Primality proof for n = 2731:
Take b = 3.
b^(n-1) mod n = 1.
13 is prime.
b^((n-1)/13)-1 mod n = 1023, which is a unit, inverse 606.
7 is prime.
b^((n-1)/7)-1 mod n = 1237, which is a unit, inverse 967.
(7 * 13) divides n-1.
(7 * 13)^2 > n.
n is prime by Pocklington's theorem.