Lecture 28: Shift Theorem In Higher Dimensions

author: Brad G. Osgood, Computer Science Department, Stanford University
published: May 21, 2010,   recorded: September 2007,   views: 2652
released under terms of: Creative Commons Attribution Non-Commercial (CC-BY-NC)

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If you make a shift by B then that corresponds to E to the minus 2 pie ISB, that’s the phase shift times the Fourier Transform of the original function. All right. That’s easy result. That’s one of the very first results that we proved when we were talking about general properties of the Fourier Transform and it follows, like many other formulas, just by making a change of variable in the interval that defines it. All right. Interval defines a Fourier Transform. ...

See the whole transcript at The Fourier Transform and its Applications - Lecture 28

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