0
entferne bitte den Punkt bei C in deiner ersten Skizze, denn da ist kein rechter Winkel.
Ich habe zwei Punkte M und N zugefügt.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAWAAAAD9CAYAAACC7q1lAAAgAElEQVR4Xu2dD8hWVx3H76BRRtLUBAd7qTQhQXFGsgRfaGPO/DPYYKKFo8VWOmmwaqn5GiVTm2Y4ctlck6IFKQYKNp05VuDAmgMTBQdTFyxQWGpiZGFQfU79Xq6Pz/M+93mee+/583x/EDm9z73nfM+533vO78/33PLv/1omEwJCQAgIgdoRuEUEXDvmeqAQEAJCwCEgAtZEEAJCQAh4QkAE7Al4PVYICAEhIALWHBACQkAIeEJABOwJeD1WCAgBISAC1hwQAkJACHhCQATsCXg9VggIASEgAtYcEAJCQAh4QkAE7Al4PVYICAEhIALWHBACQkAIeEJABOwJeD1WCAgBISAC1hwQAkJACHhCQATsCXg9VggIgc4RuHjxYrZz585sz5492ZtvvuluMGnSpOy+++7LvvCFL2SzZ8/u/KYefyEC9gi+Hi0EhEBxBE6cOJHdfffd2eXLl92P5s6d6/7/jTfeGP672MQdRcDFx19XCgEh4AkBVr6TJ092RPv4449nTz/9dDZu3Ljh1rz++uvZc889l+3atctTC7t7rAi4O9z0KyEgBGpEYMWKFdmPf/xjt+p95ZVXanxytY+qlIB37NiRLV++/KYefPrTn3Y+m0cffTSbOHFitT3U3YWAEIgegbFjx7rV7x//+Mds+vTp0ffHOlApAW/evDlbtWqV2zJ87GMfc8+8cuVK9pvf/MY50MeMGZNt3749W7JkSTKAqiNCQAiUiwDuhcHBQRdsO3PmTLk393y3Wgj4yJEjN0UnDxw4kC1dutR91Zr9u2dc9HghIAQCQQCuWLBgQXLuB+D1RsA83FwUKX7ZApm7aoYQiB4B20mn5v/1TsA04BOf+ER29uzZ5Hw70c96dUAIBIIAmQ2f//zntQLudDzsyzWSi2FoaCjbuHFjtmnTpmzlypWdPkLXCwEhkDgC5gMmeH/s2LGkeuvVBQGSRtIi4KTmlTojBEpDgBzgj3zkI+5+7JZTypwSAZc2TXQjISAEqkLgc5/7XHbo0KFs8eLF0RVbjISJCLiqGaP7CgEhUBoClCHfeeed7n5r1qzJvv71r99QCce/E9RvrJArrQEV3cg7AVuFy/PPP58tW7asom7qtkJACMSOgAXjrB+mBUFuMK6JGF0U3gk41QqX2Ce72i8EQkTg3Llz2ZYtW1wxl5EuwbmZM2dKDa1xwNplQaSc3xfi5FWbhIAQCAsBLytg0/SkTBlLrb47rCFWa4SAEAgVgVoImC2CScdBviakjBbEL37xi2z+/Pmh4qN2CQEhIAQqQ6BSAm6lhobz/J577nFqaHlNz8p6qRsLASEgBAJEoFICDrC/apIQEAJCIBgERMDBDIUaIgSEwJ/+9KfsRz/6Ufb973+/L8AIjoBvueWWvgBenRQCQqA1Apx+0ewwh9QwEwGnNqLqjxBIAIHz589nEyZMSKAnI3chOAL+29/+lo0ePdq1mkH417/+5aTotm7dmpFNIRMCQiAdBFA6e/jhhzNcDx/4wAey9evXO9lJ3nsrPU6ntzf3JDgCponmhnjnnXeyb3/72y5V7X3ve1/25JNPulpvBkomBIRAvAhAsOvWrcueeeaZYbJ96aWXXIrql770JbfYSk16stloBUnAAwMD2Z///Ofst7/9rduGfPnLX874UmKf/OQn3emon/3sZ+OdfWq5EOhjBNBuYFdr9QBPPfXU8MLqV7/6VbZo0SJ3hiQLsNQtSAL++Mc/7rYkhw8fzu699143Bs8991z2rW99K8NFgX31q1/Nvve972Uf+tCHUh8j9U8IJIPAiy++mH3ta19z7/Edd9yR/fSnPx1+x+nk7373u+zuu+927/XVq1eT6XerjgRJwAwAA8HgPPLII8Nth5SfeOKJ7Ne//rX7OwaQ1fDChQuTHyh1UAjEjMBf/vIXt5Pdt2+f68ZDDz3k3l0TWre+IUswY8YM95///ve/Y+5yobYHScDz5s3LXnnllWzbtm1updtoP/vZz7JvfvObGYOKcboyQbrGwSyEgC4SAkKgUgReffVV59fFrcjKlnf1sccea/pMFlnsgLF+yIQIkoAZLEj2O9/5Tvbd73636UBBvo8//niGzwiDfPmi8mWVCQEh4B+Bf/zjHy6Ijnwk9pnPfCYj0MZBvK2M34waNcr9Mz5gfMEpW5AEjI/o2WefdatfVsEjGVsa3BJ8XTHcERAx7gmZEBACfhA4deqUSy/DpUAG0+rVq92Cij+3M8uCIgiferA9SAJm1UuKCv5f/MDt7K9//atz7LNqxm677TZXythqm9Pufvp3ISAEukeAgDkuQlazrGBZ9c6ePbvwDS0If/DgwYyz4FK2IAmYAWRVC/gMQlEjcIf7Aj8SxtcTAk99G1MUH10nBKpE4MKFC+79I36DEZthN9ppptKUKVOyt95666YgfJVt93XvIAmYlSwDCYGyDenESG/B7wSJk+zN4LP1oYijyPank2fpWiEgBP6HAJlJvLPEZtiBQrxLlizpCh7LgmoVhO/qpoH+KEgCJmo6Z86cnpKxf//737sJwZcUIwDAaphCDpkQEALlIMCCB3cDh+piZew677//fkfoIwXhy2m9/7sEScBUvQ0ODroqOFJRujV8UJQ6btiwwa2GWQEPDQ1la9eu1Wq4W1D1OyHwfwQIsFHRxiKHdwuZAKraet1pWhZUkSB87IMRJAHncwHLSMZmopCyxqoYQ+SDLRKrYpkQEAKdIcBihtQyXH38mV0lgbayxLJYUXP/okH4zlof1tVBEjB+pPHjxzukLl++7HxKvRoThdQ2Jg0rY4n79Iqoft+PCJDuSXoZAW8MzV4yjjoNtI2EnWVBIUOAHEHKFiQBA3heEa3MLAaEQCiJtAnEvfENp55vmPIkVt/qQYCiJ94d0j4pfPrJT36SPfDAA6U/HL0IntNNEL70xlR8w2AJmBOTGWgk6cra2uSxJEuC1TDPsC854j5lrLYrHjPdXgjUigCBNlx4yMJipIeyaKlKMN2yoPpBES1YArZk7CqrYdhOMbEk7lPr+6yHRYQAcRMCbSaYziKFlM4qzRTReg3CV9nGsu4dLAHPmjXLBc1w7pPQXaXxZaeSzsR9yF8kB1HiPlWirnuHjEArwfSpU6dW3mzee95/rIwgfOUN7uEBwRKwJWPjZ6qjpLiZuA8k3G0yeQ9jop8KAa8IsNpl1WtZQ6x4WfnWdRJNPguqrCC8V0BHeHiwBFxEEa0KUHFH4JaQuE8V6OqeoSPQTjC9jvYTlyEGhKWuiBYsARMFZTKgosTXt05jAnD6hlX3EJijDf1wTHadOOtZ4SDAnOedM3lXshvYffpyw1kW1NGjR5PO1w+WgDtVRKtiKjcT92FSjqRnWkU7dE8hUCUCjYLp5PX6XmxQB4BbsMogfJWYFr13sARMJQwVMXyJ9+7dW7Q/pV9notIUcRCYwA9GyaXEfUqHWjesGQHmMzs9E0wn3fOXv/xlEAsMy4KqIwhfM+w3PC5YAu5FEa0KQAlIsEVDaBqjjJlyZsqaZUIgNgTQbyDQZoLpdjJxrzoOZeGAFgyaMHUF4ctqd6f3CZaACYahikSd+enTpzvtVyXXs2JYv369xH0qQVc3rQuBXgXT62gnaoi4RlJXRAuWgC0ZO8RqGFbBrIYtTYePBJVBEvep49XUM7pFAJ8q2UVWeESKJbu4EKs/LQuKlTk+6VQtWAJGs2Hy5MkO9xCTsVuJ+/DFLlOYJNWJp37Vi0CZgul1tJwTcVipp66IFiwB55Oxr1+/3rPGaFWThnbytZa4T1UI6769IEAQmWA2ZIZxNhuBrTIFrnppX6vfWhaU7yB8FX3L3zNYAqaRVSmiVQEqOctMdBP3oXqPrVOI27sq+q97hodAVYLpdfSUrCPkAVJXRAuagEeNGuW0e0+ePJnVUYPe68SSuE+vCOr3ZSFAahkpZrjKyFsnvawKVcGy2tt4H8uCCikIX0VfgybgOhTRqgCVaiLKmU3c56GHHnLBDl9VRVX0UfcME4E6BNPr6DknK8+bN6+ncyHraGevzwiagGfMmOHyFPfs2ZNBYjEZ5MsWyjRUIV9cEgQVZEKgCgTqEkyvou2N97QsKP4+xCB8WRgETcCmiEaKV6zEJXGfsqaq7tMKAQTT+dgTh8A4yod35o477ogWtHwQ/tq1a7UpsdUNWNAEvGjRIicOQukvJxnHagTmOH3DItGkqSHuw6mvMiHQCwI+BNN7aW/R3+JKGRgYcJenrIgWNAH7kqQsOkk6vY5tFQUc5DhjRHjxDRNokAmBThAguPbMM89k69atc4E2gtSkl6VUGm9ZULEE4TsZP7s2aAJm1Ujpb0rJ2BL36Waa6jd5BHwLptc1GqNHj85wr6SsiBY0AUO+kDAlk6TRpGRvvvmmWw0TZMRIEUJ4JKUVTErjFUpfCOqSYQMxcWYavl4OyUzRLAsqxiB80fEImoBDU0QrCmrR60zcZ9OmTS7fGSWqoaEhJ0Jf1/EvRduq6/wiEJpgeh1ozJw5M2OhEnMQvh1OQRMwATgCcawKjx8/3q4v0f470oD4uyXuE+0QVtpwYgcPP/ywOyaLAG4IgumVdvj/N7csqNiD8CNhFTQBh6yIVvYEZDVMlgQuF7aXrIbJkmDySdynbLTjuJ8JptthALipCLT1S9AWveJdu3YlLUkZNAHjH6UYAwK6evVqHG9Nj61sJu6Db5jcTln/IBC6YHodI2FZUCkF4RtxC5qA88nYKVfDNJvM+L9JrjdxHybh1q1bJe5Tx5vv+RkcBouwEzshVMvwgZKy2G9mimgpBuFtLIMmYAJTCPJg7777btSVPd28PPj80EXdt2+f+zmVTZBwbGXZ3fS9H38Tk2B6HeNDnjOCQikrogVNwAyyJWO//fbbQRwWWMfEa3yGxH18oF7vMxGfYct94cIF53KjQGfp0qX1NiKwp1kWVMpB+OAJOFZFtLLnMq4IXBJMSgydYVbDsWpklI1PrPeLVTC9DrzZ+T344INJK6IFT8AcS0Tp7v79+7OFCxfWMe5BPwNxH9wS+McxMNm2bVvwJxwEDaqnxhFkJr2MMwbJeuE4K3LAQzmZ2BMsw4+1LKiUg/DBE3AKimhlT2SCM/jGJO5TNrL13Q/BdFIOWQEjmE56mQ51vRF/PkzTpk1zf5lqED54AuZoelZ9bLeffPLJ+t6QCJ70+uuvu3JmUpYwzvsiZa1f8kQjGKKbmkhgFV8vR65jHF3F3Fau982jmc+CSjUIHzwBp6aIVjZpSNynbESru18+mIpAP4E2ZbS0xptClFtvvdVdkGoQPngCJh+S7dry5cvdhJU1RwB/Ih8rE/chckz+qMR9/M+YFAXT60IVAoaIU1VEC56ALRk75WqYsiazacRu2LBhWNznqaeecsEdifuUhXJn90FMhpJaAsmMAaXljImsGAKWBZVqED54AuaYFfycKSdjF5uKxa+SuE9xrKq6sh8E06vCLn/fKVOmuBhHqopowROwJWMTYDpy5EgdY57MM8iSIFuCLTCGuA9HISngU+0QEzwivYwgqeGOgpl2IZ3jbllQqQbhgyfgflJE63x6tv8FZICAN5VWGNoC+NJTFfFuj0i1VyCYTp42hTOpC6ZXi+T/7k4hBgUZuNFwR6ZmwRMwGrmzZs3KiBq/9957qeFfW38k7lMt1BAuHzrkEzEKZNg2M29l3SNgWVCpBuGDJ+B+VkTrfto2/yU6A6zOSIfCWKFRRadUqN6QZpcGUTBXdeJ1b1g2/hoXGqI8qQbhgydgVhZjxoxx48IKWCuK3ic4BAwRQ8gYBAwRQ8g+DLnB3bt3u0dz9h//PZKdO3fOnaF3+fLlbNKkScOnTNfddgJtVLORJsmfSfmj/SqEKW8kLAsq1SB88ATMUJoi2jvvvCPNg5LmdkjiPvijDx06NPyhvXTp0oi9XLFixQ054T7KVInME2gjzQztBqo0CXBKx6GkCfr/21gWVKpB+CgIePz48RlaqWRBMBCy8hAgOIfv0sR9IEOCdATr6jIjYNrBs0daBV+8eNHtgubOnetIG6ubgPOC6Wg0o+PQj4LpdcwPgpp86JiPLMBSsygIWJKU1U47E/eBWNhKmx+TwEcdKzojYKr42MYvXrx4OJjV2PMdO3a4qkhImgKHOgmYRQA56SaQj+sG7Q2kQWXVIGBZUKkG4aMg4MHBQZdTmWoydjVTt/O7knFCMMnEfVDnAvOqfZpGwKxkUQY7e/as+9/EiRNv6gT/jouC/5lrqo4VMDsFyNdOJpZgeufzq5tf4OLhePo6P7TdtLPb30RBwHPmzHHqUUx6Vj+y6hBA3IdSZiLPrIYpHhgaGqpUpzZPwLbC3bRpU7Zy5cobOspHmI/xmjVrXBvrIGDwIBLPycQYHyVW33W6aKob7fDvnM+CSjEIHwUBSxGt/helTnGfPAGT4UBmQ7PsBgu+2eq4agLOYyDB9PrnIE/EPTZ69Gj38BSD8FEQMClTlNUSaaYkUVYPAqyAWfmZcLhF+xGUKbOsNk/A9MzS0l5++eVs/vz5rrP54JtV9VVJwPSblS8rYFa7rHolmF7PvGt8io3z0aNHkxuDKAhYimh+Jr49FZ8w/k/TNsAnTPCprIyURgKmmowAG1kR27dvd83YvHlztmrVqhsyJKogYHy89NVIXoLpfuceT7/99ttdznqKkpRREDCrEQ6kpLwTWTqZHwSqEvdpJGB6N3bsWFdoQebBuHHjXHDOgm/W+7IJmOwGyJdnktnAR0ZVgn7mWv6plgWVYhA+CgI2RbRUq2H8T/HiLSAogkuIY6IwtudU0fVyYGozAibwt3HjxozUuIGBgWzBggXDwbeyCRg/I8L/PAtjnpHbS46vzD8CpoiWYhA+CgJmOzhv3jy3CuJoEpl/BPgoQlqsFjFq9ZFc7KZUvBkBnzhxwuUEE4yj7JhS5cbUtDJWwHnBdHzcVLNJMN3//Mq3gHcfDkhRES0KArZkbFYkHM4nCwMByBc/rYn7dHvOWTMCpofkf0KQGJVv5pctYwVMgNFOJubP+LUJtOkIpzDmVr4VlgWVYhA+CgKWIlp4L0W+RfhOcUsQwMIeeOAB55YouoVvRcCWE8w9m5Und7sCZj7xUvNhxxCql2B6uHPMsqBSVESLgoB5sfEDYlevXtWJDgG+K72I+7QiYFLPJk+e7HqL64lgXN4I1GHtxHvyvyHDglU77WXFTmCnF/91gEORXJMsCyrFIHwUBMyMkiJaHO9VXhuXFhPQguR8V45BuKykEHfBJJgex3yilWTfMHYpBuGjIWCqYYhWHz9+XH66wN8dxoniDV4cE/eheIOtfh3iPo3wkL+MohauBwpIcDfQFlkcCFgWVIpB+GgIWIpocbws+Vb6EvexNkD+69atG9a1kGB6fHOIFqMDgx5MikH4aAjYIuJFTkyIc5ql2WpKeRH2QTzHxH2oaFu7dm2lq+EzZ864ajrLoiC1TILpcc4xE2Gi9XUo39WJUjQEbMnYKVbD1Dngvp6FsA3BL1bFGKtRKs3I8S3bOEWByklcIRJMLxvd+u+Xz4K6du1aqTok9ffmxidGQ8D48AigpJiM7XsS1PX8qsV9JJhe10jW+xx0INCDwIooolkZOx/3Y8eONW1sNxk0VfQ6GgK2ZGy2rgR0ZPEigHsAzQXLwyW4wmq4l2N98BMyR0wwHdU8hHRkaSBgWVBFgvB2LT1v5bLsNoe8bDSjIWApopU99P7vR5YE2RKkiGFkJvBx7eSIH3zMdjIx95Bguv9xraIFnIzOPCmiiAa5UsJO6Tq/a5ZDLgLucJQI5KDPijrVnj17Ovy1Lg8VAVas+IZN3AefLaIrRYojTp065dLL8C+T3rZ69WrnovKR6hYqvqm0y7KgigThIVdK1znSirnU7HQVEXCHM0OKaB0CFtnl+PcJnJm4z9KlS534fitxH1bPiAFJMD2yge6yubNmzXIB3CJBeCNgtKRZCTdbBYuAOxwI9AYefPDBbOrUqdnJkyc7/LUujwGBIuI+BGTw9ZowD0TNKoeTnGXpImBZULioiAONZEbAzBE7xsrOEbTfiYA7nCumiEZJK5FQWboI4I7ALWHiPrgjIFk7o02C6emOfaueWRZUkSB8noBNTwRx/7ycqQi4wzmEv2/atGnOv3f9+vUOf63LY0OAgAs+fxNJf//735/985//dN2QYHpso9l7e8maIb+7iCJanoB5sh1nlT/iSgTc4ZhIkrJDwBK5nJeObaQ+uokMaI/dKBKEbyTg/CqYXdT06dOHxb18V9ZFk4ZGEv+tt97qhq9IMnaP46yfe0agUTCdxPlOZCc9N1+PrwiBIopojQRMU0xb2oT9tQLuYoAgYF7M06dPuxMMZGkigO8Xn58VaixfvtwpmOGGYivK/2Pk/FLAQWBWljYClgVVJAjfjIBBh4If/MBHjhzJBgcHHWBaAXcwb6SI1gFYkV7K8UaQbCvBdD7A69evHxb3ISbAAZ5Vi/tECmcyzbYsqCJB+FYEjBg/Ak2sgg8dOiQC7nR2EIRj9bN371537I0sHQQQziFIYoLpnJJBzueECROadtJWwybuw8qI1TCrYll6CFgWFHrOCPKMZK0ImN/Y6Sv2e62AO5grUkTrAKyILoVEWZl0Kphu4j5o/kLgrIY5uJFcUV5UWToIvPXWW9mUKVMKrVpHIuC8tKVcEB3ODwox2Iqg60rZqSxuBJoJpr/00ksd+3QbD9lkm8rquRdxn7iRTa/1+SyodkF4CHjx4sUZLodmZsUZI6ml1YVgNFkQAGKKaJKkrGt6VPccXihWveZCQDC915UrKWuUJ5u4D8E7PtadiPtU1WNSoXbu3Jm98MILwyIxS5Ysyeg3mgWy9ghY5kJKQfioCJjEfER5kBnE3yeLE4FGwXRWq/fee28pnelF3KeUBrS4ifkeCQDdc8892WuvveYCQWgV/OEPf7jpxOcq2xLrvUeNGuW0P4ooosXSx6gI2CQpqf9nqyqLCwFWpmQ4kOmAkVRPiXErwZ1eesczCOqZuA+rzW3btlXyrHbttOh747aYNu3evdtV+y1btqzdbfr+3y0Lav/+/YXU8mIALCoCliJaDFOqeRt9CKZDviisWWYFRA8JQ3x1mhEt+aezZ88efvSBAweyBQsWNJVLrLN9sTzLsqCKKKLF0qeoCJgXiQT9EJznsQyw73YSaMN1tGXLFtcU0sTYvZAUX5e1EvdBe7gOM/dDY8qTVWc106uto12xPcOyoCjKwXeegkVFwFJEi2vKkTpEoC0EwXTcH5ycgY4wRmCOoB+ncFRtzQiYoBx/z6nNeZWuqtsS8/0XLVrk3FcpBeGjImAmK8fT8/IgLycLF4FGwXRWvfntt6+W8xHHN8zHASNVjYBulSvyPAHjdqCIhGwI7Ic//GE2f/58X3BE9VzLgkopCB8VAUsRLfz3Bb8rL4odMUTAFL9rCKlghp6dI/fss886bRGKNlgNU8RRxXFGeQI2f7C1hawIXBAodMlGRoAdDGXoKQXhoyJgqp1Gjx7tRun8+fMty1Q1kf0gAOlCviaYToZD3QGvTnrOjoqsDFwkGP5p2nznnXd2cpu217ZyQZAXvGrVKqWitUXwfxdYFlQRRbSCt/R+WVQEDFqWjN2uGsY7sn3UAFaUFECYf5UXhEg1FWmhm4n7sAqlH1WI+7QKwoGN/VuRwyZDx7Lq9lkWFB/Ko0ePVv24Wu4fHQEPDAy4o2pSSsauZaQregirRwJt+FQhL7byRKir2MpX1AV3W9rP6t0q85A75SNShrjPSASsTIjio2r51EUU0Yrf1e+V0RGwJWMfPHjQrR5k/hAgtYwUM1aREBaBNlIEYzX6wSoeX2Ne3Ieoey+Hfo5EwMoFLj5bLAsqpSB8dAQsRbTiE7aqK1sJpvdCUlW1tZv7li3uMxIB23llqoZrP1LstmbMmOEu9C0j2b61xa6IjoDnzZvnjiQnsl5HDmcxGPvnqkbBdFK4UtVmxudIJZ2J+5D+RBFApxkdrfy85ALfddddLg9YucDt36F8FlQqQfjoCFiKaO0nahVXsCWHjBDSwdoJplfRBh/3ZLVPv02/guo5Pv6dfHTyIuAmxnPlyhWXcUE+uyrhio1sPgsqlSB8dATMy0D+JqtfXgRZ9Qg0CqYj8UjObD9Zo7hPJ0JC+RXwD37wA1f9huEvR0xehRjFZ5JlQTXqahS/Q1hXRkfAlgv4yCOPuCi1rDoECEoh/wlJ8GfyY7sRTK+uhfXeGVcECwBcExjiPrgkmIsj2Ug+4Hp7EP/TLAvq8OHDpUmY+kQlOgImSv3EE0848BkEWTUINAqms+Jl5aujfjJX5cccBCNs4cKFzp3QStxHBFzeHJ08eXJ25swZt/hq9+Er76nV3Sk6ApYkZXWTwe6M6hx6CfjcIBUCbUr5uxF3sCEFz4pPyADhA9UsMCwCLm/OWhZUKkH46AgYXdk5c+a4Kisc8bLyEGgUTCfQBPlWIZheXqv93olDHilnzov7sBomL9pMBFzeGN1///1uB5KKIlp0BGynmnJcOakosnIQIMkdrWWi/qzm8G1yppqsPQJ1i/u0b1G6V1gWFC6xrVu3Rt/R6AhYimjlzjkTTDdlMCLz6BJUKc9Ybg/CuRuFAhCEifuAJTuIssV9wulx/S2xLKhUgvDRETBKW+PHj3cjTw5lp0nx9U+ZcJ/YKJhuJxPHpuMQEsJ80CjRJnPExH1Wr16dDQ0NKYBZwkBZFhRuHeQIYrfoCBjApYjW+7Sj9BUFM4JJ+NNDEUzvvWdh3KFKcZ8weuinFcxbAsSpSFJGScBjxoxx5aFI0pWhVuVnKvl5aqNgOnq9BI20k6hmPMiSIFvCxH3wq5MtkYpuRjWotb6rZUGlEoSPkoBNEU2SlJ1NfzQ08FFeuHDBEW7ogumd9S7cq4lbsGoDfwzywDdMLrusMwRMES2VIHyUBDxr1iyn28q2meNJZCMj0CiYztlsYBeDYAcErAkAABBaSURBVHpKY9so7kMgiUi+dh/FR9myoPhFCopoURKwJWOzikChStYaASLypJdxEGTMgumpjDG7D6ro8uI+kDDaErL2COSzoK5evRq9KydKApYiWvuJyhVE4xEXZwVMWhnpZTELphfrdRxXQcAQMYSMdSLuE0cPq2llPgsqBUW0KAmYyiNkEUmbomBAdiMCFFPwkaJqEGOXwCpLgZ+wZkqjuA+uCMYpBY2DKpG2LKhjx45Fv6CIkoCliNZ6eudlEykhTlkwvcqXvM5786FkUZEX90HrQD765qNAHQAr4RSC8FESMFtrcljRKti7d2+d70qwz2oUTCfCjmJUK4WuYDvSpw0zcR/yXCnmGEncp08hGu62ZUGlEISPkoCliHbjK4jANycTI9OHXGQ/CqanQkpk9+A+MnEf8tz5kObFfVLpa7f9GBwczMiGSEGSMkoCRg0JVSQm5enTp7sdx+h/1yiYPnXqVJdeJu2BuIeWoOmGDRucGD5jzEcV9S9iHioTzzLLgkpBES1KArZk7FSqYbqhC/yFpJexEsAkmN4NimH/plHchw8rq75+/8BaFhQaG+z2YrYoCZitNsr4WArJ2J1OIATTSWEiik5FEC+lBNM7RTGO61kBo1Rn6YSsgFkJs/rr19NJqCrEV56CIlqUBJxPxr527VrfTEQIl8m3a9cuxx4STI+DRMtoJT5hMiVsx4P7jQ9vP2qhWBZUCkH4KAmYCd1vimi4Xdh68fGRYHoZlBbnPfLiPvSAI5D6TdyHHQG6wCkookVLwKNGjXIVXidPnswIPqVqbEHZfpJ6x5+pZCPQpqh4qiPevl8U2rATIhiNEQtBWKlf3FCWBcV7z/sfs0VLwP2giMa2k0AbaWbm+3v66acVCY/5jSux7RAR+fAUJWD9Iu5jWVApBOGjJeAZM2a4o1/27NmTpJBJXjCdYgpWvWy5ZEIgjwDky2rYxH0IylJFl7K4j2VBsSi5fv161BMiWgK2XMAUkrEbXyiCLfv27XN/LcH0qN+v2hrPfCEzBvcEBgGjK5FiJWQ+CwoCjjk3OloCXrRokfvqsyVfu3ZtbRO9ygch2A352snE+PWkd1wl4mndu1/EfXg/BgYG3ODFrogWLQGnJElJMJFja4juYhJMT4sY6+5NPmOGZ6MLgihTSuI+lgUVexA+WgImM2D9+vXRJ2Pnq53YSpFgT4VPzNuquglHz7sZAcR9eEdIW8uL+3AmXQpzy7KgYldEi5aAIV8mGD5ShMZjNFa8rHxNMJ1AWz8m1sc4drG0OXRxHwpL+Ejs3r3bQUqa5Te+8Q33Xjezc+fOuWv4iLz33ntODZGCjFgtWgKOWRENHxa+XjukUYLpsb4+cbSbFTALFgR+TNxnaGjI+07LznfjlHMyOTDiHpcvX3alxsuWLbsJYHKd33jjjeyjH/2oy4KKPQgfLQETgCMQhzDJ8ePH43gT/ttKotWQL+lDCKYz4VJOGYpmYPqgoRAWRMeqGPMt7sMxWWfPnnVEOn36dNemEydOuHZBypcuXbphVA4cOJAtWLAg27RpU3bw4MEMXzdVgLjsYrVoCTg2RTR8ciTN82XHJJge6ysTd7ubifugpEc2UZ3iPka0c+fOHd4JGrIzZ850xUeNQltG2CxeKMFGEyV2ScpoCZivJsUYTBoEeUK2RsF0JjuKVjIh4AsBcmnZibGQwShtJ1OCDJw6zNwPrGZXrlx5wyPHjh3r3BB5AjbC5kL+3rKgYldEi5aA84pooUpSstqwk4n5swTT63i19YxOECAARjCbHGKsLnGfVgTMqpbTXXCVbN++fbgrFnzjL3BNmCIaefIEr2O1aAmYzAFSUbB33303uIofPhB8pW2FwcTmBOc6t3mxTkq1u14EGsV9qJ4jNrFw4cLKGpIn4EcffTTbuXOnU/rjuZAvu8Rx48a1fL5lQcWuiBYtATMyloz99ttvZ/iHQjG+4kwiE0xna1flZA6l32pH3Agg9I/MY17ch0UDweKyLU/A+IHzp3wQgCOw1uiayLfBsqBISeN4+lgtagIOTRENwqUen4mMQbqkyVQxgWOdcGp32AhAvsxhE/2vKlOnlQuCv+cjQNykVSoaCFoWVOyKaFETMMcSEUzYv3+/9xUmEwfpSBNMJz0Gt4NMCMSIAJKP7OJM3IdiB1TWyhL3GSkIZ/82adIk9343M8uC4nCCq1evxgixa3PUBByCIhrBtXXr1g2fYMtWiso8CaZH+06o4f9HgB0dlZqWOnnbbbc5hTUyD3q1kQiYezfLhMg/89SpU9m0adPcX4UahC+CUdQEzNH0fKnxU/lI6+LrTMTWBNPtZOIUau2LTB5d0x8INIr7EPjCtdaLuE87Am6VC2yI57OgQgzCF50ZUROwT0W0F1980fmqKLCQYHrR6abrQkCgU/0F2kzWEelq6JeYuA+ZCrjZullwtCNgAuzNquEMv3wWVMySlFETMJVl5Nmi8ET6Sh1GkCIvmE4ZMVkObM9kQiB0BLrRX8j3iTJm5j8uAAzxKFbDnbrcrB1kMaCJkk8527Fjh3unG3OBG7G1LKiYFdGiJmBLxq6rGubVV191ub0STA+dZtS+Vgh0qr/Q7D7NxH1WrVrlDkYouho2Aub+Jsbz4Q9/OHvttdeyQ4cOub8jvXSkXGDLgkIXItYDSaMmYNwAfI2rTsa27RerbfvqE2jrxQcmihACdSPQjf7CSG1kFcz7lxf3YSdaRFLVCNhU0Eh7o/wY4kWKsl0hBu2aMmVKxsG1MSuiRU3AlozNgB89erSS+cwkI70M7QkJplcCsW5aEwKd6i8UaZaJ+5AJRDyEd6SIuE87H3CRZ1sWFJkZPDNGi5qAq1ZEo04ePzMrYFa7rHqLfN1jnAhqc/oIdKq/0AkijaX3uDqIjbQ6ybsMArYsqJgV0aImYLY+s2bNcpVmqOOXZRcuXHC+XhNMx8dMEjpJ3zIhECsCveovFOk3bkEWLXlxH9wJjUHqMgjYsqDIxOD9jNGiJuAqFNHIK2ZgyXZg0vAVl2B6jFNbbW5EoFf9haKIFhH3KYOALQuqriB80f53cl3UBMxXFqc9xgq4F82FRsF0tk7I3JVVetnJoOhaIVAFAr3qL3TaJvQaCLKZuA/Skfhre3lP822wLCgONzh8+HCnzQvi+qgJGAQtF7CXZGwCbFS0EVEliICOg4/KuiBmhBqRLAK96i90AwzkS8GSCVSVKe5jWVCIyB85cqSb5nn/TfQEPH78ePeFZQA6VfNvFEwnmZxAW14az/sIqQFCoCQE2m372+kv9NKMRnEflAJJWetlhwmpk6EUsyJa9ARsydhsQdiKFDX8VAyeBNOLIqbrYkegHQG301/otf+4DClnJrsII8bCbpOqt27MsqAmTJiQnT9/vptbeP9N9AQ8ODiYMbE6ScbGN0UCOROCLRG/lWC697moBlSMQDsCbqe/UFbzIE58w7j8sG7FfSwLinvEqogWPQHPmTMno0SY7Uy7LymBNgZegullvUq6T0wIlKG/UFZ/G8V9OKqLdDUKKoqWM+ezoKiii1GPJXoCLqqIxteSQBuDxmAjYSnB9LJeJ90nBgTK0F8ou59IubIbJRCOUehE6icH2LazfBZUL0H4ds+p8t+jJ2COT8GnxJeTFJdGk2B6ldNH944JgTL0F6ror4n7cEQ9K2NWwENDQ4XEfSwLCimCGKtUoyfgkRTRWO2y6jWxEFLLcPoX3eJUMdl0TyHgC4F2PmBf7bLn4hNmR2vvK6tgVsMjEevtt9+eUbkaqyRl9ASMQDR5hsjRIUtn1iiYTqCtkywJ35NRzxcCZSMQOgHTX1bD7GjJligi7mNZUJ0E4cvGtZf7RU/ApohmkpT4hfApkemASTC9l+mh36aEQAwEbHg3ivuQ6wvJNor7WBYUK+XHHnssuuGKnoARzJk3b16G+hKZEHnBdHzCMQ5KdLNIDY4CgZgI2ABlgcUO18R9yHTCjWgZD5YFFasiWvQEbMnY5PNazTk+IwmmR8EJaqQQaIsARVOQsO1qqZ5jsUXuvmVBEd8hsyk2i56A87mAnC+FL5ivoQJtsU1FtVcIjIxAo7gP7kVWwsR7YlVEi56A+ToODAy4kYs1GVsvnhAQAsUQwBXBahjXBPbBD34w+/vf/+5Ww/v37y92k4Cuip6AwbIMRbSAxkRNEQJCoA0CiPtQA8AOGLvrrruci6IXcR8foAdLwBzSRw4vRpXM9OnTW+IzevRol7IiEwJCoL8R4GSMmCpcgyVgU2ZiOq1ZsybbsGFDy5lluYD9PfXUeyEgBAjAI00bSwwoSAI+d+5cNmnSpGzx4sXZ7t273akXly5dajm7jKzJfOBIa5kQEAL9hQAlzJzM/MUvfjFD1ztvpnOc/zv45b777nMCQOPGjfMGVpAEvGPHDqds9vLLL2c///nPHQnz5/nz5zcFyo6njrUaxtvo68FCoA8QIEYE4X7lK18Z7u2ePXsyhIDInKKWwBcJB0nArGjPnj3rVr3mC0ZGcvv27U2nC7XgGMLMMiEgBIRAHgEIeO7cucOnnNu/kbJ66NCh7Pnnn8+WLVvmBbTgCPjEiRPuSCAj3IsXLzrR9HZuCC/o6aFCQAgEj0ArAt68eXO2atWqDBW2lStXeulHcASMDN3GjRtvcDng18UNIR+vlzmihwqBqBEQAXcwfGg64HrIB90OHDiQLViwwAXlcEnIhIAQEAJFEWhFwBa8b5fmWvQ53VwX1Aq40f2Q75BFMtF78OUw7wZg/UYICAG/CDQLwr3wwgtukUdcyWfmVFAEvGLFCieywUr3U5/61A2jBmAE5uSG8DuZ9XQhEBsCVinbrN0E5yDhiRMneulWUATcLF+vEZVm0UwvyOmhQkAIRIFAMxcEtQZbtmxxCz5S1M6cOeOlL8EQsPl5R0o3M4JmJezri+VllPRQISAEukaglQ+YG/ou4gqGgM39MFLBhV3jM2+v61mgHwoBIeAFgZEI2HcqWhAETK7v5MmT3eCMVHJsq2SqV44dO+ZlMPVQISAE4kJgJAK2tFdfi7ogCDh/XHarajcbcmVDxDX51Voh4BuBVgSMH5jFHDrivtyaQRCw7wHS84WAEEgXgWZpaFeuXHEBOMjX1+oXxEXA6c479UwICIH/ItAqu4p0V7SDZ8+e7Q0nEbA36PVgISAE+h0BEXC/zwD1XwgIAW8IiIC9Qa8HCwEh0O8IiID7fQao/0JACHhDQATsDXo9WAgIgX5HQATc7zNA/RcCQsAbAiJgb9DrwUJACPQ7AiLgfp8B6r8QEALeEBABe4NeDxYCQqDfERAB9/sMUP+FgBDwhoAI2Bv0erAQEAL9joAIuN9ngPovBISANwREwN6g14OFgBDodwREwP0+A9R/ISAEvCEgAvYGvR4sBIRAvyMgAu73GaD+CwEh4A0BEbA36PVgISAE+h0BEXC/zwD1XwgIAW8IiIC9Qa8HCwEh0O8IiID7fQao/0JACHhDQATsDXo9WAgIgX5HQATc7zNA/RcCQsAbAiJgb9DrwUJACPQ7AiLgfp8B6r8QEALeEBABe4NeDxYCQqDfERAB9/sMUP+FgBDwhoAI2Bv0erAQEAL9jsB/AA/vHNuSTwaJAAAAAElFTkSuQmCC)
Deinen Winkel \(\beta\) findest du auch bei M, ebenso ist die Strecke MN bekannt. Jetzt kannst du \(\beta'\) berechnen. Und \(\Delta\beta=90°-\beta-\beta'\).
Ich habe zwei Punkte M und N zugefügt.
Deinen Winkel \(\beta\) findest du auch bei M, ebenso ist die Strecke MN bekannt. Jetzt kannst du \(\beta'\) berechnen. Und \(\Delta\beta=90°-\beta-\beta'\).
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Sonstiger Berufsstatus, Punkte: 225
Sonstiger Berufsstatus, Punkte: 225
Kann ich dann β′ mit dem Kosinussatz berechnen ? ─ maya2605 27.03.2023 um 13:54