# Calculate the sum of cross-diagonal elements in a matrix [closed]

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...

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## closed as off-topic by Jason C, Andrew BarberNov 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.

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
}
}
``````
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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.

``````    <!DOCTYPE HTML>
<html lang="en-US">
<meta charset="UTF-8">
<title></title>
<script type="text/javascript">
var a = [   [1,2,3],
[4,5,6],
[7,8,9],
[10,11,12],
[13,14,15]
];
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;
}
}
</script>
<body>
<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] ;
</script>
</body>
</html>
``````
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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.
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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.

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