Q1) Solve and plot the following system of ordinary differential equations: x'(t) = x(t)-2y(t) + z(t) y'(t) = -x(t) - z(t) z'(t)=-4x(t)+4y(t) - 5z(t) The initial conditions, x (0) =1, y (0) =2, z (0) =3 t = [0,3]

Q1) Solve and plot the following system of ordinary differential equations: x'(t) = x(t)-2y(t) + z(t) y'(t) = -x(t) - z(t) z'(t)=-4x(t)+4y(t) - 5z(t) The initial conditions, x (0) =1, y (0) =2, z (0) =3 t = [0,3]

Calculus For The Life Sciences

2nd Edition

ISBN:9780321964038

Author:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Publisher:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Chapter11: Differential Equations

Section11.CR: Chapter 11 Review

Problem 12CR

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Question

Q1) Solve and plot the following system of ordinary differential equations:
x'(t) = x(t) - 2y(t) + z(t)
y'(t) = -x(t) - z(t)
z'(t)=-4x(t) +4y(t) - 5z(t)
The initial conditions, x (0) =1, y (0) =2, z (0) =3
t = [0,3]

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Step 1: Introduction

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Step 2: Calculating eigenvalues of the coefficient matrix

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Step 3: Calculating eigenvector of matrix A corresponding to -1

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Step 4: Calculating eigenvector of matrix A corresponding to -2

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Step 5: Calculating eigenvector of matrix A corresponding to -3

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Step 6: Calculating particular solution of the given system

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Step 7: Plotting the solution

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Solution

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