Using stokes theorem, prove that the divergence of curl of a vector is zero
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Answer:
stokes theorem
Explanation:
If F = ∇ f , the line integral of F along any curve is the difference of the values of f at the endpoints. For a closed curve, this is always zero. Stokes' Theorem then says that the surface integral of its curl is zero for every surface, so it is not surprising that the curl itself is zero.
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