Let R be the region in the xy plane bounded by the curves

xy=1 xy=4 xy^2=1 xy^2=4 in the first quadrant consider the transformation u=xy and v=xy^2 part a) sketch a graph of the region T, in the u,v plane. part b) solve for the transformation equations for x, and y in terms of u, and v. Part C) compute the jacobian. Part D) use the change of variables theorem to evaluate the double integral SS y dxdy.

(1 point) Compute the area of the region D bounded by =1, x = 36 in the first quadrant of the xy-plane. (a) Graph the region D (b) Using the non-linear change of variables u = xy and v = xyz , find x and y as functions of u and v x-x(u, v) y = y(u, v) (c) Find the determinant of the Jacobian for this change of variables. det a(u, v) (d) Using the change of variables, set up a double integral for calculating the area of the region D b rd|a(x, y) dxdy = du dv = : du dv li, V (e) Evaluate the double integral and compute the area of the region D Area =

Let R be the region bounded by the ellipse x^2/a^2 + y^2/b^2 = 1, where a > 0 and b > 0 are real numbers. Let T be the transformation x = au, y = bv. Evaluate integral integral_R |xy| dA. First, find the Jacobian for the given transformation. J (u, v) = Perform the change of variables and write the new integral in the uv-plane. integral^_ integral^_ () dvdu (Type exact answers.) Now evaluate the integral. integral integral_R |xy| dA =

Use the given transformation to evaluate the integral. x = u/v, y = v 5xy dA, where R is the region in the first quadrant bounded by the lines y = 1/3x and y = 3/2x and the hyperbolas xy = 1/3 and xy = 3/2;