3. (4 points) The random variables X and Y are independent and have moment generating functions...
5 (10 points) X and Y are independent random variables with common moment generating function M(t) eT. Let W X + Y and Z X - Y. Determine the joint moment generating function, M(ti, t2) of W and Z Find the moment generating function of W and Z, respectively
Random variables X and Y have following distributions: PIX = -4) = 2/3, P(X = -1) = 1/3 PſY = 2) = 1/2, P(Y = 3) = 1/2 a) (5 points) Using the moment generating functions for the random variables above find: E[X+Y] b) (5 points) Using the moment generating functions for the random variables above find: Var(X+Y)
The moment generating function (MGF) for a random variable X is: Mx (t) = E[e'X]. Onc useful property of moment generating functions is that they make it relatively casy to compute weighted sums of independent random variables: Z=aX+BY M26) - Mx(at)My (Bt). (A) Derive the MGF for a Poisson random variable X with parameter 1. (B) Let X be a Poisson random variable with parameter 1, as above, and let y be a Poisson random variable with parameter y. X...
Random variables X and Y have following distributions. P(X = -1) = 3/4, P(X = 3) = 1/4 P(Y = -3) = 1/2, P(Y = 2) = 1/2 a) Using the moment generating functions for random variables above find: E[X+Y) b) Using the moment generating functions for random variables above find: Var(X+Y)
Random variables X and Y have following distributions: PIX = -1) = 2/3, PIX = 2) = 1/3 PIY = -2) = 1/2, PſY = 3) = 1/2 a) (5 points) Using the moment generating functions for the random variables above find: E[X+Y] b) (5 points) Using the moment generating functions for the random variables above find: Var(X+Y)
Random variables X and Y have following distributions. PIX = -1) = 3/4, P(X = -2) - 1/4 PLY = 3) = 1/2, PIY = 2) = 1/2 a) Using the moment generating functions for random variables above find: E[X+Y] b) Using the moment generating functions for random variables above find: Var(X+Y)
Random variables X and Y have following distributions. PIX = -1) = 3/4, PIX = -2) = 1/4 PIY = 3) = 1/2, P(Y = 2) = 1/2 a) Using the moment generating functions for random variables above find: E[X +Y] b) Using the moment generating functions for random variables above find: Var(X + Y)
Let X and Y be independent random variables, with known moment generang functions Mx(t) and My (t) and Z be such that P(Z = 1) = 1-P(Z 0) = p E (0,1). Compute the moment generating function of the random variable S- ZX (1 - Z)Y. [The distribution of S is called a mirture of the distributions of X and Y.] Your answer can be left in terms of Mx(t) and My (t) Hint: If you don't know how/where to...
2. -30 a) The joint pdf of random variables X and Y is given by f(x,y) = 27ye-3 y<x<0, y >0. Show that the joint moment generating function(mgf) of X and Y is 27 M(t1, tz) = tı <3, tı + t, <3 (3 - tı) (3 - 7ı - t2) Use the joint mgf to obtain Cov(X,Y). b) Let X1, X2, X3 be independent random variables representing the lifetime of 3 electronic components with the following pdf, where X...
Consider these three moment generating functions, for X, Y and Z: (5 points each) m (t)=W-3 m, (t)=e + m,(t)=eW-7 a. What is the mean of X? b. What is the mean of Y? c. What is the mean of Z? d. What is the variance of X? e. What is the variance of Y? f. What is the variance of Z? Consider independent random variables X and Y with the following pmfs: y=1 (0.5 x=1 S(x)= {0.5 x =...