Consider the system of differential equationsab sin (a)where 1 and 2 are functions of t. Our goal is first to find the general solution of this system and then a particular solution.a) This system can be written using matrices as X' = AX, where X is in R2 and the matrix A isA =əx=andX₂=8Eigenvalues:Give an eigenvector associated to the smallest eigenvalue.Give an eigenvector associated to the largest eigenvalue.Answer:a Ωb) Find the eigenvalues and eigenvectors of the matrix A associated to the system of linear differential equatons. List the eigenvalues separatedsemicolons.x₁ = 10/3x1 + 4/3x2x=8/3x1 +14/3x2c) The general solution of the system of linear differential equations is of the form X = c₁ X₁ + c2X2, where c₁ and co are constants, andX1Answer: X(t) = - (21 (6))=d) Find the solution if the initial condition is-B"We assume that X₁ is assoicated to the smallest eigenvalue and X2 to the largest eigenvalue. Use the scientific calculator notation. For instance 3ewritten 3*e^(-4*t).-3(21) - (2³) at t=at t = 0.-4tis

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sider the system of differential equations x= 10/3x1 + 4/3x2 x2 = 8/3x1 +14/3x2' ere 1 and 2 are functions of t. Our goal is first to find the general solution of this system and then a particular solution. v AV

sider the system of differential equations x= 10/3x1 + 4/3x2 x2 = 8/3x1 +14/3x2' ere 1 and 2 are functions of t. Our goal is first to find the general solution of this system and then a particular solution. v AV

Linear Algebra: A Modern Introduction

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ISBN:9781285463247

Author:David Poole

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Chapter5: Orthogonality

Section5.3: The Gram-schmidt Process And The Qr Factorization

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Question

Consider the system of differential equations
ab sin (a)
where 1 and 2 are functions of t. Our goal is first to find the general solution of this system and then a particular solution.
a) This system can be written using matrices as X' = AX, where X is in R2 and the matrix A is
A =
əx
=
and
X₂=
8
Eigenvalues:
Give an eigenvector associated to the smallest eigenvalue.
Give an eigenvector associated to the largest eigenvalue.
Answer:
a Ω
b) Find the eigenvalues and eigenvectors of the matrix A associated to the system of linear differential equatons. List the eigenvalues separated
semicolons.
x₁ = 10/3x1 + 4/3x2
x=8/3x1 +14/3x2
c) The general solution of the system of linear differential equations is of the form X = c₁ X₁ + c2X2, where c₁ and co are constants, and
X1
Answer: X(t) = - (21 (6))
=
d) Find the solution if the initial condition is
-
B
"
We assume that X₁ is assoicated to the smallest eigenvalue and X2 to the largest eigenvalue. Use the scientific calculator notation. For instance 3e
written 3*e^(-4*t).
-3
(21) - (2³) at t
=
at t = 0.
-4t
is

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