88 C H A P T E R 1: Continuous-Time Signals
1.4.2 Unit-Step, Unit-Impulse, and Ram Signals
Unit-Step and Unit-Impulse Signals
Consider a rectangular pulse of duration 1 and unit areap 1 (t)=
1
1
−1/ 2 ≤t≤1/ 20 t<−1/2 andt> 1/ 2(1.22)
Its integral isu 1 (t)=∫t−∞p 1 (τ)dτ=
1 t> 1/ 2
1
1(
t+1
2
)
−1/ 2 ≤t≤1/ 2
0 t<−1/ 2(1.23)
The pulsep 1 (t)and its integralu 1 (t)are shown in Figure 1.6.Suppose that 1 →0, thenn The pulsep 1 (t)still has a unit area but is an extremely narrow pulse. We will call the limit the
unit-impulsesignal,δ(t)=lim
1 → 0p 1 (t) (1.24)which is zero for all values oftexcept att=0 when its value is not defined.
n The integralu 1 (t), as 1 →0 has a left-side limit ofu 1 (−)→0 and a right-side limit ofu 1 ()→
1, for some infinitesimal >0, and att=0 it is 1/2. Thus, the limit islim
1 → 0
u 1 (t)=
1 t> 0
1 / 2 t= 0
0 t< 0(1.25)
FIGURE 1.6
Generation ofδ(t)andu(t)from limit as 1 → 0 of a
pulsep 1 (t)and its integralu 1 (t).pΔ(t)−Δ/2 Δ/21/Δt tt t10.5δ(t) u(t)
1(1)uΔ(t)−Δ/2 Δ/2