# How to Map a function on just one entry in a list?

I have been learning to use Map more (to become more functional programmer). It looks like Map wants a list as the expression to apply the function to. If the expression is not a list, then it is not happy.

I use NumberForm in this example to illustrate what I mean:

I can Map NumberForm on the whole list ok:

data = {1, 2, 3}
Map[NumberForm[#, {3, 2}] &, data]

But if I try to Map it to some specific element in the list, say the first one in the above, it does not work

data = {1, 2, 3}
Map[NumberForm[#, {3, 2}] &, data[[1]] ]

The result returned is NOT formatted. Same as original data. i.e I get back '1' and not '1.00' as in the other examples.

To solve, I added extra {}

data = {1, 2, 3}
Map[NumberForm[#, {3, 2}] &, {data[[1]]} ]

it works now, (just need to remove the {} from the result using First).

So I thought, then why not add this extra {} all the time and remove it in the end? This way, I do not have to worry if what I am Map'ing function to happened to be not a list like in the above example?

So, my examples will all becomes like this:

data = {1, 2, 3}
First@Map[NumberForm[#, {3, 2}] &, { data } ]
First@Map[NumberForm[#, {3, 2}] &, { data[[1]] } ]

This way, code will works on everything and I do not have to make special check before using Map if what I happened to be applying Map to is a list or not.

Question is: Does the the above look an OK solution for the experts, or is there a better way to handle this?

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I have to confess, I don't understand what your motivation is for asking this question. Why would you ever try to Map on to something which is not a list? –  David Z Dec 23 '11 at 7:56
@David Zaslavsky One may eventually want to Map on something else than a list, but this is rather rare and anyways done in situations different from the one discussed in this question. A typical example would be something like Map[f, myContainerA[myContainerB[1, 2, 3], myContainerC[4, 5, 6]], {2}], although in cases like that I usually use rules. –  Leonid Shifrin Dec 23 '11 at 12:14
Perhaps I am misunderstanding your question, but does my approach not answer it? If not, could you try to explain in a different way what you want? It seems to me that my suggestion does exactly what you want. –  acl Dec 23 '11 at 12:56
I see you accepted acl's answer. Be careful with the map function he shows, just as I said for my use of levelspec {-1}. If you use map[f, Sqrt[2]] you will see that this may not be what you want. I still believe there is a deeper issue of method implicit in your question that has not been well addressed. –  Mr.Wizard Dec 23 '11 at 20:22
To say that a different way, you asked: "Does the above look an OK solution for the experts, or is there a better way to handle this?" I say no, it does not look like an OK solution generally, and neither does acl's map or my Map[f, x, {-1}]. Would you please consider adding some use context to your question, that we may better recommend an approach? –  Mr.Wizard Dec 23 '11 at 20:25

This only happens to work because NumberForm works on lists:

NumberForm[{1, 2, 3}, {3, 2}]

gives

{1.00, 2.00, 3.00}

Map[f, {{a, b, c}}] simply maps f onto First[{{a,b,c}}], namely, onto {a,b,c}; so you get f[{a,b,c}].

So unfortunately adding {} will not work in general.

A simple way to do this is to define

ClearAll[map]
map[f_, el_] := f[el]

whence

map[f, {a, b, c}]
map[f, a]

give

{f[a], f[b], f[c]}
f[a]

However this does not allow for the Map[f,expr,levelspec] form (which however is easy enough to implement).

This also works in this case:

map[f, g[a, b, c]] == Map[f, g[a, b, c]]
(*
True
*)
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Perhaps I'm not understanding your intent here, but if you're looking Map a function on just a particular entry in a list, then MapAt is the function you're looking for. Example:

MapAt[NumberForm[#, {3, 2}] &, data, 1]
Out[1]= {1.00,2,3}

Here, the function has been applied to only the first element in the list.

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Good point, I thought he just wanted a way to be able to say Map[f,l] and have it work whether l is list-like or atomic. But maybe your interpretation is correct. –  acl Dec 23 '11 at 2:37
Actually I know about MapAt, but then it is leads to the same thing. I have to use MapAt if I want to apply NumberForm to one entry, and then use Map if I want to apply NumberForm to a list. So back to square one :) The reason I asked about adding {} is to see if I can just use one method for both cases. –  Nasser Dec 23 '11 at 3:19

This seems like an odd question. Why write First@Map[f, { x } ] when you can just write f @ x?

How does it come to be that the second argument of Map may be either form?

Perhaps you would find value in mapping by levels from the end:

Map[f, {x, y, z}, {-1}]

Map[f, x, {-1}]

Be careful with this, as if the list elements are not atomic, you will get unexpected results.

Alternatively, you might write:

data = {1, 2, 3};

data /. n_?NumberQ :> NumberForm[n, {3, 2}]

data[[1]] /. n_?NumberQ :> NumberForm[n, {3, 2}]
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