# square puzzle solution

Question: given an integer number n, print the numbers from 1 up to n2 like this:

n = 4

result is:

``````01 02 03 04
12 13 14 05
11 16 15 06
10 09 08 07
``````

How do you solve it (apart from the solution provided in the link below)?

http://www.programmersheaven.com/mb/CandCPP/81986/81986/problem-in-making-ap-c++-program/?S=B20000

I'm looking in another direction. So far, I'm trying to figure out if I could obtain the ordered list of positions I have to fill in.

Here's what Im looking into: is there a way to obtain the "fdisp" so as to solve the problem that way, instead of "walk" in the matrix?

``````matrix = [[1, 2, 3, 4], [5, 6, 7, 8], [9, 10, 11, 12], [13, 14, 15, 16]]
n = len(matrix)

# final disposition wrote by hand: how to get it for arbitrary n?
fdisp = [(0,0), (0,1), (0,2), (0,3), (1,3), (2,3), (3,3), (3,2),
(3,1), (3,0), (2,0), (1,0), (1,1), (1,2), (2,2), (2,1)]

for val,i in enumerate(fdisp):
matrix[i[0]][i[1]] = val + 1

def show_matrix(matrix, n):
for i,l in enumerate(matrix):
for j in range(n):
print "%d\t" % matrix[i][j],
print

show_matrix(matrix, n)
``````
-
Please show us that you've at least attempted to solve the problem yourself. –  Matt Grande Jul 23 '09 at 20:30
Is this solvable in O(n) memory? –  Georg Schölly Jul 23 '09 at 20:33
Voted to close - no real effort done on the part of the asker. –  17 of 26 Jul 23 '09 at 20:40
I think you should put in a bit more effort yourself :) –  Zyphrax Jul 23 '09 at 20:47
Zyphrax: so, you are saying that there is a way to calculate "fdisp". Good, I'll work on it harder then :) –  gmoh Jul 23 '09 at 20:51

Here's a different approach. It relies on spotting that the movements you make cycle between: right, down, left, up, right, .... Further, the number of times you move goes: 3 right, 3 down, 3 left, 2 up, 2 right, 1 down, 1 left. So without further ado, I will code this up in Python.

First, I will use some itertools and some numpy:

``````from itertools import chain, cycle, imap, izip, repeat
from numpy import array
``````

The directions cycle between: right, down, left, up, right, ...:

``````directions = cycle(array(v) for v in ((0,1),(1,0),(0,-1),(-1,0)))
``````

(I'm using numpy's arrays here so I can easily add directions together. Tuples don't add nicely.)

Next, the number of times I move counts down from n-1 to 1, repeating each number twice, and the first number three times:

``````countdown = chain((n-1,), *imap(repeat, range(n-1,0,-1), repeat(2)))
``````

So now my sequence of directions can be created by repeating each successive direction by the paired number in countdown:

``````dirseq = chain(*imap(repeat, directions, countdown))
``````

To get my sequence of indices, I can just sum this sequence, but (AFAIK) Python does not provide such a method, so let's quickly throw one together:

``````def sumseq(seq, start=0):
v = start
yield v
for s in seq:
v += s
yield v
``````

Now to generate the original array, I can do the following:

``````a = array(((0,)*n,)*n) # n-by-n array of zeroes
for i, v in enumerate(sumseq(dirseq, array((0,0)))):
a[v[0], v[1]] = i+1
print a
``````

Which, for n = 4, gives:

``````[[ 1  2  3  4]
[12 13 14  5]
[11 16 15  6]
[10  9  8  7]]
``````

and, for n = 5, gives:

``````[[ 1  2  3  4  5]
[16 17 18 19  6]
[15 24 25 20  7]
[14 23 22 21  8]
[13 12 11 10  9]]
``````

This approach can be generalised to rectangular grids; I leave this as an exercise for the reader ;)

-
This is very clever, I've to study it carefully. –  gmoh Jul 25 '09 at 9:08

Though your example is in python and this is in Java, I think you should be able to follow the logic:

``````public class SquareTest {

public static void main(String[] args) {
SquareTest squareTest = new SquareTest(4);
System.out.println(squareTest);
}

private int squareSize;
private int[][] numberSquare;
private int currentX;
private int currentY;
private Direction currentDirection;

private enum Direction {
LEFT_TO_RIGHT, RIGHT_TO_LEFT, TOP_TO_BOTTOM, BOTTOM_TO_TOP;
};

public SquareTest(int squareSize) {
this.squareSize = squareSize;
numberSquare = new int[squareSize][squareSize];
currentY = 0;
currentX = 0;
currentDirection = Direction.LEFT_TO_RIGHT;
constructSquare();
}

private void constructSquare() {
for (int i = 0; i < squareSize * squareSize; i = i + 1) {
numberSquare[currentY][currentX] = i + 1;
if (Direction.LEFT_TO_RIGHT.equals(currentDirection)) {
travelLeftToRight();
} else if (Direction.RIGHT_TO_LEFT.equals(currentDirection)) {
travelRightToLeft();
} else if (Direction.TOP_TO_BOTTOM.equals(currentDirection)) {
travelTopToBottom();
} else {
travelBottomToTop();
}
}
}

private void travelLeftToRight() {
if (currentX + 1 == squareSize || numberSquare[currentY][currentX + 1] != 0) {
currentY = currentY + 1;
currentDirection = Direction.TOP_TO_BOTTOM;
} else {
currentX = currentX + 1;
}
}

private void travelRightToLeft() {
if (currentX - 1 < 0 || numberSquare[currentY][currentX - 1] != 0) {
currentY = currentY - 1;
currentDirection = Direction.BOTTOM_TO_TOP;
} else {
currentX = currentX - 1;
}
}

private void travelTopToBottom() {
if (currentY + 1 == squareSize || numberSquare[currentY + 1][currentX] != 0) {
currentX = currentX - 1;
currentDirection = Direction.RIGHT_TO_LEFT;
} else {
currentY = currentY + 1;
}
}

private void travelBottomToTop() {
if (currentY - 1 < 0 || numberSquare[currentY - 1][currentX] != 0) {
currentX = currentX + 1;
currentDirection = Direction.LEFT_TO_RIGHT;
} else {
currentY = currentY - 1;
}
}

@Override
public String toString() {
StringBuilder builder = new StringBuilder();
for (int i = 0; i < squareSize; i = i + 1) {
for (int j = 0; j < squareSize; j = j + 1) {
builder.append(numberSquare[i][j]);
builder.append(" ");
}
builder.append("\n");
}

return builder.toString();
}
}
``````
-
Thank you, but I was looking for another way to solve it –  gmoh Jul 24 '09 at 10:26

Another way to do it, this time in C#:

``````int number = 9;
var position = new { x = -1, y = 0 };
var directions = new [] {
new { x = 1, y = 0 },
new { x = 0, y = 1 },
new { x = -1, y = 0 },
new { x = 0, y = -1 }
};

var sequence = (
from n in Enumerable.Range(1, number)
from o in Enumerable.Repeat(n, n != number ? 2 : 1)
select o
).Reverse().ToList();

var result = new int[number,number];

for (int i = 0, current = 1; i < sequence.Count; i++)
{
var direction = directions[i % directions.Length];

for (int j = 0; j < sequence[i]; j++, current++)
{
position = new {
x = position.x + direction.x,
y = position.y + direction.y
};

result[position.y, position.x] = current;
}
}
``````
-
Thank you, really interesting solution –  gmoh Jul 24 '09 at 10:24

I found a way. Now I've to improve it a bit, especially I've to find a cleaner way to build "fdisp". n = 5

``````dim = n
pos = (0, -1)
fdisp = []
squares = n % 2 == 0 and n / 2 or n / 2 + 1

for _ in range(squares):
pos = (pos[0], pos[1] + 1)
fdisp.append(pos)

fdisp += [(pos[0],pos[1]+i) for i in range(1, dim)]
pos = fdisp[-1]
fdisp += [(pos[0]+i,pos[1]) for i in range(1, dim)]
pos = fdisp[-1]
fdisp += [(pos[0],pos[1]-i) for i in range(1, dim)]
pos = fdisp[-1]
fdisp += [(pos[0]-i,pos[1]) for i in range(1, dim - 1)]
pos = fdisp[-1]
dim = dim - 2

matrix = [[0] * n for i in range(n)]

for val,i in enumerate(fdisp):
matrix[i[0]][i[1]] = val + 1

def show_matrix(matrix, n):
for i,l in enumerate(matrix):
for j in range(n):
print "%d\t" % matrix[i][j],
print

show_matrix(matrix, n)
``````
-

I have solved your problem using C++. I don't know if it will be helpful for you. But posting it. If it works for you it will be a pleasure.

Here is the Code:

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

bool valid(int n,int r,int c)
{
if(r>=1 && r<=n && c>=1 && c<=n)
return true;
return false;
}

int main()
{
pair<int,int>d1,d2,d3,d4,temp;
d1 = make_pair(0,1);
d2 = make_pair(1,0);
d3 = make_pair(0,-1);
d4 = make_pair(-1,0);
/**********************direction******************************/

int n, i, j, counter=1, newR = 1, newC = 0, direction = 4;
bool changeDir=true;
/**************************variables*************************/

cin>>n;
int arr[n+1][n+1];
int visited[n+1][n+1];
/*************************arrays********************************/

memset(visited,0,sizeof(visited));
memset(arr,0,sizeof(arr));
/***************initializing the array**************************/

while(counter<=n*n)
{
if(direction==1 && changeDir)
{
temp = make_pair(d2.first,d2.second);
direction=2;
changeDir=false;
}
else if(direction==2&& changeDir)
{
temp = make_pair(d3.first,d3.second);
direction=3;
changeDir=false;
}
else if(direction==3&& changeDir)
{
temp = make_pair(d4.first,d4.second);
direction=4;
changeDir=false;
}
else if(direction==4&& changeDir)
{
temp = make_pair(d1.first,d1.second);
direction=1;
changeDir=false;
}
while(counter<=(n*n) && !changeDir)
{
newR =newR+temp.first;
newC=newC+temp.second;
if(valid(n,newR,newC) && !visited[newR][newC])
{
arr[newR][newC]=counter;
visited[newR][newC]=1;
counter++;
}
else
{
newR-=temp.first;
newC-=temp.second;
changeDir=true;
break;
}
}
}
for(i=1;i<=n;i++)
{
for(j=1;j<=n;j++)
{
if(arr[i][j]<10)
cout<<0;
cout<<arr[i][j]<<" ";
}
cout<<endl;
}
return 0;
}
``````

Here is the output where N=5:

``````01 02 03 04 05
16 17 18 19 06
15 24 25 20 07
14 23 22 21 08
13 12 11 10 09
``````

Thank you.

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