I'm working with type level Nats and I want to reduce a ratio to its simplest terms:

```
import GHC.TypeLits
import GHC.TypeLits.Extra
data TC (n::Nat) (d::Nat) = TC Int Int deriving Show
type family Norm (n::Nat) (d::Nat) ::(Nat, Nat) where
Norm n d = '(Div n (GCD n d), Div d (GCD n d))
norm :: Norm n d ~ '(np dp) => TC n d -> TC np dp
norm (a,b) = TC (div a (gcd a b)) (div b (gcd a b))
```

If I have two different terms:

```
a = TC 1 2 :: TC 1 2
b = TC 2 3 :: TC 2 3
```

Then:

```
norm a :: TC 1 2
norm b :: TC
(GHC.TypeNats.Div 2 (GHC.TypeLits.Extra.GCD 2 3))
(GHC.TypeNats.Div 3 (GHC.TypeLits.Extra.GCD 2 3))
```

This is similar to this question, however in my case type checking doesn't force it to reduce:

```
norm (TC 2 3 :: TC 2 3) :: TC 2 3
```

fails with:

```
* Couldn't match type `GHC.TypeNats.Div
3 (GHC.TypeLits.Extra.GCD 2 3)'
with `3'
```

`{-# OPTIONS_GHC -fplugin GHC.TypeLits.Extra.Solver #-}`

at the top – Li-yao Xia Jan 11 at 15:20`Norm n d ~ '(np dp)`

should be`Norm n d ~ '(np, dp)`

I think. – chi Jan 11 at 19:34