3. (10 points) The random variable Y has a normal probability distribution with the density funct...
Problem 2: 10 points A random variable, Z, has the Gamma distribution with the density: and f ()0, elsewhere. According to the notation in Probability Theory, Z has the distribution Gamma [2. Conditionally, given Zz, a random variable, U, is uniformly distributed over the interval, (0,z) 1. Evaluate the joint density function of the pair, (Z, U). Indicate where this density is positive. 2. Derive the marginal density, fU (u) 3. Find the conditional density of Z, given Uu. Indicate...
I . (20%) Random variable X has the probability density function as ; Random variable Y 2X+1 0 otherwise a) Determine A b) Determine the Probability Distribution Function F, (x) c) Determine E(X) and ơx d) Determine the probability density function fy(y) and E(Y)
Please solve part e! Priority! 1. (10 points) Let a random variable Y have probability density f(), 0 :otherwise (a) (2 points) Find the normalization constant c (b) (2 points) Write the expression for the cumulative distribution function (CDF) (c) (2 points) Find ElY] (d) (2 points) Find Var(Y)
3. (10 points) Let X be continuous random variable with probability density function: fx(x) = 7x2 for 1<<2 Compute the expectation and variance of X 4. (10 points) Let X be a discrete random variable uniformly distributed on the integers 1.... , n and Y on the integers 1,...,m. Where 0 < n S m are integers. Assume X and Y are independent. Compute the probability X-Y. Compute E[x-Y.
S 4, with the density function 1. (10 points) Let X be a continuous random variable on 3 S f(x) = 2x - 3). a/ CNculate Pr(3.2 S X) and Pr(3 < X) b/ Find E(X) and Var(x) 2. (10 points) For any number A, verify that fæ) -e-, 12 A is a density function. Compute the assocuated cumulative distribution for X
1. (15 points) Let X be a continuous random variable with probability density function f (x) c(1-), 0 < 1, where c is a constant. i) Find the constant c ii) What is the distribution function of X? ii) Let Y 1x<0.5 Find the conditional expectation E(X|Y). 1. (15 points) Let X be a continuous random variable with probability density function f (x) c(1-), 0
P7 continuous random variable X has the probability density function fx(x) = 2/9 if P.5 The absolutely continuous random 0<r<3 and 0 elsewhere). Let (1 - if 0<x< 1, g(x) = (- 1)3 if 1<x<3, elsewhere. Calculate the pdf of Y = 9(X). P. 6 The absolutely continuous random variables X and Y have the joint probability density function fx.ya, y) = 1/(x?y?) if x > 1,y > 1 (and 0 elsewhere). Calculate the joint pdf of U = XY...
A random variable Y has the density function f(y) = 1/3e^(y/3) Thank you! 1. (15 points points) A random variable Y has the density function f(y) => 3 - yco otherwise a) Find E(e) b) Find the moment-generating function for Y. c) Find Var (Y)
2. Let U be a continuous random variable with the following probability density function: 1+1 -1 <t<o g(t) = { 1-1 03151 0 otherwise a. Verify that g(t) is indeed a probability density function. [5] b. Compute the expected value, E(U), and variance, V(U), of U. (10)
If X is a normal random variable with μ =-2 and σ = 3, and has probability density function and cumulative density function fx (z), FX (z), calculate . P(-3< X < 0) F(1/4