Volumen von Körpern

Aufgabe 1
Schaue dir das folgende Video zu den Körpervolumen an. Skizziere auf einem leeren Papier die verschiedenen Körper (ausser den Tetraeder!) und beschrifte sie mit den entsprechenden Begriffen. Notiere dir auch deren Berechnungsformel für ihr Volumen.
Lernvideo - Volumen von Körpern
Überprüfe deine Notizen mit den folgenden Angaben:
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AxgTAumWHHdzM/H3qPH8dy7/0W8Zaz1NkfErDXaAETExMNFKjE2VpRIhmtqm2H+EQ7OrkJgnuFx+PSzL1BWNv7J6x6FInOsqakJ+bcK0Tk4gtQnn5FKOcpqmB4vntpA+LBaYnBAElcp7t1VUD936aV1lF7e2IXLoLtjjb2Hj+BWYaGcOjkUJy5WPXA+hPzSSsQtWgk3b414+80ZL8lyufpoRdzV3lQvKlOV0s+dsA8ae1KEJs5HVasOp8+dF1MiTBbFiYsT4+YXlWDI2gHxi5bJW80bdr92dPdCa1sbnB0d0dHcINbHVhocrqaJiMPt6gZknL+Iurrxzav/IIoSF0srrHdp7OpDVOoiuHlp5BTzxlGKa7i4up29A8LDQlFfVoyREWVOJBIQGQcnbQgKq2px9lwmWlsn3tFRUeKqrqlB9vUcwMUTcxYtl7daBnxRIuckwcXZEQ1lRZJrNP5IbGMRkZgKe98QZF65gTPp6ejr75+QG1eMuFgE/uYv22HtHSCEZaopJqcLFzYDRcWif2AAdZLlUrK4SGh8Eryik7Dn0Pc4f/68qBoaL4oQF4WVm5uLippa+EbEIDAyRk6xHNy8vKWYJhzlUlG/o7UZg309Rpl90FSwJwUH3EYvW4ePP/kd8iYw6dy0i4vmdnBoCH/a9mf4z12AkLhEs696eBissPTwCxAxTExMDHQtjRjsN12jsTHgtAgM8lPWbcB/fPYlrt+4Ma4Bt9MuLt5sRkaG6AQYMjdFEQNbTQHdPBvdubpsYGAA2utrTDJJibHhgNsgLkAaHo89h49JAssRPYINYVrFxTqtpqZm/OW7nYhbulrM8zBdk4hMBU4uroiRSsGQYuP2hhqTj8Q2BqxjtLWzl+57MfqsHXE8/RxuSAIzpB1yWsXF3pBXrl1HY3c/4hevEJPLWjJsagmbOw+19fVoqK4UblFJlamPRBIYZ5aOTluChp5hsRCqIetDTpu4qPyS0jKxFO/aze+JmMTca+IfB2fACZRKjJyUt7W5CX1dXRgbHZFTlQ/beDl1eUVDs0GDbadNXGJi3PwCdA2NiolxaXotHY4I8mRtvZu7WO2st6tT+pjPCv20tNUFOYjQarB61Sp566OZNnFdzs7G2axreO7d/ypvmRlQYLHzFkEbGonujjb0drbLKcpmTPI0GXu+RkKoFps2voJYqcT7OKZFXNev30BRWRW00XOFm5hJsJtxdHKamDSkVSox9uhMPwpnMjAmZMHj5Ld/xIrURLy0/llERkTA2oB50KZcXKx6uHj5Mpp6BpDy5LoZ4Q7vh5YrOmUB+nt60FRTiV6dctdUZJdsXUsTLhz4Dk8kxeG5tauFsOzsDCvRT7m4srKyUdPaCa/QaOEaZhqs7woIj8KdsVEx5GxoYEBMVKI0KKy2hhqUXT2P5PBAvPz8c4iKioLDOLqaT6m4uqTSUfq5TNxz9hArtk7V6hZKgiVirsrPwN7bPwjDg/1irSAlQWG11lejpfQWwrxc8OaPXhMxlr2BFkvPlIrrkuQOm7t64RMWLdYonMmExifC008rSoydkutRCnTRHU31aCougNbRGv/0463CYhkSYz3IlIiLQSFH92776mtoE+YjKnmBnDJz4Qof7N/V3lgPXWuLIkYEUVicBbEkOxMh7vZ4752tCAoKklPHz5SIa2BgEDt37oKDt79YvsTFw7Jr4g2BlmtkeBhN1RXQtbdgTHJF0w2HvaXv/hopkUH48Za3JyUsYnJxsSa+oaEe23ftRtKq52a8O9TjofGVLJe9mCCE8zhM5yw4d+/eQXdHK47952d4ac0KbNzwMvz8Jt+BwOTiamlpxd6DhxCUOB/+kbGwd3SSU2Y2LDX6BYeLQbMsObJkNh3w2h2Sa87Y+RXeeuUFrH/mabG0zGwjdNY0qbjYNaO0rBSXrlzH4vUb4eapMdvxh6aAs1B7+vqjr1snlc5q5a1TB9s1W+uqUZJ1Di+uXo5n165BsOQKbW1t5T0mh0lzuqKyEukXLsMvNgkhsXNhM86irKVDcXH25TYpbOCQs6msTKWwWmoq0VySj5SoYLzxo9eFKzSGxdJjMnFxYtzcm/koqKjBylffnPZlU5SILxd2l164vu5O0Sg8VZWpI8NDaKwqQ2t5IcK9XUWp0MuLsZ9x88gk4uIbmJ9fgKKySoQlpEITEGzx3WkmAruwcAFQhguMRadi/i42QLfUVqI6Nxthnk745/feFcIyBSYRF9sPL2VlobK1E0tf2ChvVXkYPoHBCIqOFbFoQ2WZvNU0sL6xrbEW+RknsDI1ER/+4hditmlTYRJxnTh5SqzYOmfxStEJUOXR+ASGwFsbhP4unajzMhX0JmzSuXxoJ9546Tn86LWNsLc3bacBo4urvr4e2VevwcqZA1uXqaXDxxAQHg1XL2/UlBah1UTVEQzem6Xg/dKBHXj/zR9h7aqn4O5u+p6/Rs/5Pfv2YcjOBeFJaSKeUPnHOLu5i2nPOTDFSvqna20WlZrGgn2xakuKcCvzBN7e+BKeWrECGo1GzG5jaox2BZrdwsJC3CwqhXd4rBRHxMspKv8IlqLdvX1ENxxO0FtfUYI7o8YZLMvmnDpJWG1lBVizOA0vPb9eEpb3lAiLGOUqDBQ53Hvnrt1w9g8R49zYrUTFMDw0fgiWXka6qVrJPY6NTX4GHI6JbCgvRm9DBdJiw/HuO1vh5uY2ZcIiRrnSyMiImBj3XNYVhKcuUdsPxwnbGdkMxMWnaktviyaZyTA8OIB6SVhdtWWYFxOGf/ngAzg6Ok55ddCkxUWrxfbDL//4fzFv9fPwD4uy6IGtpoBukaOBWhtq0SC5RU5Swuc6EViPRYHWF1zH0uR4/PN778FmmjplTlpc7KfFaQ5zbxUhbe3zZjsx7nTCJYTZDcmbMxB6akRTEGvRJ0J5QQ6KLpzCK8+sxuZNm6ZNWGTS4uLA1p37D2H1W+9LRWqpFKI280wIJ1cPRMxNgbv0DBuryjE8zqH+w4ODuHnhLEounsEHW97EurVrxtXf3RRMSlwNDY3IKyjAAKyR+MRTsFXd4YRhlURYfKKYP4M19Ry4YShskyzLvYLGohz89L2tWLl8KTw9PKa9yW3C4uJDyLuZh2s3C5Hy1LPCHaoVphOH4gqJiRfL57HEyIEbhtCr60RNUR566sqx5bUNWLPqKdFWqIS23AmrobKyEnmFxRixc7a4KSanAzsHR9HAf2d0BINSHEtr9Lh5JCis+tJbGG6rx9qli/Daxo1wclJOZ8wJiYur43Ptw4auPiQtXyNmQFGZHIxVuZo/S9sePr7QtbX8sJTLI+BAiprbNyVhNWBpSgK2bnlbTlEOExIXOwEWSoG8tYsnolLmy1tVJgsnWotJWSDmhOeoIPZQfRjs+1V87RJ0FUVYkZaMd7ZulVOUxYTEtX3HTgw5eCBx2WrMtsApJqcLW3t7SVzzxQobbGju735458ErJw9hrLMJ72x+HW+9uVneqjzGLa7Lly+jpbMLfuEcjh8ub1UxBrZ2DohOno/OtibUlBait/tvJylh3de5/dvhMNqP997ejOVLl8opysRgcbHGmM08f9q2Dd7RSYhMmi8m1VAxHuxmzLpCVw8vODi5SDFXr/T5wXr1delw48z3sBvukyzWJqSlpoomHSVjsLg4TfSRo0cxYGWHwLhEuGt85RQVo2FlJebPYCO2RhsoYq4uKXDnci63LqfDZrAbWza9hgVpqXCVgn+lY5C4OLC1sbERu/bsQ9ySp0TDtKUtQqAUrGZZiZp6Ngexb1dZ3nVU51+H051BbHjuaTy5Yjmcnc2jdG4lubvHtpBy7vSDhw7j3z75FC//7L/Dyy9AeskmVBZQeQxci7HiVi6yTx4RvSQ0Gh/Mn5eMF55Zi6fXrZP3Mg8MEtft28X46F//Fbek/1mnRaulhBpgS4X9ubrbWjE2MozFi5dg69atWL368XOQKg2DxNXX14fi4mLR05SjqKdy8OZMhYMnAgICEB8fj+DgYHmreWGQuLjL2NiY+Biwu4oRoGdgr1GOgDb2YNWpwiBxqahMBDUqVzEZqrhUTIYqLhWToYpLxWSo4lIxGaq4VEyGKi4Vk6GKS8VkqJWo0wjn12CrB2viOXjVmPORKgFFiIu3wAfN//UfwiYQPnBjzS48VfD+OfSO/7Pp5mGTf1BUubm5os2Wvy8xMVGs2j+VE4WYmmkXFy9PYV27dg06nU48dH2PC2YMJymLjY2Fh4fHtA5NNxT+Hv6G8vJyMX0nG505NeSDouFvPnToEL755hvRX+6tt97C66+/bha/0VCmXVx8wymqX/3qV0hPTxeZ4OnpKd5m3hrH4b322mtYu3YtfH19Fe86eM8U1WeffYaqqiohmKVLl/6d9eV+bW1t+Pzzz5Gfn48XXngBb775pkWJa9ptsN46sc8S3cKGDRvw6aefYufOnfjoo49Epvz617/G2bNnxZJ65gBfEHaZ4edRPRponWmNw8LCoNVqxUtjaV2ZFOHgmRmcmIxWikKjG/Hx8UFCQgLeeecdkUlNTU2iRyytXGdnpxAaXQszhDPtcHtHR4f4m5aD+/T09AgLwf7/TOfc+DyG6LfzGP15OdiX2/nhfvpzcGAK9+V3frgf0R//4LH8PPPMM/jJT36CpKSk/29tea/cr729XVyTi8jzXsmDnS/pKvkbuR/3Z586c0MxAf3t27eFhUpNTcXGjRsRGhoqHmh2djZ+/vOfC9fo4uKCkpISkSnR0dFiW1xcHHbs2IHz588LF7tkyRIhzjNnzojz/vSnP0VpaSkuXLggMnDNmjXiQ0GcPn1axHoUCIW9aNEi4X4p7Fu3buHLL78UM8WsXr1aZDbvhRnOe1y/fj1ycnKQkZEhBDJ//nxxLK996dIlYXnZ2e/VV18VLwnhZMTHjh0T90Khubq6imvzGs8++6z43bTU7JDJ++e5GxoaxCifOXPmYPPmzWKVC3MJ+hVzlxQCHzitAS0M39iioiLxgEl4eLgQFK0IM4lColuhVWAmMpP40PnwOaEst9OVHj9+XGQWM4giaGlpQW1trRAWB53MmzcPCxYsEBYvKytLlN70LosWk9v44b3x+nRze/fuxYEDB8Q9z507V9wf97l69ao4lvdAMVZUVAgR89i6ujohLAqUi2OuWLFClBApJr5E/D2EFpPCYvzJ30DB87r8zUePHhW/QQH2wCAUIy5mCjOE1mDXrl3Ytm0b9uzZI4RAi0BrsXjxYixfvlwIjYEvXSkzh6tsMV5btWqV2IeZx+7BzDCek289Yzl+KAYuAE73m5KSItwXg+mIiAghBAbhvBd/f3+R+YSi5fm5Ly0jA3FaT27jsbRavA7vleKLjIwU5+O9UQgsPVJoFBaF98Ybb4jPiy++KO5TP48WRUiRnzhxQrhjip73vG7dOmFNKTpem+czBxQlLj5cPjwW45kZfIuXLVuG999/XwiKpci0tDSReTU1NeJt5j5lZWUiMGZ8w0yg8CggvTvhm8+MYibxeAqH3+nC6DLz8vLEdWlBmKm8D4qElovn4aKWtI60iBQyrRqrGHgebuM16eJ4HNFfn5aHwmScxZiR4l24cKEQvz625Dl4Pv5+ioZWm9aT98LfR2vI0iRjPX6nRVfFNU74hjNDGA/98pe/xMcffyxisC1btoh6LqaRkJAQEWfRKnFqAQrr+vXrYrt+nUCeix9mmL7ExkxmpnMbhUQLyePpNvfv3y/OoS+N6mMaioX78zh9qY/feQ3eD//WC4rH8KPfpr8+obgoFm6jqO6H++iPI9yXro8x6OHDh/H1118LN8zvFLl+P3NAMeLSZw6Ddk5eRivFjNCLSg+tEV0O3/p9+/Zh+/btIjO5jRaAMAP0nwehgDIzM/G73/1OWLQPP/wQv/nNb/DKK68I68R70HN/puvRf7///wc/+uP0ItN/ZzzJAJ0vBrfzO4VEl8p0Cpi/n7+DhQhWxbCS9dtvvxVhAl84umq+MOaAIsTFh02XwbebgTldw6NMvz6mSU5OFq5z9+7d4oHr1wpkhvLtp4gYyNOdsBDAzCT8m9v0bpDf9dUJ/M4PM5zulufg33SVFAK38W9u4/78zu08htsZL+mP57F0YxQTYemXLpSlWrp9ujeWVK9cuSIm0uP+vG+WWvmiMPaj6+f5uZ0FAhZueH69tVQ61v9DQv57WuCDopi++OIL3LhxQ2QG30y6OQbsD4MCYwYyAygyWh2Ki9v1pT5WTzDOoXAoPlo6io/78JrMrFOnTolqA1oNQsGxTokBNjP1z3/+s8hgCp3WlOemq6JL5b4M6BnYnzx5UgTrPIbHshRKV8ZjeS1aRLp2ptH90hUzjqKV4ovFe+F5+Hvp8hk/UqyssmATkb4UysIKf6fevSsdRbQtMlP4IJmxhME7S1H3i4v7MSP4UOlG2OhLq8X6IT50vvFM41vOTL1586Y4L4XK5hd90xEzm1aC1Ry0fMwoBthMozWhJWPmMuNpWWj9GKxTSHTJrGejaOmuWSggPA/FwWN4LM/JejJen6Lmb6HA+Pt4XxQmXT4tFK0fXyjeF++D1+HvZCxJC8cXj3ND8LwUKH+POQiLKLJXBK0LM+j++IeioaCYCbQALPYzU9nge/8qpzyelkYfx/A7haBPJ/p9KCSiv5Y+FuK+ehHrofi4jcdxH35Y1UC4jffFdP2x+v34N8/P4/md1+R5eT398bwuj+c+3Fe/jfvyf+7L7fo0c0ER4jIEuqSvvvpKCIpvPYv/+spIPnRmooqyUExp8XFQQCxBMtZiLTvdDeuM+ParwlImZmO5eJv60hmhazSXIvlMxWzEpUd/u6q1Uj5mJy4V88FsYi4V80MVl4rJUMWlYjJUcamYDFVcKiZDFZeKiQD+HzuiBqg3Tr89AAAAAElFTkSuQmCC[/img][img]data:image/png;base64,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[/img][img]data:image/png;base64,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[/img][img]data:image/png;base64,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[/img]
[b]Pyramide[/b]: Volumen = [math]\frac{1}{3}[/math] [math]\cdot[/math] Grundfläche (G) [math]\cdot[/math] Höhe (h)[br][br][b]Kegel[/b]: Volumen = [math]\frac{1}{3}[/math] [math]\cdot[/math] r[math]^2[/math] [math]\cdot[/math] [math]\pi[/math] [math]\cdot[/math] Höhe (h)[br][br][b]Zylinder[/b]: Volumen = r[math]^{^2}[/math] [math]\cdot[/math] [math]\pi[/math] [math]\cdot[/math] Höhe (h)[br][br][b]Kugel[/b]: Volumen = [math]\frac{4}{3}[/math] [math]\pi[/math] [math]\cdot[/math] r[math]^3[/math]
Aufgabe 2
Berechne das Volumen eines Kegels mit den Angaben: r = 2.5 cm ; h = 5 cm.[br][br]Überprüfe dein Resultat mit dem Ergebnis der untenstehenden Anwendung. Das machst du, indem du den Radius und die Höhe mit dem Schieberegler richtig einstellst.
Anwendung 1
Aufgabe 3
Verändere bei der Anwendung 2 die Höhe und den Radius mit dem Schieberegler. Wie verändert sich das Volumen, wenn...[br][br]... die Höhe verdoppelst?[br]... die Höhe halbierst?[br]... du den Radius verdoppelst?[br]... du den Radius halbierst?
Anwendung 2
Wenn du richtig gerechnet hast, hast du folgendes festgestellt:[br][br]Das Volumen ist doppelt so gross, wenn du die [b]Höhe verdoppelst[/b].[br]Das Volumen ist halb so gross, wenn du die [b]Höhe halbierst[/b].[br]Das Volumen ist um das Vierfache grösser, wenn du den [b]Radius[/b] [b]verdoppelst[/b].[br]Das Volumen ist nur noch ein Viertel des ursprünglichen Volumens, wenn du den [b]Radius[/b] [b]halbierst[/b].[br][br]Wie kannst du dir das erklären? Tipp: Nimm die Berechnungsformel unter die Lupe!

Information: Volumen von Körpern