Let A⊆ ℜn be a convex set. Let M be an n×n matrix and define,B:={Mx:x∈A}i.e.B is the set of all points in ℜn that can be obtained by selecting a point x∈Aa nd applying the transformationx→Mx.(a) Show that B is convex.(b) Suppose that M is invertible and consider z∈A, hence Mz∈B.Show that z is an extreme point of A if and only if Mz is an extreme point of B