I'm using chi2 distribution as a theoretical problem for a simulation system.

For a given interval, I need to estimate this distribution as a PMF defined as the integral of the PDF inside that interval. This value should be near the value of the PDF at the center of the interval, but can be slightly different, depending on the shape of the PDF.

Here is what I do:

```
import numpy
from scipy.stats import chi2
dist = chi2(10)
nbins = 120
F = dist.cdf(numpy.arange(nbins+1))
pmf = F[1:] - F[:-1] # surface inside the interval
pmf /= pmf.sum() # Normalisation
```

The problem is that `chi2.cdf(100, 10)`

and above gives exactly 1.0. So the minimum value I'm able to get is around 1.11e-16. But `chi2.pdf(100, 10)`

isn't exactly 0 (it's about 2.5e-17).

My question is: how can I get my pmf estimation with greater precision (maybe up to 1e-25)? Why is cdf function less precise than pdf function?