Chapter 4

Chapter 4 Fourier Series & Transforms

Basic Idea notes

Taylor Series • Complex signals are often broken into simple pieces • Signal requirements • Can be expressed into simpler problems • The first few terms can approximate the signal • Example: The Taylor series of a real or complex function ƒ(x) is the power series • http://upload.wikimedia.org/wikipedia/commons/6/62/Exp_series.gif

Square Wave S(t)=sin(2pft) S(t)=1/3[sin(2p(3f)t)] S(t)= 4/p{sin(2pft) +1/3[sin(2p(3f)t)]} Fourier Expansion

Square Wave K=1,3,5 K=1,3,5, 7 Frequency Components of Square Wave Fourier Expansion K=1,3,5, 7, 9, …..

Periodic Signals • A Periodic signal/function can be approximated by a sum (possibly infinite) sinusoidal signals. • Consider a periodic signal with period T • A periodic signal can be Real or Complex • The fundamental frequency: wo • Example:

Fourier Series • We can represent all periodic signals as harmonic series of the form • Ck are the Fourier Series Coefficients; k is real • k=0 gives the DC signal • k=+/-1 indicates the fundamental frequency or the first harmonic w0 • |k|>=2 harmonics

Fourier Series Coefficients • Fourier Series Pair • We have • For k=0, we can obtain the DC value which is the average value of x(t) over one period Series of complex numbers Defined over a period of x(t)

Euler’s Relationship • Review Euler formulas notes

Examples • Find Fourier Series Coefficients for • Find Fourier Series Coefficients for • Find Fourier Series Coefficients for • Find Fourier Series Coefficients for C1=1/2; C-1=1/2; No DC C1=1/2j; C-1=-1/2j; No DC notes

Different Forms of Fourier Series • Fourier Series Representation has three different forms Also: Complex Exp. Also: Harmonic Which one is this? What is the DC component? What is the expression for Fourier Series Coefficients

Examples Find Fourier Series Coefficients for Find Fourier Series Coefficients for Remember:

Examples Find the Complex Exponential Fourier Series Coefficients notes textbook

Example • Find the average power of x(t) using Complex Exponential Fourier Series – assuming x(t) is periodic This is called the Parseval’s Identity

Example • Consider the following periodic square wave • Express x(t) as a piecewise function • Find the Exponential Fourier Series of representations of x(t) • Find the Combined Trigonometric Fourier Series of representations of x(t) • Plot Ck as a function of k X(t) V To/2 To -V Use a Low Pass Filter to pick any tone you want!! |4V/p| 2|Ck| |4V/3p| |4V/5p| notes w0 3w0 5w0

Practical Application • Using a XTL oscillator which produces positive 1Vp-p how can you generate a sinusoidal waveforms with different frequencies?

Practical Application • Using a XTL oscillator which produces positive 1Vp-p how can you generate a sinusoidal waveforms with different frequencies? Square Signal @ wo Level Shifter Filter @ [kwo] Sinusoidal waveform X(t) 1 To/2 @ [kwo] To X(t) To/2 0.5 To -0.5 kwo B changes depending on k value

Demo Ck corresponds to frequency components In the signal.

Example • Given the following periodic square wave, find the Fourier Series representations and plot Ck as a function of k. 1 Note: sinc (infinity)  1 & Max value of sinc(x)1/x Sinc Function Note: First zero occurs at Sinc (+/-pi) Only a function of freq.

Use the Fourier Series Table (Table 4.3) • Consider the following periodic square wave • Find the Exponential Fourier Series of representations of x(t) • X0V X(t) V To/2 To -V |4V/p| 2|Ck| |4V/3p| |4V/5p| w0 3w0 5w0

Fourier Series - Applet http://www.falstad.com/fourier/

Using Fourier Series Table • Given the following periodic square wave, find the Fourier Series representations and plot Ck as a function of k. (Rectangular wave) X01 C0=T/To T/2=T1T=2T1 Ck=T/T0 sinc (Tkw0/2) Same as before Note: sinc (infinity)  1 & Max value of sinc(x)1/x

Using Fourier Series Table • Express the Fourier Series for a triangular waveform? • Express the Fourier Series for a triangular waveform that is amplitude shifted down by –X0/2 ? Plot the signal. Xo To

Fourier Series Transformation • Express the Fourier Series for a triangular waveform? • Express the Fourier Series for a triangular waveform that is amplitude shifted down by –X0/2 ? Plot the signal. Xo To From the table: Xo/2 To -Xo/2

Fourier Series Transformation • Express the Fourier Series for a triangular waveform? • Express the Fourier Series for a triangular waveform that is amplitude shifted down by –X0/2 ? Plot the signal. Xo To From the table: Xo/2 To -Xo/2 Only DC value changed!

Fourier Series Transformation • Express the Fourier Series for a sawtooth waveform? • Express the Fourier Series for this sawtooth waveform? Xo To From the table: Xo 1 To -3

Fourier Series Transformation • Express the Fourier Series for a sawtooth waveform? • Express the Fourier Series for this sawtooth waveform? • We are using amplitude transfer • Remember Ax(t) + B • Amplitude reversal A<0 • Amplitude scaling |A|=4/Xo • Amplitude shifting B=1 Xo To From the table: Xo 1 To -3

Example

Fourier Series and Frequency Spectra • We can plot the frequency spectrum or line spectrum of a signal • In Fourier Series k represent harmonics • Frequency spectrum is a graph that shows the amplitudes and/or phases of the Fourier Series coefficients Ck. • Amplitude spectrum |Ck| • Phase spectrum fk • The lines |Ck| are called line spectra because we indicate the values by lines

Schaum’s Outline Problems • Schaum’s Outline Chapter 5 Problems: • 4,5 6, 7, 8, 9, 10 • Do all the problems in chapter 4 of the textbook • Skip the following Sections in the text: • 4.5 • Read the following Sections in the textbook on your own • 4.4

Chapter 4

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Chapter 4

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