A of the system x ˙ = x - y , y ˙ = x + y is to be found and it has eigenvalues λ 1 =1 - i and λ 2 =1 + i is to be shown. Also, x(t) in terms of real valued functions is to be expressed. Concept Introduction: Equations for two dimensional linear system are x ˙ = ax + by , y ˙ = cx + dy . The above linear system is expressed in the form x ˙ = Ax . The standard characteristics polynomials is λ 2 - τλ + Δ = 0 , where τ is trace of matrix A, λ is corresponding eigenvalue, and Δ is the determinant of matrix A.

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Chapter 5.2, Problem 2E

Interpretation Introduction

Interpretation:

A of the system x˙ = x - y, y˙ = x + y is to be found and it has eigenvalues λ1=1 - i and λ2=1 + i is to be shown. Also, x(t) in terms of real valued functions is to be expressed.

Concept Introduction:

Equations for two dimensional linear system are x˙ = ax + by, y˙ = cx + dy.

The above linear system is expressed in the form x˙ = Ax.

The standard characteristics polynomials is

λ2- τλ + Δ = 0, where τ is trace of matrix A, λ is corresponding eigenvalue, and Δ is the determinant of matrix A.

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