Find the conditional mean and conditional variance of the random variable given the pdf: exp(-x)u(x) given...

The joint PDF of X and Y is given by fX,Y(x, y) = nx^ne^(?xy) , 0...

The joint PDF of X and Y is given by fX,Y(x, y) = nx^ne^(?xy) , 0 < x < 1, y > 0, where n is an integer and n > 2. (a) Find the marginal PDF of X and its mean. (b) Find the conditional PDF of Y given X = x. (c) Deduce the conditional mean and the conditional variance of Y given X = x. (d) Find the mean and variance of Y . (e) Find the...

2. Let the probability density function (pdf) of random variable X be given by:                           ...

2. Let the probability density function (pdf) of random variable X be given by:                            f(x) = C (2x - x²),                         for 0< x < 2,                         f(x) = 0,                                       otherwise      Find the value of C.                                                                           (5points) Find cumulative probability function F(x)                                       (5points) Find P (0 < X < 1), P (1< X < 2), P (2 < X <3)                                (3points) Find the mean, : , and variance, F².                                                   (6points)

Let X be a random variable with pdf f(x)=12, 0<x<2. a) Find the cdf F(x). b)...

Let X be a random variable with pdf f(x)=12, 0<x<2. a) Find the cdf F(x). b) Find the mean of X. c) Find the variance of X. d) Find F (1.4). e) Find P(12<X<1). f) Find PX>3.

A random variable X has the pdf given by fx(x) = cx^-3, x .> 2 with...

A random variable X has the pdf given by fx(x) = cx^-3, x .> 2 with a constant c. Find a) the value of c b) the probability P(3<X<5) c) the mean E(X)

Let random variable X ∼ U(0, 1). Let Y = a + bX, where a and...

Let random variable X ∼ U(0, 1). Let Y = a + bX, where a and b are constants. (a) Find the distribution of Y . (b) Find the mean and variance of Y . (c) Find a and b so that Y ∼ U(−1, 1). (d) Explain how to find a function (transformation), r(), so that W = r(X) has an exponential distribution with pdf f(w) = e^ −w, w > 0.

2. Let X be a continuous random variable with pdf given by f(x) = k 6x...

2. Let X be a continuous random variable with pdf given by f(x) = k 6x − x 2 − 8 2 ≤ x ≤ 4; 0 otherwise. (a) Find k. (b) Find P(2.4 < X < 3.1). (c) Determine the cumulative distribution function. (d) Find the expected value of X. (e) Find the variance of X

A continuous random variable X has pdf ?x(?) = (? + 1) ?^2, 0 ≤ ?...

A continuous random variable X has pdf ?x(?) = (? + 1) ?^2, 0 ≤ ? ≤ ? + 1, Where B is the last digit of your registration number (e.g. for FA18-BEE-123, B=3). a) Find the value of a b) Find cumulative distribution function (CDF) of X i.e. ?? (?). c) Find the mean of X d) Find variance of X.

Given a random variable X~exp(5). Z=(X-2)3 1. Find the distribution function FZ(t). 2. Find fz(t).

Given a random variable X~exp(5). Z=(X-2)3 1. Find the distribution function FZ(t). 2. Find fz(t).

The random variable X is distributed with pdf fX(x, θ) = c*x*exp(-(x/θ)2), where x>0 and θ>0....

The random variable X is distributed with pdf fX(x, θ) = c*x*exp(-(x/θ)2), where x>0 and θ>0. Calculate the probability of X1 < X2, i.e. P(X1 < X2, θ).

Consider X has to be a normal random variable with mean μ and variance σ2 and...

Consider X has to be a normal random variable with mean μ and variance σ2 and moment generating function(MGF) MGF (t) = exp(μt + σ2t2 /2) 1. Find the MGFof Y = ax+b, where a and b are non-zero constants 2. By inspection identify what distribution this is