Given this definition and a test matrix:

```
data (Eq a, Show a) => QT a = C a | Q (QT a) (QT a) (QT a) (QT a)
deriving (Eq, Show)
data (Eq a, Num a, Show a) => Mat a = Mat {nexp :: Int, mat :: QT a}
deriving (Eq, Show)
-- test matrix, exponent is 2, that is matrix is 4 x 4
test = Mat 2 (Q (C 5) (C 6) (Q (C 1) (C 0) (C 2) (C 1)) (C 3))
| | |
| 5 | 6 |
| | |
-------------
|1 | 0| |
|--|--| 3 |
|2 | 1| |
```

I'm trying to write a function that will output a list of **columns sum**, like: `[13, 11, 18, 18]`

. The base idea is to sum each sub-quadtree:

- If quadtree is
`(C c)`

, then output the a repeating`2 ^ (n - 1)`

times the value`c * 2 ^ (n - 1)`

.*Example*: first quadtree is`(C 5)`

so we repeat`5 * 2^(2 - 1) = 10`

,`2 ^ (n - 1) = 2`

times, obtaining [5, 5]. - Otherwise, given
`(Q a b c d)`

, we`zipWith`

the colsum of a and c (and b and d).

Of course this is **not working** (not even compiling) because after some recursion we have:

```
zipWith (+) [[10, 10], [12, 12]] [zipWith (+) [[1], [0]] [[2], [1]], [6, 6]]
```

Because I'm beginning with Haskell I feel I'm missing something, need some advice on function I can use. **Not working** colsum definition is:

```
colsum :: (Eq a, Show a, Num a) => Mat a -> [a]
colsum m = csum (mat m)
where
n = nexp m
csum (C c) = take (2 ^ n) $ repeat (c * 2 ^ n)
csum (Q a b c d) = zipWith (+) [colsum $ submat a, colsum $ submat b]
[colsum $ submat c, colsum $ submat d]
submat q = Mat (n - 1) q
```

Any ideas would be great and much appreciated...