Prove this property L^(-1)[(f(s))/(s^2)]=int_0^t int_0^x F(x)dx dy.

Nola Aguilar

Nola Aguilar

Answered question

2022-11-10

Show that
L 1 [ f ( s ) s 2 ] = 0 t 0 x F ( x ) d x d y .
I tried using the formula
L 1 [ f ( s ) s ] = 0 t F ( x ) d x .

Answer & Explanation

jennasyliang4tr

jennasyliang4tr

Beginner2022-11-11Added 15 answers

Let G ( s ) = F ( s ) s
Then, as you stated,
(Selecting variables y for g and x for f)
L 1 [ G ( s ) ] = g ( y ) = L 1 [ F ( s ) s ] = 0 x f ( x ) d x
L 1 [ G ( s ) s ] = L 1 [ F ( s ) s 2 ] = 0 y g ( y ) d y = 0 y 0 x f ( x ) d x d y
Thus the property is proved!

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