Exam 15: Multiple Integrals

Convert the point to rectangular coordinates (x,y,z).

Evaluate the double integral. R is bounded by y = 3x - 2, y = 3x + 1, y = -x + 2, and y = -x + 5

Compute the volume of the solid bounded by the given surfaces.

Evaluate the iterated integral by first changing the order of integration.

Compute the volume of the solid bounded by , , , and .

Which of the following could represent the triple integral in cylindrical coordinates where Q is the region bounded below by and above by ?

Evaluate the triple integral . ,

Convert the equation in spherical coordinates to an equation in rectangular coordinates.

Evaluate the iterated integral by first changing the order of integration.

Find the center of mass of the solid with density and the given shape. ,

Set up and evaluate the integral where Q is the region above the xy-plane bounded by the hemisphere centered at (0,0,0) and with a radius of 4.

Find the mass and moments of inertia I_x and I_y for a lamina in the shape of the region bounded by and with density .

Use a transformation to evaluate the double integral over the region R which is the region that lies inside outside and in the first quadrant.

Convert the equation into spherical coordinates.

Find the mass of the solid with density and the given shape. ,

Calculate the mass of an object with density and bounded by and the planes .

Set up and evaluate the integral where Q is the region inside a sphere centered at (0,0,0) and with a radius of 5.

Write the equation in cylindrical coordinates.

Find a transformation from a rectangular region S in the uv-plane to the region R which lies inside outside and in the first quadrant.

Compute the volume of the solid Q bounded by and .