Klassifizierung aller Bewegungen (2011/12): Unterschied zwischen den Versionen
Aus Geometrie-Wiki
*m.g.* (Diskussion | Beiträge) (→Zwei Geradenspiegelungen=) |
*m.g.* (Diskussion | Beiträge) |
||
| Zeile 8: | Zeile 8: | ||
==Die drei Spiegelgeraden haben genau einen Punkt gemeinsam== | ==Die drei Spiegelgeraden haben genau einen Punkt gemeinsam== | ||
<ggb_applet width="815" height="692" version="4.0" ggbBase64="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" framePossible = "true" showResetIcon = "true" showAnimationButton = "true" enableRightClick = "true" errorDialogsActive = "true" enableLabelDrags = "true" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "true" /> | <ggb_applet width="815" height="692" version="4.0" ggbBase64="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" framePossible = "true" showResetIcon = "true" showAnimationButton = "true" enableRightClick = "true" errorDialogsActive = "true" enableLabelDrags = "true" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "true" /> | ||
| + | |||
| + | |||
| + | |||
| + | |||
| + | |||
| + | |||
| + | |||
| + | [[Kategorie:Elementargeometrie]] | ||
Version vom 6. Dezember 2011, 15:50 Uhr
Inhaltsverzeichnis |
Vorab
Reduktionssatz:
- Jede Bewegung ist die NAF von zwei oder drei Geradenspiegelungen.
Zwei Geradenspiegelungen
Drei Geradenspiegelungen
Die drei Spiegelgeraden sind identisch
Die drei Spiegelgeraden haben genau einen Punkt gemeinsam
