Bachelor of Science (BSc)

BSc Computer Science and Mathematics

One of the most sought-after subject combinations in industry, this course is designed to provide the perfect balance of creativity and logic.
  • Duration: 3 years
  • Year of entry: 2025
  • UCAS course code: GG14 / Institution code: M20
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Course unit details:
Introduction to Ordinary Differential Equations

Course unit fact file
Unit code MATH11412
Credit rating 10
Unit level Level 1
Teaching period(s) Semester 2
Available as a free choice unit? No

Overview

The unit provides a basic introduction to ordinary differential equations (ODEs) and some applications. The course will discuss both methods, including analytical as well graphical and approximate methods associated with general first and second order ODEs. Applications including simple problems drawn from many fields including Newtonian mechanics, population models, economics, biology, will be introduced, and the corresponding equations will be written down and their solutions discussed.

Aims

The unit provides a basic introduction to ordinary differential equations (ODEs) and applications. The course will discuss both methods, including analytical as well graphical and approximate methods associated with general first and second order ODEs. Applications including simple problems drawn from many fields including Newtonian mechanics, population models, economics, biology, will be introduced, and the corresponding equations will be written down and their solutions discussed.

The main aims are to:

  1. Provide a classification of ODEs
  2. Provide analytical methods of solving both first and second-order ODEs;
  3. Introduce approximate methods (graphical, numerical, approximate) for solving first order and systems of first order equations.
  4. Introduce model problems leading to ODEs.

Learning outcomes

On the successful completion of the course, students will be able to:

  • Classify ODEs (in terms of order, linear/nonlinear autonomous/nonautonomous, initial or boundary value problem) and assess the existence and uniqueness of their solutions.
  • Select and apply techniques for finding analytical solutions for several classes of first and second order ODEs.&
  • Locate equilibrium points for first order systems of ODEs and perform phase plane analysis.&
  • Apply and interpret the results of a simple numerical method (the Euler method) for approximately solving initial value problems.

Assessment methods

Method Weight
Other 30%
Written exam 70%

Feedback methods

There are supervisions each week for the first half of the semester which provide an opportunity for students; work to be marked and discussed and to provide feedback on their understanding. Coursework or in-class tests (where applicable) also provide an opportunity for students to receive feedback. Students can also get feedback on their understanding directly from the lecturer, for example during the lecturer's office hour.

Recommended reading

Farlow - Introduction to Differential Equations and Their Applications  

Martin Braun (1993), Differential Equations and Their Applications, 4th edition, Volume 11 of Springer Texts in Applied Maths. DOI: 10.1007/978-1-4612-4360-1 

A good reference for extra reading is Trefethen, Birkisson, Driscoll – Exploring ODEs  (https://people.maths.ox.ac.uk/trefethen/ExplODE/) 

Study hours

Scheduled activity hours
Lectures 18
Tutorials 6
Independent study hours
Independent study 76

Teaching staff

Staff member Role
Marcus Webb Unit coordinator
Gareth Wyn Jones Unit coordinator

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