2. Let X ~ Exp(B), i.e. it is an exponential random variable with parameter 8. Find F(x) (the cdf) and F-16) (the inverse of the cdf).
Consider a continuous random variable X with the density function (exponential) ?(?)={?^−? ?? ?≥0 , 0 ??ℎ??????} a) Find and sketch the CDF for X b) Find the mean and variance of X (I want to see your calculation) c) Find ?(1≤?≤2)
4. Let X be a Exponential random variable, X ~ Expo(2). Find the pdf of X3. [Hint: pdf of XP is not (pdf of X)3, find it by differentiating the cdf of X3, i.e., Px() = P(X® S2)]
Find the mean, standard deviation, and cdf for the exponential distribution. Show your calculations.
Question 6 A random variable X has cdf χ20 Plotthe cdf and identif.,(x)-1-0.2~ a) Plot the cdf and identify the type of the random variable. b) Find the pdf of X. c) Calculate P[-4eX<-1], P(xS2], P(X=1], Pf2-K6], and P[X>10]. d) Calculate the mean and the variance of X. If the random variable X passes through a system with the following chara cteristic function: e) f) Find the pdf of Y. Calculate the mean and the variance of Y. Good Luck
Find the moment generating function for an exponential random variable with mean lambda. Make sure to include the domain of the moment generating function.
Let X be an exponential random variable with parameter A > 0, and let Y be a discrete random variable that takes the values 1 and -1 according to the result of a toss of a fair coin Compute the CDF and the PDF of Z = XY Let X be an exponential random variable with parameter A > 0, and let Y be a discrete random variable that takes the values 1 and -1 according to the result of...
You are given that the random variable X is exponential with a mean of 1, and that the random variable Y is uniformly distributed on the interval (0, 1). Furthermore, it is known that X and Y are independent. Find the density of the joint distribution of U = XY and V = X/Y.
exponential distribution 3. The distribution of Smith's future lifetime is X, an exponential random variable with mean a, and the distribution of Brown's future lifetime is Y, an exponential random variable with mean B. Smith and Brown have future lifetimes that are independent of one another. Find the probability that Smith outlives Brown. Answer #3: (D) a (E) (A) (B) (C) 3. The distribution of Smith's future lifetime is X, an exponential random variable with mean a, and the distribution...
4. Cumulative distribution function (cdf) of a random variable X is given by 1t2 2 Find a) Pdf of X and b) ECX3-2 IXI).