Weißt du noch, welche besondere Eigenschaft Raute und Quadrat mit dem Deltoid gemeinsam haben?[br][table][tr][td][img 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[/img][/td][td][img 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[/img][/td][/tr][tr][td]         Raute[/td][td]   Quadrat[br][/td][td]      Deltoid[br][/td][/tr][/table]

Aber kann uns diese Gemeinsamkeit helfen, einen neuen Weg zur Flächenberechnung im Rechteck und Quadrat zu finden?[br]Öffne das nächste Arbeitsblatt und du wirst Interessantes entdecken.