Suppose p is an odd prime number and \(m=\dfrac{9p-1}{8}\) Prove that : m is an odd integer not divisible by 3 and \(3^{m-1}\equiv1\) (mod m)
Suppose p is an odd prime number and \(m=\dfrac{9p-1}{8}\)
Prove that : m is an odd integer not divisible by 3 and
\(3^{m-1}\equiv1\) (mod m)
