I thought I'd try the intriguing Representable-functors package to define a `Monad`

and `Comonad`

instance for the functor given by `data Pair a = Pair a a`

which is representable by `Bool`

; as mentioned in the answer to my earlier question on the vector monad.

The first thing I noticed was that to make my type an instance of `Representable`

, I should not only define `tabulate`

and `index`

, but also ensure my type is an instance of the `Indexable`

, `Distributive`

, `Keyed`

, `Apply`

, `Applicative`

, and `Functor`

type classes. Well, ok, `index`

completes the definition of `Indexable`

, and the `<.>`

function of `Apply`

can use `<*>`

from `Applicative`

; and it shouldn't be a surprise that a `Functor`

instance is required. Nevertheless, I am doubtful of my instances for `Keyed`

and `Distributive`

.

```
data Pair a = Pair a a
deriving (Show,Eq)
instance Functor Pair where
fmap f (Pair x y) = Pair (f x) (f y)
type instance Key Pair = Bool
instance Keyed Pair where
mapWithKey f (Pair x y) = Pair (f False x) (f False y)
instance Indexable Pair where
index (Pair x _) False = x
index (Pair _ y) True = y
instance Applicative Pair where
pure a = Pair a a
Pair f g <*> Pair x y = Pair (f x) (g y)
instance Apply Pair where
(<.>) = (<*>)
instance Distributive Pair where
collect f x = Pair (getL . f <$> x) (getR . f <$> x)
where getL (Pair x _) = x
getR (Pair _ y) = y
instance Representable Pair where
tabulate f = Pair (f False) (f True)
```

My `mapWithKey`

definition borrows from that of the `[]`

instance for `Keyed`

: though I don't understand why `0`

was used there for every iteration. I have similarly used `False`

for each term of `Pair`

.

As I concluded by defining the `Monad`

and `Comonad`

instances, I discovered that `Bool`

requires a `Semigroup`

definition for `Extend`

, and a `Monoid`

definition for `Comonad`

. I follow the `Semigroup`

instance for the `Either`

, which is isomorphic to `(||)`

, and choose `False`

for `mempty`

:

```
instance Monad Pair where
return = pureRep
(>>=) = bindRep
instance Monoid Bool where
mempty = False
mappend = (||)
instance Semigroup Bool where
(<>) = mappend
instance Extend Pair where
extend = extendRep -- needs Bool Semigroup
instance Comonad Pair where
extract = extractRep -- needs Bool Monoid
```

So then, have I met the requirements of the `Representable`

class correctly, and idiomatically?