Given that I have the data types

```
data A a = A a
data B b = B b
```

and the type class

```
class C c where
f :: c a -> a
```

Now the class C expects a type of kind `* -> *`

, so I can do

```
instance C A where
f (A a) = a
instance C B where
f (B b) = b
```

Now given a function such as:

```
ab :: b -> A (B b)
ab = A . B
```

How would I declare an instance of `C`

for the result type?

I first through I might be able to use a type synonym with `TypeSynonymInstances`

, like this:

```
type AB b = A (B b)
class C AB where
f (A (B b)) = b
```

Especially since ghci reports the correct kind:

```
*Main> :k AB
AB :: * -> *
```

However, you can't seem to use partially applied type synonyms in instance declarations (or anywhere, for that matter).

Is there some way I can compose the types `A`

and `B`

like I can compose the constructors, or some other syntax for declaring an instance for such a nested type?