90 C H A P T E R 1: Continuous-Time Signals
n The impulseδ(t)is impossible to generate physically, but characterizes very brief pulses of any shape. It
can be derived using pulses or functions different from the rectangular pulse (see Eq. 1.22). In Problem
1.7 at the end of the chapter it is indicated how it can be derived from either a triangular pulse or a sinc
function of unit area.
n Signals with jump discontinuities can be represented as the sum of a continuous signal and unit-step
signals at the discontinuities. This is useful in computing the derivative of these signals.Ramp SignalThe ramp signal is defined asr(t)=t u(t) (1.29)Its relation to the unit-step and the unit-impulse signals is
dr(t)
dt
=u(t) (1.30)d^2 r(t)
dt^2=δ(t) (1.31)The ramp is a continuous function and its derivative is given bydr(t)
dt=
dtu(t)
dt=u(t)+tdu(t)
dt=u(t)+tδ(t)=u(t)+ 0 δ(t)=u(t)nExample 1.15
Consider the discontinuous signalsx 1 (t)=cos( 2 πt)[u(t)−u(t− 1 )]x 2 (t)=u(t)− 2 u(t− 1 )+u(t− 2 )Represent each of these signals as the sum of a continuous signal and unit-step signals, and find
their derivatives.SolutionThe signalx 1 (t)is a period of a cosine of periodT 0 =1, 0≤t≤1, with a discontinuity of 1 att= 0
andt=1. Subtractingu(t)−u(t− 1 )fromx 1 (t)we obtain a continuous signal, but to compensate
we must add a unit pulse betweent=0 andt=1, givingx 1 (t)=(cos( 2 πt)− 1 )[u(t)−u(t− 1 )]+[u(t)−u(t− 1 )]=x 1 a(t)+x 1 b(t)