# Scheme while loop

I'm kinda new in scheme syntax... I'm trying to make a simple program where you input an integer, if the integer is even do something and if it's odd do something else. I was able to do this part. Now, I need to make a loop where I can decrement the number until it equals to 1. Here is my code :

``````#lang racket

(define (even? n)
(if (eqv? n 0) #t
(odd? (- n 1))))
(define (odd? n)
(if (eqv? n 0) #f
(even? (- n 1))))

; this is the function that i wanted to be inside the loop
(define (sequence n)
(cond
[(even? n) n( / n 2)]
[(odd? n) n(+(* n 3) 1) ] )

)
(sequence 5)
``````

The output should be a sequence of numbers. In other words, it should be inside a list.

-

An output list is built by consing each of the elements that are part of the list and then advancing the recursion over the input, until the input is exhausted (in your case, when the number `n` is one). By successively consing elements at the head of the list and ending the recursion with a null value, a new proper list is created and returned at the end of the procedure execution. Here's how:

``````(define (sequence n)
(cond [(= n 1)                              ; if n=1, it's the  exit condition
(list n)]                            ; return a list with last element
[(even? n)                            ; if n is even
(cons n (sequence (/ n 2)))]         ; cons n and advance the recursion
[(odd? n)                             ; if n is odd
(cons n (sequence (+ (* n 3) 1)))])) ; cons n and advance the recursion
``````

The above will return a list with the Collatz sequence for the given number `n`:

``````(sequence 6)
=> '(6 3 10 5 16 8 4 2 1)
``````

As a side note: the procedures `even?` and `odd?` are standard in Scheme and you don't have to redefine them.

-
thanks this is perfect and fast – user2070173 Feb 13 '13 at 22:57
could you please explain in which part in the code n is decrementing by 1 ,, what if i have a case that i want to increment instead. Thanks – user2070173 Feb 13 '13 at 23:00
In the Collatz sequence the number is not decremented by one. If n is even then we decrement it by halving it in this part `(/ n 2)`. If n is odd then we actually increment it in this part: `(+ (* n 3) 1)`. Notice that in both cases the modified value of `n` is passed as a parameter to the next recursive call, and that's how we usually implement a loop in Scheme – Óscar López Feb 13 '13 at 23:03
i see that clears what's in my mind i'm in progress of expanding this project, but i'm trying to do it myself first to understand,, i might post here again. – user2070173 Feb 13 '13 at 23:09
please check this link for the second part of the project: stackoverflow.com/questions/14883062/for-loop-in-scheme – user2070173 Feb 14 '13 at 20:04