(a) Geometrically, if is an eigenvalue of a matrix and is an eigenvector of
Chapter 7, Problem 62(choose chapter or problem)
(a) Geometrically, if is an eigenvalue of a matrix and is an eigenvector of corresponding to then multiplying by produces a vector parallel to (b) An matrix can have only one eigenvalue. (c) If is an matrix with an eigenvalue then the set of all eigenvectors of is a subspace of Rn.
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