. (X,Y ) is uniformly distributed over the triangle with vertices (0,0),(2,0),(0,1). Find the density f(z)...

A two dimensional variable (X, Y) is uniformly distributed over the square having the vertices (2,...

A two dimensional variable (X, Y) is uniformly distributed over the square having the vertices (2, 0), (0, 2), (-2, 0), and (0, -2). (i) Find the joint probability density function. (ii) Find associated marginal and conditional distributions. (iii) Find E(X), E(Y), Var(X), Var(Y). (iv) Find E(Y|X) and E(X|Y). (v) Calculate coefficient of correlation between X and Y.

Consider the triangle with vertices (0,0),(3,0),(0,3) and let P be a point chosen uniformly at random...

Consider the triangle with vertices (0,0),(3,0),(0,3) and let P be a point chosen uniformly at random inside the triangle. Let X be the distance from P to (0,0). (i) Is X a random variable? Explain why or why not. (ii) Compute P(X≥0), P(X≥1), P(X≥2), and P(X≤3).

Let X be uniformly distributed over (0, 1). Find the density functions of the following variables...

Let X be uniformly distributed over (0, 1). Find the density functions of the following variables by first finding their CDFs. a. Y = 6X − 1 b. Z = X2

Find the centroid of the triangle with vertices (0,0), (3,0) and (3,4).

Find the centroid of the triangle with vertices (0,0), (3,0) and (3,4).

Suppose that X is a random variable uniformly distributed over the interval (0, 2), and Y...

Suppose that X is a random variable uniformly distributed over the interval (0, 2), and Y is a random variable uniformly distributed over the interval (0, 3). Find the probability density function for X + Y .

Find the area of the following part of the surface z = x + y2 that...

Find the area of the following part of the surface z = x + y2 that lies above the triangle with vertices (0,0), (1,1), and (0,1).

Integrate the function f over the given region f(x,y) =xy over the triangular region with vertices...

Integrate the function f over the given region f(x,y) =xy over the triangular region with vertices (0,0) (6,0) and(0,9)

Find the urge of the function f over the given region. F(x,y) = 3x+7y over the...

Find the urge of the function f over the given region. F(x,y) = 3x+7y over the triangle (0,0) (6,0) and (0,10)

Using Stoke's Thm, find the work done by the vector field F(x, y, z) = 〈z,...

Using Stoke's Thm, find the work done by the vector field F(x, y, z) = 〈z, x, y〉, that moves an object along the triangle with vertices P(1, 0, 0), Q(0, 1, 0), R(0, 0, 1), in a counterclockwise manner, starting and ending at P.

1. Let P = (X, Y ) be a uniformly distributed random point over the diamond...

1. Let P = (X, Y ) be a uniformly distributed random point over the diamond with vertices (1, 0),(0, 1),(?1, 0),(0, ?1). Show that X and Y are not independent but E[XY ] = E[X]E[Y ]