Suppose I have a custom type wrapping an existing type,

```
newtype T = T Int deriving Show
```

and suppose I want to be able to add up `T`

s, and that adding them up should result in adding the wrapped values up; I would do this via

```
instance Num T where
(T t1) + (T t2) = T (t1 + t2)
-- all other Num's methods = undefined
```

I think we are good so far. Please, tell me if there are major concerns up to this point.

Now let's suppose that I want to be able to multiply a `T`

by an `Int`

and that the result should be a `T`

whose wrapping value is the former multiplied by the int; I would go for something like this:

```
instance Num T where
(T t1) + (T t2) = T (t1 + t2)
(T t) * k = T (t * k)
-- all other Num's methods = undefined
```

which obviously doesn't work because `class Num`

declares `(*) :: a -> a -> a`

, thus requiring the two operands (and the result) to be all of the same type.

Even defining `(*)`

as a free function poses a similar problem (i.e. `(*)`

exists already in `Prelude`

).

How could I deal with this?

As for the why of this question, I can device the following

- in my program I want to use
`(Int,Int)`

for 2D vectors in a cartesian plane, - but I also use
`(Int,Int)`

for another unrelated thing, - therefore I have to disambiguate between the two, by using a
`newtype`

for at least one of them or, if use`(Int,Int)`

for several other reasons, then why not making all of them`newtype`

s wrapping`(Int,Int)`

? - since
`newtype Vec2D = Vec2D (Int,Int)`

represents a vector in the plain, it makes sense to be able to do`Vec2D (2,3) * 4 == Vec2D (8,12)`

.