# Relatively Prime numbers VB

I have this number x and i wanted to find all numbers which are relatively prime to it.

my code so far:

`````` For i = 1 To x-1
if [number n is relatively prime to x] Then
ListBox1.Items.Add(x)
End If
Next
``````

Thanks in advance

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if you mean all numbers less than `x` that are coprime with `x` then you need to clarify it. –  Will Ness Mar 1 '12 at 23:11
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## 2 Answers

Two numbers are relatively prime if their greatest common divisor is 1. VB doesn't have the GCD function built-in, but the algorithm is simple enough (and about 2300 years old!):

``````function gcd(m, n)
while n > 0
m, n = n, m%n
return m
``````

Note that m and n are assigned simultaneously. I'll leave it to you to complete the VB implementation. You might be interested in googling for the totient of a number and the list of its totatives, which is what you are calculating.

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Yes, see Euclidean algorithm on Wikipedia. –  Olivier Jacot-Descombes Mar 1 '12 at 17:02
i am assuming % means modulus? –  K_McCormic Mar 1 '12 at 17:08
Yes, % is the modulus operator. –  user448810 Mar 1 '12 at 17:23
just to make sure, does the comma mean multiply? –  K_McCormic Mar 13 '12 at 10:53
No. The line m, n = n, m%n is multiple assignment, so both assignments happen simultaneously. If your language doesn't provide multiple assignment, you could implement it as t=n, n=m%n, m=t. –  user448810 Mar 13 '12 at 13:13
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Assuming you want only numbers that are smaller than `x`, which are coprime with it - you could also take a generative approach, running a special kind of a sieve. When the multiples of each prime are generated, you'd see if that sequence "hits" your upper limit `x` or misses it, and mark all the numbers in it as non-coprimes if it does hit `x`.

Or in "pseudocode" (with Haskell syntax :) ),

``````coprimes n = go( [1..n-1], [2..n-1]) where
go( xs, []   ) = xs           -- ' no more numbers to sieve - return xs
go( xs, p:ks ) =              -- ' p is first in candidates, ks is the rest
let ms = [p, 2*p .. n-1]    -- ' p's multiples
in
go( if ( (mod n p) == 0 ) -- ' is n a multiple of p ?
then (xs\\ms)       -- ' yes: remove p's multiples
else xs,            -- ' no:  possible coprimes
ks\\ms )              -- ' candidates to sieve
``````

Haskell's set difference `\\` is very inefficient with unordered list representation of sets, but you would naturally encode this efficiently, on top of mutable arrays, in VB.

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