54 59 bytes:
$i down from
$n-1 until it finds a divisor of
$n is prime if that divisor is 1.
add 10 bytes for much better performance:
$i from (approx.)
1 looking for a divisor with a post-decrement on $i.
If the divisor is
$i will be
0 at the end, and
This solition uses a trick: For
$i will be initialized to 1 → loop exits in first iteration. For larger even square roots (
|1 serves as
+1. For odd square roots,
+1 is not needed because: if
$n is divisible by
root+1, it is also divisible by
2. Unfortunately, this can cost a lot of iterations; so you better
add another 7 bytes for even better performance:
$n=2 needs a special case here: inital
$n=2 → final
$i=1 → returns
$n instead of the square root is enough to avoid failures; but:
I did not count the iterations but only tested time consumption; and that only in TiO instead of a controlled environment. The difference between the last two versions was smaller than the deviation between several runs.
Significant test results may be added later.