Answer to Question #86238 in Field Theory for Ajay

Question #86238

Using Gauss’ Theorem calculate the flux of the vector field F ˆ
i ˆ
j kˆ = x + y + z r through
the surface of a cylinder of radius A and height H, which has its axis along the z-axis
and the base of the cylinder is on the xy-plane.

Expert's answer

Gauss' theorem states

"\\rm{Flux}=\\int \\vec F d\\vec A=\\intop \\rm{div}\\vec F dV"

Since

"\\rm{div}\\vec F=\\frac{\\partial F_x}{\\partial x}+\\frac{\\partial F_y}{\\partial y}+\\frac{\\partial F_z}{\\partial z}=\\frac{\\partial x}{\\partial x}+\\frac{\\partial y}{\\partial y}+\\frac{\\partial z}{\\partial z}=3"

we obtain

"\\rm{Flux}=\\intop \\rm{div}\\vec F dV=\\intop 3 dV=3V=3 \\pi A^2 H"