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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 x→alim(2−ax)tan(2aπx).
Technique
Recognise 1∞ indeterminate form; substitute x=a+h to localise; use tan(π/2+θ)=−cotθ; apply ln(1+u)∼u and cotθ∼1/θ.
Solution
The form at x=a is 1∞. Use L=exp(limln(base)⋅exponent).
Step 1 — Substitute x=a+h, h→0
2−ax=2−aa+h=1−ah.
The exponent becomes
tan(2aπ(a+h))=tan(2π+2aπh)=−cot(2aπh).
(Using tan(2π+θ)=−cotθ.)
Step 2 — Take logarithm of the base
Let L=h→0lim(1−ah)−cot(πh/2a). Then
lnL=h→0lim[−cot(πh/2a)]ln(1−ah).
Step 3 — Asymptotic equivalents as h→0
- ln(1−h/a)∼−h/a.
- cot(πh/2a)∼πh/2a1=πh2a.
Substitute:
lnL=h→0lim(−πh2a)(−ah)=π2.
Step 4 — Exponentiate
Answer
L=e2/π.