0
Moin Moin ,
kann mir eventuell einer bei der Folgenden Aufgabe Helfen ?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAcIAAABCCAYAAADE39YpAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFiUAABYlAUlSJPAAAB/6SURBVHhe7d0HVBRXFwfwP00FbNiVz4ANxRo09q5BjSY21KgYa1RUDATU2II9Gms01qio2AAhMSQaCLEgSFdRQVBUQASkihTZZXf2fgOusuCCwC5N3u+cPYlv13Xf3DtzZ+a9mVEhHhQiQXLgefx6+Dz+9QnG0xevIJCoQ7uhLtp17Y9RpmYwm9AF9VWlH2cYhqmWxIi/5QIH5/8QklEbOlp8i1CAjHQB6nQYgonTJqGvbg3pZ5nypIRCyDAMwzBVFztOYxiGYao1VggZhmGYao0VQoZhGKZaY4WQYRiGqdZYIWQYhmGqNVYIGYZhmGqNFUKGYRimWmOFkGEYhqnWWCFkGIZhqjVWCBmGYZhqjRVChmEYplpjhZBhGIap1lghZBiGYao1VggZhmGYao0VQoZhGKZaY88jZKoUQeRVnLO/iuC4LNTR/wyjppqgb3P2MNOPixDRnhfw5+1kZGelQ9RkAKZOHwK9WtK3P2oCRF49B/urwYjLqgP9z0ZhqklfsBQvW+VzRCh5AfdNi7HDK1PaUDLioIOw2nYNiRJpQ0VL9cW+ZbtxM0P650pGfO8IrDe7Ia6yLC8leR24F5a/hKPNlOXYvtUKg1/bYpLRKGzz/1BepcJ33zLsrqwBUwox7h2xxma3OFTpsGffxd3dc7D+gRFmW1jAasV8dPJZAKOBP8LrYw5frtcI3GuJX8LbYMry7dhqNRivbSfBaNQ2fDDFGcXkHBGWrXTy2TSOTPYEUZa0peTEFHnmWzJZ70Vp0hZlEzz+m3autKIVK5eT9QYHChVI3ygoK4h2T55MO+9kShsqIxE9PjmLJtiU3fIqd1w8nZjch2afDaV3oRE/oM29NEh7+D6K5KRt78mioN2TafLOO1SZI6YUosd0ctYEsvGqulEXh2yiTT01qNbQvRQljWnWH99QI3U9WvRfYSvlx4GLP0GT+8ymszIbH/GDzdRLQ5uG74ukQlOcUViZHxG+dFuN5UFjsXNpN5T+zIYa9KZtxvRna2D5+wul7/FKEi5i8RfLEfG5DSx6C+F1aAnWOqdL35WViv9WLoXn8K2w/FRL2lYZqaPNNz9jRswaWDgrf3lVCMpAauI92B/8C1GctE2tFTp3qI/s8AcIF0nbCkj9byWWeg7HVstP8V7EJInwO74CpmNHY8Tg3ug9eAymW+6B65PX0g9UMept8M3PMxCzxgLOL6pm1NU6LMCCQ05w2D4N/8vdOkmQEhOLTE0DdG6rkfuZCsfFw/vYaixZbAlL84WYN3U8xs/5EWdupSi0rlFGKhLv2ePgX1HIS/HO6FA/G+EPwlFIipcrcZwnjqw0w8Il5jBb8C1mz12O33wTq/42RloQy0b6dfq++xDa9kAsbVCM+OkB+uLT+fR3irRBKUQUvKkn1Woxj/7OEtKNFZ1Jp+UY2ntfJH0/T4bXCvpswCa6+/5blZI44hB92d2MLr+UNlRx4tQ4ikuX2S/mImjPkFqkPWwfRcjbXc7wohWfDaBN8gLGPSenJeNozn5vis9NT44yn/xNawY3JvX6PWm5a3wV3QMXU8ShL6m72WX6GMIujPqD5nfWo5G7b1eOI3pxJJ23mElrLoRQ6tsE4V7Q32btqaamAc298EyBvBFTalwc5U/xPTSkljYN2xdR4fmYEbibvvikDZkcDXkXi9TAnTRSryuZ//2iSh+xlmEh5OjZ4dHUdup5SpK2KC6NXOa2oT6b7vPlS0nE4bS9fw2qZXyQ4oqKJBdJ+0fo0+RzyutN2csg14UG1MMmkITSlo9J+vXvqWO9rrTsWqq0RRZHkftHkP7kc3Lyj6MEh3k0cdu9vNOsUlzMSZrQWJXUdGeQU0IVXbUzXGmhQQ+yCay6UeeSvMl2gzV9M7QT9fzmAPm+2VtRjPAGbbU6QY8V+CrBVXPqaDCCrM6H5lunuGd7aWgNkForc7qqtDO46XT9+45Ur+sykpvixcbv4G+1ohOKdDzjOlkZ1iSdcScoNt9qIaaQzfyBRKv5dKkK73mV3alR8V0c++0e+k4Zg4bSJsXVwQjTkUg8eQgeAmmTotL94HufoN/tUzQoYmmI79rCNmwwTL9UXm/KnjaGzhiDzFOH4P6RDbZLYpxgbn4VfY9cxNYh9aStMvj8s7UNw2DTL+XkXzL+tveDMCMEYa+kTVKqLUxgOkIHFOsCu0vJbxqrGu2hmDEmE6cOuaOqhl21YV/MsdkJu6t+ONrREV/2m44Tj8TSd0tJ+AR+bncR+/a8YymIXsThebg7Dhxxg+zZZ9WGzdBYUwVcbDjC06SNCpEgxskc5lf74sjFrZCX4sUnxBM/N9xVoOOJzr/w2z9Cd+ORaJpvO6mGtp8PQ+vnjjjyR3yVPUVaZoVQHHwRf0X1xqhhdaQtylGzz2gMEVyGk5dyKmF2aBBCsjRh+GlHFD5DWYzbjr8juvcoDFFud8pcjc/45aXiCuerVXTcSw5J8nWsW3wWrfb9i9++bgV1abss8W1H/B7N55+8gHGJiIl+iEtb5mClQ6K08a1a0NNvATXKQuTjZ3zkq6Ia+Gz0EKi4OqPqhV0MsVD4bowsZ2eu28JZ6BPnjDXb/qnwwl574g78bnsMzgfn4hOZrackMQbxWQQ1XQMY1JU2lpoEydfXYfHZVtj372/4upW8DC9PAvjf8EMaakKnYb33ikaNtq3RUjUNHpevVt0dL+l/lYxD5L//IdywD/rUljbJk85vjH5di2XLf8CK5aux3f4Wkj+006LVC326peD6v3eQLW0qOQle3LoEZ2cnODp4IpLqQy3ODU5Ozrh0S87kEu4R3K9EoFO/fvwxaRG4BAQ67MGGNT9i+/lAJOd+USYe/nMYW9evxw47b8SWdsuaHoKL+zZg3bYz8H/zxflkxwbBJyz1/d9e6zP0M8qEz40gBZZX2eESAuGwZwPW/Lgd5wOT3/z+zIf45/BWrF+/A3besfmLUao3dq1whP6Ws1g3tAmfwK/huudX3Mr3IQ6P3K8golM/9JMXMLW2mGA2C2NNLDDfuIG08S0O6akZub9Du049qLxprCDpCLm4DxvWbcMZf+mykZUdiyCfMKS+nw582PvBKNMHN4IqSdSLmb83V36KTxu0wGQ7maMLzUZoVJuQEv0c6XL6Wq5qtsLw2XMxxlA2sSR4ftkVt8V10c9sIQbUlDbnKnkMU713YYWjPracXYehTfhN9GtX7Pn1VgXulHF4mfIKpFIDtWrKKRma9VCXP4rIDL2HUJl0Sw+5iH0b1mHbGX/ptlBWNmKDfBAmL3krQBkVQgHu3AlD3faGaKEmbSqAi3LAd2a2SB9kgZ92/Izt66ejsYspug5cCbf4ohZOPXQ0bI5ngYEKXFcoQUZiLF7ExcDH/wHEdfTRQiMBL168QEKaEO/dYSDjNm49aogOnZsWvsBeB+Gw1U/wbmKCH9YtgsGVuTBe5QbPvSthlzkUi+d1RfjPY/HlxkDpXyiBTD/sWeMI1a+sMZXbjzHTDyNCdoeBL9QHTAdhmKUDkqRNeWqjSxd9PPP3Q2zlyLl3XgcdhtVP3mhi8gPWLTLAlbnGWOXmib0r7ZA5dDHmdQ3Hz2O/xMZA6SYg3Q/b56zDo879oR3sAnv78zhruw1HgmpAN19gMnD71iM07NC5wGmct2qg07yj+PPCNkxsVSBBxaG4fvM5JBodMfxzfRSSvuUgE3571sBR9StYT+Wwf8x0HM4fdDw6YIpBwyzh8H7Q+bB3QRf9Z/D3i31/41veSpC/WjW1od1yMEZ8Wv/duiYOv437L7XQa+RQNC6jLZYihA9PwWpbANosOA677zvJnKEoeQzT/bZjzrpH6NxfG8Eu9rA/fxa2244gqIZuWW2si0EdjRrpQJXEEInlZJMkGyK+W5IXzxEjfTvTbw/WOKriK+up4PaPwfTDEXxv83CPDsB00DBYyk3eCiAdK1QucTBt/EyTemwobFKLkHx/6Ea6PefQMdnZmSl/0pz/aZDeQlfKkDa9j6PY/cNJs/VSuqbooLT4Ce0YoEEaA3bQkyLGkUWBa6mrZm/6KaywD6WTh80C2nk370rJLKdppKPZgHqv9sqdYZV2ZiLVUa1LQ3Y9ePOBYhNR8M4ltPV2TmeF5L2sPWnofkuXZfrOxR6kEZoa1GV1gNzlnXx0NGnpLaYrxVxeAr/99O3UKTR58uQSvqbQlBmryCmiGIPy6R5ks2An5S2yLHKapkOaDXrTaq/cJUZnJtYh1bpDaFfOrGMuhs5Mbk5qKrn7KTIvNdJffCX/pBdRIK3tqkm9fwqjkk4PSHM1o9bqGtRq7kWKr8C5MqLgnbRk6+3cfgm9l1F7DV36Nn/Q6eAITdLospoC5K5kyXR0tBbpFVw25a5k+UsvfchnvzVZrP+Vzl32Ip8rx8m8X1vqtcieHis6Qy7tBI3vZEk3lDGHKMOfbFeZ0+wJA6iNbneaf+bBe7NaSxpDLuYMTW6uRir58pt/qenT4uKuvHKl0YnxnchSgY4nnzUhHdWaNOLQ+7OpRQFrqIsGf8CoOY5Opec0BNPOJVvpTci9aVl7DdL99rJMHvLb8IMjSFOjC62Wn7zlrmx2MsQJiOcLfYPGjQvfi1ERI+HW37gaJnNWWWcg+ndVRcyNK7hf6BkdVdRr1BAaCTEKDXrnEt7F3TBC045doFvErj8XH8cfaTVA4ybyPySJsYfdyzH8EczbKyUlSIiOQ6a4JYwn9c69fq3OtJMICQ/DJSvDNx8prmx/ODzpiKndavL/fxt/XHoK7R790F3mkqrXXp4IFDVBn4Gd5Y6XaTVuBO2kWMQU80IkDQNjzJ43F3PnluI1xwS9mn3oOEqCGHs7vBwzD3mLLAHRcZkQtzTGpN65SwzTToYgPOwSrAz571NtAVPHWIgluTOdZV5iRBwYhnxno7h4xOXmX5OSHdFl+mDrylN42Xstzv4yDjlnpSpGNvwdnqDj1G58v7Jx+49LeKrdA/3yBx2egSI06TMQneUOIWmhcSNtJMXGVOz1ZyXMX9Tvgz5LdmLXd1+glXoS4rLaYcGFIPgc/BptKnqoTJZ2T8z56Vec+N0Td29shu6pMegyci0uPXt7ArPkMVRtYQrHWDEk+fKbf4kjcGBYvgwvdw0mfo8FnVQR5HEdqdK2N4S4c/0uXmvyKwtJ+N+eE3IHPOk4FW9C/gcuPdVGj37dkdfz1/DyDISoSR8MlJ+85a5s7jUqcMFsvalI2Z4Al1mFDBKKU/D0qRDNDJrzq6wEwpdxiIqJgqP5UKyPXogrofswuJDZK4K/5kBvSjw2x1zG/IJDPCUgvr8BfXpshc4vEXBb3LzQov36wjTozhZif+LvMJVzHb0kJQwPBe1g+O488CvYT9HHNwHT4RZ2AArlMBeN0PA6aN+hPkQeFuhkbIduto/hPOPtXEghri81hPFpI5yMcIapjrRZhtDdDO3GPcWqCFcskn+usJxJkBL2EIJ2MqfOX9ljiv43CJjuhrCCha2kXl/ANN3ZEO5PxO/yAiaP5AVczIZgwf2JOOeyGcOKcw6O4/PmiAMCU8S5u+7FpaJSAy0Gz8KsAYWdaucQHRqOOu07oL7IAxadjGHXzRaPnWe8mwErvL4UhsanYXQyAs7ygs7nhbtZO4x7ugoRrosKOUX8FocItyNwCEyBuGQdQY0WgzFr1oDCv18J+VsSXORVnPrrPtI4OR3hC/HJvc8x1Hos9N77vSpQqamLQVMnwkinGLEvQPLCDpO6zIVrcwtc8tyFofWUEcMS4CJx9dRfuJ/GyclFvhCf3IvnQ60x9v2O82GsCd1BUzHJqOjf8PreAUw3OYC66y7i8AwDfrstRqz7bhyNqYlHy6xgrzIDv0efwpeJoQiv0x4d6ovgYdEJxnbdYPvYGXkhv46lhsY4bXQSEc6mULDnSlHyiBcLv2cgAdRUi5hqoM4fYYl9sX/p1xj9xSSYbTyBK/ee4VU2QUVVtehJCvz7aioSfm9J+udSyrp/D+H4BF26Nix6QfCdkRTxg1QbdJApgjzhLXj6Z6Bu78HoqeiOnFpLGPIbEVUI4OXogqjaw2Ey+m1G8cThuOHzHGpGgzCgsCnW/AarclFFgw75x4+Ftzzhn1EXvQf3VKwI5srJv5L0OQOBO0yx4vF0XLhUzCKYSwRBRiYyM0vxEhY19UENLQ35DSj/MwRejnCJqo3hJqNlLgMRI/yGD56rGWFQoUEvWdhFggz5v/ODL2HRkziUkb8lQMI0JCclIzlZzislA0JOgDR57+W8ElOQXsq5RarNxmLCAC0Igg9h/bHH/K6FcmJYbCTk+5Ukv1/JKcgQchCkyXsv55WIlGJ0XKvrEjh7n8TImNPYtOZHbNj8M5yyxmO5iQ6fBzlncNuhHX/Yp9bSkC+CuR2Ho0sUag83Qf6Q34DPczUYDRoAJfRcOXKOCJVO8C8tbKlJX/yWLG0oSEQPT00nA6361MviAoW9GxBMoxNf1ST1thbkUcTp7Cyn6aSjPYHOFD6QWAxC8l1hSBq1x9GpD9ypJstlDjXV/IKOFvOONqJ766i7hiYZH4x973x6qQm9yMpAg+pPsCPZpcrFHCBjTQ3quvZ2IeOxOb9/NjXll9fp4i6vzFgKCfAjX1/fEr78yO/OE0ou6cAc/8vvretOGprGdDD/1bqlk+VCc5ry+VesgOXcl3Ua9Ru/lwIL3KKTq8AxwjeE5GVlQBr1J5Bd/qDTAWNN0ui6lm4XOsSSRS6zm5L2hNNFjLeXIwXyV2kUHiNMpzun15L5iuPv5UpOrDy+a0PqUMld5jlDZW8oEkNlUXyMsCiiuznbu/fH6oVeVmSgUZ8m5O84xRwwJk2NrrS27DtebMXd9S0ZteZo0UQFL/k9DXnDeJIYOyyztEdMLxuc3TUJ7bWlb/CfzjmSfEsc7Aq3fLOs3sjk93AEjZqjuSKnlyWpuHsvEmjbDd0+cG2geosWaIqXSEwozqCkBAmeN/EAhujXX2aMVJIA9wvuSCjlFD4u2ht+EUCX/vn3ojJveuKWqBn6Duood3wwhyApCRk6jdG4mMtLeOc01tvYwKZUr924HFnCwVt+2XjefAAY9kN/maMxSYI7Lrgn8Eu0hNRboEVT4GVigtz8yyNB/OUVsPhvKH47/x16yOQB93AXlv/y6AN/v4xx0fB+E/T8R0uZN+F5S4RmfQehY6ExFSApKQM6jRsXmhflSZH8rTReX8LWJVuwf4c1drkVvI6ZIBKJck9LqmvUyFvvFYphVSBBsn8AHqEtTKb3lzmbwyHa2w8R6IL++TuOm563IGrWF4MqUcfLphCq66Gtfg3ERkXLPW2SHXAd3q/UYDhsBPLNXhc/xpMofrOnqp67UmSHXMG1qILfIEZEVAxUWhlAoXvwiu4jKFSEup26od0H4qHeqjU+UYtD9HN5vZEg8ZYDjpz1l17OkQx390CIdLqiu0HeF3NhdrgQWj/3VEkeIZ75uePmE3k3+M6PUl4iFbXRUr+5zAQQIQKu+yKtdi8MKvQcrBjPo+NArTugfTGXV83+K+B4md8JcXMr4csVri77MaONbFDlkCTilsMRnPWX3qw32R3ugSLodO2OvEXGIczuAkLr502jLzb1Vmj9iRriop8Xedouw383fvizM3Ycm49OBe4In+L3AILWn1Tg5RM8SsHLVKB2S300lz2NzK8/vmm10WtQEaeRxc8RHUdo3aG9zCSFilP6/K1E1HWhq9sC3SdaYs7AAhMYJMl4GM7vtKnUQb/h/fMeMKBIDCuTl3/i29Z10HzC8byb3ufgImF/zhO1RlrDvI9sTwgpbzoO/fwdx3XfNNTuNUjxYSMlKptCCC30+KwDUh4+kHsEpN66HVppSBD3KAwp797n/+xyDk8btYPqy3i8yOYQH88XqgYFN0UZCA2Nxv+MeqCZAr+eiw1CcKwqOvXo/uGnYtTthZ7tkxAaLOcWQkI3rBprisXWh+GXzW9/Qs/B41Vr6NSqgZpvx2iyH+D4oVcYv6RHvrvXiAM34auBIzGo3zyc+8ChoqpeO7TREiMjPe9WIYLgw9jm+OzN+Eqhd7MQICQkAs27GaF5GUW7pIRuqzDWdDGsD/shmy9Voec88Kq1DmrVqPlubDj7wXEcejUeS3oUfr+fwtVFr57tkRQajMIuSc1+ZItZ0/bh3mMHWI4diZEj375G4PMhfTBwVRia5wx4VCRVPbRrowVxRjreRV0QjMPbHPEsd2ypiFuYCEIQEtEc3YwKnwRWnkqfv5VIjb5YaD4IrXt+gZ4FZgdlh5zA6ZvZqP2ZJdbNkLnmT5EYViISQQyeJfJ1rZ42arwbe36NB0etsCtyFHbtnQv9fJtqVei1awMtcQbyQi5A8OFtcHz2ZnywMvVcbT1P+v9KpIr6NZ/Cce99tFk0CZ0KVH7Vpj3R/5Nk+J4+ALv7WVDPfIIbf5zFv8Lx2GTTH5kue3HA6RaeNR8Hq8mGqCM76C+8iSM//oP/mW/BBAU2VFlXD2C182uMXvMDRvFHD0VSrQ+E2OHgww5YNKlT/j04FRUk+V1FQi8T9Em7hhOXNTH7wPfoEnwK54LVUCPOA2dtfdDcbDVM9Aps1MWxuPn7f4hRlaB+tzkY3b7wQ1MV7fbooBUEW1sPSBqq4LH7BTj7BCDg2iM0Nd0M62HN5G/wsn1x1MYFLRZvw0SDynBskLPIkuB3NQG9TPog7doJXNacjQPfd0HwqXMIVquBOI+zsPVpDrPVJii4yIqHzz+EwO7gQ3SQk3/gHuKXSROwLygJcRFP8OSJ7Otp7hmHFDV+o7dxCjqV6t9XEhVttO+ghSBbW3hIGkLlsTsuOPsgIOAaHjU1xWbrYYXuDGb7HoWNSwss3jYRlSHspc5fZcoOgsPxePRdOAp6H1jl5VNFox5Doeu/ARY7ryNOpAIVIX8keOUQvluwF5E9lsPuvA0Gy960WIEYKk82ghyOI77vQowqXcf5buijcUYoUhq2QVMt/gAx3AtO25dg2T+tsdHxEL4xKLiSqUC7fQdoBdnC1kOChiqP4X7BGT4BAbj2qClMN1tjWNl3vPikY4XKJwqgNd1a0hyXIobquTR6HuxHXt53KSpVdoaFgNLT5Q/s5gzAGrZZSP8q9EwWEfmv6kwaTWfTn8X8HqHvD9T5k3n0t9zuZFFciA/5BD3L9wiVrLhg8r8TSfm6JofQdyttvli8xxYLk8IpwNufQuMzKeHkeKqnYUDWNwsfBBcFrKZurb6ly3mj95VDVhyF+PhQ0LN0mQlF/HIM9qc7kaklvhD+PUJf+qHzJzRPfsCqFmEShQd4k39oPGUmnKTx9TTIwPomFRF1CljdjVp9e1lm0kblUNL8VSolXlAvSgimK0629MvmdbRh+2Fy8n3GZ28RShxDZVLWZJlMirhxjvZtsSGbTbvI9p8H9PKDE8qElBQeQN7+oRSfmUAnx9cjDQNrKq+QF1fZFUJ+U/Z03+fUeppDvlliiskk90XtqYeNgjPMuBd0eKQWNZ3hTMV+uon4Af08UJ9MnZT/rJGk0za0vYiHHHLx12j3UnPa6ynzb3ORdHBkPao9cAcV/rhHAXlYGJLRmoByWuEqEzE9+Hkg6Zs6Vc3n8nHxdG33UjLf6ynz+zmKPDiS6tUeSDuKesanwIMsDI1oTUDliHrp81fJBO60au5+Ci2vf0+RGCqVgNxXzaX95ddxir+2m5aa76X8IT9II+vVpoE7Hii+o6tkZVgIeRkeZN1jKP0copxuc1HHaFyXWeScVPJ57YLAnTS6nR4Z7wkhUZoTTW9mQBbXi3cU9lb6NUvq8flueqjMKPIbhOM//kJyngMsJabQLb1JQ6UuGe+PkCYQRy+cZ5JegwH00+3C+8DFnKCJXU3J4UWFXwdQMdKvkWWPz2m3UgNWPsShW6i3hgrVNd5Pb+9Yx71wppl6DWjAT7eLOPrgKObEROpq6kCVI+ylz9+qrvQxrOLEobSltwap1DWm/XkdJ+eZetRgwE9UGUNetoWQT/jkf5bSoCm2FKnoSskl0V8LBtEM+xj+W0uKo+f7hlHdxr1puWsCRR6fQEam9hRT0i/iEujP+QNpxvnS/AZ5+N/ltJpsLhb1NHR+w3Z8Bo3f4kcpuR/K2dtaRyOMRpCNexFPheaS6ZJZf5p8MrLS7X2VH44S/pxPA2ecL3msKxgXc5xmjN9Cfm+CnntUtW6EEY2wcS+ywHHJl8is/2Q6GVlZol7K/P0IlDaGVR4XQ8dnjKctfilv4ptzZLxuBBmNsCH3StrxsrnFWj6vEbhjJnbV2oCTSwtMNCk2CWIcF2Fp0Nc4tnlYkQ/QLVSqL45sdcIzDUKKqCMWrp2HTz9w/aBcGT7YOPMQdLcdwzwDBWdScE9w6Y8E9JvUt+jbDHFRuLTrMHyytFBLVYg0cVtMtpiJnoUuCAmiL5jB3Hciju0YVSnv2F9+MuCzcSYO6W7DsXkGRTxzsrLhEHVpFw77ZEGrliqEaWK0nWyBmT0bFD6pRBKNC2bm8J14DDtGFXGf3/JW4vz9WJQihh8JLuoSdh32QZZWLagK0yBuOxkWM3uWbttdDsqhEPIkL+G9xwaePbfih0FFPaBQPvG937DMuSmsbMbhQxM8y4MkzhWbNt7H8B3LMaDk3Slz4nuHYOnQDMs3Tijl7LiPjCQOrps24v7wHVheGQOmFGLcO2QJh2bLsXGCXsVe/8gwVUz5FEKGYRiGqaQ+9iN0hmEYhikSK4QMwzBMtcYKIcMwDFOtsULIMAzDVGusEDIMwzDVGiuEDMMwTLXGCiHDMAxTrbFCyDAMw1RrrBAyDMMw1RorhAzDMEy1xgohwzAMU62xQsgwDMNUa6wQMgzDMNUaK4QMwzBMtcYKIcMwDFOtsULIMAzDVGusEDIMwzDVGiuEDMMwTLXGCiHDMAxTrbFCyDAMw1RrrBAyDMMw1RorhAzDMEy1xgohwzAMU40B/wfeFdoLHCFEuAAAAABJRU5ErkJggg==)
Es sollen Art und Lage der relativen Extrema bestimmt werden.
Das Allgemeine vorgehen ist mir bekannt nur leider komme ich nicht auf die Stationären Punkte die mir in der Lösung gegeben sind.
vielen dank im Voraus.
kann mir eventuell einer bei der Folgenden Aufgabe Helfen ?
Es sollen Art und Lage der relativen Extrema bestimmt werden.
Das Allgemeine vorgehen ist mir bekannt nur leider komme ich nicht auf die Stationären Punkte die mir in der Lösung gegeben sind.
vielen dank im Voraus.
Diese Frage melden
gefragt
inaktiver Nutzer
Leider scheint diese Frage Unstimmigkeiten zu enthalten und muss korrigiert werden.