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UPSC 2015 Maths Optional Paper 1 Q1c — Step-by-Step Solution

10 marks · Section A

Indeterminate forms · Calculus · asked 4× in 13 yrs · Read the full method →

Question

Evaluate limxa(2xa)tan ⁣(πx2a).\displaystyle\lim_{x\to a}\left(2-\dfrac{x}{a}\right)^{\tan\!\left(\frac{\pi x}{2a}\right)}.

Technique

Recognise 11^\infty indeterminate form; substitute x=a+hx=a+h to localise; use tan(π/2+θ)=cotθ\tan(\pi/2+\theta)=-\cot\theta; apply ln(1+u)u\ln(1+u)\sim u and cotθ1/θ\cot\theta\sim 1/\theta.

Solution

The form at x=ax=a is 11^{\infty}. Use L=exp ⁣(limln(base)exponent)L=\exp\!\bigl(\lim\ln(\text{base})\cdot\text{exponent}\bigr).

Step 1 — Substitute x=a+hx=a+h, h0h\to 0

2xa=2a+ha=1ha2-\dfrac{x}{a}=2-\dfrac{a+h}{a}=1-\dfrac{h}{a}.

The exponent becomes

tan ⁣(π(a+h)2a)=tan ⁣(π2+πh2a)=cot ⁣(πh2a).\tan\!\left(\dfrac{\pi(a+h)}{2a}\right)=\tan\!\left(\dfrac{\pi}{2}+\dfrac{\pi h}{2a}\right)=-\cot\!\left(\dfrac{\pi h}{2a}\right).

(Using tan(π2+θ)=cotθ\tan(\tfrac{\pi}{2}+\theta)=-\cot\theta.)

Step 2 — Take logarithm of the base

Let L=limh0(1ha)cot(πh/2a)L=\displaystyle\lim_{h\to 0}\left(1-\dfrac{h}{a}\right)^{-\cot(\pi h/2a)}. Then

lnL=limh0[cot(πh/2a)]ln ⁣(1ha).\ln L=\lim_{h\to 0}\bigl[-\cot(\pi h/2a)\bigr]\ln\!\left(1-\dfrac{h}{a}\right).

Step 3 — Asymptotic equivalents as h0h\to 0

Substitute:

lnL=limh0(2aπh) ⁣(ha)=2π.\ln L=\lim_{h\to 0}\left(-\dfrac{2a}{\pi h}\right)\!\left(-\dfrac{h}{a}\right)=\dfrac{2}{\pi}.

Step 4 — Exponentiate

Answer

  L=e2/π.  \boxed{\;L=e^{2/\pi}.\;}
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