Let X be a normal projective 3-fold of general type with at worst Q-factorial terminal singularities. We study the following conjecture:  for any integer m > 2, |mK_X| is composed with a pencil if any only if P_m(X) = 2. We prove that the conjecture is true either for irrational pencils or for m  bigger. We also classify pluricanonical pencils for small value of m. There are dozens of supporting examples according to Fletcher and Reid.