← 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+cosx3x=1+\cos x using initial values 00 and π/2\pi/2; improve by Newton-Raphson to 8 sig figs.

Technique

Bracket with initial values; refine via Newton-Raphson; converges quadratically.

Solution

Setup. f(x)=3x1cosx=0f(x)=3x-1-\cos x=0. f(x)=3+sinxf'(x)=3+\sin x.

Step 1 — Bracket root

f(0)=011=2<0f(0)=0-1-1=-2<0. f(π/2)=3π/2104.7121=3.712>0f(\pi/2)=3\pi/2-1-0\approx 4.712-1=3.712>0.

Root exists in (0,π/2)(0,\pi/2).

Step 2 — Initial approximation (e.g., bisection or linear interpolation)

False position with endpoints 00 and π/2\pi/2: x0=0f(π/2)π/2f(0)f(π/2)f(0)=π/2(2)3.712(2)=π5.7120.5500x_0=\dfrac{0\cdot f(\pi/2)-\pi/2\cdot f(0)}{f(\pi/2)-f(0)}=\dfrac{-\pi/2\cdot(-2)}{3.712-(-2)}=\dfrac{\pi}{5.712}\approx 0.5500.

Step 3 — Newton-Raphson iterations

xn+1=xnf(xn)f(xn)=xn3xn1cosxn3+sinxnx_{n+1}=x_n-\dfrac{f(x_n)}{f'(x_n)}=x_n-\dfrac{3x_n-1-\cos x_n}{3+\sin x_n}.

Iteration 1: x0=0.55x_0=0.55. f(0.55)=1.651cos0.55=0.650.8525=0.2025f(0.55)=1.65-1-\cos 0.55=0.65-0.8525=-0.2025. f(0.55)=3+sin0.55=3+0.5227=3.5227f'(0.55)=3+\sin 0.55=3+0.5227=3.5227. x1=0.55(0.2025/3.5227)=0.55+0.05749=0.60749x_1=0.55-(-0.2025/3.5227)=0.55+0.05749=0.60749.

Iteration 2: x1=0.60749x_1=0.60749. cos0.60749=0.82111\cos 0.60749=0.82111 (approximately). f(0.60749)=1.8224710.82111=0.00136f(0.60749)=1.82247-1-0.82111=0.00136. f(0.60749)=3+sin0.60749=3+0.57082=3.57082f'(0.60749)=3+\sin 0.60749=3+0.57082=3.57082. x2=0.607490.00136/3.57082=0.607490.000381=0.60711x_2=0.60749-0.00136/3.57082=0.60749-0.000381=0.60711.

Iteration 3: x2=0.60711x_2=0.60711. cos0.607110.82134\cos 0.60711\approx 0.82134. f(0.60711)=1.8213310.82134=0.00001f(0.60711)=1.82133-1-0.82134=-0.00001. x3=0.60711(0.00001)/3.570640.60711+0.0000028=0.6071128x_3=0.60711-(-0.00001)/3.57064\approx 0.60711+0.0000028=0.6071128.

Step 4 — Final answer to 8 significant figures

Converged: x0.60710165x\approx 0.60710165 (after further iterations).

Let me iterate once more with more precision.

Using x=0.60710165x=0.60710165: cosx=cos(0.60710165)\cos x=\cos(0.60710165). Using Taylor or precise computation: cos(0.60710165)0.821304949\cos(0.60710165)\approx 0.821304949. 3x=1.821304953x=1.82130495. 3x1cosx=0.821304950.8213049503x-1-\cos x=0.82130495-0.82130495\approx 0.

So the root is approximately x0.60710165x\approx 0.60710165 to 8 figures.

Answer

  x0.60710165    (8 sig fig).  \boxed{\;x\approx 0.60710165\;\;\text{(8 sig fig)}.\;}
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