Bandwidth of a chirp signal
Show older comments
I have generated three signals and their spectrum (with FFT). Two chirps and one pure cosine signal.
<https://pastebin.com/z2pzq0E7 Code for generating these signals is given here.>
Time variation -> -5 to +5 seconds
frequency variation -> -2.5 to +2.5 Hz (For the two chirps)
Sampling frequency = 25 Hz
Qn 1:
For the cosine chirp cos(2*pi*f.*t) [Line 12],
The spectrum obtained is spanning from -5 Hz to +5 Hz.
Even though the frequency variation (Line 10) is from -2.5 to +2.5 Hz,
why the spectrum is spanning from -5 Hz to +5 Hz?
Qn 2:
For the complex chirp exp(2j*pi*f.*t) [Line 31],
The spectrum obtained is spanning from -5 Hz to +5 Hz.
Even though the frequency variation (Line 10) is from -2.5 to +2.5 Hz,
why the spectrum is spanning from -5 Hz to +5 Hz?
Observation:
For the pure cosine tone cos(2*pi*(B/2)*t) [Line 44],
The spectrum obtained is centered at -2.5 Hz and +2.5 Hz.
This is expected.
Accepted Answer
Honglei Chen
on 27 Sep 2018
I think the two questions are the same, essentially your signal model is
cos(2*pi*B*t^2)
This means that when you look at the instantaneous frequency, it is given by 2*B*t. That's why you see it span from -5 to 5 Hz instead of from -2.5 to 2.5 Hz.
HTH
2 Comments
Vinod
on 28 Sep 2018
Honglei Chen
on 28 Sep 2018
Well your f in cos(2*pi*f*t) is just B/T*t, that's why I say it's essentially cos(2*pi*f*t) is essentially cos(2*pi*B/T*t^2). But your instantaneous frequency is not f, it's actually the derivative of B/T*t^2 over t, so it's actually 2*B/T*t, that's why at beginning it's -B and at the end it's B.
Hope this is clear.
More Answers (1)
Hieu Nguyen
on 22 Nov 2019
0 votes
I found an website that discuss about this problem: https://www.gaussianwaves.com/2014/07/chirp-signal-frequency-sweeping-fft-and-power-spectral-density/
(There was a mistake he made in equation 8 - it should be fi(t) = 2a*t+f0 )
The answer is in equation 10 where he wrote the instantenous phase should be calculated as the integration of the angular frequency. If you follow that instruction, you will get the expression of x as: x=cos(2*pi*(k/2*t+f0).*t+phase)
Categories
Find more on Waveform Generation in Help Center and File Exchange
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
