[size=150]Wenn sich zwei Geraden schneiden, dann entstehen Winkel. Zeichne diese Winkel in die obige Abbildung mit der Funktion [img]data:image/png;base64,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[/img] ein.[/size]
[size=150]Wie viele Winkel enstehen an einer Geradenkreuzung?[/size]
Es entstehen 4 Winkel an einer Geradenkreuzung.[br][img]data:image/png;base64,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[/img]