Been trying to implement Rabin-Miller Strong Pseudoprime Test today.
Have used Wolfram Mathworld as reference, lines 3-5 sums up my code pretty much.
However, when I run the program, it says (sometimes) that primes (even low such as 5, 7, 11) are not primes. I've looked over the code for a very long while and cannot figure out what is wrong.
For help I've looked at this site aswell as many other sites but most use another definition (probably the same, but since I'm new to this kind of math, I can't see the same obvious connection).
import random def RabinMiller(n, k): # obviously not prime if n < 2 or n % 2 == 0: return False # special case if n == 2: return True s = 0 r = n - 1 # factor n - 1 as 2^(r)*s while r % 2 == 0: s = s + 1 r = r // 2 # floor # k = accuracy for i in range(k): a = random.randrange(1, n) # a^(s) mod n = 1? if pow(a, s, n) == 1: return True # a^(2^(j) * s) mod n = -1 mod n? for j in range(r): if pow(a, 2**j*s, n) == -1 % n: return True return False print(RabinMiller(7, 5))
How does this differ from the definition given at Mathworld?