Answer: 3138 Let k be a constant, F = F(x, y, z), G = G(x, y, z), and = (x, y, z). Prove
Chapter 15, Problem 34(choose chapter or problem)
Let \(k\) be a constant, F = F\((x, y, z)\),G = G\((x, y, z)\), and \(\phi=\phi(x, y, z)\). Prove the following identities, assuming that all derivatives involved exist and are continuous.
curl(F + G) = curl F + curl G
Equation Transcription:
𝜙 = 𝜙
Text Transcription:
k
(x, y, z)
(x, y, z)
phi = phi(x, y, z)
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