Problem 7. Fourier Transforms 1) Show that the Fourier series of an odd function f(x) with respect to the center point o

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Problem 7 Fourier Transforms 1 Show That The Fourier Series Of An Odd Function F X With Respect To The Center Point O 1 (32.45 KiB) Viewed 20 times

Problem 7. Fourier Transforms 1) Show that the Fourier series of an odd function f(x) with respect to the center point of the interval on which it is defined can be represented by a series only involving sine functions? 2) How can the Fast Fourier Transform (FFT) be derived from the Discrete Fourier Transform? 3) Write down an expression for the n roots of x"=1.