Let `B` and `C` be two square matrices such that `BC=CB` and `C^(2)=0`. If `A=B+C` then `A^(3)-B^(3)-3B^(2)C` is

[" Let "8" and "C" be two square matrices "],[" such that "BC=CB" and "C^(2)=0" .If "A=],[B+C" then "A^(3)-B^(3)-3B^(2)C" is "],[" (1) "3B],[" (2) "0],[" (3) "B+C],[" (4) "B-C]

Which of the following is/are true? If A is a square matrix such that A = A then (1 + A) - 7A=1 If A is a square matrix such that A = A then (1+4)° -7A=0 Let B and C be two square matrices such that BC = CB and C=0. If A = B+C then A - B -3B+C = 0 Let B and C be two square matrices such that BC = CB and C=0. If A = B+C then A+B -3B+C =0

If A , B and C are three square matrices of the same size such that B = CA C^(-1) then CA^(3) C^(-1) is equal to

Let A, B and C are nxxn matrices such that |A|-2, |B|=3 and |C|=5 . If |(2A)^(2)(3B)(5C)^(-1)|=(1728)/(125) , then the value of n is equal to

Let A,B and C be square matrices of order 3xx3 with real elements. If A is invertible and (A-B)C=BA^(-1), then

Let A,B and C be square matrices of order 3xx3 with real elements. If A is invertible and (A-B)C=BA^(-1), then

If B, C are square matrices of same order such that C^(2)=BC-CB and B^(2)=-I , where I is an identity matrix, then the inverse of matrix (C-B) is

If B,C are n rowed square matrices and if A=B+C,BC=CB,C^(2)=O, then show that for every n in N,A^(n+1)=B^(n)(B+(n+1)C)

Consider three square matrices A, B and C of order 3 such that A^(T)=A-2B and B^(T)=B-4C , then the incorrect option is