I'm having trouble with the laplace transform: L\{\sqrt{\frac{t}{\pi}}\cos(2t)\} The problem gives

Stacie Worsley

Stacie Worsley

Answered question

2021-12-11

I'm having trouble with the laplace transform: L{tπcos(2t)}
The problem gives me the transform identity L{cos(2t)πt}=e2ss but i'm not sure/confused as to why that would help me

Answer & Explanation

Neil Dismukes

Neil Dismukes

Beginner2021-12-12Added 37 answers

Assuming t>0 (which is a usual assumption with Laplace transforms),
tπcos2t=tcos2tπt
Daniel Cormack

Daniel Cormack

Beginner2021-12-13Added 34 answers

L[tπcos(2t)]
If you define the function: f(t)=tπcos(2t)
If you multiply it by (tt) You can rewrite: f(t)=t1tπcos(2t)=tcos(2t)tπ
At this point, I have to remind you: L[t^n f(t)]=-(1)^n \frac{d}{ds^n}(L[f(t)])
Finally, if you have L[cos(2t)tπ]=e2ss you have to calculate
(1)ndds(e2ss)

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