text{Find the Laplace transform } F(s)=Lleft{f(t)right} text{of the function } f(t)=6+sin(3t) text{defined on the interval } tgeq0

remolatg

remolatg

Answered question

2021-02-16

Find the Laplace transform  F(s)=L{f(t)} of the function  f(t)=6+sin(3t) defined on the interval  t0

Answer & Explanation

Laaibah Pitt

Laaibah Pitt

Skilled2021-02-17Added 98 answers

Step 1
From the given statement, the function is  f(t)=6+sin(3t)
Step 2
To find the Laplace transform of the function as follows.
L(f(t))=L(6+sin(3t))
=L(6)+L(sin(3t))
Known fact: 
L(1)=1s
L(sin(ωt))=ωs2+ω2
Therefore, 
L(6)+L(sin(3t))=6L(1)+L(sin(3t))
=6(1s)+3s2+32
=6s+3s2+9
=6s2+3s+54s3+9s
Thus, the Laplace transform of the function is 6s2+3s+54s3+9s

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