`|A^(-1)|!=|A+^(-1)`, where `A` is a non singular matrix.

If A is a non - singular matrix then

Let A; B; C be square matrices of the same order n. If A is a non singular matrix; then AB = AC then B = C

(Statement1 Assertion and Statement- 2 (Reason) Each of these questions also has four alternative choices, only one of which is the correct answer. You have to select the correct choice as given below. Statement - 1 If matrix A= [a_(ij)] _(3xx3) , B= [b_(ij)] _(3xx3), where a_(ij) + a_(ji) = 0 and b_(ij) - b_(ji) = 0 then A^(4) B^(5) is non-singular matrix. Statement-2 If A is non-singular matrix, then abs(A) ne 0 .

Let A and B are two non - singular matrices of order 3 such that |A|=3 and A^(-1)B^(2)+2AB=O , then the value of |A^(4)-2A^(2)B| is equal to (where O is the null matrix of order 3)

Let A be a non - singular square matrix such that A^(2)=A satisfying (I-0.8A)^(-1)=I-alphaA where I is a unit matrix of the same order as that of A, then the value of -4alpha is equal to

The matrix [(5 ,1 ,0), (3 ,-2 ,-4 ), (6 ,-1 ,-2b)] is a singular matrix, if the value of b is ?

If 3, – 2 are the eigen values of a non-singular matrix A and |A| = 4 , find the eigen values of adj(A)

A and B are square matrices and A is non-singular matrix, then (A^(-1) BA)^n,n in I' ,is equal to (A) A^-nB^nA^n (B) A^nB^nA^-n (C) A^-1B^nA (D) A^-nBA^n

If A is a singular matrix, then adj A is a. singular b. non singular c. symmetric d. not defined

For three square matrix A ,B ,&CifA B C=O&|A|!=0, is non-zero singular matrix then C must be zero matrix C must be non singular matrix C must be singular matrix C is identity matrix Data insufficient