I'm going to answer your question with commented examples, in the hope that you actually learn something instead of just being given code that works. Actually, looking at several pieces of code may be more enlightening, assuming that you're new to scheme.

Your original definition looked like this:

```
(define (evens lis)
(cond (;; Check: Recursion stop condition
(null? lis)
'())
(;; Wrong: Calling length at each step => O(n^2)
;; Wrong: Assuming even element if list has even number of elements
(= (modulo (length lis) 2) 0)
;; Wrong: Recursing with the rest of the list, you'll get odds
(cons (car lis) (evens (cdr lis))))
(else
;; Wrong: Recursing with the rest of the list with cdr, you'll get odds
(evens (cdr lis)))))
```

Afterwards, you've edited your question to update it to something like this:

```
(define (evens lis)
(cond (;; Check: Recursion stop condition
(null? lis)
'())
(else
;; Check: Building list with second element
;; Wrong: If lis only has 1 element,
;; (cdr lis) is null and (car (cdr list)) is an error.
(cons (cadr lis)
;; Wrong: Recursing with cdr, you'll get odds
(evens (cdr lis))))))
```

A solution is to check if the list has at least a second element:

```
(define (evens lis)
(cond (;; Check: Recursion stop condition 1
(null? lis)
'())
(;; Check: Recursion stop condition 2: list of length = 1
(null? (cdr lis))
'())
(else
;; Check: Building list with second element
;; The previous cond clauses have already sorted out
;; that lis and (cdr lis) are not null.
(cons (cadr lis)
;; Check: Recurse "the rest of the rest" of lis with cddr
(evens (cddr lis)))))
```

Exercise: Use `if`

and `or`

to simplify this solution to only have 2 branches.

`cddr`

function. – Will Ness Nov 14 '12 at 12:27