Ten eggs are drawn succesively with replacement from a lot of 100 eggs containing 10 rotten eggs. Then the probability that there is at least one rotten egg is:
A
991010
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B
1−(910)10
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C
(910)10
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D
1−(110)10
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Solution
The correct option is B1−(910)10 Let X denotes the number of rotten eggs in the 10 eggs drawn. Since the drawing is done with replacement, the trials are Bernoulli trials. Clearly, X has the binomial distribution with n=100andp=10100=110
Therefore q=1−p=910
Now P(at least one rotten egg) =P(X≥1)=1−P(X=0)=1−10C0(910)10=1−9101010