Solving Gauss Divergence Theorem on a Closed Surface

[HeheZz]

Homework Statement

Verify Gauss Divergence Theorem ∭∇.F dxdydz=∬F. (N)dA
Where the closed surface S is the sphere x^2+y^2+z^2=9 and the vector field F = xz^2i+x^2yj+y^2zk

The Attempt at a Solution

I have tried to solve the left hand side which appear to be (972*pi)/5
However, I can't seems to solve the right hand side to get the same answer.
I substitute x = 3sin(theta)cos(phi), y=3sin(theta)sin(phi), z=3cos(theta)
Therefore N=9sin^2(theta)cos(phi)i+9sin^2(theta)cos(phi)j+9cos(theta)
and F = F=27sin(θ)cos^2(θ)cos(φ)+27sin^3(θ)cos^2(φ)sin(φ)+27sin^2(θ)cos(θ)sin^2(φ)
then I used ∫(0-2pi)∫(0-pi) F. (N) dθdφ
I got the final answer as (324*pi)/5 which does not match with left hand side.
Hope anyone can help here please. Thanks!

 

[vela]

Your N is wrong. Describe to me what you think N is.

 

[HeheZz]

N is the normal vector?

where r(θ,φ) = (3sinθcosφ, 3sinθsinφ, 3cosθ)

and N = rθ X rφ

Thus, N=9sin^2(θ)cos(φ)i+9sin^2(θ)cos(φ)j+9cos(θ)sin(θ)k

 

[vela]

Yes, it's a normal vector. More important, it's the unit normal vector. Since you're using a sphere, it will just be the radial unit vector.

Edit: Oh, I see what you're doing. That's not just the normal vector but the normal vector scaled by the part of the area element. I think you're just cranking out the integral wrong, but let me try calculate it here to make sure.

 

[HeheZz]

Do you mean the range values when i am integrating? I don't understand what to use. Isnt it 0-pi for the inner integral and 0-2pi for the outer integral?

 

[vela]

N is the normal vector?

where r(θ,φ) = (3sinθcosφ, 3sinθsinφ, 3cosθ)

and N = rθ X rφ

Thus, N=9sin^2(θ)cos(φ)i+9sin^2(θ)cos(φ)j+9cos(θ)sin(θ)k

The y-component of your N should have sin(φ), not cos(φ).

 

[vela]

Do you mean the range values when i am integrating? I don't understand what to use. Isnt it 0-pi for the inner integral and 0-2pi for the outer integral?

Yeah, you did everything right except you made a mistake on the y-component of N. If you fix that, you should get the right answer. It worked out for me.

 

[HeheZz]

OK! I got it! Tnx for the help very much! I didnt realize this mistake and was really stress over it.. Thanks again for the help and I got the answer :D