Question: Prove the identities assuming that the appropriate partial derivatives exist and are continuous. Curl(F + G) = curl(F) + curl(G)

Prove the identities assuming that the appropriate partial derivatives exist and are continuous.

Curl(F + G) = curl(F) + curl(G)

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Suppose F F1 F2 F3 and G G1G2 G3 Then curlF G curlF1 ... View full answer

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