Let A and B be 3 × 3 real matrices such that A is symmetric matrix and B is skew-symmetric matrix. Then the system of linear equations ( A 2 B 2- B 2 A 2) X = O , where X is a 3 × 1 column matrix of unknown variables and O is a 3 × 1 null matrix, has :

Question

Let A and B be 3 × 3 real matrices such that A is symmetric matrix and B is skew-symmetric matrix. Then the system of linear equations ( A 2 B 2- B 2 A 2) X = O , where X is a 3 × 1 column matrix of unknown variables and O is a 3 × 1 null matrix, has : (A) no solution (B) exactly two solutions (C) infinitely many solutions (D) a unique solution

Tardigrade Admin · Accepted Answer

Let A T = A text and B T =- B C = A 2 B 2- B 2 A 2 C T =( A 2 B 2) T -( B 2 A 2) T =( B 2) T ( A 2) T -( A 2) T ( B 2) T = B 2 A 2- A 2 B 2 C T =- C C is skew symmetric. So det (C)=0 So system have infinite solutions.

Q. Let $A$ and $B$ be $3 \times 3$ real matrices such that $A$ is symmetric matrix and $B$ is skew-symmetric matrix. Then the system of linear equations $(A^{2} B^{2} - B^{2} A^{2}) X = O,$ where $X$ is a $3 \times 1$ column matrix of unknown variables and $O$ is a $3 \times 1$ null matrix, has :

no solution

exactly two solutions

infinitely many solutions

a unique solution

Let $A^{T} = A and B^{T} = - B$
$C = A^{2} B^{2} - B^{2} A^{2}$
$C^{T} = (A^{2} B^{2})^{T} - (B^{2} A^{2})^{T}$
$= (B^{2})^{T} (A^{2})^{T} - (A^{2})^{T} (B^{2})^{T}$
$= B^{2} A^{2} - A^{2} B^{2}$
$C^{T} = - C$
C is skew symmetric.
So det $(C) = 0$
So system have infinite solutions.

Q. Let A and B be 3×3 real matrices such that A is symmetric matrix and B is skew-symmetric matrix. Then the system of linear equations (A2B2−B2A2)X=O, where X is a 3×1 column matrix of unknown variables and O is a 3×1 null matrix, has :