Let p be a prime greater than 3. Consider the modular curve X0β(3p) over
Q and its Jacobian variety J0β(3p) over Q. Let
T(3p) and C(3p) be the group of rational torsion points
on J0β(3p) and the cuspidal group of J0β(3p), respectively. We prove that
the 3-primary subgroups of T(3p) and C(3p) coincide
unless pβ‘1(mod9) and 33pβ1ββ‘1(modp)