E. Dummit's Math 5111 ∼ Algebra I, Fall 2019 ∼ Homework 12, due Dec 4th. All answers should be given with proof. Proofs shou
1. Let A be idempotent, that is, A2 = A. Prove that A is diagonalizable. Solution. Suppose , and let v an eigenvector of A with
![Why two possibles Jordan Canonical forms of a matrix cannot be similar? - Mathematics Stack Exchange Why two possibles Jordan Canonical forms of a matrix cannot be similar? - Mathematics Stack Exchange](https://i.stack.imgur.com/QRfSr.png)
Why two possibles Jordan Canonical forms of a matrix cannot be similar? - Mathematics Stack Exchange
![jcf examples.pdf - The Jordan Canonical Form Examples Example 1 Given A = 0 1 1 2 find its JCF and P 1 1 J = 0 1 chA(t =(t 1)2 Here A(1 = 1 We want to | Course Hero jcf examples.pdf - The Jordan Canonical Form Examples Example 1 Given A = 0 1 1 2 find its JCF and P 1 1 J = 0 1 chA(t =(t 1)2 Here A(1 = 1 We want to | Course Hero](https://www.coursehero.com/thumb/f7/08/f708d1c2d8671b68330dcd7321058b4bff66f61b_180.jpg)