This problem can be solved a lot easier with `apply`

, using the fact that the comparison operators receive a variable number of arguments:

```
(apply < '(1 2 3 4))
=> #t
(apply < '(1 2 5 4))
=> #f
```

**UPDATE**

For this problem in particular, `foldr`

is not the right tool for the job (although it's not impossible, as you've demonstrated) - there isn't a value to be "accumulated" while the list is being traversed, the list is either ordered or not for the given predicate.

From the comments, I understand that the `pre?`

procedure can be an arbitrary `lambda`

that receives exactly two parameters.

A possible solution would be to create al list of all pairs of consecutive elements, and check if the predicate holds true for all of them. Notice that the last element won't have a corresponding pair, so we need to exclude it from the list of pairs. For that, I'll define a special `zip`

procedure that, given two input lists, takes care of creating a list of pairs taking into account the fact that the lists can be of different lengths:

```
(define (zip lst1 lst2)
(if (or (null? lst1) (null? lst2))
'()
(cons (list (car lst1) (car lst2))
(zip (cdr lst1) (cdr lst2)))))
(zip '(1 2 3) '(2 3))
=> '((1 2) (2 3))
```

Now putting all together, we can solve the original problem like this:

```
(define (accum? lst pre?)
(andmap (lambda (tuple)
(pre? (car tuple) (cadr tuple)))
(zip lst (cdr lst))))
```

Bear in mind that it won't work for empty lists, but it's trivial to add a special case for this. Now the comparison can be made with arbitrary `lambdas`

:

```
(accum? '(1 2 3) (lambda (a b) (= a (- b 1))))
=> #t
```

`pre?`

directly, notice that the`if`

ends up returning the same as`pre?`

– Óscar López Dec 1 '12 at 19:14