# Random number relatively prime to an input

What's a computationally sane way to, given a natural number `n`, generate a random number that is relatively prime to `n`?

I'm willing to sacrifice some randomness and coverage of all possibilities for speed. That is, if I only ever hit perhaps 75% of the possible (smaller) relative primes, that's fine.

-
What do you need the numbers for? –  starblue Jul 26 '11 at 10:58

in simple words:

``````unsigned random_prime(unsigned n){
unsigned r = rand(), t;
while ((t = gcd(r, n)) > 1)
r /= t;
return r;
}
``````
-
Nice! This works great. –  andyvn22 Jul 26 '11 at 3:15

The probability that two random integers are relatively prime to one another works out to 6/pi^2 (in the limit, for large N), or approximately 61%. So generate-and-test should be a viable strategy -- the GCD calculation is about O(log n), and you will probably get a result in 2 or 3 trials.

-
Good idea. You know, you could even put an upper bound on the running time of this by doing at most 3 tries, and then defaulting to either (n+1) or (n-1). –  Patrick87 Jul 25 '11 at 21:43
For us mathematically challenged readers, I'm curious how you know/found/ciphered the `6/pi^2` number. –  Michael Burr Jul 25 '11 at 23:11
mathworld.wolfram.com/RelativelyPrime.html is my guess :P –  andyvn22 Jul 26 '11 at 3:13
+1 Generate and test is almost certainly cheaper than factoring the number, computing the totient, computing a random number below the totient, and mapping that back to relatively prime numbers below `n`. Even for the product of primes up to 23 the success rate is better than 16%, which is the worst case for 32 bit numbers. –  starblue Jul 26 '11 at 11:21

"I'm willing to sacrifice randomness and coverage of all possibilities for speed." Given n, select n+1.

You're going to need to be more specific.

-
Or n-1. For hash tables something like this is possibly not a bad idea, and there is likely to be empirical work done (I seem to remember a mention of this in Algorithms in C++). –  user786653 Jul 25 '11 at 21:42
Fantastic answer. I'm not even sure he needs to get more specific; you answered his question as written. –  Stephen Canon Jul 25 '11 at 21:42
@user786653: good point about n-1. I guess that could add some more randomness to it. ;D –  Patrick87 Jul 25 '11 at 21:45
@Stephen: hah, yeah, I thought I did, too. Still, maybe he didn't mean what he actually asked for. –  Patrick87 Jul 25 '11 at 21:45
Gah, not all the randomness! :) Lack of clarity + SO = a mess. –  andyvn22 Jul 25 '11 at 21:50