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Linear system 1. Analysis. Lesson 6. State transition matrix. The behavior of x(t) et y(t) :. Homogeneous solution of x(t) Non-homogeneous solution of x(t). Homogeneous solution. State transition matrix. Properties. Non-homogeneous solution. Convolution. Homogeneous.
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Linear system 1. Analysis Lesson 6 State transition matrix linear system by Meiling CHEN
The behavior of x(t) et y(t) : • Homogeneous solution of x(t) • Non-homogeneous solution of x(t) linear system by Meiling CHEN
Homogeneous solution State transition matrix linear system by Meiling CHEN
Properties linear system by Meiling CHEN
Non-homogeneous solution Convolution Homogeneous linear system by Meiling CHEN
Zero-input response Zero-state response linear system by Meiling CHEN
Example 1 Ans: linear system by Meiling CHEN
Using Maison’s gain formula linear system by Meiling CHEN
How to find State transition matrix Methode 1: Methode 2: Methode 3: Cayley-Hamilton Theorem linear system by Meiling CHEN
Methode 1: linear system by Meiling CHEN
Methode 2: diagonal matrix linear system by Meiling CHEN
Diagonization linear system by Meiling CHEN
Diagonization linear system by Meiling CHEN
Case 1: depend linear system by Meiling CHEN
In the case of A matrix is phase-variable form and Vandermonde matrix for phase-variable form linear system by Meiling CHEN
Case 1: depend linear system by Meiling CHEN
Case 3: Jordan form Generalized eigenvectors linear system by Meiling CHEN
Example: linear system by Meiling CHEN
Method 3: linear system by Meiling CHEN
any linear system by Meiling CHEN
Example: linear system by Meiling CHEN
Example: linear system by Meiling CHEN