I am getting into Haskell and found the book "learn you a Haskell" most helpful. I am up to the section on applicative functors.
I am puzzled by the following as it appears in the book:
(\x y z -> [x, y, z]) <$> (+3) <*> (*2) <*> (/2) $ 5
which yields the output:
First of all, I have confirmed my suspicion in ghci in regards to precedence of the operators, so that the above equals the following ugly statement:
(((\x y z -> [x,y,z]) <$> (+3)) <*> (*2) <*> (/2)) $ 5
So from that it becomes clear that the first thing that happens is the
fmap call via the
(<$>) infix operator.
And this is the core of what boggles my mind currently.
The definition of
fmap (here shown as infix
(<$>) :: (Functor f) => (a -> b) -> f a -> f b
But in the equation I am struggling with,
(\x y z -> [x, y, z]) takes three arguments, not just one. So how could the first argument of type
(a -> b) be satisfied?
I think it might have to do with partial application / currying but I cannot figure it out. I would greatly appreciate an explanation. Hope I have formulated the question well enough.