Solve the following IVP using Laplace Transform.y"-4y'=e^{3t} , y(0)=0 , y'(0)=0

Yasmin

Yasmin

Answered question

2021-09-06

Solve the following IVP using Laplace Transform.
y"4y=e3t,y(0)=0,y(0)=0

Answer & Explanation

opsadnojD

opsadnojD

Skilled2021-09-07Added 95 answers

Step 1
The given linear differential equation is y"4y=e3t,y(0)=0,y(0)=0
Step 2
Take the Laplace transform of the differential equation y"4y=e3t
L{y"}4L{y}=L{e3t}
s4L{y}sy(0)y(0)4[sL{y}y(0)]=1s3
s4L{y}s(0)04[sL{y}0]=1s3
(s24s)L{y}=1s3
L{y}=1(s24s)(s3)
L{y}=1s(s4)(s3)
Simplify using partial fraction.
1s(s4)(s3)=a0s3+a1s+a2s4
1=a0s(s4)+a1(s3)(s4)+a2s(s3)
Substitute 3 for s in 1=a0s(s4)+a1(s3)(s4)+a2s(s3)
1=a03(34)+a1(33)(34)+a2(3)(33)
1=3a0
a0=13
Substitute 0 for s in 1=a0s(s4)+a1(s3)(s4)+a2s(s3)
1=a0(0)(04)+a1(03)(04)+a2(0)(03)
1=12a1
a1=112
Substitute 4 for s in

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