If A, B are two non-singular matrices of same order, then

If A,B,C are non - singular matrices of same order then (AB^(-1)C)^(-1)=

If Aa n dB are two non-singular matrices of the same order such that B^r=I , for some positive integer r >1,t h e nA^(-1)B^(r-1)A=A^(-1)B^(-1)A= I b. 2I c. O d. -I

If A a n d B are two non-singular matrices of the same order such that B^r=I , for some positive integer r >1,t h e n (A^(-1)B^(r-1)A)-(A^(-1)B^(-1)A)= a. I b. 2I c. O d. -I

If A and B are non-singular matrices of the same order, write whether A B is singular or non-singular.

If A; B are non singular square matrices of same order; then adj(AB) = (adjB)(adjA)

If A and B are two non-singular matrices of order 3 such that A A^(T)=2I and A^(-1)=A^(T)-A . Adj. (2B^(-1)) , then det. (B) is equal to

If A and B are two square matrices of the same order, then A+B=B+A.

If A and B are symmetric non-singular matrices of same order,AB = BA and A^(-1)B^(-1) exist, prove that A^(-1)B^(-1) is symmetric.

If A , B are two square matrices of same order such that A+B=AB and I is identity matrix of order same as that of A , B , then

Let A and B two non singular matrices of same order such that (AB)^(k)=B^(k)A^(k) for consecutive positive integral values of k, then AB^(2)A^(-1) is equal to