Consider the discrete random variables X and Y with the following joint probability mass function: 2...
0 Consider the discrete random variables X and Y with the following joint probability mass function: . -1 1/8 0 1/4 0 1 1/4 1/8 -1 1 1/8 1/8 What is P(X = 1 Y = 0)? Are X and Y independent? 0 A. 0; independent B. 1/2; independent C. 1/2; dependent D. 1/8: dependent E. none of the preceding
Consider the discrete random variables X and Y with the following joint probability mass function: Given that X is not negative, what is the probability that Y is also not negative? A. 0.5 B. 0.8 C. 0.4 D. 0.25 E. none of the preceding T -1 0 0 Y 0 -1 1 0 1 -1 fxy(x,y) 1/8 1/4 1/4 1/8 1/8 1/8 1 다.
C y Multiple Choice Question Consider the discrete random variables X and Y with the following joint probability nass function: fxy(x, y) -1 0 1/8 0 -1 1/4 0 1/4 0 1/8 -1 1/8 1/8 What is P(X = 1 Y = 0)? Are X and Y independent? 1 1 1. 0; independent B. 1/2; independent C. 1/2; dependent D. 1/8; dependent E. none of the preceding
Suppose that the number of bad cheques received by a bank in one day is a Poisson random variable with mean lamda = 3. Determine the probability that the bank will receive 4 bad cheques in 2 days. A. 0.134 B. 0.058 C. 0.316 D. 0.205 E. none of the above
3. Multiple Choice Question Consider the discrete random variables X and Y with the following joint probability mass function: y fxy(x,y) -1 0 1/8 0 -1 1/4 0 0 1/8 -1 1 1/8 -1 1/8 Given that X is not negative, what is the probability that Y is also not negative? 1 1 A. 0.5 B. 0.8 C. 0.4 D. 0.25 E. none of the preceding
1. Suppose X and Y are discrete random variables with joint probability mass function fxy defined by the following table: 3 y fxy(x, y) 01 3/20 02 10 7/80 3/80 1/5 1/16 3/20 3/16 1/8 2 3 2 3 a Find the marginal probability mass function for X. b Find the marginal probability mass function for Y. c Find E(X), EY],V (X), and V (Y). d Find the covariance between X and Y. e Find the correlation between X and...
help asap pls T 6. Multiple Choice Question Consider the discrete random variables X and Y with the following joint probability mass function: y fxx (2,y) -1 0 1/8 0 - 1 1/4 0 1/4 0 1/8 -1 1/8 1 1/8 What is P(X = 11Y = 0)? Are X and Y independent? 1 1 A. 0; independent B. 1/2; independent C. 1/2; dependent D. 1/8; dependent E. none of the preceding
C Y 0 Multiple Choice Question Consider the discrete random variables X and Y with the following joint probability mass function: fxy(x, y) - 1 1/8 0 -1 1/4 0 1/4 0 1/8 -1 1/8 -1 1/8 Given that X is not negative, what is the probability that Y is also not negative? 1 1 1 1 A. 0.5 B. 0.8 C. 0.4 D. 0.25 E. none of the preceding Multiple Choice Question We measured the compressive strength for n...
Problem 5 Define X and Y to be two discrete random variables whose joint probability mass function is given as follows: e-127m5n-m P(X = m, Y = n) = m!(n - m)! for m <n, m> 0 and n > 0, while P(X = m, Y = n) = 0 for other values of m, n 1. Calculate the probability that 1 < X <3 and 0 <Y < 2. 2. Calculate the marginal probability mass functions for the random...
Let X and Y be discrete random variables with the joint probability function f(x,y) given by the table: х f(x,y) 7 9 11 20.050.15 0.1 Y 30.15 0.40.15 Which of the following is the conditional probability function fxy (x|3) ? X = x 7 9 11 fxry(x3)0.28|0.37.42 X = X 7 9 11 fxıy(x3)0.30.280.42 X = x 9 7 11 fxıy(x|3)|0.2143|0.2143|0.5714 X = X 7 11 fxxy(xl3)|0.21430.57140.2143 ОО None of the above