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2. A diagonal matrix is a square matrix where all the entries are zero except those on the diagonal going from the upper left corner to the lower right corner. Formally, an n x n matrix A = [aj] is diagonal if a;j = 0 whenever i + j. Equivalently, if azj 70 then i = j. An anti-diagonal matrix is a square matrix where all the entries are zero except those on the diagonal going from the lower left corner to the upper right corner. Formally, an n x n matrix A = [a;] is anti-diagonal if a;j = 0 whenever i+j+n+1. Equivalently, if azj +0 then i +j=n+1. Prove that the product of two n x n anti-diagonal matrices is diagonal. (See outline below, also the proof in #13 of homework 2.1) Outline: (1) Begin your proof by letting A = [a;j] and B = [bj] be two anti-diagonal n Xn matrices.To prove that the matrix AB is diagonal you need to show that the ij-th entry of AB is 0 for all i + j, or, equivalently, if the ij-th entry of AB is not 0, then i = j. (this second part is the one to use). (ii) The ij-th entry of the product AB is cij = (write in terms of E) (ii) Show that if Cij 70 (*) then i = j. * HINT: there must be at least one term a¡kbrj that is not 0.