Thbere is a farily significant D-C or constant offset in ‘data(:,2)’ and that hides all the spectral peaks of lower magnitudes.
The eassiest way to avoid this is to subtract the D-C offset value (that is actually the mean value of the signal) before calculating the fft:
dataX=fft(data(:,2)-mean(data(:,2)))/n;
that I did here. The spectral peak at about 225 Hz becomes visible. There is nothing wrong with your code (that I can see).
‘Second thing, I wonder about the amplitude on freq domain, does it shoul be the same in the time domain?’
It will be close, however the energy in the signal is distributed over a wide spectrum, so it will rarely be exactly the same. There is also the problem that the fft may not calculate a frequency at exactly the frequency of a particular signal component, so that energy may be spread over a short range of adjacent frequuencies.
Try this —
%PERFORM FFT of data TO GET FREQ CONTENT
data=load("event.txt");
n=length(data(:,1));
srate=1000; %sampling rate
nyq=srate/2;
dataX=fft(data(:,2)-mean(data(:,2)))/n;
hz=linspace(0,nyq,floor(n/2)+1);
figure (1)
subplot(211)
plot(data(:,1),data(:,2))
xlabel('Time(sec)'), ylabel('Amplitude')
subplot(212)
plot(hz,2*abs(dataX(1:length(hz))),'-r'), xlabel('Freq(Hz)')
%set(gca,'XLim',[0 2],'YLim',[0 100])
%Perform IFFT TO CONSTRUCT ORIGINAL SIGNAL
recon_data=ifft(dataX)*n;
figure(2)
subplot(211)
plot(data(:,1),data(:,2)), xlabel('Time(sec)')
legend('original data')
title('inverse fourier transform')
subplot(212)
plot(data(:,1),real(recon_data),'-r')
legend('reconstruction data')
.
