You might be able to use a binomial distribution, if you're happy with the shape of that distribution. Set n=12 and p=0.25. This will give you a value between 0 and 12 with a mean of 3. Just add 2 to each result to get the range and mean you are looking for.

**Edit:** As for implementation, you can probably find a library for your chosen language that supports non-uniform distributions (I've written one myself for Java).

A binomial distribution can be approximated fairly easily using a uniform RNG. Simply perform *n* trials and record the number of successes. So if you have n=10 and p=0.5, it's just like flipping a coin 10 times in a row and counting the number of heads. For p=0.25 just generate uniformly-distributed values between 0 and 3 and only count zeros as successes.

If you want a more efficient implementation, there is a clever algorithm hidden away in the exercises of volume 2 of Knuth's The Art of Computer Programming.

`{0, 1, 2}`

with 1 mean. Now take a look at these two generators:`Generator1 (0: 40%, 1: 20%, 2: 40%)`

,`Generator2 (0:10%, 1: 80%, 2:10%)`

. For both of them average result would be 1. – Grzegorz Oledzki Oct 7 '09 at 21:38