Suppose thatC is a circle in the domain of a conservativenonzero vector field in the
Chapter 15, Problem 29(choose chapter or problem)
Suppose that \(C\) is a circle in the domain of a conservative nonzero vector field in the \(xy\)-plane whose component functions are continuous. Explain why there must be at least two points on \(C\) at which the vector field is normal to the circle.
Equation Transcription:
Text Transcription:
C
xy
C
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