(6-i) Consider the following bivariate density of two random variables, X.Y 4 x y? if x e (–1, 1) and y e (x², 1) f(x, y) := if otherwise. Find the marginal density of X. The following answers are proposed: ca» fx (x) = (x² – x³); th» fx (x) = (x² – x*); e) fx (x) = 7 (x² – x8); adi fx (x) = 2 (x² – x*); y € (x², 1). хе (-1,1). хе (-1,1). y E (x², 1). (e) None of the above (а) (b) (c) (d) (e) N/A (Select One) (6-ii) For the bivariate density of problem (6-i) find the marginal density of Y The following answers are proposed: ta» fy (y) = 27 y/2; 7/2. У (0, 1). (bi fy (y) = y2; te fy (y) = y7/2. cai fy (v) = 27 y7/2; У (0, 1). y E (r², 1). y € (x², 1). (e) None of the above (a) (b) (c) (d) (e) N/A (Select One) (6-iii) For the bivariate density of problem (6-i) are the two random variables, X, and Y, independent: Why: The following answers are proposed: ta) No, because fx (x) + fy(y) + f(x, y) for some values of X and y. (b) No, because fx (x) + fy(y) + f(x, y) for all values of x and y. (d) Yes, because fx (x)fy (y) = f(x, y) for all values of X and y. «d) No, because fx (x)fy (y) # f(x, y) for some values of X E (-1, 1) and y E (x², 1). (e) None of the above (а) (b) (c) (d) (e) N/A (Select One)

Question 6 with 3 parts

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(6-i) Consider the following bivariate density of two random variables, X, Y. 21 x2 y? if x E (–1, 1) and y E (x², 1) f(x, y) := if otherwise. Find the marginal density of X. The following answers are proposed: 6 ca» fx (x) = (x² – x³); (b fx (x) = (x² – x*); fx(x) = (x² - x³); y E (x², 1). хе (-1,1). х€ (-1,1). 12 (dh fx (x) = 7(x² – x³); 16 (e) None of the above y E (x², 1). (a) (b) (c) (d) N/A (Select One) (6-ii) For the bivariate density of problem (6-i) find the marginal density of Y. The following answers are proposed: cw fy (y) = y2; t» fy (y) = y2; У (0, 1). У (0, 1). y E (x², 1). y E (x², 1). 6 ,7/2 (fy(y) = y2; 6 ,7/2. 27 a fy (v) = y7/2; (e) None of the above (b) (c) (d) (е) N/A (Select One) (6-iii) For the bivariate density of problem (6-i) are the two random variables, X, and Y , independent: Why: The following answers are proposed: (a) No, because fx (x) + fy(y) # f(x, y) for some values of X and y. (b) No, because fx (x) +fr(y) # f(x, y) for all values of X and y. (d) Yes, because fx (x)fy(y) = f(x, y) for all values of X and y. (d) No, because fx (x)fr(y) # f(x, y) for some values of X E (-1, 1) and y E (x², 1). (e) None of the above (b) (c) (d) N/A (Select One)