trying to do some homework but I can't make any sense of this problem.
Suppose that $C$ is an invertible matrix (such that $CAC^{-1}$ is defined). Find an eigenvalue for the matrix $B$ where $B = CAC^{-1}$.
Since its invertible there is no $0$ eigenvalue, $CAC^{-1}$ is defined I don't understand how $B$ could be $CAC^{-1}$.
Suppose that a square matrix 𝐴 has a characteristic polynomial A = (𝜆-2)^3(𝜆-4)(𝜆-5)$(\lambda-2)^3(\lambda-4)(\lambda-5)$
