Need help solving this problem. I don't know how to solve it. Please help as soon as you can so I can figure it out fast. Thank you!
Need help solving this problem. I don't know how to solve it. Please help as soon...
7. The random variables X and Y have joint probability density function f given by 1 for x > 0, |y| 0 otherwise. 1-x, Below you find a diagram highlighting the (r, y) pairs for which the pdf is 1 (a) Calculate the marginal probability density function fx of X (b) Calculate the marginal cumulative distribution function Fy of Y (c) Are X and Y independent? Explain.
7. The random variables X and Y have joint probability density function f given by 1 for x > 0, |y| 0 otherwise. 1-x, Below you find a diagram highlighting the (r, y) pairs for which the pdf is 1 (a) Calculate the marginal probability density function fx of X (b) Calculate the marginal cumulative distribution function Fy of Y (c) Are X and Y independent? Explain.
1. Let X and Y be two jointly continuous random variables with joint CDF otherwsie a. Find the joint pdf fxy(x, y), marginal pdf (fx(x) and fy()) and cdf (Fx(x) and Fy)) b. Find the conditional pdf fxiy Cr ly c. Find the probability P(X < Y = y) d. Are X and Y independent?
Problem 3: (15 points) The random variables X and Y have the joint PDF otherwise 1) Determine the marginal PDFs fx(x) and fy (y) 2 Determine EX and E[Y: 3) Determine Cov[X, Y]
Could you go through the steps in more detail? I am getting confused with the steps. Chapter 5. Function of Random Variables 14 Example 2. The probability density function of X is given by the Uniform distribution in (0, 1): 0 1 1 fx (x) otherwise Find the distribution of Y = eX Solution: Let Y = eX. Therefore, = P (e* < y) = P(X < logy) Fx(logy) Fy(y) P(Y logy logy = |x (r) dr - d logy...
Q: 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 be random variables of the continuous type have the joint p.d.f. f(x,y)= 2, 0≤y≤ x≤1. (a). Draw a graph that illustrates the domain (support) of this p.d.f. (b). Find marginal pdf of X, fX(x), μXand σ2X (c). Find the marginal...
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 >...
4. Suppose X and Y have the joint pdf f(x,y) = 6x, 0 < x < y < 1, and zero otherwise. (a) Find fx(x). (b) Find fy(y). (c) Find Corr(X,Y). (d) Find fy x(y|x). (e) Find E(Y|X). (f) Find Var(Y). (g) Find Var(E(Y|X)). (h) Find E (Var(Y|X)]. (i) Find the pdf of Y - X.
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.
Q: Assistance in understanding and solving this example from Probability and Statistical (Conditional Distributions) 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) Suppose X and Y both take values in [0,1] with joint probability density f(x,y) = 4xy. a) Find fx(x) and fy(y), the marginal probability density functions. b) Are the two random variables independent? Why or why not? c) Compute...