4. Use the Jacobian of a coordinate transformation to find the area of the parallelogram bounded...
Use the given transformation to evaluate the integral. -5x dx dy where R is the parallelogram bounded by the linesy-x+1, y-x +4 y#2x+2y»2x + 5 A) -5 B) 10 C)5 D)-10 32) y+ x where R is the trapezoid with vertices at (6,0), ,0).。. 6), (0.9) 45 45 B) ÷ sin l 45 C) sin 2 45 A) sin 2 Use the given transformation to evaluate the integral. -5x dx dy where R is the parallelogram bounded by the linesy-x+1,...
Use the given transformation to evaluate the given integral, where R is the parallelogram with vertices (-2, 6), (2, -6), (5,-3), and (1,9). L = SUR(16.+12y) dA; r = {(u +v), y=(v – 3u) L =
1. a) Find the area of the region D which is the parallelogram with vertices 00), 0, 2.2) b) Transform D to a rectangle, T(D), in u and v. Find the area of T(D) and (Area of D (Area of T(D)). Also find the Jacobian of the transformation. e) Evaluate JI (4x -3y)sec (4x +3y)dA 1. a) Find the area of the region D which is the parallelogram with vertices 00), 0, 2.2) b) Transform D to a rectangle, T(D),...
4. (10 points) Find the Jacobian of the transformation = + 0 , y = 1 + wu, 2=W + uw
Integration in the plane using a coordinate transformation Let R be the region in the first quadrant of the plane bounded by the paraboles y 1and y- 6-2 and by the parabolesy and Make a drawing of region R Use the transformation determined by the equations y2 and y - calculate the following integral: 2, and d A E3 Integration in the plane using a coordinate transformation Let R be the region in the first quadrant of the plane bounded...
The figure below shows a curve C, parametrized by (a) The point P lies on C, and its r-coordinate is 4. Find the value of t at the point P according to the parametrization, and find the y-coordinate of P. equation in terms of r and y. line 4. as shown shaded in the figure. Find the area of R. (b) The line is normal to C at the point P. Express the line l using an (c) The bounded...
Compute the Jacobian for the transformation and. Bonus: Find the coordinates for the point in the xy-Plane. 11. (7 pts.) Compute the Jacobian for the transformation x = ue' and y=ue". Bonus: Find the (u, v) coordinates for the point in the xy-Plane (3e, \e).
Find the Jacobian of the transformation: x=uev, y=veu
Evaluate the following double integral over the parallelogram(R) bounded by the lines y = 1, y = I-1, + 2y = 0, and 2 + 2y = 2, 1 + 2y dA R cos(x - y) (You need integral of sec function!) Seco
The area of the plane figure bounded by the curve y =sin : and the coordinate axes in the first quadrant is equal to k.. Find