I've got this - possibly trivial - loop/combinations problem similar to binary combinations. I don't know how to approach it efficiently. Consider this scenario, I need unique loop to pass through all these combinations in a sequence:

```
Round ABC
01. 000 <- values of A=0, B=0, C=0
02. 001
03. 010
04. 011
05. 100
06. 101
07. 110
08. 111
09. 002
10. 012
11. 102
12. 112
13. 020
14. 021
15. 120
16. 121 <- values of A=1, B=2, C=1
17. 022
18. 122
19. 220
20. 221
21. 222
```

Except there are 12 letters (A-L), and also the "bit" size is not just 0,1 or 2 but any integer number (from 0 possibly up-to 1000 or 1024, not to make it crazy). I know it's a huge load of combinations, but I'll just scrap just top few that also fulfill my other conditions. So no need to worry about computational madness.

Disclaimer: The order has to be exactly as shown above. NOT a multiple FOR loops going first 0-1024 for C, then B.

Thanks in advance, I just can't seem to find the way to "algorithm it".

Update: Added whole sequence for combinations of ABC/012

regards, Kate

Explanation:

I've encountered this problem when trying to tackle problem of analyzing sum of money for its combination of coins/notes:

For example $5001 to find out x optimal combinations.

```
10x $500 + 1x $1
50x $100 + 1x $1
..
```

Now letters (A,B,C..) correspond to a number of possible values of banknotes or coins ($1, $5,.. $100). While base correspond to a number of pieces of that banknotes/coins (for example $5001/$5000 = 1piece max.)