I have a FFT result. These are stored in two double
arrays: a real part array and an imaginary part array. How do I determine the frequencies that correspond to each element in these arrays? In other words, I would like have create an array that stores the frequencies for each real and imaginary component of my FFT.



you kth fft results's frequency is 2*pi*k/N 


Take a look at my answer here. Answer to comment: The FFT actually calculates the crosscorrelation of the input signal with sine and cosine functions (basis functions) at a range of equally spaced frequencies. For a given FFT output, there is a corresponding frequency (F) as given by the answer I posted. The real part of the output sample is the crosscorrelation of the input signal with By taking the magnitude of the complex FFT output, you get a measure of how well the input signal correlates with sinusoids at a set of frequencies regardless of the input signal phase. If you are just analyzing frequency content of a signal, you will almost always take the magnitude or magnitude squared of the complex output of the FFT. 


The first bin in the FFT is DC (0 Hz), the second bin is So if your sample rate,
Note that for a real input signal (imaginary parts all zero) the second half of the FFT (bins from 


The fft output coefficients (for complex input of size N) are from 0 to N  1 grouped as [LOW,MID,HI,HI,MID,LOW] frequency. I would consider that the element at k has the same frequency as the element at Nk since for real data, FFT[Nk] = complex conjugate of FFT[k]. The order of scanning from LOW to HIGH frequency is 0, 1, N1, 2, N2 ... [N/2]  1, N  ([N/2]  1) = [N/2]+1, [N/2] There are [N/2]+1 groups of frequency from index i = 0 to [N/2], each having the frequency " = i * SamplingFrequency / N " So frequency at bin FFT[k] is :



I have used the following:
The inputs are:



protected by rayryeng Jan 30 at 21:26
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