Einfache Gleichungen lösen mittels Umkehroperationen

★☆☆[br]Welche Darstellung entspricht der Gleichung [math]x-24=13[/math]?

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[/img] [img]data:image/png;base64,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[/img]

★☆☆[br]Wie kann die Gleichung [math]x\cdot12=108[/math] umgekehrt werden?[br]Pfeildarstellung: [img]data:image/png;base64,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[/img]

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[img]data:image/png;base64,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[/img]

★★☆ [size=85][size=100]✏️ [/size][/size][br]Stelle die Gleichung [math]a+23=81[/math][math][/math]mit Pfeilen dar und berechne den Wert für a.

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[/img]

★★☆ [size=85][size=100]✏️ [/size][/size][br]Selina ist bei der Lösung der Gleichung [math]b:9=27[/math] ein Fehler unterlaufen. [br]Beschreibe, welcher Fehler Selina unterlaufen ist und finde die richtige Lösung mithilfe der Pfeildarstellung. [br][br][img]data:image/png;base64,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[/img]

[br]Selina hat fälschlicherweise die Subtraktion als Umkehroperation für die Division angewandt. [br]Die Division kann durch die Multiplikation umgekehrt werden. [br][br][img]data:image/png;base64,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[/img][br][br]

Information: Einfache Gleichungen lösen mittels Umkehroperationen