Prove the identity, assuming that the appropriate partial derivatives exist and are continuous. If f is a
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Prove the identity, assuming that the appropriate partial derivatives exist and are continuous. If f is a scalar field and F, G are vector fields, then f F, F • G, and F x G are defined by
(f F)(x, y, z) = f (x, y, z) F(x, y, z)
(F • G)(x, y, z) = F(x, y, z) • G(x, y, z)
(F x G)(x, y, z) = F(x, y, z) x G(x, y, z)
curl( f F) = f curl F + (∇f) x F
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