Whether `m`

can be "any TreeLike" depends on your perspective.

From the perspective of implementing `improve`

, it's true--`m`

can be any `TreeLike`

, so it picks one that's convenient, and uses `abs`

.

From the perspective of the argument `m`

--which is to say, the perspective of whatever is applying `improve`

to some argument, something that's rather the opposite holds: `m`

in fact *must be able to be* any `TreeLike`

, not a single one that we choose.

Compare this to the type of numeric literals--something like `(5 :: forall a. Num a => a)`

means that it's any `Num`

instance we want it to be, but if a function expects an argument of type `(forall a. Num a => a)`

it wants something that can be any `Num`

instance *it* chooses. So we could give it a polymorphic `5`

but not, say, the `Integer`

5.

You can, in many ways, think of polymorphic types as meaning that the function takes a type as an extra argument, which tells it what specific type we want to use for each type variable. So to see the difference between `(forall m. TreeLike m => m a) -> Tree a`

and `forall m. TreeLike m => m a -> Tree a`

you can read them as something like `(M -> M a) -> Tree a`

vs. `M -> M a -> Tree a`

.