Linear Systems - Mathematics 214 - Fall 2007

1. Give an example of a matrix A with eigenvectors u and v such that u and v have the same eigenvalue but are not parallel.
2. Let u and v be eigenvectors of a matrix A such that both u and v correspond to the same eigenvalue lambda. Let c and d be arbitrary scalars. Prove that if cu+dv is nonzero, then it is an eigenvector of A.