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UPSC 2024 Maths Optional Paper 1 Q3b — Step-by-Step Solution
20 marks · Section A
Maxima and minima of single-variable functions · Calculus · asked 7× in 13 yrs · Read the full method →
Question
Find the volume of the greatest cylinder which can be inscribed in a cone of height h and semi-vertical angle α.
Technique
Express cylinder dimensions via similar triangles; write V(r); use the first-derivative test.
Solution

Step 1 — Geometry.
Place the cone with apex at top and axis vertical, base radius R=htanα. Inscribe a coaxial cylinder of radius r and height H.
The cylinder’s top edge touches the cone at distance x from the apex, where the cone has radius xtanα=r, giving x=rcotα. The cylinder height is
H=h−x=h−rcotα.
Step 2 — Optimise volume.
V(r)=πr2H=πr2(h−rcotα)=πhr2−πr3cotα.
drdV=2πhr−3πr2cotα=πr(2h−3rcotα).
Critical point (other than r=0): r⋆=32htanα.
V′′(r⋆)=2πh−6πr⋆cotα=2πh−4πh=−2πh<0: maximum confirmed.
Step 3 — Maximum volume.
At r⋆=32htanα, the cylinder height is H⋆=h−32h=3h, and
V⋆=π(r⋆)2H⋆=π⋅94h2tan2α⋅3h=274πh3tan2α.
Answer
Vmax=274πh3tan2α,attained at radius r=32htanα and height H=3h.