634 SIGNAL PROCESSING
Hence, the givenx(t) is a power-type signal with its power given byA^2 /2.
(b) For any periodic signal with periodT 0 , the energy is given byEx= lim
T→∞∫+T/ 2−T/ 2|x(t)|^2 dt=lim
n→∞∫+nT 0 / 2−nT 0 / 2|x(t)|^2 dt=lim
n→∞
n∫+T 0 / 2−T 0 / 2|x(t)|^2 dt=∞Therefore, periodic signals are not typically energy type. The power content of any
periodic signal isPx=lim
T→∞1
T∫T/ 2−T/ 2|x(t)|^2 dt=lim
n→∞1
nT 0∫nT 0 / 2−nT 0 / 2|x(t)|^2 dt=lim
n→∞n
nT 0∫T 0 / 2−T 0 / 2|x(t)|^2 dt=1
T 0∫T 0 / 2−T 0 / 2|x(t)|^2 dtwhich shows that the power content of a periodic signal is equal to the average power in
one period.TheFourier-series representationstates that almost any periodic signal can be decomposed
into an infinite series of the formx(t)=a 0 +∑∞n= 1(ancosnωt+bnsinnωt) (14.1.11)wherea 0 ,a 1 ,b 1 ,... are the Fourier coefficients, andωis the fundamental angular frequency
related to the periodTbyω= 2 π/T= 2 πf. The integer multiples ofωare known as harmonics:
2 ωbeing the second harmonic that is even, 3ωbeing the third harmonic that is odd, and so forth.
The dc component is given bya 0 =1
T∫T0x(t)dt (14.1.12)which is seen to be the average value ofx(t). The remaining coefficients can be computed from
the following integrals:an=2
T∫T0x(t)cosnωt dt, forn= 1 , 2 ,... (14.1.13)bn=2
T∫T0x(t)sinnωt dt, forn= 1 , 2 ,... (14.1.14)It can be seen thatbn=0 forn=1, 2, 3,... for even symmetry. Similarly, for odd symmetry,
an=0 forn= 0, 1, 2, 3,.... For half-wave symmetry,an=bn=0 forn=2, 4, 6,... so that
the series contains only the odd-harmonic components. For relatively smooth signals, the higher
harmonic components tend to be smaller than the lower ones. Discontinuous signals have more
significant high-frequency content than continuous signals.