Durch die Vorgabe von zwei Größen eines Dreiecks (zwei Seiten/ Winkel und Seite/ zwei Winkel) wird ein Dreieck nicht eindeutig festgelegt. [br]Das heißt zwei Dreiecke, die in zwei Größen übereinstimmen, sind nicht zwingend kongruent. [br]Bsp.: α=90°; c = 3 cm[br][br][img]data:image/png;base64,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[/img]