10.17 and 10.19 (a and b) please Problem 10.17] Show that the mean of a random...

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10.17 and 10.19 (a and b) please
Problem 10.17] Show that the mean of a random sample of size n from an exponential population is a minimum variance unbiased estimator of the parameter θ.

Problem 10.17] Show that the mean of a random sample of size n from an exponential population is a minimum variance unbiased estimator of the parameter θ.

[Problem 10.19] The information about 0 in a random sample of size n is also given by 62In -n 002 where f(x) is the value of the population density at r, provided that the extremes of the region for which f(x) 0 do not depend on θ. The derivation of this formula takes the following steps: (a) Differentiating the expressions on both sides of with respect to θ, show that : aline) . f(z)dz = 0 by interchanging the order of integration and differentiation. (b) Differentiating again with respect to 0, show that E (Inf(X) [a2 In f(X)]

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