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Stokes’ and
Gauss’
Theorems
Math 240
Stokes’
theorem
Gauss’
theorem
Calculating Stokes’ and Gauss’ Theorems
volume
Math 240 — Calculus III
Summer 2013, Session II
Monday, July 8, 2013
Stokes’ and Agenda
Gauss’
Theorems
Math 240
Stokes’
theorem
Gauss’
theorem
Calculating
volume
1. Stokes’ theorem
2. Gauss’ theorem
Calculating volume with Gauss’ theorem
Stokes’ and Stokes’ theorem
Gauss’
Theorems
Math 240
Stokes’ Theorem (Green’s theorem)
theorem Let D be a closed, bounded region in R2 with boundary
Gauss’ 1
theorem C=∂D. If F=Mi+NjisaC vector field on D then
Calculating
volume I ZZ ∂N ∂M
CMdx+Ndy= D ∂x − ∂y dxdy.
Notice that ∂N − ∂Mk = ∇×F.
∂x ∂y
Theorem (Stokes’ theorem)
Let S be a smooth, bounded, oriented surface in R3 and
suppose that ∂S consists of finitely many C1 simple, closed
curves. If F is a C1 vector field whose domain includes S, then
I∂S F·ds = ZZS∇×F·dS.
Stokes’ and Stokes’ theorem and orientation
Gauss’
Theorems
Math 240
Stokes’ Definition
theorem
Gauss’ Asmooth, connected surface, S is orientable if a nonzero
theorem normal vector can be chosen continuously at each point.
Calculating
volume
Examples
Orientable planes, spheres, cylinders, most familiar surfaces
Nonorientable M¨obius band
To apply Stokes’ theorem, ∂S must be correctly oriented.
Right hand rule: thumb points in chosen normal direction,
fingers curl in direction of orientation of ∂S.
Alternatively, when looking down from the normal direction,
∂S should be oriented so that S is on the left.
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