D is the region bounded by: y = x2, z = 1 − y, z =...

Question 2 D is the region in the first octant bounded by: z = 1 −...

Question 2 D is the region in the first octant bounded by: z = 1 − x2 and z = ( y − 1 )2 Sketch the domain D. Then, integrate f (x, y, z) over the domain in 6 ways: orderings of dx, dy, dz.

letw be the region bounded by z=1-y^2,y=x^2 and the plane z=0.Calculate the volume of W in...

letw be the region bounded by z=1-y^2,y=x^2 and the plane z=0.Calculate the volume of W in the order of dz dy dx.

Let D be the solid in the first octant bounded by the planes z=0,y=0, and y=x...

Let D be the solid in the first octant bounded by the planes z=0,y=0, and y=x and the cylinder 4x2+z2=4. Write the triple integral in all 6 ways.

5.) a.) Integrate G(x,y,z)=xz over the sphere x2+y2+z2=9 b.) Integrate G(x,y,z)=x+y+z over the portion of the...

5.) a.) Integrate G(x,y,z)=xz over the sphere x2+y2+z2=9 b.) Integrate G(x,y,z)=x+y+z over the portion of the plane 2x+y+z=6 that lies in the first octant.

Prove Gauss's Theorem for vector field F= xi +2j + z2k, in the region bounded by...

Prove Gauss's Theorem for vector field F= xi +2j + z2k, in the region bounded by planes z=0, z=4, x=0, y=0 and x2+y2=4 in the first octant

B is the solid occupying the region of the space in the first octant and bounded...

B is the solid occupying the region of the space in the first octant and bounded by the paraboloid z = x2 + y2- 1 and the planes z = 0, z = 1, x = 0 and y = 0. The density of B is proportional to the distance at the plane of (x, y). Determine the coordinates of the mass centre of solid B.

1. Integrate f(x, y) = x + y over the region in the first quadrant bounded...

1. Integrate f(x, y) = x + y over the region in the first quadrant bounded by the lines y = x, y = 3x, x = 1, and x = 3.

List these six partial derivatives for z = 3 x2 y + cos (x y) –...

List these six partial derivatives for z = 3 x2 y + cos (x y) – ex+y dz/dx dz/dy d2z/dx2 d2z/ dy2 d2z/dxdy d2z/dydx                   Evaluate the partial derivative            dz        at the point (2, 3, 30) for the function z = 3 x4 – x y2 dx

1. Find the Area of the region bounded by the graphs of y=2x and y=x2-4x            ...

1. Find the Area of the region bounded by the graphs of y=2x and y=x2-4x             a) Sketch the graphs, b) Identify the region, c) Find where the curves intersect, d) Draw a representative rectangle, e) Set up the integral, and f) Find the value of the integral.

4. Consider the solid bounded by the paraboloid x^2+ y^2 + z = 9 as well...

4. Consider the solid bounded by the paraboloid x^2+ y^2 + z = 9 as well as by the planes y = 3x and z = 0 in the first octant. (a) Graph the integration domain D. (b) Calculate the volume of the solid with a double integral.