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++.
So rand()
is a pseudorandom number generator which chooses a natural number between 0 and RAND_MAX
, which is a constant defined in cstdlib
(see this article for a general overview on rand()
).
Now what happens if you want to generate a random number between say 0 and 2? For the sake of explanation, let's say RAND_MAX
is 10 and I decide to generate a random number between 0 and 2 by calling rand()%3
. However, rand()%3
does not produce the numbers between 0 and 2 with equal probability!
When rand()
returns 0, 3, 6, or 9, rand()%3 == 0
. Therefore, P(0) = 4/11
When rand()
returns 1, 4, 7, or 10, rand()%3 == 1
. Therefore, P(1) = 4/11
When rand()
returns 2, 5, or 8, rand()%3 == 2
. Therefore, P(2) = 3/11
This does not generate the numbers between 0 and 2 with equal probability. Of course for small ranges this might not be the biggest issue but for a larger range this could skew the distribution, biasing the smaller numbers.
So when does rand()%n
return a range of numbers from 0 to n1 with equal probability? When RAND_MAX%n == n  1
. In this case, along with our earlier assumption rand()
does return a number between 0 and RAND_MAX
with equal probability, the modulo classes of n would also be equally distributed.
So how do we solve this problem? A crude way is to keep generating random numbers until you get a number in your desired range:
int x;
do {
x = rand();
} while (x >= n);
but that's inefficient for low values of n
, since you only have a n/RAND_MAX
chance of getting a value in your range, and so you'll need to perform RAND_MAX/n
calls to rand()
on average.
A more efficient formula approach would be to take some large range with a length divisible by n
, like RAND_MAX  RAND_MAX % n
, keep generating random numbers until you get one that lies in the range, and then take the modulus:
int x;
do {
x = rand();
} while (x >= (RAND_MAX  RAND_MAX % n));
x %= n;
For small values of n
, this will rarely require more than one call to rand()
.
Works cited and further reading:

3Another way of thinking about_
RAND_MAX%n == n  1
_ is(RAND_MAX + 1) % n == 0
. When reading code, I tend to understand% something == 0
as “evenly divisible” more readily than other ways of calculating it. Of course, if your C++ stdlib hasRAND_MAX
as the same value asINT_MAX
,(RAND_MAX + 1)
surely wouldn't work; so Mark's calculation remains the safest implementation. – Slipp D. Thompson Jul 19 '16 at 8:04 

I may be nitpicking, but if the goal is to reduce wasted bits we could improve this slightly for the edge condition where RAND_MAX (RM) is only 1 less than being equally divisible by N. In this scenario, no bits need to be wasted by doing X >= (RM  RM % N)) which is of little value for small values of N, but becomes of larger value for large values of N. As mentioned by Slipp D. Thompson, there is a solution which will work only when INT_MAX (IM) > RAND_MAX but breaks when they are equal. However, there is a simple solution for this we can amend the calculation X >= (RM  RM % N) as follows: – Ben Personick Oct 28 '17 at 14:56


I posted an additional answer explaining the problem in detail and giving the example code solution. – Ben Personick Oct 31 '17 at 12:08
Keep selecting a random is a good way to remove the bias.
Update
We could make the code fast if we search for an x in range divisible by n
.
// Assumptions
// rand() in [0, RAND_MAX]
// n in (0, RAND_MAX]
int x;
// Keep searching for an x in a range divisible by n
do {
x = rand();
} while (x >= RAND_MAX  (RAND_MAX % n))
x %= n;
The above loop should be very fast, say 1 iteration on average.

2Yuck :P converting to a double, then multiplying by MAX_UPPER_LIMIT/RAND_MAX is much cleaner and performs better. – boycy Jun 13 '12 at 7:59

21@boycy: you've missed the point. If the number of values that
rand()
can return is not a multiple ofn
, then whatever you do, you will inevitably get 'modulo bias', unless you discard some of those values. user1413793 explains that nicely (although the solution proposed in that answer is truly yucky). – TonyK Jun 17 '12 at 11:31 
4@TonyK my apologies, I did miss the point. Didn't think hard enough, and thought the bias would only apply with methods using an explicit modulus operation. Thanks for fixing me :) – boycy Jun 18 '12 at 12:26

Operator precedence makes
RAND_MAX+1  (RAND_MAX+1) % n
work correctly, but I still think it should be written asRAND_MAX+1  ((RAND_MAX+1) % n)
for clarity. – Linus Arver Oct 13 '12 at 5:07 
4This won't work if
RAND_MAX == INT_MAX
(as it does on most systems). See my second comment to @user1413793 above. – BlueRaja  Danny Pflughoeft Nov 6 '12 at 22:04
@user1413793 is correct about the problem. I'm not going to discuss that further, except to make one point: yes, for small values of n
and large values of RAND_MAX
, the modulo bias can be very small. But using a biasinducing pattern means that you must consider the bias every time you calculate a random number and choose different patterns for different cases. And if you make the wrong choice, the bugs it introduces are subtle and almost impossible to unit test. Compared to just using the proper tool (such as arc4random_uniform
), that's extra work, not less work. Doing more work and getting a worse solution is terrible engineering, especially when doing it right every time is easy on most platforms.
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 answerseeker, so I'm providing a knowngood implementation here.
Again, the best solution is just to use arc4random_uniform
on platforms that provide it, or a similar ranged solution for your platform (such as Random.nextInt
on Java). It will do the right thing at no code cost to you. This is almost always the correct call to make.
If you don't have arc4random_uniform
, then you can use the power of opensource to see exactly how it is implemented on top of a widerrange RNG (ar4random
in this case, but a similar approach could also work on top of other RNGs).
Here is the OpenBSD implementation:
/*
* Calculate a uniformly distributed random number less than upper_bound
* avoiding "modulo bias".
*
* Uniformity is achieved by generating new random numbers until the one
* returned is outside the range [0, 2**32 % upper_bound). This
* guarantees the selected random number will be inside
* [2**32 % upper_bound, 2**32) which maps back to [0, upper_bound)
* after reduction modulo upper_bound.
*/
u_int32_t
arc4random_uniform(u_int32_t upper_bound)
{
u_int32_t r, min;
if (upper_bound < 2)
return 0;
/* 2**32 % x == (2**32  x) % x */
min = upper_bound % upper_bound;
/*
* This could theoretically loop forever but each retry has
* p > 0.5 (worst case, usually far better) of selecting a
* number inside the range we need, so it should rarely need
* to reroll.
*/
for (;;) {
r = arc4random();
if (r >= min)
break;
}
return r % upper_bound;
}
It is worth noting the latest commit comment on this code for those who need to implement similar things:
Change arc4random_uniform() to calculate
2**32 % upper_bound'' as
upper_bound % upper_bound''. Simplifies the code and makes it the same on both ILP32 and LP64 architectures, and also slightly faster on LP64 architectures by using a 32bit remainder instead of a 64bit remainder.Pointed out by Jorden Verwer on tech@ ok deraadt; no objections from djm or otto
The Java implementation is also easily findable (see previous link):
public int nextInt(int n) {
if (n <= 0)
throw new IllegalArgumentException("n must be positive");
if ((n & n) == n) // i.e., n is a power of 2
return (int)((n * (long)next(31)) >> 31);
int bits, val;
do {
bits = next(31);
val = bits % n;
} while (bits  val + (n1) < 0);
return val;
}

Note that if
arcfour_random()
actually uses the real RC4 algorithm in its implementation, the output will definitely have some bias. Hopefully your library authors have switched to using a better CSPRNG behind the same interface. I recall one of the BSDs now actually uses the ChaCha20 algorithm to implementarcfour_random()
. More on the RC4 output biases which render it useless for security or other critical applications such as video poker: blog.cryptographyengineering.com/2013/03/… – rmalayter Aug 9 '16 at 1:38 
2@rmalayter On iOS and OS X, arc4random reads from /dev/random which is the highest quality entropy in the system. (The "arc4" in the name is historic and preserved for compatibility.) – Rob Napier Aug 9 '16 at 1:51

@Rob_Napier good to know, but
/dev/random
has also used RC4 on some platforms in the past (Linux uses SHA1 in counter mode). Unfortunately the man pages I found via search indicate that RC4 is still in use on various platforms that offerarc4random
(though the actual code may be different). – rmalayter Aug 9 '16 at 2:36 
1

@JonMcClung It's a very good question, but the answer is (surprisingly) no. This is a uint32_t, so if
x
is greater than 2^31,x
is actually positive (since it's evaluated as a signed integer in that context). Oh the glory of unsigned… As an example, 2147483650 evaluated as a UInt32 is 2147483646, and 4294967290 is 6. – Rob Napier Mar 8 at 21:46
Definition
Modulo Bias is the inherent bias in using modulo arithmetic to reduce an output set to a subset of the input set. In general, a bias exists whenever the mapping between the input and output set is not equally distributed, as in the case of using modulo arithmetic when the size of the output set is not a divisor of the size of the input set.
This bias is particularly hard to avoid in computing, where numbers are represented as strings of bits: 0s and 1s. Finding truly random sources of randomness is also extremely difficult, but is beyond the scope of this discussion. For the remainder of this answer, assume that there exists an unlimited source of truly random bits.
Problem Example
Let's consider simulating a die roll (0 to 5) using these random bits. There are 6 possibilities, so we need enough bits to represent the number 6, which is 3 bits. Unfortunately, 3 random bits yields 8 possible outcomes:
000 = 0, 001 = 1, 010 = 2, 011 = 3
100 = 4, 101 = 5, 110 = 6, 111 = 7
We can reduce the size of the outcome set to exactly 6 by taking the value modulo 6, however this presents the modulo bias problem: 110
yields a 0, and 111
yields a 1. This die is loaded.
Potential Solutions
Approach 0:
Rather than rely on random bits, in theory one could hire a small army to roll dice all day and record the results in a database, and then use each result only once. This is about as practical as it sounds, and more than likely would not yield truly random results anyway (pun intended).
Approach 1:
Instead of using the modulus, a naive but mathematically correct solution is to discard results that yield 110
and 111
and simply try again with 3 new bits. Unfortunately, this means that there is a 25% chance on each roll that a reroll will be required, including each of the rerolls themselves. This is clearly impractical for all but the most trivial of uses.
Approach 2:
Use more bits: instead of 3 bits, use 4. This yield 16 possible outcomes. Of course, rerolling anytime the result is greater than 5 makes things worse (10/16 = 62.5%) so that alone won't help.
Notice that 2 * 6 = 12 < 16, so we can safely take any outcome less than 12 and reduce that modulo 6 to evenly distribute the outcomes. The other 4 outcomes must be discarded, and then rerolled as in the previous approach.
Sounds good at first, but let's check the math:
4 discarded results / 16 possibilities = 25%
In this case, 1 extra bit didn't help at all!
That result is unfortunate, but let's try again with 5 bits:
32 % 6 = 2 discarded results; and
2 discarded results / 32 possibilities = 6.25%
A definite improvement, but not good enough in many practical cases. The good news is, adding more bits will never increase the chances of needing to discard and reroll. This holds not just for dice, but in all cases.
As demonstrated however, adding an 1 extra bit may not change anything. In fact if we increase our roll to 6 bits, the probability remains 6.25%.
This begs 2 additional questions:
 If we add enough bits, is there a guarantee that the probability of a discard will diminish?
 How many bits are enough in the general case?
General Solution
Thankfully the answer to the first question is yes. The problem with 6 is that 2^x mod 6 flips between 2 and 4 which coincidentally are a multiple of 2 from each other, so that for an even x > 1,
[2^x mod 6] / 2^x == [2^(x+1) mod 6] / 2^(x+1)
Thus 6 is an exception rather than the rule. It is possible to find larger moduli that yield consecutive powers of 2 in the same way, but eventually this must wrap around, and the probability of a discard will be reduced.
Without offering further proof, in general using double the number of bits required will provide a smaller, usually insignificant, chance of a discard.
Proof of Concept
Here is an example program that uses OpenSSL's libcrypo to supply random bytes. When compiling, be sure to link to the library with lcrypto
which most everyone should have available.
#include <iostream>
#include <assert.h>
#include <limits>
#include <openssl/rand.h>
volatile uint32_t dummy;
uint64_t discardCount;
uint32_t uniformRandomUint32(uint32_t upperBound)
{
assert(RAND_status() == 1);
uint64_t discard = (std::numeric_limits<uint64_t>::max()  upperBound) % upperBound;
uint64_t randomPool = RAND_bytes((uint8_t*)(&randomPool), sizeof(randomPool));
while(randomPool > (std::numeric_limits<uint64_t>::max()  discard)) {
RAND_bytes((uint8_t*)(&randomPool), sizeof(randomPool));
++discardCount;
}
return randomPool % upperBound;
}
int main() {
discardCount = 0;
const uint32_t MODULUS = (1ul << 31)1;
const uint32_t ROLLS = 10000000;
for(uint32_t i = 0; i < ROLLS; ++i) {
dummy = uniformRandomUint32(MODULUS);
}
std::cout << "Discard count = " << discardCount << std::endl;
}
I encourage playing with the MODULUS
and ROLLS
values to see how many rerolls actually happen under most conditions. A sceptical person may also wish to save the computed values to file and verify the distribution appears normal.

I really hope nobody has blindly copied your uniform random implementation. The
randomPool = RAND_bytes(...)
line will always result inrandomPool == 1
due to the assertion. This always results in a discard and a reroll. I think you wanted to declare on a separate line. Consequently, this caused the RNG to return with1
for every iteration. – Qix Dec 22 '17 at 3:31 
To be clear,
randomPool
will always evaluate to1
according to the OpenSSL documentation forRAND_bytes()
since it will always succeed thanks to theRAND_status()
assertion. – Qix Dec 22 '17 at 3:37
There are two usual complaints with the use of modulo.
one is valid for all generators. It is easier to see in a limit case. If your generator has a RAND_MAX which is 2 (that isn't compliant with the C standard) and you want only 0 or 1 as value, using modulo will generate 0 twice as often (when the generator generates 0 and 2) as it will generate 1 (when the generator generates 1). Note that this is true as soon as you don't drop values, whatever the mapping you are using from the generator values to the wanted one, one will occurs twice as often as the other.
some kind of generator have their less significant bits less random than the other, at least for some of their parameters, but sadly those parameter have other interesting characteristic (such has being able to have RAND_MAX one less than a power of 2). The problem is well known and for a long time library implementation probably avoid the problem (for instance the sample rand() implementation in the C standard use this kind of generator, but drop the 16 less significant bits), but some like to complain about that and you may have bad luck
Using something like
int alea(int n){
assert (0 < n && n <= RAND_MAX);
int partSize =
n == RAND_MAX ? 1 : 1 + (RAND_MAXn)/(n+1);
int maxUsefull = partSize * n + (partSize1);
int draw;
do {
draw = rand();
} while (draw > maxUsefull);
return draw/partSize;
}
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().

n == RAND_MAX ? 1 : (RAND_MAX1)/(n+1): I understand the idea here is to first divide RAND_MAX into equal page size N, then return the deviation within N, but I cannot map the code to this precisely. – zinking Jun 15 '12 at 3:18

1The naive version should be (RAND_MAX+1)/(n+1) as there is RAND_MAX+1 values to divide in n+1 buckets. If order to avoid overflow when computing RAND_MAX+1, it can be transformed in 1+(RAND_MAXn)/(n+1). In order to avoid overflow when computing n+1, the case n==RAND_MAX is first checked. – AProgrammer Jun 15 '12 at 6:42

+plus, doing divide is seeming costing more even compared with regenerate numbers. – zinking Jun 15 '12 at 8:56

4Taking the modulo and dividing have the same cost. Some ISA even provide just one instruction which provide always both. The cost of regenerating numbers will depend on n and RAND_MAX. If n is small in respect to RAND_MAX, it may cost a lot. And obviously you may decide the the biases isn't important for your application; I just give a way to avoid them. – AProgrammer Jun 15 '12 at 9:10
Mark's Solution (The accepted solution) is Nearly Perfect.
int x; do { x = rand(); } while (x >= (RAND_MAX  RAND_MAX % n)); x %= n;
edited Mar 25 '16 at 23:16
Mark Amery 39k21170211
However, it has a caveat which discards 1 valid set of outcomes in any scenario where RAND_MAX (RM) is 1 less than a multiple of N (Where N = the Number of possible valid outcomes).
ie, When the 'count of values discarded' (D) is equal to N, then they are actually a valid set (V), not an invalid set (I).
Using Mark's Solution, Values are Discarded when: X => RM  RM % N
EG:
Ran Max Value (RM) = 255
Valid Outcome (N) = 4
When X => 252, Discarded values for X are: 252, 253, 254, 255
So, if Random Value Selected (X) = {252, 253, 254, 255}
Number of discarded Values (I) = RM % N + 1 == N
IE:
I = RM % N + 1
I = 255 % 4 + 1
I = 3 + 1
I = 4
X => ( RM  RM % N )
255 => (255  255 % 4)
255 => (255  3)
255 => (252)
Discard Returns $True
As you can see in the example above, when the value of X (the random number we get from the initial function) is 252, 253, 254, or 255 we would discard it even though these four values comprise a valid set of returned values.
IE: When the count of the values Discarded (I) = N (The number of valid outcomes) then a Valid set of return values will be discarded by the original function.
If we describe the difference between the values N and RM as D, ie:
D = (RM  N)
Then as the value of D becomes smaller, the Percentage of unneeded rerolls due to this method increases at each natural multiplicative. (When RAND_MAX is NOT equal to a Prime Number this is of valid concern)
EG:
RM=255 , N=2 Then: D = 253, Lost percentage = 0.78125%
RM=255 , N=4 Then: D = 251, Lost percentage = 1.5625%
RM=255 , N=8 Then: D = 247, Lost percentage = 3.125%
RM=255 , N=16 Then: D = 239, Lost percentage = 6.25%
RM=255 , N=32 Then: D = 223, Lost percentage = 12.5%
RM=255 , N=64 Then: D = 191, Lost percentage = 25%
RM=255 , N= 128 Then D = 127, Lost percentage = 50%
Since the percentage of Rerolls needed increases the closer N comes to RM, this can be of valid concern at many different values depending on the constraints of the system running he code and the values being looked for.
To negate this we can make a simple amendment As shown here:
int x;
do {
x = rand();
} while (x > (RAND_MAX  ( ( ( RAND_MAX % n ) + 1 ) % n) );
x %= n;
This provides a more general version of the formula which accounts for the additional peculiarities of using modulus to define your max values.
Examples of using a small value for RAND_MAX which is a multiplicative of N.
Mark'original Version:
RAND_MAX = 3, n = 2, Values in RAND_MAX = 0,1,2,3, Valid Sets = 0,1 and 2,3.
When X >= (RAND_MAX  ( RAND_MAX % n ) )
When X >= 2 the value will be discarded, even though the set is valid.
Generalized Version 1:
RAND_MAX = 3, n = 2, Values in RAND_MAX = 0,1,2,3, Valid Sets = 0,1 and 2,3.
When X > (RAND_MAX  ( ( RAND_MAX % n ) + 1 ) % n )
When X > 3 the value would be discarded, but this is not a vlue in the set RAND_MAX so there will be no discard.
Additionally, in the case where N should be the number of values in RAND_MAX; in this case, you could set N = RAND_MAX +1, unless RAND_MAX = INT_MAX.
Loopwise you could just use N = 1, and any value of X will be accepted, however, and put an IF statement in for your final multiplier. But perhaps you have code that may have a valid reason to return a 1 when the function is called with n = 1...
So it may be better to use 0, which would normally provide a Div 0 Error, when you wish to have n = RAND_MAX+1
Generalized Version 2:
int x;
if n != 0 {
do {
x = rand();
} while (x > (RAND_MAX  ( ( ( RAND_MAX % n ) + 1 ) % n) );
x %= n;
} else {
x = rand();
}
Both of these solutions resolve the issue with needlessly discarded valid results which will occur when RM+1 is a product of n.
The second version also covers the edge case scenario when you need n to equal the total possible set of values contained in RAND_MAX.
The modified approach in both is the same and allows for a more general solution to the need of providing valid random numbers and minimizing discarded values.
To reiterate:
The Basic General Solution which extends mark's example:
int x;
do {
x = rand();
} while (x > (RAND_MAX  ( ( ( RAND_MAX % n ) + 1 ) % n) );
x %= n;
The Extended General Solution which Allows one additional scenario of RAND_MAX+1 = n:
int x;
if n != 0 {
do {
x = rand();
} while (x > (RAND_MAX  ( ( ( RAND_MAX % n ) + 1 ) % n) );
x %= n;
} else {
x = rand();
}
With a RAND_MAX
value of 3
(in reality it should be much higher than that but the bias would still exist) it makes sense from these calculations that there is a bias:
1 % 2 = 1
2 % 2 = 0
3 % 2 = 1
random_between(1, 3) % 2 = more likely a 1
In this case, the % 2
is what you shouldn't do when you want a random number between 0
and 1
. You could get a random number between 0
and 2
by doing % 3
though, because in this case: RAND_MAX
is a multiple of 3
.
Another method
There is much simpler but to add to other answers, here is my solution to get a random number between 0
and n  1
, so n
different possibilities, without bias.
 the number of bits (not bytes) needed to encode the number of possibilities is the number of bits of random data you'll need
 encode the number from random bits
 if this number is
>= n
, restart (no modulo).
Really random data is not easy to obtain, so why use more bits than needed.
Below is an example in Smalltalk, using a cache of bits from a pseudorandom number generator. I'm no security expert so use at your own risk.
next: n
 bitSize r from to 
n < 0 ifTrue: [^0  (self next: 0  n)].
n = 0 ifTrue: [^nil].
n = 1 ifTrue: [^0].
cache isNil ifTrue: [cache := OrderedCollection new].
cache size < (self randmax highBit) ifTrue: [
Security.DSSRandom default next asByteArray do: [ :byte 
(1 to: 8) do: [ :i  cache add: (byte bitAt: i)]
]
].
r := 0.
bitSize := n highBit.
to := cache size.
from := to  bitSize + 1.
(from to: to) do: [ :i 
r := r bitAt: i  from + 1 put: (cache at: i)
].
cache removeFrom: from to: to.
r >= n ifTrue: [^self next: n].
^r
As the accepted answer indicates, "modulo bias" has its roots in the low value of RAND_MAX
. He uses an extremely small value of RAND_MAX
(10) to show that if RAND_MAX were 10, then you tried to generate a number between 0 and 2 using %, the following outcomes would result:
rand() % 3 // if RAND_MAX were only 10, gives
output of rand()  rand()%3
0  0
1  1
2  2
3  0
4  1
5  2
6  0
7  1
8  2
9  0
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 RAND_MAX
is small. Or more specifically, when the number your are modding by is large compared to RAND_MAX
.
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 MersenneTwister::genrand_int32() % 10
for all intents and purposes, will be equally distributed and the modulo bias effect will all but disappear.

3Yours is more efficient and it probably is true that if RAND_MAX is significantly bigger then the number you are modding by, however yours will still be biased. Granted these are all pseudo random number generators anyways and that in and of itself is a different topic but if you assume a fully random number generator, your way still biases the lower values. – user1413793 Apr 16 '13 at 3:09

Because the highest value is odd,
MT::genrand_int32()%2
picks 0 (50 + 2.3e8)% of the time and 1 (50  2.3e8)% of the time. Unless you're building a casino's RGN (which you probably would use a much larger range RGN for), any user is not going to notice an extra 2.3e8% of the time. You're talking about numbers too small to matter here. – bobobobo Apr 16 '13 at 4:08 
7Looping is the best solution. It is not "insanely inefficient"; requiring less than twice the iterations in worst average case. Using a high
RAND_MAX
value will decrease the modulo bias, but not eliminate it. Looping will. – Jared Nielsen Jul 3 '13 at 16:22 
4If
RAND_MAX
is sufficiently bigger than the number you are modding by, the number of times you need to regenerate the random number is vanishingly small and won't affect the efficiency. I say keep the looping, as long as you're testing against the largest multiple ofn
rather than justn
as proposed by the accepted answer. – Mark Ransom Apr 8 '15 at 1:08
I just wrote a code for Von Neumann's Unbiased Coin Flip Method, that should theoretically eliminate any bias in the random number generation process. More info can be found at (http://en.wikipedia.org/wiki/Fair_coin)
int unbiased_random_bit() {
int x1, x2, prev;
prev = 2;
x1 = rand() % 2;
x2 = rand() % 2;
for (;; x1 = rand() % 2, x2 = rand() % 2)
{
if (x1 ^ x2) // 01 > 1, or 10 > 0.
{
return x2;
}
else if (x1 & x2)
{
if (!prev) // 0011
return 1;
else
prev = 1; // 1111 > continue, bias unresolved
}
else
{
if (prev == 1)// 1100
return 0;
else // 0000 > continue, bias unresolved
prev = 0;
}
}
}

This doesn't address modulo bias. This process could be used to eliminate bias in a bit stream. However, to get from a bit stream to an even distribution from 0 to n where n is not one less than a power of two requires addressing modulo bias. Thus this solution cannot eliminate any bias in the random number generation process. – Rick Aug 5 '15 at 13:06

1@Rick hmm. The logical extension of Von Neumann's method to eliminating modulo bias when generating a random number between, say, 1 and 100, would be: A) call
rand() % 100
100 times. B) if all the results are different, take the first one. C) otherwise, GOTO A. This will work, but with an expected number of iterations of about 10^42, you will have to be quite patient. And immortal. – Mark Amery Mar 27 '16 at 11:25 
@MarkAmery Indeed that should work. Looking over this algorithm though it's not correctly implemented. The first else should be:
else if(prev==2) prev= x1; else { if(prev!=x1) return prev; prev=2;}
– Rick Mar 28 '16 at 12:58