1.4 Representation Using Basic Signals 89Ignoring the value att=0 we define theunit-stepsignal asu(t)={
1 t> 0
0 t< 0You can think of theu(t)as the switching of a dc signal generator from off to on, whileδ(t)is a very
strong pulse of very short duration.
The impulsesignalδ(t)is:
n Zero everywhere except at the origin where its value is not well defined (i.e.,δ(t)= 0 ,t6= 0 , and undefined
att= 0 ).
n its area is unity, i.e.,∫t−∞δ(τ)dτ={
1 t> 0
0 t<0.(1.26)The unit-step signal isu(t)={
1 t> 0
0 t< 0Theδ(t)andu(t)are related as follows:u(t)=∫t−∞δ(τ)dτ (1.27)δ(t)=
du(t)
dt
(1.28)According to calculus we have
u 1 (t)=∫t−∞p 1 (τ)dτp 1 (t)=du 1 (t)
dtand so letting 1 →0, we obtain the relation betweenu(t)andδ(t).
Remarks
n Since u(t)is not a continuous function, it jumps from 0 to 1 instantaneously around t= 0 , from the
calculus point of view it should not have a derivative. Thatδ(t)is its derivative must be taken with
suspicion, which makes theδ(t)signal also suspicious. Such signals can, however, be formally defined
using the theory of distributions.