is selected randomly from a X. Now select an integer Y uniformly at random from f1,......
Suppose that X is uniformly selected from the numbers 1, 2, 3 (that is, P(X = i) = 1/3 for i = 1, 2, or 3). Once X is selected, Y is chosen uniformly from the numbers 0, 1, ..., X. Find E[X | Y ]. (c) Compute EX Y 7. Suppose that X is uniformly selected from the numbers 1, 2, 3 (that is, P(X- i) 1/3 for ,X. Find i = 1,2, or 3). Once X is selected,...
4. A random point (X, Y ) is chosen uniformly from within the unit disk in R2, {(x, y)|x2+y2< 1} (a) Let (R, O) denote the polar coordinates of the point (X,Y). Find the joint p.d.f. of R and . Compute the covariance between R and 0. Are R and e are independent? (b) Find E(XI{Y > 0}) and E(Y|{Y > 0}) (c) Compute the covariance between X and Y, Cov(X,Y). Are X and Y are independent? 4. A random...
Suppose that X is a discrete random variable that is uniformly distributed on the even integers x = 0,2,4,..., 22, so that the probability function of X is p(x) = 1 for each even integer x from 0 to 22. Find E[X] and Var[X].
For the random variables X and Y having E(X) = 1, E(Y) = 2, Var (X) = 6, Var (Y) = 9, and Pxy = -2/3. Find a) The covariance of X and Y. b) The correlation of X and Y. c) E(X2) and E(Y2).
X and Y are random variables (a) Show that E(X)=E(B(X|Y)). (b) If P((X x, Y ) P((X x})P({Y y)) then show that E(XY) = E(X)E(Y), i.e. if two random variables are independent, then show that they are uncorrelated. Is the reverse true? Prove or disprove (c) The moment generating function of a random variable Z is defined as ΨΖφ : Eez) Now if X and Y are independent random variables then show that Also, if ΨΧ(t)-(λ- (d) Show the conditional...
3. Let X denote the temperature (°C) and let Y denote the time in minutes that it takes for the diesel engine on an automobile to get ready to start. Assume that the joint density for (X,Y) is given by fxy(x, y) = c(4x + 2y + 1),0 < x < 40,0 < y = 2 (a) Find the value of c that makes this joint density legitimate. (b) Find the probability that on a randomly selected day the air...
3. The pair of random variables X and Y is uniformly distributed on the interior of the triangle with the vertices whose coordinates are (0,0), (0,2), and (2,0) (i.e., the joint density is equal to a constant inside the triangle and zero outside). (a) (10 points) Find P(Y+X< 1). (b) (10 points) Find P(X = Y). (c) (10 points) Find P(Y > 1X = 1/2).
(3) A pair of random variables (X, Y) is distributed uniformly on the triangle with vertices (0,0), (2,0) and (0. Find EX, EY, Cov(X,Y), E(max{X,Y)), P(X> Y), P(X 2 Y)
3. Generate a vector u with 100 elements randomly selected (uniformly) from 1 to 40. Then generate a vector v with 100 elements randomly selected with a normal distribution of mean 20 and standard deviation 5 a) Write the vector to a file 'data.txt', using ,' as separator. (b) Remove the variable u (c) Scan the file and retrieve the variable u. (d) Print the 5-summary of the vector u (e) Plot the boxplot of u (f) Plot the histogram...
X P(x) Groups of adults are randomly selected and arranged in groups of three. The random variable x is the number in the group who say that they would feel comfortable in a self-driving vehicle. Determine whether a probability distribution is given. If a probability distribution is given, find its mean and standard deviation. If a probability distribution is not given, identify the requirements that are not satisfied. Does the table show a probability distribution? Select all that apply. 0...