FFT of the signal

Question

Abdullah Javed il 10 Mar 2021

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Link diretto a questa domanda

https://it.mathworks.com/matlabcentral/answers/768017-fft-of-the-signal

Hi. I am having trouble with the fft of the signal. I am not getting it as I am expecting. Any help in this reagard is appreciated.

I want this code represent the frequency domain as showing above by applying rectangular widow. However, the rectangular length going to be 0.2*signal shifting from the right to the lift 5 times

N= 10000

L= 2000

So we take the first 2000 element of T (0:2000) and (2000:4000) and so on .

I believe that the mistake is in the part below for each step but i cant figure it out.

%%FFT 
N2=0.2*N1;
S2 =fft(u2,N2);
F2=S(1:N1/2); %half of spectra 
PF2=2*F2.*conj(F2)/(fs*N2); %Power spectrum density per 1 kHz
E2=sum(PF2);%energy of signal V^2*T
Xdb2 = 20*log10(S2);
LPF2=10*log10(PF2); %Power spectrum in dB scale
LP2=LPF2(1:N1/2);
fvec2=fs*(1:N1/2)/N1;   % frequency array

and complete code is given below.

fs=100000;%sampling frequency, N=1/2deltaT, deltaT step in T 
N= 100000;
t = (0:1/fs:(10-(1/fs)));
f= 1000;
alpha= (f*pi)/5000;
theta= 30;
y = 100*exp(-alpha*t).*sin(2*pi*f*t+ theta);
figure(1)
plot(t,y); grid on
 
%%---
%FFT1
N1=fs;
S =fft(y,N1);
F1=S(1:N1/2); %half of spectra 
PF1=2*F1.*conj(F1)/(fs*N1); %Power spectrum density per 1 kHz
E=sum(PF1);%energy of signal V^2*T
Xdb = 20*log10(S);
LPF1=10*log10(PF1); %Power spectrum in dB scale
LP=LPF1(1:N1/2);
fvec=fs*(1:N1/2)/N1;   % frequency array
 
%-------
w2= 0.2*N:0.4*N;
x2 = rectwin(length(w2));
%len=0.2*N:N-1
yshort2= y(w2);
u2= x2'.*(yshort2-1);
t2 = 1/fs*(0:length(yshort2)-1);
 
figure
plot(t2,u2)
grid on
 
%%FFT 
N2=0.2*N1;
S2 =fft(u2,N2);
F2=S(1:N1/2); %half of spectra 
PF2=2*F2.*conj(F2)/(fs*N2); %Power spectrum density per 1 kHz
E2=sum(PF2);%energy of signal V^2*T
Xdb2 = 20*log10(S2);
LPF2=10*log10(PF2); %Power spectrum in dB scale
LP2=LPF2(1:N1/2);
fvec2=fs*(1:N1/2)/N1;   % frequency array
 
 
%-------
w3= 0.4*N:0.6*N;
x3 = rectwin(length(w3));
yshort3= y(w3);
u3= x3'.*(yshort3-1);
t3 = 1/fs*(0:length(yshort3)-1);
 
figure
plot(t3,u3)
grid on
 
%FFT3
 
N3=0.2*N1;
S3 =fft(u3,N3);
F3=S(1:N1/2); %half of spectra 
PF3=2*F3.*conj(F3)/(fs*N3); %Power spectrum density per 1 kHz
E3=sum(PF3);%energy of signal V^2*T
Xdb3 = 20*log10(S3);
LPF3=10*log10(PF3); %Power spectrum in dB scale
LP3=LPF3(1:N1/2);
fvec3=fs*(1:N1/2)/N1;   % frequency array
 
 
%-------
w4= 0.6*N:0.8*N;
x4 = boxcar(length(w4));
yshort4 = y(w4);
u4= x4'.*yshort4;
t4 = 1/fs*(0:length(yshort4)-1);
 
figure
plot(t4,u4)
grid on
 
%FFT4
 
N4=0.2*N1;
S4 =fft(u4,N4);
F4=S(1:N1/2); %half of spectra 
PF4=2*F4.*conj(F4)/(fs*N4); %Power spectrum density per 1 kHz
E4=sum(PF4);%energy of signal V^2*T
Xdb4 = 20*log10(S4);
LPF4=10*log10(PF4); %Power spectrum in dB scale
LP4=LPF4(1:N1/2);
fvec4=fs*(1:N1/2)/N1;   % frequency array
 
 
%-------
w5= 0.8*N:N-1;
x5 = boxcar(length(w5));
yshort5= y(w5);
u5= x5'.*yshort5;
t5 = 1/fs*(0:length(yshort5)-1);
figure
plot(t5,u5)
grid on
%%FFT5
 
N5=0.2*N1;
S5 =fft(u5,N5);
F5=S(1:N1/2); %half of spectra 
PF5=2*F5.*conj(F5)/(fs*N5); %Power spectrum density per 1 kHz
E5=sum(PF5);%energy of signal V^2*T
Xdb5 = 20*log10(S5);
LPF5=10*log10(PF5); %Power spectrum in dB scale
LP5=LPF5(1:N1/2);
fvec5=fs*(1:N1/2)/N1;   % frequency array
 
 
figure 
plot(fvec,LP)
hold on
plot(fvec2, LP2)
hold on
plot(fvec3,LP3)
hold on
plot(fvec4,LP4)
hold on
plot(fvec5,LP5)
hold off