[Solved] 18.06 Unit 2 Exercise 11- Markov matrices; Fourier series

$25

File Name: 18.06_Unit_2_Exercise_11-_Markov_matrices;_Fourier_series.zip
File Size: 536.94 KB

SKU: [Solved] 18.06 Unit 2 Exercise 11- Markov matrices; Fourier series Category: Tag:
5/5 - (1 vote)

Problem 24.1: (6.4 #7. Introduction to Linear Algebra: Strang)

  1. Find a symmetric matrix that has a negative eigenvalue.
  2. How do you know it must have a negative pivot?
  3. How do you know it cant have two negative eigenvalues?

Problem 24.2: (6.4 #23.) Which of these classes of matrices do A and B belong to: invertible, orthogonal, projection, permutation, diagonalizable,

Markov?

A B .

Which of these factorizations are possible for A and B: LU, QR, SS1, or

QQT?

1

Problem 24.3: (8.3 #11.) Complete A to a Markov matrix and find the steady state eigenvector. When A is a symmetric Markov matrix, why is x1 = (1, . . . , 1) its steady state?

A = .1 .

2

Reviews

There are no reviews yet.

Only logged in customers who have purchased this product may leave a review.

Shopping Cart
[Solved] 18.06 Unit 2 Exercise 11- Markov matrices; Fourier series
$25