Prove that (operatorname{curl}(f mathbf{a})=abla f times mathbf{a}), where (f) is a differentiable function and (mathbf{a}) is a

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Prove that $\operatorname{curl}(f \mathbf{a})=abla f \times \mathbf{a}$, where $f$ is a differentiable function and $\mathbf{a}$ is a constant vector.

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Calculus

ISBN: 9781319055844

4th Edition

Authors: Jon Rogawski, Colin Adams, Robert Franzosa

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Question Posted: Jan 28, 2024 12:01 AM

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Prove that (operatorname{curl}(f mathbf{a})=abla f times mathbf{a}), where (f) is a differentiable function and (mathbf{a}) is a

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To find the curl of the vector field f a f a well need to work with the regular definition of curl i...View the full answer

Calculus

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