Satz des Thales SS 12: Unterschied zwischen den Versionen

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(3 dazwischenliegende Versionen von einem Benutzer werden nicht angezeigt)
Zeile 1: Zeile 1:
 
=Satzfindung=
 
=Satzfindung=
 +
==Induktive Satzfindung==
 +
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==Funktionale Betrachtung==
 
==Funktionale Betrachtung==
 
===Variante 1===
 
===Variante 1===
Zeile 7: Zeile 9:
 
===Variante 3===
 
===Variante 3===
 
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==Beweisfindung==
+
=Beweisfindung=
===ikonisches/halbikonisches Beweisen===
+
==ikonisches/halbikonisches Beweisen==
 
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framePossible = "false" showResetIcon = "true" showAnimationButton = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" allowRescaling = "true" />
 
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framePossible = "false" showResetIcon = "true" showAnimationButton = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" allowRescaling = "true" />
 +
==Video zum Beweis==
 +
Hier noch ein Video eines Stundenten, der seine Art der Beweisführung gefilmt hat.
 +
{{#ev:youtube|-hmTDm6x1wE}}
 +
 +
=Formaler Beweis=
 +
Satz: Jeder Periepheriewinkel über dem Durchmesser eines Kreises k, ist ein rechter Winkel.<br />
 +
 +
Jetzt seid ihr gefragt!<br />
 +
<br />
 +
Voraussetzung:<br />
 +
<br />
 +
Behauptung:<br />
 +
<br />
 +
Beweis:

Aktuelle Version vom 18. Juli 2012, 10:36 Uhr

Inhaltsverzeichnis

Satzfindung

Induktive Satzfindung

Funktionale Betrachtung

Variante 1

Variante 2

Variante 3

Beweisfindung

ikonisches/halbikonisches Beweisen

Video zum Beweis

Hier noch ein Video eines Stundenten, der seine Art der Beweisführung gefilmt hat.

Formaler Beweis

Satz: Jeder Periepheriewinkel über dem Durchmesser eines Kreises k, ist ein rechter Winkel.

Jetzt seid ihr gefragt!

Voraussetzung:

Behauptung:

Beweis: