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To understand the relationship between the Fourier Transform of ''w'' and f (in Hertz) we start with the definition of each: | To understand the relationship between the Fourier Transform of ''w'' and f (in Hertz) we start with the definition of each: | ||
| − | <math>\int\limits_{\alpha}^{\beta}e^\tau\ d\tau | + | <math>\int\limits_{\alpha}^{\beta}e^\tau\ d\tau \qquad \qquad \int\limits_{\alpha}^{\beta}e^\tau\ d\tau |
</math> | </math> | ||
Revision as of 10:42, 18 September 2014
Fourier Transform as a Function of Frequency w Versus Frequency f (in Hertz)
A slecture by ECE student Randall Cochran
Partly based on the ECE438 Fall 2014 lecture material of Prof. Mireille Boutin.
To understand the relationship between the Fourier Transform of w and f (in Hertz) we start with the definition of each:
$ \int\limits_{\alpha}^{\beta}e^\tau\ d\tau \qquad \qquad \int\limits_{\alpha}^{\beta}e^\tau\ d\tau $
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