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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)=3.220y''+4y'+y=0,\ y(0)=3.2 and y(0)=0y'(0)=0.

Technique

Constant-coefficient homogeneous ODE; complex roots \Rightarrow eαx(Acosβx+Bsinβx)e^{\alpha x}(A\cos\beta x+B\sin\beta x); apply the two ICs.

Solution

Step 1 — Auxiliary equation

20m2+4m+1=0  m=4±168040=4±6440=4±8i40=110±i5.20m^2+4m+1=0\ \Rightarrow\ m=\frac{-4\pm\sqrt{16-80}}{40}=\frac{-4\pm\sqrt{-64}}{40}=\frac{-4\pm 8i}{40}=-\frac1{10}\pm\frac{i}{5}.

Complex roots α±iβ\alpha\pm i\beta with α=110, β=15\alpha=-\tfrac1{10},\ \beta=\tfrac15.

Step 2 — General solution

y=ex/10(Acosx5+Bsinx5).y=e^{-x/10}\Big(A\cos\tfrac{x}{5}+B\sin\tfrac{x}{5}\Big).

Step 3 — Apply initial conditions

At x=0x=0: y(0)=A=3.2y(0)=A=3.2.

Differentiate:

y=ex/10[110(Acosx5+Bsinx5)+(A5sinx5+B5cosx5)].y'=e^{-x/10}\Big[-\tfrac1{10}\big(A\cos\tfrac{x}5+B\sin\tfrac{x}5\big)+\big(-\tfrac{A}{5}\sin\tfrac{x}5+\tfrac{B}{5}\cos\tfrac{x}5\big)\Big].

At x=0x=0: y(0)=A10+B5=0  B=A2=1.6.y'(0)=-\tfrac{A}{10}+\tfrac{B}{5}=0\ \Rightarrow\ B=\tfrac{A}{2}=1.6.

Step 4 — Particular solution

Answer

  y=ex/10(3.2cosx5+1.6sinx5)=85ex/10(2cosx5+sinx5).  \boxed{\;y=e^{-x/10}\Big(3.2\cos\tfrac{x}{5}+1.6\sin\tfrac{x}{5}\Big)=\frac{8}{5}\,e^{-x/10}\Big(2\cos\tfrac{x}{5}+\sin\tfrac{x}{5}\Big).\;}
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