5.7 Let X, X, be independent r.v.'s from the u(e -a, o+ b) distribution, where a...
3.13 Let X,..., X be i.i.d. r.v.'s from the Gamma distribution with parameters a known and β θ eQ (0,0) unknown. (i) Determine the Fisher information I(e). U = U (X, , ,X" ) = ' (ii) Show that the estimate ηα 1.1 is unbiased and calculate its variance.
5.8 If the independent r v.'s X1 X have the u-θ 9) distribution 0€ Ω = construct a moment estimate of θ? 0, o how can one (Hint: do not use the first moment.)
1.5 If Xi, ..., X, are independent r.v.'s distributed as B (k, θ), θ e Ω2(0.1), with respective observed values x, , xu, show that k is the MLE of θ, where x is the sample mean of the x's.
3.10 Let , X, be 1.1.d. r.v.'s with mean and variance Ơ2, both unknown. Then for any known constants c, , c., consider the linear estimate of μ defined by: (i) Identify the condition that the G's must satisfy, so that u' is an unbiased estimate of . (ii) Show that the sample mean X is the unbiased linear estimate of u with the smallest variance 1-1 (among all unbiased linear estimates of H). Hint. For part (ii), one has...
P(8), θ eQa(0 4.6 Let X, ..., X, be independent r.v.'s distributed as estimate δ(x , , x )-r and the loss function L ( , δ)-[8-6(5- ,o0 ), and consider the -5)]218. E,[e-5(X, ,X,)],andshow that it isin dependent ofe. R(0:δ)- (i) Calculate the risk (ii) Can you conclude that the estimate is minimax by using Theorem 9?
U means Uniform distribution 2. Let X be a r.v. distributed as U(α, β). Show that its ch. f. and m.g.f.x and Mr, respectively, are given by and IM x it(β-a) , t(B-a) ii) By differentiating (ax, show that E(X)-(α + β) / 2 and T 2 (X)-(α-β)2 / 12.
I. Let X be a random sample from an exponential distribution with unknown rate parameter θ and p.d.f (a) Find the probability of X> 2. (b) Find the moment generating function of X, its mean and variance. (c) Show that if X1 and X2 are two independent random variables with exponential distribution with rate parameter θ, then Y = X1 + 2 is a random variable with a gamma distribution and determine its parameters (you can use the moment generating...
Please show every step, thank you. Let Xi ~ N(μ, σ?), where ơỈ are known and positive for i-1, are independent. Let /- (a) Find the mean and variance of μ. (b) Compare μ to X,-n-Σί.i Xi as an estimator of μ. , n, and Xi, X, , E-1(1/o .m be the MLE of μ. Let Xi ~ N(μ, σ?), where ơỈ are known and positive for i-1, are independent. Let /- (a) Find the mean and variance of μ....
*** SOLVE 8 *** -7. Let X,, X,.. be a sequence of i.i.d. r.v.'s from NCO, 62. Using the MLE ah lEMIOO construct three 1-α asymptotic crs for θ Hint: Use the fact that the sample variance is asymptotically normal Solve the previous problem with Beta(1,0) in place of N(O,e2). -8.
3.3 Let X, ., X, be a random sample of size n from the U(0, e) distribution, Be Ω (0, o), and let Yz be the largest order statistic of the X,'s. Then (i) Employ formula (29) in Chapter 6 in order to obtain the p.d.f. of Y,. (ii) Use part (i) in order to construct an unbiased estimate of θ depending only on (iii) By Example 6 here (with α-0 and A-0) in conjunction with Theorem 3, show that...