**Square Spiral**

Here is a compact solution in a single function that performs optimally (it only visits each location in the array *exactly* once):

```
static int anMoveXDir[] = { 1, 0, -1, 0 };
static int anMoveYDir[] = { 0, 1, 0, -1 };
static void DoSpiral(int *panGrid, int nWidth, int nHeight)
{
int nSideSel, nSideIdx, nMoveDir, nXPosn, nYPosn, nCounter;
int anSideLen[2];
anSideLen[0] = nWidth;
anSideLen[1] = nHeight - 1;
nMoveDir = 0; /* start off at (0, 0) in array, */
nXPosn = 0; /* facing east, and count from 1 */
nYPosn = 0;
nCounter = 1;
for (nSideSel = 0; anSideLen[nSideSel & 1]; anSideLen[nSideSel++ & 1]--)
for (nSideIdx = anSideLen[nSideSel & 1]; nSideIdx; nSideIdx--)
{
panGrid[(nYPosn * nWidth) + nXPosn] = nCounter++;
if (nSideIdx == 1)
nMoveDir = (nMoveDir + 1) & 3;
nXPosn += anMoveXDir[nMoveDir];
nYPosn += anMoveYDir[nMoveDir];
}
}
```

This algorithm works on the simple rule that given a rectangular or square array of width `x`

and height `y`

, then the walking the array to create a Square Spiral can be done using the following number of steps:

```
x + (y - 1) + (x - 1) + (y - 2) + (x - 2) + (y - 3) + (x - 3) + ... + 0
```

The function above simply follows the above sequence. It starts at the top-left of the array facing east, walks `x`

steps, turns right 90 degrees, walks `(y - 1)`

steps, turns right 90 degress, walks `(x - 1)`

steps, etc. etc. until either `x`

or `y`

is zero, whichever comes first.

You can test the function above by inserting it into the test program below:

```
#include <stdio.h>
#include <stdlib.h>
#include <string.h>
#define GRID_WIDTH 7
#define GRID_HEIGHT 11
void main()
{
int nXPosn, nYPosn;
int anGrid[GRID_WIDTH * GRID_HEIGHT];
int *pnValue;
DoSpiral(anGrid, GRID_WIDTH, GRID_HEIGHT);
for (pnValue = anGrid, nYPosn = 0; nYPosn < GRID_HEIGHT; nYPosn++, printf("\n"))
for (nXPosn = 0; nXPosn < GRID_WIDTH; printf("%4i", *pnValue++), nXPosn++);
}
```

The output will be as follows (for a 7x11 grid as indicated in the above program):

```
1 2 3 4 5 6 7
32 33 34 35 36 37 8
31 56 57 58 59 38 9
30 55 72 73 60 39 10
29 54 71 74 61 40 11
28 53 70 75 62 41 12
27 52 69 76 63 42 13
26 51 68 77 64 43 14
25 50 67 66 65 44 15
24 49 48 47 46 45 16
23 22 21 20 19 18 17
```