Question

2. Suppose that the random variables X and Y have joint probability density function given by f(x, y) = 18(x - x?)y?, 0SX S1, OS y si. Let U = XY. Find the density function of U.

Answer 1

The solution to this problem is given below

to pandom variables X and Y have joint PDF given by - fy) = 18(1-x]xy?, ocasi, osys! Let U=XY Z=Y ✓ = The Jacobian of the transformation is, -IN plit - O |Ź Now, osasi Op, o susi Or, o 25 t Esse ; 055 On 230 ₃ su on, a 23 : Uszsi

. The joint PDF ob u, z is, flut) = 18(1-). Za PDF ob o iss . The marginal - fo (4)= 18 (- 4 Judz 0 3 = 18 ( (u- u) dz = 18 Jude - 18 us de = 18 u 17 - 1set [nage] - 19 u(1-4) - cout [log! - logen] - 18uCi-u) + 18 ulogue [iloge! =] fo (u) = 184(1-4) + 184 logeu, oq usi i