Wir haben bereits kennengelernt, wie wir im CAS Gleichungen lösen können.[br][br]Bsp: [br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAVEAAABkCAYAAAA/tgPoAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAABbiSURBVHhe7Z0HkBTF98efooigiBRJOEEkSc5BSv+CSA4iAkUOgkiQIEoSLFIBkiR5HDkoqECR4RAkWaiACAf8OJQokpNEQQV1//N9173M7e3u7e7s3e7cvk9V18z09PTebfjOe/1e9zz0119/OchmPPbYY2pPEAQhtDystoIgCEIAiIgKgiBYQERUEATBAiKigiAIFhARFQRBsICIqCAIggVERAVBECwgIioIgmABEdE0wJw5c+ihhx6ibt26qRpBsBfNmzfn73BcXJyqsQ8ROWNpxYoVao+oSZMmas+eLFu2jL+AVatWpW3btlH69OnVGUGwF6+99hr98ccftGPHDnr00UcTKm1ARFqi3377Lb355pu0ePFiVZOYYcOG8V0RxUz16tW5Dttw4IcffqC33nqLnnjiCZo4caIIaABs2rSJJkyYQB07dqQGDRrQ4MGDafny5eqsEAgXLlyg2NhY/h3ht4L39sMPP6TDhw+rFu4ZPXo0t3n//fdVjU2AJWq3YpVevXrB+nYYVqiqSczQoUP5PIqZatWqcR22oeb27dsOw/rkv2fkyJGqVvCH6dOnOz9n19KsWTPHxYsXVUvBV5YuXer2/UTJnDkz/7a8oX97M2bMUDXhj4yJegB3UeMDVUcJvPLKK1xniKiqCR0xMTFsiRYpUoR69uypagVfmT9/PnXv3p2ee+45io6OpsuXL9OuXbucnzmGSXLlypWs9SQ8QA8tFS5cmC3PzZs3wwrh4bN27drRrVu3aPjw4fTdd9+pK5LyzjvvUO7cuenjjz+mO3fuqNowx52lF+7FKslZonagYsWK/D9MmzZN1dgPWPSGmKmj1AWvXb58eXWUmO+//95h/JD5/S1evLjjzz//VGcET5gt0G3btqnaxNSsWZPPt27dWtW4R1ujofpu+ItYojZk48aNtGfPHsqTJw+9++67qtaenDp1Su2lHtu3b+fSpUsXVZMYBOnefvtt3o+Pj+dxU8E7zZo1o3HjxrFV78lTM25IvN2wYQNvPfHGG2/wFpatHRARtSHaHapUqRJvBf8wLEvetmnThrfugFuqgasvJE+/fv14iMQTx44d4y2GoLxRunRpypo1KwenYCyEOyKiyXD37l3au3cvnTt3TtUkz5kzZ9jSwXX+sH//fp9eR4to5cqVeSv4R926ddkKzZgxo6pJSrFixZyW09mzZ3krBM61a9fom2++4f1atWrx1hslSpTgrR2sURFRD8AtKVeuHGXKlIkqVKhAUVFRVLBgQerVq5dqkZR169ZxSkfevHl5i+uQEoXtkCFD6NChQ6rlA3799VfOVX366aepbNmyztcZNGiQapGYf/75xymiyKtzB76weH2UMWPGqFr3tGzZ0tk2kvDkypu5f/8+b8Xit8a9e/do5MiRvAUvvvgib72B3wxA7nPY4y5wE+7FKskFljp37sznM2TI4GjRooVj4MCBXGe4GVxviJxq+YCDBw86gxFlypRx9OnTx2G4No5GjRo58uTJw/WuA+6rV692nqtdu7bDcIc42IFjlLZt26qWD0AfOJcuXTpV4574+HhnPwsXLlS1iRkxYgSfx99w8+ZNVZt6ILiDIEI4Ytzc+PPH+4N9wT8uX77sMDwxx6pVq/j3oL+LCED5wtSpU7l99uzZVU34koIzls7Ssk41aFCmCbRrakPKpmqDgdUZS7179ybjQ2IL0DWxGoPjAwYM4DSNmTNnJhokx2wKjPvMmDGDXUKM2WiQEoX0jYYNG9KaNWtU7QPwOkjw1yB9o0qVKmydIq0G12tg0RrCzUGNtWvXchK4ZtGiRWSIK1uusDi9sWXLFqe1iju6+X/B39O0aVOeGYJUKX3nT01g/SJtzPy/hwtIEF+wYAF16NCB06FSC/N7AS/G+I0m2feHUL23+GwxpGXGEFAOQPmCTpcCV65coWzZgqkgwSWF3PmztH3E+zToW3VoE44cOULjx4/n/Y8++ihJlBEzgyZPnswCiwjjrFmz1JmEWVAAM4jcYRZQMGXKFBZQ5MRBtM1ANPGFwwwkiKgZPT735JNP8tYbNWrUYNEFCKLoSDhyH+HGAwhEKAQ0nJk2bRoLKHJIdd5oKDCLZiACGmrw+8GQmMafIBFydDW//fab2gtTXF1ly+XyPkd0+/KOqKh8CaXLMsdZd+0sFKt4cuc/+OADrjfER9W4R+exwU3RdOvWjeuQVwhXOjlKlSrF7ceOHatqkpI3b94kuYwYIsB1JUqUUDXJM2HCBL6mUqVKfFyyZEk+HjVqFB+HinB05/VwCYrr8IsQGBcuXHD+ZjJlyuT46aef1BnPHDt2zPk5GF6Tqg1PgufO/3OL4jfE0Mej5tHOq8Tm99Wrxk49+7jztWvX5pxAzK5YuHChqk0KrNB69eqxKwy3HFuz+4H0DFiBGECHy+46kI5rYNUiz7NQoUKq1j1Hjx5NFLF//fXXebgAfcIN9xXjBsHz6+FO4W/t06cPTZo0SZ0NPr64kbDe4c77Qmq5pXq9hAMHDpBxo+N9ITjgM8SQF7hx4wY99dRTvO8ODJ1pbwvfU3xfw5WgufNXNwym19+DgEZR7QFLaFO05xy8cAU/HJA/f37eegLjoQDRWwwBAIgTXPCcOXPyWCWEqm/fvpy47To+pKcSQhx14rencv78eW6refjhhI9MR459BYtstG7dmv+uVq1apaiAekOLVLixc+dO599mGBcioCmAOfcWi414w7yKEz6PsMbVVQ60nF0z3DFw1kbH8cuqbtck27nzUVFRXN+lSxdV4x7DAuR2KIalqGoTMISYXRcsYAF3NUuWLM62hpXLbU6fPs3HiPb7iyHMfC0i6v5gCLLD8A7478qYMaNj3bp16kzoCBd3/pNPPnF+RkLKUqRIEX6fGzdurGrcc+XKFedn4mtEP1SkXHR+fwwVbDrZVu487pSw1OrXr88Rck/AioOVmT179mRnsyCY079/f+4XlqAO9MCVh5Xpr9v46aef8oIj6dKl45xRXzh58iQHtjCMgOGBokWLsjuF/x2WcqgIh+i8djELFChAx48fV7Whw/xe2Ck6D/cbQ1TJgVxoTCpp1KgRrV69WtUmBd9ZfCYAw1a+5JaGCkm2N4FZKmD9+vXsSntCL+rsyweLCK+eCmeeM6wj4v6mzzz77LO8/ffffzn1IzkgtJgggC/uV199xXVLliyhixcvcvqOPzOx0hpaQHETCwcBdcUsmoEIaGpy8OBBn8bodYYIjAhv3L59W+09+M6HLa6uctCKDd15oN0NJMljzU5XFi9ezOdR4uLiVK3DMXPmTMf169fVUWKio6O5PdxXzebNm539eHJXDEs1ydACIpv6OgwdJAeuR9vZs2ermgQMi5jrPa1klBqE0p03LHrn+yhYJyYmxpEvXz5HbGysqkkKMlH0e57c575jxw7bfD5iibqwatUq3iICXrNmTZo7dy5bfHDvO3XqxC45gEtfpkwZ3gdI0n/++ed5VaXPP/+c77iwbubNm8dJ78AciUb0vnPnzryvhxFwDdxs/A2wkpBD6urymO/Kp0+fVnvuwVQ75LJi+EK/lgb/B4YZML8ff0skAS8DnxOmfho/Zn6vdcEQg2tBveAdTOpAbicmcCALxNWTwwQVnQ+NzJbk3lP9rCVPU5vDCneWXlCKTS1RYAiZo2PHjs47obkgOAMr0pW6deu6ba8Lpo+6A3dwrPjt7hoUd3dsWHA4521Fe0P8uU2tWrVUjXv0343/N7UJlSVqzgX1pYTKWrYbly5dSvQ7wLRZfMZ6OjSKcfNSrb1jGBbcfvTo0aomfInIwJL5LujtjojAy759+zj4g7ssLE/jS+FcYcYVWKxYuATPmEFBMADpUribmqduuoL+8XAujFtiBSi8FsaM2rdv73bZsOnTp1OPHj34rg8L1hWsN4pV2o3Pl61nb2NKGBM1XH3ex98Lyyy1gJUXisASrCR3Y97egjdijfrG33//zYvn4PuHtDFNyZIlOVcZOdi+oAOvWB0/3D2liBRRuwOxxjJtSFbWazTakVCJqJA6YN3W3bt38/qgWOvBVyDACNoi++XEiRM+TXEOJTImakPw5UJyP8ZcvaVi2QG9ZqeQ9nj88cfZc/NHQIFekwLf8XAXUCAialPwBQPmRVDsBlaW0v+HIICtW7c60/7s8t0QEbUpuMPjyYhY5cnu1qggaDCZBHTt2jXJKmrhioiojUGaVcWKFWns2LE8oC8IdgZB2ZUrV/IsOr0kpR1IwUWZU45IDyyZwSD8Sy+9xLmgyM8TBDuCSD6CjFirFwv56NmDdiDdkCFDbBcafeSRR9SegGcy5ciRg5/hBOziAgmCBlOY8ZhkpNvBEi1fvrw6Yw/EEhUEQbCAjIkKgiBYQERUEATBAiKigiAIFhARFQRBsICIqCAIggVERAVBECwgIioIgmCBgPNEse4ikmT/++8/VZMAHumLh6hhbcaUQvJEBUEIF/wSUbNwYnvv3j23Ipo+fXoW0pQSVBFRQRDCBZ9FFKJ5//59fjSqcQ0LqKdH9mJaJoQ0Q4YM/BhVPIgfYhosREQFQQgXkhVRWJoQy7t37/JK1VgtCBYphFKLIyxO3VaLLa6BBQrBw+KsGTNm5Gt0WyuIiAqCEC54FVEtingGtLZAIYQQRFiYsDRhcUJMAcQTFiraoT2EF2KqLVKsUm0W3UARERUEIVzwKqIQRIjh9evX+RgWZdasWVnEIKawNCGIeswTFiqEF1uIJ6zWa9eusQUL8JgAiCmE1woiooIghAseTUJYoLAkIaIgU6ZMLKCwQrWIugaNsI86nEMbtMU1uBZo6xR9C4IgpAXciigsSbjmsCDhmsMCzZIlCz9dEq67WTg9gTZoi2twLfpAX+gTfeM1BEEQ7I5bEYVLDqsR7jisSm2BBoq2SNEX+kTfeA1BEAS741ZE4W7DaoS1aHbfA8Xs3qNP9C0uvSAIaYEkIgqRg8AhqATxQyAIW19ceE/gWnNf6BuvIS69IAh2J4mIagFFdB1jmkhPsiKgGvSBvtAn+tZCKgiCYGeSiCjGKvV4JSLtSEcKRoI8+tDTQYH5dQRBEOyKV3WE8PkajU8O9IG+giHIgiAI4YIomiAIggW8iijc7WDldKIP9CUuvCAIaYkkIgp3W7vcOsgUDOFDH+Zgkvl1BEEQ7EoSFdPBJKQiwXLU+aJWQR/oC32ib3OQSRAEwa4kEVEEgLSQIhUJs4uwtSKkuNbclxbQYASsBKITJ07QjBkzqEmTJlS2bFmKiori93jYsGGqhWAVfFcxhblEiRLUoEEDGjx4MC1fvlydFSIZt/40BE7nh2LBEEzVhPgFCq5FH+gLfaJvsUKDw6xZs6hgwYLUrVs3WrlyJVv6derUoZiYGBFRL2zZsoWqV69OefLkoXXr1qlaz/zyyy80YcIEqlmzJg9LjR49mpo2bUqNGjWi/fv3q1ZCJOJ2KTxYjhA9LIGHtUQx0whz33EnDoSbN2/ykniwRLGmKJbEwzTQQC1RXCsQLVu2jJo3b66OiIYOHSrC6YU7d+6wGH755Zc0ceJEVev/+3bjxg2qXLkyHT16lI+LFi1Khw8f5n0h8nBriULckNOJlZdgNWLlJXxxIIa+RuvRBm1xDa5FH+gLfQYr9zTS2b59u9ojyp07twioGy5cuEA9evSgAgUKsDFQoUKFRAIaCFiVbOzYseqI6Oeff6a9e/eqIyHS8Bgeh7uNBUPwxQO4i8OaNLv3rvPfsY86s/uOa3AtQF/oU1z54GC2fgoXLqz2BDNHjhyh6dOn08mTJ1VNcKhWrZraS2Dt2rVqT4g0PIooQBRdu9+wHuGOnz9/ni5dusQWJqLt5rFS7KMO59AGbXENrkUf6At9CkJqAbGbP38+tWzZksaNG0fr169XZ6wBa1QQgFcRRR4nrEZYkJkzZ2YRRB1cc4yXXr161SmWWlxRh3Nog7a4BteiD/QluaFCatOhQwf64osvqF+/flSvXj1VKwjBIVlFg+ghXUZbpBBDWJYY77x16xYL5u+//84F+6jDObRBW22Bog8RUEEQ0ho+qxqsSETF4cbkyJGDnnnmGcqZMydlz549UUEdzqEN2uIaGQMVBCGt4pdpiIi6nm2ESDseQOeu4BzaoK1E4cMH5DQiNxIFkXydomMmNjbW2QZFUncEwTteH5kcrkieaAIQOZ3mhADKtm3beN8TGBNEwrgG12/dulUdER04cICqVq3KWRUgV65ctHHjRipVqhQf+8ru3bt5TDzYuEbEA8X1xh5ofq25H8nRjWAgonYroeDo3n2O22o/XDBEBTdALtj3hTp16jivQRk0aJA643CULVs20blFixapM74THx+fqI9glvnz56tXsYZrv4YAqjP+EYw+BPsjkR4f+SN+Dc1dfYwSnsIffrzwwgtqzzvIZ8Tces2YMWNox44d1KpVK4qLi1O1RAMHDqTWrVurI9+BNZtSYNJGOBEsy1iwN+LO+0jc58NpzUmiLJU6Ue+6D0QoVCxYsIA6duyojoiWLl1KzZo1U0fewVxvLFSigdt+8eJFdUS8wAYW18C4diBMmzaNszWCTbDc5WC5867TbpGDKilUkYeIqI9oEQWhFNLjx4/T7NmzOXFc07NnT5o6dao68g3DVae2bduqowfky5ePVqxYQeXKlVM1aY9giSjo1asX3zQALPwRI0bQyy+/zIvCCJFB2hbRv87S/w5eoL/UoRXO7I2l/11WB5SBcv1fa3qneuoJ6fDhw2nVqlXOFYOQe9uiRQsur776Ktf5y4ABAxKJMVi4cCG1a9dOHaVNgimiAMG3zz77jBP6NVWqVKG5c+dSsWLFVI2QVknbIno+lqbM3kMpM5KWgfLXf4faVUi96X9wHzEHHNMYMScci7m0b9+eRo0axats+QvGR+GOGt8BPoaLj2GBtG5FBVNEkR0xZcoUvsEBvIdIJdPjpTJumvYREbVEFqrYqTfVS2XPHlNrMf6p05sqVqxIP/74I+/7yqFDh1hAsQKRmfr16/N4aCiGTFKLYImo67g0+unfvz8vsiNEDhKdDxhYou1TXUBBtmzZaNKkSezSgz179nCSvK9gUWG48lpAsYizBsERjLFaoVChQixUwSy+Lp6cmsAz0GB8GUIsAhp5yJioj4R6TNQd/ibba7C+JpaH0+zcuZOWLFlCkydPVjWBW2cYu7UyvugNq2OXGoiymUD7NfcTrL9NsB8SnfeRcInOmwlERCGU7733njoi6tq1Kz9KBGA8z/yoi3nz5iVyV32lTZs2dO7cOXUUHGB1Y7ZVMNZNFREVgomIqI+EW54o8FdE4fI3bNjQ+Qhs/dQCDebJFy9eXB0Ru6Zr1qyhGjVqqBp7AutYv0/AvA/MwR9E04cMGcKL6CSHiKgAZEzUD7KUaUWdwkRA/eXKlSvUu3dvp4AC85gegIDMmTNHHRHPoe/evbs6si8QTXNxxXwOwxzIfBAEXxFL1EeO7YujZ8qVpYSHpYQH/lqiaK+B5WS2wMxAXPWYKYQ1Ojqa9+3Kpk2beHqrL+AZTOPHj1dH3hFLVAAiojYm0MCSEBxERAUg7rwgCIIFREQFQRAsICJqY8zzsk+cOKH2BEFITUREbYw5MHTmzBmehiikDq7jn40bN1Z7QqQhgSWbg2R4LZ5ISP/666/ZQpXnoqcMmN21a9cu6tu3r6qRoFKkIyKaBpg1axbnd2IOPcDjqpE0j/n1ntKYBP+ASGJpu7Nnz6oaotKlS7MFKgIa2YiIpiEOHjxI+/bto1OnTnFSPR5VDStJsA6EEjO4sPgLSv78+alkyZLqrBDJiIgKgiBYQAJLgiAIFhARFQRBCBii/wc2MKxDhM9mowAAAABJRU5ErkJggg==[/img][br][br]Mit Hilfe des Befehls "löse()" können wir auch Gleichungssysteme rechnerisch lösen.[br][br]Wir benötigen dazu wieder den Befehl löse(), allerdings müssen wir die beiden Gleichungen als "Liste" in geschwungenen Klammern { } eintippen. Die Klammern erhältst du mit den Tasten AltGr + 7 bzw. AltGr + 0.[br][br]Bsp:[br][img]data:image/png;base64,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[/img][br]
Löse das lineare Gleichungssystem, das du vorhin schon grafisch gelöst hast, nochmal rechnerisch im CAS.[br][img]data:image/png;base64,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[/img]