If `A B=Aa n dB A=B ,` then a. `A^2B=A^2` b. `B^2A=B^2` c. `A B A=A` d. `B A B=B`

If AB= Aand BA=B, then a.A^(2)B=A^(2) b.B^(2)A=B^(2) c.ABA=A d.BAB=B

If B is an idempotent matrix,and A=I-B then a.A^(2)=A b.A^(2)=I c.AB=O d.BA=O

If Aa n dB are two matrices such that A B=Ba n dB A=A ,t h e n (A^5-B^5)^3=A-B b. (A^5-B^5)^3=A^3-B^3 c. A-B is idempotent d. none of these

If Aa n dB are two matrices such that A B=Ba n dB A=A ,t h e n (A^5-B^5)^3=A-B b. (A^5-B^5)^3=A^3-B^3 c. A-B is idempotent d. none of these

If Aa n dB are two matrices such that A B=Ba n dB A=A ,t h e n (A^5-B^5)^3=A-B b. (A^5-B^5)^3=A^3-B^3 c. A-B is idempotent d. none of these

If A B=A and B A=B , where A and B are square matrices, then B^2=B and A^2=A (b) B^2!=B and A^2=A (c) A^2!=A , B^2=B (d) A^2!=A , B^2!=B

If Aa n dB are two square matrices such that B=-A^(-1)B A ,t h e n(A+B)^2 is equal to A^2+B^2 b. O c. A^2+2A B+B^2 d. A+B

If A and B are two square matrices such that B=-A^(-1)B A ,t h e n(A+B)^2 is equal to a. A^2+B^2 b. O c. A^2+2A B+B^2 d. A+B

If A and B are two square matrices such that B=-A^(-1)B A ,t h e n(A+B)^2 is equal to a. A^2+B^2 b. O c. A^2+2A B+B^2 d. A+B

Let A and B are square matrices of same order satisfying A B=A ,a n dB A=B , then (A^(2015)+B^(2015))^(2016) is equal to 2^(2015)(A^3+B^3) (b) 2^(2016)(A^2+B^2) 2^(2016)(A^3+B^3) (d) 2^(2015)(A+B)