permutations with repeats algorithm with recursion

I'm having some trouble getting this to work using one function, instead of having to use many.

If I want to get permutations with repeats like 2^3. permutations with repeats

to get:

``````000
001
101
011
100
101
110
111
``````

I can have this function:

``````   static void Main(string[] args)
{
three_permutations(2);
}

static void three_permutations(int y)
{

for (int aa = 0; aa < y; aa++)
{
for (int bb = 0; bb < y; bb++)
{
for (int cc = 0; cc < y; cc++)
{
Console.Write((aa));
Console.Write((bb));
Console.Write((cc));
Console.WriteLine();
}
}
}

}
``````

But then to do 4 (like 2^4), the only way I can think is this:

``````  static void four_permutations(int y)
{
for (int aa = 0; aa < y; aa++)
{
for (int bb = 0; bb < y; bb++)
{
for (int cc = 0; cc < y; cc++)
{
for (int dd = 0; dd < y; dd++)
{
Console.Write((aa));
Console.Write((bb));
Console.Write((cc));
Console.Write((dd));
Console.WriteLine();
}
}
}
}
}
``````

but I'm sure there's a better way using recursion I'm just not sure how to do it. I appreciate any help. Thanks.

``````void permutations(string text, int numberOfDigits, int numberOfChars)
{
if (numberOfDigits > 0)
for (int j = 0; j < numberOfChars; j++)
permutations(text + j.ToString(), numberOfDigits - 1, numberOfChars);
else textBox1.Text += text + "\r\n";
}
``````

and call:

``````permutations("", 3, 2);
``````
• Beautiful. Thanks for the help. – marseilles84 Oct 9 '12 at 16:42
• @ispiro Good one – Shrivallabh May 5 '15 at 9:59
• what is that `textBox1.Text`? – fubo Jul 27 '15 at 13:36
• @fubo It's the text in a Winforms textbox. You can use any other way to show the results. Like `Console.Writeline` for example. – ispiro Jul 27 '15 at 17:32

Permutations with repetition is essentially counting in another base.

``````public static void Permutations(int digits, int options)
{
double maxNumberDouble = Math.Ceiling(Math.Pow(options, digits));
int maxNumber = (int)maxNumberDouble;
for (int i = 0; i < maxNumber; i++)
{
}
}
``````

The example that you've printed is essentially counting from 0 to 8 in base 2.

• This sample does not account for repeated permutations. Each counted number will be unique. – Joel Etherton Oct 9 '12 at 16:28
• @JoelEtherton No...the result of, for example, 8 printed as a string in base two is `111`, which repeats 1 three times. This is relying on the fact that taking a number of different values (here `options` is the number of choices) n times (where n here is `digits`) results in `options ^ digits` possibilities; this lists out each of those possibilities. – Servy Oct 9 '12 at 16:35

Without recursion, and to a list for later use, in less than 10 lines.

``````public IEnumerable<List<int>> YieldCombinationsOfN(int places, int digitMin, int digitMax)
{
int n = digitMax - digitMin + 1;
int numericMax = (int)Math.Pow(n, places);

for (int i = 0; i < numericMax; i++)
{
List<int> li = new List<int>(places);
for(int digit = 0; digit < places; digit++)
{
li.Add(((int)(i / Math.Pow(n, digit)) % n) + digitMin);
}
yield return li;
}
}
``````