On linear combinations of two tripotent, idempotent, and involutive matrices

Let A=c₁A₁+c₂A₂, wherec₁, c₂ are nonzero complex numbers and (A₁,A₂) is a pair of two n×n nonzero matrices. We consider the problem of characterizing all situations where a linear combination of the form A=c₁A₁+c₂A₂ is (i) a tripotent or an involutive matrix when are commuting involutive or commuting tripotent matrices, respectively, (ii) an idempotent matrix when are involutive matrices, and (iii) an involutive matrix when are involutive or idempotent matrices.