Eigenschaften Rechteck und Quadrat - Quiz
Umfang eines Rechtecks
Ein Rechteck hat die Seitenlängen a und b.[br]Gib eine Formel zur Berechnung des Umfangs u an!
Wie kannst du den Umfang u eines Quadrates mit Seitenlänge a berechnen?
Flächeninhalt von einem Rechteck
Gegeben ist ein Rechteck mit Länge a und Breite b.[br]Wie kannst du den Flächeninhalt A dieses Rechtecks berechnen?
Wie kannst du den Flächeninhalt A eines Quadrats mit der Seitenlänge s berechnen?
Umfang und Flächeninhalt im Vergleich
Pauli berechnet den Umfang u von folgender Figur:[br][br][img]data:image/png;base64,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[/img][br][br]Beschreibe, welcher Fehler Pauli unterlaufen ist.
☆ Fridolin hat den Umfang u der zusammengesetzten Figur folgendermaßen berechnet:[br]u = 2 · (17 + 6) + 2 · (5 + 6) - 2 · 5 = 46 + 22 - 10 = 58 cm.[br][br]Beschreibe Fridolins Rechenweg in eigenen Worten![br][img]data:image/png;base64,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[/img]