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For example, given a matrix:


And knowing that the matrix is 5x3, is there a way that if given the value '7', that we can know it is in row 2? The case is that the matrix is always ordered from 1 to n, starting from 0.

Lastly, the matrix is stored linearly in a zero based array.

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Do you want a zero based solution or not? Your accepted answer is not zero based. –  Joe Philllips Apr 18 '09 at 4:52
Another thing to consider is whether or not your "row 1" is actually considered row 1 or row 0 in your matrix. There is a lot of ambiguity here. –  Joe Philllips Apr 18 '09 at 4:54
Yes, nothing as stated is zero-based. The top-left element is 1, and it seems to have (row,col)=(1,1). –  Kip Apr 18 '09 at 4:56
And, as someone pointed out in an answer (that has apparently been deleted), what you have here is a 3x5 matrix, not a 5x3 matrix. –  Kip Apr 18 '09 at 4:58
Premature acceptication for sure. –  Joe Philllips Apr 18 '09 at 4:59
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4 Answers

up vote 3 down vote accepted
row = ceiling(7 / 5)  or   ceiling(position / width)
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Why was this modded down? Is it not correct? It seems correct and to the point. –  ApplePieIsGood Apr 18 '09 at 4:51
I didn't downmod it... but I would point out that while this is the correct answer for a math class, it isn't an ideal programming solution because you'd need to do unnecessary floating point math. Also, if position and width are integers, a naive implementation of ceil(pos/width) would actually be equivalent ceil(floor(pos/width))=floor(pos/width). This depends on programming language of course, some will use floating point math for all division unless you go out of your way. –  Kip Apr 18 '09 at 5:31
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if it is 0-based:

row: n / width
col: n % width

In your example, you say it is zero-based, but it is actually starting at 1, and you count the top-left element as (row,col)=(1,1), so you'd need to adjust the math:

row: (n-1) / width + 1
col: (n-1) % width + 1

In your case, n=7, width= 5:

row = (7-1)/5 + 1 = 1+1 = 2
col = (7-1)%5 + 1 = 1+1 = 2

Note: I'm using standard programmer's integer math, where "a/b" really means "floor(a/b)".

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Bad communication on my part, I meant it is stored in a zero based array, not that the first value is zero based. –  ApplePieIsGood Apr 18 '09 at 5:09
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Let X be your index
column = X % width
row    = ceiling(X / width)

Edit: Seems to work now that I made some changes.

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If the matrix is stored in a row-major order, then the row indices map to the element index as follows:

 rowIndex = (elementIndex - 1) / numcolumns
 columnIndex = (elementIndex % numcolumns) - 1

This is always integer division -- so no remainders. You will get the row and column indices as starting from 0.

It is left as an exercise to figure out what happens in column-major layout.

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But 7 - 1 / 4 is 1.5, leaving 1, and in a 3x4 matrix, 7 is in the 3rd row, or index 2 in a zero based array. Unless I'm missing something your answer is not right? –  ApplePieIsGood Apr 18 '09 at 4:40
Thanks! Fixed typo. Please see updated post. –  dirkgently Apr 18 '09 at 4:44
In your case, numcolumns = 5. So, rowIndex = (7 - 1) / 5 = 6 / 5 = 1 (since indices start at 0, this indicates the second row). Also, columnIndex = 7 % 5 - 1 = 2 - 1 = 1 (the second column). –  dirkgently Apr 18 '09 at 4:47
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