# Combinations: Numbers 1 thru 22, totals of 4 number non-repeating

If we have a lottery drawing with numbers 1 thru 22 in a pool. We have to draw four numbers. The total number of 4 number combinations is 7,315.

Now the hard part, assume that you want to only keep combinations where no more than 2 out of 4 are the same.

For example, you draw the combination 1,2,3,4 then 1,2,3,5 or 2,3,4,6 are no good. The next valid combinations is 1,2,5,6 because no three numbers are the same as in 1,2,3,4.

How can I pull out all the combinations from 1,2,3,4 to 19,20,21,22 that only have two same numbers from all other combinations.

Or what is the formula to find out how many valid combinations there are?

Here are the first few valid combinations. (1,2,3,4):(1,2,5,6):(1,2,7,8):(1,2,9,10):(1,2,11,12):(1,2,13,14)...

Thank you for any help in advance, DJ

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No, it is not. This has to do with lottery probabilities. –  David Jones Feb 14 '12 at 17:14
I think you're off on your estimate of combinations. If we look at the combinations for each drawing. `21 x 20 x 19 x 18 = 143,640` not `7,315`. –  Mike Feb 14 '12 at 17:42
The equation I used is (n!)/((r!)(n-r)!) where n=22 and r=4 –  David Jones Feb 14 '12 at 17:56
Hmmm... I just went and generated every unique set for four digits between 1-22 and I came out with `143,640`. I'm posting my code right now. –  Mike Feb 14 '12 at 17:59
I used the MATLAB function combntns(set,subset) mathworks.com/help/toolbox/map/ref/combntns.html –  David Jones Feb 14 '12 at 18:03

Here's a fairly inelegant brute force method.

``````#!/usr/bin/python

from sets import Set

setlist = []

# Generate all sets
# Sets are guaranteed to have only unique numbers
# Note: Python ranges are inclusive on the left but exclusive on the right
for first in range(1,23):
for second in range(first+1,23):
for third in range(second+1,23):
for fourth in range(third+1,23):
possible = Set([first, second, third, fourth])
# Only take sets of 4 digits
if len(possible) == 4:
setlist.append(possible)

# Print the total number of combinations
print len(setlist)

for aset in setlist:
# Append the first answer automatically
if len(answers) == 0:

ok = True
#Check against all our previous answers
# We have more than two intersecting values, this is not an answer
if (len(answer.intersection(aset)) > 2):
ok = False
break;

# If our answer is ok
if ok:

# Clean up our answers and sort them all
clean = []
temp.sort()
clean.append(temp)
# Print the clean answers
print clean

# Print the total