A square matrix A is said to be invertible if and only if A is a

A square matrix A is said to be orthogonal if A^T A=I If A is a sqaure matrix of order n and k is a scalar, then |kA|=K^n |A| Also |A^T|=|A| and for any two square matrix A d B of same order \AB|=|A||B| On the basis of abov einformation answer the following question: If A is an orthogonal matrix then (A) A^T is an orthogonal matrix but A^-1 is not an orthogonal matrix (B) A^T is not an orthogonal mastrix but A^-1 is an orthogonal matrix (C) Neither A^T nor A^-1 is an orthogonal matrix (D) Both A^T and A^-1 are orthogonal matices.

A square matrix A is said to be orthogonal if A^T A=I If A is a square matrix of order n and k is a scalar, then |kA|=K^n |A| Also |A^T|=|A| and for any two square matrix A d B of same order \AB|=|A||B| On the basis of above information answer the following question: IF A is a 3xx3 orthogonal matrix such that |A|=1, then |A-I|= (A) 1 (B) -1 (C) 0 (D) none of these

A square matrix B is said to be an orthogonal matrix of order n if BB^(T)=I_(n) if n^(th) order square matrix A is orthogonal, then |adj(adjA)| is

A square matrix A is invertible if det(A) is equal to (A) -1 (B) 0 (C) 1 (D) none of these

If A is an invertible matrix and B is a matrix, then

If A is a square matrix, then A is skew symmetric if

Let A*B=A^(T)B^(-1) where A^(T) represents transpose of matrix A and B^(-1) represents inverse of square matrix B . This operation is defined when the number of rows of A is equal to the number of rows of B . Matrix A is said to be orthogonal if A^(-1)=A^(T) If A*B is defined then which of the following operations are always define?

If A is a square matrix such that A^2-A+l=0 , then the inverse of A is

If A is a square matrix such that A^2-A+I =0 , then the inverse of A is

A square matrix A with elements form the set of real numbers is said to be orthogonal if A' = A^(-1). If A is an orthogonal matris, then