[size=150]Verwende die GeoGebra Funktionen, mit denen du Körper in verschiedenen Ansichten betrachten kannst. [br]Wenn du eine Erklärung brauchst, öffne dazu das FLINKe Bedienungs-Buch: [url=https://www.geogebra.org/m/gzmmtnn6#chapter/1185524]GeoGebra 3D-Ansicht kennenlernen[/url].[/size]
Von einem Quader mit den Kantenlängen a = 12 cm, b = 20 cm und c = 5 cm soll der Inhalt der Oberfläche ermittelt werden. [br]Welche Berechnung stimmt?
Berechne den Inhalt der Oberfläche O des Quaders mit den folgenden Kantenlängen. [br][br]a = 6 cm [br]b = 7 cm [br]c = 2 cm [br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQsAAAC+CAYAAAAiJSogAAAAAXNSR0IArs4c6QAAAIRlWElmTU0AKgAAAAgABQESAAMAAAABAAEAAAEaAAUAAAABAAAASgEbAAUAAAABAAAAUgEoAAMAAAABAAIAAIdpAAQAAAABAAAAWgAAAAAAAABIAAAAAQAAAEgAAAABAAOgAQADAAAAAQABAACgAgAEAAAAAQAAAQugAwAEAAAAAQAAAL4AAAAARfEGgAAAAAlwSFlzAAALEwAACxMBAJqcGAAAQABJREFUeAHtvQd4nNd5JvoC0zt6770XFrB3iVS3miX3JI5z42zibOJknU32ZjdxbpKbTfYm2SRex46Tu/HGa8eW7ahYhZJIkWIvAIjee8cAGAymYGaA2ff8IEiQoiSQRBmA5zz6xcGUf87/nTPff873vd/7hgXZIJu0gLSAtMDHWCD8Y16XL0sLSAtICygWkM5CTgRpAWmBZVlAOotlmUm+SVpAWkA6CzkHpAWkBZZlAekslmUm+SZpAWkB6SzkHJAWkBZYlgWks1iWmeSbpAWkBaSzkHNAWkBaYFkWkM5iWWaSb5IWkBaQzkLOAWkBaYFlWUA6i2WZSb5JWkBaQDoLOQekBaQFlmUB6SyWZSb5JmkBaQHpLOQckBaQFliWBaSzWJaZ5JukBaQFpLOQc0BaQFpgWRaQzmJZZpJvkhaQFpDOQs4BaQFpgWVZQDqLZZlJvklaQFpAOgs5B6QFpAWWZQHpLJZlJvkmaQFpAeks5ByQFpAWWJYFpLNYlpnkm6QFpAWks5BzQFpAWmBZFpDOYllmkm+SFpAWkM5CzgFpAWmBZVlAOotlmUm+SVpAWkA6CzkHpAWkBZZlAekslmUm+SZpAWkB6SzkHJAWkBZYlgWks1iWmeSbpAWkBaSzkHNAWkBaYFkWkM5iWWaSb5IWkBaQzkLOAQT885hsbYF3pEdaQ1rgQy2g/tBX5Aub3gKuSSeu/dt5dJzoQNjoOaTGn0N0Vh5spYcRVXkEhrRihIXLKbLpJ8IyLzAsyLbM98q3bXALiKEOzgcx3NKHK98/hdHqXsxOujEf1CIsrBk2/SswaAIwYB5GswXmlBxElx2ArewwrHlVUJsjFywQFrbBLSG7fy8WkM7iXqy2wT4T8Pnhc8+i/XQ9rr10Ds6eCcy5/YAmDIGwOeiTopBWaYN27jLsbVcwax9CuM8FbTDAYxYGrQbWxEzYCnYgestDMOftgD4qEWEaHcLVWtDTbDCLyO7eiwWks7gXq22Az4hVxOyMBxO9Y2g9eQ0DF9ox0TIEcB0Z1IUjzKxBdF4C0nfmo/hQJSISopWr8ntdGK47i8HqUxhrrcbMQBsCTjtUszPQ+Geh1wCm6FhE5m5BRPFe2PJ3wJhSAJXRArXRSschw2AbYHrcUxels7gns4Xuh/xcRbjHpzFY34PuM80YvNoF5+AkgmFBhJs0MCVHILEyExlVecjbVQyNVotpjx+zvgDcvnkkRpmgVS1c35zfh4nuRow2XsR4aw2meprgGu5C0DmGMK8ber7NFGlGRFo+IvK203FUwZRaCG1MMjS2OIRz5SHb5rGAdBabZCzdUzOY7BlDx+kGjDcPYqyxDzN2J+boJHSxJiRvzUZiWToytuUhOS/txlULJ/Gtl6/i3XquHvQm/N2XqxAfIdzAB5tzpBf2znpMdDbA3l4DB52Hd6gT8zMOCLdgsmhhS0yHNTUflswy2HK3QpeYDSOPcL35gyeUz2woC8hQ94Yarls7O88/p/rH0HelAz3vN8PZO6H87XYyaKkOIqIgXtlmpG3JQWppFixR3Cbc1kS44VrHCH56shPJGam3vXrrn5b4NIgjY9dj8E5PYHqoG9MDHbB3XMMIty4THTUYbW6DtqkNJvPrsEbHwRKbDGtGEcwZZTBnV8DIDIs2MuHWE8u/NoQFpLPYEMN0ayfnma0Y5sqh+c1qDFd3wTPugmdiBm63B/MGIPVQHgqOVCCxIA0xaXHQ6j96O6BVq6AxamHQLX866K1REEdc/hZk7HkCnslRTA92cdvSgJH68xipPQ17Xw80vUMwNFyB1RYBU0QUTNyiRDBQGlG8B6a0Iq48cm+9OPlXyFpg+bMjZC/hAeoYg5PNJ2rQ8PJFOLvt8E174XV54GL8QGw1Kj93ELl7SxCflQSdyYBw1ccHG9V8jwiG+hm3cHn9Iv55102tM8CSkK4ciWV7kH/0c3BNDMM50ImBmlPoO/8z9Pc2I2xkEobuLliaa2B863/CZIuGObUAMVsfhoUZFgPjHeFaejvZQtICMmYRksNya6dcE05c+eF7GDjXAWffBOb9c/D6fPDMeRFdkIiyJ3cij07CFhelOIiwu0xlDo47MTzphZYp0oIUG9SqlUmFKriOuQACsx44+tswdO0ses68grHmSwh6Z6ClLzPruaJhRFWv08GSnEvH8RBsRXtgzNoKrS3mVkPIv9bVAtJZrKv5P/zLg3PzGKjvRvUPTmP0Wj+8kzMI4ypglhmKOcYfU3fkoeTRbcipKoTOcOeA5Iefff1emafzEFuW4YZz6DzxY4zwX9/kCNSYg0EdBkP4HHQaFYzRSYguP4i4qsdhzN4Kfez1oOxdOsL1u9LN983SWYTQmAZm/fBMu9FxthGNL1/CVNsIgr45QB0OX1gAungz0nblo/BgBbK35odQz++9K7POSWXF0X/1XQzXn4NrqIuAMA808BEkRkAYN8qGiDhE5W8nIOwIbIW7oUvIZubGSOdJ5Gn4x2+17r138pNLLSCdxVJrrMPj+fl5eKZcmB6ZQtMbl9H+dh0RlC4Flh2mVyFoCEdcaRpStmSh5OGtiIiNWtFeiq3CPCHgKhG7EGfm33e7jVmpDglch72tBgMMjo40XICDcQ6/YwzhXidURJTquTsy2SywphcituIQLASEmZhdUVuiCQizIEygSWVbNQtIZ7Fqpv3oEy+Cp/qqO9F+og72lkEGBCe5ighDmFENU0ok0gmcEk4ib3cJVOHXkVIffdq7fnXWH8Dpml64A4Cfm4GHyhNgY2YkFJqjvx2jLVeZjhUw9Bp4RnvhnxhCmGeaMHTAaFIjgvUrtjw6UYLCzMR26OPSmJpNRLjOGAqXsKn6IJ3FGg+n2zFDQNMwus63YKy+H6NN/fA4XJgLn4cuzoyksgykEECVVpGNpCXgqdXqpgBl/fu/fgP/dKIPycmJOPNfjyExMvQyEp6pMQVNKgBh43QcU12NcA93IMCsi4Y7NSO7bI2lo8sohi27DBbiOkzpRdDHZ0FtlYHSlZg/MnW6ElZcxjnGu4e5NycE+/0mTvQxOAYm4JlxI6CeRxRrNLL3FyOlPAvJRUxBRtmWccaVeYuIF4r0aYBbEa5pEB6iAURDRCySKw4oh98zA+dInwIIG2+vhb31KiaEAxnqQVj3OzCee4c2jIQ1IQ3WlFxY0osVQJgluxLa2PSVMdwDeBbpLFZx0D0ESY0296PjZAMGL3cq5eBucki43W4ETSpkPlKM3H10EsWZiEyJUeo0VrE7H3pqD1cX824fXAywMmQR8k1jMCMqo1A50nYc48psXMmwTHY1MUh6llD3CxjqrsfgcC309bWwWn/GGpYYWOKSYU7KZZB0B+MdO7nyKJFxjrsYbbkNuQtjLfet7mkXOpnRaHr5Mqa6xxGcJS7C5YZ71qtkNIqf2I68faWITU+AwWpE+DpH9P/h1av41zMD2FGSjt99vhhG3erER5Zrv3t9X5DB4sCsGz7XNNGknRgS1bPMsow3X8EcHYrAdZiMepgtZhgtVoLIMsjTsR1RFQ8zPVsJjWVlg8f3eh2h+jnpLFZwZJxjU6h+6Sw6361XMhqYC8Lj8cAz7yN4KgFVnzmErO2FMEcych/ORX+ILPkDxHQE2FcV+6RhmnZTNCXLM8es0hyrcIcweO0M+q+8TczKGSU9qw4jwY+OVbhaNQwGHYyRLLsnwU9E5VFEFO1S0rObwg4reBHSWdyPMcWE5A9tuKkXl773HsZq+uCbmVXO6PV7EdAFkXWgiHUalcjfVbJu24z7ucTN9lnfzBQzLNXou/AmBqpPMgPVhrBZF3RErRqZidKTDMgYGQ1rGrc5Wx9BRNkhGFOLiOtYDPquDLp1I9pVOot7GDUBnpqd8bIcvB41PzwLV98kl78BhHGd62MC0pBoRea+IpQ+sh3JuTfLwe/hq+RHVtkC9o46DFw9QcfxnpKenXc7oAp4yNXhV5jCDAYjbKm5iCw/jMjS/TDnbFXoBcO1ugeOn1Q6i2VORgGechNyPdk3hua3rqLnVDPcI84FYiiCp8Ccf0xBEjJ3F6CQzFO26Ihlnnl93yZAWQPjM0rcZDYQRGqMacVqQ9b3yu7+211jg8p2Zbjufaa0L8NDtvMw3wxUfje0Ad4EDCqW3CcpKFIBQzdllEJLdKnaFPFA4Dqks/iYOeXz+sgRMc6l6wCa3yBAqK4PfucsgvQPaptOwUYIB5FamY1s1mmo1RsrweQjKOu3/vY4moa8mA0z4Ue/u/9DyW8+xlSb6mUvA6IjjZcw0dVAx3GRRD/NCDhGEXRNQs0iPgNxa2bSC0ZklSKKKw5B9KONSWX1b9pNYuNNZRHO9012PSt2OTMT06SRG0f7qXoMXG7HNLcaHocb0DIIGKdXqOly9hSTzyEZSTkfTRqzYp1alROFYY6rpncu9iE1ayNfx8oaR8+K1/RdjyqH3+NSAGGCr2OsrRp2OhHXSBemJ4cxeOpdGM6/C3OERcmuRBXuhJUOxMAUrSG5gKCwjJXt2DqeTTqLJcafD1Jsp3cc/VfbCZ4SzFOTCvPUrJvBSoKnIgsTkH+4HInFGUgqTFMmyJKPb9CHAoxFom+jRsmGbNCLWNVuawwmxBduV46cQ88rDGGusX7OlRYMX3sfU511GO5v5RamDvqGOlgselhiEmBJyePKo4S8pAUwZW8jW1gpoNq4P7mN2/MVnB6zs7MYrO1G16lGMjx1wzVG1imCpzxeL3HE4Ug7kr/APJWfihhiI9SazWM2FTEeAofld/lgIlOWmulT2T7cAqLK1ZacpRxJFfuQfeAZrjjtmO7vICDsDIZr38dETyOG27uh7+iG6fJJmG02mEWsg9yk1pwtMLMAzpJVDpXpug7Lh39dSL3yQMcsHPYp9J5rQesbNZjsGMU8MxoCgu32kQgm3oSKp3chb38pYlLjoTOTeWqdwVOrNXM6WMDWPepCQpQZBak2ucK4R0MHyFgmoOgu6q6MNJzn9vVdjDHe4WYBnJqrVpNBA4vZDIPJRDRpGuUUKmEq3IsoUgxqGO8I9fbAOQtqcmG0Ywgt5K/sOH6NEGyPUpbtIbrSOz+LmJIUVH3qEDJYyGVmjYaK/JQPQhMw7xDBiG0Kcwfn5jA3R3En4jpE4VvP2Z8pW5bpvhaE+T1UflOz+E1LbIcKpqhYlt0XEUl6BNaSAzBnVYSkDR4YZzEfmEfftU5c/u4JjJF5KshVRJBAHC85FOb1BE+xkGv7CyxUKkjftCuIkJyBD1Cn5ijSNNHZiL6LBIQR2zFBVvQ5N8vtEYBREw49K48NRhNsaYx10GlEUf1NxDo0QjYyBLz5pnYWAjwl9DQ6329E/U+Z/mK1J4mxGWQCZgm60cVbUPTYFhSQeSoxK+UBmrY3L1XMwYC4C9IuAn6u5aSVUYub9lnNR67xAfRefBsDV1i/wtXHrH0Q4QSE6eg8dFzl6snKbo1LQSSV3yIqqDdbsBO6qCRFMjJMRWm4NV4KbjpnIcBTguDWMWBHy9u1C1uNCVZ5il8AC6SCRO0mlKcjbXsuio9shXUNy8FXc+Ld67m9rDj9yXtNuNI5jchIG379qQJY9JsngHuvdlnrz4ntyhDZwYZqyLlKsh/XcDeL30ahmiPFIEsHRG2fJSYeETkVCq7DSnpBQ0ImAWFWQtEtoAdZ9S5vGmch0puOwQkavBetjEeMkljG5/SSWl6FcMuCbF/6jlwkEzyVv6tU3j2vTy0Byvryn7+Gf3q1gyXfqWj4uyeRELlxCIBX/ReyDl8git/G22qpDXOBEPRaTFKLxcsg6dz0GNRkSheAMKPFSJX7UsLPD8JY+BjS9+6GWhCWrmJb3bOvYscXTz1jnyZQZhDd55vRf6EDju4x+Im6BCHYhswIxBYmIWt3EZJLMhHHtKdsH7SAibNPF2lEtJX1DnIP8kEDrfEzYaRQjKV4kzhEm+YqY5KxjqmBZq46rmD46kVMTKswX0uFuSuMvxmPY4tDi7Lnd64qynLDOovR9kGqffegi8xTIu05Q8Jbj8cLFfU2zYWxyH+oHJnb8hFFRS6BrpPtwy0gtiKzrJZ1UmhoA3DffPiFbNJXrIJ3g4e5dwfc03kIXEnE7ByRtzAxzT2PGab7/9epTvzO49SpJcHzarUN5SzcJJAZa+hH5+km5rA7mPZ0wXUdPBU0q5D1SBHKHq1CVHo8opJjNxV4arUmgJYpvMd256LfEYai7EQZr1gtQ9/jed10BIM1XbwpCsAgKRCmvHQYBnhI8hNumkETRZouq4gW1TJj4vdTN+GjpSrvsRvKxzaEs7APUPz3Yhva3qrBdM8E5ngHFJR1bupLGJKs2PbEHuRQkSsmLZ5U8SZemFxL382keHxnLvaRKFgrxH3uQu/0br5DvvfuLDA1OoGuc81oeeUKZvonMeclYJA3S0/AS/mDSOx89ihydhTgM3/zLhq7fahSa7B6a4qFvoessxB1GmKr0fJmDTrevqZ4VLFG9hAl5yNBSWRRAg59+jCZpwpgFNR0qgcDPHV3U2557xZOIsYm7bc8a63uu0Y7BlHz0hlKVbZTM8WrkCt5vB74qNSWsC0dR188gPRKFqkJRDHnfBirnMMIBFiL22NoOQuR8/f50X2lFXU/OY/hK91cWhFzGRbkHk3I9oUh69ES7PzsEcRlJm64cvDVnWby7BvVAn7igXo556t/cAbjdQMIUstWII29VGSbZ21S3iOVqHqBUo4ZCet6UwwJZyHAU17K9rWdakDtD9/HTO8EwgQwQhMGn2qOZb5mVD1zGBWPUoHKZt6ocyIk++0nsnXC6VFAWSOOWeQmWmBmDYNsq2cBQTi0CBhsP1mPay+dg3vQQZQmMYMq3hiDfpjTI7HjycPIIw1CbGpoZPHWzVkI7koRnHT02dH4xhX0EBjksZN5ihoW0IVjnlT58ZTtKzy6Bbk7i1h8IxWmVmP6ChDb//P/n8J33u1FQkK8IjIkncVqWBqYC8wRMDjNqtQxNL3OOX+qCT5uNcJYdhDknA8zq5FYkYE0KtGVHd0OfYgJXq+5s/B5ZmHvHsEIlbja3rlGtmUyT5HPUkDU1AQD6eJMCjVd+vY8ZG3Jpwan3EuvztRdOKuAeAutU5E+FfveUBUZWk0brPa5vTMeYiUmMXCtC02vXsZE6wgpAWYRTiyQKkoHU3IE0nfkIXNHPjIr8la7O/d8/jVzFlPDExhnwLKfYjsiDeTsm1CWYmEkXTFk2BBbnMKMRjHi81KQkJV8zxckP3i3FgjCxzueWAL7yMHJf2RbIQtMj07C3jFCYmeKTF3totCzHQHeLEEuT32GFQnMQOVQZCqBPCmxpEEI9baqzkLQtU1yFTFQ3YX29xrIKDRKYhkHfIxRhFs1iChORu7BMqSWEV2ZnUQIq0h7yraWFhAridyUKFhNI8hNskC7WXRD1tKIS75rTkC126lTUtOtFDDOkI7RMWjnnPdxzmsRWZmMvMNlRBRnID4nmVmNjbO9XhVn4SOSUqArm99tZg3/AKvpplj96cAsce1aBivTKnJQTJr8hNwURCREPTCcEUvmVMg8FNu8Lz5Ria2UUEyKZnk0V3qy3b0FZqacJLzpQwcFpkYbKXZtv862Rp4UVZQW2cfKUfgQIdyZCQpgcCMSKa2Ks3DVvoX2v/19zDoM0PrSMe2OQjAhETs++RhKyGFpNGugZyFMqChy3f3U2DyfELUgMTYjjlRsnDtcKFl/rGcY3Wea0HGiES6CpwIEDLpnZpSMhjHZhl3M4uURMBiREA0D5/xGbivuLAZH7Dj5ysvQDl/jEsuCWEsLopiKs2aWIC0yCsYAjWYt2cg221R9nxwYpyboAPxX/p5bkAkkP/lrMOZs52qPYB8WNMn2QQvMM7LTTyKlNoIFu96pR2DGR5lEAgYJwfYTPBW3LQ27PvcQUli8KLbW4SLDtwnaijuLpkEX/rA2CUdVu1DmbYPaP8NExyzcrayUaz0DI+vvrSnZCwpPFQ+xxHYLa/JtNOVaYNA2wYitwCUEmf0Yau9DO2kFW1+thmdiFhZjEyK0Z5Dyyd+jo9Aoq755wul9433UwkhHmGb1ag5W4JLW5BRzLOfvudKOS//8LuUABpkLXQgHewIMWlrUKHi6Ctuf34/YtIRNuWpecWehIdrSrknEt3VfwZ8/l4iHbZ2k1j+JsZYrcEyOInzSDb2jFrr6i9D/8L/BmpgBW9EeRFccgqVwDxWe4snjwcm6DkxAazLj1ulL5pnx8DJFrTPqoGLxmCAhns5KQs3kKaIEWZhkK2Sauh9hVBIXDNaCxm2i4Rxq/uAJWJNzEFX5EGL3Pk/V8SqOzYpPm3Wyykd/rQKeIqLYTfxP0/GraGKdhnvIodzW5omNEPIQptQIlD92COXHqih4zZLxTdxWYdSDCA8SrhogtXxSDinrDqLg8S/CR67BIdKkD1afUoRaZgY6MO2aIEClB5r2Vujf+CcaOw62/G2IpsKTJX8njEnZUBnIBGQgajNscyzl1nou+RmFnx6YQPeFVjT8+DwydhZg7288AS2rE/WxZpiL41DM0ubyR3ZwOT0Kgy1W6eIcx6/r4nH0TZHebbIOU9PTiN7zyRuOYs7rwuxwBzSRiRwfC8I1ZGTZJGMkwFPuiRkKC42gUYCnqCHj400ujDU0QerZwhROkakMlD5WhYwteSEHnlqtObYKzmJhOyECZ0ESlM5xyauiFoXWaKW6Exl9eAjmY6HsJOThxlquMv/cBAd1JR2Tkxg6+TPoTv1M4aCwpRcgIr8KEeQeNKYUQhudCI01hsUznJiyfagFBDo2yEOlVUMsnRteuYir3z1NtukApsansPsrjyn76KTidHzuG78Ore66PY036ehV3HaUvPCbUJEsVlDa66iVoU/MvvGd/e/9EK1/9yuIqzzCFPgexOz8BNXGC/k6RYs2qNMQ4KmxziHS9w+glZSMY2RbmxOC1wQMhkcTPJVkQ/b+EiSXZyJnS8ENWzwoD1bBWXy86cKYrosr2KYc4t2OgU6CV+royRthb60msW4dhsb6MHLlErRXL8Fs/jYs3K4IdSdLZjms2RXKxNXHZRAFJ7EZixYX3KPDLf0YbxiAzqRHMffQeubxi56sQld1mwIprnhqF7chC4FLsbr4qGbgSm/LZ7+Gkme+zDvtKFXLbi6z7X3t6B1nivzN1xDTfBU7C3bDmFbEJXoY/IxzeO3sA7UwtNFJ/Apx5+D+XtxBQrBNUOx6omsYPedb0XW6mdKEDsXJhjNrZyC6MrE8AxlEVwpsRHTSwsorBC9j1bu0Ls7i9qtaVHjK2v8JeKbGMNXbismeFmqNNjFnfR7jXcxdt7ZC09wKk+mnsFIazpyQBlt6Cbct3Csy06JLyIHm+hL69vNv9r/93FdrtBqMUw/l9F+8rFALaiOMiMpLQNrWHGpwRuDwbz8DU7QFUYl3P9nFqlAcS1vmw5/nFiSJOJrTMMUkknl6h3AJSmv8lz/BdP17SqzDklmM6J1PU3G8HGpd6HB7znF1K8BTfQxYCqlKB3VtXaMEDAYCUFHwOpIgwfzDFUilfkwsK5z1xtDp+9JxWMvHIeEsll6wISIW4kgs20MuTRfc40NwjvTR89djqJqBUkFi2j8ATe8gDLUXyM79U1go0mKMSUZE4S7YGIAzUFtSn5iz9LSb7rEoABuo7YKGKc6YPHH3BuLzUxCdm4DhngEkk+dDa1lYOYgVRGpJ1oraIDI9H+LIOfw8ORcC3NbcBHN1N9ZwddMEDY/47AakPPkVrmYWtjrunnqSF03DSEcv4lFrveJwO2eo2dFFbEQLRq71wDNO8JRjhvoxVKFjDCdzVxFKCRgUdIxRidHrWhK+ogO2AicLOWex9Jo03GLYUnKUI6l8L/Ie/rSy8nBQV1JoLfSdfx39w50IHxon43ELzPWXuPIwwEhnY80qUyjTzdlbWXtSpmRYlp57oz4WfB9O8o2e+cYb1NXsITtSGB77888joTgNWm49IkuT8AKJWxNZY6O9fjdcTfCb2Krc3vb/3j/yB/ke+i+9hXnGrbTUuhDNw2xYw3f/CK7ms7DGp3BVuBPpn/8jslKvPu3AUGsfhqu7FWyEqEvye8m2NuOChzwp5owo7Hn2YeTuLqZORwTBU3Jre/uYir9D2lks7bBIp+ptMcoRkZaP1KqHsf2L/1lRtO67+Bbl4V7DKIVaglMj0A+Pw9jbCeOZV6jwJCjT8xC39SispQchnEe4duMtKYNcSYiUpmBHMlhNCn3gJOkG57h48AnuRTYB/tn5wiEFPr+aDmLpuNzpcWR6IR18Lgoe+wLmfMQgXG9+jwvDw6w47uyHtr0fW0uO3HQUjGnMjnZRb9YNQ9rKgPZEPUbv1XZ0nqhH7/stCLhoJ36PW2iSauaRuCtTkapMK81iSlkvyw4WB+pD/t0wzmJp/0W0XUTrxRGTW6EcFZ/+bSpZt6O/+gT5Oo8z1nERk0471I4JGCcuEaV4ATr9n1GQNhVR5QcQXfkwjHk7oL9+11t6/lB5LCZ794VmdJ9qwcCFNhz7w08haQuzEoRnx1SkIro7HXt+7qgSeFvsc6govIcTiyEOte4mxNmalIm9/+Gb6Hzvx+g8+RL8xpjFbsM7MYzav/p3cDa8x3gBxaj3PIeEIz8PHVeJd5uSnZmcRteFFjT9G7NtzGioguGYu862FhahQe4T27DjxYNKpaeCKbnRC/ngoyywIZ3FnS5IDLrQiBRH8Sd+mcxbFByqfo8BrBMs8DmL8dE+gISn+u4uDHY0w/Dqd3iHjkQ0037RWx6GhelZfUIW0436BSzBOqX/BHhKXIsgCvO5Z1H3/bMYutLFwJsfTe/WKM5CpEZzqe4u9tYbrUUyHb71C7+nHK6x/uvxDqZ4Wa05Stj02KQPo5cuQZNdhWSxAhTjMB8gkpTv5epKgPZE6lwBhl3Prgjw1Bz5OGbGp9F64hrqrjNPCVHrYHgQHk1AIXbe+/wxVDy2g6nij84CbTSbrlV/N42zuN1gemsUMg88oxxzFD8WeI6BmvcYvT8L52AHZhwjUE3OYOTEj6E/+WOYrBbYGOeILj9Ix7ELZmIG1EQzqnQmTs6bwbvbv2el/vZMuTDZP66U8ycWpiJlG1XcIy3Y9nOH8PrgKExxrNbdV6B8ndhubIbovCn2pr6sITIe237pj9B56ifKWMUe+PT1MgDq0tLxv/87xxDmGCZgbx/i9j6LuD3PknbRgpkJBzMZdtT97CLZ1pq51fDRkdDT6sm2ZlUjaWsWio5uRRY1ZLRaic+5n/m6aZ3FUqOISHxCyU7lEM9P9jSTqYtLVKo7CSVrN1cd09PcS18+Ay0PE8lJrIyLRNNpWHK3wJJVzvqIVAUQFr5kWb30O+73saAWPP93b3A57kL2w6WIK2SA0qSDOTkKj/7RZ5FeehMQdb/fFYqfFzEpkQETR4BZMBHfWIzT+L1eDIyMkZI1iPHTryFgSUYwbh8G666g+a1aODpJKuOfZyyKqxBLkAHLOGTsLkAuqz1T8tND8XI3ZJ8eCGdx+8iIpbA4Ch75PMFGI0zLNijakvYOTrzuJkyMdNORNKK3rpGFb9+BLS6Zq45SZeVhJijMlFZI55HGlUf07af+6L+5XOZ/yvaiv7oDEUnRiM4iQxKX02lbcvCezwdtKiHYmeK8C0VK0SmxEMeD1NTMgoljsZkTknDgD76L9pMnmPK8ipa6SNSdJ56kZ0QBT4Fi19BNQ6cZRMGRbSj70hcRFUfRHdlW1AIPpLNYakFjVDzEkbL1MPxuJ7MrXZjqF4jSWkzRiUy2V3N7wPRs1wAMp9+ANToKAkRmYd2LhWAwE/ECZh5aQqEXQUlLz7/0cYDxiG4G3trfqEX/lQ7E5CTg4T/4lAKWisyMRcnndiNjO5GChelKGnTpZx/Ux36CpHovtxGgFwXnUAnmvVZibViX4uuFKSUCccSVTHW+jPmJizBTP6PoyJduOArfxBAc196BjkFsfQpxJyKYLbx1iCJJQ32MH3hnsXSANEYLorMZt+CRuedxeB12Bs0GMUmnMdZ8mRmWCxjsrMPAwGXotZdhYVbCwnSuJTGNpKu5BIRt57ZlG4xcfYQvqV/xubliMGoVmLUgQBlu7MNgay+8Kj+E+rtAVgrGqgNfegy6EGN0XmqftXw8Rf7KEeJIukgsI/AkXocbs5Qs8AUZrEyxoXBHOYqPsugwLRae0QpMtF3BeGs9wqNugs/GG8+h4dv/N8dKDYEHSX/uq4gimlT1gFTNrvR4SWfxIRYVe2hjdIJyxOZVIHP/0/C5GEwjIEzEOgar38Vo/TmMdvdC09MLs+kyzMR1mJhhEXUstsIqeMLT0VFLyYOxcBz4nedIRhzF1yKRwPx+7K50bHlqNyISo5QeiAyIdBTAYHMveomu7DnbDOfAFJmnfGSeoqMI83MlF4W95IvI3VUMS7RNqX8RxrPF7mKd0XbGOWaYqhV7koXm9vowaJ+Gf2oSFksv8n8154aj8Nn7maY9TUb5BFiLDygZqMXPyX/vbAHpLO5sl1ueFbgOLVcd4jATVp5YulsprnLZh1g5e54pWpbdN72PYVbOYmIS+n4uka+dI/OUDsYwA4LeWPT/tBeRX/wScR7peOirL1BEiVWhkhxXsXOAadPmd6rRRycxeLkLASfV5/ic20PxI20QSfuysZsqdIl5qSyMW5Dtu2WA+IfAdOjMEbc8nbHvE4jILMIQ0aR9l97EvH4BKSpSrX1nXkbz33+Vzt0GS3w6sj7/dURsOcYqUy/jJTcdzi0nfMD/kM7ibicA97ti1SEOW3K2cmQdfBG1L7+HzjfegjXBCdd4DVcczcDMNEWtPTBrHZg8/1e4UPsdWDOKFJawCLKEmQhDF7iOB7VNUvxXENy2Ha/FRMsQeVDCCJ6ax+w80582Lco/ux/bnt6r8FeKata7bWKVEcMtpTiKWTkralgWm4eymIMzc1A7xxA5G4ZCpsoF6lWl1TEuMgNHzdswMBalT2AWSsY4FLNJZ7E4e+7hX6FqPUNpg8vfeRdtb17jpFIThv4ijv3RN5Ry+47Tr7Og6n2MNl3EPB2HzjUNrf009FdOwmD4E5gZJI3ZdozHowpfh4r0ggLTsVm5LxeYpwIUmRpFC5mn2t6ogWfMScerVmT7/FxFWLNisPe5vSg6UAGtfuXAU4sOXgyzcAoFT3yRBXhb0Pbuv7LatG+hqI2vBUnc1PC9P0XXd/+E9SssJuP2JvWZ34Qxg/0hdofaYQszZZ1Aewtfvj7/l85imXZXUIIkkvFzD+0cmuLSNUKBXWuTtdyWZKDhtcvQJeooQUfBHrYoriDEAfyWUnI/Rp6OoWtnMMI4x9Qko/Q+F1StjRhoqoXxR38JC8u8bYW7EbfjcaZOWc7NcnvBTRqu3fhLYkHA4yLz1HjbIOpfvYT+823wO6nIRVIZkDNCFakjBiYNVYRgpxZmCPOtehOrjoTSXcqx9MsEP+nk+DjGVVZMDo8hEDOOrKhk6GwLaXJn83n4WEZgZHZFw9S54FNZGsxeeq7N9lg6i2WOqMfpRsfZRnSfaED3ySaUfXIX9v3GU8xwqHn3SUDeJ7dBEMukUn/j9hZBCLo4ch96kZWXYwrRz2jrVUb5T9PxdGJi2g77wBA03d9H5zvfhyWC6VmCwQSa1EpAmDY2g0QyyVCTtWojNY/DhfHOYUVHo/nNGthbBhVcRBhBb5p4A5f4FkXLNn9vKbEkH6xeXY9rFQC+XV/5/5BcdZRkOG/ypkAwHqkDF1vLT7+J/tf/mVubXMRsOYzUT/yG4jgehJ2KdBaLs+AO/4rJLrggBD2dgFh7h50sgGqA00FBZ8c0l6wLS9KkgnSklS0PYWmIjCWU+7By+J/+MtWqOhSin+G6s0qK1jPWi2nWTAy8xz3z2bfpOFhhyn1zTAm5OghH15Lkx0S+DsFCFYp7aWGRcVLTDTf0KinPbmY13KPMSHB1oYnQw8xtRkJZmiJVKexmiw09B6gxmJB98DnlCFAYa5GLQ0yRYGwmHMZIONraMGuMQvYXYm8Mw2T1W/A7xliHkkvQXgpBe3HKFusOU2tDPiWdxZJhExNdQIzHBMUaJ/lE8xBsVEyr+vJR6MmTkbIjB0mNeazTsKL8iZ2cCIQXs6npTO6laYxmArPKlSOHk9PJvfPMKGnx2mp5N+Z2pZOEP4PtQN019DZeg8WsZTYmEREZxbAxaGfOKCWVXTGBYcVMB9xbH+6l33f6jKiQ7a/ppBJdL/pYITvRNsxiPpaCz/thSLByxZWKdKqDp1XmIDYjQWH2utN5Qu25palY0bfCJ7+E6LxKYjqqoTVzm0iyYtGEU7n6rd+Db6iNQe40ROVvR86X/hvCKH2xWWJQ6zvDFDOHzv/miBYUK4hpCthe/ceTymQXPIzln9sHY6QZESkxOPzvn1Zy/Fr9yhYlCV5SIYsgDkH045l6QYGiO/raWFh1RcF0iDqWkY4eaHlYLr5DUmNiOmIJRSd0XWRWrLlbqcOyFSrTrSnE1bTwtN1Bx9pCWoA2jDcOMBPkhMfJ2g4EEFOUjKTKLOSR5DY2MwnmaOuGV2k3x6VAHBkknha4mxs5Gq4y/TbSDLY2YGCwHhlqKwotXDWJ1SfT5GLVITRYTJkVzLKUKqnejSap8EA7i3kOopsktx0UbQ4n50HWAd6lYyzIppr7O7af8I4YqeypdZaFIKNAX66VBN0ivWA0SYrTdhzjxJxmX4e5vD+P4ZrTGBVl9wPdUPUPw9x8DSbzqzATEGam87DmVJATcyciSg5CG3OzsnMlnUbvtQ4MXuoiwrIRM4uyfS4WfxlViNySpJTPF+wvI/bBoBDLrOR3h8K5RHZFkDEtNrEC2f+1bzGY3YZhBrGFVILSGMwYJ/L38t99DUE7nXxkNCJJ/5j9pb8gl4qIhYj17A2Xs/CZEP3/A+ksWM6FWc8suhiwvPjN45ghUtBCxxCTm6g4i3BNOA7/zrNILspQSsEFL8J6NrXeSKCQUUGTRtF5FDzyBczOTJFwthYDl95mnckJDPe3IDjeDePgIEzNzLAc/x5M5Ca1ML4RWbYfEWUC10EGqvuQJJz1zqL9VD0BTa3ov9iOOTfXDwRPebweBJjlTH8oDzs/TfBULlm9DVp+1frabU3HjE7BGEXEL0vtE0p2ENNBPcPrTchX+C3xGGqpQ7BrGgce+wpJfVhAyCbkMpxU6/MMtCJq+xOM64iiQW5veb5Qaw+UswjMcnKTe1G521ErI2dXCWXohnDib/4N+pxI7j9vmiOPr4Viu8FARedhiklC+s5HyQ3jVwrf+onf6KfzsLddxTjZorSObhj6emEg7aDB+KewpbJ+hWX3UdseYZp2z7JlFOz9AhdRjW7yRUx1jCr3QcE85aVsnzrGiLJH9mL7M3RIFP9dTzq/kBgv/shFKnVpCEnwyB7745eUWFTb2/9boTxYZOgSKOCLf/3r8HXXMh4Vj1RqzaY9+1VqvMwpiOGQuKbrnbj56wilXq1wXyaGxtHyRjU6j9fBPzOLR//fzyO+KIUKU+S0jNGj9Bf24dAvPQFbTOhF5pdjCrEkjqWSmzgqP/PbBBkxm1JzCr10EqIAzjk+AJXDi3FHDbSUjTS88k3uu5MQya1KFFnCrAWUjeSSWKiKhXGWi222n451qKUXXaca0P52HWX7ppWs0Fw4BYyY+hSyfXtfPIDSw4yREFQl20dbQMtAZ1LFPuVY+k6vi8pnPsDJpZmBMok5jGeoyJkSzi2yIDseeu0bCoObwOCEGxlQ5Viv16pjU46yWAIKSjpRRyC2HEHfPIYudlIFbQhenxf1r19SnIUIZlY9fwChwlu5dBLdz2MTA3B5Rz+jHCLWIeIcg4xziL20i/UrzhniOigXMNj5L9C/9S8M2FI2kniOyLJ9iK56GpMTRlz9/in0nWvl3ptBX4KnwmyEuEfokLyFJLefPIgkbjVku38LxJBv9Mm/PE6GNNI/kjdWn5yvnFTUI011N+DMf/0qK5vVBO3FI+2ZryLpsV+m0zZcL3wTAMC1265sKmchdD0FlHic4B9BLlPy2HakbM9BdHocMh8qwcycm+xXydj9fx1TBiRcsGXz2MxN3NHSCDASh5CNFEQ/Q6JalkxhU1SAc1I5zDExjsHB49C9dxzbvqqHI7APXe/UkZqOxVnJFljSIpG1p4hcEZWIiF2okt3MNlvraxPYm5zDLyiHUr8ilnbczoQxLRvMKiZobwyTIxOIC6pukAIFfU4MvfkP1KclGXG4CQpuWHxuFdumchYBliRf/ZdTaH+9Bl6PFzPU13huK0lpqLWavjMPOYdKKUh0q7LWKto25E4t0rPROeTr4IGnf1mRUbATyyEwA47OWrS1tOMVD4FfMbHwU4ckP5fZoGOsjSjNZKB348POQ25A7tAhEZNabLakLBz94x9BlAoIWgR9ysKqQ7zee+40zv/3b6MYj8NjyIaWgebFOMji51f635s9W+kzr+L5lIIk7qkdAxMUs+lAPAluRW2BwWZG+vZc1LxyFukH8lH4dJXiKERXopIfLGq65Zh/EdeRuecJoQCEwZfP49e+24pZrR1/+dmDeOoTrG1ZQuKznHPK96ycBQSYa5ECUghs+RnDGGzsQT/L+DuOX8Gk/yls8auQMNkO684kWC0ri/25/Uo2pLPwcdVQS7r39p+RM7PfjlgGKx/+z59kuXg0YktS8NDvv4A8RV1qYwYsbx+kNfnbEEmV8BwGN1sVGLtJBHulo1gT03/clwh0bBsDzT1nmI0iMnaaN0kvZRO8c7MkdLZha1U+iZSKsbquYgMpkvm4xcBcUGG8FqXLKeVZOPc/3sQUyWZirWmszlzI6UenxiEmPX7TxyI+boLdy+vBOb+CsAznflnol8i2vhaYGBxDI6uZR+r6MNU+ympXD9ykRfCFBRT9mFTG44qPbKHkYiTLEVafFyXkVxY91W002BVFWcpoMlLX8wsEv5gVerrsp8qRVJKJ/D0kzqXGhmjrDaBa3+klv30zWKDzUjPT1dcwSHGp2XEX5ui43R43giYVUo7ko+SRbcjeVkgchm5NM3kh7yxIm4SRC53ECkyjz+nAftYiKM4i1obHv/bpGzGJzTBJ5DU8uBZwT7vQ/l49OskcNkx19+DsHNXUADdT/bo4E2+I21Hx5G6kkPl9vYBvIeEslFJvZn0mB8dR9/JFzE17sfOXqEXKwqMUanvaShMxN6xFyf79FNy9qdUhshyySQtsRAuI6uY5P1PZA3Y0vnoRgxc6KHg1oqRMmSFFgMLNWqrQbTm6EzueP0gh7IWV83pea0g4CyehyT5Svb/2W/+MiU7CidVhilPY+rmDmGWsYsun9yl1GuolaaX1NJr8bmmBe7VAwOenPo0PXZepH8OtxkhtL9wj04qaWpDgN020AbbMGGx5dg9XE+VrCLn6+Ctac2chAmdelxfO4UmFFCWuIIXoNNb8R9kUdOD4yDjiy1IVLkbRfaPVROm+nI+/EvkOaYEQtoCfN73x7hFC8FtZzt+OkavdCso4jMA3TZwRVqrQJZZnoOTYNiRkJofklay6s1i6vxLbjenxKTS+TrLWn1Hpi8uuQ//xWZQ9t4uRyTCUvLgbprwYlB7dTq6G9V92heSIyU5tKAs4Seg8VN+jxCEEodJk1xj8XF0IakFrQSxiFVKgXKb6S2C0mEL62lbVWag0rClgWGGkuQ8RyTEQvBA6Mk6ZCZ4aI/WajxQp85oFvmQRfYjLTkJC7urwL4T0KDygnXMxiPettwfQM+7Bk1tjcaRkc0DJRT3SSFMfOomLsDcNsDanj0JT05RcZJVuFBnX9hVQ+DqZVc9FnO/k+NSyOGwDtFVwFgLXzjp9lQ5tl3pw/MwV7su6kLm3EHt//XGFPCYqLx6FL+xASkUWcqoKFXYqYavNXqexAebDmnbxH08O4pUrY9BR/fzSv7YjxlKI8vSNu6IU0hDtBE+JAjxH1ziJcMbhYZbDO+dT4hBpFSVkDSslfD5LYQ0TkpUbqa24syCTOmaDGkSqXDB1nMZAF0twJ8Lg13djN/lARN2WoFg7/O+egp4rjXsRj9lIBt6Mfb3YPo136u0ooeK7WBEsbb5AEL7ATeKXxdfEClNPSgDVkgxWZYYFh4sjoSOX6Qt/dQ0XOxwfcBZ2px8/OM8sAbewz1bFoc/uJeFOEA73HPrGvXh6eyyudDox7JjF8zviYdav/Q9Q8H1c+ykZzKp74BlyUJPVC9fMDAIs54/bko7cgyXI5k0xkqtrg9m4aJIN9++KOwvhLSvCW/HUzM9QGTaJcJseFpi4xXiEHIQ90FO+T7cGaLMNNxIbpMNv19nxe9/vwCPl0bjQ7kBhsgk5CTd/AC9dGMHfvzOgOAyxtRSNwFvEWTX43aczsSvXtvAk/y8eC+dxpXMaESYNduTcyh06453DL32rkTKQYdiSZcXrNXa0DLpwqmkKz++Mw6tXx3mMYW9BJP7p5ACm3QH8+qNpN86/2g86LjSjiQhLe9MgZu0uBHzUR3HPEDylRu7TlQqDeXZVETVsyRC/zmxrK2GLFXcWOxmg/PMnrKj/X53ocQcp38dafHp7f/0/4vJv/AuzHBWkeDuAiIojpHkrV+TiVuJC5DnWxgIvXxlHAqUFv/5CtkKSI1YMS9un9yTgU7sTlj514/Ht7xWOYsoVwHe4Hfkvz2WhLM18473iwbVeJy7Rkbz2tUqUpZu5mgjQUbWhINmIrz6ejp4xL7oZ7/itJ9LwKrczg5MsCVjlJugY6167iIFzbdS4JXiKWIk5qpi5qZFqSotAXlUVtj3DVH8enRadZEjlPu/TNivuLDQUld3+c/+JtfmfZEXoCRa//EyhfAtMTpAegZR2Eyegu/w2jIp8H/Uwtj/G4xEYEqlwTYUnwXi8WajT73NsQvLjYivh5Q/EQ0KhAEmGVNxXGnU3OUHeqrXjJ5ep5MXXFp2DoKOM5Mrh5/cnomSJQ7DP+PGb/9yK/VwZZHN1IpyBzXhzSmpIThQuHAqfn+XWZpKORfz6NMyciTbH7YiW7xHbkjluUxa/T3lxhf4nwFOCJmKkY0BhW+unkxBYIBFfC6rJ6K2ahyUjGpWPkqXs8V0wLt1m3OZIV6hL63aamyOzgl0QP/hF+b7SZ38Vk70t5B+sWWBrunYa7qkxOLxuqIV8X0stDD/4M9K8pSKq/ABVno7BTF0MdWQyhK5GmGb1C2RW8NI3/ak+tzcBtd0z+MVv1tNJqPG1p9KRl3gz5ZcRZ8BDzGrMi1/Y9SYeGhjEjOFWZGn71jv9eI3biPcaJ/HHP+nEn3wqB2JlstgqGNN4dnsc/vBHHcpWpzLDjCizGk7PQpGbOKdJsHjxA2b+K/5eqSZoBYXuSW91OyHYDRi+2gW3fWahYFFPJ8asRlR+PEofq0LR/srNtID4UBOGEftwc1Q/9G0r94JnchR2sjWNNFxkNd1Zyvd1YM45gaBzHBo/BWnIEm2OpHwf9S9iKw8rjNS6+Czoo5OohyH2u5vMXa+cae/7TD862Yhf/Iu3yWcRg//xqzvxC0ey7njOEYcPdb0zyIjV3xKvuOObP+LJzlEPhqdm+Q6ql/N3nkVwUuxtDmWeq4YLDHwGqbC+PduKoclZZSWRRafUzc/7+XpOvBGNAy7YiF1Iib6/m4ubKnTTQxNoY51G79lWEhSPUIaBuqzcSqusWkTmJpASIRnlj+1AfEbSR1zd5ntpzZ3FUhP6PS4S2BATT3q3Iep+OrgCcQ93wT/ej3CfDyKwbbIaFRGdqIIqpp9KKNBSBkN8BtmcUpeeSj5eAQss11mswFeF3CmcY1PoJZGSUFMbJS5isn2EWymuYOiAIjJjkVCejuQKVjjv5fwjVuhBbKuyDVmuIYWmZAwp3sQh5PsELfpUXytp3mq5bammfF8dRug8hq9ehb72KsyU77PEpyEyo5CB0jLK9rE0ndJ9huQ81pNwSSKbtMBdWEAQOw819aD3QruipjZ0rRseqr17/T5qyRqRRP1a4SAySS6TUpTB9c+DvapdV2exdFwFxblwBOJI3fYQ5fvGuEccxlQ/PT3JZcfJfCzk+0Zb26EhV6TF+gYh4TF8PxW4UvNhziyDJWcbrHnbb+hPLj2/fCwtsGgBr9ONzvcb0U3ZRVFyMD0wCSGC7Z33KTUapbu3UZeVDqKYcpKxEetWEr7Y31D5N2Scxe0GuSHfR6r0tKoF+T7X2ABGmy8xUPoexug8xge6oO4dgqmxZkG+zxZN55EKS2YpIot2w0whHV3s2uXdb78G+XfoWEAE5uw9I2hg2nPwYhe8YzOKg3A5Z+BXzyNlZzbSd+Sh4EA5bPFRihB26PQ+NHoSss5iqXnEdkUcJiqIx+SWI5/yfX63k47jMgaowjVY/e6CfN9YJ0z9vTDWX4Lxnf8NY0Q0bBlFsBXtQVTlMUVxXIGQLj25fLypLSCcRMfZBtT84H0ymI8j4PJR8dyPGYr7qCP1yH12K/IOliGjMncBPKXZED+JdRmzDWcZsV0Rh3AeGXse5/EEB9+LyZ4mRbqvnxgOOzVAR0fHoZ+cgZHOw3Ce8n2mP4OFhLRRxXthY3o2Im8bwtdQbXxdRvcB/lKR1bj2ynl0nWzANJ1EkDD0wHxAYZ4yUwdlx2N7UXiwHHEZicT1rFzKdTObfMM5i1sHYyHgpNbpEZtXqRyVn/0P5MroxmDtGfRdOs7tyiVMTwxCRTiufqIaAw2XoP/p38KamAZb7jZEb30E1uJ9FKSNUzQqFUDYaqB7bu24/GuFLbDIPGXvG0XDK0RYnm/HdN8E4w0EbVGCx6+aQ1xlKir3FhNAtVPhSVnhLmz6021wZ3Hn8bEkZCBfHMc+yxy5k7Jw59F/9SRTYhfgHOxgDcE0lct6oG1vhZ5CtSYqQkXmVlC+7xC3LHthSMiEymil5iTBRvKuc2cjh8izPsKvAx4/usk81fZWLbE7/XCTrzVcS81WcuNrqWUbkx2Drc/uRf7O0hDp9cbsxqZ0FkuHQmuyIHX7w8ohpOHsHSREbaB8Hx2Ho68FU6OkWZ+cwvDpt6B7/y2Fa8OakovI4t2I4JbFyLSsLjKRgJworjxkenapbdfrsYhDeKZm4CB4quUdIoOvdGOCkpV+Og1BKqMmYMuWFUsR4gyUHatCbNpNVOh69XkzfO+mdxZLB0lIw8XmVSgHnvkVZbsy3l6HccY47JSIcw6Q7mysFyPXqqGprSau45sQq5TILMoeMsZhzShVFK118Vx56G9CnJd+h3y8ehaYI0hqigS3w419EKxTw7U9mGHa0x8IsK6IGJyCGCRRrjKlPBO5ZJ56UMFTqzUCD5SzuN2IwhGII3Pvk0yj2Zlv71QCpSJAKpyHo581LZ1E9bV2wHTq36iTGgdrcjbvWiWsXyldAISlFkEbEX/7qeXfK2iBeTqJ4aZ+qnLVY5QOYqp7DDOj0wgE6SQi9Ex5FlG2Mh8JhSnERmQ+8OCpFTT9Lad6oJ3FUksYiNEQR3zRdgRY5CbQpK7xIYy1XFag6BMUpp0cIQy9fwTG2rMwW6wE7CTCROi5lSsPM0vvLfk7lOrZpeeVj+/dAh4WcnWepmwfwVNTPeMsByBQj8/NknkqkmxrWfuKkLYll8zv6bDG3MqFsdxv9ZJVfogOKL4kVdGjWe7nPux9goi6/2KHQtYjymC1Jh0SytJhit34gtzSWdxh1NV61qOIFQSPhOIdyHv4s/A6SJPW38707FsYZLB0ZKQHgw0tMDJIaqp5n1sWUvzEJiGCjsOaXQFz3k5uXbYzQLr2zE13uKQN9dRoxyAaXr2E0ZpeuEYctD2d9wzJZTRBJFZlIOdAKZmnChCdEgetqDy8j+YcnsKlbx/Hvq8+uSLOQji1q//zBHsUDrEi0hq0OPC7z0hncR9jtGE+KjAdBmZLxBGRns9A6fK+R1EAAA0FSURBVEMUh/GxAK4dA8R09J57g4VwDRgbGoV2eASm9kaY9D+BgeX1tsxiVs9Wci+9CxHlR6AybFx+ydUeMBF36Cbz1DUKXk+1jmCOHBZ+CgI7Z5wIj9Ch4MXtZJ4qQWZlnuIgVop5Kii4MMhwJQR/3HYn9DYjA9n37uCTKIr17D/8Cs85h3N/8zqxPZHKquV2+3mmXGLhwe8zKd8tUr8qZnBmHR4SW+vJ6xJOYXsXdKI/S6gIbz/PWv4tVxZ3YW2Rs1frDMoRl88S+rwtqPj0b8M9MUpcxyl0nHwJdvJ2TI0PQD1NUJj9NAzVp8j78E2YBF8HP2MlBN1a/hCMiXcu/76L7myKt7oInqp/9QLamfac6Z8i89Q8Kfn8cM26EZETi31PHUL2zkIkZJP1XbAprDAGRqjaCVBWw08uYnpwAoYIE478l0/CQD3dxeYadaD2B2e5LaXjuv79gsFboHxSd+Qi9xjFgK6n2AWjvSHSjM4TDRCf2/87n7jxmjifYIS49M23uL1qUr6r/DP7oDPrceHvjyM6OwGjjb1chUSQ/TuJZDs1SCzLwIH/eOs5Fvu11v9KZ3EfFlc0UcJUCgw998iLEEdg1oMh8nT0nHlFIfuxj/bCzsIlvasDw50t0B7/HsxR8YhkzUtE+WFEChg6WcLCuIIJE2zPdEibuYk7qKCbG2rtQ+MrlxXOCEWRi+xXftLTBcg+lbI3G4UPb2E5eCkh2Ev4KVbYUSh25o93bjaAok9sR1xJCn78xW+glY6r/FN7bgyDhnGHlG3ZiijQjSev+y1bSswHHJhYqdRxhZS2m2l3klIvbULHtOm1q3jkTz9LXowUYkKcRBwPKdiQLV/Yj+zDJXjrP30Pxc/tgNZiRM33Til8GrefZ+k51+qxdBYrbGmx8kjddkQ55vyzmOhqJJL0bTqOUwSEEVU4NY5JcicMD70B3Zk3YLJ8nXwJJYgu3Q9LMY/0IqgtxHRojYoDWeHurdvphCLX7Aw5My+2oOMdYl1qurnkdiOcbFtzuiBULAnP4V06/1C5ohC+VsXg/M0rTSz7NXottwJaBrhv5fIU2xJjtEXZHtxuQK1VOLNbezveOsSxnkL6noLb345ZEumIJrYXwmkaIk2MbcxDZzVwRWFTmMFVOg2zblHEAY0r9H23n/8DJ12jJ6SzWEVDqzQ6BYIuoOhbCEMXRD8jhJ8P1b2PyU4uU8f64Jwew1j1eXRfPQ+j/i8QkZbHSP82pfjNwgyLlgxhaksMcR03GbRXscsrfmonFeicww7qaSwwTzmoyOVze0kjoEZ4jI5bs0TEUZWr/FGCp1LXHjwl4gHh3DqM1PVirJnZLjKJJ1XeukWcnfag/XitIhS0qLC36GTENsQcxzL267ygwoAO6oWIRZD48d/eYrjViMyIRcNLF7jtiIchxgK1nqtKvlHET8QD0aegwmEqtkg8bvVFt59yzf5eV6asNbvKEPwigeuwt5OfQ6RkO+pI+tMEL9Gk845hqMlLa+QNyxKXiEiW21sZJBWHQJMKhjCNlUvfVWgrxZTlJz2ic4irp6ZetByvwWTLsHKnFYVc4WbeNUlwm0TgVBK1PQv2lUGnX7LVWIXr+qhTelhsKOjzRAxC9FmkOVOrcj7qIx/7mr1tiHKFvch/YgvjW7fyjooP2zuG0XWqCWo6qeyHykQgg5XTXUjbmacEO7vfb0Luw2VKf4SyWcHjW6EKgWpY6Sw+duhX/w1+ak1Ms/htsqeZDGG1XHXQeXReo85KH8K8ARhZ42COiqQEJEFkqQWwMTVrSi+FkY911GFZqTjH/ToLsWIYbhlg8K4R482DBLYNKiS3foKndLEmRfg6bXsekkszkZwveUZWf2at7DfIbcjK2vOeziZYzKOJChVH1r5PMGU2BicDo5PkJh1rusLjIoZ7GzF4uRr6mmpYbD+FJToBVkH0k06KQZIbG7O3KKjSMDU9yxo314QTnWcb0fM+hX87ia7kHdrtJC6CpDLmjCiUHilH+rZcxOeQ1ewewVNrfEny6+5gAeks7mCUxadm+xvhPPN96JKLYNn7qcWnV/VfgesQ4C5xxBdWIfvAcwwMOgg9J71gyxUCwt6BvfkqRju6oOFhuXYBZuuPYbRFwZqUpVALRrAIzpRbBQ0DpavV5oPzDN6SeepVEhBd7oSXGAWBHZiZpmwf/VX6/nwUH92K5JJ0RCTEQMvgoWwb2wLSWXzI+M1c/AnGX/pjWHe/yPqD9an9ELl7rdmmHIIuMLF8H0qe/mXiOkYYKCVnw5V3MFJzGnaiSdVDYzD1dsFUTWzH699Wyu5tudsRwSyLrWQ/9Cx+W4nm84iMRitqf3QOTq4iAm4/fLOzcJJ5SsuMRtGTu5C7rwTpZTnQMfASziyDbJvDApvKWQQDpEwb66EwEYFTMQTx3GMT55l88xuwbH8a1kM/x/TenStMg34vfPw+lTECalssAgRiCZTmnGtK+WY1S9sDdsYdmBVRWePusTfXP8aQuErD1B4PLfVTbCyjzz9KGPr0BBWy6tBz4U3WJBzHyFAXghTqNTILoe9qg+HE9ymnEEnVrGKKOB2GjYAwc1oRr+nW/P9HdU5E/qeZ7m0kBLuJKwnfhFtJ+/n91PYU4KncWOx9/LDCXxmdHEvgEh1EiETwP+q65Gt3Z4FN4yyCPg/Gv//7mO2rh58pyeinvwbrwZ+7YY0gUYFTb/wtPG3nOY9vzmQBEtKmFCDykV+Dyrbwg57jjz5gH8Bsby2G//qzDFZTDfsX/jt0qcU3zue392P0W19GwDEGDYOMtkO/gKnj3yI+wsC0F++2Q20w73gW3pYzCEwNI/m3X4ImIefG5+/3wWIKT8/it6TKg8qBL/+pkmERaNI+Og872dCnnJPQeCgdOXqSspEniCb9Op1FIaJL9sFGvVkr07Rqs+Dq4DZhSY5OOT+ve4jpxOofnsEA6fJ9k25F4Hd23q8wTyXvzsFDT+1CekUOjJY7O9T7vU75+dCxwKZxFqJgy1z1DGxHfhHjP/gDTL37j7c4C0GXZyw9Am1aiXJXvDkEBASRizN8ad0GfzRBnxeGfPJ1PvRLGPizp+A8+wPoXvz6jY+JWIafq4r0P6/mc0H4eusx7+KPMvsoop74DfR9/QjAVGH8F/8Gvb+/D/4RxhhW0Fnc6MhtD6KpwSKO0ud+jfDkQQVN2scVh5BRmBzphcNH2cjGWgw0XoHhp3+jsKHbWC2bsethOjhut8QKRq1Gx4UmHH/9BDqrezHLWIQAT4lCLlWcnsjKChQ/vBWpRSuztbntEuSfIWqBTeMsfAPNsP/4T2DZ8Qzv7AFFYPl2mweJqJz3zNy6RGaOW+ipCsz+4npDOA5VVKKyVA/OsuBHfQccAM/FRDlrGTxKnlypLiW5jjqKknbhpHTjikVDTIRYwittHej5TDFJyDn0vHL4XA4lLTt47X2qf59i3UIvPK5J2PsGoOn8Acbf+QG6TDspB/gZzNMQvW/Xo5PcpR5WdapidYghcCqdAKSC/eWIjI9evCr57wNkgU3jLOamRxGYHCKLs5+IPB35F29FPIqthH+EUfveuuur7euuQfyouY3Qp5GfUbfwmXA9K0YP/jxctW8qqwdRt2EqP3rLtDBWHIOr4STsDIIK9XddCuMABsFZQPdw3QEteqUwER+gI1nPJuIcSRX7lcP//Feo59mNMRL8DNefV+gFJ0Y7oCFLWBnhD0EWQiVMeqErjEXatjykEtGYu6uE4Kn7Kwdfz+uX333/Ftg0oCwRJ/A0nuadnlBibivEKsJYcuieLSRWJ+5rx+mABqHLqIQ+a8sHzuXtqsZs11VmSxJgyN3BGEc91NEpdD6Z/Ozb0CZkK3EQFx8bCvYyCHqfQc4P9OD+nxC8pGK7IljCRurOILzsCajMSfDUtyCpIBkphZn3/yXyDJvCApvGWWyK0VjniwjOz10vp76+6lrn/sivDy0LSGcRWuMheyMtELIWkIiZkB0a2TFpgdCygHQWoTUesjfSAiFrAeksQnZoZMekBULLAtJZhNZ4yN5IC4SsBaSzCNmhkR2TFggtC0hnEVrjIXsjLRCyFpDOImSHRnZMWiC0LCCdRWiNh+yNtEDIWkA6i5AdGtkxaYHQsoB0FqE1HrI30gIhawHpLEJ2aGTHpAVCywLSWYTWeMjeSAuErAWkswjZoZEdkxYILQtIZxFa4yF7Iy0QshaQziJkh0Z2TFogtCwgnUVojYfsjbRAyFpAOouQHRrZMWmB0LKAdBahNR6yN9ICIWsB6SxCdmhkx6QFQssC0lmE1njI3kgLhKwFpLMI2aGRHZMWCC0LSGcRWuMheyMtELIWkM4iZIdGdkxaILQsIJ1FaI2H7I20QMhaQDqLkB0a2TFpgdCygHQWoTUesjfSAiFrAeksQnZoZMekBULLAtJZhNZ4yN5IC4SsBaSzCNmhkR2TFggtC/wfRpsO1VyEARsAAAAASUVORK5CYII=[/img]
[br][img]data:image/png;base64,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[/img][br][br]a [math]\cdot[/math] b = 42[br]a [math]\cdot[/math] c = 12[br]b [math]\cdot[/math] c = 14 [br][br]O = 2 [math]\cdot[/math] a[math]\cdot[/math]b + 2 [math]\cdot[/math] a[math]\cdot[/math]c + 2 [math]\cdot[/math] b[math]\cdot[/math]c [br]O = 2 [math]\cdot[/math] 42 + 2 [math]\cdot[/math] 12 + 2 [math]\cdot[/math] 14[br]O = 136 cm[sup]2[/sup]
Jojo berechnet den Inhalt der Oberfläche folgendermaßen: [br][br]Jojo berechnet zuerst die Flächeninhalte der einzelnen Begrenzungsflächen. [br][math]A_1=[/math] 20 cm[sup]2[br][/sup][math]A_2=[/math] 30 cm[sup]2[br][/sup][math]A_3=[/math][sup][/sup] 6 cm[sup]2[br][br][/sup]Anschließend addiert Jojo die Flächen [math]A_1[/math], [math]A_2[/math], [math]A_3[/math] und multipliziert die Summe mit 2. [br][br]O = 2 [math]\cdot[/math] (20 + 30 + 6) [br]O = 112 cm[sup]2[/sup][br][sup][br][/sup]Erkläre, warum Jojo richtig vorgegangen ist. [br][sup][/sup][sup][br][/sup]
[br]1. Möglichkeit: [br]Zuerst werden die 3 unterschiedlichen Flächeninhalte addiert. [br]Danach wird diese Summe verdoppelt. [br]Es gilt: O = 2 · (20 + 30 + 6) [br][br]2. Möglichkeit [br]Zuerst werden 3 unterschiedlichen Flächeninhalte jeweils verdoppelt. [br]Danach wird aus diesen Produkten die Summe gebildet. [br]ist gleich O = 2 · 20 + 2 · 30 + 2 · 6 [br][br]Diese beiden Rechenwege liefern das gleiche Ergebnis, weil das Verteilungsgesetz (Distributivgesetz) gilt.[br][br][br]