- Problem 5 Suppose That V Is Finite Dimensional And T V V Is An Operator Such That Every Non Zero Vector In V Is An E 1 (23.4 KiB) Viewed 55 times
Problem 5. Suppose that V is finite dimensional and T: V + V is an operator such that every non-zero vector in V is an e
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Problem 5. Suppose that V is finite dimensional and T: V + V is an operator such that every non-zero vector in V is an e
Problem 5. Suppose that V is finite dimensional and T: V + V is an operator such that every non-zero vector in V is an eigenvector for T. Show that T is a scalar multiple of the identity.