Table of Fourier Transforms

Definition of Fourier Transforms

If f(t) is a function of the real variable t, then the Fourier transform F(?) of f is given by the integral
F(?) = ?_-?^{^+?} e^{- j ? t} f(t) dt
where j = √(-1), the imaginary unit.
In what follows, u(t) is the unit step function defined by
u(t) = 1 for t ? 0 and u(t) = 0 for t < 0. (see figure below).

Table of Fourier Transforms

f(t)	F(?)
u(t) e^{-a t} , a > 0	1 / (a + j ?)
1 for - a ? t ? a and 0 otherwise	2 sin (? a) / ?
A (constant)	2 ? A ? (?)
? (t)	1
? (t - a)	e^{- j ? a}
cos (a t)	? [ ?(? + a) + ?(? - a) ]
sin (a t)	- j ? [ ? (? - a) - ? (? + a) ]
e ^{j a t}	2 ? [?(? - a) ]
f '(t)	j ? F (?)
f ''(t)	(j ?)² F(?)
t f(t)	j d [F(?)] / d?
t² f(t)	j² d²[F(?)] / d?²

Table of Fourier Transforms

Definition of Fourier Transforms

Table of Fourier Transforms

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