Fragen zu den Dreiecken

Aufgabe 1
Welche der folgenden Dreiecke existieren?
Aufgabe 2
In einem gleichschenkligen Dreieck gibt es zwei Winkel, die genau [math]65^\circ[/math] messen. Wie gross ist der dritte Winkel?
Aufgabe 3
Welche Winkel sind bei folgendem Dreieck gleich gross?[br][img]data:image/png;base64,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[/img]
Aufgabe 4
Wie viele Symmetrieachsen hat ein allgemeines rechtwinkliges Dreieck?
Aufgabe 5
Wie viele Symmetrieachsen hat ein gleichschenkliges Dreieck?
Aufgabe 6
Wie viele Symmetrieachsen hat ein gleichseitiges Dreieck?
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Information: Fragen zu den Dreiecken