# Combination Algorithm in Excel VBA

I need an algorithm which generates all possible combination of a set number and output all of them onto Excel spreadsheet.

For example, with n = 5(1,2,3,4,5) and r = 2(created a small gui for this), it will generate all possible combinations and output them into excel spreadsheet like this...

``````1,2
1,3
1,4
...
``````

The order in which it prints doesn't matter. It can first print (5,1), then (1,2). Can anyone show me how to do this?

Thank you very much.

-
Is order important? Is 5,1 the same as 1,5 ? –  Tim Williams Aug 25 '11 at 23:29
If order (as Tim asked it) is important, then "all possible combinations" can grow quickly. If n and r are both 8, that's factorial 8, or over 40,000 permutations. Do you have a limit for n in mind? –  Doug Glancy Aug 26 '11 at 0:18
Yes the order is important. Sorry for not putting that in. 1,5 is same as 5,1. –  js0823 Aug 26 '11 at 0:42
No I don't have limits for n or r. I want to make it dynamic so any user can put in any number and it will generate the spreadsheet with all possible combinations. –  js0823 Aug 26 '11 at 0:50
Can't believe nobody has asked this one yet: Have you tried anything yourself? The answer is basically two nested `For Next` loops. –  Jean-François Corbett Aug 26 '11 at 7:07

``````Option Explicit

Private c As Integer

Sub test_print_nCr()
print_nCr 5, 3, Range("A1")
End Sub

Function print_nCr(n As Integer, r As Integer, p As Range)
c = 1
internal_print_nCr n, r, p, 1, 1
End Function

Private Function internal_print_nCr(n As Integer, r As Integer, ByVal p As Range, Optional i As Integer, Optional l As Integer) As Integer

' n is the number of items we are choosing from
' r is the number of items to choose
' p is the upper corner of the output range
' i is the minimum item we are allowed to pick
' l is how many levels we are in to the choosing
' c is the complete set we are working on

If n < 1 Or r > n Or r < 0 Then Err.Raise 1
If i < 1 Then i = 1
If l < 1 Then l = 1
If c < 1 Then c = 1
If r = 0 then
p = 1
Exit Function
End If

Dim x As Integer
Dim y As Integer

For x = i To n - r + 1
If r = 1 Then
If c > 1 Then
For y = 0 To l - 2
If p.Offset(c - 1, y) = "" Then p.Offset(c - 1, y) = p.Offset(c - 2, y)
Next
End If
p.Offset(c - 1, l - 1) = x
c = c + 1
Else
p.Offset(c - 1, l - 1) = x
internal_print_nCr n, r - 1, p, x + 1, l + 1
End If
Next

End Function
``````
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Are you using recursion for this incredibly simple task?! –  Jean-François Corbett Aug 26 '11 at 7:08
Recursion is not complicated so I don't understand the premise of your question. Besides, if r was always 2 then this would be a trivial task, but r can be any integer between 0 and n. Where is your solution? –  adamleerich Aug 26 '11 at 11:17
My bad, I misread the question. I actually like your idea. +1 –  Jean-François Corbett Aug 26 '11 at 14:34
Thanks! Now I just need to figure out how to print them on one cells each. I'm new to VBA so I've been learning it for past 2 days. –  js0823 Aug 26 '11 at 14:46

I had to do this once and ended up adapting this algorithm. It's somewhat different from nested loops, so you may find it interesting. Translated to VB, this would be something like this:

``````Public Sub printCombinations(ByRef pool() As Integer, ByVal r As Integer)
Dim n As Integer
n = UBound(pool) - LBound(pool) + 1

Dim idx() As Integer
ReDim idx(1 To r)
For i = 1 To r
idx(i) = i
Next i

Do
'Write current combination
For j = 1 To r
Debug.Print pool(idx(j));
'or whatever you want to do with the numbers
Next j
Debug.Print

' Locate last non-max index
i = r
While (idx(i) = n - r + i)
i = i - 1
If i = 0 Then
'All indexes have reached their max, so we're done
Exit Sub
End If
Wend

'Increase it and populate the following indexes accordingly
idx(i) = idx(i) + 1
For j = i + 1 To r
idx(j) = idx(i) + j - i
Next j
Loop
End Sub
``````
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Thank you. I tried it and it works fine but array input in Excel spreadsheet wasn't what I was looking for. But I tried it and it works perfectly for anyone else who might need this. –  js0823 Aug 26 '11 at 14:47
That's why I say "something like" :-) –  Joubarc Aug 27 '11 at 6:30