Evaluate ff, F dS, where F = (xz2 + y°2) i+ (cos(2)+ sin(2) ) j+ (xz + y?) k 3 and S is the top half of the sphere 22 + y? + 2? = 1. Note that S is not a closed surface. Therefore you must first find a surface S such that you can (a) Evaluate the flux of F across S1. (b) Use the divergence theorem on SUSI.

Hello, 
I need to determine the flux across this surface which I have found to be for z is greater than equal to zero with the domain and range traversing between -1 and 1. My divergence for F is equal to x^2 + y^2 + z^2 But i do not know what to do. My solution came out to be 4 which i dont believe is the answer.

Can you solve a and b ( i believe they are different methods to solve)?

Thank you

Transcribed Image Text:

Evaluate ff, F dS, where (xz2 + y°2) i+ ( cos(x)+ sin(2) ) j+ (xz + y?) k 3 and S is the top half of the sphere 22 + y? + 2? = 1. Note that S is not a closed surface. Therefore you must first find a surface S such that you can (a) Evaluate the flux of F across S1. (b) Use the divergence theorem on SU SI.