# Evenly distributed random numbers relatively prime to 2

## A specific example

I need to generate a random number between 0 and 2, inclusive. (or choose randomly between -1, 0, and 1).

The naive approach would be to do something like `rand() mod 3` where `rand()` returns an integer. This approach will not generate statistically random numbers unless the upper bound of `rand()` is not relatively prime (and the lower bound is 0).

For instance, assuming rand() returned 2 bits (from 0 to 3, inclusive), the modulus would map:

0 -> 0
1 -> 1
2 -> 2
3 -> 0

This skew toward 0 would obviously be much less if more bits would be returned, but regardless, the skew would remain.

## The generic question

Is there a way of generating an evenly distributed random number between 0 and n-1, inclusive, where n is relatively prime to 2?

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A common approach is to discard random values above the last full cycle, and just ask for a new random number.

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It might help choosing your rand() upper bound to be k*n where k is an integer. This way the outcome will be evenly distributed provided that rand() is a good random generator.

If it's not possible to reduce the upper bound, you can pick k so that k*n is as close to rand() upper bound as possible and discard the results above this number trying again.

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See my answer to a similar question.

Basically, use your RNG and discard everything above N and try again. For optimization, you can use mod, and discard everything above n * floor(MAX / n)

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