Calculate a powerspectrum with a sliding window FFT:
Take 1024 samples:

```
double[] signal = stream.Take(1024);
```

Feed it to an FFT algorithm:

```
double[] real = new double[signal.Length];
double[] imag = new double[signal.Length);
FFT(signal, out real, out imag);
```

You will get a real part and an imaginary part. Do NOT throw away the imaginary part. Do the same to the real part as the imaginary. While it is true that the imaginary part is pi / 2 out of phase with the real, it still contains 50% of the spectrum information.

EDIT:

Calculate the power as opposed to the amplitude so that you have a high number when it is loud and close to zero when it is quiet:

```
for (i=0; i < real.Length; i++) real[i] = real[i] * real[i];
```

Similarly for the imaginary part.

```
for (i=0; i < imag.Length; i++) imag[i] = imag[i] * imag[i];
```

Now you have a power spectrum for the last 1024 samples. Where the first part of the spectrum is the low frequencies and the last part of the spectrum is the high
frequencies.

If you want to find BPM in popular music you should probably focus on the bass. You can pick up the bass intensity by summing the lower part of the power spectrum. Which numbers to use depends on the sampling frequency:

```
double bassIntensity = 0;
for (i=8; i < 96; i++) bassIntensity += real[i];
```

Now do the same again but move the window 256 samples before you calculate a new spectrum. Now you end up with calculating the bassIntensity for every 256 samples.

This is a good input for your BPM analysis. When the bass is quiet you do not have a beat and when it is loud you have a beat.

Good luck!

prediction. – Led May 30 '09 at 23:58