f(t)=3e^{2t} Determine L[f] Let f be a function defined on an interval [0,infty) The Laplace transform of f is the function F(s) defined by F(s) =int_0^infty e^{-st}f(t)dt provided that the improper integral converges. We will usually denote the Laplace transform of f by L[f].

ddaeeric

ddaeeric

Answered question

2021-01-08

f(t)=3e2t
Determine L[f]
Let f be a function defined on an interval [0,)
The Laplace transform of f is the function F(s) defined by
F(s)=0estf(t)dt
provided that the improper integral converges. We will usually denote the Laplace transform of f by L[f].

Answer & Explanation

sweererlirumeX

sweererlirumeX

Skilled2021-01-09Added 91 answers

Step 1
we have to find the laplace of f(t)=3e2t by using the definition of the laplace transform.
as we know that the laplace transform of f is the function F(s) defined by
F(s)=0estf(t)dt
therefore,
L[f]=0estf(t)dt
L[3e2t]=0est(3e2t)dt
=30est(e2t)dt
=30est+2tdt
=30e(s2)tdt
Step 2
now as we know that ebxdx=ebxb
therefore,
L[3e2t]=3(e(s2)t(s2))0
=3(s2)(e(s2)t)0
=3(s2)(e(s2)e(s2)(0))
=3(s2)(ee0)
=3(s2)(01)
=3(s2)
Step 3
therefore the laplace transform of f(t)=3e2t is 3(s2)

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