# Is the maximum PSD frequency bin returned by matplotlib wrong?

I am trying to understand the frequency bins returned by the `matplotlib.mlab.psd()` function.

Using the following code I can inspect the frequencies which are returned and I'm not convinced they are correct.

``````import matplotlib.mlab as ml
import numpy as np
sampf=500.
nfft=2**4
testdat=np.random.randn(10000,)
p2,f2=ml.psd(testdat, nfft,sampf,sides='twosided')
p1,f1=ml.psd(testdat, nfft,sampf,sides='onesided')

print testdat.shape
print "Twosided"
print "\tbin1     : {:f} ".format(f2[0])
print "\tbin2     : {:f} ".format(f2[1])
print "\tbinlast  : {:f} ".format(f2[-1])

print "onesided"
print "\tbin1     : {:f} ".format(f1[0])
print "\tbin2     : {:f} ".format(f1[1])
print "\tbinlast  : {:f} ".format(f1[-1])

print "recreate"
f3=np.arange(nfft)*(sampf/2.)/nfft
print "\tbin1     : {:f} ".format(f3[0])
print "\tbin2     : {:f} ".format(f3[1])
print "\tbinlast  : {:f} ".format(f3[-1])
``````

which gives this output:

``````Twosided
bin1     : -250.000000
bin2     : -218.750000
binlast  : 218.750000
onesided
bin1     : 0.000000
bin2     : 31.250000
binlast  : 250.000000
recreate
bin1     : 0.000000
bin2     : 15.625000
binlast  : 234.375000
``````

Am I right in thinking that the maximum frequency (binlast) for the 2 sided case should be half the sampling frequency?

Following this SO post I think it should range to sampf/2.

-

Because you are handing in a real signal `f_hat(w) = conj(f_hat(-w))` (that is the Fourier component at negative omega is the complex conjugate of the component at omega) thus they will have the same magnitude and thus in terms of the power spectrum are redundant.
If you are missing the exactly `sampf/2` it is because of off-by-one issues related to having an even number of steps but needing and odd number of points if you are going to include 0 and be perfectly symmetric. Note that in your two sided case, the most negative frequency is `-sampf/2` and your maximum misses `sampf/2` by one bin step. Your reconstruction bin last is `(nfft-1)/nfft * (sampf/2)` and misses the value due to I suspect float rounding error.