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UPSC 2024 Maths Optional Paper 1 Q8b — Step-by-Step Solution

15 marks · Section B

Gauss divergence theorem · Vector Analysis · asked 9× in 13 yrs · Read the full method →

Question

Using Gauss’s divergence theorem, evaluate

S(y2i^+xz3j^+(z1)2k^)n^dS\iint_S (y^2\hat i+xz^3\hat j+(z-1)^2\hat k)\cdot\hat n\,dS

over the region bounded by the cylinder x2+y2=16x^2+y^2=16 and the planes z=1z=1 and z=5z=5.

Technique

Compute F\nabla\cdot\vec F (only the third component contributes); switch to cylindrical coordinates; the integral separates by Fubini.

Solution

The closed region for the divergence theorem: the solid cylinder x^2+y^2\le16 (radius r=4) between the planes z=1 and z=5, with outward unit normal \hat n on the curved side, the top disk, and the bottom disk. Converting the surface flux to the volume integral of \nabla\cdot\vec F over this region, in cylindrical coordinates, is the whole method.

Step 1 — Divergence.

F=(y2,xz3,(z1)2),F=0+0+2(z1)=2(z1).\vec F=(y^2,\,xz^3,\,(z-1)^2),\qquad\nabla\cdot\vec F=0+0+2(z-1)=2(z-1).

Step 2 — Volume integral (divergence theorem).

SFn^dS=V2(z1)dV.\iint_S\vec F\cdot\hat n\,dS=\iiint_V 2(z-1)\,dV.

Volume VV: cylinder r4r\le 4, 1z51\le z\le 5. In cylindrical coordinates dV=rdrdθdzdV=r\,dr\,d\theta\,dz.

Step 3 — Evaluate.

The integral separates:

V2(z1)dV=02πdθ2π04rdr8152(z1)dz16.\iiint_V 2(z-1)\,dV=\underbrace{\int_0^{2\pi}d\theta}_{2\pi}\cdot\underbrace{\int_0^4 r\,dr}_{8}\cdot\underbrace{\int_1^5 2(z-1)\,dz}_{16}.

152(z1)dz=[(z1)2]15=16\int_1^5 2(z-1)\,dz=[(z-1)^2]_1^5=16.

Total=2π816=256π.\text{Total}=2\pi\cdot 8\cdot 16=256\pi.

Answer

  256π.  \boxed{\;256\pi.\;}
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