Let `M = [a_(ij)]_(3xx3)` where `a_(ij) in {-1,1}`. Find the maximum possible value of det(M).

Construct a matrix [a_(ij)]_(3xx3) , where a_(ij)=2i-3j .

Construct a matrix [a_(ij)]_(3xx3) ,where a_(ij)=(i-j)/(i+j).

if A=[a_(ij)]_(2*2) where a_(ij)={i+j , i!=j and i^2-2j ,i=j} then A^-1 is equal to

Let A=[a_("ij")] be a matrix of order 2 where a_("ij") in {-1, 0, 1} and adj. A=-A . If det. (A)=-1 , then the number of such matrices is ______ .

Let A=[a_(ij)]_(3xx3) be a matrix, where a_(ij)={{:(x,inej),(1,i=j):} Aai, j in N & i,jle2. If C_(ij) be the cofactor of a_(ij) and C_(12)+C_(23)+C_(32)=6 , then the number of value(s) of x(AA x in R) is (are)

(Statement1 Assertion and Statement- 2 (Reason) Each of these questions also has four alternative choices, only one of which is the correct answer. You have to select the correct choice as given below. Statement - 1 If matrix A= [a_(ij)] _(3xx3) , B= [b_(ij)] _(3xx3), where a_(ij) + a_(ji) = 0 and b_(ij) - b_(ji) = 0 then A^(4) B^(5) is non-singular matrix. Statement-2 If A is non-singular matrix, then abs(A) ne 0 .

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

If matrix A=[a_(ij)]_(2X2) , where a_(ij)={[1,i!=j],[0,i=j]}, then A^2 is equal to

If matrix A=[a_(ij)]_(2X2) , where a_(ij)={[1,i!=j],[0,i=j]}, then A^2 is equal to

Lat A = [a_(ij)]_(3xx 3). If tr is arithmetic mean of elements of rth row and a_(ij )+ a_( jk) + a_(ki)=0 holde for all 1 le i, j, k le 3. sum_(1lei) sum_(jle3) a _(ij) is not equal to