[size=150]Die Winkel, die an der Geradenkreuzung entstehen, sind genauer charakterisiert.[br][/size][br][size=150]Je zwei gegenüberliegende Winkel an sich schneidenden Geraden heißen [b]Scheitelwinkel. [/b][/size]
[size=100]Ein Scheitelwinkelpaar[/size]
Wie viele Paare von Scheitelwinkel gibt es?
Es entstehen 2 Paare von Scheitelwinkel.[br][br][img]data:image/png;base64,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[/img]
[color=#1e84cc][b][size=200]Bewege die Punkte A, B, C oder D und betrachte die Größen der Winkel. [/size][/b][/color]
[size=150]Kreuze die richtigen Aussagen über Scheitelwinkel an.[/size]