Let X be a continuously uniform random variable under the domain of 0 and 1, 7....
Let the random variable X have a uniform distribution on [0,1] and the random variable Y (independent of X) have a uniform distribution on [0,2]. Find P[XY<1].
Let X be a uniform(0, 1) random variable and let Y be uniform(1,2) with X and Y being independent. Let U = X/Y and V = X. (a) Find the joint distribution of U and V . (b) Find the marginal distributions of U.
Let $(x) = 2x2 and let Y = $(X). assume that Y ~ U(0,1/2) and that X is a continuous random variable. fx(x) = 0 whenever |2| > 1. Obtain an expression linking fx(x) to fx(-x) for xe (-1,1). Show that E[X] = -2/3 + 28. xfx(x) dx. Using your expression linking fx(x) and fx(-x), obtain an upper bound for E[X] and a pdf fx for which this bound is attained. [10]
Let X be a uniform random variable over (0,1). Let a and b be two positive numbers and let Y = aX+b. (a) Determine the moment generating function of X. (b) Determine the moment generating function of Y. (c) Using the moment generating function of Y, show that Y is uniformly distributed over an interval(a, a+b).
1. Let X be a continuous random variable with the probability density function fx(x) = 0 35x57, zero elsewhere. Let Y be a Uniform (3, 7) random variable. Suppose that X and Y are independent. Find the probability distribution of W = X+Y.
Let X and Y be independent random variables. Random variable X has a discrete uniform distribution over the set {1, 3} and Y has a discrete uniform distribution over the set {1, 2, 3}. Let V = X + Y and W = X − Y . (a) Find the PMFs for V and W. (b) Find mV and (c) Find E[V |W >0].
2. Let Xbe a random variable with a continuous uniform density between -1 and 1, i.e, X U(-1,1) Random variable Y is defined by the following transformation: (1) Var(Y)-?
2. Let Xbe a random variable with a continuous uniform density between -1 and 1, i.e, X U(-1,1) Random variable Y is defined by the following transformation: (1) Var(Y)-?
2. Let Xbe a random variable with a continuous uniform density between -1 and 1, i.e, X U(-1,1) Random variable Y is defined by the following transformation: (1) Var(Y)-?
2. Let Xbe a random variable with a continuous uniform density between -1 and 1, i.e, X U(-1,1) Random variable Y is defined by the following transformation: (1) Var(Y)-?
3. Let X be random variable with probability density function x(x)4 for 0 x 1, (Note: fx (x) = 0 outside this domain.) (a) Find E[X] and Var[X] (b) Let Y- X2 +5. Find E[Y] and Var[Y]. (c) Find PX 112 ).
Problem 1. 15 points] Let X be a uniform random variable in the interval [-1,2]. Let Y be an exponential random variable with mean 2. Assunne X and Y are independent. a) Find the joint sample space. b) Find the joint PDF for X and Y. c) Are X and Y uncorrelated? Justify your answer. d) Find the probability P1-1/4 < X < 1/2 1 Y < 21 e) Calculate E[X2Y2]