I'd like to generate the frequency spectrum of seven concatenated cosine functions.

I am unsure whether my code is correct; in particular, whether N = time*freq*7 is correct, or whether it should be N = time*freq (without the times seven).

My code is as follow:

```
sn = [1, 2, 3, 4, 5, 6, 7, 8];
time = 1;
freq = 22050;
N = time*freq*7;
dt = 1/freq;
t = 0 : dt : time - dt;
y = @(sn, phasePosNeg) cos(2*pi*(1200-100*sn) * t + phasePosNeg * sn*pi/10);
f = [y(sn(1), 1), y(sn(2), -1), y(sn(3), 1), y(sn(4), -1), y(sn(5), 1), y(sn(6), -1), y(sn(7), 1)];
F = abs(fftshift(fft(f)))/N;
df = freq/N;
faxis = -freq/2 : df : (freq/2-1/freq);
plot(faxis, F);
grid on;
axis([-1500, 1500, 0, 0.6]);
title('Frequency Spectrum Of Concatenated Cosine Functions');
xlabel('Frequency (Hz)');
ylabel('Magnitude');
```

I suppose the essense of my question is: Should the height of the spikes equal 1/7 of 0.5, or simply 0.5? (All cosine functions have an amplitude of 1.)

Thank you.

freq or just timefreq. – Jean-Luc Mar 27 '12 at 7:42concatenatingthese different waveforms ? You will get horrible discontinuities every 1s when the frequency/phase changes. Also the FFT will be somewhat meaningless if you take it over the entire 7 seconds as (a) the signal is not stationary (b) the discontinuities will generate a lot of artefacts. I'm wondering if what you really wanted to do wascombine(i.e.add) these 7 different frequency components, which would make a lot more sense ? – Paul R Mar 27 '12 at 8:20time*7, so I'm wondering if that is correct. I should add that I do get the same spectrum, if I change N to equal freqtime; however I don't think this is correct. – Jean-Luc Mar 27 '12 at 8:28