"IntegrationyB (2+i)0 A^3 xFig. 7.27 .4 INTEGRAL OF A COMPLEX FUNCTION OF A
COMPLEX VARIABLE ALONG A PIECEWISE
DIFFERENTIABLE ARC415Definition 7.3 can be extended to a piecewise differentiable arc as follows.Definition 7.4 Let 1: z = z(t), a::; t::; (3, be a piecewise differentiable
arc, and let f(z) be a continuous function along 'Y· If r1, r 2 , ... , 'Tk are·
the points of (a, (3] where the derivative z'(t) has discontinuities of the first
kind, we setJ f(z)dz= 1ri J(z(t))z'(t)dt+ ... + 1(3 J(z(t))z'(t)dt
7 k(7.4-1)where z(t) may be given by different equations in different subarcs. This
definition allows us to take and integral along a polygonal line as well as
along other continuous arcs with "corner" points.Example Consider the integral J z dz, where 'Y is the polygonal line OAB
of Fig. 7.2. We have
7
,OA: z = t,
AB: z = 2+ it,Hence
j z dz = fo
2
t dt + fo\2 -it)i dt = % + 2i
77.5 OTHER TYPES OF COMPLEX INTEGRALS
Definitions 7.5 Let f(z) be a continuous complex function along the
continuously differentiable arc 1: z = z(t) = x(t) + iy(t), a ::; t :::; (3.