The Laplace transform of L\{\frac{d^3x(t)}{dt^3}\} is given by Select one: sX(s)-x(0)

geduiwelh

geduiwelh

Answered question

2021-09-17

The Laplace transform of L{d3x(t)dt3} is given by
Select one:
sX(s)x(0)
s3X(s)s2x(0)sx˙(0)x¨(0)
s3X(s)s2x¨(0)sx˙(0)x(0)
s2X(s)sx(0)x˙(0)

Answer & Explanation

SabadisO

SabadisO

Skilled2021-09-18Added 108 answers

Step 1
L{d3x(t)dt3}
L[x(t)]=[estx(t)]00(sest)x(t)dt
=x(0)+s0estx(t)dt
(estx(t)=0  when  t=)
=x(0)+sL{x(t)}
L{x(t)}=sL[x(t)]x(0)
L{x"(t)}=sL[x(t)]x(0)
=s{[sx(s)x(0)]x(0)}
=s2x(s)sx(0)x(0)
L{x(t)}=s3x(s)s2x(0)sx(0)x"(0)
L{d3x(t)dt3}=s3x(s)s2x(0)sx(0)x(0)

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