This module serves as an introduction to algebraic methods which are central in modern mathematics and that have found applications in many other sciences, but also in our everyday life. In this course students will also gain an appreciation of the concept of proof in mathematics.
Contact hours: 42
Private study: 108
Total: 150
Assessments: 2x assessments each worth 20% (Total 40%)
Examination 2 hours (Total 60%). The coursework mark alone will not be sufficient to demonstrate the student's level of achievement on the module.
Reassessment methods:
Like-for-like
The University is committed to ensuring that core reading materials are in accessible electronic format in line with the Kent Inclusive Practices.
The most up to date reading list for each module can be found on the university's reading list pages.
See the library reading list for this module (Canterbury)
The intended subject specific learning outcomes.
On successfully completing the module students
1 Demonstrate knowledge of the underlying concepts and principles associated with basic algebraic methods;
2 Demonstrate the capability to make sound judgements in accordance with the basic theories and concepts in the following areas, whilst demonstrating a reasonable level of skill in calculation and manipulation of the material: logic, basic set theory, functions, relations, complex numbers, number systems, polynomials.
3 Apply the underlying concepts and principles associated with basic algebraic methods in several well-defined contexts, showing an ability to evaluate the appropriateness of different approaches to solving problems in this area.
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