Assertion (A): The inverse of the matrix does not exist.
Reason (R) : The matrix is singular. [ = 0, since R₂ = 2R₁]

Assertion (A): is a diagonal matrix
Reason (R) : A square matrix A = (a_ij) is a diagonal matrix if a_ij = 0 for all i  j.

Consider = – 1, where a_i. a_j + b_i. b_j + c_i.c_j = and i, j = 1,2,3
Assertion(A) : The value of  is equal to zero
Reason(R) : If A be square matrix of odd order such that AA^T = I, then | A + I | = 0

Assertion(A) : The inverse of the matrix A = [Aij]_{n × n} where a_ij = 0, i  j is B = [aij^–1]_{n× n} 
Reason(R): The inverse of singular matrix does not exist

Assertion : The product of two diagonal matrices of order 3 × 3 is also a diagonal matrix
Reason : matrix multiplicationis non commutative

Assertion : If A is a skew symmetric of order 3 then its determinant should be zero.
Reason : If A is square matrix then det A = det  = det (–)

Assertion : There are only finitely many 2 × 2 matrices which commute with the matrix
Reason : If A is non-singular then it commutes with I, adj A and A^–1

Statement-I The equation  has exactly one solution in [0, 2].

Statement-II For equations of type  to have real solutions in   should hold true.

In this question, we have to find the statements are the correct or not and statement 2 is correct explanation or not , is same like assertion and reason. Here, Start solving first Statement and try to prove it . Then solve the Statement-II . Remember cos a cosb -sin a sinb = cos ( a + b ) and sin a cosb + cosa sinb = sin( a+ b) .

Assertion : If A is a skew symmetric matrix of order 3 then its determinant should be zero.
Reason : If A is square matrix then det A = det   = det (–)

Assertion : There are only finitely many 2 × 2 matrices which commute with the matrix

Reason : If A is non-singular then it commutes with I, adj A and A^–1

Consider the system of equationsx – 2y + 3z = –1–x + y – 2z = kx – 3y + 4z = 1
Assertion : The system of equations has no solution for k 3.and
Reason : The determinant  0, for k  3.

Assertion : If a, b, c are distinct and x, y, z are not all zero given that ax + by + cz = 0, bx + cy + az = 0, cx + ay + bz = 0 then a + b + c  0
Reason : a² + b² + c² > ab + bc + ca if a, b, c are distinct

Assertion : If A is a skew symmetric of order 3 then its determinant should be zero.
Reason : If A is square matrix then det A = det  = det (–)

Assertion : There are only finitely many 2 ×2 matrices which commute with the matrix
Reason : If A is non-singular then it commutes with I, Adj A and A^–1.

Let a matrix A = & P = Q = PAP^T where P^T is transpose of matrix P. Find PT Q2005 P is

Let A = & I = and A–1 = [A² + cA + dI], find ordered pair (c, d) ?]