# How to map the indexes of a matrix to a 1-dimensional array (C++)?

I have an 8x8 matrix, like this:

``````char matrix[8][8];
``````

Also, I have an array of 64 elements, like this:

``````char array[64];
``````

Then I have drawn the matrix as a table, and filled the cells with numbers, each number being incremented from left to right, top to bottom.

If I have, say, indexes 3 (column) and 4 (row) into the matrix, I know that it corresponds to the element at position 35 in the array, as it can be seen in the table that I've drawn. I believe there is some sort of formula to translate the 2 indexes of the matrix into a single index of the array, but I can't figure out what it is.

Any ideas?

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What have you tried? The maths is quite simple here. –  Lightness Races in Orbit Dec 23 '12 at 23:37
`arr[i*cols+j]` for equivalent `matrix[i][j]` indexing, assuming you want row-major ordering, and `cols` is your defined row width in columns (in your example's case, `8`). –  WhozCraig Dec 23 '12 at 23:39
I've tried all kinds of simple calculations like multiplying row * column * 8, dividing, etc. but it doesn't work. I'm not very good at math. –  Fernando Aires Castello Dec 23 '12 at 23:40

The way most languages store multi-dimensional arrays is by doing a conversion like the following:

If `matrix` has size, n by m [i.e. i goes from 0 to (n-1) and j from 0 to (m-1) ], then:

`matrix[ i ][ j ] = array[ i + j*n ]`.

So its just like a number system of base 'n'. Note that the size of the last dimension doesn't matter.

For a conceptual understanding, think of a (3x5) matrix with 'i' as the row number, and 'j' as the column number. If you start numbering from `i,j = (0,0) --> 0`. For 'row-major' ordering (like this), the layout looks like:

``````           |-------- 5 ---------|
Row      ______________________   _ _
0      |0    1    2    3    4 |   |
1      |5    6    7    8    9 |   3
2      |10   11   12   13   14|  _|_
|______________________|
Column     0    1    2    3    4
``````

As you move along the row (i.e. increase the column number), you just start counting up, so the Array indices are `0,1,2...`. When you get to the second row, you already have `5` entries, so you start with indices `1*5 + 0,1,2...`. On the third row, you have `2*5` entries already, thus the indices are `2*5 + 0,1,2...`.

For higher dimension, this idea generalizes, i.e. for a 3D `matrix` L by N by M:

`matrix[ i ][ j ][ k ] = array[ i + j*L + k*L*N ]`

and so on.

For a really good explanation, see: http://www.cplusplus.com/doc/tutorial/arrays/; or for some more technical aspects: http://en.wikipedia.org/wiki/Row-major_order

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I can't believe it was so simple... Very informative, thank you. –  Fernando Aires Castello Dec 23 '12 at 23:53
You're Very welcome! –  DilithiumMatrix Dec 23 '12 at 23:56

For row-major ordering, I believe the statement `matrix[ i ][ j ] = array[ i*n + j ]` is wrong.

The offset should be `offset = (row * NUMCOLS) + column`.

Your statement results to be `row * NUMROWS + column`, which is wrong.

The links you provided give a correct explanation.

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Are you responding to zhermes' answer? If so you should probably just edit his/her post with your correction. –  anthropomorphic Mar 4 '14 at 11:23
Thank you, I'm new on editing answers. –  user1480848 Mar 4 '14 at 15:24

Something like this?

``````//columns = amount of columns, x = column, y = row
var calculateIndex = function(columns, x, y){
return y * columns + x;
};
``````

The example below converts an index back to x and y coordinates.

``````//i = index, x = amount of columns, y = amount of rows
var calculateCoordinates = function(index, columns, rows){
//for each row
for(var i=0; i<rows; i++){
//check if the index parameter is in the row
if(index < (columns * i) + columns && index >= columns * i){
//return x, y
return [index - columns * i, i];
}
}
return null;
};
``````
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Perhaps you could you explain a little of how this relates to (and answers) the OP's original question? –  Stewart_R Nov 23 '14 at 2:11
I should read a little better. It actually does the exact opposite as what the OP has asked for. This converts 35,8,8 to 3,4. –  Don Verdu Nov 23 '14 at 2:27
Now it illustrates both conversions :) –  Don Verdu Nov 23 '14 at 3:02