Line Integrals and Green’s Theorem

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greenstheorem

Regions with multiple boundary curves
Extended Green’s theorem

Extended Green’s theorem

We can extend Green’s theorem to a region R which has multiple boundary curves. The figures below show regions bounded by 2 or more curves. You will see that this gives us away to work around singularities in the field F.

Regions with multiple boundary curves

Consider the following three regions.

C₁ C₇
The region on the left, R_A is bounded by C₁ and C₂. We say that the boundary is C₁ + C₂. Note that the way it is drawn, the region is always to the left as you traverse either boundary curve.
The region on the right, R_C is bounded by C₇ and C₈. We say that the boundary is C₇ −C₈. The reason for the minus sign is that the boundary curves should be oriented so that the region is to your left as you traverse the curve. As shown, the region R_C is to the right of C₈, but to the left of −C₈.
Likewise, in the middle figure, R_B has boundary C₃ + C₄ + C₅ + C₆. You should check that our signs are consistent with the orientation of the curves.

Extended Green’s theorem

I ∫∫·
Theorem GT.29. Extended Green’s theorem.Suppose R_A is the region in the left-hand figure above then, for any vector field F differentiable in all of R_A we have
F dr = curlF dx dy.
C₁+C₂ R_A

I ∫∫·
Likewise for more than two curves: If R_B has boundary C₃ + C₄ + C₅ + C₆ and F is differentiable on all of R_B then

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Line Integrals and Green’s Theorem

Extended Green’s theorem

Regions with multiple boundary curves

Extended Green’s theorem