Sehnenviereck SS 12: Unterschied zwischen den Versionen
Aus Geometrie-Wiki
Oz44oz (Diskussion | Beiträge) (→Beweis vom Satz 2) |
Oz44oz (Diskussion | Beiträge) (→Satzfindung) |
||
| Zeile 16: | Zeile 16: | ||
===Satzfindung=== | ===Satzfindung=== | ||
| + | |||
| + | |||
| + | <ggb_applet width="1008" height="411" version="4.0" ggbBase64="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" showResetIcon = "false" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "true" /> | ||
| + | --[[Benutzer:Oz44oz|Oz44oz]] 22:47, 16. Jul. 2012 (CEST) | ||
===Der Satz === | ===Der Satz === | ||
Version vom 16. Juli 2012, 22:47 Uhr
Inhaltsverzeichnis |
Definitionen
Sehne
Sehnenviereck
Sätze
Satzfindung
--Oz44oz 22:47, 16. Jul. 2012 (CEST)
Der Satz
Satz 1
Satz 2 : Die Umkehrung vom Satz 1
Kriterium
Beweise
Beweis vom Satz 1
| Beweis 1 | Beweis 2 | Beweis 3 |
|---|---|---|
 |
 |
|
| Beweisen Sie.. | Beweisen Sie.. | Beweisen Sie.. |
--Oz44oz 19:19, 16. Jul. 2012 (CEST)
Voraussetzung:
Behauptung:
Beweis vom Satz 2
| Beweis 1 | Beweis 2 |
|---|---|
 |
|
| Beweisen Sie..... | Beweisen Sie........ |
--Oz44oz 19:15, 16. Jul. 2012 (CEST)
Voraussetzung:
Behauptung:
Annahme:
