The number of `2 xx 2` matrics A, that are there with the elements as real numbers satisfying A + `A^(T) = I and A A^(T) = I` is

The number of all possible 2xx2 matrices with entries 0 or 1 is

The set of all real numbers satisfying the inequality X - 2 lt 1 is

Construct a 2xx2 matrix A=[a_ij] , whose (i,j)^th element is given by a_ij=i-j/2

Construct a 2times2 matrix whose elements are given a_(ij)=2i+j .find A^2

Construct a 2times2 matrix whose elements are given a_(ij)=2i+j

Suppose the number of elements in set A is p, the number of elements in set B is q and the number of elements in A times B is 7. Then p^(2)+q^(2) is equal to :a)42 b)49 c)50 d)51

Construct a 2xx2 matrix whose elements are given by a_ij=2i+3j/4

Argument of the complex number (tan 1-i)^(2) is

Let A be a square matrix. Then prove that A A^(T) and A^(T) A are symmetric matrices.

Show that the images of the given complex numbers 3+2 i , 5 i,-3+2 i and -i form a square.