# Homework Help: Double fourier transform

1. Jul 22, 2011

### zetafunction

1. The problem statement, all variables and given/known data

compute the fourier transform in 2 variables $$\iint_{R^{2}}dxdy\frac{x^{2}y}{1+x+y}exp(iax+iby)$$

2. Relevant equations

$$\iint_{R^{2}}\frac{x^{2}y}{1+x+y}exp(iax+iby)$$

3. The attempt at a solution

i have tried by FIRST substractin a polynomial on variable 'x' and considering 'y' to constant in order to get a finite expression for the integral over 'x' , then i do the same over 'y'