← 2021 Paper 2

UPSC 2021 Maths Optional Paper 2 Q1d — Step-by-Step Solution

10 marks · Section A

Cauchy's residue theorem · Complex Analysis · asked 5× in 13 yrs · Read the full method →

Question

c(t)=e4πitc(t)=e^{4\pi i t}, 0t10\le t\le 1. Evaluate cdz2z25z+2\int_c\dfrac{dz}{2z^2-5z+2}.

Technique

Recognise the curve winds twice; residue theorem with winding number.

Solution

Setup. c(t)=e4πitc(t)=e^{4\pi i t} traces the unit circle z=1|z|=1 twice (as tt goes from 0 to 1, the angle goes 04π0\to 4\pi).

Step 1 — Factor denominator

2z25z+2=(2z1)(z2)2z^2-5z+2=(2z-1)(z-2). Roots: z=1/2z=1/2 and z=2z=2.

Only z=1/2z=1/2 is inside z=1|z|=1.

Step 2 — Residue at z=1/2z=1/2

12z25z+2=1(2z1)(z2)\dfrac{1}{2z^2-5z+2}=\dfrac{1}{(2z-1)(z-2)}.

Resz=1/2=limz1/2z1/2(2z1)(z2)=limz1/2z1/22(z1/2)(z2)=12(1/22)=12(3/2)=13\text{Res}_{z=1/2}=\lim_{z\to 1/2}\dfrac{z-1/2}{(2z-1)(z-2)}=\lim_{z\to 1/2}\dfrac{z-1/2}{2(z-1/2)(z-2)}=\dfrac{1}{2(1/2-2)}=\dfrac{1}{2(-3/2)}=-\dfrac{1}{3}.

Step 3 — Apply residue theorem (with winding number)

The curve cc winds around z=1/2z=1/2 twice (winding number n=2n=2).

cfdz=2πinRes=2πi2(1/3)=4πi3\int_c f\,dz=2\pi i\cdot n\cdot\text{Res}=2\pi i\cdot 2\cdot(-1/3)=-\dfrac{4\pi i}{3}.

Answer

  cdz2z25z+2=4πi3.  \boxed{\;\int_c\dfrac{dz}{2z^2-5z+2}=-\dfrac{4\pi i}{3}.\;}
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