Grundkompetenz: WS 1.3, WS 2.3

Spielzeugteile werden von einer Maschine in den Farben Rot, Gelb und Blau eingefärbt.

Die [math]3[/math] zur Produktion notwendigen Farbdüsen arbeiten (unabhängig voneinander) jeweils mit unterschiedlicher Qualität. Die Farbe Rot wird mit einer Wahrscheinlichkeit von [math]96,8\%[/math], die Farbe Gelb mit einer Wahrscheinlichkeit von [math]98,3\%[/math] und die Farbe Blau mit einer Wahrscheinlichkeit von [math]97,2\%[/math] so auf die Teile aufgetragen, dass diese die Qualitätskontrolle bestehen.[br][br][br][b][size=150][br]1) Berechnen Sie die Wahrscheinlichkeit, dass ein zweifärbiges Spielzeugteil in den Farben Rot und Blau die Qualitätskontrolle besteht.[/size][/b]

[b][size=150]2) Beschreiben Sie ein Ereignis [math]E[/math] im gegebenen Sachzusammenhang für ein zweifärbiges Spielzeugteil, dessen Wahrscheinlichkeit durch [math]P(E)=1-(0,968·0,983)[/math] berechnet wird.[/size][/b]

Die einfärbigen Spielzeugteile einer Produktion werden vermessen und ihre jeweiligen Längen werden tabellarisch erfasst.[br][img]data:image/png;base64,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[/img] [br][br][b][size=150][br][br]1) Ermitteln Sie den Median der Längen der gelben Spielzeugteile.[/size][/b]

[b][size=150]2) Zeigen Sie, dass das arithmetische Mittel der Längen der blauen Spielzeugteile gleich groß ist wie das arithmetische Mittel der Längen der roten Spielzeugteile.[/size][/b]