Answer the question accordingly: Let A and B be matrices with size 3 x 3. If only one of these matricesare diagonalizable and if det(A – AI3) = (X – 2)(X² – 9),det(B – XI3) = (X- 3)²(A+ 2) then|%3Da) determine which one is diagonalizable and explain why?b) What could be the possible reason for the other one not beingdiagonalizable?

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Description: Answer the question accordingly: Let A and B be matrices with size 3 x 3. If only one of these matricesare diagonalizable and if det(A – AI3) = (X – 2)(X² – 9),det(B – XI3) = (X- 3)²(A+ 2) then|%3Da) determine which one is diagonalizable and explain

Given, A and B be matrices with size 3×3det(A-λI3)=(λ-2)(λ2-9)det(B-λI3)=(λ-3)2(λ+2)(a) Eigenvalues…

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Let A and B be matrices with size 3 x 3. If only one of these matrices are diagonalizable and if det(A - AI3) = (^ – 2)(X² – 9), det(B – XI3) = (A – 3)²(A +2) then %3D | a) determine which one is diagonalizable and explain why? b) What could be the possible reason for the other one not being diagonalizable?

Let A and B be matrices with size 3 x 3. If only one of these matrices are diagonalizable and if det(A - AI3) = (^ – 2)(X² – 9), det(B – XI3) = (A – 3)²(A +2) then %3D | a) determine which one is diagonalizable and explain why? b) What could be the possible reason for the other one not being diagonalizable?

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Answer the question accordingly:

Let A and B be matrices with size 3 x 3. If only one of these matrices
are diagonalizable and if det(A – AI3) = (X – 2)(X² – 9),
det(B – XI3) = (X- 3)²(A+ 2) then
|
%3D
a) determine which one is diagonalizable and explain why?
b) What could be the possible reason for the other one not being
diagonalizable?

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