# Using Haskell's map function to calculate the sum of a list

``````addm::[Int]->Int
``````

I was able to achieve to get a sum of a list using `sum` function but is it possible to get the sum of a list using `map` function ? .. also what the use of map function ?

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You can simplify you `addm` to just `addm = sum`. –  Waldheinz May 30 '11 at 10:59
Note: your addm function is undefined for the empty list unless you do something like Waldheinz suggests. –  Edward KMETT May 30 '11 at 17:16

You can't really use `map` to sum up a list, because map treats each list element independently from the others. You can use `map` for example to increment each value in a list like in

``````map (+1) [1,2,3,4] -- gives [2,3,4,5]
``````

``````addm' = foldl (+) 0
``````
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It is not possible to use `map` to reduce a list to its sum. That recursive pattern is a `fold`.

``````sum :: [Int] -> Int
sum = foldr (+) 0
``````

As an aside, note that you can define `map` as a fold as well:

``````map :: (a -> b) -> ([a] -> [b])
map f = fold (\x xs -> f x : xs) []
``````

This is because `foldr` is the canonical recursive function on lists.

References: A tutorial on the universality and expressiveness of fold, Graham Hutton, J. Functional Programming 9 (4): 355–372, July 1999.

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After some insights I have to add another answer: You can't get the sum of a list with `map`, but you can get the sum with it's monadic version `mapM`. Basically all you need to do is to use a `Writer` monad (see LYAHFGG) over the `Sum` monoid (see LYAHFGG).

I wrote a specialized version, which is probably easier to understand:

``````data Adder a = Adder a Int

return x = Adder x 0
(Adder x s) >>= f = let Adder x' s' = f x
in Adder x' (s + s')

sum' xs = let Adder _ s = mapM toAdder xs in s

main = print \$ sum' [1..100]
--5050
``````

`Adder` is just a wrapper around some type which also keeps a "running sum". We can make `Adder` a monad, and here it actually does some work: When the operation `>>=` (a.k.a. "bind") is executed, it returns the new result and the value of the running sum of that result plus the original running sum. The `toAdder` function takes an Int and creates an `Adder` that holds that argument both as wrapped value and as running sum (actually we're not interested in the value, but only in the sum part). Then in `sum'` `mapM` can do its magic: While it works similar like `map` for the values embedded in the monad, it executes "monadic" functions like `toAdder`, and chains these calls (it uses `sequence` to do this). At this point we get through the "backdoor" of our monad the interaction between list elements that the normal `map`is missing.

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Here it is, the supposedly impossible definition of `sum` in terms of `map`:

``````summ xs = let ys = 0 : map (\(a,b)->a+b) (zip xs ys) in last ys
``````

this actually shows how `scanl` can be implemented in terms of `map`, the above being equivalent to `foldl (+) 0 xs === last \$ scanl (+) 0 xs`:

``````scannl f z xs = let ys = z : map (uncurry f) (zip ys xs) in ys
``````

I expect one can calculate many things with `map`, arranging for all kinds of information flow.

edit: the above is just a `zipWith` in disguise of course (and `zipWith` is kind of a `map2`):

``````summ xs = let ys = 0 : zipWith (+) ys xs in last ys
``````

This seems to suggest that `scanl` is more fundamental than `foldl`, seen from this angle at least.

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Ok, it is possible, but I don't think that's idiomatic Haskell. But +1 because technically you're right. :-) –  Waldheinz Aug 14 '12 at 12:15
I think you're cheating here, Will. Basically, I read the question as asking whether you can use the `Functor []` instance to calculate the length of a list; and your answer is that you can use an `Applicative []` instance to do so (basically `ZipList`). I realize I'm "enriching" the question (so to speak) by reading `Functor` into it, but by that argument you are enriching it more than I am, since `Applicative` is more powerful than `Functor`. –  Luis Casillas Aug 28 '12 at 17:38
there is no cheating here; judging an answer by "enriched" requirements is what might be considered that. Lists are not sets; their structure (items' positions; `last` element) is perfectly visible - this is the point of this answer. `map` is not just `fmap`, even if the latter is defined as the former. –  Will Ness Jan 30 at 11:21

Map "maps" each element of your list to an element in your output:

``````let f(x) = x*x
map f [1,2,3]
``````

This will return a list of the squares.

To sum all elements in a list, use fold:

``````foldl (+) 0 [1,2,3]
``````

+ is the function you want to apply, and 0 is the initial value (0 for sum, 1 for product etc)

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As the other answers point out, the "normal" way is to use one of the `fold` functions. However it is possible to write something pretty similar to a `while` loop in imperative languages:

``````sum' [] = 0
sum' xs = head \$ until single loop xs where
single [_] = True
single _ = False
loop (x1 : x2 : xs) = (x1 + x2) : xs
``````

It adds the first two elements of the list together until it ends up with a one-element list, and returns that value (using `head`).

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I realize this question has been answered, but I wanted to add this thought...

``````listLen2 :: [a] -> Int
listLen2 = sum . map (const 1)
``````

I believe it returns the constant 1 for each item in the list, and returns the sum! Might not be the best coding practice, but it was an example my professor gave to us students that seems to relate to this question well.

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