Problem 3. Let Xi,..., Xn be independent with common density 110 < æ < 1 Set...
Let X1, . . . , Xn be independent with common density f(x) = 2x 1[0 < x < 1]. Set Vn = max(X1, . . . , Xn). (a) Verify Vn → 1 in P. (b) Show that n(1-Vn) → W in D holds for some random variable W and find the distribution function of W.
Problem 4. Let X1, . . . , Xn be independent with common density f(x) = 2x 1[0 < x < 1]. Set Vn = max(X1, . . . , Xn). . (b) Show that n(1 − Vn) → W in D holds for some random variable W and find the distribution function of W
Problem 9. Let Xi, X2,... , Xn be independent 2/ (0,1) random variables. Set F(t) Is there a matrix M such that holds with independent standard normal random variables Z1, Z2, Z3? If so, calculate M.
Problem 2: Let Xi, X2,..., Xn be i.i.d. random variables with common probability density function 3 -6x21 (i) Calculate the MLE of 0 (ii) Find the limit distribution of Vn(0MLE - 0) and use this result to construct an approximate level 1-α C.I. for θ. [Your confidence interval must have an explicit a form as possible for full credit.] (iii) Calculate μι (0)-E0(Xi) and find a level 1-α C.İ. for μι (0) based on the result in (ii) or by...
Let Xi,.,Xn be independent random variables with common probability density f(x) = ה sin(x) , x E [0, π] (a) Assuming EX,] = 2, calculate Var(X). (b) Assuming Var(Xs + + X,) = Var(X) + Var(Xn) and if a, b є R that Var(ax, + b) = a2Var(X), calculate the mean and the variance of Zn, defined [1 as follows: Var(X1+...+ Xn)
(7) Let X1,Xn are i.i.d. random variables, each with probability distribution F and prob- ability density function f. Define U=max{Xi , . . . , X,.), V=min(X1, ,X,). (a) Find the distribution function and the density function of U and of V (b) Show that the joint density function of U and V is fe,y(u, u)= n(n-1)/(u)/(v)[F(v)-F(u)]n-1, ifu < u. (7) Let X1,Xn are i.i.d. random variables, each with probability distribution F and prob- ability density function f. Define U=max{Xi...
Problem 9. Let Xi,..., Xn be a random sample from the distribution function F. Set rt j-1 a.s (1) Show that Fn (t) ^* F(t) for each t eR (2) Show that n/2(Fm(t) Ft)) »,z~(0, F) Ft)) for each t for which F(( F(t) is positive.
4. Let Xi,.. . , Xn be a random sample from a distribution with the density function 62(1-x), if 0〈x〈1; f(x) = elswhere. As usual, define First determine the mean and variance of the given distribution. What is an approximate distribution of Xn? For a sample of size 75, what are the exact mean and variance for Xn?
3. (a) (5 points) Let Xi,... be a sequence of independent identically distributed random variables e of tnduqendent idente onm the interval (o, 1] and let Compute the (almost surely) limit of Yn (b) (5 points) Let X1, X2,... be independent randon variables such that Xn is a discrete random variable uniform on the set {1, 2, . . . , n + 1]. Let Yn = min(X1,X2, . . . , Xn} be the smallest value among Xj,Xn. Show...
2. Let Xi, X2, . Xn be a random sample from a distribution with the probability density function f(x; θ-829-1, 0 < x < 1,0 < θ < oo. Find the MLE θ