From the matrix equation AB = AC we can conclude B = C provided that a)A is non - singular B)A is singular C)A is symmetric D)A is square

If the matrix A is both symmetric and skew symmetric, then: A)A is a diagonal matrix B)A is a zero matrix. C) A is a square matrix D)None of these.

If A is matrix such that A^(2) +A + 2I = O then which of the following is not true ?a)A is symmetric b)A is non - singular c) |A| ne O d) A^(-1) = - (1)/(2) (A+ I)

On the set N of all natural numbers define the relation R by aRb if and only if the GCD of a and b is 2, then R is a)reflexive but not symmetric b)symmetric only c)reflexive and transitive d)reflexive, symmetric and transitive

Let A be a non-singular square matrix of order 3xx3 .Then |adj A| is ...

If alpha , beta , lambda are three real numbers and A=[(1,cos(alpha-beta),cos(alpha-gamma)),(cos(beta-alpha),1,cos(beta-gamma)),(cos(gamma-alpha),cos(gamma-beta),1)] , then which of following is not true A)A is singular B)A is symmetric C)A is orthogonal D)A is not invertible

If A and B are symmetric non singular matrices, AB = BA and A^(-1) B^(-1) exist, then prove that A^(-1)B^(-1) is symmetric.

Matrix A has m rows and n + 5 columns, matrix B has m rows and 11 - n columns, If both AB and BA exist, then a)AB and BA are square matrix b)AB and BA are of order 8 xx 8 and 3 xx 13 respectively. c)AB = BA d)None of these

Let A and B are two square matrices such that AB = A and BA = B , then A ^(2) equals to : a)B b)A c)I d)O

Let A and B be two symmetric matrices of same order. Then show that AB-BA is a skew-symmetric matrix.