For the transformation T : R³ → R³ where T(x1,x2, T3) = (3x1, 12, I1 – 12), (a) Determine whether T is linear. (b) Determine whether the standard matrix A, for T is diagonalizable, if so, find P that diagonalize it.

For the transformation T : R³ → R³ where T(x1,x2, T3) = (3x1, 12, I1 – 12), (a) Determine whether T is linear. (b) Determine whether the standard matrix A, for T is diagonalizable, if so, find P that diagonalize it.

Linear Algebra: A Modern Introduction

4th Edition

ISBN:9781285463247

Author:David Poole

Publisher:David Poole

Chapter6: Vector Spaces

Section6.4: Linear Transformations

Problem 3EQ: In Exercises 1-12, determine whether T is a linear transformation. T:MnnMnn defines by T(A)=AB,...

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Question

3. For the transformation T : R³ → R³ where T(x1, x2, T3) = (3x1, x2, T1 – x2),
(a) Determine whether T is linear.
(b) Determine whether the standard matrix A, for T is diagonalizable, if so, find P that
diagonalize it.

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