10/09 - Fourier Transform

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Assuming the function is perodic with the period T

Fourier Transform

Remember from 10/02 - Fourier Series

If we let

Remember

Definitions

Examples

Sifting property of the delta function

The dirac delta function is defined as any function, denoted as , that works for all variables that makes the following equation true:

  • When dealing with , it behaves slightly different than dealing with . When dealing with , note that the delta function is . The is tacked onto the front. Thus, when dealing with , you will often need to multiply it by to cancel out the .