I have a $4\times 4$ matrix and I tried solving for the determinant of $P-\lambda I$. This came out really messy and when I put the matrix into a matrix calculator my solution was $1,0$ and $-1$. Does this still mean $1$ is a unique eigenvalue solution? Is there a quicker method of proving $1$ is a unique eigenvalue?
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You correctly computed the eigenvalues: they are (with multiplicity), $\{-1,0,0,1\}$. So $1$ is not a unique eigenvalue.
Looking at the matrix, you can see that several rows are equal. Each time this happens, you get $0$ as an eigenvalue.
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Thanks. I was wasting so much time trying to find a way that 1 was the only eigenvalue. – user799790 Jun 17 '20 at 16:07