I'll explain in math, here's the transformation I'm struggling to write Scheme code for:

```
(f '(a b c) '(d e f)) = '(ad (+ bd ae) (+ cd be af) (+ ce bf) cf)
```

Where two letters together like `ad`

means `(* a d)`

.

I'm trying to write it in a purely functional manner, but I'm struggling to see how. Any suggestions would be greatly appreciated.

Here are some examples:

```
(1mul '(0 1) '(0 1)) = '(0 0 1)
(1mul '(1 2 3) '(1 1)) = '(1 3 5 3)
(1mul '(1 2 3) '(1 2)) = '(1 4 7 6)
(1mul '(1 2 3) '(2 1)) = '(2 5 8 3)
(1mul '(1 2 3) '(2 2)) = '(2 6 10 6)
(1mul '(5 5 5) '(1 1)) = '(5 10 10 5)
(1mul '(0 0 1) '(2 5)) = '(0 0 2 5)
(1mul '(1 1 2 3) '(2 5)) = '(2 7 9 16 15)
```

So, the pattern is like what I posted at the beginning:

Multiply the first number in the list by every number in the second list (ad, ae, af) and then continue along, (bd, be, bf, cd, ce, cf) and arrange the numbers "somehow" to add the corresponding values. The reason I call it overlapping is because you can sort of visualize it like this:

```
(list
aa'
(+ ba' ab')
(+ ca' bb' ac')
(+ cb' bc')
cc')
```

Again,

```
(f '(a b c) '(d e f)) = '(ad (+ bd ae) (+ cd be af) (+ ce bf) cf)
```

However, not just for 3x3 lists, for any sized lists.