`|A^(-1)|ne|A|^(-1)`, where is non-singular matrix

Prove that the inverse of [[A,O],[B,C]] is [[A^(-1),O],[-C^(-1)BA^(-1),C^(-1)]] , where A, Care non-singular matrices and O is null matrix and find the inverse. [[1,0,0,0],[1,1,0,0],[1,1,1,0],[1,1,1,1]]

(A^3)^(-1)=(A^(-1))^3 , where A is a square matrix and |A| ne 0

|adjA|=|A|^2 , where A is a square matrix of order two

Let A A=[{:(0,1),(0,0):}] , show that (aI+bA)^(n)=a^(n)I+na^(n-1)bA , where I is the identity matrix of order 2 and n in N .

(a.A)^(-1)=1/a.A^(-1) where a is any real number and A is square matrix

If A=[{:(1,0,-1),(2,1,3),(0,1,1):}] , then verify that A^(2)+A=A(A+I) where I is 3xx3 unit matrix.

If [sin^-1x]+[cos^-1x]=0, where x is a non negative real number and [.] denotes the greatest integer function, then complete set of values of x is - (A) (cos1 ,1) (B) (-1, cos1) (C) (sin1 , 1) (D) (cos1 , sin1)

If A is an 3xx3 non-singular matrix such that A A^T=A^TA and B=A^(-1)A^T," then " B B^T equals

Show that the matrix A=[{:(2,3),(1,2):}] satisfies the equation A^2-4A+I=O , where I is 2xx2 identity matrix and O is 2xx2 zero matrix. Using this equation find A^(-1)

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