0
Hallo,
ich habe in der Übungsklausur folgende Aufgabe:
![](data:image/png;base64,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)
μ ist ja der Erwartungswert und 9 ist die Standardabweichung.
Hier wollen wir herausfinden, dass für die Wahrscheinlichkeit von (Z>20) < 0,025 gelten soll.
Gibt es hier diesbezüglich eine Formel, die man anwenden kann, oder wie würde man bei diesem Problem vorgehen?
ich habe in der Übungsklausur folgende Aufgabe:
μ ist ja der Erwartungswert und 9 ist die Standardabweichung.
Hier wollen wir herausfinden, dass für die Wahrscheinlichkeit von (Z>20) < 0,025 gelten soll.
Gibt es hier diesbezüglich eine Formel, die man anwenden kann, oder wie würde man bei diesem Problem vorgehen?
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