← 2019 Paper 2
UPSC 2019 Maths Optional Paper 2 Q3c — Step-by-Step Solution
10 marks · Section A
Cauchy's theorem (Cauchy-Goursat) · Complex Analysis · asked 2× in 13 yrs · Read the full method →
Question
Evaluate the integral ∫CRe(z2)dz from 0 to 2+4i along the curve C where C is a parabola y=x2.
Technique
Parametrize z=x+ix2; substitute Re(z2)=x2−y2 with y=x2; reduce to two real integrals.
Solution
Step 1 — Parametrize the curve
On C: y=x2, write z=x+iy=x+ix2, x:0→2. Endpoints: x=0⇒z=0; x=2⇒z=2+4i. ✓ Then
dz=(1+2ix)dx.
Step 2 — Compute the integrand Re(z2)
z2=(x+iy)2=(x2−y2)+2ixy ⇒ Re(z2)=x2−y2.
On C, y=x2, so
Re(z2)=x2−(x2)2=x2−x4.
Step 3 — Assemble and integrate
∫CRe(z2)dz=∫02(x2−x4)(1+2ix)dx.
Split into real and imaginary parts:
=real∫02(x2−x4)dx+2iimag∫02x(x2−x4)dx=∫02(x2−x4)dx+2i∫02(x3−x5)dx.
Real part:
∫02(x2−x4)dx=[3x3−5x5]02=38−532=1540−96=−1556.
Imaginary part:
2∫02(x3−x5)dx=2[4x4−6x6]02=2(4−664)=2(4−332)=2⋅(−320)=−340.
Answer
∫CRe(z2)dz=−1556−340i.