power spectral density PSD?

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Mary Jon
Mary Jon am 28 Nov. 2013
Kommentiert: Youssef Khmou am 3 Dez. 2013
If I am have signal with length(33),or 13 signals each with length(33), How finding PSD to each signal individually?and plot its individually?

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Youssef Khmou
Youssef Khmou am 29 Nov. 2013
You can try this way :
t=linspace(0,1,33);% 1 seconde
Fs=inv(t(3)-t(2));
f=Fs/10;
P=13; % number of signals
X=zeros(33,P);
for n=1:P
X(:,n)=sin(2*pi*t*(f+n));
end
N=512; % number of points for computing DFT
frequency=(0:N-1)*Fs/N; % frequency axis
frequency=frequency(1:floor(end/2)); % One sided spectrum
PSD=zeros(N,P);
for n=1:P
PSD(:,n)=fft(X(:,n),N);
PSD(:,n)=PSD(:,n).*conj(PSD(:,n));
end
PSD(floor(end/2)+1:N,:)=[]; % one sided spectrum
% Plotting them all in one figure
figure,plot(frequency,PSD)
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Mary Jon
Mary Jon am 3 Dez. 2013
Hello Youssef I note in your code above ,there is sin(),my data or signals is not pure sin,why you are used sin()?
X(:,n)=sin(2*pi*t*(f+n));
If this is just example to show me how find PSD,how can I modified this code ,to finding PSD to my signals of length (33)?
when I am used this code
[Pxx(:,nn),Fxx] = periodogram(X(:,nn),[],64,1);
the final result not same result of your code?when plot two result of codes I get different plots?
Youssef Khmou
Youssef Khmou am 3 Dez. 2013
mary, they are the same, it is just a problem of scale, Fxx is the frequency axis and it is 33x1, then we should get the same number of points using fft:
plot(Fxx,Pxx);
hold on;
F1=fft(X(:,1),33*2); % 33*2 points
F1=abs(F1(1:33));
plot(Fxx,F1,'r');
I used sinus just as example, Good luck mary

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Wayne King
Wayne King am 28 Nov. 2013
Hi Mary, If you have the Signal Processing Toolbox, the easiest thing is to use periodogram()
I'll create some simulated signals. I'll assume your sampling frequency is 1.
X = randn(33,13);
for nn = 1:13
[Pxx(:,nn),Fxx] = periodogram(X(:,nn),[],64,1);
end
You can plot each one individually by selecting the column.
plot(Fxx,10*log10(Pxx(:,1)))
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Mary Jon
Mary Jon am 30 Nov. 2013
what is 512 in your code?
Youssef Khmou
Youssef Khmou am 1 Dez. 2013
512 is the number of points for calculating DFT, you can put any number, higher number gives good resolution, any number that is multiple of 2 (128,512,1024...) is faster DFT becomes FFT

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