?If the components of \(F\) have continuous second partial derivatives and \(S\) is the
Chapter 16, Problem 40(choose chapter or problem)
If the components of \(F\) have continuous second partial derivatives and \(S\) is the boundary surface of a simple solid region, show that \(\iint_{S} \operatorname{curl} F \cdot d S=0\)
Equation Transcription:
∬S
Text Transcription:
F
S
double integral _S curl F . dS = 0
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