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The ContinuousTime Impulse
An impulse in continuous time must have ``zero width''
and unit area under it. One definition is

(B.3) 
An impulse can be similarly defined as the limit of any
integrable pulse shape
which maintains unit area and approaches zero width at time 0. As a
result, the impulse under every definition has the socalled
sifting property under integration,

(B.4) 
provided
is continuous at
. This is often taken as the
defining property of an impulse, allowing it to be defined in terms
of nonvanishing function limits such as
(Note, incidentally, that
is in
but not
.)
An impulse is not a function in the usual sense, so it is called
instead a distribution or generalized function
[13,39]. (It is still commonly called a ``delta function'',
however, despite the misnomer.)
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