Add type signatures to your functions, then the problem becomes obvious:

```
mergeAsc, mergeDesc :: Ord a => [a] -> [a]
mergeDesc xs = reverse (mergeAsc xs)
mergeAsc [] = []
mergeAsc [x] = [x]
mergeAsc xs = merge (mergeAsc top) (mergeAsc bottom) where (top, bottom) = splitAt (length xs `div` 2) xs
merge :: Ord a => [a] -> [a] -> [a]
merge [] ys = ys
merge xs [] = xs
merge (x:xs) (y:ys) | x <= y = x : merge xs (y:ys)
| otherwise = y : merge (x:xs) ys
```

So, if you define `mergeSort`

as `merge`

, it's a function that merely merges two ordered lists, when you actually want it to order a single list. You can achieve that with

```
mergeSort xs = mergeAsc xs
```

or simply and preferrably,

```
mergeSort = margeAsc
```

Note that `mergeDesc`

isn't really nice: you first sort the list in the wrong order, and then reverse it? In Haskell, you want your algorithms to be flexible enough to handle stuff like different orderings by themselves. So you would define

```
mergeSortBy :: (a->a->Ordering) -> [a] -> [a]
mergeSortBy cmp = mSort
where
mSort [] = []
mSort [x] = [x]
mSort xs = merge (mSort top) (mSort bottom)
where (top, bottom) = splitAt (length xs `quot` 2) xs
merge [] ys = ys
merge xs [] = xs
merge (x:xs) (y:ys) = case x`cmp`y of
LT -> x : merge xs (y:ys)
_ -> y : merge (x:xs) ys
```

Then you can simply define `mergeSort = mergeSortBy compare`

, and `mergeSortDesc = mergeSortBy (flip compare)`

.

Also observe how making `merge`

a local function prevents the error you had in your implementation.

and it says it should be declared as: mergeSort :: ([a]->[a]->[a]) -> [a] -> [a] as the function that accepts the merging function as the first argument...

That's strange, it shouldn't be called `mergeSort`

then but `sortWithMerge`

or something. Anyway, it's simple enough to do that: just throw out `cmp`

(which is only used in the `merge`

subfunction!) and replace it with merge as an argument instead of defining that locally.

```
sortWithMerge :: ([a]->[a]->[a]) -> [a] -> [a]
sortWithMerge merger = mSort
where
mSort [] = []
mSort [x] = [x]
mSort xs = merger (mSort top) (mSort bottom)
where (top, bottom) = splitAt (length xs `quot` 2) xs
```