Help interpreting Fast Fourier Transform.
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I followed this video : https://www.youtube.com/watch?v=cw9eoSzln_k&ab_channel=Study%26Tutor
to perform a FFT on data I collected that reperesented voltage vs time. The data can be found here https://mega.nz/file/JX81BI5L#ivW7WgkKpxjhqMBXC2nUYuc8ykC_sXahZuAu1UaMc6w
The code I used is as follows :
t = readmatrix('fftpoop.xlsx');
>> dt = 16.788
dt = 16.7880
>> fs = 1/dt;
>> plot(t(1:16789,2))
>> %time
>> t = t(1:16789,2);
>> t_f = fft(t);
>> m = length(t_f);
>> freq = (-m/2:(m/2-1))*fs/(m-1);
>> plot(freq,fftshift(abs(t_f)))
And i recieved a plot that looks like this :
I manually counted the average time between peaks from the original time data to be .37s. I used this time to calculate the a distance, D = 8.3*10^-7 m/s * .37 s = 307 nm* (2) = 614 nm. This is very close to the value I was expecting (633 nm).
I believe that If I find the frequency from this fft that has the highest peak, then I can use that to use the equation, time = 2pi/freq and verify my time is correct / make my time variable more accurate, and get a better value for D calculated above
I tried using the x value centered at 0 and the next highest peak from the 0 peak in the above graph as my frequency, but they all produce numbers wayyyy bigger from the expected distance.
Am I using this data correctly?
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Star Strider
il 28 Giu 2023
Spostato: Star Strider
il 28 Giu 2023
My analysis —
M1 = readmatrix('fftpoop')
t = M1(:,1);
s = M1(:,2);
L = size(M1,1)
Ts = mean(diff(t));
Fs = 1/Ts;
Fn = Fs/2;
figure
plot(t, s)
grid
xlabel('Time (s)')
ylabel('Amplitude (V)')
NFFT = 2^nextpow2(L)
FTs = fft((s-mean(s)).*hann(L), NFFT)/L;
Fv = linspace(0, 1, NFFT/2+1)*Fn;
Iv = 1:numel(Fv);
[pks,locs] = findpeaks(abs(FTs(Iv))*2, 'MinPeakProminence',0.015);
time = 1/Fv(locs)
figure
plot(Fv, abs(FTs(Iv))*2)
grid
xlabel('Frequency (Hz)')
ylabel('Magnitude (V)')
xlim([0 20])
ylim([min(ylim) 0.022])
text(Fv(locs), pks, sprintf('\\leftarrow %.3f Hz\n %.3f V', Fv(locs), pks), 'Horiz','left', 'Vert','top')
I assume your ‘time’ is based on radian frequencies, so I calculated it as the period of the peak frequency in Hz (since my plot is in Hz), giving the period in seconds. I am not certain what the data are or what your analysis requires, so I will defer to you for those.
.
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