Erweiterung des Verteilungsgesetzes

★☆☆[br]Wie groß ist der Flächeninhalt der Figur in der Skizze?[br][br][img]data:image/png;base64,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[/img]

17 cm² 72 cm² 70 cm² 81 cm²

★★☆[br]Mit welchen Termen kann der Flächeninhalt der Figur in der Skizze berechnet werden?[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZcAAAHiCAYAAAAkiYF/AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AACGhSURBVHhe7d0JeFSFuYfxSQAhgUAUtKxWrRuCUHYRRCyiRESsaF24FlEEsVVREVHcSqtXW5V7tRAwLBVRhAtel7ZCW6XeurApm1oUxYU9CwmQsISQ7z7nJDOZOZnky5cc5BDe//P8nsmcmUnbe5N5M0tCSBhjjDGfF/IeYIwxxmo64sIYY8z3ERfGGGO+j7gwxhjzfcSFMcaY7yMujDHGfB9xYYwx5vuIC2OMMd9HXBhjjPk+4sIYY8z3ERfGGGO+j7gwxhjzfdWKy7Kly2Rq+lSZMnmyTJ2S7kqfki5T0ktOAbupMmXKVEmf/EeZOvl5mTplsqRPcb6+wqYAcL4X0ktM/uPz8vLLc2T7jkzvXXQgZo7Ll19+KSe3aSOhUAjwXb3EkCTVDUlSvRIN64YkGUCM8PeF8z1z7z1jpKjooPeu+oivynEpLi52T//6179Kg6QGJXcGdRPL3TkANZGcFJKTTjhOftSsgTRtXEdS64XkeMdxABzO90SzpJC0bFJP6oVCctWggVKQv8d7l33EV+W4hLdo0SJpmJIioYSQtDrrDLn25ptk+K9ulxtHj5L/uH2U3Dj6NsDsl6NHyU23j5RfjRkp5/VsL6mpdaTDOSfL2NuHyfg7bpZxvx4O4NfDZcJdI+S6y/vKyc2SpG4oJFdfeYXk5+d776qP+MxxWbx4sTRs1Nj9KbPPwDRZteFL2b5nt3ybkyXf7syS73KA6siWb7IzZcvOLTL81uulTt2Q/PzyflKQ9Z0U7t4hB/K2AcjbJgf375SFL02T01umSkIoJEOuHFx74tKoNC4XDRoo/970newqOig79ua7MoFqyHK+fvLzZGdBttw6+j8ksU5IrrriYinekyVSuFtkfy6AA3kisk/enDdTzmiVKom17ZFLOC59B14m6775WrL37ZUtu3KBatu6K1e27cqS7F3bZcTI66VuXee55J/JwdytIntzRPZkAsjPEinaI2++Ol1Ob9HYjcs1V15RO15zcZ8WSykfl827cmXz7vJ3GkBVbcvLluxdO+TWUTeUxOWKflKYt0VkX7YU52cCCMdl7nQ5vWUT92kx55ELcQEqQVwADXEBzIgLoCEugBlxATTEBTAjLoCGuABmxAXQEBfAjLgAGuICmBEXQENcADPiAmiIC2BGXAANcQHMiAugIS6AGXEBNMQFMCMugIa4AGbEBdAQF8CMuAAa4gKYERdAQ1wAM+ICaIgLYEZcAA1xAcyIC6AhLoAZcQE0xAUwIy6AhrgAZsQF0BAXwIy4ABriApgRF0BDXAAz4gJoiAtgRlwADXEBzIgLoCEugBlxATTEBTAjLoCGuABmxAXQEBfAjLgAGuICmBEXQENcADPiAmiIC2BGXAANcQHMiAugIS6AGXEBNMQFMCMugIa4AGbEBdAQF8CMuAAa4gKYERdAQ1wAM+ICaIgLYEZcAA1xAcyIC6AhLoAZcQE0xAUwIy6AhrgAZsQF0BAXwIy4ABriApgRF0BDXAAz4gJoiAtgRlwADXEBzIgLoCEugBlxATTEBTAjLoCGuABmxAXQEBfAjLgAGuICmBEXQENcADPiAmiIC2BGXAANcQHMiAugIS6AGXEBNMQFMCMugIa4AGbEBdAQF8CMuAAa4gKYERdAQ1wAM+ICaIgLYEZcAA1xAcyIC6AhLoAZcQE0xAUwIy6AhrgAZsQF0BAXwIy4ABriApgRF0BDXAAz4gJoiAtgRlwADXEBzIgLoCEugBlxATTEBTAjLoCGuABmxAXQEBfAjLgAGuICmBEXQENcADPiAmiIC2BGXAANcQHMiAugIS6AGXEBNMQFMCMugIa4AGbEBdAQF8CMuAAa4gKYERdAQ1wAM+ICaIgLYEZcAA1xAcyIC6AhLoAZcQE0xAUwIy6AhrgAZsQF0BAXwIy4ABriApgRF0BDXAAz4gJoiAtgRlwADXEBzIgLoCEugBlxATTEBTAjLoCGuABmxAXQEBfAjLgAGuICmBEXQENcADPiAmiIC2BGXAANcQHMiAugIS6AGXEBNMQFMCMugIa4AGbEBdAQF8CMuAAa4gKYERdAQ1wAM+ICaIgLYEZcAA1xAcyIC6AhLoAZcQE0xAUwIy6AhrgAZsQF0BAXwIy4ABriApgRF0BDXAAz4gJoiAtgRlwADXEBzIgLoCEugBlxATTEBTAjLoCGuABmxAXQEBfAjLgAGuICmBEXQENcADPiAmiIC2BGXAANcQHMiAugIS6AGXEBNMQFMCMugIa4AGbEBdAQF8CMuAAa4gKYERdAQ1wAM+ICaIgLYEZcAA1xAcyIC6AhLoAZcQE0xAUwIy6AhrgAZsQF0BAXwIy4ABriApgRF0BDXAAz4gJoiAtgRlwADXEBzIgLoCEugBlxATTEBTAjLoCGuABmxAXQEBfAjLgAGuICmBEXQENcADPiAmiIC2BGXAANcQHMiAugIS6AGXEBNMQFMCMugObwxaW4uNh7KGbO5dp1okdcEBjEBdAcvrhE74svvpAPPvhAli9fLpmZmZHjhw4dirleZSMuCAziAmgOb1z+8Y9/yDXXXCPnnHOOtGrVSn784x9L9+7d5Y477pD169d7r17piAsCg7gAGn/jEv1U16xZs+TEE09079vj6dGjh6xbty5yu+jTeCMuCAziAmj8j4uzDz/8UNq0aePeryckJEjv3r1l2LBhkUcx4cDccsstsn///pjbVjTigsAgLoDG37g427dvnxuScEDGjh0re/aUfb4NGzZI165d3ctSU1NlxYoVkcsqCwxxQWAQF0Djf1zWrl0rKSkp7n16r169JDc313sVmTx5ciQ+Cxcu9F4cd8QFgUFcAI3/cUlPT4+EY8aMGd6LpaCgQB555JHIdd588033eGWPWpwRFwQGcQE0/sbl4MGDMnToUPf+vEmTJvLee+9Jfn6+bNmyRdasWSMZGRnSv39/qV+/vnudZs2ayWeffebelrjgqEFcAI2/cXFC0r59e/f+/Pjjj5fBgwfLtdde6779ODk5OfJoxdGwYUOZNGmSG6TwKgsMcUFgEBdA429cNm/eLE2bNo2JiFfjxo3l6quvltdee41fosTRibgAGn/jsnTp0siL+c5p8+bN5eSTT3Yfudx0000ybdo097f0o989VtURFwQGcQE0/sbFeXE+/PTXhAkT3EcyW7dulezsbPctytGr7CmweCMuCAziAmj8jcu8efMiL9Y7bzeuaFX5jXzviAsCg7gAGn/j4tyfJyUluffnDz30kHvM+tePKxpxQWAQF0Djb1ycp8Bat27t3p87r7M4T4vF28aNG93f3J87d64UFRV5L4474oLAIC6Axt+4OO/+Gj58uHt/npiY6L6In5OTE3Od7du3y2WXXeZex/lLyc6f46/KiAsCg7gAGn/j4mzVqlXun9YPv/V40KBBMmfOHPnnP/8p8+fPlwEDBkQuu+CCCyp8dOMdcUFgEBdA439cnL3zzjsxgYnHeYvyypUrvTetcMQFgUFcAM3hiYsz51+evPTSS8tFxfkT/M6jmffff997k0pHXBAYxAXQHL64OMvKynL/vpjzByyffPJJee6552TJkiWRv5RseRcZcUFgEBdAc3jjUtmsb1EmLggM4gJojkxcrGFxRlwQGMQF0ByZuFRnxAWBQVwADXEBzIgLoCEugBlxATTEBTAjLoCGuABmxAXQEBfAjLgAGuICmBEXQENcADPiAmiIC2BGXAANcQHMiAugIS6AGXEBNMQFMCMugIa4AGbEBdAQF8CMuAAa4gKYERdAQ1wAM+ICaIgLYEZcAA1xAcyIC6AhLoAZcQE0xAUwIy6AhrgAZsQF0BAXwIy4ABriApgRF0BDXAAz4gJoiAtgRlwADXEBzIgLoCEugBlxATTEBTAjLoCGuABmxAXQEBfAjLgAGuICmBEXQENcADPiAmiIC2BGXAANcQHMiAugIS6AGXEBNMQFMCMugIa4AGbEBdAQF8CMuAAa4gKYERdAQ1wAM+ICaIgLYEZcAA1xAcyIC6AhLoAZcQE0xAUwIy6AhrgAZsQF0BAXwIy4ABriApgRF0BDXAAz4gJoiAtgRlwADXEBzIgLoCEugBlxATTEBTAjLoCGuABmxAXQEBfAjLgAGuICmBEXQENcADPiAmiIC2BGXAANcQHMiAugIS6AGXEBNMQFMCMugIa4AGbEBdAQF8CMuAAa4gKYERdAQ1wAM+ICaIgLYEZcAA1xAcyIC6AhLoAZcQE0xAUwIy6AhrgAZsQF0BAXwIy4ABriApgRF0BDXAAz4gJoiAtgRlwADXEBzIgLoCEugBlxATTEBTAjLoCGuABmxAXQEBfAjLgAGuICmBEXQENcADPiAmiIC2BGXAANcQHMiAugIS6AGXEBNMQFMCMugIa4AGbEBdAQF8CMuAAa4gKYERdAQ1wAM+ICaIgLYEZcAA1xAcyIC6AhLoAZcQE0xAUwIy6AhrgAZsQF0BAXwIy4ABriApgRF0BDXAAz4gJoiAtgRlwADXEBzIgLoCEugBlxATTEBTAjLoCGuABmxAXQEBfAjLgAGuICmBEXQENcADPiAmiIC2BGXAANcQHMiAugIS6AGXEBNMQFMCMugIa4AGbEBdAQF8CMuAAa4gKYERdAQ1wAM+ICaIgLYEZcAA1xAcyIC6AhLoAZcQE0xAUwIy6AhrgAZsQF0BAXwIy4ABriApgRF0BDXAAz4gJoiAtgRlwADXEBzIgLoCEugBlxATTEBTAjLoCGuABmxAXQEBfAjLgAGuICmBEXQENcADPiAmiIC2BGXAANcQHMiAugIS6AGXEBNMQFMCMugIa4AGbEBdAQF8CMuAAa4gKYERdAQ1wAM+ICaIgLYEZcAA1xAcyIC6AhLoAZcQE0xAUwIy6AhrgAZsQF0BAXwIy4ABriApgRF0BDXAAz4gJoiAtgVhKX7TKCuAAVIC6A2dZdmZK1e6uMGHV9VFy2iuzLkuL8HQDyd4gU7ZY352ZExWUQcQEqU/LIZVvZI5dB/aQw14lLTpyf4IBjkxOXN+bOkNNbppbGZbAU5Od776qP+IgLAiJPtuXulOy8HXLryKGRuBxwH7nsdJ8OAFDytJg3Lvm1Ji6NUkrjkkZc4JutedmSk5cpI0eGH7n8rPRpMR65AGFStKvkabEWpU+L/dx5zWW39676iK96ceGRCw6DrXlZkrO75JHLcXVDMuTyfnJw5xaRvTkizk9sAEQO7pY3X54uZ7RIlTqhkPzCjUttec2l9JFLv0GD5Osd22SfiOQWFUruoULJK9IcqOBYqYNVlxt1Wnvtr5nCiu2MUtHxH9SBvVJQuFtGj75JGtYPybWD0qQwc7vIrlwp3pn9A8iSQ0GVEySZcRUFWXYwHMzeEaPIc74qZE+evPniTGnXuoUkO49cLr9S8nJqySOXRk1SJbFePenR72JZsHix/HPlSvnbRx9F/N1rabSlnvPhYyX+Ec8yj9Lj7yxb5p53TlXLY727fHl8K7xWVGhJ2MrKrCzH+b9XOR9H+zjiPc0nXp+UKjn/f598UrFVq8pEHf/XqlXlrdaslvejxJxfU5k1Ef9as1pWrFsj1173CzkuIVEu6d1XPn73ffn0g+Wy5v+WlvlXVSxzrX1/maz919KSU9VyWfdB1Tn/vcpbIZ9+WHWfOT5aWebDKFHHP49n6cclPooSPrb0Y/n3sk9iuMdcscdjrarQ+uVV88WK1dXyZcSaMiujrS1Vcn7DyrVlPq6qdRX66hPd1xGfyterqmZjtNWfxVrlOR/HN6s/L7Pmc9n2769k+tPPyalNW0i9UEiGXDZE8rJ2ee+qj/jMcVm0eLGkNj1J6qc2lSZtTpHmZ7aT1me3l9ZntZOWZ7eTlm3bSau27V3Ox9HnHa3bnRtz3j12zrll2pVp065Difalp6XCl5/cvqN7/uT2Uc7tWKZ92cc/7vDTSp3SoVNcp3aMp3PUaWc57add4usU3086dS3n9M7dIs7o0r1yXcuc2bVHDO/xs7pVovt5cZ3do2es7p7zcbTtcb6cc16viMj5nr2kXc/eVdbx/D7SotVPpEFiI/lRo+bS8azO0rltV+lydgWcy9p2la7ndIt8XMI53809Xl73GN3O6S7d23WXbu1KTkv0kO7tzyvjnG/XQ3qcW3bM+Tie8xwdesbo2eH8+Dp69Yro9VNFp94lflqmd+cLKtFHLuhSIvxxny4XRo71cXS9MFaXKKXHLuzWVy50TqN16yt9u19UqYt6/KxMd8dFJafu+ZLLf+bqV+a8aBe7+vUscXHP/lGc8yViLj+/9HLnVNG/l+MS6d/rUrmkt+7S3gPiuyB8muYa0GdARFqftBgD3NPLXAOc0wtLXHbhwPj6DpRB/a6Qbu16SGq9E9xnkK5Ku0rysmtDXBYtliYnnCj1jz9R6jdrLqGUEyShUaqEHCmpkhDjeJdzWfiYe73KONcJ8x73XrdRk9LjTSoQfVmc21Z4WaqEGjYp4T0eT/i6Xs7n9p4P8163Qo3jCH++0v8d4Y8j16/if05y4zLey7y814t3G+/nc0+jjsUT/b+rUWMJJTWW+kmp0qheE0kONZRQKFFCoYTS0zDnfImEOMfii397/4VKVXQ+nvB1tOt5xbtN9Oeqjor+MxAkdUJ1JSWxifv/o6vShtSuuCQmpUiXiy6WyS++Iq+88Wd5ceEb8uJrb8jsBW/Iiwtej/Gn//lfebHUn+a/Vs6sKDPnLYyIdyxsxqsLXDNfXSgz5i6Ia/rc/3FlvDLfFT7veOHleRHOZdEfR5+fNufVcqa+NFemRXHOx5j9Slzps1+RKS++HNfkP80pM+ulKM75sJfkjx7Pz5ztCn/83IwXS47NKPn4uekezrFS/z39T3H9V8as8l6Y6ZpUiWenzSgzdbo8E096RoynS/0hPUN+Py1D/jtjlvS6oL8kJtSRjqd3lN9PfEae/d0keXriMxX6w2+ertDvH/uD6qlHf++K/tjx5CNPlfOfDz8Z8cRD/xlzPnwsnscnPFGh3z34eMRvH/hdlU0c/9tyfnP/xEo9Nu43MR6977FKPTL20XIevveRKnvonocrNOHuh1wPjplQqQfuelA1/s4HYtx/x/gY4359f5Xc96txlRp7+30Vunf02HLuue3eSt096p4I7/mKOJ/3iosHywn1m7mhqVVxaXzCiRI6LlkGXjdUNuXukWIR2VvKeXE//HGQFRylnHezHw32FNvsdojIIRG5+dZfud80A/tcJru27Zb9Ow9IQdbeGsnPLIirssuOtD078o96u7fvOSo4X2dHiwO5hTLnhZeleaMWtTcuab+4XjZm7pT9IrKrKLh2l4p37KhzqHba5QjHZURJXNIuSJNdW3fJvpz95e54cfTz/gCAqjm0p1jmzni1dsbFeVosHJevd+S4j1byDorkOooAu53O6SGRg05cbrk9EpfczbnuN5T3J03gWFWYd1BeznildsYl+pGLExf3kUthVGCAasgrKh+XncQFiHHMxgWoLufpSm9ccjbnSj5xASKIC2BEXAAdcQGMiAugIy6AEXEBdMQFMCIugI64AEbEBdARF8CIuAA64gIYERdAR1wAI+IC6IgLYERcAB1xAYyIC6AjLoARcQF0xAUwIi6AjrgARsQF0BEXwIi4ADriAhgRF0BHXAAj4gLoiAtgRFwAnd9x2bBhg4wbN07S0tLkxhtvlNdff10OHTrkvZp5xAWBQVwAnZ9x2bhxo3Tu3Nn9PGEpKSkyffp071XNIy4IDOIC6PyIS3FxsXs6ZsyYSFRatWrlhsX5+Pzzz5f8/HzvzUwjLggM4gLoahqXcFi2bdsmbdu2dT9H+/bt5aOPPpKLLrrIPd+uXTv55ptvvDc1jbggMIgLoKtpXMKbP3++NGzY0P0cd955p3vMed3FOd+xY0f57rvv3GPhGFlHXBAYxAXQ+RWXBx54wL29E5gFCxZIUVGR9OzZ0z3WtWtX2bWr5HMSFxz1iAugq2lcwrEYNmyYe/vWrVvLunXrZP/+/W5UnGOXXHKJ92bmERcEBnEBdDWNS3jXXXede/tTTz3VfdeYM+epstGjR8vf/va3yPV45IKjHnEBdH7FZciQIe7tTz/9dNm0aZP34hqPuCAwiAug8yMuzusrgwcPdm9/5plnSmZmpvcqNR5xQWAQF0DnR1z27t0rAwcOdG9/9tlnS15envcqNR5xQWAQF0DnR1ycmPTv39+9vfM7LYWFhd6r1HjEBYFBXACdH3HZvn279O7d2719p06dvBf7MuKCwCAugM6PuDi/fR9+23GvXr28F/sy4oLAIC6Azo+4fP755+6ffHFuP2DAAO/Fvoy4IDCIC6Crblyif19l9erV7luQndtfc801Mdfza8QFgUFcAF114uL9RUgnLm3atHFvP2LEiJjL/BpxQWAQF0BXnbg4c/6E/siRI90X8i+99NLIn9fv06ePLF68WAoKCrw3qdGICwKDuAC66sbls88+i/wVZEdCQkLkNCkpSZ555hnvTWo04oLAIC6Arrpx2bdvn4wfP979lydTU1Pd2yYmJkZi89RTT3lvUqMRFwQGcQF01rg4r7dEv+ayZcsWefDBByNxcV7QnzVrlvsnYMLX875GU50RFwQGcQF01rjE2+zZs93b1q1b1/23XA7HiAsCg7gAOj/i8vzzz7u3rV+/vixcuNB7sS8jLggM4gLo/IjL008/HYnL22+/7b3YlxEXBAZxAXR+xOXxxx93b9ugQQNZsmSJ92JfRlwQGMQF0PkRl4kTJ7q3dd6C/P7773sv9mXEBYFBXACdH3F57LHH3NsmJyfLhx9+6L3YlxEXBAZxAXR+xOWRRx6JxGXp0qXei30ZcUFgEBdA52dcnKfFli1b5r3YlxEXBAZxAXR+xOXhhx+OxGX58uXei30ZcUFgEBdA50dcHnroIfe2zt8aIy6o9YgLoPMzLs5rLjwthlqPuAA6P+IS/bQYcUGtR1wAnR9xefTRRyOPXFasWOG92JcRFwQGcQF0fsQl/EuUzl9FnjRpkvdiX0ZcEBjEBdD5EZfnnnvOva1jzJgx3ot9GXFBYBAXQOdHXNavXy+DBw92/7lj51+oPBwjLggM4gLoahqXeP8QWLxjNR1xQWAQF0BX07j8UCMuCAziAuiIC2BEXAAdcQGMiAugIy6AEXEBdMQFMCIugI64AEbEBdARF8CIuAA64gIYERdAR1wAI+IC6IgLYERcAB1xAYyIC6AjLoARcQF0xAUwIi6AjrgARsQF0BEXwIi4ADriAhgRF0DnxOWVF+ZK80YtiQtQFcQF0JU9cmlOXICqIC6ALhyXH6WUxOXnaVfVsrjUS5KB1w6V73fukkMisldECoAachaOy4ALBsjuHflyIO+g7M3eByB7nxTni7w6c540Tyl5zeXKtJ9LXlatiMsiaVL6yGXA1dfJF1u2y57Cg5JdUChZe4HqySw4IFn7DkhB4UEZNXqMJIQSZVDfQZL1fY7kbsmTnE07gWNe9qYcyc8qkNnpL0UeuVwxYLDkZeV676qP+KoRF+eRSzOpm5IqP+nYRYaO+rWMuus+GXHHPXLLnUD13HzH3XLznXfLqDHj5Pze/aR+QrJ0OK2DjPzlbTLihltlxFAAjpG/HCWX9L5UmhyX6sZlcNqVkped572rPuIzx+XttxdJcuMT5LjGTaVek2YSqt9IQvUaSug4oKaSSyTWl1CojvuNA6AiCe7p5WmXS/7u8JPKwZk5Ll999bWc2ba91G3QSBqkpAK+SEo5XpJSUiW5caocl9RQEhLrSmJiotRJTHRPAcRKSEiQunXryr333iuHDjmvfAdr5rg4W7V6lWRkTJdp06bJCxkZgD9eKJUxvfTjFwBUID09XebPny85OTneu+hArMpxKS4udjHGGAvWgnjfXOW4MPbDzPkmCd43CmPMNl/iEr474C6B1Xx8JTFWG1bNuETnxIux6o2vIsZqz6oZF8YYix2vy7LoERfGWLVWUFAgzzzzjEyYMEG2b99OXFjMiAtjrFrbuHGjJCUlub/I9/bbb3svZsf4iAtjrFrbsGFDJC5vvfWW92J2jI+4MMaqta+++koaNmzoxuUvf/mL92J2jI+4MMaqNeLCKhtxYYxVa8SFVTbiwhir1ogLq2zEhTFWrREXVtmIC2OsWiMurLIRF8ZYtUZcWGUjLoyxao24sMpGXBhj1dq3335LXFiFIy6HefytJXY0Lvrr1vmXDt955x156aWXZN68efLuu+/K119/LV9++aU0atSIuLC4Iy6Msci8f3xy8eLFkpaW5gYkWrt27eSGG26QBg0aEBcWd8TlMG/v3r3uc9POH/kL6r91zVi8zZkzR5o2bRoJyplnnimnnXaa1KlTp1xsiAvzjrj4MOcnvUOHDsUcW7t2rdx3333SuXNnOeWUU+TUU0+Vtm3bSs+ePeWBBx6Q7777LnJbxoK2ZcuWyYknnuiG49xzz5UFCxa4PyQ5T4U5l02cOFFatGghCQkJxIXFHXHxYdFPJezZs0cefvjhmJ/44nn++edjbs9YUFZYWCiXX365+3V61llnyYoVK7xXcffee+9F/ioycWHeERcfl5ubK0OHDo0ExPnGvPPOO2XmzJkya9Ys9x9WGjFihAwZMsT96c+Z9zluxo70nNdZnGjUr19fJk+eHDke/joNn/JuMVbZiItPc77hnJCEw+JE5NNPP/VejbHA7/7773e/hjt16iQ7d+50j8X7AYjfc2GVjbj4tKVLl0belnnbbbfJ/v37vVdh7KjYsGHD3K/jgQMHRo4RF2YdcfFp48ePd7/JOnTo4D5d4CzeNyRjQd/YsWPdr2XnhfzMzEz3WLyv5W3btvF7LqzCERefNmDAAPeb7Kabbooci/cNyVjQt2TJEklOTna/np0fmpy303u3Y8cOeeONN3hBn1U44uLTevTo4X6TjRs3znsRY0fVnLfV33zzze7Xs/Oi/vXXX+++GSU9PV0yMjLkiSeekH79+kmzZs14KzKrcMTFp3Xt2tX9JnPehszY0T7nKa/w25Gr4s9//rP3U7BjfMTFp/Xu3dv9Jrvlllu8F8XM+R0CxoK66LfGZ2dnu49WnMg4vwDcsmVLOemkk+SMM85w37QyY8aMyAv6ixYtityeMWfExafdfffd7jdZamqq+9vLzm/ob9q0yf0JcPv27bJ582b5+9//LrfeeqvMnj1bioqKvJ+CsUDuwIEDUlBQ4P6C8O7duyU/P9996szhvG15+PDhsmXLFve63r9UwY7dEReftmHDBunWrVvkaQInMl26dJFevXpJnz593MvCL5L27duXtyozxmr1iIsPCz8VsH79ernrrrukdevW5Z6TDnNem3nrrbe8n4Kxo2rhRy7heX97nzHichj2+eefuwGZOnWqTJo0SZ599ln3z2i8/vrr8v3333uvzhhjtW7EhTHGmO8jLj/wwu/G4ekDxlhtHnE5DCMcjLFjfcSFMcaY7yMujDHGfB9xYYwx5vuIC2OMMd9HXBhjjPk+4sIYY8z3/T8anSOgKAsQjgAAAABJRU5ErkJggg==[/img]

c ∙ e + c ∙ f + d ∙ e + d ∙ f c ∙ d + e ∙ f (c + d) ∙ (e + f) (e + c) ∙ (f + d)

★★☆[br]Mit welchen Termen kann der Flächeninhalt der Figur in der Skizze berechnet werden?[br][br][img]data:image/png;base64,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[/img]

4 ∙ 8 + 4 ∙ 5 + 9 ∙ 8 + 9 ∙ 5 (4 + 9) ∙ (8 + 5) 4 ∙ 9 + 4 ∙ 8 + 8 ∙ 5 + 9 ∙ 5 (8 + 4) ∙ (9 + 5)

★★★[br]Für eine Flächenberechnung gilt der Zusammenhang (a + b) ∙ (c + d) = a ∙ b + a ∙ d + b ∙ c + b ∙ d.[br]Du weißt bereits, dass (a + b) ∙ (c + d) = 3 + 4 + 6 + 8 gilt.[br]Finde durch Probieren mögliche Werte für die Längen a, b, c und d heraus.

[br]a = 1 cm[br]b = 2 cm[br]c = 3 cm[br]d = 4 cm[br][br]Daraus ergibt sich:[br]a ∙ c = 3 cm²[br]a ∙ d = 4 cm²[br]b ∙ c = 6 cm²[br]b ∙ d = 8 cm²[br][br][img]data:image/png;base64,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[/img]

★★★[br]Überlege, welcher Zusammenhang gegeben sein muss, damit das Viereck zu einem Quadrat wird.[br]Finde heraus, wie die 4 Längen a, b, c, d dafür gewählt werden müssen.[br][br][img]data:image/png;base64,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[/img]

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