Your `sumList`

function is a good start. It already iterates (recursively) over the entire list, so you don't need to wrap it in an additional `Array.map`

. You just need to extend your `sumList`

so that it adds the number only when it matches the specified condition.

Here is a solution to a simplified problem - add all numbers that are divisible by 3:

```
open System
let rec sumList xs =
match xs with
| [] -> 0 // If the list is empty, the sum is zero
| y::ys when y % 3 = 0 ->
// If the list starts with y that is divisible by 3, then we add 'y' to the
// sum that we get by recursively processing the rest of the list
y + sumList ys
| y::ys ->
// This will only execute when y is not divisible by 3, so we just
// recursively process the rest of the list and return
/// that (without adding current value)
sumList ys
// For testing, let's sum all numbers divisble by 3 between 1 and 10.
let sum = sumList [ 1 .. 10 ]
```

This is the basic way of writing the function using explicit recursion. In practice, the solution by *jpalmer* is how I'd solve it too, but it is useful to write a few recursive functions yourself if you're learning F#.

The *accumulator parameter* mentioned by *sashang* is a more advanced way to write this. You'll need to do that if you want to run the function on large inputs (which is likely the case in Euler problem). When using accumulator parameter, the function can be written using *tail recursion*, so it avoids stack overflow even when processing long lists.

The idea of a accumulator-based version is that the function takes additional parameter, which represents the sum calculated so far.

```
let rec sumList xs sumSoFar = ...
```

When you call it initially, you write `sumList [ ... ] 0`

. The recursive calls will not call `y + sumList xs`

, but will instead add `y`

to the accumulator and then make the recursive call `sumList xs (y + sumSoFar)`

. This way, the F# compiler can do tail-call optimization and it will translate code to a loop (similar to the C++ version).