← 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)\ln(x) in powers of (x1)(x-1) by Taylor’s theorem and hence find the value of ln(1.1)\ln(1.1) correct up to four decimal places.

Technique

Compute derivatives of lnx\ln x at x=1x=1; write the Taylor series; evaluate at x=1.1x=1.1 and truncate using the alternating-series bound.

Solution

Step 1 — Derivatives at x=1x=1.

Let f(x)=lnxf(x)=\ln x. Then f(n)(x)=(1)n1(n1)!/xnf^{(n)}(x)=(-1)^{n-1}(n-1)!/x^n for n1n\ge 1, so f(n)(1)=(1)n1(n1)!f^{(n)}(1)=(-1)^{n-1}(n-1)! and f(1)=0f(1)=0.

Step 2 — Taylor series.

lnx=n=1(1)n1n(x1)n=(x1)(x1)22+(x1)33,\ln x=\sum_{n=1}^{\infty}\frac{(-1)^{n-1}}{n}(x-1)^n=(x-1)-\frac{(x-1)^2}{2}+\frac{(x-1)^3}{3}-\cdots,

valid for 0<x20<x\le 2.

Step 3 — Evaluate ln(1.1)\ln(1.1).

Set x=1.1x=1.1, so x1=0.1x-1=0.1. Successive terms:

nnTermDecimal
10.10.10.10000000.1000000
20.01/2-0.01/20.0050000-0.0050000
30.001/30.001/30.00033330.0003333
40.0001/4-0.0001/40.0000250-0.0000250
50.00001/50.00001/50.00000200.0000020

The 6th term (1.7×107\approx 1.7\times10^{-7}) is below 5×1075\times10^{-7}, so terms 1–5 suffice. By the alternating-series error bound, the truncation error is less than the first omitted term.

Sum: 0.10000000.0050000+0.00033330.0000250+0.0000020=0.09531030.1000000-0.0050000+0.0003333-0.0000250+0.0000020=0.0953103.

Answer

  ln(1.1)0.0953.  \boxed{\;\ln(1.1)\approx 0.0953.\;}
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