Let `A` be a square matrix of `2 x 2` satisfyinga. `a_(ij)=1` or `-1` and `a_11*a_21+a_12*a_22=0` then the no. of matrix

Let A be a square matrix of 2x2 satisfyinga.a_(ij)=1 or -1 and a_(11)*a_(21)+a_(12)*a_(22)=0 then the no.of matrix

In square matrix A=(a_(ij)) if i lt j and a_(ij)=0 then A is

If A is a square matrix for which a_(ij)=i^(2)-j^(2) , then matrix A is

Let A=[a_(ij)] be a square matrix of order n such that {:a_(ij)={(0," if i ne j),(i,if i=j):} Statement -2 : The inverse of A is the matrix B=[b_(ij)] such that {:b_(ij)={(0," if i ne j),(1/i,if i=j):} Statement -2 : The inverse of a diagonal matrix is a scalar matrix.

Let A=[a_(ij)]_(3xx3) be a scalar matrix and a_(11)+a_(22)+a_(33)=15 then write matrix A.

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) ] be a square matrix of order 3xx 3 and |A|= -7. Find the value of a_(11) A_(11) +a_(12) A_(12) + a_(13) A_(13) where A_(ij) is the cofactor of element a_(ij)

If A=[a_(ij)] is a square matrix of even order such that a_(ij)=i^(2)-j^(2), then