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 ‘+’
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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 ‘+’
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 String
s 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
.
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
accum - accum + ...
? – Willem Van Onsem Apr 17 at 11:36accum - accum
seems like a very awkward way of writing0
. – leftaroundabout Apr 17 at 11:43accum
? – Willem Van Onsem Apr 17 at 11:43