COMPLEX VARIABLES
must be made in terms of entirely real integrals. For example, the first is given by
∫ 1
0−R+iR
R(1−t)+itRdt=∫ 1
0(−1+i)(1−t−it)
(1−t)^2 +t^2dt=
∫ 1
02 t− 1
1 − 2 t+2t^2dt+i∫ 1
01
1 − 2 t+2t^2dt=
1
2
[
ln(1− 2 t+2t^2 )] 1
0+
i
2[
2tan−^1(
t−^12
1
2)] 1
0=0+i
2[π2−
(
−
π
2)]
=
πi
2.
The second integral on the RHS of (24.38) can also be shown to have the valueπi/2. Thus
∫
C 3dz
z=πi.Considering the results of the preceding two examples, which have commonintegrands and limits, some interesting observations are possible. Firstly, the two
integrals fromz=Rtoz=−R, alongC 2 andC 3 , respectively, have the same
value, even though the paths taken are different. It also follows that if we took a
closed pathC 4 , given byC 2 fromRto−RandC 3 traversed backwards from−R
toR, then the integral roundC 4 ofz−^1 would be zero (both parts contributing
equal and opposite amounts). This is to be compared with result (24.36), in which
closed pathC 1 , beginning and ending at the same place asC 4 , yields a value 2πi.
It is not true, however, that the integrals along the pathsC 2 andC 3 are equalfor any functionf(z), or, indeed, that their values are independent ofRin general.
Evaluate the complex integral off(z)=Rezalong the pathsC 1 ,C 2 andC 3 shown in
figure 24.9.(i) If we takef(z)=Rezand the contourC 1 then
∫C 1Rezdz=∫ 2 π0Rcost(−Rsint+iRcost)dt=iπR^2.(ii) UsingC 2 as the contour,
∫C 2Rezdz=∫π0Rcost(−Rsint+iRcost)dt=^12 iπR^2.(iii) Finally the integral alongC 3 =C 3 a+C 3 bis given by
∫C 3Rezdz=∫ 1
0(1−t)R(−R+iR)dt+∫ 1
0(−sR)(−R−iR)ds=^12 R^2 (−1+i)+^12 R^2 (1 +i)=iR^2 .The results of this section demonstrate that the value of an integral between thesame two points may depend upon the path that is taken between them but, at
the same time, suggest that, under some circumstances, the value is independent
of the path. The general situation is summarised in the result of the next section,