INTEGRATED PLACEMENT - 2022/3
Module code: MATM048
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.
The student will work on a substantial mathematical project within the company or organisation. The scope of the project is described in a Learning Agreement between the Industrial Supervisor, the Academic Supervisor and the Module Convenor.
Under the guidance of the Industrial Supervisor and the Academic Supervisor, the student will investigate the mathematical topic in depth. They will compose a written report on their studies, and give an oral presentation on their work.
In addition, by providing the student with an opportunity to complete a body of work of interest and relevance to the company and to spend time in the company, this module develops the student’s understanding of the role of mathematics in practical situations and supports the student’s development of personal and professional skills appropriate to future graduate employment.
ASTON Philip (Maths)
Number of Credits: 60
ECTS Credits: 30
Framework: FHEQ Level 7
JACs code: G100
Module cap (Maximum number of students): N/A
Overall student workload
Independent Learning Hours: 600
Prerequisites / Co-requisites
The content will vary according to project and supervisors but should in all cases consist of a substantial piece of work of relevance to the Integrated Placement that presents, uses and applies advanced mathematics. It is not expected to be work of such originality that any section of it is publishable, but it should include evidence of originality and critical ability in its compilation.
During the Integrated Placement the student will also develop and enhance their career development skills, their transferable skills, course-specific or technical skills and learning from experience skills.
|Assessment type||Unit of assessment||Weighting|
|Coursework||WRITTEN REPORT AND VIVA||100|
Any re-assessment will be in the same format as the initial assessment.
The assessment strategy is designed to provide students with the opportunity to demonstrate:
· Their ability to independently research and report upon a mathematical topic relevant to the Integrated Placement and to their degree programme;
· Their ability to prepare and present mathematical work in both a written and oral fashion.
Thus, the summative assessment for this module consists of:
A written report (submitted at the end of the Integrated Placement) and an oral presentation (after the submission of the report).
Formative assessment and feedback
Students receive continuous feedback through regular meetings and communications with the Academic Supervisor and Industrial Supervisor during the period of the Integrated Placement.
- This module allows the student to demonstrate that, under supervision of a member of academic staff and an industrial supervisor, they are able to undertake and complete a substantial piece of work that presents, uses and/or applies advanced mathematics and is of relevance to the company or organisation of the Integrated Placement. This should normally build on appropriate mathematical material from their degree programme and should contain material and/or applications beyond what has been done in modules at levels 4, 5 and 6.
|1||Be able to independently study mathematics at a level appropriate for the start of a programme of postgraduate study in mathematics||CPT|
|2||Apply academic knowledge to industrial situations where appropriate||KCPT|
|3||Understand and demonstrate acquired transferable skills and technical knowledge||KCPT|
|4||Have gained familiarity in areas of mathematics appropriate to Level 7 by private study||KC|
|5||Be able to present a substantial body of mathematical thoughts and arguments in a coherent way, both by written and oral communication||KPT|
|6||Be able to write a substantial scientific report. This should accurately and appropriately cite relevant references and use diagrams, graphs and tables appropriately||KCPT|
|7||It is not required nor expected that the student should obtain original publishable results, but the student should demonstrate originality in the compilation and presentation of the material||KC|
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 provide:
A supportive environment in which the student can develop their skills for independent mathematical work, their ability to research a topic independently, and their presentational skills (both written and oral).
The learning and teaching methods include:
Teaching is by discussion, directed reading and interaction between student and supervisors.
Learning takes place through:
- practical experience of applying mathematical methods to interpret, understand and solve problems related to the Integrated Placement
- background reading and private study.
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: MATM048
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 2022/3 academic year.