★☆☆ [br]In einem blickdichten Behälter befinden sich 10 gleich große, farbige Kugeln: 2 weiße Kugeln, 5 lila Kugeln und 3 orange Kugeln. [br]Gib an, wie hoch die Wahrscheinlichkeit ist, eine orange Kugel zu ziehen. [br]

★☆☆ [br]✋ Du benötigst: Bleistift, Geodreieck [br]In einem blickdichten Behälter befinden sich 100 Lose. [br]Es darf ein Los gezogen werden. [br][br]Die Tabelle stellt die möglichen Ereignisse und die Anzahl der dafür günstigen Ergebnisse dar. [br]Gib jeweils die zugehörige Wahrscheinlichkeit an. [br][img width=475,height=128]https://lh7-rt.googleusercontent.com/docsz/AD_4nXeey3wHhncwmSNGef9gdxjw2GlFDoSkjGwhyHgdHU5LTrsSS1OrM3PlbaM63OmLfqnGSaExr5Up1oE1HehtHzTnMxtTMXDWNEBnM4q0GuNSxSf-U6D7BN5TyqegqtdWgHsyIrvf?key=u0x9ykmRBqd7diWD1peohQ[/img]

★☆☆ [br]Von den 20 Kugeln in einem blickdichten Behälter sind 6 Kugeln pink. [br]Eine Kugel wird nach dem Zufallsprinzip gezogen.[br][img width=158,height=191]https://lh7-rt.googleusercontent.com/docsz/AD_4nXedshEusnjsR3yo0zj6mt3J0-eA7JK1SJCAW-Wiei4QBNz_qqrJS4siYIj8sQDKHkI9g2XJN-nxxuLwUhQwoOMohXSbTTnZ5ZOflluj7BDCWDTjA2812FZ-HxNO2TtBc1MdOXF37A?key=u0x9ykmRBqd7diWD1peohQ[/img][br][br][br]Wie hoch ist die Wahrscheinlichkeit, eine pinke Kugel zu ziehen?[br]Finde die drei richtigen Werte.

★★☆ [br]In einem blickdichten Behälter befinden sich 10 gleich große Kugeln: [br]2 weiße, 5 lila und 3 orange Kugeln. [br]Sami behauptet, dass die Wahrscheinlichkeit für das Ziehen einer weißen Kugel 20 % beträgt.[br]Begründe, warum Samis Aussage richtig ist.

★★★[br]Ayla betrachtet ein weiteres Glücksrad und ermittelt die Wahrscheinlichkeiten aller möglichen Ergebnisse. [br]Diese Wahrscheinlichkeiten schreibt sie in einer Tabelle an. [br]Ayla behauptet: “Wenn ich die Wahrscheinlichkeiten aller Ergebnisse addiere, erhalte ich als Summe 1.” [br][img width=148,height=182]https://lh7-rt.googleusercontent.com/docsz/AD_4nXed8CIYU4Zcv_uq82iVTKnvmU24MlzqQ2wfQZdous6Q09n-RKr7FR6bxycV4bDbfoNyqhL856GaPzNC39FSxHdIK4-HqA4VKqdPUXc0cwnLS9C7Gt51YNtDx_lK0mDQ8ClLLhskUDzuiTM5Pmu57JKtT4c?key=ggDx0BROuKjWUmUMAHUB-g[/img][br][img]data:image/png;base64,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[/img][br]Überprüfe Aylas Aussage an diesem Beispiel. [br]Beschreibe, warum diese Aussage immer stimmt.

★★★[br]Für ein Gewinnspiel soll ein blickdichter Behälter mit 50 Losen befüllt werden.[br]Die Wahrscheinlichkeit, einen Hauptgewinn zu erhalten, soll [math]\frac{1}{10}[/math] betragen. [br]Ermittle, wie viele Gewinnlose in den Behälter gefüllt werden müssen. [br]