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I'm making a password brute forcing tool as a learning exercise, and I want it to be resumable.

So, what I want is to be able to say, this is the set of possible characters, if I computed the Cartesian set of every possible combination of this set up to length n, what is the set at point x?

However, I want to do this without computing the entire set. I've seen similar logic in one place online but I was unable to generalise this to fit.

Any help would be fantastic, thanks! I'm fluent in C# if that helps.

Edit: Here's the question I mentioned earlier: How to select specific item from cartesian product without calculating every other item

Edit: here's an example of what I mean:

Char set = [abcd]

Length n = 4



So if I'm searching for the set at 4, I'd get [aaad]. But if I'm searching for element 7000, then it takes a long time to get to that point.

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1 Answer 1

up vote 1 down vote accepted

This implements the answer to the question you link:

static string Get(string chars, int n, int i)
    string ret = "";
    int sizes = 1;
    for (int j = 0; j < n; j++) {
        ret = chars[(i / sizes) % chars.Length] + ret;
        sizes *= chars.Length;
    return ret;


string chars = "abcd";
int n = 3;

for (int i = 0; i < Math.Pow(chars.Length, n); i++)
    Console.WriteLine(i + "\t" + Get(chars, n, i));
0       aaa
1       aab
2       aac
3       aad
61      ddb
62      ddc
63      ddd
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@downvoter, care to comment? –  Julián Urbano Mar 8 '14 at 14:01
Thanks for this, it's perfect, exactly what I was after! I can't upvote you until I have 15 rep, but I marked you as correct, I hope that's okay? –  Transmission Mar 8 '14 at 16:36
@Transmission sure, that's fine. I'd just still like the downvoter to explain... –  Julián Urbano Mar 8 '14 at 19:24
By the way, when I'm running your method with a char length of 62, an n of 900000, and an i of 500,000,000, it's taking about 23 minutes to complete, if that reasonable, or do you think I've introduced a bug? –  Transmission Mar 8 '14 at 20:01
@Transmission 23 minutes for a single call to the method? –  Julián Urbano Mar 8 '14 at 20:07

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