Show that the given matrix A is its own adjoint when A =`[[-4, -3, -3],[1, 0, -1], [4, 4, 3]]`. Also find `A^(-1)`.

Adjoint of the matrix N=[[-4, -3, -3], [1, 0, 1], [4, 4, 3]] is

" If matrix "A=[[1,1,3],[1,3,-3],[-2,-4,-4]]" then find "A^(-1)

Find the adjoint of the matrix A=[[2,3],[1,4]] .

Find the adjoint of matrix A=[[2,-3],[4,1]]

Find the adjoint of the matrix A=[[4,-2,-1],[1,1,-1],[-1,2,4]] and show that A(adj A)=|A|I

Write the adjoint of the matrix A=[(-3, 4),(7,-2)] .

Find the adjoint of the given matrix and verify in ach case that A.(adj A)=(adj A).A=|A\|.I. If A=[(-4,-3,-3),(1,0,1),(4,4,3)] ,show that adj A=A.

1.5.Find the adjoint of the matrix [[2,-3],[3,5]] .

Find the adjoint of matrix A = [(2,0,-1),(3,1,2),(-1,1,2)]

[" (1) Find the adjoint of "A" ,where "A=[[1,-1,0],[2,3,-2],[2,0,1]]],[" Also verify that "A*(adj A)=|A|I_(3)" ."]