# It could refer to either `Data.Monoid.<>'

I have following declaration:

``````data Two a b = Two a b deriving (Eq, Show)

instance (Semigroup a, Semigroup b) => Semigroup (Two a b) where
(Two a b) <> (Two c d) = Two (a <> c) (b <> d)
``````

And tried it in the prelude:

``````*Main First Lib MonoidLaws Semi>   (Two a b) <> (Two c d) = Two (a <> c) (b <> d)

<interactive>:10:3: error:
* Occurs check: cannot construct the infinite type: t1 ~ Two t1 t1
Expected type: t1 -> t -> b
Actual type: Two t1 t1 -> Two t t -> Two b b
* Relevant bindings include
(<>) :: t1 -> t -> b (bound at <interactive>:10:3)
``````

How can I use `mappend` function from `Semigroup` for `Two` datatype in prelude?

• What are the types of `a` and `b` in the repl?
– Lee
Jun 27, 2017 at 12:04
• What do you hope to accomplish by typing `Two a b <> Two c d = Two (a <> c) (b <> d)` in the REPL? That's a declaration, i.e. you define a new `<>` operator there (which is not connected to the one from the `Semigroup` class). Why? Jun 27, 2017 at 12:27

Try it with something that's an instance of Semigroup, like `List`.
``````> (Two "1" "2") <> (Two "3" "4")
In your attempt / example, `a` and `b`, `c` and `d` are not defined, so Haskell sees them as variables. Because you're using `=` between them, it's assuming you want to do pattern matching, so it's trying to match them to themselves, which is causing an infinite loop (as that is perfectly valid Haskell — to define values in terms of themselves). This is causing an error, though, because it would imply an infinite type, which it definitely seems is not what you want.