# cumulative normal distribution in Python

I am looking for a function in Numpy or Scipy (or any rigorous Python library) that will give me the cumulative normal distribution function in Python. This is for Black Scholes option pricing. I can program it myself but it is a (decent) approximation and I'd like to test if there's something (even) better as as I still get a few decimals of error which I'd like to reduce?

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Here's an example:

``````>>> from scipy.stats import norm
>>> norm.cdf(1.96)
array(0.97500210485177952)
``````

If you need the inverse CDF:

``````>>> norm.ppf(norm.cdf(1.96))
array(1.9599999999999991)
``````
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+1. Also, the original author of scipy.stats offers a related set of functions in a module called pstat.py: nmr.mgh.harvard.edu/Neural_Systems_Group/strang/python.html –  Jarret Hardie Apr 30 '09 at 22:50

Adapted from here http://mail.python.org/pipermail/python-list/2000-June/039873.html

``````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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To build upon Unknown's example, the Python equivalent of the function normdist() implemented in a lot of libraries would be:

``````def normcdf(x, mu, sigma):
t = x-mu;
y = 0.5*erfcc(-t/(sigma*sqrt(2.0)));
if y>1.0:
y = 1.0;
return y

def normpdf(x, mu, sigma):
u = (x-mu)/abs(sigma)
y = (1/(sqrt(2*pi)*abs(sigma)))*exp(-u*u/2)
return y

def normdist(x, mu, sigma, f):
if f:
y = normcdf(x,mu,sigma)
else:
y = normpdf(x,mu,sigma)
return y
``````
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As Google gives this answer for the search netlogo pdf, here's the netlogo version of the above python code

```
;; Normal distribution cumulative density function
to-report normcdf [x mu sigma]
let t x - mu
let y 0.5 * erfcc [ - t / ( sigma * sqrt 2.0)]
if ( y > 1.0 ) [ set y 1.0 ]
report y
end

;; Normal distribution probability density function
to-report normpdf [x mu sigma]
let u = (x - mu) / abs sigma
let y = 1 / ( sqrt [2 * pi] * abs sigma ) * exp ( - u * u / 2.0)
report y
end

;; Complementary error function
to-report erfcc [x]
let z abs x
let t 1.0 / (1.0 + 0.5 * z)
let r t *  exp ( - z * z -1.26551223 + t * (1.00002368 + t * (0.37409196 +
t * (0.09678418 + t * (-0.18628806 + t * (.27886807 +
t * (-1.13520398 +t * (1.48851587 +t * (-0.82215223 +
t * .17087277 )))))))))
ifelse (x >= 0) [ report r ] [report 2.0 - r]
end

```
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The question is about Python, not NetLogo. This answer should not be here. And please don't edit the question to change its meaning. –  interjay Oct 18 '12 at 13:07
I am aware that this is not the preferred way, but I guess it is most helpful this way as people are directed to this page by google (currently...) –  platipodium Oct 18 '12 at 13:19