Recent content by pretzsp

Yeah, those last steps were fine for me, I just wasn't sure if that even with c a constant vector that it was "allowed" to just pull it out like so. Thanks for the help.

Well, what I get here is \iint_S \vec c\cdot\nabla f \times d\vec S = -\oint \vec c \cdot fd\vec r And I'm not entirely sure whether I can just "cancel" the c dot product... (should be a vector c there, by the way)

Homework Statement Show using Stoke's Theorem that S is an open surface with boundary C (a space curve). f(\vec r) is a scalar field. Homework Equations Stoke's theorem \iint_S (\nabla\times \vec F) \cdot d\vec S = \int_C F \cdot d\vec r The Attempt at a Solution Thus far...