Haus der Vierecke Übung Heckl: Unterschied zwischen den Versionen

Aus Geometrie-Wiki
Wechseln zu: Navigation, Suche
(Geogebra-Applikation: Haus der Vierecke)
(Geogebra-Applikation: Haus der Vierecke)
Zeile 2: Zeile 2:
  
 
==Geogebra-Applikation: Haus der Vierecke==
 
==Geogebra-Applikation: Haus der Vierecke==
<ggb_applet width="800" height="506"  version="4.0" ggbBase64="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" showResetIcon = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "true" showToolBar = "true" showToolBarHelp = "false" showAlgebraInput = "true" useBrowserForJS = "true" allowRescaling = "false" />
+
<ggb_applet width="1000" height="700"  version="4.0" ggbBase64="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" showResetIcon = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "true" showToolBar = "true" showToolBarHelp = "false" showAlgebraInput = "true" useBrowserForJS = "true" allowRescaling = "false" />

Version vom 17. April 2012, 22:20 Uhr

Wer sich mit dem WIKI und Geogebra ein wenig auseinandersetzen möchte

Geogebra-Applikation: Haus der Vierecke