# 8 Queens using One array [duplicate]

Possible Duplicate:
Dumb 8 Queens problem in C++ using goto and backtrack

Having problems understanding how to use an one dimensional array to implement the eight queens problem. Also can't figure out how to print the array to print out all possible solutions.

``````#include "stdafx.h"
#include <iostream>
using namespace std;

int main()
{
int q[8];
q[0] = 0;
int c = 0;
int count = 0;

NC: c++;
if (c == 8) goto print;
q[c] = -1;

NR: q[c] =
if (q[c] == 8) goto backtrack;
for(int i = 0; i < c; i++){
if(q[i] == q[c] || abs(q[c] - q[i]) == (c - 1))
goto NR;
}
goto NC;

backtrack:
c--;
if(c = -1) return 0;
goto NR;

Print:
++count;
cout << count << endl;
for(int i = 0; i <= 7; i++){
cout << q[i];
}
cout << endl;
goto backtrack;

return 0;
}
``````
-

## marked as duplicate by Starkey, Wolph, Cubbi, Jim Lewis, ChrisF♦Oct 4 '10 at 11:12

ouch. dont use goto, try `continue` or `break` instead or use functions – Anycorn Oct 4 '10 at 0:12
Duplicate: stackoverflow.com/questions/3817011/… – Starkey Oct 4 '10 at 0:16
Wish I didn't have to use goto statement at all, but the assignment calls for it. After this is completed then we are supposed to remove all goto statements. Using different methods to solve one problem. – Mister Bunker Oct 4 '10 at 0:16
Note that continue and break do two different things. Break will end the loop while continue will just go back to the beginning of the loop on the next iteration! (But nothing after that point (the point of continue) will be run to get back to the beginning) – RageD Oct 4 '10 at 0:16
It's not what you've asked about, but I'm going to guess that this: `if(c = -1) return;` isn't what you wanted. – Jerry Coffin Oct 4 '10 at 0:32

First of all, refrain from using `goto` unless you are facing problems where goto is the only proper way to reduce code duplication. This isn't one of those cases. You would normally use recursion to do this. Using a 1-dimensional array for this problem means that the maximum depth of the recursion will be 8(given a chess board of 8 x 8), so it's not going to be exhausting your stack unless you're running your program on a computer that is several decades old.

Anyway, I happen to have implemented the 8 queens problem using backtracking before, with a 1-dimensional array. Given an array `int board[8]`, and an index `i`, the index would be the x coordinate for a queen and `array[i]` would store the y coordinate.

Example:

Given

``````int array[8] = { 1, 3, 5, 7, 2, 0, 6, 4 };
``````

Which is a valid solution, this would model the following board:

``````7       x
6             x
5     x
4               x
3   x
2         x
1 x
0           x
0 1 2 3 4 5 6 7
``````

I'm not sure what the policy is on posting complete solutions to problems here, but I remember solving this myself and I distinctly remember modeling my general backtracking algorithm almost exactly after the Pseudocode section on the wikipedia article for backtracking. Think about the benefits of using the 1-dimensional array here for a second.

1. You cannot place two queens in the same column due to only having a one dimensional array. That's fine, since it would be invalid, anyway.
2. If you are about to place a queen at coordinate `(x, y)`(which is `array[x] = y`) it is illegal if `y` is already in the array.
3. If you are about to place a queen at coordinate `(x, y)` it is illegal if there exists any valid index `x_1` into `array` and corresponding y-coordinate `y_1` that fulfills the condition `abs(x_1 - x) == abs(y_1 - y)`.

With that knowledge it is trivial to determine valid placements for queens, and all that remains after that is implementing the backtracking algorithm.