Let a : V → V be a diagonalisable linear map where V is a vector space of dimension 4 over the field F3. (a) Is it possible for ma(x) to have degree 4? (b) Is it possible for ma(x) to have degree 3?

Let a : V → V be a diagonalisable linear map where V is a vector space of dimension 4 over the field F3. (a) Is it possible for ma(x) to have degree 4? (b) Is it possible for ma(x) to have degree 3?

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter3: Functions And Graphs

Section3.3: Lines

Problem 30E

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Question

Let a : V → V be a diagonalisable linear map where V is a vector space of dimension 4 over the field F3.
(a) Is it possible for ma(x) to have degree 4?
(b) Is it possible for ma(x) to have degree 3?

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