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Mathematics (Including Placement Year)

Course overview

(BSc) Bachelor of Science
Mathematics (Including Placement Year)
Current
University of Essex
University of Essex
Mathematical Sciences
Colchester Campus
This programme will meet the educational requirements of the Chartered Mathematician designation, awarded by the Institute of Mathematics and its Applications, when it is followed by subsequent training and experience in employment to obtain equivalent competences to those specified by the Quality Assurance Agency (QAA) for taught masters degrees.
Honours Degree
Full-time
Mathematics, Statistics and Operational Research
BSC G103
http://www.essex.ac.uk/students/exams-and-coursework/ppg/ug/default.aspx
11/07/2018

A-levels: BBB, including Mathematics
Please note we are unable to accept A-level Use of Mathematics in place of A-level Mathematics

IB: 30 points, including Higher Level Mathematics grade 5. We are also happy to consider a combination of separate IB Diploma Programmes at both Higher and Standard Level.

Exact offer levels will vary depending on the range of subjects being taken at higher and standard level, and the course applied for. Please contact the Undergraduate Admissions Office for more information.

English language requirements for applicants whose first language is not English: IELTS 6.0 overall. Different requirements apply for second year entry, and specified component grades are also required for applicants who require a Tier 4 visa to study in the UK.

Other English language qualifications may be acceptable so please contact us for further details. If we accept the English component of an international qualification then it will be included in the information given about the academic levels listed above. Please note that date restrictions may apply to some English language qualifications

If you are an international student requiring a Tier 4 visa to study in the UK please see our immigration webpages for the latest Home Office guidance on English language qualifications.

If you do not meet our IELTS requirements then you may be able to complete a pre-sessional English pathway that enables you to start your course without retaking IELTS.

Additional Notes

If you’re an international student, but do not meet the English language or academic requirements for direct admission to this degree, you could prepare and gain entry through a pathway course. Find out more about opportunities available to you at the University of Essex International College here.

External Examiners

Dr Tania Clare Dunning
The University of Kent
Reader in Applied Mathematics

External Examiners provide an independent overview of our courses, offering their expertise and help towards our continual improvement of course content, teaching, learning, and assessment. External Examiners are normally academics from other higher education institutions, but may be from the industry, business or the profession as appropriate for the course. They comment on how well courses align with national standards, and on how well the teaching, learning and assessment methods allow students to develop and demonstrate the relevant knowledge and skills needed to achieve their awards. External Examiners who are responsible for awards are key members of Boards of Examiners. These boards make decisions about student progression within their course and about whether students can receive their final award.

eNROL, the module enrolment system, is now open until Monday 21 October 2019 8:59AM, for students wishing to make changes to their module options.

Key

Core You must take this module You must pass this module. No failure can be permitted.
Core with Options You can choose which module to study
Compulsory You must take this module There may be limited opportunities to continue on the course/be eligible for the degree if you fail.
Compulsory with Options You can choose which module to study
Optional You can choose which module to study

Year 1 - 2019/20

Component Number Module Code Module Title Status Credits
01 MA101-4-FY Calculus Core 30
02 MA105-4-SP Applied Mathematics Compulsory 15
03 MA108-4-SP Statistics I Core 15
04 MA114-4-AU Matrices and Complex Numbers Core 15
05 MA182-4-AU Numerical Methods and Computation Compulsory 15
06 MA125-4-SP Mathematical Skills Compulsory 15
07 MA181-4-AU Discrete Mathematics Compulsory 15
08 MA199-4-FY Mathematics Careers and Employability Compulsory 0

Year 2 - 2020/21

Component Number Module Code Module Title Status Credits
01 MA201-5-AU Linear Algebra Compulsory 15
02 MA203-5-AU Real Analysis Compulsory 15
03 MA205-5-SP Optimisation (Linear Programming) Compulsory 15
04 MA210-5-AU Vector Calculus Compulsory 15
05 MA204-5-SP Abstract Algebra Compulsory 15
06 MA200-5-AU or MA222-5-AU Compulsory with Options 15
07 MA209-5-SP Numerical Methods Compulsory 15
08 MA202-5-SP Ordinary Differential Equations Compulsory 15
09 MA199-5-FY Mathematics Careers and Employability Compulsory 0

Year Abroad/Placement - 2021/22

Component Number Module Code Module Title Status Credits
01 MA100-6-FY Placement Year Compulsory 120

Exit awards

A module is given one of the following statuses: 'core' – meaning it must be taken and passed; 'compulsory' – meaning it must be taken; or 'optional' – meaning that students can choose the module from a designated list. The rules of assessment may allow for limited condonement of fails in 'compulsory' or 'optional' modules, but 'core' modules cannot be failed. The status of the module may be different in any exit awards which are available for the course. Exam Boards will consider students' eligibility for an exit award if they fail the main award or do not complete their studies.

Programme aims

The teaching aims of this course are:

To equip students with the knowledge and skills that are currently in demand in mathematically oriented employment in business, commerce, industry, government service, the field of education and in the wider economy;

To provide students with a foundation for further study and research;

To produce graduates who are mathematically literate and capable of producing a logical argument;

To enable students to acquire a broad understanding of mathematics;

To provide teaching which is informed and enhanced by the research activities of the staff;

To develop the students' ability to make an effective contribution to team-based activity;

To encourage students to adopt an investigative approach and develop independent study skills in order to ensure their continuing professional development.

To provide students with an opportunity to undertake a period of supported work placement to enhance their career preparation.

Learning outcomes and learning, teaching and assessment methods

On successful completion of the programme a graduate should demonstrate knowledge and skills as follows:

A: Knowledge and understanding

A1 Knowledge and understanding of the basic mathematical methods and techniques of linear mathematics, calculus and statistics that underpin the study of more advanced mathematical ideas.
A2 Knowledge and understanding of some of the ideas and methods used in mathematical proof of results in algebra, analysis, and discrete mathematics and familiarity with some specific examples.
A3 Knowledge and understanding of the power and potential pitfalls of computer use and mathematical computer packages, and experience in their use.
A4 Knowledge and understanding of the use of mathematics for modelling and as an investigative tool for the solution of practical problems. An appreciation of the importance of assumptions.
A101 An experience-based understanding of work roles is developed through the placement year.
Learning Methods: Lectures are the principal method of delivery for the concepts and principles involved in A1 - A4.

Students are also directed to reading from textbooks and material available online.

In some modules, understanding is enhanced through the production of a written report.

Understanding is reinforced by means of classes (A1 - A4), laboratories (A3, A4) and assignments (A1 - A4).
A101 is acquired through a placement year at a host organisation. The details of the learning/teaching methods are included on each training agreement and are specific to an individual student.
Assessment Methods: Achievement of knowledge outcomes is assessed primarily through unseen closed-book examinations, and also, in some modules through marked coursework, laboratory reports, statistical assignments, project reports and oral examinations.

Regular problem sheets provide formative assessment in most modules.
Assessment of the placement year is through a number of elements including an assessment of the students performance in securing the placement, undertaking the placement, and reflecting on the placement experience.

B: Intellectual and cognitive skills

B1 Identify an appropriate method to solve a specific mathematical problem.
B2 Analyse a given mathematical problem and select the most appropriate tools for its solution.
B101 A capacity to connect subject specific theory to practice in a work environment.
Learning Methods: The basis for intellectual skills is provided in lectures, and the skills are developed by means of recommended reading, guided and independent study, assignments and project work.

B1 and B2 are developed through exercises supported by classes.

B1 and B2 are all-important aspects of the projects that constitute a part of some modules, and the optional final year project.
B101 is developed during the placement year.
Assessment Methods: Achievement of intellectual skills is assessed primarily through unseen closed-book examinations, and also through marked assignments and project work.

C: Practical skills

C1 Use computational tools and packages.
C2 The ability to apply a rigorous, analytic, highly numerate approach to a problem.
C101 Communicate with a range of colleagues and clients in a working environment.
Learning Methods: The practical skills of mathematics are developed in exercise classes, laboratory classes, assignments and project work.

C1 is acquired through the learning of at least one programming language and the use of a number of computer packages, as a part of the teaching of modules for which they are relevant.

C2 is acquired and enhanced throughout the course.
C101 is developed during the placement year.
Assessment Methods: Achievement of practical skills is assessed through marked coursework, project reports and oral examinations.
Assessment of the placement year is through a number of elements including an assessment of the students performance in securing the placement, undertaking the placement, and reflecting on the placement experience.

D: Key skills

D1 Communicate effectively, both mathematical arguments and textual accounts of ideas.
D2 Use appropriate IT facilities as a tool in the analysis of mathematical problems.
D3 Use mathematical techniques correctly.
D4 Analyse complex problems and find effective solutions.
D5 Organise activity and manage time in the course of study.
D101 Capacity to work in a team within a work environment.
D102 Improve personal professional practice through a reflective approach within a work environment.
Learning Methods: D1 is practised throughout the course in the writing of solutions to mathematical problems, both for assessment and as exercises, and (in some modules) writing reports or projects.

D1 and D2 are developed in group and individual project work.

D2 is developed through the use of computer packages in a number of modules.

D3 - D5 are developed in exercises and assignments throughout the course.
D101 and D102 are developed during the placement year.
Assessment Methods: D1 is assessed through examinations, coursework and oral examinations.

D2 is assessed primarily through coursework.

Assessment of the key skills D3 - D5 is intrinsic to subject based assessment.

The assessment of MA830 and MA831 includes specific allocations of credit for the quality of presentations (D1 and D2).
D101 and D102 are assessed through the placement year.


Note

The University makes every effort to ensure that this information on its programme specification is accurate and up-to-date. Exceptionally it can be necessary to make changes, for example to courses, facilities or fees. Examples of such reasons might include a change of law or regulatory requirements, industrial action, lack of demand, departure of key personnel, change in government policy, or withdrawal/reduction of funding. Changes to courses may for example consist of variations to the content and method of delivery of programmes, courses and other services, to discontinue programmes, courses and other services and to merge or combine programmes or courses. The University will endeavour to keep such changes to a minimum, and will also keep students informed appropriately by updating our programme specifications.

The full Procedures, Rules and Regulations of the University governing how it operates are set out in the Charter, Statutes and Ordinances and in the University Regulations, Policy and Procedures.

Should you have any questions about programme specifications, please contact Course Records, Quality and Academic Development; email: crt@essex.ac.uk.