjmQL3ZAG4KwvAbfZj3WB31LLkjxqBdaNG6P1gPgfMLIdx6QPTFEgVWWHwGusIv+Bh8J/hphVMTTg7g6kNWmOOshtCwpHzwjDlTcOtgearoeR2DdnO4bgFmnGqnrsc6oVXOnnusispil+IoviFKI5fiIrQGOwLjUFlaAx2e41DqaMT9sgG49B/jcR7bBRrD9hn9kE8YAoVsA95wA7xgK0Jm4jVYaFISZqOlKTpSE6a1ub77x9si9neT2OW99OISZiE5yb00fvBfLMeX9lVmMZCqsgKg+fYIfAPHgr/GW7tQlSPz9ih8JvhahCYphplX4gZ3Bomf0tfvdaWpJxyaYKZ5TsOr7DRUpvnLtsDtj80BlWhMTjnMgUXXaaixWWa1sCqrO1RZW2PY32fVwGrGuyNqsHeWBs2EWtY+MCSfJ7D2GAJxgRLEBgsgSLYtg2wNxYvwRuLlyBn114cSitATVoBDqdvRENxkyqaXsP41CTS+8H8HgOTD9QQSD3GDoFf8FD4Bg/VCuXoMS+w6e8wKOIVRoNpyFE2cdE85c0yh7c5wd/SV981TFLCHZfxeNQsil+INZPmIOd5T+x81gfbn/VWATugAdhnPFydjWB32AhW4xSAg04BqHYKwOqgAOQFBWDtqBFYPWo4VjkNQ7LPc0jyeQ7TvftjyaD+WPL8ACiCbeE51gHysUMR7jUcc8Kn6g1M38TOnaT3g/k9DqZBkb41R+vRUh7nD9exL7Ram5oapq5oX4gYrLxRIulxrY0/avK39bmdw3iCPMy2XWAP7YNwXwOw2wwYN0V8h00RNQGLmx2g8d8QFe6H2JejEftyNF6eEIRXk+JROTkT+yYvwrtO47DbOxS7vUOxf3YmmhsfYb3fCuT3T0CZOAXl4lTUpFcbFF5nqVUk6P1gfo+G2WWkOsAc/1YkfOL84T72BfiwHV1LgqkptjNtlTdGBD3e0te0a8ht5SewUTWaNAJ7e+RI5AT5Y/5sBRJnKzQC8wu2Rbj304ia5YvIWfI2wComL0JtxnpV2nvtvXrKQ6JUqU5arsKx3m8F1vZPwE6G85AJcR5QxOv9YP4TA1MvpDrCHP9WJJzHDIYXq4H6R7iZHV9HoZm8tU8kD+c83o4hh5TbPZyn3KTw5wGbw4BlhkzqMjB9Uvfa1nZhNjc+wq7USqztn4Ad4mSUi1NRayKcpwKT9X4w/4mEqY60Y5y6wZTH+fPWm5aNc3D8YCVIbjt/jtquIVd3i+XtHEYRXOJHGxWaoWEqce7Dmv4J2M5w1qUfNCrK4+mFaJb46P1g/hMPs1OkOsLkprRu3JQ2eCgU8XKTQOPWX7EvR+ONpa/hjaWvdXhDx6RHtd415Gpu3Og5lyWa/Ril3LSIWRBldoz8VEZkdgqTw7m6f7zRR8qG4iZckMjRIpXjjMQbdXYeON/4CPXFTSgTO6NM7IzcKAFm15DqAZMbOT3GDlHinOxkVGD65MSUV3DUzuPxtGoK24Tgdg0jeEi5UXU2wSXOskZLXWByOI0N85zEGy1SOc5KvFFr544WqZ9qtCwTO2O7eJTR798eCzMr6wfMEW1HnGgnJi94WS+cYzxcMc3L06jAdE1txnqcdA3HETsPVNm6IXz006239Lldw5kss+jxWnQaYc3SHLP/G9TDR9kZTGOnqeQCLkh80CyRo87OHU1SOVqkfq1Gy+IRcQJMfRPl34xI0XbEi3Zi0dAS1WNfObv2ImfXXq2+SduiNpn9puWHGyUP2bpjn60LysTOqJqcqZzS8ncMp9DjKe5U9vFkQky6ZU1hLQ3m6eImNLF1Zb2dJ8rFo1Uw+SPmphfjBZj6Zn7EfUSyETO979sqmOczSrT+Rp0saTT7TXssrwYHp2ThtMQLh+3cccDWFbvFo1Uouc9ZszQHLnNHt9k15JLs8pzZ/x2aor7xY06YTUGpj6ew6RtxvvFRq3Aw140pEGDqD/NjzBZtQ5xoJzK6MczjU17BETsP1Ni6ocLWBbvUQKpnzdIcrFmag5j0KMSkR2FF9HwctHXDWYk3Tk1dbPZ/j6XCbMooUaGsUyS2QcmH+caccwJMfZM4+2OEM5gLuyHMI1NeRoOdJ+rs3LG/nVFSm1RNzsQe8WicsPNEi1RudojqUd/46QrMEnES9ohTcUixTjeUJRfQLPFBs8QHR9kObEcwc4xcKunRMLOyfsAsUSliRTuwqO+KbgWTP0ru1WKU7Cw7xc44ZOeORok3GqYuxsaRcdhlE4ZdNmE9CubKfrEoHjAf5eI01CryUVN0rdOvOV3chEtSZWmk3s5TVa9UD7f5s22A8XdkezzMGaJSZGb+Gcsiz3YLmCemvoJjdh6o5Y2Se0dP7XLnTdXkTOyzdUG9xAstUjmK+4agzGYSSm1CsSet0Kww1VF2BeahomtY0S8WRQPmY484FdW2GTjUCc6moFRc4qawGtaV6qOlKXZkezzMrKwfug1MbpSstnVDuQFGSfXsEjvjsJ0Hzku8US0OQlm/SdjplGhWlIaGyeF8u18sChnO/XbpqG0H57mgFLRI5GiUeONwO+tK9cYCAaYBYyyYe23TsG/ymi7dmCemPB4lK21dUSYebVCQXKomZ2K/rSsaJF44Ih6LXTZhqE4rNitKTRs/htj8eYwzEe+KU3HALh11ajjrA5NU68pjHawr1WFuNUGpRIDZBZjrByRghzgFe8Vpet2UtRnrVaNkla0b3jXCKKmeMvFoHLHzQItUjlrxGOxO3WhWmNUpOUaByeFc3i8WBQxntWKdCueR9I1oYevKBjtPnGhnXWmuHVkBZhdgrhn1EooHJKFMnIoDk9fqdEOqGgXsWjcKGBtC1eRMVNm64rTECydc5poV5bE8zRs/hiyXcDg3DEh8/D0tPo8LUh+0SOU4LfHqcF2pCeZKE+zICjC7ALMifSuW95uHreIk7BWnoVILnHUZG3DSNRyH7TxwwNYV7+pZAtE3pSMTsFs8GsfYqNnTYWpKI29deUQxv0OMtYqEVlPZUhPtyD4xMF9VHFDB1OWb2Nkas2RSDtb0j8c2cTL2itNwMGN7u597nNdOV2HCUVL1fyRphdhqE4qd/f1RbeuGMxIvszccaEJpTJgneevK43YeONrJFLZWkYAmqRxnJD4oEztjhwma158YmJGi7cjk1TENCfNYXg02T8rFxgHzsVOcgj3i1Da/XjPlJZyReKGug3Y6U2TjyFjsdkpEWX9/vGsBDQftbfwYCyZ/XXlKy3VlrSIBDRIvVNm6oUzsjCIT7cj2eJhcW54xYR7Lq0F2vxhsEidhjzgN+3lTWkM3Chgqm0bNQI2Z2/RMCfNk8Xk089aVh7VcV3IwufXlZhPtyPZ4mFxb3iIjw9w8KRe5/eNQytab1S6xqFdrp9s7eqpFoDyWp9wEqrB1wUkzjprt7cgaA+b5jBJckPjgnMQbRxVt15Wnij9oF2adnYcKZr4JmtefCJhZWcq2vEW8XlljwDyWV4PisBy80z8BB2yn4IidBw5a2Cipnl1iZ9TZueMca9Mz9Z/f3saPoWFyfbAXJD44YeeJY7wp7JGi6+wcoWQcSq9qd43JwTT2cSJPFMyZotJWTezGgslvp6s0YDudsVI1OROVrOHAHKOmyWCyR7lO23njYHpBK3g7W50jlIza9Gqcb3yEpMSv4eX+DVx6ncG6/skqmBmKCwJMQ2Van1IsMDLM41NewWE7d1U73U4LHSXVUyZ2xhE7D5yX+KDexKNmeygNCbMpKIWd2+OF4+mFGqerO9k5QtvEyXjTZgnmeTfDir6CFf0JVvRXjLK6oDpOhOhfcHD4EeHh3wswDZFlcxqNArN1o4CrWXZbuxKuTe+UxAuNU5eY7M/taOPHUDAbM4pV68pjgR3XK3em7kNe/3hY0T1Y0Zewom9hRT9glFUzRlldVJ6MZzMfRP8Lov+A6J+Qy78VYFoaTPVzd94Vj7bYtWRn2S0ejaOs4eBERkGPgMlfV55UW1e2Fy/327CijxjMb2BFf8Yoqya8bhOPMrEzXlfB/DeI/gEiYcS0KJjtnbtjbmD6Rtmm54bTEi+cNdGo2dGOrEFgcutKiTcOqa0rNaWo4HewousM5hewot/Bir5DeJ8C1foyos9mhvIXEP0MokeQy78RYBoKpr4teern7pi6nU6fbHdKwI5OHoauzViPd8WjcdyEbXodbfx0FSZ3RMgZiTcOdfAoFz9JiR/Diq6wqexnsKKvYUV/gBV9j2U2CSgTO2Ok1WWG8p9sxPwLHBx+L8A0J0xdz92xhFSkFWGbzUStnrvcNznTpOcCGQsm90qDZokPjgcmaYVSOY29Aiu6ACu6BSu6z0bNr/EU/QlEj0D0I4h+AtHf2MePQPQdiL4SYJoD5omYFQY5d4fL3tGmO5e2aGQcttuEYadNGIpHxnX4uaY+F6gjlPrC5L/SoJ73SgNtYkVnYEXnYEXXYEW3YUWf4Ff0JYi+ZQD/DKIfQPRX9uP3IPpGgNnVpPZdrjPMMxnFBm2n2yxOQoU4uVXLnjFT0ncCymwmYZdNGN5N6/y5S/65QMYcNTvb+NEHpvorDQ5p0XJ3tPgDHEirQkXAaoT3KYIVnYYVvQcruo5f0T0QfQair0D0ewb0jyD6E4j+wH7uCzg4fCrA7EpSdIB5NqMEDXaeBj13Z/OkXOT1j8M2cTIqbJNR0cVTDzrLvrQibLcJQ1m/Sdih5fEhqnOBjDxqGgNmq1cadLKurEqvwi5xMnaLk7FdnIxScRKm9SmEFZ1CnOh1PLQPwss2q0F0F0T3GdAvQPQlg/oF+7l7cHC4KcDUN3L5H2D/qztI7FuC1L6bMd+7GV7u33c4Shrj3J2SSbnYMCARO8TJ2CtONirMrSPjsYNNY3U5PkR5LpA7zhuxTa+zHVldYZ4KTGaPcslxQot15TZxMraIk7BJnISCAYnI6x+PN/vNQ4bNG7gjU+BT+yBcl/qB6DqIbjGgH4HoYwb1IxDdAdF1hId/LsDUHeTXIPqarRF+ZFvcv4Do33iKfoYV/YTigh/YKFnc5tyduvSNBj+MK7tfDIoHJGG3OFnnUw+0zd60QmyxCUWZTRi220zU6Wv5bXpNbpFG+ft1tvGjC8xj6YWtXmmgzboyf0ACcvrHIbtfDLal7sOO1H24MiYDH8kUeCALxDWpHyL7vA6iCyC6DKJrDOkHLFdB9B7k8ntGvX97JEwlyi/YuuCvIPo7iP7F6lD/C6L/xVP0C6zob1jvV6hqFNjDRknuuAlDw6xI34qcfrHs1INkrU490DXbJy7DDpswlNmEYevIeJ2/njsX6IJEjvqpr1gszPri82hm68r2XmnQXg4VXWv13zcXbsVdWQAuS30xq89iEJ0B0VkQNbE0s5wH0Tk4OFwy+j3c42CGh3/Lphwdwfw/xIq2tTl3R/38F2McX6k89SCBnXqQ3OGpB/pkG6tdbrOZiHI9zoytmpyJA0Zs0+sMpbYwG3nrykpbhdYo1XNz4VZ8KPNHs9QHOUEbEB7+JYhOgOik2o/KyOW3TXIf9ziYDg6fsHXBF2w37Qc2lf0Hm8r+D4j+g2jRVlSxRoFdGlAaC+axPOVmUOGA+dgpTjZaCWWrjtNYfox1LpA2Gz8dwaxKq8LB9CpU2s5t9UqDEnESNgzQrpmAn3tjF+IDqT/OSLzwWmSj2v/Bfwm5/DYcHFogl982GcgeC5PoJohug+hztq39Z1YQ/htbZ/6LAf0Fy2wSMKvPRljRtygq+MZkMI/l1eBNdupBuZE3gvRJ1eRMo5wLpC/MioA12C1ORZk4BTvFc1q90mB1vxnI7heD7an7tAZ5qaQFn9oH4gOpP3aNTDTp/flEwgwP/wZEl9gi/T7b4v6WFYT/yuvg+Duvi+OveIq+QVLiQ5PC5Eoo5kbYHkxlm55hSyfa7MhqgrlVnIQt4iQUDZiPI3ZjW73SQH292F5qixpxx16BT+yDcE+mwFWpH9aa8ESCJxqmXP4FW6RfYVvan7Cd2W9YcfgHEP2FIf0rG02/w1P0FZISPzMpTEtP5eRMg58LpM3GjyaYq1hJY7t4olavNFDPgbQNuG8fiIf2QbgtC8BFqRyrgjaYHd8TA1M5YjbyRs17IHrICsO/Y10bf2QllO94XRyfotR/NZpLLgowWaomZ6LcwOcC8WFuGxao0xqT/6q8Y3YeOFp0TiuUZzOKcVsWgIf2Qbgp88c5iTfeDlpvdnhPFMysrB9Y/amZh5Pr4HjI6974Go+7OD6Fd++DeGAfiIf2gbg9ZiGujslAc8nFJxrmsTxlw0Gtgc4Fqk4rxvZhQdjSexi29B6Gzb2HYVPvoVrD1PWVBucbH+G9BZtxjzUN3JL6Y+/IJLODe2JhyuW3QXSK1aFaWIH4Jpvact0bD/C4i+NDuPTag3MSb7wv9cUNmT8eyJTTnpvu0ajN2I7K9FKzIzFHlG16rqrX9+n69XvCXsfesDewzSYM2/uOwebeQ7Gp91CU9B6Kol6OKOg1RDuYqucrtT968nzjI1xfuBUPZIG4LvND/piNZsf2RMPMyuJGzZNsWsvv4LjBkN5iH18DUTPiAypQOCIWW16MZ2fgeOOK1Bc3GdLbHjE44ZqFOgPXHLtD+OcC6TJq7rAJw3abMGy1CcUWm1CU9A1CYS9HbOg1BOt6vYBNwxTYPEzRKcymjBKtX2nAz62FpbgjC8B7Ul/kBRWYHZoAM+sHyOX3GczTbOQ8z4BeANFFliYQNUIub92I/MaccygcEYu9ti44aueBJokPrkp9cUvmj8vSUNyWheGEa5bZwZgq+p4LtMUmFMV9Q7FeFILVonFY03skNneAURPME61eaeDZ6SsN+E0Dt2T+aJL4YEU3WE8+MTCzspQFYgeHFgZUPdp1cSwNrcLGweGosHXBMTsPNPOQ3nCfi9se0TizoBCnFhjnrczavHuzcGQctttMNOpr2/nnAmnbpleZVoT1I+dh28SlqEwr0npHloOpzysNHjcN+KHezguvRp41OzABZidAuejSxZEx5ybSpl9C2vRLeHXMbmwcHI59ti44bueJZokPrkn98CGb7n5qH4ir7lEGQ7pdy6dQitlzl8Z8bTv/XKAj4rF6/R7aoiwPiUKZfGqrVxoca+foSS7vj8nApZIWfCILxAdSP6zvZuvJJxJmV8KHyc8rQWUqpPV2nrigQhqAT+wD8UCFVL8Xw64Z9RKKBsxHWScte/vY8SG7dXjuUmuMacUoD3sDu50SscMmDO92sU1PF5j7nxnd4SsNuNQVncNH9oH4xD4Id2UBuCL1w5puuJ4UYBoIpjrSwsHhysel7DxxUSrHB1I/3JYF4BP7IDywD8IVHZFWpG/Fb/rNwxZ26kF7T6GUjIzDDpswg722vTqtmO2iTsQOmzCU2kzEFptQbLYJxeZ+vjho64YzejQcaNuKVx4ShXeHe6O673MaX2nAT3XaBlbiCsKHMn9cYE3o5r5nBJgWApNLXOApLGZI9zOkLVI5PpD6444sALc8onFuQRHO/wIifQAACMhJREFULCjEfi3KLyWTcpDHvXuTnXpwKKUQW8b/GkfG/xqHU9ajtM8YlLEHog3x2vYdvF3UTTahKOwbgnWi8cgRBWOn8yy9X9+nLcydw7yw11qKmr4OOC1p+0oDLo0ZJbgtU+ChfRBuyPxxVuLdpgm9u0eAaSCY/Lw6ZjdDOhsH2KvVL0nluMGQXpVOxDHXTOwe/VqHSDdNykXBgETsFCdjX5/pOEL+qCd/nCZ/nCIfHCYn1JETdo8wzGvbS2xCUdA3BGtE47BSFIzSiUuxbeJS1a/rey6QNhs/ZV4TUG4tRYW1FAf6PtfuKw24poGH9kG4IfVH+cj5Zr9PBJjdBKYmpEWDZ6OKPbHxnlSOm1J/3JUF4Jp0Io67ZqK2nRppfu/J2NVnOmrJH8fJH6fIH2fJH+fIH6fIA0fICYfJCYccp7QLo0qHaW4p20XV+Pvo+fo+bWC+O3AY9lpLUW4txT7vye2uK2+wpoFrMj+ss+AmdAGmhcNUR5r47GoUD56NWjt3nJV44z2pLz6Q+uG+vQIfekTjlns0LrtHoWHBRlSnFOJd8kc1+bcaLRvJH+dZjpETjpITaskJh8YvUmF43HUzETsNWErhzgXSpU1P640fayl2W0uxb3Zmu00Dt2UBaJHKkdeD1pMCTDPDVEda8Hw4SgZHoI5NDy9zLYGsb/eyrQIXxf442ssfh8kfJ3gjJofzFHngMBs1a8gJu1+MxnabsFbrxRKbUIPB1Of1fbrsyJaHRKEqabnGkfKmzB/nJT7dogldgNlNYWpCumlwhGo0Uu/bvWEbiNO9/XGml3LU5HA2qMHc0WdMq64bbr1oKJjH8h636WlzLpAuO7KaYF4qacHdsQtxXeqHipFJ3bppQIDZzWC2QTpYiVRT3+5D+yDcsg3EKTatbSAf5TSWnFBNTijtJccq0ThsGDmvw/ViV0dNbc8F0hcm/+S6D2T+eKcHNA0IMLsxTC4RshKkW2XhHZtxrfp2r3AtgWIF7tgG4nTfUOy38kU1OWE/OWEvOaE6Zb3BMaqH36bX0efp0opXHhKFXV4TcMJmsKpp4LLUF6t7SNOAALMHwIx5sQKzKBdzKBcxlIssqyxssBmnsW/3knQCrkon4khvV+whJ1SZAKa25wLpAnPHMC/UWA9Eg80LuCXzR7PEByufgPWkALObwZxJuYigXEQxnHGUi3jKxStWWSiwGaexb/eK2NfozfUcTG3OBdIWZcVwOaqs7VHTZyAO930eDXZtT657kiLAtFCYiQHHMYNyMYtyMZuNnHN5QLkssFqI9TZjNfbtPpB1vW+3w2lqJ+cC6bK+rLa2R421PfZb26PwhUlm/96bOwJMC4XJjZrTKRczKBfhlItINnpyQJVZibmUjSjKRrJVmsH7djsbNTs6F0gd5q7h3ii3lraDcy72Wdtj13AfbJ6x3Ozfe3NHgGnBMNOmX8J0ysV0NnLOYlPbSJY5lItIWo4IykY4ZSPmxd2qr+uob/dT+0AV0oYuIuXOBWrU0HDAP65yt/cE7GUtd3uspdg5zOsxygnRKJ8QjR3DvVE+IVqAKcC0fJiJAccRIStRjZwz2+QtzKRszOOh5Kezvt33paE44zYfDQs24rQea1LV6/s0NBzwN3728FDuGuioGiU5lPwIMAWYFg9TfVrLzwxajhkdoGwPaXt9ux96ROP8At3rnmViZxxm5wK1jArF546j8cBxNE7aDUSl5zjsHjhUOYW1lmKXtaRDlAJMAWa3gskfQbl05ffhkHbUt3t+QZFWI+khp3HKKbPEC5/3dcA/iPALET4hQj0RDvQSo8Jainetpai0tsdBa/t2UQowBZidZmH8A7NDNEVyFauwy0GOPYP8NPbt3pMF4CavuZ6P8tz4KHxBpHp932d9HfALEf5NhP8jQgPDefipXijvNQBV1vaosJYJMAWYXU/GnJsWOXoaKq9NrVah2OM7Hbsc5Ng7yK9N3+59riXQPRqnFhTidFgq7hLhKyJ8bNUPX/bqrxot/8NgfsbDeYwI5dZSbB/mLcAUYApIdYHJDx+ppr7dK71tcY/B/AMR/kqEn4jwM8P5byJ8ylDWE+EEEQ44unSIUoApwDQIUnOjMiZMjUh5fbvvE+EeEb4kwrdE+IEI/02EvxPhn0T4FxG+YyhPMphHiASYAkwBqaFgqiOteGY0Wohwi23yfE2EPxLhz0R4xEbOvxHhHwzkCTaVPUKEcq/xAkwBpoDU0DDLJ0SjxtEFTUS4xkbNh0T4LRs5vyPCX9jU9hEDyaGsE2AKMC0h3QGpvjDPEOEyGzU/JsLnbOT8ho2ef2JIjxLhMMshIuwRYAowLSmWilQfmPu9xqOeCBcZzptE+IhNaz9nG0Jfs1G0lqWGCFXCGlOrCDDNFEtCqg/M8gnRqCfCGSKcJ8J7RPiACB+yqe19Ijxgu7IHiVBNhANEqJA8LcDUIgJMC4i5keoLs8bRBSfZjus5IrQQ4X0G9BZD+j4R9vPS2TRWgKmMANPCYg6k+sLkcJ4gwlkiNBKhmU1vW4hwif18ORH2EGGPFjVMAaYyAkwLjqmQdgWm+sjJdflwP+4jwm4ivKslSgGmMgLMbhJjIu0qTG4z6IjkaRyRPK1CelDytNajpACzdQSY3TCGRmoImIbMkwizuPhHVerrfxZgducYqm9XgGm4qAPrKjJ9LgGmBaUrSAWYlglM30uAaaHRFWlPhtmdgel7CTC7QbQB2h1gPonA9L0EmN0s7SE1JcwDU2JUOTRTmVOxsa1yLS/P2Pduj74EmN04fKT6wNQGmL4RYHbtEmD2gBQX/4idb5wyCjABpnkuAaYFRdMaTJ912LW8PAFmN78EmBYMzBCXuZAKMLt2CTD1QNZdL1MiFWB27XpiYPYkYIa4jI1UgNm1q9vBFIAZ/jIGUgFm1y6zwRSAWeZlKKQCzK5dXYYpAOu5V1eQCjC7dmkFU7iES1ekAsyuXQJM4dLpupaXpxVSAWbXLgGmcOl9dYRUgNm16/8Bc1EhGzFnydsAAAAASUVORK5CYII=[/img][br][br]Für den Ikosaeder-Stumpf (Fußball-Polyeder) schneide ich die Eckpunkte des Ikosaeders entlang der 5-Eckkanten auf Schnipp-Länge - gleiche Seitenläge 6-Ecke und 5-Ecke Schnipp=1/3. Punktlist iIkost[br]___[br][url=http://www.prof-dr-berger.de/_figurint-dod.htm][br]http://www.prof-dr-berger.de/_figurint-dod.htm[math]\nearrow[/math][/url][br][url=http://www.brefeld.homepage.t-online.de/polyeder.html]http://www.brefeld.homepage.t-online.de/polyeder.html[math]\nearrow[/math][/url]