# Scheme: All Possible Shifts from Front of List to Back

I need to write a Scheme function that takes a list as an argument and returns a list of lists where every list is a cycle of the original list. By a cycle, I mean shifting the first element to the last position. I have the following functions:

``````(define (cycle lst)
(cond ((null? lst) '())
((null? (cdr lst)) lst)
(else (append (cdr lst) (list (car lst))))))

(define (shift lst)
(define (iter l cycles result)
(cond ((= cycles 0) (cons lst result))
((< cycles 1) result)
(else (iter (cycle-1 l) (- cycles 1) (cons result (cycle-1 l))))))
(iter lst (- (length lst) 1) '()))
``````

Now, when I do: (shift '(1 2 3)) I get: '((1 2 3) (() 2 3 1) 3 1 2) I should get: '((1 2 3) (2 3 1) (3 1 2))

-
`cycle-1`s in `shift` function should be `cycle` in this code to make it work. –  sinan Feb 16 '12 at 7:47

``````(define (shift lst)
(define (iter l cycles result)
(cond ((= cycles 0)
(cons lst result))
((< cycles 0) result)
(else (let ((cycled (cycle l)))
(iter cycled (- cycles 1) (cons cycled result))))))
(iter lst (- (length lst) 1) '()))
``````

First, I've made a simple improvement to prevent calculate cycled form of the list twice(added `let`). Second, you need to cons `cycled` to `result` since you need to append `result` list, not `cycled` list. In your code, you're adding last result to old results and then passing this wrongly appended results list to `iter` functions as `result` parameter.

Update: To get the results in your order you can simple just append result with cycled list, instead of adding cycled list to head of the result:

``````(define (shift lst)
(define (iter l cycles result)
(cond ((= cycles 0)
(cons lst result))
((< cycles 0) result)
(else (let ((cycled (cycle l)))
(iter cycled (- cycles 1) (append result (list cycled)))))))
(iter lst (- (length lst) 1) '()))
``````
-
First of all, thank you very much. Just a nitpick though. I am getting '((1 2 3) (3 1 2) (2 3 1)) I was wondering if it was possible to get: '((1 2 3) (2 1 3) (3 1 2)) ? –  Glen Marek Feb 16 '12 at 7:54
@Glen, see my update –  sinan Feb 16 '12 at 8:12
Oh...of course! I see it now. Thanks a lot! –  Glen Marek Feb 16 '12 at 8:28