← 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\displaystyle\int_C \operatorname{Re}(z^2)\,dz from 00 to 2+4i2+4i along the curve CC where CC is a parabola y=x2y=x^2.

Technique

Parametrize z=x+ix2z=x+ix^2; substitute Re(z2)=x2y2\operatorname{Re}(z^2)=x^2-y^2 with y=x2y=x^2; reduce to two real integrals.

Solution

Step 1 — Parametrize the curve

On C: y=x2C:\ y=x^2, write z=x+iy=x+ix2z=x+iy=x+ix^2, x:02x:0\to2. Endpoints: x=0z=0x=0\Rightarrow z=0; x=2z=2+4ix=2\Rightarrow z=2+4i. ✓ Then

dz=(1+2ix)dx.dz=(1+2ix)\,dx.

Step 2 — Compute the integrand Re(z2)\operatorname{Re}(z^2)

z2=(x+iy)2=(x2y2)+2ixy  Re(z2)=x2y2.z^2=(x+iy)^2=(x^2-y^2)+2ixy\ \Rightarrow\ \operatorname{Re}(z^2)=x^2-y^2.

On CC, y=x2y=x^2, so

Re(z2)=x2(x2)2=x2x4.\operatorname{Re}(z^2)=x^2-(x^2)^2=x^2-x^4.

Step 3 — Assemble and integrate

CRe(z2)dz=02(x2x4)(1+2ix)dx.\int_C \operatorname{Re}(z^2)\,dz=\int_0^2 (x^2-x^4)(1+2ix)\,dx.

Split into real and imaginary parts:

=02(x2x4)dxreal+  2i02x(x2x4)dximag=02(x2x4)dx+2i02(x3x5)dx.=\underbrace{\int_0^2(x^2-x^4)\,dx}_{\text{real}}+\;2i\underbrace{\int_0^2 x(x^2-x^4)\,dx}_{\text{imag}}=\int_0^2(x^2-x^4)\,dx+2i\int_0^2(x^3-x^5)\,dx.

Real part:

02(x2x4)dx=[x33x55]02=83325=409615=5615.\int_0^2(x^2-x^4)\,dx=\Big[\tfrac{x^3}{3}-\tfrac{x^5}{5}\Big]_0^2=\tfrac{8}{3}-\tfrac{32}{5}=\frac{40-96}{15}=-\frac{56}{15}.

Imaginary part:

202(x3x5)dx=2[x44x66]02=2(4646)=2(4323)=2(203)=403.2\int_0^2(x^3-x^5)\,dx=2\Big[\tfrac{x^4}{4}-\tfrac{x^6}{6}\Big]_0^2=2\Big(4-\tfrac{64}{6}\Big)=2\Big(4-\tfrac{32}{3}\Big)=2\cdot\Big(-\tfrac{20}{3}\Big)=-\frac{40}{3}.

Answer

  CRe(z2)dz=5615403i.  \boxed{\;\int_C \operatorname{Re}(z^2)\,dz=-\frac{56}{15}-\frac{40}{3}\,i.\;}
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