1 20 1show that the mapping ada : M2 (R) → M2 (R) defined by adA (B)7. For AAB – BĀ is a linear transformation. Find bases for the kernel and the range of ad A.-

The given matrix is A=1201. Now consider the map adA:M2ℝ→M2ℝ defined by adAB=AB-BA. We need to show…

Answered: For A = 0 show that the mapping adA: M₂…

Linear Algebra: A Modern Introduction

4th Edition

ISBN:9781285463247

Author:David Poole

Publisher:David Poole

Chapter6: Vector Spaces

Section6.4: Linear Transformations

Problem 11EQ

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For A = 0 show that the mapping adA: M₂ (R) → M₂ (R) defined by adĄ (B) = ABBA is a linear transformation. Find bases for the kernel and the range of ad A. 2 2