Let random variable X take values {1,2, ...,10} with pk+1 = P(X - k+ 1) = pk/2. Consider g(x) = IA the Indicator function that takes value 1 if event A is true, 0 otherwise. A = {X > 6}. Find E[g(X)].
Let random variable X take values {1,2, ...,10} with pk+1 = P(X - k+ 1) = pk/2
(5) Recall that X ~Uniform(10, 1,2,... ,n - 1)) if if k E (0, 1,2,... ,n -1, P(x k)0 otherwise (a) Determine the MGF of such a random variable. (b) Let X1, X2, X3 be independent random variables with X1 Uniform(10,1)) X2 ~Uniform(f0, 1,2]) Xs~ Uniform(10, 1,2,3,4]). X3 ~ U x2 ~ Uniform(10, 1,2)) 13Uniform Find the laws of both Y1 X1 +2X2 +6X3 and Y2 15X1 +5X2 + X3. (c) What is the correlation coefficient of Yi and ½?...
(1) Suppose the pdf of a random variable X is 0, otherwise. (a) Find P(2 < X < 3). (b) Find P(X < 1). (e) Find t such that P(X <t) = (d) After the value of X has been observed, let y be the integer closest to X. Find the PMF of the random variable y U (2) Suppose for constants n E R and c > 0, we have the function cr" ifa > 1 0, otherwise (a)...
(10 points) Consider a discrete random variable X, which can only take on non-negative integer values, with E[Xk] = 0.8, k = 1,2, .... Use the moment generating function approach to find the pmf of Px(k), k = 0,1,....
Let X be a discrete random variable with the following PMF 6 for k € {-10,-9, -, -1,0, 1, ... , 9, 10} Px(k) = otherwise The random variable Y = g(X) is defined as Y = g(x) = {x if X < 0 if 0 < X <5 otherwise Calculate E[X], E[Y], var(X), and var(Y) for the two variables X and Y
Let X be a random variable that takes values x = (xi,... , xn) with respec- tive probabilities p (pi,. .. , pn). Write two R functions mymean (x,p) and myvariance (x, p), which find the mean and variance of X, respec- tively. Use your function to find the mean and variance of the point value of a random Scrabble tile, as in Example 4.1 Let X be a random variable that takes values x = (xi,... , xn) with...
Recall that a Bernoulli random variable with parameter p is a random variable that takes the value 1 with probability p, and the value 0 with probability 1 - p. Let X be a Bernoulli random variable with parameter 0.7. Compute the expectation values of X, denoted by E[X*1, for the following three values of k: k = 1,4, and 3203. E [X] = E [X4 E [X3203
6) Find multiples of 55 and 233 llll tllio 7) Let event A occur with probability P(A). Let IIA) be A's associated indicator random variable, i.e.. IA happens, I(A) -0 if A does not happen. Show that EIIIA)] PA) s associated indicator random variable, ie, IA} 티 if A 6) Find multiples of 55 and 233 llll tllio 7) Let event A occur with probability P(A). Let IIA) be A's associated indicator random variable, i.e.. IA happens, I(A) -0 if...
1) [15 pts.] Let Z be a discrete random variable having possible values 0, 1,2, and 3 and probability mass function p(0)-1/4, p(1) =1/2, p(2)-1/8, p(3) =1/8. (a) Plot the corresponding (cumulative) distribution function. (b) Determine the mean ETZ. (e) Evaluate the variance Var(Z)
1. Suppose that N = {1,2,3} and let X be a random variable such that P(X = 1), P(X = 2) and P(X = 3) are all 1/3. So the probability mass function for X is p(1) = P(2) = P(3) = 1/3. Then, for each n e N= {1,2,...}, we have 3 E[X"] - Ý k"p(k) 1" + 2 + 3" 3 (1) k=1 Calculate E[X], E[X2] and var(X).
Let ? be a positive integer random variable with PMF of the form ??(?)=12⋅?⋅2−?,?=1,2,…. Once we see the numerical value of ?, we then draw a random variable ? whose (conditional) PMF is uniform on the set {1,2,…,2?}. 1.1 Write down an expression for the joint PMF ??,?(?,?). For ?=1,2,… and ?=1,2,…,2?: ??,?(?,?)=? 1.2 Find the marginal PMF ??(?) as a function of ?. For simplicity, provide the answer only for the case when ? is an even number. (The...