- 12 Let V Denote The Finite Dimensional Vector Space Over F And Let O V V Be A Linear Transformation Prove That O Ca 1 (12.9 KiB) Viewed 11 times
12. Let V denote the finite dimensional vector space over F and let o: V → V be a linear transformation. Prove that o ca
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12. Let V denote the finite dimensional vector space over F and let o: V → V be a linear transformation. Prove that o ca
12. Let V denote the finite dimensional vector space over F and let o: V → V be a linear transformation. Prove that o can be represented by a diagonal matrix if and only if there exists a basis for V consisting of eigenvectors of a.