Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

In racket how can I create a procedure, using filter and gcd, which does the following:

(list-of-numbers) number = > (list)

Where the resulting list includes the numbers from the list that are relatively prime to the single one?

EDIT: So far I've come up with the following code:

(define (coprime? list-of-num n)
  [(empty? list-of-num) empty]
   (filter (lambda (num)
           (= (gcd (first list-of-num) n) 1)) num))]))

But I'm completely lost and realize that it's kind of a mess. My general idea is to make a boolean function that returns #t whenever (gcd number-from-list number) equals one and then the procedure filters every number from the list that results in #t.

share|improve this question
What have you tried so far? please post the code! –  Óscar López Nov 14 '13 at 21:25
You call filter, passing it the array and a function that calls gcd. –  Barmar Nov 14 '13 at 21:26
@ÓscarLópez, please see my edit. –  Nikolai Naidenov Nov 14 '13 at 22:17

1 Answer 1

up vote 1 down vote accepted

Just use the definition of relative primes, and the solution follows naturally:

(define (relative-primes lst num)
  (filter (lambda (e)
            <???>) ; see definition of relative primes
share|improve this answer
I don't really understand what you mean but please see my edit if it gives you a better clue about what I'm trying to achieve. Thank you. –  Nikolai Naidenov Nov 14 '13 at 21:57
@user2969733 what exactly is that you don't understand? my answer above is the correct solution, the code in the question is more complicated than it needs to be (you don't have to use cond here!). The only part that I left as an exercise is determining whether the current element e is coprime with the num parameter. Just replace the <???> with the correct code –  Óscar López Nov 14 '13 at 22:21
Thank you for clarifying, I figured it out with your help. I replaced <???> with (= 1 (gcd num e)). Apparently I have a tendency of needlessly overcomplicating. Thank you for offering this solution! –  Nikolai Naidenov Nov 14 '13 at 22:26

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.