Suppose I want to make all numbers an instance of `Monoid`

. Instead of having to create an instance for each `Num`

like this:

```
instance Monoid Int where
mappend = (+)
mempty = 0
instance Monoid Float where
mappend = (+)
mempty = 0.0
-- etc
```

Is there something like this?

```
instance Num t => Monoid t where
mappend = (+)
mempty = 0
```

# Edit

Some are answering with GHC extensions and warning about the potential issues; I found that informative, but I think I will stick with `Sum`

, `Product`

and whatever `coerce`

does.

`Sum`

and`Product`

(see Data.Monoid) – Carsten Sep 24 '15 at 19:21`Sum`

, I can do this:`mconcat ([1,2] :: Sum Int)`

, which is nice, but I can't do`mconcat ([1,2] :: Sum Float)`

, nor`mconcat ([1,2] :: Sum Fractional)`

. What is the proper way to use`Sum`

for`Float`

s and`Double`

s? – Lay González Sep 24 '15 at 20:03`mconcat ([1,2] :: [Sum Float])`

works fine for me ;) – Carsten Sep 24 '15 at 20:30`Fractional`

is no type, it's a class, so`Sum Fractional`

makes no sense here (`Sum`

wants something of kind`*`

as it's first parameter, but`Fractional`

is`* -> Constraint`

) – Carsten Sep 24 '15 at 20:33`:: [Sum Int]`

in the first example not`:: Sum Int`

. And what I couldn't get to work was`mconcat ([1.0, 2.0] :: [Sum Float])`

;`mconcat ([1, 2] :: [Sum Float])`

works fine. – Lay González Sep 24 '15 at 20:35