Let M be a `2xx2` symmetric matrix with integer entries.
Then , M is invertible, if

Let A be a 2 xx 2 matrix with non-zero entries and let A^2=I , where I is a 2 xx 2 identity matrix, Tr(A) = sum of diagonal elements of A, and |A| = determinant of matrix A. Statement 1: Tr(A)=0 Statement 2: |A| =1

Let A be a 2xx2 matrix with real entries. Let I be the 2xx2 identity matrix. Denote by tr (A), the sum of diagonal entries of A. Assume that A^2=""I . Statement 1: If A!=I and A!=""-I , then det A""=-1 . Statement 2: If A!=I and A!=""-I , then t r(A)!=0 . (1) Statement 1 is false, Statement ( 2) (3)-2( 4) is true (6) Statement 1 is true, Statement ( 7) (8)-2( 9) (10) is true, Statement ( 11) (12)-2( 13) is a correct explanation for Statement 1 (15) Statement 1 is true, Statement ( 16) (17)-2( 18) (19) is true; Statement ( 20) (21)-2( 22) is not a correct explanation for Statement 1. (24) Statement 1 is true, Statement ( 25) (26)-2( 27) is false.

Let A be a nonsingular square matrix of order 3xx3 .Then |adj A| is equal to

If A is skew symmetric matrix , then A^(2) is a symmetric matrix .

Let A and B are symmetric matrices of order 3. Statement -1 A (BA) and (AB) A are symmetric matrices. Statement-2 AB is symmetric matrix, if matrix multiplication of A with B is commutative.

If A is skew -symmetric 3xx3 matrix , |A| =……..

Let A be a square matrix of order 3xx3 then |KA| is equal to ……

An integer m is said to be related to another integer n if m is a integral multiple of n. This relation in Z is reflexive, symmetric and transitive.

Let M and N be two 3xx3 non singular skew-symmetric matrices such that M N=N Mdot If P^T denote the transpose of P , then M^2N^2(M^T N)^-1(MN^(-1))^T is equal to

If the sum of m consecutive odd integers is m^(4) , then the first integer is