Let `A=[a_(ij)]_(5xx5)` is a matrix such that `a_(ij)={(3,AA i= j),(0,Aai ne j):}`. If `|(adj(adjA))/(3)|=(sqrt3)^(lambda),` then `lambda` is equal to (where, `adj(M)` represents the adjoint matrix of matrix M)

Let A=[a_(ij)]_(mxxn) be a matrix such that a_(ij)=1 for all I,j. Then ,

If A=[a_(i j)] is a 2xx2 matrix such that a_(i j)=i+2j , write A .

Let M and N are two non singular matrices of order 3 with real entries such that (adjM)=2N and (adjN)=M . If MN=lambdaI , then the value the values of lambda is equal to (where, (adj X) represents the adjoint matrix of matrix X and I represents an identity matrix)

Let A and B be two square matrices of order 3 such that |A|=3 and |B|=2 , then the value of |A^(-1).adj(B^(-1)).adj(2A^(-1))| is equal to (where adj(M) represents the adjoint matrix of M)

Let A=[a_(ij)]_(3xx3) be such that a_(ij)=[{:(3, " when",hati=hatj),(0,,hati ne hatj):}" then " {("det (adj(adj A))")/(5)} equals : ( where {.} denotes fractional part function )

If A=[a_(i j)] is a 3xx3 scalar matrix such that a_(11)=2 , then write the value of |A| .

Let matrix A=[(x,y,-z),(1,2,3),(1,1,2)] , where x, y, z in N . If |adj(adj (adj(adjA)))|=4^(8).5^(16) , then the number of such matrices A is equal to (where, |M| represents determinant of a matrix M)

If A and B are non - singular matrices of order 3xx3 , such that A=(adjB) and B=(adjA) , then det (A)+det(B) is equal to (where det(M) represents the determinant of matrix M and adj M represents the adjoint matrix of matrix M)

Let A and B are square matrices of order 2 such that A+adj(B^(T))=[(3,2),(2,3)] and A^(T)-adj(B)=[(-2,-1),(-1, -1)] , then A^(2)+2A^(3)+3A^(4)+5A^(5) is equal to (where M^(T) and adj(M) represent the transpose matrix and adjoint matrix of matrix M respectively and I represents the identity matrix of order 2)

Let A and B are square matrices of order 3. If |A|=2, |B|=3, |C|=4, then the value of |3( adj A)BC^(-1)| is equal to ( where, adj A represents the adjoint matrix of A)