# Formula needed: Sort array to array-“snaked”

After the you guys helped me out so gracefully last time, here is another tricky array sorter for you.

I have the following array:

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

I use it for some visual stuff and render it like this:

```1   2  3  4

5   6  7  8

9  10 11 12

13 14 15 16
```

Now I want to sort the array to have a "snake" later:

```// rearrange the array according to this schema
1   2  3 4

12 13 14 5

11 16 15 6

10  9  8 7

// the original array should look like this
a = [1,2,3,4,12,13,14,5,11,16,15,6,10,9,8,7]
```

Now I'm looking for a smart formula / smart loop to do that

```ticker = 0;
rows = 4; // can be n
cols = 4; // can be n
originalArray = [1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16];
newArray = [];

while(ticker < originalArray.length)
{
//do the magic here
ticker++;
}
```

Thanks again for the help.

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Another homework assignment that you let others do :) –  Tuomas Pelkonen Mar 18 '10 at 9:54
Actually, I already have I made with 75(!) lines of code. I'm wondering if there is a smarter way... –  Aron Woost Mar 18 '10 at 10:08
There probably is a smarter way to do this. I would say around 10 lines of code inside the loop would be a good goal. –  Tuomas Pelkonen Mar 18 '10 at 11:01
Yap, I'll give it another shot –  Aron Woost Mar 18 '10 at 11:06

I was bored, so I made a python version for you with 9 lines of code inside the loop.

``````ticker = 0
rows = 4
cols = 4
originalArray = [1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16]
newArray = [None] * (rows * cols)
row = 0
col = 0
dir_x = 1
dir_y = 0
taken = {}

while (ticker < len(originalArray)):
newArray[row * cols + col] = originalArray[ticker]
taken[row * cols + col] = True

if col + dir_x >= cols or row + dir_y >= rows or col + dir_x < 0:
dir_x, dir_y = -dir_y, dir_x
elif ((row + dir_y) * cols + col + dir_x) in taken:
dir_x, dir_y = -dir_y, dir_x

row += dir_y
col += dir_x
ticker += 1

print newArray
``````
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Thank Tuomas, I'll check this right away. –  Aron Woost Mar 18 '10 at 11:48
Works like a charm. For me there are a few lines more since I had to solve the multiple assignment (which seam to be pretty handy in python btw). Also you could put the else condition in the if to save one more line. Yeah, I know... :) However, thanks for that. –  Aron Woost Mar 18 '10 at 17:43

You can index into the snake coil directly if you recall that

``````1 + 2 + 3 + ... + n = n*(n+1)/2
m^2 + m - k = 0  =>  m - (-1+sqrt(1+4*k))/2
``````

and look at the pattern of the coils. (I'll leave it as a hint for the time being--you could also use that `n^2 = (n-1)^2 + (2*n+1)` with reverse-indexing, or a variety of other things to solve the problem.)

When translating to code, it's not really any shorter than Tuomas' solution if all you want to do is fill the matrix, however.

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