# How to transform a list {element,…} to a list of tuples {{i,element},…}?

Given some list

``````numbers = {2,3,5,7,11,13};
``````

How do I translate this to

``````translatedNumbers = {{1,2},{2,3},{3,5},{4,7},{5,11},{6,13}}
``````

concisely?

I am aware of how to do this using the procedural style of programming as follows:

``````Module[{lst = {}, numbers = {2, 3, 5, 7, 11, 13}},
Do[AppendTo[lst, {i, numbers[[i]]}], {i, 1, Length@numbers}]; lst]
``````

But such is fairly verbose for what seems to me to be a simple operation. For example the haskell equivalent of this is

``````numbers = zip [1..] [2,3,5,7,11,13]
``````

I can't help but think that there is a more concise way of "indexing" a list of numbers in Mathematica.

Apparently I'm not allowed to answer my own question after having had a lightbulb go off unless I have 100 "rep". So I'll just put my answer here. Let me know if I should do anything differently then I have done.

Well I'm feeling a little silly now after having asked this. For if I treat mathematica lists as a matrix I'm able to transpose them. Thus an answer (perhaps not the best) to my question is as follows:

``````Transpose[{Range@6, {2, 3, 5, 7, 11, 13}}]
``````

Edited to work for arbitrary input lists, I think something like:

``````With[{lst={2, 3, 5, 7, 11, 13}},Transpose[{Range@Length@lst,lst}]]
``````

will work. Could I do any better?

-
Your edit looks like the canonical way of doing this. –  Sjoerd C. de Vries Dec 9 '11 at 20:07
Thanks, as it turns out, I have crossed 100 "rep" recently. Should I now copy my own answer to the question answers and remove from the question body proper? Especially as my answer mirrors (exactly!) two of the answers given. (Also I am holding off selecting an answer as the "answer" to the question in the hopes of more alternatives. In the case that the transpose method is best, which answer should I approve? One of the two given below or mine copied down?) –  nixeagle Dec 9 '11 at 21:45
It is tangential to the question being asked, but I would advise to prefer `Module` (or `With`) over `Block` for almost all cases, and use `Block` only if you really know what it does, and why you need it. –  Leonid Shifrin Dec 9 '11 at 21:50
Not sure. I've seen it done both ways. People summarizing and wrapping up at the bottom of their question box or as a separate answer. You may want to read the answers to this question: meta.stackoverflow.com/q/2800/158668 –  Sjoerd C. de Vries Dec 9 '11 at 21:54
@SjoerdC.deVries Well at this point I've already voted up two of the answers and copying mine down won't exactly add anything to what is there. So, in this case I think it best to replace my answer with a summary of the answers offered. Especially if more alternate methods are given! If it is ok with everyone, I think I'll hold off accepting an answer for a bit longer ;). –  nixeagle Dec 9 '11 at 22:02

One thing to consider is if the transformation will not unpack the data. This is important for large data sets.

``````On["Packing"]

numbers = Developer`ToPackedArray@{2, 3, 5, 7, 11, 13};
``````

This will unpack

``````MapIndexed[{First[#2], #1} &, numbers]
``````

this will not

``````Transpose[{Range[Length[#]], #}] &[numbers]

Off["Packing"]
``````
-
My question did not specifically address performance. But now that you have mentioned it: Would `Transpose` be faster than `MapIndexed` even when elements are not packed (or simply unpackable)? –  nixeagle Dec 9 '11 at 22:18
Is the performance of MapIndexed likely to be improved in the future, or does something unavoidable limit its efficiency? –  Mr.Wizard Dec 10 '11 at 5:03
@nixeagle I can not answer that in general. You'll have to try it. –  user1054186 Dec 10 '11 at 9:35
@Mr.Wizard in this case MapIndexed will have to unpack which means the evaluator is entering at a whole different level but try to compare it to a compiled version cf = Compile[{{numbers, _Integer, 1}}, MapIndexed[{First[#2], #1} &, numbers]] and see how that performs. –  user1054186 Dec 10 '11 at 9:55

``````MapIndexed[{First[#2], #1} &, numbers]
``````
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The Transpose method is orders of magnitude faster. –  Sjoerd C. de Vries Dec 9 '11 at 20:11

Well, my „solution“ is perhaps not as smart as the solution from cobbal, but when I test it with long arrays, it is faster (factor of 5!). I am simply using:

``````newList = Transpose[{Range[Length[numbers]], numbers}]
``````

AHH! ruebenko posted a similar answer during I have written my post. Sorry for this almost superfluous post. Well, perhaps it is not so superfluous. I have tested my solution with and without packing, and it works at fastest without packing.

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This is exactly the same as the solution already posted in the edited version of the question which was there two hours before you gave this answer. I'd suggest you remove this answer. –  Sjoerd C. de Vries Dec 9 '11 at 21:59
Sorry, I did not recognize the edited version of the question after posting this (I just recognized ruebenko’s answer). But since I mentioned the timing problem in my answer as first, I think I should not delete it. If you and other people think it is too superfluous, I do not mind it if will be deleted. Anyway, Nixeagle also asked for a better solution. But so far I only know worse one (Use a for-loop…). Would be interesting to see if there is something that is faster than transpose. –  partial81 Dec 9 '11 at 23:34
The OP used prefix notation (f@x instead of f[x]) but other than that both solutions are identical. You may want to look at the FullForm of both notations. Identical. –  Sjoerd C. de Vries Dec 10 '11 at 9:24