I'll give you some *hints* to solve this. A first naïve approach, would be to precalculate a list of sums of each of the size-2 combinations of the input list and then test to see which of the input lists' elements belong in the list of sums. As a final step, remove the duplicates.

Assuming that a `comb`

procedure exists for calculating all possible combinations of the `lst`

list with a given size `m`

(look for it, or implement it yourself!), here's a very short answer for the problem, implementing the naïve algorithm explained above - which should be good enough for lists with 1000 elements or so:

```
(require srfi/26) ; I like to use `cut`, but `lambda` would serve just as well
(define (comb lst m)
<???>) ; ToDo: generate all m-size combinations of lst
(define (sumfilt lst)
(let ((sums (map (cut apply + <>) (comb lst 2))))
(remove-duplicates (filter (cut member <> sums) lst))))
```

Or equivalently, using `cute`

for evaluating the precalculated list of sums only once:

```
(define (sumfilt lst)
(remove-duplicates
(filter (cute member <> (map (cut apply + <>) (comb lst 2))) lst)))
```

A more efficient approach would involve some variation of the subset sum problem, solved by means of dynamic programming. Such a solution would be more elaborate to write, though. Either way, don't forget to test your answer:

```
(sumfilt '(1 4 7 5 17 11))
=> '(5 11)
(sumfilt '(5 4 7 5 9 1 10))
=> '(5 9 10)
```