ENGINEERING MATHEMATICS III - 2021/2
Module code: EEE2035
In light of the Covid-19 pandemic the University has revised its courses to incorporate the ‘Hybrid Learning Experience’ in a departure from previous academic years and previously published information. The University has changed the delivery (and in some cases the content) of its programmes. Further information on the general principles of hybrid learning can be found at: Hybrid learning experience | University of Surrey.
We have updated key module information regarding the pattern of assessment and overall student workload to inform student module choices. We are currently working on bringing remaining published information up to date to reflect current practice in time for the start of the academic year 2021/22.
This means that some information within the programme and module catalogue will be subject to change. Current students are invited to contact their Programme Leader or Academic Hive with any questions relating to the information available.
Expected prior learning: Mathematical experience equivalent to Year 1 of EE Programmes.
Module purpose: This module builds on the fundamental tools and concepts introduced in the Mathematics modules in Year 1 and applies them to further engineering examples. A broad range of mathematics topics is covered, and their applications are always borne in mind.
Electrical and Electronic Engineering
DEANE Jonathan (Maths)
Number of Credits: 15
ECTS Credits: 7.5
Framework: FHEQ Level 5
JACs code: G100
Module cap (Maximum number of students): N/A
Overall student workload
Independent Learning Hours: 91
Lecture Hours: 11
Tutorial Hours: 11
Guided Learning: 5
Captured Content: 32
Prerequisites / Co-requisites
Indicative content includes the following:
[1 - 4] Fourier Series and Fourier Transforms. Comparison of time and frequency domain. Fourier transforms and inverse transforms. Convolution. Application to signal processing. Quick method for calculating Fourier transforms.
[5 - 6] Probability. Meaning of probability. Dependent, independent and mutually exclusive events.
[7 - 10] Statistics. Definition of terms. The probability density function. Normalisation. Normal, Binomial and Poisson probability density functions. Applications to errors, noise, and least squares fitting of straight lines and other curves to data.
[11 - 12] Method of least squares. Applications to treatment of experimental results.
[13 - 16] Matrices. Determinants. Matrix algebra. Transpose and inverse. Solution of linear simultaneous equations. Eigenvalues and eigenvectors. Two-port parameters.
[17 - 18] The wave equation. Derivation and d'Alembert solution.
[19 - 22] Laplace transforms. Complex frequency. Partial fractions and the solution of differential equations by Laplace transform. Mechanical examples as well as electronic ones.
[23 - 27] Z-transforms. Definition, properties, inversion. Applications and worked examples.
[28 - 30] Cross- and Autocorrelation. Definition, examples, applications.
|Assessment type||Unit of assessment||Weighting|
|Coursework||PROBLEM SHEET 1||10|
|Coursework||PROBLEM SHEET 2||10|
|Examination Online||24HR ONLINE (OPEN BOOK) EXAM||80|
Not applicable: students failing a unit of assessment resit the assessment in its original format.
The assessment strategy for this module is designed to provide students with the opportunity to demonstrate the learning outcomes. The written examination will assess the knowledge and assimilation of mathematical terminology, notation, concepts and techniques, as well as the ability to work out solutions to previously unseen problems under time-constrained conditions. The assignments give the students a chance to practise the required techniques shortly after they have been taught and in problems of a similar level to those that they will meet in the exam.
Thus, the summative assessment for this module consists of the following.
· 2-hour, closed-book written examination.
· Two take-home problem sheets, submitted as coursework.
Formative assessment and feedback
For the module, students will receive formative assessment/feedback in the following ways.
· During lectures, by question and answer sessions
· During office hour meetings with students
· By means of unassessed tutorial problems in the notes (with answers/model solutions)
· Via assessed coursework
Any deadlines given here are indicative. For confirmation of exact dates and times, please check the Departmental assessment calendar issued to you.
- Students will be able to demonstrate the application of relevant mathematics underpinning telecommunications, linear systems, digital signal processing, networks and laboratories, as well as substantial parts of many final year modules.
|1||Apply mathematics analytically to a range of engineering problems.||KPT|
|2||Select the appropriate mathematical techniques for a range of problems, while bearing in mind the limitations of these techniques.||KCT|
|3||Demonstrate ability to present solutions in a clear and structured way.||KCPT|
C - Cognitive/analytical
K - Subject knowledge
T - Transferable skills
P - Professional/Practical skills
Methods of Teaching / Learning
The learning and teaching strategy is designed to achieve the following aims:
- Student familiarity with the basic concepts, notations and techniques used in mathematics as it is applied to engineering, as taught in Mathematics I and II.
- Facility with the fundamental tools of applied mathematics that will support many other courses in the current and next Level of Electronic Engineering degree programmes.
Learning and teaching methods include the following:
- Lectures (3 hours per week for 11 weeks).
- Class discussion in lectures.
- One-to-one sessions with lecturer during office hours.
- One hour tutorial every two weeks in Drop-in Centre.
Indicated Lecture Hours (which may also include seminars, tutorials, workshops and other contact time) are approximate and may include in-class tests where one or more of these are an assessment on the module. In-class tests are scheduled/organised separately to taught content and will be published on to student personal timetables, where they apply to taken modules, as soon as they are finalised by central administration. This will usually be after the initial publication of the teaching timetable for the relevant semester.
Upon accessing the reading list, please search for the module using the module code: EEE2035
Programmes this module appears in
|Electronic Engineering with Computer Systems BEng (Hons)||1||Compulsory||A weighted aggregate mark of 40% is required to pass the module|
|Electronic Engineering BEng (Hons)||1||Compulsory||A weighted aggregate mark of 40% is required to pass the module|
|Electrical and Electronic Engineering BEng (Hons)||1||Compulsory||A weighted aggregate mark of 40% is required to pass the module|
|Electronic Engineering with Nanotechnology BEng (Hons)||1||Compulsory||A weighted aggregate mark of 40% is required to pass the module|
|Electronic Engineering with Nanotechnology MEng||1||Compulsory||A weighted aggregate mark of 40% is required to pass the module|
|Electronic Engineering with Space Systems BEng (Hons)||1||Compulsory||A weighted aggregate mark of 40% is required to pass the module|
|Electronic Engineering with Space Systems MEng||1||Compulsory||A weighted aggregate mark of 40% is required to pass the module|
|Electronic Engineering with Computer Systems MEng||1||Compulsory||A weighted aggregate mark of 40% is required to pass the module|
|Electronic Engineering MEng||1||Compulsory||A weighted aggregate mark of 40% is required to pass the module|
|Computer and Internet Engineering BEng (Hons)||1||Compulsory||A weighted aggregate mark of 40% is required to pass the module|
|Electrical and Electronic Engineering MEng||1||Compulsory||A weighted aggregate mark of 40% is required to pass the module|
|Computer and Internet Engineering MEng||1||Compulsory||A weighted aggregate mark of 40% is required to pass the module|
Please note that the information detailed within this record is accurate at the time of publishing and may be subject to change. This record contains information for the most up to date version of the programme / module for the 2021/2 academic year.