In einem [b]rechtwinkeligen Dreieck[/b] nennt man die längste Seite [b]Hypotenuse [/b]und die Seiten, die den rechten Winkel bilden, [b]Katheten[/b]. Die Hypotenuse liegt immer gegenüber dem rechten Winkel.[br][br][img]data:image/png;base64,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[/img][br][br]Der [b]pythagoräische Lehrsatz[/b] besagt, dass in jedem rechtwinkligen Dreieck das Quadrat über der Hypotenuse denselben Flächeninhalt hat wie die beiden Kathetenquadrate gemeinsam.[br][br][center]Kathetenquadrat + Kathetenquadrat = Hypotenusenquadrat[br][b]a[sup]2[/sup] + b[sup]2[/sup] = c[sup]2[/sup][/b][/center][sup][br][/sup]Die Summe der beiden Kathetenquadrate ist flächengleich dem Hypotenusenquadrat.[br][br][size=50](vgl. Boxhofer et al: mathematiX 3 S.184, Veritas, 2014)[/size]