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z-1)2 2 2 ( Let g(z) = exp for some fixed parameters μ and σ2 and...
4. The moment generating function of the normal distribution with parameters μ and σ2 is (t) exp ( μ1+ σ2t2 ) for -oo < t oo. Show that E X)-ψ(0)-μ and Var(X)-ψ"(0)-[ty(0)12-σ2. 5. Suppose that X1, X2, and X3 are independent random variables such that E[X]0 and ElX 1 for i-12,3. Find the value of E[LX? (2X1 X3)2] 6. Suppose that X and Y are random variables such that Var(X)-Var(Y)-2 and Cov(X, Y)- 1. Find the value of Var(3X -...
Problem 5 of 5Sum of random variables Let Mr(μ, σ2) denote the Gaussian (or normal) pdf with Inean ,, and variance σ2, namely, fx (x) = exp ( 2-2 . Let X and Y be two i.i.d. random variables distributed as Gaussian with mean 0 and variance 1. Show that Z-XY is again a Gaussian random variable but with mean 0 and variance 2. Show your full proof with integrals. 2. From above, can you derive what will be the...
1. Fisher information i(): Let X ~ N(μ, 1), where μ is unknown. Calculate l(u) Let X ~ N(0,02), where σ2 is unknown. Calculate 1(σ2). Let X ~ Exp(λ), where λ is unknown. Calculate la).
σ2). 6. Suppose X1, Yİ, X2, Y2, , Xn, Y, are independent rv's with Xi and Y both N(μ, All parameters μί, 1-1, ,n, and σ2 are unknown. For example, Xi and Yi muay be repeated measurements on a laboratory specimen from the ith individual, with μί representing the amount of some antigen in the specimen; the measuring instrument is inaccurate, with normally distributed errors with constant variability. Let Z, X/V2. (a) Consider the estimate σ2- (b) Show that the...
Let σ2 be the variance of a random variable X, show that σ2 = μ′2 − μ2 where μ′2 is the second moment about the origin and μ is the mean of X.
, X,' up N(μ, σ2), with σ2 known. Let μη-Xn + 5. Let Xi, of u be an estimator (a) Is ,hi an unbiased estimator for μ? (b) For a particular fixed n, find the distribution of (c) Find the mean squared error (MSE) of . (d) Prove that μη is consistent for μ
3. Let Y ~N(μ, σ2), that is, e2g2 (y-H)2 2πσ2 Let ZY, Use the method of transformations to find fz() How is the distribution fz(z) referred to? Name the distribution and the parameters
5, (2 pt) Assume that the variance σ2 is known. Let the likelihood of μ oe i-1 Let θ' and θ', be distinct fixed values of θ so that Ω-10; θ-θ'), and let k be a positive number. Let C be a subset of the sample space such that () for each point z E C. (b) for each point C. L(0"a) Show that C is the best critical region of size α for testing: H0 : θ- 5, (2...
-wa exp{-(20 )2}, where The Normal(μ,02) distribution has density f(x) -oo < μ < oo and σ > 0. Let the randon variable T be such that X-log(T) is Normal(μ, σ2). Find the density of T. This distribution is known as the log normal Do not forget to indicate where the density of T is non-zero. 10.
8. Let X, X2, , xn all be be distributed Normal(μ, σ2). Let X1, X2, , xn be mu- tually independent. a) Find the distribution of U-Σǐ! Xi for positive integer m < n b) Find the distribution of Z2 where Z = M Hint: Can the solution from problem #2 be applied here for specific values of a and b?