I have seen this question asked a lot but never seen a true concrete answer to it. So I am going to post one here which will hopefully help people understand why exactly there is "modulo bias" when using a random number generator, like
rand() in C++.
Now what happens if you want to generate a random number between say 0 and 2. For the sake of explanation, let's say
So when does
So how do we solve this problem? One way is to keep generating random numbers until you get a number in your desired range:
Hope that helps everyone!
Works cited and further reading:
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Keep selecting a random is a good way to remove the bias.
We could make the code fast if we search for an x in range divisible by
The above loop should be very fast, say 1 iteration on average.
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There are two usual complains with the use of modulo.
Using something like
to generate a random number between 0 and n will avoid both problems (and it avoids overflow with RAND_MAX == INT_MAX)
BTW, C++11 introduced standard ways to the the reduction and other generator than rand().
As the accepted answer indicates, "modulo bias" has its roots in the low value of
So there are 4 outputs of 0's (4/10 chance) and only 3 outputs of 1 and 2 (3/10 chances each).
So it's biased. The lower numbers have a better chance of coming out.
But that only shows up so obviously when
A much better solution than looping (which is insanely inefficient and shouldn't even be suggested) is to use a PRNG with a much larger output range. The Mersenne Twister algorithm has a maximum output of 4,294,967,295. As such doing
I wrote a tool to demonstrate the bias when using a PRNG and modulo: https://gitorious.org/modulo-test/modulo-test/trees/master
You can see a demonstration of the tool in the following question: mathematics behind modulo behavor
With this tool you choose an input range (power of two) and an output range. With the correct number of iterations, it will return the probability for each output value and you will be able to see the the bias.
@user1413793 is correct about the problem. I'm not going to discuss that further, except to make one point: yes, for small values of
Unfortunately, the implementations of the solution are all incorrect or less efficient than they should be. (Each solution has various comments explaining the problems, but none of the solutions have been fixed to address them.) This is likely to confuse the casual answer-seeker, so I'm providing a known-good implementation here.
Again, the best solution is just to use
If you don't have
Here is the OpenBSD implementation:
It is worth noting the latest commit comment on this code for those who need to implement similar things:
The Java implementation is also easily findable (see previous link):