Eq doesn't exist in a vacuum. To compare two things for equality, you have to have two things. And, crucially, those two things have to be of the same type. In Haskell,
0 == "A" isn't just false; it's a type error. It literally doesn't make sense.
f == s
When the compiler sees this, even if it knows nothing else about the types of
s, it knows what
(==) is a function with the following signature.
(==) :: Eq a => a -> a -> Bool
Both arguments are of the same type. So now and forevermore, for the rest of type-checking this expression, we must have
s of the same type. Anything required of
s is also required of
s takes values from
[0, 1..10]. Your type constraints come as follows
Num is required since
s takes values from a list of literal integers.
Enum is required by the
[..] list enumeration syntax.
Show is required by
Eq is required by the
f == s equality expression.
Now, if we replace
s with a constant, we get something like
func f = [(show s, f == 0) | s <- [0, 1..10]]
f is being compared with
0. It has no relation to
Num (since we're comparing against zero, a number).
s, on the other hand, requires
Show. In the abstract, this should actually be a type error, since we've given no indication as to which type
s should be and there aren't enough clues to figure it out. But type defaulting kicks in and we'll get
Integer out of it.