Satz des Pythagoras im Würfel

Suche im Würfel die rechtwinkligen Dreiecke. Du kannst sie mithilfe der Werkzeuge [img]data:image/png;base64,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[/img] in der Werkzeugleiste einzeichnen. Wenn du denkst du hast die rechtwinkligen Dreiecke gefunden, dann schreibe sie in dein Heft auf - Schreibe auch dazu, dass es sich um den Würfel handelt. [br]Anschließend gehe zur nächsten Seite über.[br]Um die Konstruktion zurück zu setzen, klicke auf die Pfeile in der Ecke. [img]data:image/png;base64,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[/img]

Satz des Pythagoras im Quader

Suche im Quader die 4 verschiedenen rechtwinkligen Dreiecke. Du kannst sie mithilfe der Werkzeuge [img]data:image/png;base64,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[/img] in der Werkzeugleiste einzeichnen. Wenn du denkst du hast die rechtwinkligen Dreiecke gefunden, dann schreibe sie in dein Heft auf - Schreibe auch dazu, dass es sich um den Quader handelt. [br]Anschließend gehe zur nächsten Seite über.[br]Um die Konstruktion zurück zu setzen, klicke auf die Pfeile in der Ecke. [img]data:image/png;base64,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[/img]

Information