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Question: we know that because q is symmetric v is...

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() We know that because Q is symmetric, V is an orthonormal matrix. We use the idea of diagonalization and part (c) of the problem to express Q as: (15) A1 0 0 0 0λ2 0 0 (16) 0 0 0 .v Let Q(2) Q-Ai . Thus, Q(2) representsQ after the component associated with direction Pi is removed. Show that vi is in the null space of Q) Hint: Can you write Q) using Eq. (15)?
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