# What is the most efficient algorithm to find the closest prime less than a given number n?

Problem
Given a number n, 2<=n<=2^63. n could be prime itself. Find the prime p that is closest to n.

Using the fact that for all primes p, p>2, p is odd and p is of the form 6k+1 or 6k+5, one could write a loop from n−1 to 2 to check if that number is prime. So instead of checking for all numbers I need to check for every odd of the two forms above. However, I wonder if there is a faster algorithm to solve this problem? i.e. some constraints that can restrict the range of numbers need to be checked? Any idea would be greatly appreciated.

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Note that 6k+1 and 6k+5 are both always odd for integer k. –  Greg Hewgill Apr 27 '11 at 0:42
@Greg Hewgill: Did I mention it above? Or I misunderstood your instruction? –  Chan Apr 27 '11 at 0:45
Perhaps I misunderstood what you meant. You said "every odd of the two forms above", which could imply that one or both are not always odd. I think you've got it right, it's just that English leaves room for ambiguity at every opportunity. –  Greg Hewgill Apr 27 '11 at 0:49
@Greg Hewgill: Thanks for the explanation! –  Chan Apr 27 '11 at 0:51