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Does anyone know how I could easily generate random numbers following a normal distribution in C/C++ ?

http://www.mathworks.com/access/helpdesk/help/toolbox/stats/normrnd.html

I don't want to use any of Boost.

I know that Knuth talks about this at length but I don't have his books at hand right now.

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Duplicate of one or the other of stackoverflow.com/questions/75677/… and stackoverflow.com/questions/1109446/… –  dmckee Feb 24 '10 at 17:48
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11 Answers

up vote 43 down vote accepted

The Box-Muller transform is what is commonly used. This correctly produces values with a normal distribution.

http://en.wikipedia.org/wiki/Normal_distribution#Generating_values_from_normal_distribution

http://en.wikipedia.org/wiki/Box_Muller_transform

The math is easy. You generate two uniform numbers and from those you get two normally distributed numbers. Return one, save the other for the next request of a random number.

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7  
If you need speed, then the polar method is faster, though. And the Ziggurat algorithm even more (albeit much more complex to write). –  Јοеу Feb 24 '10 at 12:15
    
found an implementation of the Ziggurat here people.sc.fsu.edu/~jburkardt/c_src/ziggurat/ziggurat.html It's quite complete. –  dwbrito May 19 '13 at 16:54
5  
Note, C++11 adds std::normal_distribution which does exactly what you ask for without delving into mathematical details. –  user283145 Aug 28 '13 at 9:50
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EDIT: Since 12 August 2011 we have C++11 which directly offers std::normal_distribution, which is the way I would go today.

Here's the original Answer:

Here are some solutions ordered by ascending complexity.

  1. Add 12 uniform numbers from 0-1 and subtract 6. This will match mean and standard deviation of a normale variable. An obvious drawback is that the range is limited to +/-6 - unlike a true normal distribution.

  2. Box-Muller transform - was listed above, and is relatively simple to implement. If you need very precise samples however, be aware that the Box-Muller transform combined with some uniform generators suffers from an anomaly called Neave Effect.

    H. R. Neave, “On using the Box-Muller transformation with multiplicative congruential pseudorandom number generators,” Applied Statistics, 22, 92-97, 1973

  3. For best precision I suggest drawing uniforms and applying the inverse cumulative normal distribution to arrive at normally distributed variates. You can find a very good algorithm for the inverse cumulative normal distribution at

http://home.online.no/~pjacklam/notes/invnorm/#Overview

Hope that helps

Peter

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by any chance would you have another link to the pdf on the Neave effect? or the original journal article reference? thank you –  pyCthon Nov 2 '11 at 13:30
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@stonybrooknick The original reference is added. Cool remark: While googling "box muller neave" to find the reference, this very stackoverflow question came up on the first result page! –  Peter G. Nov 2 '11 at 17:18
    
yeah its not every well known outside certain small communities and interest groups –  pyCthon Nov 4 '11 at 18:55
    
@Peter G. Why would anyone downvote your answer? - possibly the same person did my comment below too, which I'm fine with, but I thought your answer was very good. It would be good if SO made downvotes force a real comment..I suspect most downvotes of old topics are just frivolous and trolly. –  Pete855217 Nov 18 '13 at 23:35
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A quick and easy method is just to sum a number of evenly distributed random numbers and take their average. See the Central Limit Theorem for a full explanation of why this works.

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+1 Very interesting approach. Is it verified to really give normally distributed sub ensembles for smaller groups? –  Morlock Feb 24 '10 at 12:53
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@Morlock The larger the number of samples you average the closer you get to a Gaussian distribution. If your application has strict requirements for the accuracy of the distribution then you might be better off using something more rigorous, like Box-Muller, but for many applications, e.g. generating white noise for audio applications, you can get away with a fairly small number of averaged samples (e.g. 16). –  Paul R Feb 24 '10 at 13:25
    
Plus, how do you parametrize this to get a certain amount of variance, say you want a mean of 10 with a standard deviation of 1? –  Morlock Feb 24 '10 at 13:26
    
@Morlock: To get a given mean and SD you scale your underlying samples properly. Generally, the underlying samples, u, are uniform over 0 to 1. Make them uniform over -1 to +1 (compute 2 u -1). You can then add the desired mean and multiply to get the desired standard deviation. –  S.Lott Feb 24 '10 at 13:39
    
@Morlock If you scale your PRNG to give random numbers in the range -1.0 to +1.0 then you get a mean of 0.0 and a variance of 0.5 when you take a sufficiently large average. You can just linearly shift and scale either the input numbers or the output average to get whatever mean and variance you need. –  Paul R Feb 24 '10 at 13:39
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Use std::tr1::normal_distribution.

The std::tr1 namespace is not a part of boost. It's the namespace that contains the library additions from the C++ Technical Report 1 and is available in up to date Microsoft compilers and gcc, independently of boost.

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TR1 is not boost. –  Joe Gauterin Feb 24 '10 at 11:31
    
TR1 is not standard, either. –  anon Feb 24 '10 at 11:39
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He didn't ask for standard, he asked for 'not boost'. –  Joe Gauterin Feb 24 '10 at 11:43
    
TR1 is standardized. –  Ben Voigt Jan 6 at 23:50
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This is how you generate the samples on a modern C++ compiler.

#include <random>
...
std::mt19937 generator;
double mean = 0.0;
double std  = 1.0;
std::normal_distribution<double> normal(mean, std);
cerr << "Normal: " << normal(generator) << endl;
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Here's a C++ example, based on some of the references. This is quick and dirty, you are better off not re-inventing and using the boost library.

#include "math.h" // for RAND, and rand
double sampleNormal() {
    double u = ((double) rand() / (RAND_MAX)) * 2 - 1;
    double v = ((double) rand() / (RAND_MAX)) * 2 - 1;
    double r = u * u + v * v;
    if (r == 0 || r > 1) return sampleNormal();
    double c = sqrt(-2 * log(r) / r);
    return u * c;
}

You can use a Q-Q plot to examine the results and see how well it approximates a real normal distribution (rank your samples 1..x, turn the ranks into proportions of total count of x ie. how many samples, get the z-values and plot them. An upwards straight line is the desired result).

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What is sampleNormalManual()? –  solvingPuzzles Jul 22 '12 at 0:17
    
@solvingPuzzles - sorry, corrected the code. It's a recursive call. –  Pete855217 Jul 26 '12 at 9:16
    
This is bound to crash at some rare event (showcasing application to your boss rings a bell?). This should be implemented using a loop, not using recursion. The method looks unfamiliar. What is the source / how is it called? –  the swine Nov 18 '13 at 17:00
    
Box-Muller transcribed from a java implementation. As I said, it's quick and dirty, feel free to fix it. –  Pete855217 Nov 18 '13 at 23:28
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You can use the GSL. Some complete examples are given to demonstrate how to use it.

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Have a look on: http://www.cplusplus.com/reference/random/normal_distribution/. It's the simplest way to produce normal distributions.

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Lone link is bad. –  Austin Henley Dec 16 '12 at 4:48
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I've followed the definition of the PDF given in http://www.mathworks.com/help/stats/normal-distribution.html and came up with this:

const double DBL_EPS_COMP = 1 - DBL_EPSILON; // DBL_EPSILON is defined in <limits.h>.
inline double RandU() {
    return DBL_EPSILON + ((double) rand()/RAND_MAX);
}
inline double RandN2(double mu, double sigma) {
    return mu + (rand()%2 ? -1.0 : 1.0)*sigma*pow(-log(DBL_EPS_COMP*RandU()), 0.5);
}
inline double RandN() {
    return RandN2(0, 1.0);
}

It is maybe not the best approach, but it's quite simple.

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-1 Not working for e.g. RANDN2(0.0, d + 1.0). Macros are notorious for this. –  Petter Oct 11 '13 at 11:28
    
The macro will fail if rand() of RANDU returns a zero, since Ln(0) is undefined. –  interDist Dec 20 '13 at 19:37
    
Have you actually tried this code? It looks like you have created a function that generates numbers which are Rayleigh distributed. Compare to the Box–Muller transform, where they multiply with cos(2*pi*rand/RAND_MAX), whereas you multiply with (rand()%2 ? -1.0 : 1.0). –  HelloGoodbye Mar 4 at 15:01
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If you're using C++11, you can use std::normal_distribution:

#include <random>

std::default_random_engine generator;
std::normal_distribution<double> distribution(/*mean=*/0.0, /*stddev=*/1.0);

double randomNumber = distribution(generator);

There are many other distributions you can use to transform the output of the random number engine.

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That's already been mentioned by Ben (stackoverflow.com/a/11977979/635608) –  Mat Apr 21 '13 at 12:14
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Take a look at what I found.

This library uses the Ziggurat algorithm.

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