How to find the conditional expectation E[Y|?], and also the expectation ExE[Y|?] from pdf

The joint PDF of X and Y is given by fX,Y(x, y) = nx^ne^(?xy) , 0...

The joint PDF of X and Y is given by fX,Y(x, y) = nx^ne^(?xy) , 0 < x < 1, y > 0, where n is an integer and n > 2. (a) Find the marginal PDF of X and its mean. (b) Find the conditional PDF of Y given X = x. (c) Deduce the conditional mean and the conditional variance of Y given X = x. (d) Find the mean and variance of Y . (e) Find the...

Let X be a discrete r.v. and Y be a continuous r.v. such that the conditional...

Let X be a discrete r.v. and Y be a continuous r.v. such that the conditional distribution of X given Y = y is a (discrete) geometric distribution with probability for success p, and such that Y has pdf f_Y(y) = 3y for 0 < y < 1 (and zero otherwise). a) Compute the pmf of X. b) Compute E[X]. c) Does the r.v. Var(X | Y) have a finite expectation?

Find the conditional mean and conditional variance of the random variable given the pdf: exp(-x)u(x) given...

Find the conditional mean and conditional variance of the random variable given the pdf: exp(-x)u(x) given X>1

1. Let (X,Y ) be a pair of random variables with joint pdf given by f(x,y)...

1. Let (X,Y ) be a pair of random variables with joint pdf given by f(x,y) = 1(0 < x < 1,0 < y < 1). (a) Find P(X + Y ≤ 1). (b) Find P(|X −Y|≤ 1/2). (c) Find the joint cdf F(x,y) of (X,Y ) for all (x,y) ∈R×R. (d) Find the marginal pdf fX of X. (e) Find the marginal pdf fY of Y . (f) Find the conditional pdf f(x|y) of X|Y = y for 0...

Suppose the continuous random variables X and Y have joint pdf: fXY (x, y) = （1/2）xy...

Suppose the continuous random variables X and Y have joint pdf: fXY (x, y) = （1/2）xy for 0 < x < 2 and x < y < 2 (a) Find P(X < 1, Y < 1). (b) Use the joint pdf to find P(Y > 1). Be careful setting up your limits of integration. (c) Find the marginal pdf of Y , fY (y). Be sure to state the support. (d) Use the marginal pdf of Y to find P(Y...

(i) Find the marginal probability distributions for the random variables X1 and X2 with joint pdf...

(i) Find the marginal probability distributions for the random variables X1 and X2 with joint pdf                     f(x1, x2) = 12x1x2(1-x2) , 0 < x1 <1   0 < x2 < 1 , otherwise             (ii) Calculate E(X1) and E(X2)     (iii) Are the variables X1 ­and X2 stochastically independent? Given the variables in question 1, find the conditional p.d.f. of X1 given 0<x2< ½ and the conditional expectation E[X1|0<x2< ½ ].

Suppose the continuous random variables X and Y have joint pdf: fXY (x, y) = （1/2）xy...

Suppose the continuous random variables X and Y have joint pdf: fXY (x, y) = （1/2）xy for 0 < x < 2 and x < y < 2 (a) Find P(Y < 2X) by integrating in the x direction first. Be careful setting up your limits of integration. (b) Find P(Y < 2X) by integrating in the y direction first. Be extra careful setting up your limits of integration. (c) Find the conditional pdf of X given Y = y,...

pdf of X is: ƒχ(x) = e⁻x, x>0, 0, otherwise Y = (X - 1)² find...

pdf of X is: ƒχ(x) = e⁻x, x>0, 0, otherwise Y = (X - 1)² find pdf of Y

The random variables X and Y have the joint PDF FX,Y(x,y) = { 6*e^-(3x + 2y)...

The random variables X and Y have the joint PDF FX,Y(x,y) = { 6*e^-(3x + 2y) 0 <= x, y { 0 otherwise (a) Show whether X and Y are independent or not. (b) Find the PDF of fX,Y |B(x,y) where B represents the event X + Y < 3 (c) Find fY | B(x) where B represents the event X + Y < 3

The joint probability density function (pdf) describing proportions X and Y of two components in a...

The joint probability density function (pdf) describing proportions X and Y of two components in a chemical blend are given by f(x, y) = 2, 0 < y < x ≤ 1. (a) Find the marginal pdfs of X and Y. (b) Find the probability that the combined proportion of these two components is less than 0.5. (c) Find the conditional probability density function of Y given X = x. (d) Find E(Y | X = 0.8).