Consider the double integral bounded by the lines u = x/y, y = 2x, y = 1/4x ∫Se⁻ˣʸ/² dA , where, S is the region in the zy-plane and the curves y = 1/x and y = 4/x Use the sustitution and v = xy together with the Jacobian to rewrite the double integral as an iterated integral in u and v. You do not need to evaluate the integral.