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

Let A be a symmetric matrix, then A^(m), m in N is a

Let A be 3xx3 symmetric invertible matrix with real positive elements. Then the number of zero elements in A^(-1) are less than or equal to :

Let A be a skew-symmetric matrix of even order, then absA

Let A be a 2xx 2 matrix with real entries and det (A)= 2 . Find the value of det ( Adj(adj(A) )

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) i= sum of diagonal elements of A and |A| = determinant of matrix A. Statement 1:Tr(A)=0 Statement 2: |A| =1

Let A be any 3xx 2 matrix show that AA is a singular matrix.

If A is a skew-symmetric matrix and n is odd positive integer, then A^n is

Let M be the set of all 2xx2 matrices with entries from the set R of real numbers. Then the function f: M->R defined by f(A)=|A| for every A in M , is (a) one-one and onto (b) neither one-one nor onto (c) one-one but not onto (d) onto but not one-one

If A is askew symmetric matrix and n is an odd positive integer, then A^(n) is

If A is a skew-symmetric matrix and n is a positive even integer, then A^(n) is