Let `A` be a square matrix of order `3` whose elements are real numbers and `adj.(adj(adj.A))=[[16,0,-3],[0,4,0],[0,3,4]]` then find absolute value of `Tr(A^(-1))` [Note: `adj(P)` and `Tr(P)` denote adjoint matrix and trace of matrix `P` respectively]

Let M be a square matix of order 3 whose elements are real number and adj(adj M) = [(36,0,-4),(0,6,0),(0,3,6)] , then the absolute value of Tr(M) is [Here, adj P denotes adjoint matrix of P and T_(r) (P) denotes trace of matrix P i.e., sum of all principal diagonal elements of matrix P]

Let A be a square matrix of order 3 such that adj. (adj. (adj. A)) =[(16,0,-24),(0,4,0),(0,12,4)] . Then find (i) |A| (ii) adj. A

If A is a square matrix of order 3 such that |A|=2, then write the value of adj(adjA)

If A is a square matrix of order 3 with |A|=9 , then write the value of |2.adj.A| .

If A is an square matrix of order 3 such that |A|=2, then write the value of |adj(adjA)|

Let A be a square matrix of order 3 such that |Adj A | =100 then |A| equals

If A is square matrix of order 3 , with |A|=9 , then write the value of |2adj.A|

If A is a square matrix of order 4 with |A| = 5, then the value of | adj A| is

A is a square matrix of order 3 and |A|=7 Write the value of |adj.A|

" If "A" is a square matrix of order "3" such that "|A|=2," then "|" adj "(adj(adjA))|=