solve the given initial-value problem. y"-3y'+2y=delta(t-1) , y(0)=1 , y'(0)=0

tabita57i

tabita57i

Answered question

2021-09-22

solve the given initial-value problem.
y3y+2y=δ(t1),y(0)=1,y(0)=0

Answer & Explanation

Usamah Prosser

Usamah Prosser

Skilled2021-09-23Added 86 answers

Step 1
Given, the differential equation with initial values
y3y+2y=δ(t1),y(0)=1,y(0)=0
Now, we have to solve this initial value problem.
Step 2
Laplace transformation:
put Lft{yright}=s2Y(s)sy(0)y(0)
Lft{yright}=sY(s)y(0)
Lft{yright}=Y(s)
Lft{δ(tt0)right}=est0
L1ft{easδ(s)right}=δ(ta)(ta)
Step 3
Calculations
Put all the values we get,
y3y+2y=δ(t1)
ft{s2Y(s)sy(0)y(0)right}3ft{sY(s)y(0)right}+2ft{Y(s)right}=es
Put initial values , we get
s2Y(s)s03sY(s)+3+2Y(s)=es
(s23s+2)Y(s)=es+s3
Y(s)=es+s3s23s+2=es+s3(s2)(s3)=es[1(s3)1(s2)]+1(s2)

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