★★☆ [br]Für ein Gewinnspiel werden in einem blickdichten Behälter 100 Lose mit verschiedenen Preisen vorbereitet. [br]Es gibt 1 Hauptpreis und 24 Trostpreise. Die restlichen Lose sind Nieten und bringen daher keinen Gewinn. [br]Ein Los wird zufällig gezogen. [br][br]Welche Aussagen zur Wahrscheinlichkeit W sind richtig?

★★☆ [br]Bei einem Sommerfest gibt es drei Glücksspiele. [br]Beim Glücksspiel A gibt es 150 Lose. Davon bringen 30 Lose einen Gewinn. [br]Beim Glücksspiel B gibt es 100 Lose. Davon bringen 15 Lose einen Gewinn. [br]Beim Glücksspiel C gibt es 50 Lose. Davon bringen 20 Lose einen Gewinn. [br][br]Sami zieht bei allen drei Glücksspielen genau 1 Los. [br]Begründe mithilfe von Wahrscheinlichkeiten, bei welchem Glücksspiel Samis Gewinnchancen am größten sind.

★★☆ [br]Bei einem Gewinnspiel können folgende Preise gewonnen werden: [br][img]data:image/png;base64,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[/img][br]Es werden 100 Lose für je 3 € verkauft. [br]Ermittle, wie hoch der erwartete Gewinn pro Los ist und beurteile, ob es sich um ein faires Gewinnspiel handelt.