I can't figure out why this won't work:

final' :: [a] -> a
final' lst = foldl(\accum x -> accum - accum + x) 0 lst

I always get the error No instance for (Num a) arising from a use of ‘+’

  • 2
    accum - accum + ...? – Willem Van Onsem Apr 17 at 11:36
  • @WillemVanOnsem sorry, I don't quite get your comment (or question) I should be more clear, I am trying to get the last element of the list by using foldl – hdizzle Apr 17 at 11:42
  • 4
    @hdizzle accum - accum seems like a very awkward way of writing 0. – leftaroundabout Apr 17 at 11:43
  • 1
    @hdizzle: why do you subtract a number from itself, and not just drop the accum? – Willem Van Onsem Apr 17 at 11:43
up vote 6 down vote accepted

The problem has nothing to do with the function itself, but with the signature you attach to it yourself:

final' :: [a] -> a

Here you basically say that your final' function will work for any a. So I could - if I wanted - add Strings together, as well as IO () instances, or anything else. But now Haskell inspects your function, and notices that you perform an addition (+) :: Num a => a -> a -> a, with as right operand x, which has type a. Like the signature for (+) already says, both operands should have the same type, and that type should be an instance of Num.

You can solve the problem by making the signature more restrictive:

final' :: Num a => [a] -> a
final' lst = foldl(\accum x -> accum - accum + x) 0 lst

In fact we can also generalize a part of the signature, and let it work for any Foldable:

final' :: (Num a, Foldable f) => f a -> a
final' lst = foldl(\accum x -> accum - accum + x) 0 lst

We can however get rid of the accum, since subtracting a number from itself, will usually result in zero (except for rounding issues, etc.):

final' :: (Num a, Foldable f) => f a -> a
final' = foldl (const id) 0

Now we got rid of (+) (and (-)), but still need to use Num. The reason is that you use 0 as initial accumulator, and in case of an empty list, we thus will return 0, and 0 :: Num n => n.

  • Thanks! but then shouldn't final' :: [a] -> a work without the restriction if I take out the "accum - accum"? so basically --- foldl(\accum x -> x)? – hdizzle Apr 17 at 11:51
  • @hdizzle: no, since - as is written at the end of the answer - you still have 0 as initial accumulator. If the list turns out to be empty, then it will return the initial accumulator, so 0, and 0 has a type that is an instance of Num. – Willem Van Onsem Apr 17 at 11:52
  • that makes sense! thanks again! @WillemVanOnsem – hdizzle Apr 17 at 11:56

Your Answer

 

By clicking "Post Your Answer", you acknowledge that you have read our updated terms of service, privacy policy and cookie policy, and that your continued use of the website is subject to these policies.

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