The length of time it takes a baseball player to swing a bat (in seconds) is...

A baseball player can swing his bat at 120 mph. A baseball pitcher can throw a...

A baseball player can swing his bat at 120 mph. A baseball pitcher can throw a fastball at 80mph. When the baseball meets the bat in an elastic head-on collision, at what speed will the ball leave the bat? Assume that the mass of the ball is negligible compared to that of the bat. (Multiple Choice but show work) a. 160 mph b. 240 mph c. 300 mph d 320 mph

Suppose that the p.d.f of a random variable X is as follows: f(x) = { c/(1−x)^1/2...

Suppose that the p.d.f of a random variable X is as follows: f(x) = { c/(1−x)^1/2 for 0 < x < 1 { 0 otherwise • Find the value of the constant c that makes f a valid probability density function. Sketch it. • Find the value of P(X ≤ 1/2)

Let X and Y have the joint probability density function f(x, y) = ⎧⎪⎪ ⎨ ⎪⎪⎩...

Let X and Y have the joint probability density function f(x, y) = ⎧⎪⎪ ⎨ ⎪⎪⎩ ke−y , if 0 ≤ x ≤ y < ∞, 0, otherwise. (a) (6pts) Find k so that f(x, y) is a valid joint p.d.f. (b) (6pts) Find the marginal p.d.f. fX(x) and fY (y). Are X and Y independent?

Let random variable X denote the time (in years) it takes to develop a software. Suppose...

Let random variable X denote the time (in years) it takes to develop a software. Suppose that X has the following probability density function: f(x)= 5??4 if 0 ≤ x ≤ 1, and 0 otherwise. b. Write the CDF of the time it takes to develop a software. d. Compute the variance of the number of years it takes to develop a software.

I need solution and formula as clear.Otherwise , I will have to report the answer. Assume...

I need solution and formula as clear.Otherwise , I will have to report the answer. Assume that X and Y has a continuous joint p.d.f. as 28x2y3 in 0<y<x<1 interval. Otherwise the joint p.d.f. is equal to 0. Prove that the mentioned f(x,y) is a joint probability density function. Calculate E(X) Calculate E(Y) Calculate E(X2) Calculate E(XY)

Assume that X and Y has a continuous joint p.d.f. as (28x^2)*(y^3) in 0<y<x<1 interval. Otherwise...

Assume that X and Y has a continuous joint p.d.f. as (28x^2)*(y^3) in 0<y<x<1 interval. Otherwise the joint p.d.f. is equal to 0. Prove that the mentioned f(x,y) is a joint probability density function. Calculate E(X) Calculate E(Y) Calculate E(X2) Calculate Var(X) Calculate E(XY) Calculate P(X< 0.1) Calculate P(X> 0.1) Calculate P(X>2) Calculate P(-2<X<0.1)

Suppose a random variable has the following probability density function: f(x)=3cx^2 (1-x) 0≤x≤1 a) What must...

Suppose a random variable has the following probability density function: f(x)=3cx^2 (1-x) 0≤x≤1 a) What must c be equal to for this to be a valid density function? b) Determine the mean of x, μ_x c) Determine the median of x, μ ̃_x d) Determine: P(0≤x≤0.5) ?

Part A The variable X(random variable) has a density function of the following f(x) = {5e-5x...

Part A The variable X(random variable) has a density function of the following f(x) = {5e-5x if 0<= x < infinity and 0 otherwise} Calculate E(ex) Part B Let X be a continuous random variable with probability density function f (x) = {6/x2 if 2<x<3 and 0 otherwise } Find E (ln (X)). .

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.

Let X be a continuous random variable with the probability density function f(x) = C x,...

Let X be a continuous random variable with the probability density function f(x) = C x, 6 ≤ x ≤ 25, zero otherwise. a. Find the value of C that would make f(x) a valid probability density function. Enter a fraction (e.g. 2/5): C = b. Find the probability P(X > 16). Give your answer to 4 decimal places. c. Find the mean of the probability distribution of X. Give your answer to 4 decimal places. d. Find the median...