Given the probability density function f(x)=(0.064^(4)*x^(3)*e^(−0.06x))/(Γ(4)), determine the mean and variance of the distribution. Round the...

Determine the mean and variance of the random variable with the probability density function f(x)=1.6(1-.8x), 0<x≤1.25

Determine the mean and variance of the random variable with the probability density function f(x)=1.6(1-.8x), 0<x≤1.25

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)

The density function of random variable X is given by f(x) = 1/4 , if 0...

The density function of random variable X is given by f(x) = 1/4 , if 0 Find P(x>2) Find the expected value of X, E(X). Find variance of X, Var(X). Let F(X) be cumulative distribution function of X. Find F(3/2)

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 random variable X has a probability density function f(x) = e^(−x) for x > 0....

The random variable X has a probability density function f(x) = e^(−x) for x > 0. If a > 0 and A is the event that X > a, find f XIA (xlx > a), i.e. the density of the conditional distribution of X given that X > a.

1. Decide if f(x) = 1/2x2dx on the interval [1, 4] is a probability density function...

1. Decide if f(x) = 1/2x2dx on the interval [1, 4] is a probability density function 2. Decide if f(x) = 1/81x3dx on the interval [0, 3] is a probability density function. 3. Find a value for k such that f(x) = kx on the interval [2, 3] is a probability density function. 4. Let f(x) = 1 /2 e -x/2 on the interval [0, ∞). a. Show that f(x) is a probability density function b. . Find P(0 ≤...

A continuous random variable X has the following probability density function F(x) = cx^3, 0<x<2 and...

A continuous random variable X has the following probability density function F(x) = cx^3, 0<x<2 and 0 otherwise (a) Find the value c such that f(x) is indeed a density function. (b) Write out the cumulative distribution function of X. (c) P(1 < X < 3) =? (d) Write out the mean and variance of X. (e) Let Y be another continuous random variable such that  when 0 < X < 2, and 0 otherwise. Calculate the mean of Y.

- Determine the cumulative distribution function for the random variable with probability density function ?(?) =...

- Determine the cumulative distribution function for the random variable with probability density function ?(?) = 1 − 0.5? for 0 < ? < 2 millimeters. - Determine the mean and variance of the random variable with probability density function

The probability density function of X is given by f(x)={a+bx0if 0<x<1otherwise If E(X)=1.5, find a+b. Hint:...

The probability density function of X is given by f(x)={a+bx0if 0<x<1otherwise If E(X)=1.5, find a+b. Hint: For a probability density function f(x), we have ∫∞−∞f(x)dx=1

A random variable X has the cumulative distribution function (cdf) given by F(x) = (1 +...

A random variable X has the cumulative distribution function (cdf) given by F(x) = (1 + e−x ) −1 , −∞ < x < ∞. (i) Find the probability density function (pdf) of X. (ii) Roughly, take 10 points in the range of x (5 points below 0 and 5 points more than 0) and plot the pdf on these 10 points. Does it look like the pdf is symmetric around 0? (iii) Also, find the expected value of X.