CUET · MATHS · PYQ PAPER 2025
If \(A\) and \(B\) are skew-symmetric matrices, then which one of the following is NOT true?
- A \(A^3+B^5\) is skew-symmetric
- B \(A^{19}\) is skew-symmetric
- C \(B^{14}\) is symmetric
- D \(A^4+B^5\) is symmetric
Answer & Solution
Correct Answer
(D) \(A^4+B^5\) is symmetric
Step-by-step Solution
Detailed explanation
\(A^T = -A\), \(B^T = -B\) \((A^4)^T = (A^T)^4 = (-A)^4 = A^4\) \((B^5)^T = (B^T)^5 = (-B)^5 = -B^5\) \((A^4+B^5)^T = (A^4)^T + (B^5)^T = A^4 - B^5\) For \(A^4+B^5\) to be symmetric, \(A^4 - B^5 = A^4 + B^5\), which implies \(B^5 = 0\). This is not true for all skew-symmetric…
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