Question

Question 3 (20 marks) Two random variables X and Y have the following joint probability density function. $(x,y)={{(6xy? +3y2 + 2x+) 0<x<2, 1<y<2, 0, otherwise Determine the value of the constant k. (5 Determine the marginal density functions and hence check if X and Y are inde Work out the difference between E{var(Y|X} and V ar{ECY|x)} (10 ho Question 4 (20 marks) ay -Express x in terms of Work our screen of /ke X VY J=dx

Answer 1

function, hiren x and y » Joint probability density f(ny) SK (Gr y² + 3y² + anti) ocncz 12 yea otherwise we know that 1 s sfxy (n,y) andy 2 -> S (K) (Guy?+ 3y2 + 2x + 1) andy 2.2 2:6 Aki S (52323 S (322y2 + 3yen tu? *} (i3y² + 6y² + 141) dy S (18 y² + 2) dy cy² + 2y]? +8+4)-(6+2)} k 1 k{ 44k K प ५५ functions ( 5 ) Marginal density n wit y » Form) : 9 fxy low, y) dy for oluca 2 Fx (2) tus cong²+ 3y² + 2ut i) dy

Fxla) : + [2xy² + y² + 2y + y)? the filent34 444 3) - Comeltax ] 8 t ur + 2) - (22 altan (16r+ 8) t (una 2) Home for other values of fx (4) dy -)) Y. for leyca fyly) 2 + [3x²yz at 3y2nt n (1242 t by 2 at 4A 2) . 2 (9y² + 3) for othes ralnes y fyly) so.de o cnca (22+1) so 2 Fx (n) otherwise १८५ 3 (3y2 +1) Fyly otherwise