Find the joint pdf of the random sample Y1,...,Yn from the following distributions:
a. Poisson(λ).
b.N(0,σ2).
Find the joint pdf of the random sample Y1,...,Yn from the following distributions: a. Poisson(λ). b.N(0,σ2).
Let Y1,K,Y n denote a random sample from a Poisson distribution with parameter λ . a. Find a sufficient statistics for λ. b. Find the minimum variance unbiased estimator(MVUE) of λ2 .
Example 7. Let Y1, ... ,Yn be a random sample from a Rayleigh distribution with pdf Ske-?/(20) f(y\C) = 10 = if y>0,0 > 0 otherwise otherwise Find a sufficient statistic for 0.
7. Let Y1, ...,Yn be a random sample from the population with pdf f(316) = he=1/0, y>0 (a) Find the MOM estimator for 0. (b) Find the MLE of 0. (c) Find the MLE of P(Y < 2). (d) Find the MLE of the median of the distribution.
1. Suppose X1, ..., Xn be a random sample from Exp(1) and Y1 < ... < Yn be the order statistics from this sample. a) Find the joint pdf of (Y1, .. , Yn). b) Find the joint pdf of (W1, .. , Wn) where W1 = nY1, W2 = (n-1)(Y2 -Y1), W3 = (n - 2)(Y3 - Y2),..., Wn-1 = 2(Yn-1 - Yn-2), Wn = Yn - Yn-1. (c) Show that Wi's are independent and its distribution is identically...
Find the moment generating function for the following distributions: N(μ, σ2), Poisson(λ), Gamma(α, β), Chi-square with k degrees of freedom, and Geometric(p). Question 7: Find the moment generating function for the following distributions: N(Lơ2 Poisson(A), Gamma(α, β), Chi-square with k degrees of freedom, and Geometric(p)
Let Y1, Y2,. . , Yn be a random sample from the population with pdf f(u:)elsewhere (a) If WIn Yi, show that W, follows an exponential distribution with mean 1/0. (b) Show that 2θΣηι W, follows a χ2 distribution with 2n degrees of freedom. (c) It turns out that if X2 distribution with v degrees of freedom, then E( Use this to show
Let Y1<Y2<...<Yn be the order statistics of a random sample of size n from the distribution having p.d.f f(x) = e-y , 0<y<, zero elsewhere. Answer the following questions. (a) decide whether Z1 = Y2 and Z2=Y4-Y2 are stochastically independent or not. (hint. first find the joint p.d.f. of Y2 and Y4) (b) show that Z1 = nY1, Z2= (n-1)(Y2-Y1), Z3=(n-2)(Y3-Y2), ...., Zn=Yn-Yn-1 are stocahstically independent and that each Zi has the exponential distribution.(hint use change of variable technique)
8.5 Random variables Y1,... , Yn have a joint normal distribution with mean 0 if there exist independent random variables Xi,... , Xn, each normal mearn 0, variance 1, and constants aij such that Y aiX1+.. +ainXn Let Xt be a standard Brownian motion. Let s1 s2 sn. Explain why it follows from the definition of a Brownian motion that Xs1,... , Xs, have a joint normal distribution. 8.5 Random variables Y1,... , Yn have a joint normal distribution with...
5. Consider a random sample Y1, . . . , Yn from a distribution with pdf f(y|θ) = 1 θ 2 xe−x/θ , 0 < x < ∞. Calculate the ML estimator of θ. 6. Consider the pdf g(y|α) = c(1 + αy2 ), −1 < y < 1. (a) Show that g(y|α) is a pdf when c = 3 6 + 2α . (b) Calculate E(Y ) and E(Y 2 ). Referencing your calculations, explain why M1 can’t be...
Q- If Y1,…,Yn is an i.i.d. random sample from a population with mean μY and variance σ2Y, which of the following is not true? 1) Y1,…,Yn are identically distributed random variables 2) Y1,…,Yn are mutually independent random variables 3) Var(Y¯)=σ2Y 4) E(Y¯)=μY