Kreisfläche - Annäherung nach Archimedes: Unterschied zwischen den Versionen

Aus Geometrie-Wiki
Wechseln zu: Navigation, Suche
(Die Seite wurde neu angelegt: „=Nähere dich dem Flächeninhalt an= Versuche, den Flächeninhalt des Kreises möglichst genau zu bestimmen. Wie gehst du vor?<br /> <ggb_applet width="1350" h…“)
 
(Nähere dich dem Flächeninhalt an)
 
Zeile 1: Zeile 1:
 
=Nähere dich dem Flächeninhalt an=
 
=Nähere dich dem Flächeninhalt an=
 
Versuche, den Flächeninhalt des Kreises möglichst genau zu bestimmen. Wie gehst du vor?<br />
 
Versuche, den Flächeninhalt des Kreises möglichst genau zu bestimmen. Wie gehst du vor?<br />
 +
'''Schreibe deine Ergebnisse und Überlegungen in dein Heft!'''<br />
 
<ggb_applet width="1350" height="553"  version="4.0" ggbBase64="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" showResetIcon = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "false" />
 
<ggb_applet width="1350" height="553"  version="4.0" ggbBase64="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" showResetIcon = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "false" />
 
--[[Benutzer:HecklF|Flo60]] ([[Benutzer Diskussion:HecklF|Diskussion]]) 12:13, 31. Mär. 2015 (CEST)
 
--[[Benutzer:HecklF|Flo60]] ([[Benutzer Diskussion:HecklF|Diskussion]]) 12:13, 31. Mär. 2015 (CEST)

Aktuelle Version vom 31. März 2015, 11:15 Uhr

Nähere dich dem Flächeninhalt an

Versuche, den Flächeninhalt des Kreises möglichst genau zu bestimmen. Wie gehst du vor?
Schreibe deine Ergebnisse und Überlegungen in dein Heft!

--Flo60 (Diskussion) 12:13, 31. Mär. 2015 (CEST)

Zurück zur Übersichtsseite

WIKI-Übung-Heckl