# How to get all possible classes combinations in C#

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Let say we have the fallowing classes 'X','Y','Z', The result so I need will be like this

``````(X),(X,Y),(X,Z),(X,Y,Z),(Y),(Y,Z),(Z)
``````

And if we have 'X','Y','Z','J', The result so I need will be like this

``````(X), (X,Y),(X,Z),(X,J), (Y), (Y,Z),(Y,J), (Z),(Z,J)
(X,Y,Z), (X,Y,Z,J), (Y,Z,J), (Z,J,X)
``````

What algorithm do I need to accomplish this?

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Are you talking about Classes? As in C# classes? I'm guessing not, but it's not clear from your question. Sounds a bit homeworky. – Cylindric May 1 '12 at 9:47
There are a few algorithms including implementations here: stackoverflow.com/questions/999050/… – kuba May 1 '12 at 9:49
Why are `(J)` and `(X, Y, Z)` not on your second list? – Eric Lippert May 1 '12 at 13:24
I guess so was forgotten... BTW: (X,Y,Z) exists on second list – yytg May 1 '12 at 17:51

What you are looking for is called a power set. There are both recursive and iterative ways to calculate it; it should not be difficult to google one.

Have a try at implementing an algorithm and come back to update the question if you have specific trouble.

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If that is a power set, you missed out the empty set (which is always a member of a power set, of course!).

Anyway, something like this might work for you:

``````using System;
using System.Collections.Generic;
using System.Linq;

namespace Demo
{
class Program
{
static void Main()
{
string[] classes = {"X", "Y", "Z"};

foreach (var combination in PowerSet(classes))
{
foreach (var item in combination)
{
Console.Write(item + ", ");
}

Console.WriteLine("");
}
}

public static IEnumerable<IEnumerable<T>> PowerSet<T>(T[] sequence)
{
return from m in Enumerable.Range(0, 1 << sequence.Length)
select
from i in Enumerable.Range(0, sequence.Length)
where (m & (1 << i)) != 0
select sequence[i];
}
}
}
``````

This algorithm works by "pretending" that the combinations are binary numbers. See http://en.wikipedia.org/wiki/Power_set for details (especially the section titled "Representing subsets as functions").

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