Punkte, Vektoren und Geraden: Unterschied zwischen den Versionen

Version vom 14. Februar 2012, 12:47 Uhr

Ein Koordinatensystem eines dreidimensionalen Vektorraumes zeichnen wir, indem wir die x₁-Achse 45° geneigt und ${1 \over 2} \sqrt{2}$ verkürzt zeichnen. Das heißt, dass (üblicherweise) auf den x₂- und x₃-Achsen 2 Kästchen eine Längeneinheit darstellen, während auf der x₁-Achse eine Längeneinheit ein Kästchen diagonal repräsentiert.

Punkte im Raum

Punkte im dreidimensionalen Vektorraum haben drei Koordinaten. Diese werden waagerecht geschrieben. Vektoren dagegen werden, mit = getrennt, senkrecht geschrieben. Ein Ortsvektor ist dabei ein Vektor, der die Verschiebung vom Ursprung zum entsprechenden Punkt beschreibt.

Im Arbeitsblatt kann dies nachvollzogen werden. Durch Veränderung der Koordinaten des Punktes P (mithilfe der Schieberegler) ändert sich auch der Ortsvektor $\vec{p}$ des Punktes.

Vektoren im Raum

Ein Vektor stellt eine Verschiebung eines Punktes im Raum dar. Der Pfeil repräsentiert dabei den Vektor, wobei jeder Vektor durch unendlich viele Pfeile repräsentiert werden kann; abhängig davon, wo die Verschiebung beginnt.

Im Arbeitsblatt stellt der Vektor $\vec{PQ}$ eine Verschiebung vom Punkt P zum Punkt Q dar. Mit den Schiebereglern können wieder die Koordinaten der Punkte P und Q verändert werden.

Geraden im Raum

Geraden werden mithilfe einer Parametergleichung beschrieben. Das Arbeitsblatt zeigt alle dazu nötigen Elemente:

ein Punkt P der Gerade; der Ortsvektor zu diesem Punkt ist der Stützvektor $\vec p$ der Gerade

ein Vektor, der die Richtung der Gerade, von P ausgehend, beschreibt; dieser Vektor ist der Richtungsvektor $\vec u$ der Gerade

Im Arbeitsblatt können die Koordinaten von P und $\vec u$ mit den Schiebereglern verändert werden.

Alle Punkte X zusammen bilden die Gerade. Der Vektor $\vec x$ ist der Ortsvektor zu jedem Punkt X der Gerade. Der Parameter t ist nötig, um jeden Punkt der Gerade beschreiben zu können.

@@ Zeile 6: / Zeile 6: @@
 Im Arbeitsblatt kann dies nachvollzogen werden. Durch Veränderung der Koordinaten des Punktes P (mithilfe der Schieberegler) ändert sich auch der Ortsvektor <math> \vec{p}</math> des Punktes.
-<ggb_applet width="1200" height="661"  version="4.0" ggbBase64="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" showResetIcon = "true" showAnimationButton = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "true" />
+<ggb_applet width="1208" height="670"  version="4.0" ggbBase64="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" showResetIcon = "true" showAnimationButton = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "false" />
 == Vektoren im Raum ==
 Ein Vektor stellt eine Verschiebung eines Punktes im Raum dar. Der Pfeil repräsentiert dabei den Vektor, wobei jeder Vektor durch unendlich viele Pfeile repräsentiert werden kann; abhängig davon, wo die Verschiebung beginnt.
@@ Zeile 14: / Zeile 13: @@
 Mit den Schiebereglern können wieder die Koordinaten der Punkte P und Q verändert werden.
-<ggb_applet width="1200" height="663"  version="4.0" ggbBase64="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" showResetIcon = "true" showAnimationButton = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "true" />
+<ggb_applet width="1226" height="688"  version="4.0" ggbBase64="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" showResetIcon = "true" showAnimationButton = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "false" />
 == Geraden im Raum ==
 Geraden werden mithilfe einer Parametergleichung beschrieben. Das Arbeitsblatt zeigt alle dazu nötigen Elemente:
@@ Zeile 25: / Zeile 23: @@
 Im Arbeitsblatt können die Koordinaten von P und <math>\vec u</math> mit den Schiebereglern verändert werden.
-<ggb_applet width="1200" height="661"  version="4.0" ggbBase64="UEsDBBQACAAIABxhS0AAAAAAAAAAAAAAAAAWAAAAZ2VvZ2VicmFfamF2YXNjcmlwdC5qc0srzUsuyczPU0hPT/LP88zLLNHQVKiu5QIAUEsHCEXM3l0aAAAAGAAAAFBLAwQUAAgACAAcYUtAAAAAAAAAAAAAAAAADAAAAGdlb2dlYnJhLnhtbO1dW3PbyJV+nvyKLsY1ZW106SsuHmlSmaRmd2qdiFo5Ke3arikQbFGISIADgDd5/KOS57zlPb9pT3cDIEhAIkBLNOVJlW3cGuhzznfOd043mvDpb+ejIZrKOAmi8KxDjnEHydCP+kE4OOtM0usjp/Pbb391OpDRQPZiD11H8chLzzpctQz6Z52+b0vLE/YRdrk44rzvH/WIx48kth1qUeazntdBaJ4Er8LoT95IJmPPl5f+jRx5ryPfS3XHN2k6fnVyMpvNjvOujqN4cDIY9I7nSb+DQMwwOetkO6/gcSs3zZhuTjEmJ1d/fG0efxSESeqFvuwgpcIk+PZXX53OgrAfzdAs6Kc3oDAlVgfdyGBwA0rZrtNBJ6rVGCwyln4aTGUC95YOtdLpaNzRzbxQXf/K7KFhoU8H9YNp0JfxWQcfM85s0UFRHMgwzRqQrKOT/BGn00DOzLPUnu6Gd1AaRcOepx6Dfv4ZUUwxOlQbYjYUNpZlLmFzDjOzoWbDzUaYNtzczk1Tbtpw04azDpoGSdAbyrPOtTdMwG5BeB0DZsVxki6GUsuTnViqTA5BpyS4g8bQXwcZQ4Pgh/iQY/3X6FxSkJR6TONJyw7z7mzbbtYd/ZTuWN4dJ85qd/Q+7awHDGr6b6IeESVrCnyo/+i/lR4ZbdGjOf60Di2+ExVPT/LoOM0CAiU3qm2GYipHiQoR5iLhKk8nSEA4WDY4tkDEhY1NEQQAIgJxAYfEQZba2ojZcIEjhhyk2hGGdDwIB/7htn6YhQQ8TJ21IQwRgY44EgwRHUYcQfAgHYoQlpRBCyGQgJtU94SqRzALcQuOmIM4yKii0CbQkMGNcAzdU8QIYupmYiNqIUs9j3AV3ZajRIdHUmRhZBH1QAhkCGITwNDeQUxpY2XmCsLxJF0xkT/q57tpNC6wgNZAQUt2M5S0Qn5fnQ69nhxCQrhUSCI09YYqGnRH11GYohxEas4NYm98E/jJpUxTuCtBf/Wm3msvlfPvoXWS963b+lGYdOMo/X00nIzCBCE/GuJC5mhISvu0kBoOWOkCL18QpQtWad+u7TeCK2iSSOg/ipO8udfv/6BaLGkBLHkeDhffxdK7HUfBqhqnJzq3nMqJPwz6gRf+BZxV9aLsgvJUo1kqzzQWZ7kgUdy/XCTgwWj+fzKO4BrBx8RyhCNc7DJiA9sszBXmsmNBBYNMC8QuqKIk31Ohx7B7TLlNiI0Fthy4sLjnCrNMx3Ja4OPN5VLVQaziunTwQ/JdNFye0tr/3hunk1jXCBDDsdLpd+FgKLWHaJ6FBOzf9qL5pXENZp71ZjGGI2wk6A201REwAxWQHwfZtme2uo0SrWilyGZgNj29ydwt6BdNiEt1G73tma1uBf5rpMu0JbmmBOc9BYmmNNzJAienK+X9KqNPwiB9nR+kgX+baZvd8KfJqCcLH1p9Jnm8ZyqpobhI0itVWlDR0Qf/Wz54cyNTT50ADxGuY9sC/qWu4xhnXXPT01sZh3KYRQV4xCSaJCbIl732pR+MQHZzPrOppyD/M2hgzvblIJa55kNdwxmL66u47O+V0/pR38fR6Idw+gb8yVwsRVgu5Gnix8FY+S3qQSK5lUvPBNU9yEP98n0qikELX+UbsG+qbAvxPUlvIvCWr73R+Bs/Gi++Qd8fo++CNJVQ3YYhPAvoClqqoB7KEZRtKNWuq+Us8PvX33QVCLJOMnXEMaaW4A7lwubMslyjXjJUtSAaBaGGduTNwX+PqcOIIxi2ie0KB7jb6yXAgylUx2DIcFkdG1bKS1aMVe0NT6C22llAr9RSe9fBvGQO0DC4A0BXgVRehaLeX4HeiwrAKLNsA5eLgMI6nLAOJvjXG45vtGuRLKy8BehVRlI/7Y9RPzMIWQ+/FFLDLZS8iaaJNCMEvfNfQb8vw+IeL/YVe2T5pnAU8EONJlDmWEmCic0Foy4VxHU57EAUQPqSJuyKDsYgqiasUhbwJvNgGHjxYtXdIUQM6Jvg//s6/FDrE06ECz7AhOPaLntS/K0cf2H/G/+nwd+PRsAIfRTqivaHEBgiAdt1llWWB/XK/HfA9GAdKFcWetfYcZLmDc7Nc7OnVfxKJ9UCifPONkhVsuMSLNwQLPygWTLyTpTr4czzjvTOnZk5MCNnpUoJt/LZNdpfibP5OAanUMBmWk4BPTh71kmC8OW//nZgitVVu4WTkYwDv1O6Zy0iQUBXECwsQSxwDSLy+qeFkzehiYr4s1z8Iz9KlPzoP5DW5O+NNJnVaYJdwV0YK1GHUOB8SnejyjxX5eWUHKIZOeisum1Vm1V/npOtHJrgrJbDtCgKn9Kn61wl9/GK4R/D51e55S9glyheI5ZzQypzUmEUSR6mlKl5XG5iuR0G97nTw9Y/v75OZKptSrmxId81OEsZt0g9pSo1MQW578WpTKBoztJoCsddBbCJjPMGfEazKMr4oBGf0ZoKA7uYWCrV2dzlNmU74jO6Ssct6ayiCABHXeZAqUQtwi3KLGHviM5oQWcU6Iy2pjP6LOiszlOyiKkafsd0Rqt0RtvR2XYYbEdnO7H+5+arh3mIVXkI1wwoVqc3SpX2EwwpqiMB8qgDvyoDsjKBN+S9GsOt5TGxI9ZjBesxYD3WmvXYM2E9MzCpMfOOOY5VOY6147jtLP6pJZtj7Pe0OOw123V/rAy+6uluB/MnebelCaQjms0g0fYzRk4+Y8SaThhtNXNTnaRpOinTBqWa4vjLQsnBXwBKDUuH54sSwc5zgKk6IO1mFQHwHYzmpgT9BkFQqV2qd5naZY3Gqd17QW4M4Ibia1XY2VLY2VLYWSNhZ08ubLcotbpQanXbllrdrfI+xfxxRjd1SfypJnm7P36YHy4+5vaq8cRDVIN4a4tm3WwYsDz1xPpO58+783WrLk3Z2n7z/THd0S5st1jabumGW/reYn9s9+imWx0PXcqBOr82ICpiXA2LwBrrw6Lej92Hx0VJ9tjcXuqGhxmy5czDoxFkw2ENqc/08qdwZVQTjMbDwA/SwmJDld+Ld5Dgr8naOomvTm+lHKtVNufhm9gLE7Vct7KW4lPgq6Dnt0XP3xv0jp47fA/XOZO6Yaz4IkrvfOED5c9/hDSpG8d+YTBZjden7DFMNQPZLwwmlz97mNK9AYnUgCQykMT2IDGxY5CavlXZMNlwUR6N/AZBcjrIh3q6yFan6EE++fBSDejVKXbQfBLiouYdM6MEE9e2sGthglnbFTMbJiXqlZpVlZpVlWo4WVFRCh9TBzvMIi6zLIe4gvFHVarQaXpxiGYXbYc7F5958dpKeVdB31R7VQPu6N1Q11TRF5UqevJwDb32ZmjymdbyZINHKp4GgN2+FOo2IK2r1fhOIWxriMucrpCXOd2GwK5qCIxYWGDXcTB3MBak7erFDQR2v4KzegVn9Qo2JLOKgiAlx5w44B8O4xg8pe0ioIcVLPSbXgGZXbUls6vtZmKzX7M87lC14ggmlKr229W8ztV9UwL9dhMC/T2ZDqi1pbFxxfR32ezB1nT1pJMFmxeyX8qfJlL9MnoV0gzot/p5Qy+Vb88PkclkbyVBJ0hArN++f3+Ili3mtLbJe+Mdt7ChunT0GAg/BGu//ENgfpb9dk4O0fl7uOe1DAfpDdz/Hm4WBxWPeh2EgQx//DBffHzYt4bw6MJxyndt5WJEMO1kgnyql23jIs1C96jCgk+HNNsh0ndbIX23JdJ4ZZHSLwZoeg/QpLZJI6DpGtB0A9CL+TZAq7v+HdKPgDTbIdJbhfRi25B+1JWHzwtstjmsWUuw2RrYbAPYd1uF9d22Yf0L5e/7gKY7BHqrkuxu65LsuUZ1zURbsUBjfU70EK1PKLaehduvBRvcFoI6VDgE9mzLKRYhcNvmwhYw8LKoxQh5ovUcF4uSqVfmmg8rE7WtTb1X6zuI4AI73LWJY3ObWSQ3NeGWy8HEDNtgZ4c6T2Xq1RVdDab7q95eM33eGpV9W/F132SoggaAcSm2OLddBiGyu5U582wKJzPWOsd7bdd2eHuztuMZLe1oMltTh95Fht7FvehdtEVv08ubXU7FVehqcQ+/GXRtmwpOuSNcBqcd8cWhXV6GdVG3iq4l2r29Qbu+ENBwVwuHXyLaFbD9tmD7+wT2Gqj2ClGrfCjU93Ncy4ZUybDLKp/w2md0a95Brdf5K68Ri+pn5d1b6xdV+1XvUwbYcUJdYG/bcXhR71Pm2NQB1DFQOxHicX6VWWPz9YJ/5R3tYe2LzdY236vCf50Si8IfIIBESQSElCWE+0jlZY3Jawv/Jq/M60PgntfPrVHaw4FA7atc/SUTwAo4j1JgP4id3b3KzUrJq3tLyXnbUrKGkJrkmyd4d14bAot7YsaUF8QFehIWJdzhjFPSKAOxPclAjQAv1xdXddVkS8B7ewT4PYnGrDyqZKZfJOI1FWVLwP39AnwNV2atF5WYOcRi3CUuxxD3jD1fgF+DzPULC6u4DjZNzodLwAaNVzv5UdgPzCph9WXkrLF3P9j5h33Va9fHSaG1S3Vqc+unrix8GG3fG2tDaEn/U8YeSC2D8E4G/k0ow0rdtGL+XhQNpRcu0+b6+riSw+x6uadwzZyL9SAmNdp7SvlBjeqVkvGNnKf5twW//mkSpd+8vEz/+Y/07uigOwlvU9RFau28ee4r1H1pGukfAqv60Bz+XDpLa86+ND8ON8cH2aaucExBnM6qbJ9zzFz/CwGksHHN7zUaVOVKDbpi4v8Bx0wn4SCZytsUBH7xbir9D5OPL8q2/vrXBH9jLqEJOns3lNfpy3c9OQjCD14ce4uPH/yPSwu/9t7Iq7dQur8/KAB49656nW64zkrX0TsZ9rPO3ulPjB9kVxpht+kDYU+LXZBolVYZPftcfiLj4Hr5aXn9gXTcydllM/jEzGwT5jaDn63Af5nG0r9V+F97Gv/0VWbVBkbd9EWizxYQWUnPKG1mE75ik/9WmSUIvVSGifkUfz+WNzJsYRm+t5Yx3sJd0WQIT0pf2SjG402Wdl/V/diUtv222SbxaCFeaV6gmXg1P7J8dPFYIV5peXwz8Wp+XPjI4ikvFStufx6neRK4m4yQSblXr5Am/xdIk/+H+Ud0hpBJAGhTBrjakAGuNmSAq00Z4AUI86KhMN0NwnQ3CNPdmI6Ka8U9afmJzcR88qzZImmKzzyk++S0WfqRjx4okGOX2QLbnFrcdS2XFC8bhP5fubDgnHJGMbfKk23lSDop/x8S6jj/D8q+/X9QSwcIjrzX3VgPAAA9bQAAUEsBAhQAFAAIAAgAHGFLQEXM3l0aAAAAGAAAABYAAAAAAAAAAAAAAAAAAAAAAGdlb2dlYnJhX2phdmFzY3JpcHQuanNQSwECFAAUAAgACAAcYUtAjrzX3VgPAAA9bQAADAAAAAAAAAAAAAAAAABeAAAAZ2VvZ2VicmEueG1sUEsFBgAAAAACAAIAfgAAAPAPAAAAAA==" showResetIcon = "true" showAnimationButton = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "false" allowRescaling = "true" />
+<ggb_applet width="1208" height="670"  version="4.0" ggbBase64="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" showResetIcon = "true" showAnimationButton = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "false" />
 <br />
 Alle Punkte X zusammen bilden die Gerade. Der Vektor <math>\vec x</math> ist der Ortsvektor zu jedem Punkt X der Gerade. Der Parameter t ist nötig, um jeden Punkt der Gerade beschreiben zu können.

Punkte, Vektoren und Geraden: Unterschied zwischen den Versionen

Version vom 14. Februar 2012, 12:47 Uhr

Punkte im Raum

Vektoren im Raum

Geraden im Raum

Navigationsmenü

Meine Werkzeuge

Namensräume

Varianten

Ansichten

Aktionen

Suche

Navigation

Werkzeuge