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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^+(z−1)2k^)⋅n^dS
over the region bounded by the cylinder x2+y2=16 and the planes z=1 and z=5.
Technique
Compute ∇⋅F (only the third component contributes); switch to cylindrical coordinates; the integral separates by Fubini.
Solution

Step 1 — Divergence.
F=(y2,xz3,(z−1)2),∇⋅F=0+0+2(z−1)=2(z−1).
Step 2 — Volume integral (divergence theorem).
∬SF⋅n^dS=∭V2(z−1)dV.
Volume V: cylinder r≤4, 1≤z≤5. In cylindrical coordinates dV=rdrdθdz.
Step 3 — Evaluate.
The integral separates:
∭V2(z−1)dV=2π∫02πdθ⋅8∫04rdr⋅16∫152(z−1)dz.
∫152(z−1)dz=[(z−1)2]15=16.
Total=2π⋅8⋅16=256π.
Answer
256π.