[br][br]Die Einheitentabelle kann dir dabei helfen, beim Umrechnen von Flächenmaßen den Überblick zu behalten.[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAA9IAAACsCAYAAACXU5TyAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAABPuSURBVHhe7d1RbB1XmQfwyRYpFSlxlQrkKlHzSEm17gvaxtGWl6qVypZCUzekAh5XG7XwkqZUivqIuuqybyWoKx4BtWotKi2FlfaRrmJ4jFGz8OimFRGIqC4NWiRQ9n73zsTjyfj6Hsex78z5/aSjO2Nf2zn5nztzv5m5Z/ZcGygAAACAifxd+QgAAABMQCENAAAACRTSAAAAkEAhDQAAAAkU0gAAAJBAIQ0AAAAJFNIAAACQQCENAAAACRTSAAAAkEAhDQAAAAkU0gAAAJBgz7WBcvm6hScWyqV8zd49W1z+3eVyLT/6r//6r/+50n/913/9z5X+63/O/Q8nTp4oTnz1RLk2XmshfXD2ULmUryP3HSkuvnuxXMuP/uu//ut/rvRf//Vf/3Ol//qfc//D6TOni+cGbRKthfTDDz0yfNy7d29x+6DlyBGp/Pr/17/9rbh69epw+cCBA8WVK1eKT9z2iWLfvk8Ov5YT+ctf/vLPifzXyF/+8pd/jlY/+mj4+OSTx4tTz5waLm9m7BnplIocum7p/FKxcPypcm1kfv5osfjWYrlGn8k/b/LPm/zzJv+8yZ+wlfrXZGMAAACQQCENAAAACRTSAAAAkEAhDQAAAAkU0gAAAJBAIQ0AAAAJFNIAAACQQCENAAAACRTSAAAAkEAhDQAAAAkU0gmWl5eLc9/7/vW2svJe+Z3ueOk7LxVHPntfcXD20LCdPPF08fZP3y6/CwBpYl/4wvMvXN+vRPuXfz7VyX0kt45xkie5M07X6xKFdILlC78eBl6191ZWyu9MvzgIcOyBY8MDAKurq+VXi+KdX7wz3KDFI/3wox/+eN0OS7bArRLbm9i3xGNdvBF6+sTJdfsbbr1p3f4bJ3mSOxvpS12ikM7E6oerxYeD9uAXHiz+679/Xnxw+f3i4m/fLebm5obff+k7/zp8BIBJVW+Avv6Nrw33KbFviX3MzMzM8IzTuVfODb9P3oyTPMmdjfSlLlFIZyIG6utvvla8/sZr1wdpbMi+Nti4hZUOnV0HYDo8+81nhm+CXv7uy8N9Soh9zJcef2y47PJNgnGSJ7mzkb7UJQrpjFQDte7OO0cbNgDYirZ9S/WmGSrGSZ7kzkb6UJcopDP30/8cfaA/jgwBwHaoJouZu//GN0pQMU7yJHc20rW6RCGdsfggf7Uxe/ZbzwwfAeBmVHe1OHz4nuGlndDGOMmT3NlIF+sShfQtEBuImImuPnNmNTBCfVbNmP27EhuXRx/54rqfi2ngm7MdxuQN8dz6dPHRYpa7+t8ZJ/6NcTuCcPbFs62XV9AvMY5iPNXHTNuMiePEc6PVf0e0GIvx9RhXdI9c+2Ea9i3xvOpvx+ci2V5t2/G2LMcxTvohMmiOhWjxtfhec7st9+m2m/lMw9joal2ikN5mMZhODQZOfQMWG4vHvjSaWKHpnV/8z/C5MVBj8MZ08HVxdCYGVgzcan3+H44Nnxt/qy4Gawza+ougTfxc3HYg/m4cDXREsP9i/MQ4at5OIMZAjJcYU82xVxcbyNgoxnPbxleMqfh6220umF5y7a/d2LfE74jnhf/4was+MrTNNtqO17OMs3wpjJPuif/narvdHAshvhbf+/73Np4RW+7TbTfyqahL0iikt1kMmPqgi6MqMe3/RuK5UXg3B2pTtQGK1hyoTfHmOJ7fJn725FNPXx+s8e+j38aNh0qMixiHG42tlIlBYgO72d9jOsi1v3Z63xJ/J35HiDfJGx08Zmvi/3az1198P/WWMcZJt8QBzer/bzPj/m/lPt12Op+6nf7b8bNdrksU0tsoBlN9oEx6VCUGa7yhjcET91GLdv5X5284WhdHdmLAxRHn2BCNe27b2aNqsMbfU0TnoxqTkXk1ZqLVb0cRYiNWTfLQFAeD4jKbGDPxc/XfE605zp297Aa59ttO7Vvi78S+JX6HN8nbL7bhkVFdc3seGUfWm735bWOcdEPso+OAZl1sw+P/v8oibjUVOUYezUya5D7ddiqfNjv1t+Nnu16XKKS3SVy2UN/RxcYtZUDEAKy/aa0GZQzkulh/7Y3X122I2p7bPPLTh8HK1sX4aGbeNkY3OmIYYgcdYyd+ril+T31Mjvs9TBe59tut3rd4k3zrNd+Axuuyue2OjOOerFtlnEy/5qXakVccAI3//0ocGB2OhTcmGwtyn263Op9xbvXf7ktdopDeBnHJQrRKHIWJjduk4vnNIzchBmDz63ET+xigTc3nxgCNVvn2mReGgzXEv7WaCKDeYpIA+id2rBvtvGI81dXHTKr6vf9u5vcwXeTaXTuxb6neJIe4Kqtt3xJfZ2vi/7Z+kD7yqL+5rRu3rR/HOOmG+hVj8f99s4WH3KfbTuSzkZ34232pSxTSN2Fm8AYzdnD1D9HHjiyOwqRoG6yV5j32xj23eRPzDz/c/MVC/z34hX8sl24UG7r6BvC9lZVyqV110KhtgzfpJUNMH7n2k31L9600tsnxpnWcrdyX1ziZflFw1IuQcTlMSu7TbTfzMTYmp5C+CauDARFHVCpRkMSlVVGcpEh5furvrkRxX312YaN28bfvls+mT+45fLhc2ro4YBRHBuOg0WazL9Idcu23ndi3xH6jbX9Sb6kHl1mzfOHX5dLIZtvzubm/L5cmZ5xMv/dW1t/KaisHTJrkPt12Ip+N7MTf7ktdopC+CTHpQ/0IYUwEkfL5g0rziM0421EUkZeU8dUmzlTGpVeTXA5Ed8i1/+xb+me73zAH42T6Nc/kbcc4kPt02818jI3JKaRvQhTOTXGGuu3r49yKHSNUbmZ8RZF17pX1E5xUszw3jxy2TVbFdJJrHuxbmIRxkie5T7fdzMfYmJxC+ibFZwPqEz7EG1SXSNIXcYVF/YxlFFvVLM90l1yhm+qvW/JlHMB0UEjfhJgdM24xEG8+6x+2j88dxmWT0HXLF9bfk/TZb21caJlgpDvkCt0wd//6zzyvfvhhudQu9Yo4uqE5DjabGBTYGQrpm1C/5DFud1W/FCLOSlfTukNXNY96b3S5TzxvK/MDsDvkCt1wuPH5w/qtsNr82vuOXmqOg/qtsIDdo5DeJjFj97/9+/p7R58ykQ8d15xEYqOzHfF5W2O9O+QK3RAHuepXvMVrdaMr3uJ7blfXTzEO6vcIj+2yKx9h9ymkt1Fs5OpnqWOn5vPSdFnzJvsxnutnKOOqi5j52Q69W+QK3dGcuyBer833FlFAP/rIo+UafdSc+DHGQPPuMVWB/egjX3RQBXaAQnqbxcRj9TepsSHb7FIsmFZxcKg+nmMnffLE08XB2UPDFjvranzXJ91juskVuiPOSNfPRoYolqrXa7SqoKqfvaZfmpPbhniPeeSz910fB7EcBbaPFsLOUEhvs7j85tXGzeW3ckssmBbN8dwmbqwfZ002+qwt00eu0B3x0bHNiuQotmMCVK/X/ortsYObMD0U0rdA3EqmfilWHCWOz0tDF8V4Pv+r8zdcXhhihx63TarOljgb0h1yhe6I4jiK5JjYtPl6jNdpHPSKFrxe+y222bHtju1082M6IS4Bj3HSvBQc2H57rg2Uy9fF5SHh9JnTxXODBjlYOr9ULBx/qlwbmZ8/Wiy+tViu0Wfyz5v88yb/vMk/b/InbKX+dUYaAAAAEiikAQAAIIFCGgAAABIopAEAACCBQhoAAAASKKQBAAAggUIaAAAAEiikAQAAIIFCGgAAABIopAEAACDBnmsD5fJ1D3z+6PBx/8z+Ymb//uFybmbvni0u/+5yuZafHPt/4K4Dxc/e/nm5NjI3N1fs2/fJci0f8h+Rfz7kv0b+I/LPh/zXyH9E/vm5dOn94eOXv/J4cfbFs8PlzbQW0gdnD5VL+Tpy35Hi4rsXy7X85Nj/ez93b/Hxnz4u10buGmxcL1xYLtfyIf8R+edD/mvkPyL/fMh/jfxH5J+v02dOF88N2iRaC+mHH3pk+Lh3797i9kHLydWrfy7++re/FgcOHCiuXLlS7Nu3r/jEbbeV3+2/nPvviKT85S//OvnLX/7yz4X85Z9r/pXVjz4aPj755PHi1DOnhsubGXtGOqUi74uFJxaKpaVflmtFsfiTN4v5Y/PlWv/l3P+l80vFwvGnyrWR+fmjxeJbi+Va/8lf/vJfI3/5y1/+uZC//HPNv7KV+tdkYwAAAJBAIQ0AAAAJFNIAAACQQCENAAAACRTSAAAAkEAhDQAAAAkU0gAAAJBAIQ0AAAAJFNIAAACQQCENAAAACRTSAAAAkEAhDQAAAAl2pZA+OHvoejt54unyq5uL59Z/tsteeP6FdX1JbSsr75W/qdva+jauHXvgWPmT3Sb/kba+jWvyHzX5d5v8R9r6Nq7Jf9Tk323yH2nr27gm/1GT/3RxRhoAAAASKKQ7aGZmprjzzplyjdzIP2/yz5v88yb/vMk/b/KfPgrpXfLyd18uPrj8/kRtbm6u/KmRsy+eHb6Y+ubBLzzY2v96O/+r8+Wzu03+N5J/e5P/WpO//PtA/jeSf3uT/1qTv/ynkUJ6yp373veL5eXlcq0oHvvSY8XXv/G1co2+k3/e5J83+edN/nmTf97k3w0K6SkWEwqce+VcuTa6pCOORpEH+edN/nmTf97knzf5503+3aGQnmIxs9/q6mq5Nrqk4/Dhe8o1+k7+eZN/3uSfN/nnTf55k393KKSnVFzS8c4v3inXRp8fcElHPuSfN/nnTf55k3/e5J83+XeLQnoKtV3SEZMTkAf5503+eZN/3uSfN/nnTf7do5CeQi9956V1l3Q8+61nXdKREfnnTf55k3/e5J83+edN/t2z64V0XL5wcPbQRK1+qUNf/eiHPy7e/unb5droko5nv/lMudZvk4yF+P/pM/m35141+feX/OXflnm9yb+/5C//tszrTf791eX8nZGeInEUKo5GVVzSkRf5503+eZN/3uSfN/nnTf7dpZCeIt8+s36WPpd05EX+eZN/3uSfN/nnTf55k3937XohHZcufHD5/YlaPLev4nKO+iUdc3Nz2VzSUZlkLPR15kL5y1/+8q/Iv73Jv7/kL/+2zOtN/v3V5fydkZ4CcRQqjkbVvfqDV8sl+k7+eZN/3uSfN/nnTf55k3/3KaSnQHwuIl5MFTdez4v88yb/vMk/b/LPm/zzJv/uU0jvsricoz4TXY6XdORM/nmTf97knzf5503+eZN/Pyikd1EchYqjUXUu6ciH/PMm/7zJP2/yz5v88yb//lBI76J4Ea2svFeuuaQjN/LPm/zzJv+8yT9v8s+b/PtDIb1L4ubjLunIl/zzJv+8yT9v8s+b/PMm/35RSO+SF55fP0vf8vJycXD20MSt/iLsi9i4tPW13o49cKx8drfJ/0byb+9zW5N/t8n/RvJv73Nbk3+3yf9G8m/vc1uT/3RRSO+S+iUd5Ef+eZN/3uSfN/nnTf55k3+/KKQBAAAgwZ5rA+XydXEKPZw+c7p4btBysvDEQrG09MtyrSgWf/JmMX9svlzrv5z7v3R+qVg4/lS5NjI/f7RYfGuxXOs/+ctf/mvkL3/5yz8X8pd/rvlXtlL/OiMNAAAACRTSAAAAkEAhDQAAAAkU0gAAAJBAIQ0AAAAJFNIAAACQQCENAAAACRTSAAAAkEAhDQAAAAkU0gAAAJBgz7WBcvm6Bz5/dPi4f2Z/MbN//3A5F1ev/rlYXl4u14rinx77YnHlj1fKtf7Luf8H7jpQ/Oztn5drI3Nzc8W+fZ8s1/pP/vKX/xr5y1/+8s+F/OWfa/6VS5feHz5++SuPF2dfPDtc3kxrIX1w9lC5lJ/7758r/lgbOHd86o7iN//7m3Kt/3Lu/72fu7f4+E8fl2sjdw02rhcurG1Y+k7+8pf/GvnLX/7yz4X85Z9r/k2nz5wunhu0SbQW0g8/9Mjwce/evcXtg5aT3I/IOCLpiKT818hf/vKXfy7kL3/5r5F/PvlXVj/6aPj45JPHi1PPnBoub2bsGemUirwvFp5YKJaWflmuFcXiT94s5o/Nl2v9l3P/l84vFQvHnyrXRubnjxaLby2Wa/0nf/nLf4385S9/+edC/vLPNf/KVupfk40BAABAAoU0AAAAJFBIAwAAQAKFNAAAACRQSAMAAEAChTQAAAAkUEgDAABAAoU0AAAAJFBIAwAAQAKFNAAAACRQSAMAAEAChTQAAAAkUEgDAABAAoU0AAAAJFBIAwAAQAKFNAAAACRQSAMAAEAChTQAAAAkUEgDAABAAoU0AAAAJFBIAwAAQAKFNAAAACRQSAMAAEAChTQAAAAkUEgDAABAAoU0AAAAJFBIAwAAQAKFNAAAACRQSAMAAEAChTQAAAAkUEgDAABAAoU0AAAAJFBIAwAAQAKFNAAAACRQSAMAAEAChTQAAAAkUEgDAABAAoU0AAAAJFBIAwAAQAKFNAAAACRQSAMAAEAChTQAAAAkUEgDAABAAoU0AAAAJFBIAwAAQAKFNAAAACTYc22gXL7ugc8fHT7un9lfzOzfP1zOxe9//4fiL3/5S3HHp+4oPv7Tx8WnP/Pp4va9e8vv9l/O/f+/Qb//MOh/qPq/d9D3zwz+D3Ihf/nLX/7yl7/85S9/+eeSf+XSpfeHj1/+yuPF2RfPDpc301pIH5w9VC7l68h9R4qL714s1/Kj//qv//qfK/3Xf/3X/1zpv/7n3P9w+szp4rlBm0RrIb3wxEK5lK/Zu2eLy7+7XK7lR//1X//1P1f6r//6r/+50n/9z7n/4cTJE8WJr54o18ZrLaQBAACAdiYbAwAAgAQKaQAAAEigkAYAAIAECmkAAABIoJAGAACABAppAAAAmFhR/D/QenRWeAbkewAAAABJRU5ErkJggg==[/img]
Willst du eine Fläche in ein anderes Maß übertragen, dann trägst du die ursprüngliche Fläche passend in der Tabelle ein. Willst du z.B. 7 km² in m² umrechnen, trägst du 7 bei km² und E ein.[br][img]data:image/png;base64,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[/img][br][br]Anschließend füllst du die fehlenden Spalten mit 0 bis zum E der Einheit auf, in die du umrechnen möchtest. Dann kannst du ganz leicht die richtige Zahl ablesen. Wir suchen in unserem Beispiel die Zahl in m².[br][img]data:image/png;base64,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[/img][br][br]Wir können also ablesen: 7 km² = 7 000 000 m².[br]