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A primitive root of a prime p is an
integer g such that g (mod p) has
modulo order p-1 (Ribenboim 1996, p.
22). More generally, if GCD(g,n)=1 (g
and n are relatively prime) and g is
of modulo order phi(n) modulo n where
phi(n) is the totient function, then g
is a primitive root of n (Burton 1989,
p. 187). The first definition is a
special case of the second since
phi(p)=p-1 for p a prime.