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There are some similar questions on the site that have been of some help, but I can't quite nail down this problem, so I hope this is not repetitive.

This is a homework assignment where you have a set array of characters [A, B, C], and must use recursion to get all permutations (with repetition). The code I have sort of does this:

char[] c = {'A', 'B' , 'C'};

public void printAll(char[] c, int n, int k) {
    if (k == n) {
    else {   
      for (int j = 0; j<n; j++) {
        for (int m = 0; m<n; m++) {
           System.out.print(c[m] + "\r\n");
    printAll(c, n, k+1);    

However, the parameter n should define the length of the output, so while this function prints out all permutations of length 3, it cannot do them of length 2. I have tried everything I can think of, and have pored over Google search results, and I am aggravated with myself for not being able to solve what seems to be a rather simple problem.

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What does "with repetition" mean here? – seh Oct 31 '12 at 14:14
It just means that once a character is used, it can be used again. So the number of possible outputs is 3^3, and not 3!. – user1788424 Oct 31 '12 at 21:40
up vote 5 down vote accepted

If I understand correctly, you are given a set of characters c and the desired length n.

Technically, there's no such thing as a permutation with repetition. I assume you want all strings of length n with letters from c.

You can do it this way:

to generate all strings of length N with letters from C
 -generate all strings of length N with letters from C
     that start with the empty string.

to generate all strings of length N with letters from C
   that start with a string S
 -if the length of S is N
  -print S
 -else for each c in C
  -generate all strings of length N with letters from C that start with S+c

In code:

printAll(char[] c, int n, String start){
  if(start.length >= n){
    for(char x in c){ // not a valid syntax in Java
      printAll(c, n, start+x);
share|improve this answer
You, sir, are not just a gentleman and a scholar. You are a prince, a gentleman, and a scholar. Some other people online suggested something similar, except using an array and not a string. However, your explanation was much clearer. – user1788424 Oct 31 '12 at 21:35
And for reference, if anyone is interested, here is the final function, where the n parameter controls the length of each line that is printed: public void printAll3(char[] c, int n, int k, String s) { if (s.length() >=n) {System.out.print(s + "\r\n"); return;} else if (k<n) {for (int i = 0; i< c.length; i++) { printAll3(c, n, k+1, s + c[i]); //System.out.print(s); } } } – user1788424 Oct 31 '12 at 21:37
@JanDvorak I know this is old but I had a similar problem I was trying to solve and I modified this and it totally worked.However I don't understand how your final call printAll(c,n,start+x) works. I printed it out and start goes like this for the first few calls (a, aa, aaa, aab, aac, ab, aba). I don't really understand why it doesn't end up being (abc, abcabc, abcabcabc). I was hoping you could explain it. I have been trying to trace it and I understand that each time print all calls itself inside the loop it calls itself n more times. Anyway if you could I would like some more explaination. – MichelleJS Jul 28 '13 at 19:59
@MichelleJS why would it be abcabcabc? You are adding a single character to start, then later backtracking and adding different one on the same place. In the first call (start == ""): start.length == 0, so it goes to the else branch. The first character of C is a, so x == 'a' in the first iteration. "" + 'a' == "a", so the first recursive call is to printAll("abc", 3, "a"). The behavior you describe would occur if you were doing printAll(c, n, start+c) inside the loop - in which case x would end up unused. – Jan Dvorak Jul 29 '13 at 0:25
Thankyou very much. I drew it all out on a piece of paper in order to understand. I now have to do the other the same thing without repetition. I'm not sure how to modify this code to do that but this has been a very good start. – MichelleJS Jul 29 '13 at 5:39

I just had an idea. What if you added a hidden character (H for hidden) [A, B, C, H], then did all the fixed length permutations of it (you said you know how to do that). Then when you read it off, you stop at the hidden character, e.g. [B,A,H,C] would become (B,A).

Hmm, the downside is that you would have to track which ones you created though [B,H,A,C] is the same as [B,H,C,A]

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If I understand the problem correctly, the required length of permutation is given – Jan Dvorak Oct 31 '12 at 12:20

Here is c# version to generate the permutations of given string with repetitions:

(essential idea is - number of permutations of string of length 'n' with repetitions is n^n).

string[] GetPermutationsWithRepetition(string s)
            List<string> permutations = new List<string>();
            this.GetPermutationsWithRepetitionRecursive(s, "",
            return permutations.ToArray();
        void GetPermutationsWithRepetitionRecursive(string s, string permutation, List<string> permutations)
            if(permutation.Length == s.Length)
            for(int i =0;i<s.Length;i++)
                this.GetPermutationsWithRepetitionRecursive(s, permutation + s[i], permutations);

Below are the corresponding unit tests:

        public void PermutationsWithRepetitionTests()
            string s = "";
            int[] output = { 1, 4, 27, 256, 3125 };
            for(int i = 1; i<=5;i++)
                s += i;
                var p = this.GetPermutationsWithRepetition(s);
                Assert.AreEqual(output[i - 1], p.Length);
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