let X1, . . . , Xn i.i.d. Gamma(α, β), β > 0 known and α...

Let X1,...,Xn i.i.d. Gamma(α,β) with α > 0, β > 0 (a) Assume both α and...

Let X1,...,Xn i.i.d. Gamma(α,β) with α > 0, β > 0 (a) Assume both α and β are unknown, find their momthod of moment estimators: αˆMOM and βˆMOM. (b) Assume α is known and β is unknown, find the maximum likelihood estimation for β.

Let X1, X2, . . . Xn be iid random variables from a gamma distribution with...

Let X1, X2, . . . Xn be iid random variables from a gamma distribution with unknown α and unknown β. Find the method of moments estimators for α and β

Let X1, X2, . . ., Xn be independent, but not identically distributed, samples. All these...

Let X1, X2, . . ., Xn be independent, but not identically distributed, samples. All these Xi ’s are assumed to be normally distributed with Xi ∼ N(θci , σ^2 ), i = 1, 2, . . ., n, where θ is an unknown parameter, σ^2 is known, and ci ’s are some known constants (not all ci ’s are zero). We wish to estimate θ. (a) Write down the likelihood function, i.e., the joint density function of (X1, ....

Let X1, ... , Xn be a sample of iid Gamma(?, 1) random variables with ?...

Let X1, ... , Xn be a sample of iid Gamma(?, 1) random variables with ? ∈ (0, ∞). a) Determine the likelihood function L(?). b) Use the Fisher–Neyman factorization theorem to determine a sufficient statistic S for ?.

Let X1,…, Xn be a sample of iid Gamma(?, ?) random variables with ? known and...

Let X1,…, Xn be a sample of iid Gamma(?, ?) random variables with ? known and Θ=(0, ∞). Determine a) the MLE ? of ?. b) E(? ̂). c) Var(? ̂). e) whether or not ? is a UMVUE of ?.

Let X1. ..., Xn, be a random sample from Exponential(β) with pdf f(x) = 1/β(e^(-x/β)) I(0,...

Let X1. ..., Xn, be a random sample from Exponential(β) with pdf f(x) = 1/β(e^(-x/β)) I(0, ∞)(x), B > 0 where β is an unknown parameter. Find the UMVUE of β^2.

Let X1,X2,...,Xn be i.i.d. (independent and identically distributed) from the uniform distribution U(μ,μ+1) where μ∈R is...

Let X1,X2,...,Xn be i.i.d. (independent and identically distributed) from the uniform distribution U(μ,μ+1) where μ∈R is unknown. Find a minimal sufficient statistic for μ parameter.

Let X1, X2, · · · , Xn (n ≥ 30) be i.i.d observations from N(µ1,...

Let X1, X2, · · · , Xn (n ≥ 30) be i.i.d observations from N(µ1, σ12 ) and Y1, Y2, · · · , Yn be i.i.d observations from N(µ2, σ22 ). Also assume that X's and Y's are independent. Suppose that µ1, µ2, σ12 , σ22  are unknown. Find an approximate 95% confidence interval for (µ1µ2).

Let X1, . . . , Xn be iid from a Poisson distribution with unknown λ....

Let X1, . . . , Xn be iid from a Poisson distribution with unknown λ. Following the Bayesian paradigm, suppose we assume the prior distribution for λ is Gamma(α, β). (a) Find the posterior distribution of λ. (b) Is Gamma a conjugate prior? Explain. (c) Use software or tables to provide a 95% credible interval for λ using the 2.5th percentile and 97.5th percentile in the case where xi = 13 and n=10, assuming α = 1 andβ =...

4. Let X1. ..., Xn, be a random sample from Exponential(β) with pdf f(x) = 1/β(e^(-x/β))...

4. Let X1. ..., Xn, be a random sample from Exponential(β) with pdf f(x) = 1/β(e^(-x/β)) I(0, ∞)(x), B > 0 where β is an unknown parameter. Find the UMVUE of β2.