We consider the majority-vote model with noise in a network of social interactions for a system with two classes of individuals, class σ and class τ . For the two-agent model each class has its own dynamics, with individuals of σ class being influenced by neighbors of both classes, while the individuals of type τ are influenced only by neighbors of that class. We use Monte Carlo simulations and finite-size scaling techniques to estimate the critical properties of the system in the stationary state. The calculated values of the critical noise parameters, q σ ∗ and q τ ∗ , allow us to identify five distinct regions in the phase diagram on the q τ – q σ plane. The critical exponents for each class are the same and we conclude that the present model belongs to the same universality class as the two-dimensional Ising model.