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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 hh and semi-vertical angle α\alpha.

Technique

Express cylinder dimensions via similar triangles; write V(r)V(r); use the first-derivative test.

Solution

Vertical cross-section through the cone's axis. The inscribed coaxial cylinder (radius r, height H) has its top edge touching the slant of the cone at distance x from the apex; similar triangles give r=x\tan\alpha, so x=r\cot\alpha and H=h-x=h-r\cot\alpha. The labelled h, H, 2r, x, and the semi-vertical angle \alpha carry the entire optimisation setup.

Step 1 — Geometry.

Place the cone with apex at top and axis vertical, base radius R=htanαR=h\tan\alpha. Inscribe a coaxial cylinder of radius rr and height HH.

The cylinder’s top edge touches the cone at distance xx from the apex, where the cone has radius xtanα=rx\tan\alpha=r, giving x=rcotαx=r\cot\alpha. The cylinder height is

H=hx=hrcotα.H=h-x=h-r\cot\alpha.

Step 2 — Optimise volume.

V(r)=πr2H=πr2(hrcotα)=πhr2πr3cotα.V(r)=\pi r^2 H=\pi r^2(h-r\cot\alpha)=\pi h r^2-\pi r^3\cot\alpha. dVdr=2πhr3πr2cotα=πr(2h3rcotα).\frac{dV}{dr}=2\pi h r-3\pi r^2\cot\alpha=\pi r(2h-3r\cot\alpha).

Critical point (other than r=0r=0): r=2htanα3r^\star=\dfrac{2h\tan\alpha}{3}.

V(r)=2πh6πrcotα=2πh4πh=2πh<0V''(r^\star)=2\pi h-6\pi r^\star\cot\alpha=2\pi h-4\pi h=-2\pi h<0: maximum confirmed.

Step 3 — Maximum volume.

At r=2htanα3r^\star=\dfrac{2h\tan\alpha}{3}, the cylinder height is H=h2h3=h3H^\star=h-\dfrac{2h}{3}=\dfrac{h}{3}, and

V=π(r)2H=π4h2tan2α9h3=4πh3tan2α27.V^\star=\pi(r^\star)^2 H^\star=\pi\cdot\frac{4h^2\tan^2\alpha}{9}\cdot\frac{h}{3}=\frac{4\pi h^3\tan^2\alpha}{27}.

Answer

  Vmax=4πh3tan2α27,attained at radius r=2htanα3 and height H=h3.  \boxed{\;V_{\max}=\frac{4\pi h^3\tan^2\alpha}{27},\quad\text{attained at radius }r=\frac{2h\tan\alpha}{3}\text{ and height }H=\frac{h}{3}.\;}
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