EELE Lecture 3,4 EE445 - Outcomes. Physically Realizable Waveforms. EELE445 Montana State University. In this lecture you:

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1 EELE445 Monana Sae Universiy Lecure 3,4 EE445 - Oucomes EELE445-4 Lecure 3,4 Poer, Energy, ime average operaor secion. In his lecure you: be able o use he ime average operaor [] for finie ime duraion signals and periodic signals Be able o find he value of a aveform be able o find he poer or energy of a aveform in he ime domain Parseval s heorem, find he poer or energy of a aveform in he frequency domain Concep of PSD an ESD Physically ealizable Wavefo Figure Physical and mahemaical avefo. measurable in he laboraory. aveform has significan nonzero values over a composie ime inerval for a finie ime duraion. coninuous funcion of ime 3. finie peak ampliude 4. real funcion, no complex values 3 4

2 EELE445 Monana Sae Universiy 5 ime average operaor ime verage Operaor mean, of : lim dc W 6 ime average operaor ime verage Operaor for signal of finie ime duraion: N n n n N a a a a a o o o any real for any real for For a Periodic Signal: 7 oo Mean Square- MS roo mean square of a signal of duraion : W Poer meansquare W 8 MS o simplify he inegrals! Choose is an arbirary ime shif. here value of periodic avefo : For + +

3 EELE445 Monana Sae Universiy MS example MS of a sinave : [ cos ω o ] appendix 4 use : cos x + cosx MS of a SquareWave 9 Figure 3 Seady-sae aveshapes for Example. 3

4 EELE445 Monana Sae Universiy insananious Poer averagepoer Poer of a signal p v i v p v i eal Zload v hen Z + j Z+j Figure Polariy convenion used for volage and curren. 3 Couch, Digial and nalog Communicaion Sysems, Sevenh Ediion 7 Pearson Educaion, Inc. ll righs reserved verage Poer in P E P P v i i Poer of a signal v v i signal of duraion : p p is he insananeous poer, P is he average poer over ime For Normalized Poer: ohm 4 P E E v Energy of a Signal Energy in signal of duraion : v i E P We ypically calulae normalized Energy or Poer, S N V Log V communicaion meric: Signal o Noise aio in db P Log P signal noise Log s signal / db noise n 5 6 4

5 EELE445 Monana Sae Universiy Figure Physical and mahemaical avefo. EELE445-4 Lecure 4 he Fourier ransform and he Frequency Domain 8 Couch, Digial and nalog Communicaion Sysems, Sevenh Ediion 7 Pearson Educaion, Inc. ll righs reserved he Fourier ransform We use he Fourier ransform o deermine he frequencies of he sinusoids presen in a non repeiive aveform. he fourier series may be considered he fourier ransform of a non-repeiive aveform ha is repeaed coninuously. W f F Wha is : [ ] xy??? Fourier ransform j e πf Correlaion coeff C xy x y < C < 9 5

6 EELE445 Monana Sae Universiy Fourier ransform Figure 4 Specrum of a sine ave. W f F j πf [ ] [ ] e So he Fourier ransform is ansering he quesion: ho much of e jπf is in? e jx cos x j sin x Couch, Digial and nalog Communicaion Sysems, Sevenh Ediion 7 Pearson Educaion, Inc. ll righs reserved Figure 5 Waveshapes and corresponding symbolic noaion. Figure 5 Waveshapes and corresponding symbolic noaion. 3 Couch, Digial and nalog Communicaion Sysems, Sevenh Ediion 7 Pearson Educaion, Inc. ll righs reserved Couch, Digial and nalog Communicaion Sysems, Sevenh Ediion 7 Pearson Educaion, Inc. ll righs reserved

7 EELE445 Monana Sae Universiy Figure 6 Specra of recangular, sin x/x, and riangular pulses. Figure 6 Specra of recangular, sin x/x, and riangular pulses. ime - bandih produc or bandih- duraion produc : B 4π he Gaussian pulse, e equaliy sign. π saifies he condiion ih he 5 Couch, Digial and nalog Communicaion Sysems, Sevenh Ediion 7 Pearson Educaion, Inc. ll righs reserved Couch, Digial and nalog Communicaion Sysems, Sevenh Ediion 7 Pearson Educaion, Inc. ll righs reserved Figure 6 Specra of recangular, sin x/x, and riangular pulses. Figure 6 Specra of recangular, sin x/x, and riangular pulses. ime Domain Frequency Domain ime Domain Frequency Domain 7 Couch, Digial and nalog Communicaion Sysems, Sevenh Ediion 7 Pearson Educaion, Inc. ll righs reserved Couch, Digial and nalog Communicaion Sysems, Sevenh Ediion 7 Pearson Educaion, Inc. ll righs reserved

9 3 Fourier ransform Pairs Fourier ransform Pairs he recangular funcion is used o mahemaically runcae an

8 EELE445 Monana Sae Universiy Fourier ransform heorems Fourier ransform heorems hese heorems are useful for he homeork and he exams! 9 3 Fourier ransform Pairs Fourier ransform Pairs he recangular funcion is used o mahemaically runcae an infinie ime aveform. I is he ime indo ha is analyzed over. Wha is he effec on he measuremen of as approaches infiniy? Ho abou as approaches? compare he Phasor and he sinusoid ransfo

Waveform Energy Specral Densiy, ESD E f W

a runcaed aveform of duraion 33 34 Energy

ave. Figure 9 Poer specrum of a sinusoid.

9 EELE445 Monana Sae Universiy Energy and Poer in a Waveform Energy and Poer in a Waveform Energy Specral Densiy, ESD E f W f W f e jπf Poer Specral Densiy, PSD, for a runcaed aveform of duraion Energy and Poer in a Waveform Energy and Poer in a Waveform Figure 4 Specrum of a sine ave. Figure 9 Poer specrum of a sinusoid

10 EELE445 Monana Sae Universiy Example- Poer and Energy in ime. EELE445-3 LECUE 5 Examples, Fourier Series from he Fourier ransform KHz sineave source is applied o a 5 ohm resisor. fine he poer delivered o he load. v 5 Ω v cosπf vol f Hz 3 sec o 38 P o o o Example- Poer and Energy in ime. For a periodic Signal v o o o o o o v + o o o o : cosπf cos4πf o o so Mean Squared vols vols P.Wa dbm 5 Fourier Series from Fourier ransfo. Find he runcaed signal period V o. Deermine he Fourier ransform of he aveform V o 3. Find he value of he Fourier Series coefficiens by:. eplacing f in he ransform ih fn/ o. Scaling he magniude of he ransform by / o Duy Cycle,D o 39 o 4

11 EELE445 Monana Sae Universiy Fourier Series from Fourier ransfo f Fourier Series from Fourier ransfo no make a repeiive pulse ih period o From Fourier ransform able: F Π Sa πf Le f n o and scale by o c n nπ Sa o o 4 4 Properies of a epeiive ecangular Pulse he null bandih, B n of he specrum is equal o he inverse of he pulse ih,. B n he harmonic frequencies are n/ o epeiive ecangular Pulse he number of harmonics, n, from DC o he specral null is: o n D pproximaely 9 percen of he poer of he signal is in he specrum from DC o he null bandih frequency, only % of he signal poer is in he specrum frequency range from he null bandih frequency o infiniy! 43 44

12 EELE445 Monana Sae Universiy epeiive ecangular Pulse Single ecangular Pulse epeiive ecangular Pulse epeiive ecangular Pulse 47 48

13 EELE445 Monana Sae Universiy epeiive ecangular Pulse ecangular Pulse Poer o he firs null bandih sinc x dx 9.8 x Px sinc x : dx 49 5 epeiive ecangular Pulse Poer vs Bandih Percen of Poer vs Bandih P k k 4 5 3

CHAPTER 2 Signals And Spectra

CHAPTER 2 Signals And Spectra CHAPER Signals And Specra Properies of Signals and Noise In communicaion sysems he received waveform is usually caegorized ino he desired par conaining he informaion, and he undesired par. he desired par