Find the Laplace transform F(s)=L\left\{f(t)\right\} of the function f(t)=2-7t^5+\sin(3t)

aflacatn

aflacatn

Answered question

2021-09-12

Find the Laplace transform F(s)=L{f(t)} of the function f(t)=27t5+sin(3t)

Answer & Explanation

Arham Warner

Arham Warner

Skilled2021-09-13Added 102 answers

Step 1
Given function is,
f(t)=27t5+sin(3t)
The objective is to find the laplace transformation
Step 2
L{f(t)}=L{27t5+sin3t}
=L{2}7L{t5}+L{sin3t}
Since,
L{a}=as,L{tn}=n!sn+1 and L{sin(at)}=as2+a2
Hence,
L{f(t)}=L{2}7L{t5}+L{sin3t}
=2s7(5!s5+1)+3s2+32
=2s7×120s5+1+3s2+9
=2s840s5+1+3s2+9
Therefore, L{27t5+sin3t}=2s840s5+1+3s2+9

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