Compute the double integral ∫∫d3xy2dxdy ∫∫d3xy2dxdy over the region dd bounded by xy=1, xy=16, xy2=1, xy2=25 xy=1, xy=16, xy2=1, xy2=25 in the first quadrant of the xyxy-plane. hint: make a change of variables t: ℝ2→ℝ2t: r2→r2 that converts a rectangular region d∗d∗ in the uvuv-plane into the region of integration d=t(d∗)d=t(d∗) in the xyxy-plane.