Solve by Laplace transformation method the following D.E. (1) y"-3y'+2y=4^2e^t given that y(0)=-3 , y'(0)=5

Yasmin

Yasmin

Answered question

2021-09-26

Solve by Laplace transformation method the following D.E.
(1) y3y+2y=42et given that y(0)=3,y(0)=5​​​​​​​

Answer & Explanation

tabuordg

tabuordg

Skilled2021-09-27Added 99 answers

Step 1
Question 1:
To solve the given differential equation using Laplace transformation:
y3y+2y=4e2t with y(0)=3,y(0)=5
Step 2
y3y+2y=4e2t
L{y"3y+2y}=L{4e2t}
(s3+3s+2)Y(s)=4s2
( Since ,L{δ{4e2z}}=4s2)
s2Y(s)sy(0)y(0)3[sY(s)y(0)]+2Y(s)=4s2
put  y(0)=3,y(0)=5
s2Y(s)+3s53sY(s)9+2Y(s)=4s2
(s23s+2)Y(s)=4s2+143s
Y(s)=3s2+20s24(s2)(s23s+2)
Step 3
Now simplify Y(s) in order to apply inverse Laplace to find the solution of differential equation, as:
Y(s)=3s2+20s24(s2)(s23s+2)=3s2+20s24(s2)2(s1)
3s2+20s24(s2)2(s1)=As2+B(s2)2+Cs1
3s2+20s24=A(s2)(s1)+B(s1)+C(s2)2

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Differential Equations

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?