Chapter 9: Vector Calculus
Section 9.10: Green's Theorem
Use Green's theorem to show that the area inside the plane region R is given by ∳Cx dy.
Take F=x i in the divergence-form of Green's theorem. Since f=x and g=0, ∫∫Rfx+gy dA = ∳Cf dy−g dx becomes ∫∫R1 dA = A = ∳Cx dy.
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