Wie oft passt der Durchmesser eines Kreises in den Umfang des Kreises? 

Wie groß ist der Umfang eines Kreises mit einem Durchmesser von 1 cm? [br][br]Valerie weiß, dass gilt: Verhältnis von u : d = 𝛑. [br]Im Schulbuch steht folgende Aufgabenstellung:[br][br][img width=538,height=289]https://lh7-rt.googleusercontent.com/docsz/AD_4nXdhDeAOZjqv2NaIra85EioWgpLofUYmrtejulWawF9pQpCeujjcnT47cZBBsd_n3yPyBQvoutbepTLVBhnb26plD69Bz41HbiKVqqWH1LLfCVFEtilopYoOa3HPPp35vkBzXQ904pgzbzB7DIp9cxsAoyIw?key=k5eBobxM7MHER_lMg6SFnQ[/img][br]Beantworte die Frage aus Valeries Schulbuch.

★☆☆ [img width=25,height=25]https://lh7-rt.googleusercontent.com/docsz/AD_4nXeSi_WZ9r2-JuhKOlFznw2cDuHFwav8D9VsCpZ9zpNdTiXQeGfir48TFl3968LCfULuwi-WwknBR2s-2B6dak655DwIs1LSpmrrrID5zQld1IMSJmaxwsk5gg994LkGOCcX0phcmw?key=ftHz2wNUzaZrAOG2GDkk5g[/img][br]Berechne den Umfang u des Kreises mit Durchmesser d = 4,5 cm. [br]Runde auf 2 Nachkommastellen.

★☆☆ [img width=25,height=25]https://lh7-rt.googleusercontent.com/docsz/AD_4nXeSi_WZ9r2-JuhKOlFznw2cDuHFwav8D9VsCpZ9zpNdTiXQeGfir48TFl3968LCfULuwi-WwknBR2s-2B6dak655DwIs1LSpmrrrID5zQld1IMSJmaxwsk5gg994LkGOCcX0phcmw?key=ftHz2wNUzaZrAOG2GDkk5g[/img][br]Berechne den Umfang u des Kreises mit Radius r = 1,7 cm. [br]Runde auf 2 Nachkommastellen.

★★☆ [img width=25,height=25]https://lh7-rt.googleusercontent.com/docsz/AD_4nXeSi_WZ9r2-JuhKOlFznw2cDuHFwav8D9VsCpZ9zpNdTiXQeGfir48TFl3968LCfULuwi-WwknBR2s-2B6dak655DwIs1LSpmrrrID5zQld1IMSJmaxwsk5gg994LkGOCcX0phcmw?key=ftHz2wNUzaZrAOG2GDkk5g[/img][br]Berechne den Umfang des gegebenen Kreises. [br][img]data:image/png;base64,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[/img]