← 2017 Paper 1
UPSC 2017 Maths Optional Paper 1 Q6b-ii — Step-by-Step Solution
7 marks · Section B
Linear ODE with constant coefficients · ODEs · asked 4× in 13 yrs · Read the full method →
Question
Solve the following initial value differential equations: 20y′′+4y′+y=0, y(0)=3.2 and y′(0)=0.
Technique
Constant-coefficient homogeneous ODE; complex roots ⇒ eαx(Acosβx+Bsinβx); apply the two ICs.
Solution
Step 1 — Auxiliary equation
20m2+4m+1=0 ⇒ m=40−4±16−80=40−4±−64=40−4±8i=−101±5i.
Complex roots α±iβ with α=−101, β=51.
Step 2 — General solution
y=e−x/10(Acos5x+Bsin5x).
Step 3 — Apply initial conditions
At x=0: y(0)=A=3.2.
Differentiate:
y′=e−x/10[−101(Acos5x+Bsin5x)+(−5Asin5x+5Bcos5x)].
At x=0: y′(0)=−10A+5B=0 ⇒ B=2A=1.6.
Step 4 — Particular solution
Answer
y=e−x/10(3.2cos5x+1.6sin5x)=58e−x/10(2cos5x+sin5x).