I'm making a music generation program and need a set of x random numbers selected from 0.125, 0.25 and 0.5 which add up to 1. I can't think of a neat way of doing this which also preserves the random element.
Thanks!

There are 9 combinations which add up to 1. If you don't care about order at all, then you can just pick a random number between 1 & 9.
If you care about order, then you want permutations. The set {.5, .25, .25} has 3! permutations:
However, you may only want the unique permutations to count.
For each of the sets, you could use an algorithm like this to generate the unique permutations. http://www.kerrywong.com/2006/04/14/generatinguniquepermutationsprogrammatically/ Once you know all the permutations (or unique permutations), you could then use a random number to select one of the permutations. 


Just enumerate all possible combinations that sum up to 1 (it's not that many), and store them in an array. Then just calculate a random index number for that array to get a random combination. 


If you care about extending the values later, you may want to consider a more dynamic approach. Avoid hardcoding values and logic. A solution like the following may help. In the below example, the max value 1 is configurable, as are the set of values which can be used to add up to the max. Load your list (from file or input) and then the program can run. This assumes your list was sorted from lowest to highest values before running.



Create an array that stores those three doubles: .125, .25, .5. Then generate a number 13, index into the array with it, and compare the result + your total so far to 1. If less, add them and continue. If equal, stop the program. If greater, generate another random index. 


an iterative solution, which can easily be generalized if number of possibilities is too large.
java code:


