statistics
1. A statistician has a sample X1, . . . , Xn from N(µ, σ 2). Also, the statis-
tician has a sample Y1, . . . , Yk from an exponential distribution with param- eter γ. Suppose that these samples are independent. Find the variance of a random variable Z = 3X̄ − 5Ȳ .
2. Let a sample of size n from a distribution with the pdf f(x) be given. What is the pdf of X(1)?
3. Let X1, . . . , Xn be independent RVs with Eθ(Xl) = lθ. Consider an es- timator Θ̂ =
∑n l=1 alXl. What condition should be imposed on a1, a2, . . . , an
so that Θ̂ is an unbiased estimator? 4. Let X1, . . . , Xn be iid Bernoulli with the probability of success θ. Sug-
gest the minimal variance unbiased estimator, and then prove, using Cramer- Rao inequality, its efficiency.
5. Consider a sample of size n from Unif(α, β). Find (minimal) sufficient statistic for the pair (α, β).
6. Consider a sample of size n from Unif(0, θ). Find a method of mo- ments estimator of θ.
7. Let we observe a sample X1, . . . , Xn where Xl = θ + Yl, with Yl being iid Expon(λ). Find the MLE of θ. Hint: Do not forget about support of the exponential RV.
8. For the problem 7, let θ be given. Find the MLE of cos(λ). 9. Consider a sample of size n from Poisson(λ). Find a method of
moments estimator for the estimand λ2. 10. Let a sample of size n from N(θ, σ2) be given. A statistician believes
that θ is a realization of a normal random variable Θ ∼ N(µ, ν2). Find the Bayesian estimator of θ. [Please write down all your steps — just an answer will not be counted.]
publichtml/class4352/exam43521.tex
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