Part A) I can only say there is necessarily n real eigenvalues producing n pairwise orthogonal eigenvectors because A is symmetric, but what else is there to say about the eigenvalues utilizing the fact that A has orthonormal columns?
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- If $A$ has orthonormal columns, then $A^T A = I$.
- $A$ is also symmetric, we we have $A^2 = I$.
- Now you can check that the eigenvalues must satisfy $\lambda^2 = 1$.
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