OK, let's break down your code. Here's your original.

```
let rec meld3 l1 l2 accum =
if List.length l2 = 1 then
List.append accum [ (hd l2 + max (hd l1) (hd (tl l1)))]
else
(
List.append accum [ (hd l2 + max (hd l1) (hd (tl l1)))];
meld3 (tl l1) (tl l2) accum ;
)
```

The first thing I'm going to do is rewrite it so a Caml programmer will understand it, *without* changing any of the computations. Primarily this means using pattern matching instead of `hd`

and `tl`

. This transformation is *not* trivial; it's important to simplify the list manipulation to make it easier to identify the problem with the code. It also makes it more obvious that this function fails if `l2`

is empty.

```
let rec meld3 l1 l2 accum = match l1, l2 with
| x1::x2::xs, [y] -> (* here the length of l2 is exactly 1 *)
List.append accum [ y + max x1 x2 ]
| x1::x2::xs, y::ys -> (* here the length of l2 is at least 1 *)
( List.append accum [ y + max x1 x2 ]
; meld3 (x2::xs) ys accum
)
```

Now I think the key to your difficulty is the understanding of the semicolon operator. If I write (*e1*; *e2*), the semantics is that *e1* is evaluated *for side effect* (think `printf`

) and then *the result of e1 is thrown away*. I think what you want instead is for the result of *e1* to become the new value of `accum`

for the recursive call. So instead of throwing away *e1*, we make it a parameter (**this is the key step** where the computation actually changes):

```
let rec meld3 l1 l2 accum = match l1, l2 with
| x1::x2::xs, [y] -> (* here the length of l2 is exactly 1 *)
List.append accum [ y + max x1 x2 ]
| x1::x2::xs, y::ys -> (* here the length of l2 is at least 1 *)
(
meld3 (x2::xs) ys (List.append accum [ y + max x1 x2 ])
)
```

Next step is to observe that we've violated the Don't Repeat Yourself principle, and we can fix that by making the base case where `l2`

is empty:

```
let rec meld3 l1 l2 accum = match l1, l2 with
| x1::x2::xs, [] -> (* here the length of l2 is 0 *)
accum
| x1::x2::xs, y::ys -> (* here the length of l2 is at least 1 *)
(
meld3 (x2::xs) ys (List.append accum [ y + max x1 x2 ])
)
```

We then clean up a bit:

```
let rec meld3 l1 l2 accum = match l1, l2 with
| _, [] -> accum
| x1::x2::xs, y::ys -> meld3 (x2::xs) ys (List.append accum [ y + max x1 x2 ])
```

Finally, the repeated calls to `append`

make the code quadratic. This is a classic problem with accumulating parameters and has a classic solution: accumulate the answer list in reverse order:

```
let rec meld3 l1 l2 accum' = match l1, l2 with
| _, [] -> List.rev accum'
| x1::x2::xs, y::ys -> meld3 (x2::xs) ys (y + max x1 x2 :: accum')
```

I've changed the name `accum`

to `accum'`

; the prime is conventional for a list in reverse order. This last version is the only version I have compiled, and I haven't tested any of the code. (I did test the code in my other answer).

I hope this answer is more helpful.