Written by students who passed Immediately available after payment Read online or as PDF Wrong document? Swap it for free 4,6 TrustPilot
logo-home
Exam (elaborations)

APM3706 Assignment 3 Complete Solutions UNISA2026 Ordinary Differential Equations

Rating
-
Sold
-
Pages
19
Grade
A+
Uploaded on
10-07-2026
Written in
2025/2026

APM3706 Assignment 3 Complete Solutions UNISA2026 Ordinary Differential Equations

Content preview

APM3706
ASSIGNMENT 3
Ordinary Differential Equations

FULL
SOLUTIONS
COMPLETE SOLUTIONS

MEMORANDUM
UNISA 2026
Page 1 of 19

,SOLUTIONS

Question 1

(1) Prove Theorem 4.5

Theorem 4.5: Φ is a fundamental matrix of 𝑋̇ = 𝐴𝑋 iff

(a) Φ is a solution of 𝑋̇ = 𝐴𝑋, i.e. Φ̇(𝑡) = 𝐴Φ(𝑡);
(b) det Φ(t₀) ≠ 0.




Page 2 of 19

, Proof:

(⇒) Suppose Φ is a fundamental matrix of 𝑋̇ = 𝐴𝑋. By definition, a fundamental matrix is
a matrix whose columns form a linearly independent set of solutions. Therefore, each
column of Φ is a solution of the system, so Φ̇(𝑡) = 𝐴Φ(𝑡). Also, since the columns are
linearly independent, the determinant of Φ(t) is nonzero for all t in the interval, and in
particular det Φ(t₀) ≠ 0.

(⇐) Suppose (a) and (b) hold. Condition (a) means each column of Φ is a solution of the
system. Condition (b) means that det Φ(t₀) ≠ 0, so the columns are linearly independent
at t₀. By the theory of linear systems, linear independence at one point implies linear
independence on the entire interval. Therefore, the columns form a set of n linearly
independent solutions, so Φ is a fundamental matrix. □

0 1
(2) Verify Theorem 4.5 for the system with 𝐀 = [ ].
−1 −2

First, find the eigenvalues of A. The characteristic equation is ∣ 𝐴 − 𝜆𝐼 ∣= 0:

−𝜆 1
det [ ] = (−𝜆)(−2 − 𝜆) − (1)(−1) = 𝜆2 + 2𝜆 + 1 = (𝜆 + 1)2 = 0.
−1 −2 − 𝜆


So λ = -1 is a repeated eigenvalue. For λ = -1, solve (A - (-1)I)v = 0:

1 1 𝑣1 0
[ ] [𝑣 ] = [ ] ⇒ 𝑣1 + 𝑣2 = 0.
−1 −1 2 0


Choose v = [1; -1]. For a repeated eigenvalue, we need a generalized eigenvector w such
that (A + I)w = v:

1 1 𝑤1 1
[ ] [ ] = [ ] ⇒ 𝑤1 + 𝑤2 = 1.
−1 −1 𝑤2 −1


Choose w = [1; 0]. Then a fundamental matrix is

𝑒 −𝑡 (𝑡 + 1)𝑒 −𝑡
Φ(𝑡) = [ ].
−𝑒 −𝑡 −𝑡𝑒 −𝑡


Check condition (a):
−𝑡
−𝑒 −𝑡𝑒 −𝑡
Φ̇(𝑡) = [ −𝑡 ].
𝑒 (𝑡 − 1)𝑒 −𝑡

Page 3 of 19

Document information

Uploaded on
July 10, 2026
Number of pages
19
Written in
2025/2026
Type
Exam (elaborations)
Contains
Questions & answers

Subjects

R250,00
Get access to the full document:

Wrong document? Swap it for free Within 14 days of purchase and before downloading, you can choose a different document. You can simply spend the amount again.
Written by students who passed
Immediately available after payment
Read online or as PDF

Get to know the seller

Seller avatar
Reputation scores are based on the amount of documents a seller has sold for a fee and the reviews they have received for those documents. There are three levels: Bronze, Silver and Gold. The better the reputation, the more your can rely on the quality of the sellers work.
TutorMaster27794628482 University of South Africa (Unisa)
View profile
Follow You need to be logged in order to follow users or courses
Sold
587
Member since
3 year
Number of followers
305
Documents
343
Last sold
6 days ago
Tutor-Master

Tutor-Master

4,1

60 reviews

5
33
4
13
3
7
2
0
1
7

Why students choose Stuvia

Created by fellow students, verified by reviews

Quality you can trust: written by students who passed their exams and reviewed by others who've used these notes.

Didn't get what you expected? Choose another document

No worries! You can immediately select a different document that better matches what you need.

Pay how you prefer, start learning right away

No subscription, no commitments. Pay the way you're used to via credit card or EFT and download your PDF document instantly.

Student with book image

“Bought, downloaded, and aced it. It really can be that simple.”

Alisha Student

Working on your references?

Create accurate citations in APA, MLA and Harvard with our free citation generator.

Working on your references?

Frequently asked questions