exercise:E262d6a3b6: Difference between revisions

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A rookie is brought to a baseball club on the assumption that he will have a .300 batting average.  (Batting average is the ratio of the number of
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\newcommand{\mathds}{\mathbb}</math></div>  A rookie is brought to a baseball club on the assumption that he will
have a .300 batting average.  (Batting average is the ratio of the number of
hits to the number of times at bat.)  In the first year, he comes to bat 300
hits to the number of times at bat.)  In the first year, he comes to bat 300
times and his batting average is .267.  Assume that his at bats can be considered
times and his batting average is .267.  Assume that his at bats can be considered

Latest revision as of 22:57, 14 June 2024

A rookie is brought to a baseball club on the assumption that he will have a .300 batting average. (Batting average is the ratio of the number of hits to the number of times at bat.) In the first year, he comes to bat 300 times and his batting average is .267. Assume that his at bats can be considered Bernoulli trials with probability .3 for success. Could such a low average be considered just bad luck or should he be sent back to the minor leagues? Comment on the assumption of Bernoulli trials in this situation.