Revision as of 08:51, 26 June 2024 by Admin (Created page with "'''Solution: B''' There are 500 coins in each box with one fake, so the probability that he finds at least one fake when he randomly selects 2 coins from a single box equals 1-(499/500)*(498/499) = 0.004. Then the number of fakes that he finds after testing 250 boxes is a binomial distribution with parameters <math>n=250, p=0.004 </math> and therefore the probability that he finds at least one fake is 1 minus the probability of not finding any fakes: 1-(1-0.004)<sup>2...")
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Exercise

ABy Admin
Jun 26'24

Answer

Solution: B

There are 500 coins in each box with one fake, so the probability that he finds at least one fake when he randomly selects 2 coins from a single box equals 1-(499/500)*(498/499) = 0.004.

Then the number of fakes that he finds after testing 250 boxes is a binomial distribution with parameters [math]n=250, p=0.004 [/math] and therefore the probability that he finds at least one fake is 1 minus the probability of not finding any fakes: 1-(1-0.004)250 = 0.6329.

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