Let X and Y be independent exponentially distributed stochastic variables with parameters α and β. Find...

Let X1,X2,..., Xn be independent random variables that are exponentially distributed with respective parameters λ1,λ2,..., λn....

Let X1,X2,..., Xn be independent random variables that are exponentially distributed with respective parameters λ1,λ2,..., λn. Identify the distribution of the minimum V = min{X1,X2,...,Xn}.

Let X be exponentially distributed with paramter 2, and let Y be exponentially distributed with parameter...

Let X be exponentially distributed with paramter 2, and let Y be exponentially distributed with parameter 4. Suppose X and Y are independent. (a) Let Z = Y/X. Determine the cdf and pdf of Z. (b) Define two random variables V and W by V = X + Y, W = X −Y Determine the joint pdf of V and W, and sketch the region in the vw-plane on which the joint pdf is nonzero

Let X be a gamma random variable with parameters α > 0 and β > 0....

Let X be a gamma random variable with parameters α > 0 and β > 0. Find the probability density function of the random variable Y = 3X − 1 with its support.

Let X and Y be geometric random variables with parameters 0.2 and 0.4. Find the Distribution...

Let X and Y be geometric random variables with parameters 0.2 and 0.4. Find the Distribution of min(X,Y). Please show all work.

Independent random variables X and Y follow binomial distributions with parameters(n1,θ) and (n2,θ). Let Z =X+Y....

Independent random variables X and Y follow binomial distributions with parameters(n1,θ) and (n2,θ). Let Z =X+Y. What will be the distribution of Z? Hint: Use moment generating function.

Let X ∼ Beta(α, β). (a) Show that EX 2 = (α + 1)α (α +...

Let X ∼ Beta(α, β). (a) Show that EX 2 = (α + 1)α (α + β + 1)(α + β) . (b) Use the fact that EX = α/(α + β) and your answer to the previous part to show that Var X = αβ (α + β) 2 (α + β + 1). (c) Suppose X is the proportion of free-throws made over the lifetime of a randomly sampled kid, and assume that X ∼ Beta(2, 8) ....

For the random variables, Y and X, find α, β and γ that minimise E[(Y−α−βX−γX^2)^2|X]. Show...

For the random variables, Y and X, find α, β and γ that minimise E[(Y−α−βX−γX^2)^2|X]. Show all derivations in your answer. You may interchangeably use differentiation and expectation.

Let X and Y be independent exponential random variables with respective parameters 2 and 3. a)....

Let X and Y be independent exponential random variables with respective parameters 2 and 3. a). Find the cdf and density of Z = X/Y . b). Compute P(X < Y ). c). Find the cdf and density of W = min{X,Y }.

Let X and Y be independent, identically distributed standard uniform random variables. Compute the probability density...

Let X and Y be independent, identically distributed standard uniform random variables. Compute the probability density function of XY .

let X1 X2 ...Xn-1 Xn be independent exponentially distributed variables with mean beta a). find sampling...

let X1 X2 ...Xn-1 Xn be independent exponentially distributed variables with mean beta a). find sampling distribution of the first order statistic b). Is this an exponential distribution if yes why c). If n=5 and beta=2 then find P(Y1<=3.6) d). find the probability distribution of Y1=max(X1, X2, ..., Xn)