I actually like idea of lazy sequences in this case. You can split your algorithm in 2 logical steps.

At first you want to work on all natural numbers (ok.. not all, but up to max int), so you define them like this:

```
val naturals = 0 to Int.MaxValue
```

Then you need to define knowledge about how numbers, that you want to sum, can be calculated:

```
val myDoubles = (naturals by 6 tail).view map (x => x * x)
```

And putting this all together:

```
val naturals = 0 to Int.MaxValue
val myDoubles = (naturals by 6 tail).view map (x => x * x)
val mySum = myDoubles take 10 sum
```

I think it's the way mathematician will approach this problem. And because all collections are lazily evaluated - you will not get out of memory.

### Edit

If you want to develop idea of mathematical notation further, you can actually define this implicit conversion:

```
implicit def math[T, R](f: T => R) = new {
def ∀(range: Traversable[T]) = range.view map f
}
```

and then define `myDoubles`

like this:

```
val myDoubles = ((x: Int) => x * x) ∀ (naturals by 6 tail)
```