Find the laplace transform of the following: MULTIPLICATION BY POWER OF t g(t)=(t^2-3t+2)sin(3t)

ringearV

ringearV

Answered question

2020-12-24

Find the laplace transform of the following:
MULTIPLICATION BY POWER OF t
g(t)=(t23t+2)sin(3t)

Answer & Explanation

aprovard

aprovard

Skilled2020-12-25Added 94 answers

Step 1
To find Laplace transform of g(t)=(t23t+2)sin(3t), we simplify the expression and we get
g(t)=t2sin(3t)3tsin(3t)+2sin(3t)
Using the following results:
1.L(f(t))=F(s)
2.L(tnf(t))=(1)ndnF(s)dsn
3.L(sin(at))=as2+a2
Step 2
Using the above results and finding the required transforms,
L(sin(3t))=3s2+32=3s2+9
L(t2sin(3t))=(1)2d
Now,
L(3tsin(3t))=3(1)dds(L(sin(3t)))
=3dds(3s2+9)
=3(32s(s2+9)2)
=18s(s2+9)2
Now,
L(2sin(3t))=23(s2+9)
=6(s2+9)
Step 3
Therefore,
L(g(t))=L(t2sin(3t)3tsin(3t)+2sin(3t))
=L[t2sin(3t)]+L[3tsin(3t)]+L[2sin(3t)]
Substituting the values of Laplace transforms from above step, we get
G(s)=6[3s29](s2+9)318s(s2+9)2+6(s2+9)

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