Proof Let A and B be n n square matrices with A O and B O.
Chapter 4, Problem 4.76(choose chapter or problem)
Let A and B be n × n square matrices with \(A \neq O\) and \(B \neq O\). Prove that if A is symmetric and B is skew-symmetric \(\left(B^{T}=-B\right)\), then {A, B} is a linearly independent set.
Text Transcription:
A neq O
B neq O
(B^T =-B)
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