For X and Y with the initial joint density of f(x,y)= (3/2)(2−2x−y), 0<x<1and0<y<2−2x, findP(Y <1|X=1/2).

Two random variables X and Y have joint density function f(x,y) =c(where c >0 denotes an...

Two random variables X and Y have joint density function f(x,y) =c(where c >0 denotes an unknown constant) on the rectangle 0< x <10,0< y <3 (and zero elsewhere). (a) Findc. (b) FindP(X >5Y). (c) FindP(X= 5Y).

Let f(x, y) = c/x, 0 < y < x < 1 be the joint density...

Let f(x, y) = c/x, 0 < y < x < 1 be the joint density function of X and Y . a) What is the value of c? a) 1   b) 2 c) 1/2 d) 2/3 e) 3/2 b)what is the marginal probability density function of X? a) x/2 b)1 c)1/x d)x e)2x c)what is the marginal probability density function of Y ? a) ln y   b)−ln y c)1 d)y e)y2 d)what is E[X]? a)1 b)2 c)4 d)1/2 e)1/4

Let X and Y have joint density f(x, y) = 6/7(x + y)^2 if 0 ≤...

Let X and Y have joint density f(x, y) = 6/7(x + y)^2 if 0 ≤ x ≤ 1, 0 ≤ y ≤ 1, 0 otherwise, where c is a positive constant. Compute the marginal densities of X and of Y (be explicit about all cases!). Compute P(Y + 2X < 1). Determine whether X and Y are independent. Justify your answer.

Consider the joint density function f (x, y) = 1 if 0<= x<= 1; 0<=y<= 1....

Consider the joint density function f (x, y) = 1 if 0<= x<= 1; 0<=y<= 1. [0 elsewhere] a) Obtain the probability density function of the v.a Z, where Z = X^2. b) Obtain the probability density function of v.a W, where W = X*Y^2. c) Obtain the joint density function of Z and W, that is, g (Z, W)

The joint density function of (X, Y ) is f(x, y) = c(x + y), 0...

The joint density function of (X, Y ) is f(x, y) = c(x + y), 0 ≤ y ≤ x ≤ 1. (1) Find c. (2) Find the conditional density f(y|x). (3) Find P(Y > 0.3|X = 0.5).

If the joint density of X and Y was uniform on the region 0 < x...

If the joint density of X and Y was uniform on the region 0 < x < 1 and 0 < y < 2 − 2x, find the probability P(2X − Y < 0).

Given the following joint density, f(x,y)={10xy^2 if 0<x<y<1 f(x,y)={ 0 otherwise 1. frequency function x given...

Given the following joint density, f(x,y)={10xy^2 if 0<x<y<1 f(x,y)={ 0 otherwise 1. frequency function x given y 2. E(x given y), Var(x given y) 3. Var(E(x given y), E(Var(x given y)

Given the joint probability density function f ( x , y ) for 0 < x...

Given the joint probability density function f ( x , y ) for 0 < x < 3 and 0 < y < 2 x^2y/81 Find the conditional probability distribution of X=1 given that Y = 1 f ( x , y ) = x^2 y/ 81 . F i n d the conditional probability distribution of X=1 given that Y = 1. i . e . f (X ∣ y = 1 )( 1 )

The joint probability density function of x and y is given by f(x,y)=(x+y)/8 0<x<2, 0<y<2 0...

The joint probability density function of x and y is given by f(x,y)=(x+y)/8 0<x<2, 0<y<2 0 otherwise calculate the variance of (x+y)/2

1. for 0<= x <=3 0<=x<=1 f(x,y) = k(x^2y+ xy^2) a. Find K joint probablity density...

1. for 0<= x <=3 0<=x<=1 f(x,y) = k(x^2y+ xy^2) a. Find K joint probablity density function. b. Find marginal distribution respect to x c. Find the marginal distribution respect to y d. compute E(x) and E(y) e. compute E(xy) f. Find the covariance and interpret the result.