Suppose X is a continuous uniform random variable between −1 and 1, i.e., X ∼ U(−1,...

a) Suppose that X is a uniform continuous random variable where 0 < x < 5....

a) Suppose that X is a uniform continuous random variable where 0 < x < 5. Find the pdf f(x) and use it to find P(2 < x < 3.5). b) Suppose that Y has an exponential distribution with mean 20. Find the pdf f(y) and use it to compute P(18 < Y < 23). c) Let X be a beta random variable a = 2 and b = 3. Find P(0.25 < X < 0.50)

Let ? be a random variable with a PDF ?(?)= 1/(x+1) for ? ∈ (0, ?...

Let ? be a random variable with a PDF ?(?)= 1/(x+1) for ? ∈ (0, ? − 1). Answer the following questions (a) Find the CDF (b) Show that a random variable ? = ln(? + 1) has uniform ?(0,1) distribution. Hint: calculate the CDF of ?

Let X be a continuous uniform (-2,5) random variable. Let W = |X| Your goal is...

Let X be a continuous uniform (-2,5) random variable. Let W = |X| Your goal is to find the pdf of W. a)Begin by finding the sample space of W b)Translate the following into a probability statement about X: Fw(w) = P[W <= w] = .... c) Consider different values of W the sample of W. Do you need to break up the sample space into cases? d)Find the cdf of W e)Find the pdf of W

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.

3. Let X be a continuous random variable with PDF fX(x) = c / x^1/2, 0...

3. Let X be a continuous random variable with PDF fX(x) = c / x^1/2, 0 < x < 1. (a) Find the value of c such that fX(x) is indeed a PDF. Is this PDF bounded? (b) Determine and sketch the graph of the CDF of X. (c) Compute each of the following: (i) P(X > 0.5). (ii) P(X = 0). (ii) The median of X. (ii) The mean of X.

A Lee uniform random variable (L), which is a continuous uniform random variable with a mean...

A Lee uniform random variable (L), which is a continuous uniform random variable with a mean of 0 and a standard deviation of 1. What is the equation for a Lee transformation, which transforms the continuous uniform random variable X~U(t, w) into L?

Suppose that X and Y are independent Uniform(0,1) random variables. And let U = X +...

Suppose that X and Y are independent Uniform(0,1) random variables. And let U = X + Y and V = Y . (a) Find the joint PDF of U and V (b) Find the marginal PDF of U.

5. Let X be a continuous random variable with PDF fX(x)= c(2+x), −2 < x <...

5. Let X be a continuous random variable with PDF fX(x)= c(2+x), −2 < x < −1, c(2−x), 1<x<2, 0, elsewhere (a) Find the value of c such that fX(x) is indeed a PDF. (b) Determine the CDF of X and sketch its graph. (c) Find P(X < 1.5). (d) Find m = π0.5 of X. Is it unique?

Suppose that X is continuous random variable with PDF f(x) and CDF F(x). (a) Prove that...

Suppose that X is continuous random variable with PDF f(x) and CDF F(x). (a) Prove that if f(x) > 0 only on a single (possibly infinite) interval of the real numbers then F(x) is a strictly increasing function of x over that interval. [Hint: Try proof by contradiction]. (b) Under the conditions described in part (a), find and identify the distribution of Y = F(x).

Let X be a continuous random variable with probability density function (pdf) ?(?) = ??^3, 0...

Let X be a continuous random variable with probability density function (pdf) ?(?) = ??^3, 0 < ? < 2. (a) Find the constant c. (b) Find the cumulative distribution function (CDF) of X. (c) Find P(X < 0.5), and P(X > 1.0). (d) Find E(X), Var(X) and E(X5 ).