>Green's theorem says that the line integral over a curve is the double integral over the region bounded by said curve of the curl in 2 dimensions
>Stokes's theorem says that the line integral over a curve is the flux integral of the curl over the region bounded by said curve
>Gauss's theorem says that the flux integral over a region is the triple integral of the divergence over the volume bounded by said region
I know you can derive Green's theorem from Stokes's theorem, but why isn't there a single unified theorem if all three have the same idea behind it?
>Stokes's theorem says that the line integral over a curve is the flux integral of the curl over the region bounded by said curve
>Gauss's theorem says that the flux integral over a region is the triple integral of the divergence over the volume bounded by said region
I know you can derive Green's theorem from Stokes's theorem, but why isn't there a single unified theorem if all three have the same idea behind it?
