Refer to Example 4.40. An urn contains six red balls, six white balls, and six blue...
Refer to Example 4.40. An urn contains six red balls, six white
balls, and six blue balls, and sample of four balls is drawn at
random without replacement.
Compute the probability that all of the balls in the sample are the
same color. (Round your answer to four decimal places.)
b) An urn contains eight red balls, eight white balls, and eight
blue balls, and sample of five balls is drawn at random without
replacement.
Compute the probability that the sample contains at least one ball
of each color. (Round your answer to four decimal places.)
Homework Answers
ANSWER
a)
Number of ways in which r items can be selected from n, nCr = n!/(r! x (n-r)!)
Total number of balls = 6+6+6 = 18
Number of selections possible = 18C4 = 3,060
Number of ways in which 4 red balls can be selected from 6 = 6C4 = 15
Number of ways in which 4 white balls can be selected from 6 = 6C4 = 15
Number of ways in which 4 blue balls can be selected from 6 = 6C4 = 15
P(all of the balls in the sample are the same color) = (15+15+15)/3060
= 0.0147
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