Compute the adjoint of the matrix `A` given by `A=[1 4 5 3 2 6 0 1 0]` and verify that `A(a d j\ A)=|A|I=(a d j\ A)Adot`

Compute the adjoint of the matrix A given by A=[[1, 4, 5],[ 3 ,2, 6],[ 0 ,1, 0]] and verify that A(a d jA)=|A|I=(A d jA)Adot

Compute the adjoint of the matrix A given by A=[145326010] and verify that A(adjA)=|A|I=(adjA)A

Compute the adjoint of the matrix, A: [[1,4,5],[3,2,6],[0,1,0]] and verify that: A(AdjA) = abs(A)I .

Compute the adjoint of the matrix A given by A=[[1,4,53,2,60,1,0]]A(adjA),=|A|I=(AdjA)A

Find the adjoint of the matrix A = [{:(1,2),(3,-5):}] and verify that A(adj A) = (Adj A)A = |A| I

Find the adjoint of the following matrices: [(-3, 5),( 2, 4)] Verify that (a d j\ A)A=|A|I=A(a d j\ A) for the above matrices.

Find the adjoint of the matrix A=[(-1,-2,-2), (2, 1,-2) ,(2,-2, 1)] and hence show that A(a d j\ A)=|A|\ I_3 .

Find the adjoint of the matrix A=[(-1,-2,-2), (2 ,1,-2), (2,-2, 1)] and hence show that A(a d j\ A)=|A|\ I_3 .

Find the adjoint of the matrix A=[(-1,-2,-2), (2 ,1,-2), (2,-2, 1)] and hence show that A(a d j\ A)=|A|\ I_3 .

Find the adjoint of the matrix A=[[1,2,2],[2,1,2],[2,2,1]] and hence show that A(a d j\ A)=|A|\ I_3 .