A personal computer manufacturer buys 36% of its chips from Japan and the rest from the United States. Of the Japanese chips, 1.9% are defective, and 1.2% of the American chips are defective.

Find the probability that a chip is defective. (Round your answer to four decimal places.)?

Given that the probability of finding a defective chip is conditioned by the probabilities of the chips come from, we deduce that we'll have to use the formulae for extraction without replacement:

P(D∪J) = P(J)*P(D/J)

P(D∪A) = P(A)*P(D/A)

We know that

[tex]P(J) = 0.36\\ P(A)=0.64\\ P(D/J)=0.019\\ P(D/A)=0.012[/tex]

So we can simply calculate

P(D∪J)+P(D∪A) = [tex]P(J)*P(D/J)+P(A)*P(D/A)[/tex]

P(D∪J)+P(D∪A) = [tex]0.36*0.019+0.64*0.012 = 0.01452[/tex]

Therefore the rounded answer to 4 decimals would be 0.0145.

A personal computer manufacturer buys 36% of its chips from Japan and the rest from the United States. Of the Japanese chips, 1.9% are defective, and 1.2% of the American chips are defective. Find the probability that a chip is defective. (Round your answer to four decimal places.)?

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A personal computer manufacturer buys 36% of its chips from Japan and the rest from the United States. Of the Japanese chips, 1.9% are defective, and 1.2% of the American chips are defective.

Find the probability that a chip is defective. (Round your answer to four decimal places.)?