Going step by step:

```
list2 = list of numbers
```

We'll take this as a given, so `list2`

is still just a list of numbers.

```
for i from 0 to N // N being a positive integer
```

The correct way to do this in Haskell is generally with a list. Laziness means that the values will be computed only when used, so traversing a list from 0 to N ends up being the same thing as the loop you have here. So, just `[0..n]`

will do the trick; we just need to figure out what to do with it.

```
for each number in list2
```

Given "for each" we can deduce that we'll need to traverse the entirety of `list2`

here; what we do with it, we don't know yet.

```
if number == i, add to list1
```

We're building `list1`

as we go, so ideally we want that to be the final result of the expression. That also means that at each recursive step, we want the result to be the `list1`

we have "so far". To do that, we'll need to make sure we pass each step's result along as we go.

So, getting down to the meat of it:

The `filter`

function finds all the elements in a list matching some predicate; we'll use `filter (== i) list2`

here to find what we're after, then append that to the previous step's result. So each step will look like this:

```
step :: (Num a) => [a] -> a -> [a]
step list1 i = list1 ++ filter (== i) list2
```

That handles the inner loop. Stepping back outwards, we need to run this for each value `i`

from the list `[0..n]`

, with the `list1`

value being passed along at each step. This is exactly what fold functions are for, and in this case `step`

is exactly what we need for a left fold:

```
list2 :: (Num a) => [a]
list2 = -- whatever goes here...
step :: (Num a) => [a] -> a -> [a]
step list1 i = list1 ++ filter (== i) list2
list1 :: (Num a) => a -> [a]
list1 n = foldl step [] [0..n]
```

If you're wondering where the recursion is, both `filter`

and `foldl`

are doing that for us. As a rule of thumb, it's usually better to avoid direct recursion when there are higher-level functions to do it for you.

That said, the algorithm here is silly in multiple ways, but I didn't want to get into that because it seemed like it would distract from your actual question more than it would help.