Find the inverse Laplace transform of the function: F(s)=frac(2s^3+9s^2+11s+3)((s+1)^3s)

permaneceerc

permaneceerc

Answered question

2021-09-27

You need to find the function's inverse Laplace transform:
F(s)=2s3+9s2+11s+3(s+1)3s

Answer & Explanation

Gennenzip

Gennenzip

Skilled2021-09-28Added 96 answers

Step 1: Given:
F(s)=2s3+9s2+11s+3(s+1)3s
Step 2 To determine:
Inverse Laplace transform of the given function:=?
Step 3 Method used:
We use the partial fraction method to solve the given function.
First of all,
We find the partial fraction of the given function.
Then use some formulas of inverse Laplace transformations:
L1{1s+1}=et
L1{2(s+1)2}=2tet
L1{1(s+1)3}=ett22
L1{3s}=3H(t)
Step 4 Solution to the question:
Take the partial fraction of:
2s3+9s2+11s+3(s+1)3s=1s+1+2(s+1)2+1(s+1)3+3s
Now:
Taking Laplace inverse of the resultant function:
L1{1s+1+2(s+1)2+1(s+1)3+3s}
Step 5
Now:
Solving this expression:
L1{1s+1+2(s+1)2+1(s+1)3+3s}
=L1{1s+1}+2L1{1(s+1)2}+L11{1(s+1)3}+3L1{1s}
Substituting all the values as:
L1{1s+1}=et
L1{2(s+1)2}=2tet
L1{1(s+1)3}=ett22
L1{3s}=3H(t)
Hence,
We get:
L1(F(s))=2s3+9s2+11s+3(s+1)3s
=et+2tet+ett22+3H(t)
So,
This is the Laplace inverse of the given function.

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