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Zeile 1: |
| | Bei dieser Animation kann man mit den Schiebereglern links die Länge der Feder und die Masse des Wagens einstellen. | | Bei dieser Animation kann man mit den Schiebereglern links die Länge der Feder und die Masse des Wagens einstellen. |
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| − | Mit der Federlänge ändert sich auch die Federkonstante der Feder. | + | Mit der Federlänge ändert sich auch die Federkonstante der Feder. |
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| − | <ggb_applet width="800" height="500" version="4.2" 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" 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| + | {{#widget:Iframe |
| | + | |url=https://tube.geogebra.org/material/iframe/id/334281/width/800/height/520/border/888888/rc/false/ai/false/sdz/true/smb/false/stb/false/stbh/true/ld/false/sri/true/at/preferhtml5 |
| | + | |width=640 |
| | + | |height=416 |
| | + | |border=0 |
| | + | }} |
Version vom 28. November 2014, 13:40 Uhr
Bei dieser Animation kann man mit den Schiebereglern links die Länge der Feder und die Masse des Wagens einstellen.
Mit der Federlänge ändert sich auch die Federkonstante der Feder.
