User:GabrielaV: Difference between revisions

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==How a CD Player Works==
==How a CD Player Works==
The first step on how a CD player works is that it reads <math>\sum_{n=-\infty}^\infty \ x(nt) \delta (t-nT)</math> from the CD.
The first step on how a CD player works is that it reads <math>\sum_{n=-\infty}^\infty \ x(nt) \delta (t-nT)</math> from the CD.
The data then goes through the Digital to Analog Converter. The data is convolved with <math> p(t)</math>
[[Image:CD.jpg]]

Revision as of 11:23, 30 October 2005

Welcome to Gabriela's Wiki page

Introduction

Do you want to know how to contact me or find out some interesting things about me? [[1]]

Signals & Systems

Example

Find the first two orthogonormal polynomials on the interval [-1,1]

1. What is orthogonormal? [2]

2. What is orthogonal? [3]

3. What is a polynomial? [4]

        
        

4. Now we can find the values for the unknown variables.



5. Now that we know what the first two orthogonormal polynomials!

Fourier Transform

As previously discussed, Fourier series is an expansion of a periodic function therefore we can not use it to transform a non-periodic funciton from time to the frequency domain. Fortunately the Fourier transform allows for the transformation to be done on a non-periodic function.


In order to understand the relationship between a non-periodic function and it's counterpart we must go back to Fourier series. Remember the complex exponential signal? [5]

where

If we let

The summation becomes integration, the harmoinic frequency becomes a continuous frequency, and the incremental spacing becomes a differential separation.

The result is

The term in the brackets is the Fourier transfrom of x(t)

Inverse Fourier transform


How a CD Player Works

The first step on how a CD player works is that it reads from the CD. The data then goes through the Digital to Analog Converter. The data is convolved with