11. The region R is bounded by the following curves. x2 + y2 = 4 x2...
The region R is bounded by the following curves. x2 + y2 = 4 x2 + y2 = 9 x2 - y2 = 1 x2 - y2 = 4 (a) Find a change of variables such that the transformed region is a rectangle in the uv-plane. u= V= (b) Draw a picture of S, the transformation of R into the uv-plane. Y υ 3 10 8 2 6 R 4 1 N х и 4 6 8 10 N (c)...
11. The region R is bounded by the following curves. x2 + y2 = 4 x2 + y2 = 9 22 - y2 = 1 22 - y2 = 4 (a) Find a change of variables such that the transformed region is a rectangle in the uv-plane. U= U= (b) Draw a picture of S, the transformation of R into the uv-plane. y 3 10 8 2 6 R 4 1 2 u 2 3 2 4 6 8 10...
b) what are the bounds for u and v Let R be the region in the zy- plane bounded by the curves (part 1 of 2) Which of the following is a transformation that maps Ronto a rectangle S in the uv-plane? Ou=*+vy, v= Ou= x +y?, u= - y2 Ou=va, v=vx+y None of the other choices. Ou=va, v=v-y Ou=15+ y, v=va - y
Evaluate the triple integrals JR V and JSSR zdv, where R is the region bounded above by the sphere x2 +y2+22 : 4, below by the cone 3za_ x2 + y2, and such that y 2 0 Evaluate the triple integrals JR V and JSSR zdv, where R is the region bounded above by the sphere x2 +y2+22 : 4, below by the cone 3za_ x2 + y2, and such that y 2 0
4. Let R be the region bounded by x = y2 and x = 4. see picture. Find the volume of the solid of base R, whose cross-sections are equilateral triangles perpen- dicular to the x-axis. 2 y R х 1 2 3 -1 -2
1/3 x + y 7. Consider dA where R is the region bounded by the triangle with vertices (0,0), (2,0), V= x+y X-y and (0,-2). The change of variables u=- defines a transformation T(x,y)=(u,v) from the xy-plane 2 to the uv-plane. (a) (10 pts) Write S (in terms of u and v) using set- builder notation, where T:R→S. Use T to help you sketch S in the uv-plane by evaluating T at the vertices. - 1 a(u,v) (b) (4 pts)...
(a) Find the volume of the region bounded above by the sphere x2 +y2 +z225 and below by the plane z - 4 by using cylindrical coordinates Evaluate the integral (b) 2x2dA ER where R is the region bounded by the square - 2
2) The region R is bounded by the x-axis and y = V16 - x2 a) (0.75 point) Sketch the bounded region R. Label your graph. b) (0.75 point) Set up the iterated integral to solve for the area of the bounded region using either the Ry region or Ry region. Do not integrate. c) (1.25 point) Evaluate the integral using polar coordinates for the region R. sec(x2 + y2) tan(x2 + y2) dA R
2) The region R is bounded by the x-axis and y = V16 - x2 a) (0.75 point) Sketch the bounded region R. Label your graph. b) (0.75 point) Set up the iterated integral to solve for the area of the bounded region using either the Rx region or Ry region. Do not integrate. c) (1.25 point) Evaluate the integral using polar coordinates for the region R. sec(x2 + y2) tan(x2 + y2) dA R
2) The region R is bounded by the x-axis and y = V16 – x2. a) (0.75 point) Sketch the bounded region R. Label your graph. b) (0.75 point) Set up the iterated integral to solve for the area of the bounded region using either the Rx region or Ry region. Do not integrate. c) (1.25 point) Evaluate the integral using polar coordinates for the region R. S sec(x2 + y2) tan(x2 + y2) da R