Use table of transforms to find. L[2t^2+5-3cos pi t], t >= 0

generals336

generals336

Answered question

2021-09-06

Use table of transforms to find
L[2t2+53cosπt],t0

Answer & Explanation

doplovif

doplovif

Skilled2021-09-07Added 71 answers

Procedure:
We use the Linearity property and table of Laplace transform to find the answer of the given question.
Solution:
L{2t2+53cosπt}=2L{t2}+5L{1}3L{cosπt} ,using linearity property
Now , we have
L{tn}=n!sn+1,n=0,1,2,3,
So, L{t2}=2!s2+1=2s3(1)L{t2}=2s3
and L{1}=L{t0}=0!s0+1=1s(0!=1)
L{1}=1s   (2)
moreover , L{cosat}=ss2+a2,s>0
So L{cosπt}=ss2+π2(3)(here a=π)
Therefore we get
L{2t2+53cosπt}=22s3+51s3ss2+π2
Hence,
L{2t2+53cosπt}=4s3+5s3ss2+π2

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