1.
(a)
Marginal probability distribution of X is as follows.
Marginal probability distribution of Y is as follows.
We observe that,
Hence, X and Y are independent.
(b)
Marginal probability distribution of X is as follows.
Marginal probability distribution of Y is as follows.
We observe that,
Hence, X and Y are independent.
. Warid 5:22 PM © 60% Х Assignment Number 3 Assignment Number 3 Q#1 Let X...
Q#1 Let X and Y are joint probability functions given by a- f(x, y) = *y*; x = 1, 2, 3; y = 1, 2 b- f(x,y) = 5%; x = 2,4,5; y = 1, 2, 3 Find the marginal probability functions of r.v X&Y also find out if X & Y are independent? Q#2 Let X denotes the number of times a certain numerical control machine will malfunction: 1, 2, or 3times on any given day. Let Y denote...
Q: Asking for assistance in understanding and solving this example on Probability and Statistical with the steps of the solution to better understand, thanks. **Please give the step by steps with details to completely see how the solution came about. 1) Let the joint pmf of X and Y be defined by: f(x,y) = (x+y)/(33), x=1,2, y=1,2,3. (a) Find fx(x), the marginal pmf of X. (b) Find fy(y), the marginal pmf of Y. (c) Find P(X >...
Question 1(a&b) Question 3 (a,b,c,d) QUESTION 1 (15 MARKS) Let X and Y be continuous random variables with joint probability density function 6e.de +3,, х, у z 0 otherwise f(x, y 0 Determine whether or not X and Y are independent. (9 marks) a) b) Find P(x> Y). Show how you get the limits for X and Y (6 marks) QUESTION 3 (19 MARKS) Let f(x, x.) = 2x, , o x, sk: O a) Find k xsl and f(x,...
Let X and Y be two random variables with joint probability mass function: (?,?) = (??(3+?))/(18*3+30)??? ?=1,2,3 ??? ?=1,2 (?,?) = 0, Otherwise. Please enter the answer to 3 decimal places. Find P(X>Y) and Let X and Y be two random variables with joint probability mass function: (?,?) = (??(4+?))/(18*4+30)??? ?=1,2,3 ??? ?=1,2 (?,?) = 0, Otherwise. Please enter the answer to 3 decimal places. Find P(Y=2/X=1) Please show work/give explanation
(1 point) 3. Let X and Y be random variables with a joint probability density function f(z, y)e (a)Find the marginal distribution functions of X and Y, respectively. i.e. Find f(z) and f(y) f(x)- elsewhere (b) Identify the distribution of Y. What is the E(Y) and SD(Y) E(Y)- (c) Are X and Y independent random variables? Show why, or why not (d) Find P(1 X 2|Y 1) E SD(Y)-
5. (40 points) Let f(x,y) = (x + y),0 < 2,2 <y < 1 be the joint pdf of X and Y. (1) Find the marginal probability density functions fx(x) and fy(y). (2) Find the means hx and my. (3) Find P(X>01Y > 0.5). (4) Find the correlation coefficient p.
Let X and Y have the joint pmf defined by (х, у) (1,2) (0,0) (0,1) (0,2) (1,1) (2,2) 2/12 1/12 3/12 1/12 1/12 4/12 Pxy (x, y) Find py (x) and p, (y) а. b. Are X and Y independent? Support your answer. Find x,y,, and o, С. d. Find Px.Y
Files HW 3 Х [ Homework 3 (1).pdf xD examples-joint-pdfs-soldvi × + File file:/i/CUsers/Clayt 203%20( 1 ).pdf 1. Consider a computer that has two operating systems installed on it. Let X and Y denote the number of timcs the computer freczes in a day when it runs on the tirst and the sccond operating systems, respectively Prix.y) 0.05 0.07 0.12 0.01 0.01 0.5 0.08 a. Find the marginal pmfs of X and Y b. Are X and Y independent? Justify...
3. Let (X, Y) be a bivariate random variable with joint pmf given by x= 1,2,3, y = 0,1,2,3, ... ,00 f(x, y) 12 0 e.w. (a) Show that f(x, y) is a valid joint pmf. (b) Find fa(x) (i.e. the marginal pmf of X). (c) Find fy(y) (i.e. the marginal pmf of Y). (d) Find P [Y X]
Let X be a uniform(0, 1) random variable and let Y be uniform(1,2) with X and Y being independent. Let U = X/Y and V = X. (a) Find the joint distribution of U and V . (b) Find the marginal distributions of U.