Suppose that X1, . . . , Xn are independent Bernoulli random variables, each having probability mass
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Suppose that X1, . . . , Xn are independent Bernoulli random variables, each having probability mass function given by f (x|θ) = θx(1 − θ)1−x , x = 0, 1 where θ is unknown. Further, suppose that θ is chosen from a uniform distribution on
(0, 1). Compute the Bayes estimator of θ.
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Related Book For 
Introduction To Probability And Statistics For Engineers And Scientists
ISBN: 9780125980579
3rd Edition
Authors: Sheldon M. Ross
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