I am trying to create an application for calculating coefficients for a graphic equalizer FIR filter. I am doing some prototyping in Matlab but I have some problems.
I have started with the following Matlab code:
% binamps vector holds 2^13 = 8192 bins of desired amplitude values for frequencies in range 0.001 .. 22050 Hz (half of samplerate 44100 Hz) % it looks just fine, when I use Matlab plot() function % now I get ifft n = size(binamps,1); iff = ifft(binamps, n); coeffs = real(iff); % throw away the imaginary part, because FIR module will not use it anyway
But when I do the fft() of the coefficients, I see that the frequencies are stretched 2 times and the ending of my AFR data is lost:
p = fft(coeffs, n); % take the fourier transform of coefficients for a test nUniquePts = ceil((n+1)/2); p = p(1:nUniquePts); % select just the first half since the second half % is a mirror image of the first p = abs(p); % take the absolute value, or the magnitude p = p/n; % scale by the number of points so that % the magnitude does not depend on the length % of the signal or on its sampling frequency p = p.^2; % square it to get the power sampFreq = 44100; freqArray = (0:nUniquePts-1) * (sampFreq / n); % create the frequency array semilogx(freqArray, 10*log10(p)) axis([10, 30000 -Inf Inf]) xlabel('Frequency (Hz)') ylabel('Power (dB)')
So I guess, I am using ifft wrong. Do I need to make my binamps vector twice as long and create a mirror in the second part of it? If it is the case, then is it just a Matlab's implementation of ifft or also other C/C++ FFT libraries (especially Ooura FFT) need mirrored data for inverse FFT?
Is there anything else I should know to get the FIR coefficients out of ifft?