Integration 457Hence(j + j) f(z)dz ~ (i +£ + 1+[,+1 +_[,
- f + j, + f + j, + f + j) f( z) dz ~ 0
which givesJ f(z)dz+ J f(z)dz+ J f(z)dz=O
0 -~ -~
orJ f(z) dz= J f(z)dz + J f(z) dz
0 01 02
sinceJ f(z) dz+ J f(z) dz= J f(z)dz
0' 011 0J f(z)dz + J f(z)dz = J f(z) dz= -J f(z) dz
q q -~ ~
for k = 1,2.
As a particular case, consider any simple closed contour C and a circleC1 such that Ci C Int C. If f is analytic on both C and Ci, as well as on
the doubly connected region R bounded by C* and c; (Fig. 7.13), we have
J f(z) dz= J f(z) dz (7.12-2)
0 01provided that both C and C 1 are described the same number of times in
the same direction. This property reduces the evaluation of the integral
of f along C to the usually simpler evaluation of the integral along C1.
Formula (7.12-2) will be used often in what follows.
If we denote by ct the contour C 1 as described once in the positive
direction (a notation that we shall also apply to any contour later), and if