Looking for an algorithm to count the number of possible patterns

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.`

-
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

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,
xrange(5)
)),
product(set(permutations([0,0,0,1,1])), repeat=5)
))
``````
-

Look at the Matlab function `perms` for vector `[0 0 0 1 1]`, I think you'll have it then.

-
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