Use Laplace transform to solve the given initial-value problem. dy/dt-y=1, y(0)=0

Makayla Eaton

Makayla Eaton

Answered question

2022-08-05

Use Laplace transform to solve the given initial-value problem.
d y d t y = 1 , y ( 0 ) = 0

Answer & Explanation

Dominic Paul

Dominic Paul

Beginner2022-08-06Added 17 answers

Use Laplace transform to solve the given initial-value problem.
L{ y} =Y(s)
L 1 = 1 s
L{ y' } = s L{ y} -y(0)
L{ y' -y =1}
L{ y' } - L{ y} = L{ 1}
s L y y ( 0 ) L y = 1 s
L y ( s 1 ) = 1 s
L y = 1 s ( s 1 ) now inverse laplace transform
y ( t ) = L 1 { 1 s ( s 1 ) } = L 1 { A s } + L 1 { B s 1 }
1 ( s 1 ) = A s + B s 1
for A s = 0 1 ( s 1 ) 1 0 1 = 1 A = 1
for B s 1 = 0 s = 1 1 s 1 1 = 1 B = 1
y ( t ) = L 1 { 1 s ( s 1 ) } = L 1 { 1 s } + L 1 { 1 s 1 }
y ( t ) = 1 + exp ( t )
Aleseelomnl

Aleseelomnl

Beginner2022-08-07Added 2 answers

y'-y=1
sY-Y=1/s
Y(s-1)=1/s
Y=1/((s)(s-1)).
Y=A/s+B/(s-1).
A/s+B/(s-1)=1/((s)(s-1))
As-A+Bs=1
-A=1, A=-1
(A+B)s=0, B=1.
Thus, we have Y=-1/s+1/(s-1).
y = 1 + e t .

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