y'-int_0^t y(tau)d tau=4te^(-t) , y(0)=3

jernplate8

jernplate8

Answered question

2021-09-05

y0ty(τ)dτ=4tet,y(0)=3

Answer & Explanation

funblogC

funblogC

Skilled2021-09-06Added 91 answers

Procedure:
We use the Laplace transform to solve the given question.
Solution:
Given: y0ty(τ)dτ=4tet,y(0)=3
Taking Laplace transform on both sides of eqn. (1) we get
L{y0ty(τ)dτ}=L{4tet}
L{y}L{0ty(τ)dτ}=4L{tet} , using linearity property
sy(s)y(0)1sy(s)=4(1s+1)2
using initial condition y(0)=3, we get
sy(s)31sy(s)=4(s+1)2s2y(s)3sy(s)s=4(s+1)2
y(s)=[4s(s+1)2+3s]1(s21)
y(s)=4s(s+1)2(s21)+3ss21
Now taking inverse Laplace transform on both sides , we get
L1{y(s)}=y(t)=L1{4s(s+1)2(s21)+3ss21}
=L1{4s(s+1)2(s21)}+L1{3ss21} , using linearity property
therefore, y(t)=t2ettet+2et+et

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