Gwybodaeth am Fodiwlau
Module Identifier
MA10510
Module Title
Algebra
Academic Year
2026/2027
Co-ordinator
Semester
Semester 1
Pre-Requisite
A-level Mathematics or equivalent.
Co-Requisite
Exclusive (Any Acad Year)
Reading List
Other Staff
Ìý
Course Delivery
Ìý
Assessment
| Assessment Type | Assessment length / details | Proportion |
|---|---|---|
| Semester Assessment | CourseworkÌý Mark based on attendance at lectures and tutorials and submitted assignmentsÌý | 20% |
| Semester Exam | 2 Hours Ìý (Written Examination)Ìý | 80% |
| Supplementary Exam | 2 Hours Ìý (Written Examination)Ìý | 100% |
Learning Outcomes
On successful completion of this module students should be able to:
1. use the notation for sets and mappings
2. construct proofs using the Principle of Mathematical Induction
3. apply the Binominal Theorem for an integer exponent in various situations
4. obtain the sums of arithmetic and geometric series
5. manipulate complex numbers and use DeMoivre's Theorem
6. use the Division Algorithm for polynominals
7. derive inequalities involving the roots of a polynominal and its coeffcients
Brief description
This module covers the algebra which is fundamental to the development of Mathematics
Aims
To introduce the students to the ideas of algebra through the study of complex numbers and polynominals.
Content
1. SETS AND MAPPINGS: Introduction to number systems and mappings;
2. FINITE SUMS: The Binominal Theorem, arithmatic and geometric series, the principle of mathematical induction;
3. COMPLEX NUMBERS: Geometric interpretation, DeMoivre's Theorem;
4. POLYNOMINALS: The Division Algorithm and Remainder Theorem. Symmetric functions. Relations between roots of a polynominal and its coefficients;
2. FINITE SUMS: The Binominal Theorem, arithmatic and geometric series, the principle of mathematical induction;
3. COMPLEX NUMBERS: Geometric interpretation, DeMoivre's Theorem;
4. POLYNOMINALS: The Division Algorithm and Remainder Theorem. Symmetric functions. Relations between roots of a polynominal and its coefficients;
Module Skills
| Skills Type | Skills details |
|---|---|
| Application of Number | required throughout the course. |
| Communication | Written answers to exercises must be clear and well structured. |
| Improving own Learning and Performance | Students are expected to develop their own approach to time-management regarding the completion of assignments on time and preparation between lectures. |
| Information Technology | Via STACK and Blackboard. |
| Personal Development and Career planning | Completion of task (assignments) to set deadlines will aid personal development. |
| Problem solving | The assignments will give the students opportunities to show creativity in finding solutions and develop their problem solving skills. |
| Research skills | |
| Subject Specific Skills | Broadens exposure of students to topics in mathematics. |
| Team work | Students will be encouraged to work together on questions during tutorials. |
Notes
This module is at Level 4