★☆☆ [br]Beschreibe, wie Brüche potenziert werden können.[br]Verwende für deine Antwort die Begriffe der Wortwolke.[br][img]data:image/png;base64,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[/img][br]

★☆☆ [br]Berechne folgenden Term:[br][math]\left(\frac{1}{2}\right)^3[/math] =

★☆☆ [br]Berechne folgenden Term:[br][math]\left(\frac{3}{4}\right)^2[/math] =

★☆☆ [br]Welche Regel gilt?

★★☆[br]Welche Hochzahl muss an Stelle des Apfels (🍎) stehen?[br][img width=135,height=64]https://lh7-rt.googleusercontent.com/docsz/AD_4nXe31m_76rZbIlUnJvW_nasr0bL8CMWKGIXuLgllTYz8BX2-IZAITn-lMgWcMSL3wHcNSJM7Nhnkuk-xUXFEBixpyKLNByWcCTSajurZ-ghaOZExcjUk7xS-AvdXYCC0o5Q7Mx3fHA?key=y56Ht9frK9E53LVW4EAz3w[/img]

★★☆[br]Welche Hochzahl muss an Stelle des Lollies (🍭) stehen?[br][img width=125,height=72]https://lh7-rt.googleusercontent.com/docsz/AD_4nXe14cVHr79yEUV0Dl2L7EcPqPxuDVWudZhlboiCjS2G7DWVtIE7rjvqBttA3WNz9W_DHZdmkoMhrGR4V9W-9mEHB_xzy5dvrsHgvf0JgJQvfoljnTgrWecS7tnW2u4VRd8xwZ3I0w?key=y56Ht9frK9E53LVW4EAz3w[/img][br]

★★☆[br]Welche Hochzahl muss an Stelle der Erdbeere (🍓) stehen?[br][img width=132,height=63]https://lh7-rt.googleusercontent.com/docsz/AD_4nXcS8Z7oUc130qUXcaNPep3oftNajtE-V_n2Oi2xkqi6mJV9PPvwDZb1ig1zs7rpBtTVPESmHLG3yFS3JPL4lkOkB6fiYlcNazcZw_jIn2UfBLsKq6QvKTWkMLaLtLaZbWXHwAJb4w?key=y56Ht9frK9E53LVW4EAz3w[/img][br]

★★☆[br]Jonas berechnet [math]\left(\frac{2}{3}\right)^3=\frac{2^3}{3}=\frac{8}{3}[/math][br]Dabei ist Jonas ein Fehler unterlaufen.[br]Beschreibe, welcher Fehler Jonas unterlaufen ist und stelle richtig.