Mathematical Methods for Physics and Engineering : A Comprehensive Guide

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11.9 STOKES’ THEOREM AND RELATED THEOREMS


is the circlex^2 +y^2 =a^2 in thexy-plane. This is given by


C

a·dr=


C

(yi−xj+zk)·(dxi+dyj+dzk)

=



C

(ydx−xdy).

Using plane polar coordinates, onCwe havex=acosφ,y=asinφso thatdx=
−asinφdφ,dy=acosφdφ, and the line integral becomes


C

(ydx−xdy)=−a^2

∫ 2 π

0

(sin^2 φ+cos^2 φ)dφ=−a^2

∫ 2 π

0

dφ=− 2 πa^2.

Since the surface and line integrals have the same value, we have verified Stokes’ theorem
in this case.


The two-dimensional version of Stokes’ theorem also yields Green’s theorem in

a plane. Consider the regionRin thexy-plane shown in figure 11.11, in which a


vector fieldais defined. Sincea=axi+ayj, we have∇×a=(∂ay/∂x−∂ax/∂y)k,


and Stokes’ theorem becomes
∫∫


R

(
∂ay
∂x


∂ax
∂y

)
dx dy=


C

(axdx+aydy).

LettingP=axandQ=aywe recover Green’s theorem in a plane, (11.4).


11.9.1 Related integral theorems

As for the divergence theorem, there exist two other integral theorems that are


closely related to Stokes’ theorem. Ifφis a scalar field andbis a vector field,


and bothφandbsatisfy our usual differentiability conditions on some two-sided


open surfaceSbounded by a closed perimeter curveC,then


S

dS×∇φ=


C

φdr, (11.24)

S

(dS×∇)×b=


C

dr×b. (11.25)

Use Stokes’ theorem to prove (11.24).

In Stokes’ theorem, (11.23), leta=φc,wherecis a constant vector. We then have


S

[∇×(φc)]·dS=


C

φc·dr. (11.26)

Expanding out the integrand on the LHS we have


∇×(φc)=∇φ×c+φ∇×c=∇φ×c,

sincecis constant, and the scalar triple product on the LHS of (11.26) can therefore be
written


[∇×(φc)]·dS=(∇φ×c)·dS=c·(dS×∇φ).
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