# Generate all unique permutations

I am working on a problem in which I am given a number and need to find every possible permutation of the digits in that number. For example, if I am given `20`, the answer would be: `20` and `02`. I know that there are `n!` possible permutations, and I have divided up the numbers so that each digit is an element in an array. My question is: How can I loop through this array to generate every possible combination of a number that is at least 2 digits long but no more than 6.

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What if the number is '22'? –  ArjunShankar Feb 23 '12 at 15:18
Sorry, I don't understand much your question. If you give a number 20, so the answer something would be: 20,02,220,200,000,....222222,000000 ? –  hqt Feb 23 '12 at 15:19
Would you mind working on accept rate by accepting answers?? –  Fahim Parkar Feb 23 '12 at 15:20
To clarify, I am saying that I want to generate every possible combination of a group of numbers. If the given number was 1234, I need to generate 1234, 1243, 1432, 4213, etc. until every possible combination has been generated. –  gmaster Feb 23 '12 at 15:25
See the similar thread - Algorithm to return all combinations of k elements from n. –  Dmytro Chyzhykov Feb 23 '12 at 15:32
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Say the `n` individual digits are in an array of length `n`. Then the problem of generating the permutations boils down to:

1. Choosing one of the `n` digits as the first digit to print.
2. Permuting the remaining `n-1` digits.

A recursion.

The pseudocode for such a recursive function `permute` would be something like:

``````List permute (Array digits)
{
List permutations = /* initialize an empty list */

for (i=0; i<n; i++)
{
firstDigit = digit[i];
Array otherDigits = /* array containing all digits except firstDigit.  */
List subPermutations = permute(otherDigits);
/* prepend firstDigit into each element of 'subPermutations' */
/* add all elements of 'subPermutations' to the list 'permutations' */
}
return permutations;
}
``````

Then simply call `permute` and print out the list, or do whatever else with it.

EDIT: You also need to handle the edge case of `permute`ing 1 digit.

I think this is already too much information for 'homework' :)

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What do you mean "prepend firstDigit into each element of 'subPermutations'"? I don't see how this would get every possible permutation. –  gmaster Feb 23 '12 at 15:42
@gmaster - pastebin.com/5w7GE5iQ –  ArjunShankar Feb 23 '12 at 15:55
prepend means add at the beginning. I didn't see how I could explain this in a comment, and I didn't consider it worth putting it in the answer. So read the above pastepin URL (which is set to expire in 1 month) –  ArjunShankar Feb 23 '12 at 15:56