Suppose V is a real vector space and T 2 L.V /. Prove that the followingare
Chapter 9, Problem 18(choose chapter or problem)
Suppose V is a real vector space and T 2 L.V /. Prove that the followingare equivalent:(a) All the eigenvalues of TC are real.(b) There exists a basis of V with respect to which T has an uppertriangularmatrix.(c) There exists a basis of V consisting of generalized eigenvectorsof T.
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