Use the Laplace Transform to solve the given intitial value problem. y"+y=\sqrt2 \sin(\sqrt2t), y(0)=7 , y'(0)=2

FizeauV

FizeauV

Answered question

2021-09-07

Use the Laplace Transform to solve the given intitial value problem.
y=2sin(2t),y(0)=7,y(0)=2

Answer & Explanation

Benedict

Benedict

Skilled2021-09-08Added 108 answers

Step 1 Laplace transform of derivative of f:
The laplace transform of second derivative of f is given by:
L(ft))=s2F(s)f(0)f(0)
Given: yy=2sin(2t)
Take Laplace transform on both sides
s2Y(s)sy(0)y(0)+y(s)=2(2s2+2)
Here, L(y(t))=y(s)andL(sinat)=as2+a2
Plug in the initial conditions y(0)=7,y(0)=2
s2Y(s)7s2+Y(s)=2s2+2
(s2+1)Y(s)=2s2+2+7s+2
Y(s)=2(s2+2)(s2+1)+7(ss2+1)+2s2+1
Y(s)=2s2+12s2+2+7(ss2+1)+2s2+1
Y(s)=4(1s2+1)22s2+2+7(ss2+1)
Take Laplace inverse transform on both sides
y(t)=4sint2sin2t+7cost
Step 2 Answer:
y(t)=4sint2sin2t+7cost

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