Question

show that the circulation of conservative vector field is zero.​

Answer 1

Answer:

As mentioned in the context of the gradient theorem, a vector field F is conservative if and only if it has a potential function f with F=∇f. ... One can show that a conservative vector field F will have no circulation around any closed curve C, meaning that its integral ∫CF⋅ds around C must be zero.

Explanation:

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