Answer to Question #198793 in Statistics and Probability for nil pori

Question #198793

Suppose that two machines I and II in a factory operate independently of each other. Past experience showed that during a given 8-hour time, machine I remains inoperative one third of the time and machine II does so about one fourth of the time. What is the probability that at least one of the machines will become inoperative during the given period

Expert's answer

Let "A'" denotes machine I is inoperative and "B'" denotes machine II is inoperative.

Given, "P(A') = \\dfrac{1}{3}", "P(A) = 1-P(A')=\\dfrac{2}{3}"

"P(B') = \\dfrac{1}{4} , P(B)=1-P(B')=\\dfrac{3}{4}", "P(II') = \\dfrac{3}{4}"

The probability that at least one of the machines will become inoperative during the given

period

"P(A)P(B')+P(A')P(B)+P(A')P(B')"

"=\\dfrac{2}{3}(\\dfrac{1}{4})+\\dfrac{1}{3}(\\dfrac{3}{4})+\\dfrac{1}{3}(\\dfrac{1}{4})"

"=\\dfrac{2+3+1}{12}=\\dfrac{1}{2}"

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Answer to Question #198793 in Statistics and Probability for nil pori

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