[b]Definition:[/b][br]Ein Kreis ist die Menge aller Punkte einer Ebene, die zu einem Punkt (Mittelpunkt) denselben Abstand (Radius) haben.[br][br][img]data:image/png;base64,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[/img][br][i][b]K[/b][/i]: Die Kreislinie[br][i][b]M[/b][/i]: Der Mittelpunkt[br][br][b][i]d[/i][/b]: Der Durchmesser[br][b][i]r[/i][/b]: Der Radius[br][br][b][i]U[/i][/b]: Der Kreisumfang = Die Länge der Kreislinie.[br][b][i]A[/i][/b]: Die Kreisfläche = Die Menge aller Punkte einer Ebene, die zum Mittelpunkt höchstens den Abstand r haben.[br][br][br][br]

Verändere den Radius des Kreises und rolle den Umfang des Kreises ab.[br]Untersuche das Verhältnis von Durchmesser und Kreisumfang verschiedener Kreise. ([math]\frac{Kreisumfang}{Durchmesser}[/math]) [br]Was fällt dir auf?

Schau dir das Video auf Studyflix zur Zahl [b]π[/b] an:[br]https://studyflix.de/mathematik/zahl-pi-4708[br][br]Schreibe eine Definition für die Zahl [b]π[/b] in dein Heft.

Schreibe eine kurze Erklärung in dein Heft, warum der Zusammenhang zwischen Radius und Kreisumfang so ist.[br][br][br][br]

Damit wir die Kreisfläche berechnen können, wäre es praktisch, wenn wir den Kreis so auseinanderschneiden und zusammensetzen, dass es eine Form gibt, die wir bereits berechnen können.[br]Versuche die Formel für die Kreisfläche Schritt für Schritt herzuleiten.

Mache eine kleine Skizze zur Herleitung in dein Heft und schreibe die Formel für den Flächeninhalt dazu.

Schreibe eine kurze Erklärung in dein Heft, warum der Zusammenhang zwischen Radius und Kreisfläche so ist.[br][br][br][br]