Given `k`

rooks and a `n by n`

chess board, the rooks can safely be placed on the board `W`

different ways, where

```
W = k!(n C k)^2
written differently W = n!n!/(k!(n-k)!(n-k)!)
```

PROBLEM STATEMENT:

Write a program that will run over a `n by n`

chessboard and count all the ways that `k`

rooks can safely be placed on the board.

MY RESEARCH:

After searching the internet I finally find a `nQueensSolution`

code on Geekviewpoint and I modify it as below. However my code only works when `k = n`

. Does anyone have an idea how to solve this for `k<n`

?

Here is my code:

```
static int kRooksPermutations(int[] Q, int col, int k, int kLimit) {
int count = 0;
for (int x = 0; x < Q.length && col < Q.length; x++)
if (safeToAdd(Q, x, col)) {
if (k == kLimit - 1) {
count++;
Q[col] = -1;
} else {
Q[col] = x;
count += kRooksPermutations(Q, col + 1, k + 1, kLimit);
}
}
return count;
}//
static boolean safeToAdd(int[] Q, int r, int c) {
for (int y = 0; y < c; y++)
if (Q[y] == r)
return false;
return true;
}//
```

Here is a test code

```
public static void main(String... strings) {
kRooksPermutations(8,5);
}
```

`k<n`

? – twain249 Apr 23 '12 at 23:12