I have an exam on thursday about Functional programming and I’m pretty sure that I will have to do a TAD with Polynomials. I’m adding polynomials for the moment like this:

```
type Pol = [(Int,Int)]
suma :: Pol -> Pol -> Pol
suma [] ys = ys
suma xs [] = xs
suma ((c1,g1):xs) ((c2,g2):ys)
| g1 == g2 = ((c1+c2,g1):(suma xs ys))
| g1 > g2 = ((c1,g1):(suma xs ((c2,g2):ys)))
| g1 < g2 = ((c2,g2):(suma ((c1,g1):xs) ys))
```

It perfectly works but the teacher doesn’t like. She prefers to do it with:

```
data Pol = P [(Int,Int)] deriving Show
```

At the beginning, I though it would be easy to change the structure but it’s not as I’m getting a lot of trouble in the compilation. Can anyone help me please? I tried this way but it doesn’t work:

```
data Pol = P [(Int,Int)] deriving Show
suma :: Pol -> Pol -> Pol
suma (P []) (P ys) = P ys
suma (P xs) (P []) = P xs
suma (P ((c1,g1):xs)) (P ((c2,g2):ys))
| g1 == g2 = P ((c1+c2,g1):suma (P xs) (P ys))
| g1 > g2 = P ((c1,g1):(suma (P xs) (P ((c2,g2):ys))))
| g1 < g2 = P ((c2,g2):(suma (P ((c1,g1):xs)) (P ys)))
```

I get this error:

```
ERROR file:.\Febrero 2011.hs:7 - Type error in application
*** Expression : P (c1 + c2,g1) : suma (P xs) (P ys)
*** Term : suma (P xs) (P ys)
*** Type : Pol
*** Does not match : [a]
```

Thank you so much!

`newtype`

instead of`data`

to avoid the extra indirection. – hammar Aug 29 '11 at 16:41