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# Why aren't Nums Ords in Haskell?

I know that for a type to have an instance of the `Num` typeclass, there must be one from `Eq` and `Show`

``````class (Eq a, Show a) => Num a
``````

I'm wondering why it's required to be `Eq` rather than `Ord`. Does it make sense for a numerical type to be in `Eq` but not in `Ord`?

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Complex numbers, for example, can be added, subtracted, multiplied and tested for equality, but not ordered. See `Complex a` from Data.Complex in base.

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Complex numbers can be ordered (e.g. lexicographic ordering is both partial and total). Note that this isn't a particularly useful ordering (and they don't permit and ordering which makes them an ordered field). – cmh Feb 4 '13 at 23:02
@cmh I would say it is a very useful ordering, in the sense that it makes `Set.fromList [1 :+ 1]` work, as well as `Map.fromList [(1 :+ 1, 1)]` work. I would also say it is useful for searching through values as the ordering is easy to search (for both humans and computers (binary search)). – semicolon Mar 20 at 3:05
@semicolon agreed, it does have some useful computational value. I think when I wrote this comment I mean that it wasn't particularly useful from a mathematicians perspective, although it was 3 years ago! – cmh Mar 22 at 0:24

Note that the `Eq` and `Show` constraints were also widely considered a misfeature. For example, they prevent perfectly valid instances of `Num` for things containing functions. In the latest version of GHC, those constraints are also removed, leaving `Num` with no superclass constraints at all.

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We should have an instance `Num b => Num (a -> b)`. In math the function that in Haskell we would write `const 2` is almost always just called `2`, and it is silly that in a language with support for proper overloading we have not historically lifted the numeric types to functions. The numeric hierarchy is still broken because `Num` is still way to big. (I wish the standard had classes like `AdditiveMonoid`, `AdditiveGroup`, `AdditionCommutes`, `Ring`, etc) – Philip JF Feb 4 '13 at 19:47
Arguably, Num for any applicative functor... – sclv Feb 4 '13 at 19:49
And for those who haven't discovered what sclv means, just think of what `liftA2 (+)` does... – Luis Casillas Feb 4 '13 at 19:52
@PhilipJF: so `2 x ≡ 2` for all `x`? I wouldn't be too happy about that... – leftaroundabout Feb 4 '13 at 19:52
@leftaroundabout yes, more programs would type check unintentionally, but not that many more. Usually you would get the error to show up eventually. – Philip JF Feb 4 '13 at 20:00