Du hast ein Dreieck ABC konstruiert. Welche Angaben waren dazu notwendig.[br][img]data:image/png;base64,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[/img]
Zwei Dreiecke, die in einer Seite und den beiden anliegenden Winkeln übereinstimmen (WSW ≙ Winkel-Seite-Winkel), nennt man
Konstruiere ein Dreieck ABC mit den Seitenlängen c = 7,5, [math]\alpha[/math] = 30° und [math]\beta[/math] = 35°.
Funktioniert die Konstruktion auch, wenn statt den Winkeln [math]\alpha[/math] und [math]\beta[/math] die Winkel [math]\alpha[/math] und [math]\gamma[/math] gegeben sind.