# PDF and CDF without SciPy

I need to use probability and cumulative density functions in a Python application I'm programming. SciPy offers both, but it seems too hefty of a dependency for just those two functions. PDF seems easy enough to implement without SciPy. (From the docs:)

The probability density function for norm is:

norm.pdf(x) = exp(-x**2/2)/sqrt(2*pi)

Is there a way to get CDF as well without using SciPy?

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Integrate by hand! There's a simple formula for that... right? [hint: no] –  Shep Apr 24 '12 at 17:07

See this post:

``````from math import *
def erfcc(x):
"""Complementary error function."""
z = abs(x)
t = 1. / (1. + 0.5*z)
r = t * exp(-z*z-1.26551223+t*(1.00002368+t*(.37409196+
t*(.09678418+t*(-.18628806+t*(.27886807+
t*(-1.13520398+t*(1.48851587+t*(-.82215223+
t*.17087277)))))))))
if (x >= 0.):
return r
else:
return 2. - r

def ncdf(x):
return 1. - 0.5*erfcc(x/(2**0.5))
``````
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You're looking for the "error function", see the math module. It has no closed form representation in terms of elementary functions.

Note that `math.erf(x)` was introduced in python 2.7. If you're using an earlier version, you'll have to make due with an approximation.

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