In solving projecteuler.net's problem #31 [**SPOILERS AHEAD**] (counting the number of ways to make 2£ with the British coins), I wanted to use dynamic programming. I started with OCaml, and wrote the short and very efficient following programming:

```
open Num
let make_dyn_table amount coins =
let t = Array.make_matrix (Array.length coins) (amount+1) (Int 1) in
for i = 1 to (Array.length t) - 1 do
for j = 0 to amount do
if j < coins.(i) then
t.(i).(j) <- t.(i-1).(j)
else
t.(i).(j) <- t.(i-1).(j) +/ t.(i).(j - coins.(i))
done
done;
t
let _ =
let t = make_dyn_table 200 [|1;2;5;10;20;50;100;200|] in
let last_row = Array.length t - 1 in
let last_col = Array.length t.(last_row) - 1 in
Printf.printf "%s\n" (string_of_num (t.(last_row).(last_col)))
```

This executes in ~8ms on my laptop. If I increase the amount from 200 pence to one million, the program still finds an answer in less than two seconds.

I translated the program to Haskell (which was definitely not fun in itself), and though it terminates with the right answer for 200 pence, if I increase that number to 10000, my laptop comes to a screeching halt (lots of thrashing). Here's the code:

```
import Data.Array
createDynTable :: Int -> Array Int Int -> Array (Int, Int) Int
createDynTable amount coins =
let numCoins = (snd . bounds) coins
t = array ((0, 0), (numCoins, amount))
[((i, j), 1) | i <- [0 .. numCoins], j <- [0 .. amount]]
in t
populateDynTable :: Array (Int, Int) Int -> Array Int Int -> Array (Int, Int) Int
populateDynTable t coins =
go t 1 0
where go t i j
| i > maxX = t
| j > maxY = go t (i+1) 0
| j < coins ! i = go (t // [((i, j), t ! (i-1, j))]) i (j+1)
| otherwise = go (t // [((i, j), t!(i-1,j) + t!(i, j - coins!i))]) i (j+1)
((_, _), (maxX, maxY)) = bounds t
changeCombinations amount coins =
let coinsArray = listArray (0, length coins - 1) coins
dynTable = createDynTable amount coinsArray
dynTable' = populateDynTable dynTable coinsArray
((_, _), (i, j)) = bounds dynTable
in
dynTable' ! (i, j)
main =
print $ changeCombinations 200 [1,2,5,10,20,50,100,200]
```

I'd love to hear from somebody who knows Haskell well why the performance of this solution is so bad.