A smooth curve parameterized by its arclength on a submanifold is said to be extrinsic circular if it is a circle as a curve on the ambient space. We study congruence classes of extrinsic circular trajectories for magnetic fields associated with the contact metric structure on a real hypersurface of type (A2) in a complex projective space classifying them by their extrinsic geodesic curvatures and by complex torsions.