Statement 1: For a singular square matrix `A ,A B=A C B=Cdot` Statement 2; `|A|=0,t h e nA^(-1)` does not exist.

Statement 1: For a singular square matrix A,AB=AChat boldsymbol varphi B=C. Statement 2;|A|=0, then A^(-1) does not exist.

Statement-1 For a singular matrix A , if AB = AC rArr B = C Statement-2 If abs(A) = 0, then A^(-1) does not exist.

Statement-1 (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 For a singular matrix A , if AB = AC rArr B = C Statement-2 If abs(A) = 0, thhen A^(-1) does not exist. a. Statement- is true, Statement -2 is true, Statement-2 is a correct explanation for Statement-1 b. Statement-1 is true, Statement-2 is true, Sttatement - 2 is not a correct explanation for Stamtement-1 c. Statement 1 is true, Statement - 2 is false d. Statement-1 is false, Statement-2 is true

Statement-1 A is singular matrix of order nxxn, then adj A is singular. Statement -2 abs(adj A) = abs(A)^(n-1)

If A is a non-singular square matrix such that A^(2)-7A+5I=0, then A^(-1)

A square non-singular matrix A satisfies A^2-A+2I=0," then "A^(-1) =

A square non-singular matrix A satisfies A^2-A+2I=0," then "A^(-1) =

A square non-singular matrix A satisfies A^2-A+2I=0," then "A^(-1) =

A square non-singular matrix A satisfies A^2-A+2I=0," then "A^(-1) =

Let A=[(0,0,-1),(0,-1,0),(-1,0,0)] Then only correct statement about the matrix A is (A) A is a zero matrix (B) A^2=I (C) A^-1 does not exist (D) A=(-1) I where I is a unit matrix