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Is there any function that allow me to compute the CDF probability of a normal distribution, given a mean and sigma ? i.e. for example P( X < x ) given the normal distribution with $\bar{x}$ and $\sigma$.

I think boost have this, but I think that it is just for the standard normal distribution.

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if you're using C++11 there's erf() in <cmath>. See @Dirk's answer below to use this with non-standard normal distributions. –  Shep Jun 6 '12 at 13:31

2 Answers 2

up vote 4 down vote accepted

You scale -- any N(m, s) can be turned into N(0,1) by dividing by s and subtracting m. So all you need is a cdf for N(0,1) which is provided by a number of libraries.

Here is a simple R example:

R> pnorm(1.96, 0, 1)          # compute cdf of 1.96 for N(0,1)
[1] 0.975002
R> pnorm(1.96*3 + 2, 2, 3)    # mu + sd*1.96 is really the same for N(mu, sd)
[1] 0.975002
R> 
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Oh well boost can do it directly ! even of it is not a standard distribution. However I didn't knew about the scale, thanks. –  shn Jun 6 '12 at 13:30
    
I didn't even check, but I glanced at R's pnorm.c and it does just that as well of m and s (defaulting to 0 and 1, of course) are not supplied. As the operation is so simple and general, most libraries do in fact offer it. But still handy to know the scaling trick :) –  Dirk Eddelbuettel Jun 6 '12 at 13:34
    
To whoever just randomly downvoted without leaving a comment: Huh? –  Dirk Eddelbuettel yesterday

There is no standard way of doing it, no.

One possible solution is to use GSL or boost like you've said.

For instance, here you can find numerical calculation of a bunch of error functions.

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why the -1?? -.- –  J. C. Leitão Jun 7 '12 at 15:34

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