Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

I want to add together the cross-diagonal elements in a matrix. For example, I have a 3*3 Matrix which is two dimensional, I want to convert it to one dimensional:

      |  1  |  2  |  3  |
 A=   |  4  |  5  |  6  |
      |  7  |  8  |  9  |

final output will be,

     ____ ____ ____ ____ ____
 B= |1   | 6  | 15 | 14 |  9 |

First cross-diagonal A[0][0] will be copied to B[0].

Then the next cross-diagonal elements A[1][0] and A[0][1] will be added and copied to B[1], i.e. 4 and 2 will be added.

Then the next cross-diagonal elements A[2][0] and A[1][1] and A[0][2] will be added and copied to B[2], i.e. 7, 5 and 3 will be added.

And so on...

share|improve this question

closed as off-topic by Jason C, Andrew Barber Nov 20 '13 at 6:58

This question appears to be off-topic. The users who voted to close gave this specific reason:

  • "Questions asking for code must demonstrate a minimal understanding of the problem being solved. Include attempted solutions, why they didn't work, and the expected results. See also: Stack Overflow question checklist" – Jason C, Andrew Barber
If this question can be reworded to fit the rules in the help center, please edit the question.

up vote 3 down vote accepted

Notice that for each diagonal, the sum of row-index and column-index is equal to the index of B array. Based on this fact, you can make a algorithm like this:

// assuming the width and length of the Matrix is N
// it's good you have some ideas of the range of idea, try figure it out by yourself? 
// definitely it should be a function of N
for (int i=0;i<F(N);i++) { 
  for (int j=0;j<=i;j++) { // consider why j should be in range (0,i) ?
    // some cumulatively add here
share|improve this answer
aw man, this is totally 'homework problem' - you gave the answer away way too easily – Kache Nov 15 '12 at 10:09
i think in the outer loop, condition should be <= instead of < – Krunal Nov 15 '12 at 10:16
@Kache ah oh... maybe I should hide some lines of code... – POPOL Nov 15 '12 at 10:16
@Krunal it dependes on whether the index is start from 0 or 1, try it! – POPOL Nov 15 '12 at 10:21

+1 to @Krunal for the great question and @POPOL for answer, was keen to see how it would work so created the following 'work in progress': fiddle here.

I'm going to look at just what's needed in the loop so that I can eliminate the try routine that flags out of range.

    <html lang="en-US">
    <meta charset="UTF-8">
    <script type="text/javascript">
        var a = [   [1,2,3],
        var b = [],N = 4; 
        var item;
        for (i=0;i<2*N-1;i++) {
          b[i] = 0;
          for (j=0;j<=i;j++) {
            try {
                item  = (a[j][i-j] !== undefined)?a[j][i-j]:0;
            }catch(e) {
                console.log("out of range");
                item  =0;
            b[i] +=item;
    <div id="output"></div>
    <script type="text/javascript">
        for (w=0;w<b.length-1;w++) {
            document.getElementById("output").innerHTML+=b[w] +",";
        document.getElementById("output").innerHTML+=b[b.length-1] ;
share|improve this answer

Some ideas to consider:

  • What is the length of array B, in terms of N, generated from the diagonals of an N x N matrix A? Let's refer to that length as L.
  • Just to reinforce the point, how is L related to A? This directly related to the outer loop.
  • How are the positions of the addends of each element in B related to each other? i.e. They're "diagonal" to each other, but how would you express that mathematically?
  • If you can express that mathematically, how would you iterate between them in order to find their sum? This will help you with the inner loop.
share|improve this answer

Here's a two-line solution that does not use for loops:

x=rbind(matrix(0, nc=ncol(A), nr=ncol(A)-1), A, matrix(0, nc=ncol(A), nr=ncol(A)-1))  
laply(seq(sum(dim(A))-1), function(l) sum(diag(t(x[, ncol(A):1])[, l:nrow(x)])))  

[1] 1 6 15 14 9

The laply() function is part of the plyr package.

share|improve this answer

Not the answer you're looking for? Browse other questions tagged or ask your own question.