A brother and sister. The brother eats a random fraction X of a pizza, where X...

A brother and sister. The brother eats a random fraction X of a pizza, where X...

A brother and sister. The brother eats a random fraction X of a pizza, where X is uniformly distributed between 0 and 1. The sister then eats a random fraction Y of the total pizza (not of the remaining pizza). a) Find the joint density function for X and Y. b) If less than half the pizza is remaining after both brother and sister are done eating, what is the probability that neither of the boys individually ate more than...

A brother and sister. The brother enters the house and eats a random fraction Y of...

A brother and sister. The brother enters the house and eats a random fraction Y of a pizza, where Y is uniformly distributed between 0 and 1. The sister then eats a random fraction Z of the total pizza (not of the remaining pizza). i) Find the joint density function for Y and Z. ii) If less than half the pizza is remaining after both brother and sister are done eating, what is the probability that neither of the boys...

Let the random vector (X, Y ) be drawn uniformly from the disk D = {(x,...

Let the random vector (X, Y ) be drawn uniformly from the disk D = {(x, y) : x2 +y2 ≤ 1}. (a) (2 pts) What is the joint density function of (X, Y )? (b) (4 pts) What is the marginal density function of Y ? (c) (4 pts) What is the conditional density of X given Y = 1/2?

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 .

Random variable X determines the range of voltage values at the output of an electronic module,...

Random variable X determines the range of voltage values at the output of an electronic module, and is drawn from probability density function fX(x) = (1/x^2) * u(x − 1). Random variable Y is the actual voltage observed and depends on X in the following way: if X takes the value x then Y is uniformly distributed in the range [−x, x]. Find a) The joint density fXY (x, y). b) The marginal density of the observed voltage fY (y)....

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).

The joint probability density function of two random variables X and Y is f(x, y) =...

The joint probability density function of two random variables X and Y is f(x, y) = 4xy for 0 < x < 1, 0 < y < 1, and f(x, y) = 0 elsewhere. (i) Find the marginal densities of X and Y . (ii) Find the conditional density of X given Y = y. (iii) Are X and Y independent random variables? (iv) Find E[X], V (X) and covariance between X and Y .

let x and y be random variables whose joint distributionus uniform over the half-disk: {(X,Y)|x^2+y^2 <=...

let x and y be random variables whose joint distributionus uniform over the half-disk: {(X,Y)|x^2+y^2 <= 1 and x>0}. what is the marginal density function of X for 0 <= x <=1? Answer is 4/pi * (1-x^2)^1/2. can anyone explain why the reciprocal of the area of semicircle is the density function of the f(X,Y)? Thanks

Let X be the random variable for losses. X is uniformly distributed on (0, 2000). An...

Let X be the random variable for losses. X is uniformly distributed on (0, 2000). An insurance policy will pay Y = 500 ln(1-(x/2000)) for a loss. a. What is the probability density function for Y ? Give the range for which the pdf is positive. b. What is the probability the policy will pay between 400 and 600?

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.