Multi-Variable Calculus Assignment

Evaluate the double integral
INT[INT[_{D} {x^{2} y^{2}} dx dy ]] ,
where D is the disk defined by the inequality x^{2} + y^{2} <= a^{2}, for a given positive constant a.
The centroid of a planar region S is defined to be the point (\bar{x}, \bar{y}), where

\bar{x}

=

{1}/{A(S)} INT[INT[_{S} x dx dy]]

\bar{y}

=

{1}/{A(S)} INT[INT[_{S} y dx dy]]

and A(S) is the area of S. Find the centroid of the region that is bounded by the parabola y = 4 - x^{2} and the line y = -3 x.