Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

Sign up and start helping → Learn more about Documentation →

Given a matrix like below, transform it, say, 90 degrees into the second matrix below. How would you go about doing this in the cleanest way possible? Short/succinct/clear solutions where the point is easy to grasp is preferred.





Edit: I realize it was not clear from original question. I'd like to know how to do this in Erlang.

share|improve this question
This is called transposing the matrix: a[j,i] = a[i, j] – duffymo Mar 22 '11 at 9:43
Thanks; I'm changing the title. – Magnus Kronqvist Mar 22 '11 at 9:53
up vote 13 down vote accepted

Simplifying the solutions already given, you can do it in as short as:



transpose([[]|_]) -> [];
transpose(M) ->
  [lists:map(fun hd/1, M) | transpose(lists:map(fun tl/1, M))].
share|improve this answer
Tested solution - this was what I was thinking of. – mozillanerd Oct 21 '11 at 22:11
I like this solution, very short and elegant, and easy to convince yourself that it must be correct. – Magnus Kronqvist Oct 26 '11 at 13:19

In functional programming languages, the usual approach for matrix transposition is to use unzip.

share|improve this answer
Thanks. This seems to point in the right direction, but I still don't see in practice how to do this. – Magnus Kronqvist Mar 22 '11 at 10:09
If you convert your example from a list of lists to a list of three-tuples, then you can use unzip3 directly to experiment. Writing a version of unzip that takes a list of lists should be straightforward, once you get how unzip works. – Michael J. Barber Mar 22 '11 at 10:28
However unzip/1 and unzip/3 are limited to two- and three-dimensional matrices respectively. There are no unzip4, unzip5 etc. in stdlib :-( – Yasir Arsanukaev Mar 22 '11 at 10:34
That was my issue as well, not being able to generalize the unzip version. – Magnus Kronqvist Mar 22 '11 at 10:36

Here's my sample solution:



transpose(L) ->
     transpose_do([], L).

transpose_do(Acc, [[]|_]) ->
transpose_do(Acc, M) ->
     Row = lists:foldr(
          fun(Elem, FoldAcc) ->
                    [hd(Elem) | FoldAcc]
     transpose_do([Row|Acc], lists:map(fun(X) -> tl(X) end, M)).


1> M = [[a1,a2,a3],[b1,b2,b3],[c1,c2,c3]].
2> transp:transpose(M).   
share|improve this answer
By the way, it works for matrices of any size, not only for square matrices; e. g. [[a1,a2,a3,a4], [b1,b2,b3,b4], [c1,c2,c3,c4], [d1,d2,d3,d4]] will also do as an input ;-) – Yasir Arsanukaev Mar 22 '11 at 10:24
This is a nice answer indeed! – Magnus Kronqvist Mar 22 '11 at 10:26
Sure, I meant [[a1,a2,a3], [b1,b2,b3], [c1,c2,c3], [d1,d2,d3]] in my first comment above. – Yasir Arsanukaev Mar 22 '11 at 16:00

Here's an implementation that I think I got from the Haskell standard library:

%% Transpose rows and columns in a list of lists. Works even if sublists
%% are not of same length. Empty sublists are stripped.
transpose([[X | Xs] | Xss]) ->
    [[X | [H || [H | _] <- Xss]]
     | transpose([Xs | [T || [_ | T] <- Xss]])];
transpose([[] | Xss]) -> transpose(Xss);
transpose([]) -> [].

Compact and slightly mind-bending.

share|improve this answer
For anyone curious, the Elixir version of this would be: def transpose([[x | xs] | xss]), do: [[x | (for [h | _] <- xss, do: h)] | transpose([xs | (for [_ | t] <- xss, do: t)])] You should be able to translate the rest from the above easily enough. I can't paste the whole thing here because Stupid Stackoverflow Comment Limitations™ – pmarreck Feb 4 at 0:16

What you are showing is not a matrix rotation, but rather matrix transposition. If you call the first matrix A and the second B then you have

A[i,j] = B[j,i]

To go from A to B you just need two nested loops with i = 1 to n and j = i+1 to n and at each iteration you swap the off-diagonal entries using a temporary variable.

share|improve this answer
Yes, but the question was how to do this in Erlang. – Magnus Kronqvist Mar 22 '11 at 9:54
Actually my mistake, it was not clear from my question. – Magnus Kronqvist Mar 22 '11 at 9:58

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

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