I misread the OP as wanting to exhaust all the elements in the 2D list. Here's a version of the function I originally used that has the correct behavior:

```
pyramidT :: [[a]] -> [[a]]
pyramidT [] = [[]]
pyramidT (row:rows) = zipWith (:) row ([]:(pyramidT rows))
rearrangeT :: [[a]] -> [a]
rearrangeT = concat . pyramidT
-- Ghci> pyramidT testData
-- [[1],[2,5],[3,6,9],[4,7,10,13]]
-- Ghci> rearrangeT testData
-- [1,2,5,3,6,9,4,7,10,13]
```

(previous post:)

Here's a recursive solution. I don't like that I don't have an appropriate higher-order function to replace the helper `h`

with. The value `h a b`

is meant to emulate `zipWith (:) a b`

, but doing something appropriate whenever `a`

and `b`

are not the same length.

```
import Data.List
-- | Compute the list of diagonals
pyramid :: [[a]] -> [[a]]
pyramid [] = [[]]
pyramid (row:rows) = h row ([]:(pyramid rows)) where
h [] rs = rs -- pad left input with "empty" elements
h ls [] = map (:[]) ls -- pad right input with []s
h (l:ls) (r:rs) = (l:r):(h ls rs) -- act as zipWith would
-- | Compute the interleaving
rearrange :: [[a]] -> [a]
rearrange = concat . pyramid
testData :: [[Int]
testData = [[1,2,3,4]
,[5,6,7,8]
,[9,10,11,12]
,[13,14,15,16]]
-- Ghci> pyramid testData
-- [[1],[2,5],[3,6,9],[4,7,10,13],[8,11,14],[12,15],[16]]
-- Ghci> rearrange testData
-- [1,2,5,3,6,9,4,7,10,13,8,11,14,12,15,16]
```