★★☆ [br]Welcher Textbaustein fehlt?[br]Bei einem Parallelogramm wird eine Seitenlänge halbiert und die zugehörige Höhe verdoppelt. [br]Der Flächeninhalt des Parallelogramms __________ .[br]

★★☆ [br]Welcher Textbaustein fehlt?[br]Bei einem Parallelogramm wird eine Seitenlänge geviertelt und die zugehörige Höhe verdoppelt. [br]Der Flächeninhalt des Parallelogramms ________.[br]

★★☆ ✏️[br]Kathi behauptet: “Wenn ich eine Seitenlänge eines Parallelogramms verdopple und die zugehörige Höhe verdopple, verdoppelt sich der Flächeninhalt des Parallelogramms.”[br]Zeige anhand eines Parallelogramms mit a = 4 cm und h[sub]a[/sub] = 1,5 cm, dass Kathis Behauptung falsch ist. [br]Vergleiche dazu die Flächeninhalte des ursprünglichen Parallelogramms mit dem Flächeninhalt des Parallelogramms bei dem Seite und Höhe verdoppelt werden. [br]Gib an, wie sich die Verdopplung der Seitenlänge und die Verdopplung der Höhe auf den Flächeninhalt des Parallelogramms auswirkt.

★★★ ✏️[br] Zeige allgemein mithilfe von Variablen, dass folgende Aussage stimmt: "Werden in einem Parallelogramm die Seitenlänge und die Höhe verdoppelt, vervierfacht sich der Flächeninhalt."

★★★[br]Alex behauptet, dass die Auswirkungen der Veränderungen von Bestimmungsstücken anhand einer Skizze dargestellt werden können. [br][br]Alex erstellt dafür eine Skizze für die Verdreifachung der Seite a und der Höhe 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[/img][br][br]Alex erkennt: “Wird eine Seitenlänge und die zugehörige Höhe im Parallelogramm verdreifacht, wird der Flächeninhalt 9-mal so groß." [br][br]Versuche Alex’ Skizze nachzuvollziehen und erstelle eine Skizze für folgende Veränderung eines Parallelogramms: [br][br]Seite a wird verdoppelt[br]Höhe h[sub]a[/sub] wird verdreifacht.