Choose two numbers X and Y independently at random from the unit interval [0,1] with the...

Choose two numbers ? and ? independently at random from the unit interval [0,1] with the...

Choose two numbers ? and ? independently at random from the unit interval [0,1] with the uniform density. The probability that 4⋅?+8⋅? < 0.8 is

Suppose you choose two numbers x and y, independently at random from the interval [0, 1]....

Suppose you choose two numbers x and y, independently at random from the interval [0, 1]. Given that their sum lies in the interval [0, 1], find the probability that (a) |x − y| < 1. (b) xy < 1/2. (c) max{x, y} < 1/2. (d) x 2 + y 2 < 1/4. (e) x > y

Choose real numbers X and Y uniformly and independently in [0; 1]. What is the probability...

Choose real numbers X and Y uniformly and independently in [0; 1]. What is the probability that the quadratic equation a2 + Xa + Y = 0 has two distinct real solutions a1 and a2? Hint: Draw a picture in the XY -plane.

(a) Given two independent uniform random variables X, Y in the interval (−1, 1), find E...

(a) Given two independent uniform random variables X, Y in the interval (−1, 1), find E |X − Y |. (b) Let X, Y be as in (a). Find the support and density of the random variable Z = |X − Y |. (c) From (b), compute the mean of Z and check whether you get the same answer as in (a)

A uniform random variable on (0,1), X, has density function f(x) = 1, 0 < x...

A uniform random variable on (0,1), X, has density function f(x) = 1, 0 < x < 1. Let Y = X1 + X2 where X1 and X2 are independent and identically distributed uniform random variables on (0,1). 1) By considering the cumulant generating function of Y , determine the first three cumulants of Y .

Suppose a random variable X has a mixed distribution of the interval [0,1). X has probability...

Suppose a random variable X has a mixed distribution of the interval [0,1). X has probability 0.5 at x = 0, X has the density function fx(x) = x for 0 < x < 1, and X has no density or probability elsewhere. Find and graph the CDF of X.

A stick of unit length is broken into two pieces at random: the interval is divided...

A stick of unit length is broken into two pieces at random: the interval is divided in two pieces at X, and X is uniformly distributed in (0,1). Let Y be the longer piece, therefore range of Y is (1/2,1). Find the cumulative distribution function of Y.

Suppose that X and Y are independent Uniform(0,1) random variables. And let U = X +...

Suppose that X and Y are independent Uniform(0,1) random variables. And let U = X + Y and V = Y . (a) Find the joint PDF of U and V (b) Find the marginal PDF of U.

Random variables X and Y are independent and (0,1)-normal. Find the density of the area Z...

Random variables X and Y are independent and (0,1)-normal. Find the density of the area Z of the circle of radius (X2+Y2)1/2 .

X and Y are independent variables, with X having a uniform (0,1) distribution and Y being...

X and Y are independent variables, with X having a uniform (0,1) distribution and Y being an exponential random variable with a mean of 1. Given this information, find P(max{X,Y} > 1/2)