← 2024 Paper 1
UPSC 2024 Maths Optional Paper 1 Q1d — Step-by-Step Solution
10 marks · Section A
Taylor's theorem with remainders · Calculus · asked 2× in 13 yrs · Read the full method →
Question
Expand ln(x) in powers of (x−1) by Taylor’s theorem and hence find the value of ln(1.1) correct up to four decimal places.
Technique
Compute derivatives of lnx at x=1; write the Taylor series; evaluate at x=1.1 and truncate using the alternating-series bound.
Solution
Step 1 — Derivatives at x=1.
Let f(x)=lnx. Then f(n)(x)=(−1)n−1(n−1)!/xn for n≥1, so f(n)(1)=(−1)n−1(n−1)! and f(1)=0.
Step 2 — Taylor series.
lnx=n=1∑∞n(−1)n−1(x−1)n=(x−1)−2(x−1)2+3(x−1)3−⋯,
valid for 0<x≤2.
Step 3 — Evaluate ln(1.1).
Set x=1.1, so x−1=0.1. Successive terms:
| n | Term | Decimal |
|---|
| 1 | 0.1 | 0.1000000 |
| 2 | −0.01/2 | −0.0050000 |
| 3 | 0.001/3 | 0.0003333 |
| 4 | −0.0001/4 | −0.0000250 |
| 5 | 0.00001/5 | 0.0000020 |
The 6th term (≈1.7×10−7) is below 5×10−7, so terms 1–5 suffice. By the alternating-series error bound, the truncation error is less than the first omitted term.
Sum: 0.1000000−0.0050000+0.0003333−0.0000250+0.0000020=0.0953103.
Answer
ln(1.1)≈0.0953.