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.

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