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A lot of 100 semiconductor chips contains 20 that are defective. (a) two are selected, at random, without replacement, from the lot. determine the probability that the second chip selected is defective. (b) three are selected, at random, without replacement, from the lot. determine the probability that all are defective.

Respuesta :

mathmate
Given: all selections are without replacement
Let D=event that chip is defective
N=event that chip is normal
note that D and N are complementary.
x=undefined event
(a) Second is defective
Probability for second chip to be defective
P(xD)=P(ND)+P(DD)
P(ND)=(80/100)*(20/99)=1600/9900
P(DD)=(20/100)*(19/99)=380/9900
=>
P(xD)=(1600+380)/9900=1980/9900=1/5

(b) All three are defective
P(DDD)=(20/100)*(19/99)*(18/98)=19/2695

Note: in probabilities, it is preferable to use the exact values (i.e. fractions).

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