Show/hide contentOpenClose All
Curricular information is subject to change
Specific learning outcomes include:1. a knowledge of fundamental algebraic structures such as groups, permutation groups. 2. a familiarity with well-known examples, such as permutation groups, cyclic groups, matrix groups. 3. prowess at performing computations in the algebraic stuctures mentioned above, including composition of permutations. 4. an ability to infer basic results using formal proofs for subgroup criteria, homomorphisms, isomorphisms, cosets and, time permitting, normal subgroups and quotient groups.
Student Effort Type | Hours |
---|---|
Lectures | 18 |
Tutorial | 10 |
Autonomous Student Learning | 90 |
Total | 118 |
Not applicable to this module.
Description | Timing | Component Scale | % of Final Grade | ||
---|---|---|---|---|---|
Not yet recorded. |
Resit In | Terminal Exam |
---|---|
Spring | Yes - 2 Hour |
• Group/class feedback, post-assessment
Not yet recorded.
Name | Role |
---|---|
Mr Cesar Scrochi | Lecturer / Co-Lecturer |
Ms Laura Craig | Tutor |