## Homework for Static Fields

1. (StokesVerify) Verify Stoke's Theorem for a given field and a hemispherical surface.

Verify Stokes' Theorem for $\FF( r, \theta, \phi)=e^{r^2} \hat{r} + {1\over 2}\sin\theta \,\hat{\phi}$ where the butterfly net surface is the hemisphere of radius 5 centered at the origin with $z\ge 0$.

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