Zu sehen ist ein besonderes Viereck.[br]Beschreibe, wie der Flächeninhalt dieses Vierecks berechnet werden kann.[br][br][img]data:image/png;base64,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[/img]
[br]Die Diagonalen stehen senkrecht aufeinander.[br]Daher gilt auch hier: [math]A=\frac{e·f}{2}[/math]
Maxi berechnet den Flächeninhalt eines Rechtecks folgendermaßen:[br]d = 5 cm[br][br][math]A=\frac{d\cdot d}{2}=\frac{5\cdot5}{2}=\frac{25}{2}=12,5[/math][br][br]A = 12,5 cm[sup]2[/sup][br][br]Beschreibe, welcher Fehler Maxi unterlaufen ist.
[br]Maxi hat die Flächeninhaltsformel des Deltoids verwendet.[br]Bei einem allgemeinen Rechteck stehen die Diagonalen aber nicht im rechten Winkel zueinander.[br]Aus diesem Grund kann die Flächeninhaltsformel für das Deltoid nicht angewendet werden.