# array puzzle:generating all possible combinations

im doing a project and this part is rly important to me.i'll try to be as clear as possible.

suppose we have an mxn matrix with all 0s, i need to generate all possible combinations of the array in which only one element in a row is initialised to 1 and all the other elements in that row are 0s. similarly, in all the rows, exactly one element should be 1. ex: take a 3x2 matrix, the following should be the output:

[1 0,1 0,1 0], [1 0, 1 0,0 1], [1 0,0 1,1 0], [1 0, 0 1, 0 1], [0 1, 1 0,1 0], [0 1, 1 0, 0 1], [0 1, 0 1, 1 0], [0 1, 0 1, 0 1]

the values within the square brackets is a 3x2 matrix,each row separated by a comma. so basically, an mxn matrix will have n power m number of combinations. anyone who can think of any possible way of solving this pls post it, its really important. thanks in advance

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This sounds like a homework assignment. If it is, it should be tagged as such. –  Niki Yoshiuchi Sep 28 '10 at 15:44
If You use C++, You will have the next_permutation function. It works on STL containers and does what You need. –  TrueY Apr 22 at 11:19

Since this sounds like homework I'm not going to give you a complete solution, but rather some steps in the right direction. Let's start with a 3x2 matrix. We can solve this using nested for loops:

``````int row0, row1, row2;
for(row0=0; row0<2; ++row0) {
matrix[0][row0] = 1;
for(row1=0; row1<2; ++row1) {
matrix[1][row1] = 1;
for(row2=0; row2<2; ++row2) {
matrix[2][row2] = 1;
print_matrix(matrix);
matrix[2][row2] = 0;
}
matrix[1][row1] = 0;
}
matrix[0][row0] = 0;
}
``````

Of course this isn't a very generic solution. It's easy to change this to a 3xm matrix (just replace the `row#<2` with `row#<m-1`) but clearly this doesn't work for an nxm matrix. Everytime we increase n by one we need to add another for loop.

I leave it up to you to determine how to get rid of the nested for loops and use some other technique to generalize it.

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