. X has exponential distribution with parameter 4. Therefore E[X] = 1/4 . Find P(X >...

Assume that X has an exponential distribution with parameter θ = 3. A) Find P(X ≤...

Assume that X has an exponential distribution with parameter θ = 3. A) Find P(X ≤ 1). Give your answer to 4 decimal places B) Find P(2 ≤ X ≤ 10). Give your answer to 4 decimal places.

suppose random variable X has an exponential distribution with parameter lambda=4. Find the median of X.

suppose random variable X has an exponential distribution with parameter lambda=4. Find the median of X.

1. Suppose that X has an Exponential distribution with rate parameter λ = 1/4. Also suppose...

1. Suppose that X has an Exponential distribution with rate parameter λ = 1/4. Also suppose that given X = x, Y has a Uniform(x, x + 1) distribution. (a) Sketch a plot representing the joint pdf of (X, Y ). Your plot does not have to be exact, but it should clearly display the main features. Be sure to label your axes. (b) Find E(Y ). (c) Find Var(Y ). (d) What is the marginal pdf of Y ?

exponential distribution x1 has density f1(x)=e^-x with r.v if Xa=X1/a then it has density fa(x)=ae^-ax can...

exponential distribution x1 has density f1(x)=e^-x with r.v if Xa=X1/a then it has density fa(x)=ae^-ax can someone tell me what happened here???? dont get why will become the parameter is a but not 1/a since we divide the r.v by a

Let X be an exponential random variable with parameter λ > 0. Find the probabilities P(...

Let X be an exponential random variable with parameter λ > 0. Find the probabilities P( X > 2/ λ ) and P(| X − 1 /λ | < 2/ λ) .

Let X and Y be independent and identically distributed with an exponential distribution with parameter 1,...

Let X and Y be independent and identically distributed with an exponential distribution with parameter 1, Exp(1). (a) Find the p.d.f. of Z = Y/X. (b) Find the p.d.f. of Z = X − Y .

Let we have a sample of 100 numbers from exponential distribution with parameter θ f(x, θ)...

Let we have a sample of 100 numbers from exponential distribution with parameter θ f(x, θ) = θ e- θx      , 0 < x. Find MLE of parameter θ. Is it unbiased estimator? Find unbiased estimator of parameter θ.

Suppose that X|λ is an exponential random variable with parameter λ and that λ|p is geometric...

Suppose that X|λ is an exponential random variable with parameter λ and that λ|p is geometric with parameter p. Further suppose that p is uniform between zero and one. Determine the pdf for the random variable X and compute E(X).

Given the exponential distribution f(x) = λe^(−λx), where λ > 0 is a parameter. Derive the...

Given the exponential distribution f(x) = λe^(−λx), where λ > 0 is a parameter. Derive the moment generating function M(t). Further, from this mgf, find expressions for E(X) and V ar(X).

1. Remember a geometric distribution has density f(x) = (1 − p) ^(x−1)p , E(X) =...

1. Remember a geometric distribution has density f(x) = (1 − p) ^(x−1)p , E(X) = 1/p , and V (X) = q/p^2 . (a) Use the method of moments to create a point estimator for p. (b) Use the method of maximum likelihood to create another point estimator for p. (It may or may not be the same). (c) Let a random sample be 5, 2, 6, 5, 4. Use your estimator (either) to create a point estimate for...