Linear system by Meiling CHEN1 Lesson 6 State transition matrix Linear system 1. Analysis.

Slides:

Advertisements

Similar presentations

Time Response and State Transition Matrix

Advertisements

Example 1 Matrix Solution of Linear Systems Chapter 7.2 Use matrix row operations to solve the system of equations  2009 PBLPathways.

Chapter 6 Eigenvalues and Eigenvectors

Eigenvalues and Eigenvectors (11/17/04) We know that every linear transformation T fixes the 0 vector (in R n, fixes the origin). But are there other subspaces.

Solution of Linear State- Space Equations. Outline Laplace solution of linear state-space equations. Leverrier algorithm. Systematic manipulation of matrices.

Eigenvalues and Eigenvectors

Some useful linear algebra. Linearly independent vectors span(V): span of vector space V is all linear combinations of vectors v i, i.e.

Ch 7.9: Nonhomogeneous Linear Systems

數位控制（九）.

Lesson 3 Signals and systems Linear system. Meiling CHEN2 (1) Unit step function Shift a Linear system.

Lecture 03 Canonical forms.

1 HW 3: Solutions 1. The output of a particular system S is the time derivative of its input. a) Prove that system S is linear time-invariant (LTI). Solution:

NUU Department of Electrical Engineering Linear Algebra---Meiling CHEN1 Lecture 28 is positive definite Similar matrices Jordan form.

Automatic Control by Meiling CHEN1 Lesson 4 modeling Automatic control 1. modeling.

Meiling chensignals & systems1 Lecture #2 Introduction to Systems.

5 5.1 © 2012 Pearson Education, Inc. Eigenvalues and Eigenvectors EIGENVECTORS AND EIGENVALUES.

Digital Control Systems Vector-Matrix Analysis. Definitions.

Ordinary Differential Equations Final Review Shurong Sun University of Jinan Semester 1,

NUU Department of Electrical Engineering Linear Algedra ---Meiling CHEN1 Eigenvalues & eigenvectors Distinct eigenvalues Repeated eigenvalues –Independent.

Elementary Linear Algebra Howard Anton Copyright © 2010 by John Wiley & Sons, Inc. All rights reserved. Chapter 1.

Section 8.3 – Systems of Linear Equations - Determinants Using Determinants to Solve Systems of Equations A determinant is a value that is obtained from.

Elementary Linear Algebra Howard Anton Copyright © 2010 by John Wiley & Sons, Inc. All rights reserved. Chapter 1.

II. System of Non-Homogeneous Linear Equations Coefficient Matrix Matrix form Of equations Guiding system （1）（1）

Autumn 2008 EEE8013 Revision lecture 1 Ordinary Differential Equations.

1 Consider a given function F(s), is it possible to find a function f(t) defined on [0,  ), such that If this is possible, we say f(t) is the inverse.

A matrix equation has the same solution set as the vector equation which has the same solution set as the linear system whose augmented matrix is Therefore:

Linear Algebra 1.Basic concepts 2.Matrix operations.

Domain Range definition: T is a linear transformation, EIGENVECTOR EIGENVALUE.

4.6: Rank. Definition: Let A be an mxn matrix. Then each row of A has n entries and can therefore be associated with a vector in The set of all linear.

Section 5.1 First-Order Systems & Applications

Interarea Oscillations Starrett Mini-Lecture #5. Interarea Oscillations - Linear or Nonlinear? l Mostly studied as a linear phenomenon l More evidence.

Time Domain Analysis of Linear Systems Ch2 University of Central Oklahoma Dr. Mohamed Bingabr.

Solving Linear Inequalities Lesson 5.5 linear inequality: _________________________________ ________________________________________________ solution of.

Section 1.2 Gaussian Elimination. REDUCED ROW-ECHELON FORM 1.If a row does not consist of all zeros, the first nonzero number must be a 1 (called a leading.

Nonhomogeneous Linear Systems Undetermined Coefficients.

State space model: linear: or in some text: where: u: input y: output x: state vector A, B, C, D are const matrices.

5.1 Eigenvectors and Eigenvalues 5. Eigenvalues and Eigenvectors.

Non-Homogeneous Second Order Differential Equation.

Similar diagonalization of real symmetric matrix

The Further Mathematics network

Differential Equations MTH 242 Lecture # 26 Dr. Manshoor Ahmed.

Lesson 7 Controllability & Observability Linear system 1. Analysis.

5 5.1 © 2016 Pearson Education, Ltd. Eigenvalues and Eigenvectors EIGENVECTORS AND EIGENVALUES.

TYPES OF SOLUTIONS SOLVING EQUATIONS

Systems of Linear Differential Equations

Systems of linear equations

Elementary Linear Algebra

TYPES OF SOLUTIONS SOLVING EQUATIONS

Eigenvalues and Eigenvectors

Boyce/DiPrima 10th ed, Ch 7.8: Repeated Eigenvalues Elementary Differential Equations and Boundary Value Problems, 10th edition, by William E. Boyce.

Elementary Linear Algebra

Ali Karimpour Associate Professor Ferdowsi University of Mashhad

Some useful linear algebra

Systems of Differential Equations Nonhomogeneous Systems

Use Inverse Matrices to Solve Linear Systems

Solving Linear Systems Using Inverse Matrices

Matrix Solutions to Linear Systems

MATH 374 Lecture 23 Complex Eigenvalues.

Linear Algebra Lecture 3.

PROPERTIES OF LINEAR SYSTEMS AND THE LINEARITY PRINCIPLE

Chapter 3 Section 5.

Analysis of Control Systems in State Space

Comparison Functions Islamic University of Gaza Faculty of Engineering

Linear Algebra Lecture 29.

Homogeneous Linear Systems

Linear Algebra Lecture 30.

Chapter 2 Reasoning and Proof.

Convolution sum & Integral

Linear Algebra Lecture 28.

Presentation transcript:

linear system by Meiling CHEN1 Lesson 6 State transition matrix Linear system 1. Analysis

linear system by Meiling CHEN2 1.Homogeneous solution of x(t) 2.Non-homogeneous solution of x(t) The behavior of x(t) et y(t) :

linear system by Meiling CHEN3 Homogeneous solution State transition matrix

linear system by Meiling CHEN4 Properties

linear system by Meiling CHEN5 Non-homogeneous solution Convolution Homogeneous

linear system by Meiling CHEN6 Zero-input responseZero-state response

linear system by Meiling CHEN7 Example 1 Ans:

linear system by Meiling CHEN8 Using Maison’s gain formula

linear system by Meiling CHEN9 How to findState transition matrix Methode 1: Methode 3: Cayley-Hamilton Theorem Methode 2:

linear system by Meiling CHEN10 Methode 1:

linear system by Meiling CHEN11 Methode 2: diagonal matrix

linear system by Meiling CHEN12 Diagonization

linear system by Meiling CHEN13 Diagonization

linear system by Meiling CHEN14 Case 1: depend

linear system by Meiling CHEN15 In the case of A matrix is phase-variable form and Vandermonde matrix for phase-variable form

linear system by Meiling CHEN16 Case 1: depend

linear system by Meiling CHEN17

linear system by Meiling CHEN18 Case 3:Jordan form Generalized eigenvectors

linear system by Meiling CHEN19 Example:

linear system by Meiling CHEN20 Method 3:

linear system by Meiling CHEN21 any

linear system by Meiling CHEN22 Example:

linear system by Meiling CHEN23 Example:

linear system by Meiling CHEN24

linear system by Meiling CHEN25

linear system by Meiling CHEN26

linear system by Meiling CHEN27

linear system by Meiling CHEN28

linear system by Meiling CHEN29