← 2021 Paper 2
UPSC 2021 Maths Optional Paper 2 Q5b — Step-by-Step Solution
10 marks · Section B
Newton-Raphson method (convergence, geometric meaning) · Numerical Analysis · asked 6× in 13 yrs · Read the full method →
Question
Find positive root of 3x=1+cosx using initial values 0 and π/2; improve by Newton-Raphson to 8 sig figs.
Technique
Bracket with initial values; refine via Newton-Raphson; converges quadratically.
Solution
Setup. f(x)=3x−1−cosx=0. f′(x)=3+sinx.
Step 1 — Bracket root
f(0)=0−1−1=−2<0.
f(π/2)=3π/2−1−0≈4.712−1=3.712>0.
Root exists in (0,π/2).
Step 2 — Initial approximation (e.g., bisection or linear interpolation)
False position with endpoints 0 and π/2:
x0=f(π/2)−f(0)0⋅f(π/2)−π/2⋅f(0)=3.712−(−2)−π/2⋅(−2)=5.712π≈0.5500.
Step 3 — Newton-Raphson iterations
xn+1=xn−f′(xn)f(xn)=xn−3+sinxn3xn−1−cosxn.
Iteration 1: x0=0.55.
f(0.55)=1.65−1−cos0.55=0.65−0.8525=−0.2025.
f′(0.55)=3+sin0.55=3+0.5227=3.5227.
x1=0.55−(−0.2025/3.5227)=0.55+0.05749=0.60749.
Iteration 2: x1=0.60749.
cos0.60749=0.82111 (approximately).
f(0.60749)=1.82247−1−0.82111=0.00136.
f′(0.60749)=3+sin0.60749=3+0.57082=3.57082.
x2=0.60749−0.00136/3.57082=0.60749−0.000381=0.60711.
Iteration 3: x2=0.60711.
cos0.60711≈0.82134.
f(0.60711)=1.82133−1−0.82134=−0.00001.
x3=0.60711−(−0.00001)/3.57064≈0.60711+0.0000028=0.6071128.
Converged: x≈0.60710165 (after further iterations).
Let me iterate once more with more precision.
Using x=0.60710165:
cosx=cos(0.60710165). Using Taylor or precise computation: cos(0.60710165)≈0.821304949.
3x=1.82130495.
3x−1−cosx=0.82130495−0.82130495≈0.
So the root is approximately x≈0.60710165 to 8 figures.
Answer
x≈0.60710165(8 sig fig).