Let `A = (a_k)_(nxn)` be a square matrix such that `a_(kl)= (k-I)2^(i(k-I)` where `i = sqrt(-1) , if m`barA=bara_(kI)]` denote the complex conjugate of A, then A is equal to

A square matrix [A_(ij)] such that a_(ij)=0 for I ne j and a_(ij)=k where k is a constant for i=j is called.

Value of sum_(k = 1)^(100)(i^(k!) + omega^(k!)) , where i = sqrt(-1) and omega is complex cube root of unity , is :

Value of sum_(k = 1)^(100)(i^(k!) + omega^(k!)) , where i = sqrt(-1) and omega is complex cube root of unity , is :

The value of sum_(k=1)^(13)(i^(n)+i^(n+1)) , where i=sqrt(-1) equals :

A square matrix [a_(ij)] such that a_(ij)=0 for i ne j and a_(ij) = k where k is a constant for i = j is called :

A square matrix [a_(ij)] such that a_(ij)=0 for i ne j and a_(ij) = k where k is a constant for i = j is called _____

The value of sum_(k=0)^(n)(i^(k)+i^(k+1)) , where i^(2)= -1 , is equal to

The value of Sigma_(k=0)^(n)(i^(k)+i^(k+1)) , where i^(2)=-1 , is equal to

Given that A = [a_(ij)] is a square matrix of order 3 xx 3 and |A| = - 7 , then the value of sum_(i=1)^3a_(i2)A_(i2) where A_(ij) denotes the cofactor of element a_(ij) is:

Given A=[a_(ij)]3xx3 be a matrix, where a_(ij)={i-j if i != j and i^2 if 1=j If C_(ij) be the cofactor of a_(ij), in the matrix A and B = [b_(ij)]3xx3 be a matrix such that bch that b_(ij)=sum_(k=1)^3 a_(ij) c_(jk), then the value of [(3sqrt(det B))/8] is equal to(where denotes greatest integer function and det B denotes determinant value of B)