I invented this problem you don't have to do it...
take 2 wrinkled spheres of opposite charge rhocharge2 and equal radius, volumerho1 of the spheres=[tex]1+\frac{1}{2}sin(m\pi) sin(n\phi), m=6, n=5[/tex]. The spheres overlap in a region and the vector between the centers of the spheres is d. What is the electrical field between the 2 spheres. I'm curious if there are more than 3 Gaussian surfaces with interesting symmetries other than spheres, cylinders, boxes....
take 2 wrinkled spheres of opposite charge rhocharge2 and equal radius, volumerho1 of the spheres=[tex]1+\frac{1}{2}sin(m\pi) sin(n\phi), m=6, n=5[/tex]. The spheres overlap in a region and the vector between the centers of the spheres is d. What is the electrical field between the 2 spheres. I'm curious if there are more than 3 Gaussian surfaces with interesting symmetries other than spheres, cylinders, boxes....