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I need your help in constructing an algorithm to solve the following problem:

A 5x5 table can be filled with the values ​​0 and 1 so that each line and each column of the table consists of exactly two ones and three zeros. How many solutions exist?

If you want to provide some code, you can freely use your preferred language. I mostly use R, Matlab and Python.

I tried to convert the table into a vector:

unique(perms([ones(1,10),zeros(1,15)]), 'rows')

Then, for each row, I would form the 5x5 table and check if all row sums and col sums equal 2. But the above command generated the error: ??? Maximum variable size allowed by the program is exceeded.

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could you describe what you have tried? –  Federico Sep 4 '13 at 13:06
Such a small table: Stop thinking, make a brute forth approach. –  MrSmith42 Sep 4 '13 at 13:13
@MrSmith42 - Exactly. Of course, if this were a 7x7 table, with say 2 ones required in each row and column, the problem with become interesting. As it is, trivial. –  user85109 Sep 4 '13 at 13:16
@woodchips: even for 7x7 you can generate all 7*6=42 possible rows with two ones. and than brute force all 42^7 (about 10^11 possibilities). –  MrSmith42 Sep 4 '13 at 13:36
Here is a python code that bute forces the matrices with two 1s per row: ideone.com/m5iFTB –  OlivierBlanvillain Sep 4 '13 at 14:09

2 Answers 2

up vote 1 down vote accepted

Here is a python expression that bute forces all the matrices with two 1s per row:

from itertools import *
print len(filter(
  lambda candidate: all(imap(
    lambda index: sum(imap(lambda _: _[index], candidate)) == 2,
  product(set(permutations([0,0,0,1,1])), repeat=5)
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Look at the Matlab function perms for vector [0 0 0 1 1], I think you'll have it then.

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Well, if you choose this approach, then it is unique(perms([0 0 0 1 1]),'rows') –  user85109 Sep 4 '13 at 13:19
Yes, thanks for that addition! I don't think the 'rows' is needed, or well...it is pretty trivial either way. –  Fraukje Sep 4 '13 at 13:21
Yes, 'rows' is needed, as otherwise, the unique call returns simply the vector [0;1]. –  user85109 Sep 4 '13 at 13:23
That gives one solution. I am interested in counting the number of possible such tables. –  Brani Sep 4 '13 at 13:24
True. My apologies. –  Fraukje Sep 4 '13 at 13:25

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