prove for matrices A, B and C, (ABC)' = C'B'A'

Given an example of three matrices A, B and C of the same type for which (A-B) + C ne A - (B + C)

If A, B, C are three matrices of the same order, then A = B implies A + C = B + C .

For sets A,B and C, prove that : (A-B)nn C=(A nn C)-B .

True or False statements : If A,B,C are three matrices such that both AB and AC are defined and are equal, then it implies that B and C are equal matrices.

If A,B,C are three matrices such that A + B = A + C, then prove that B = C.

For sets A,B and C, prove that : A-(B-C)=(A-B) uu(A nn C) .

For sets A,B and C, prove that : A-(B uu C)=(A-B) nn (A-C) .

Prove that if A uu B=C and A nn B=phi , then A= C-B.

Let A, B, C, D be (not necessarily ) real matrices such that A^(T) = BCD , B^(T) =CDA, C^(T) = DAB and D^(T) =ABC for the matrix S = ABCD the least value of k such that S^(k) = S is