Last modified: 23 Jul 2024 10:43
Set theory was introduced by Cantor in 1872, who was attempting to understand the concept of "infinity" which defied the mathematical world since the Greeks. Set Theory is fundamental to modern mathematics - any mathematical theory must be formulated within the framework of set theory, or else it is deemed invalid. It is the alphabet of mathematics.
In this course we will study naive set theory. Fundamental object such as the natural numbers and the real numbers will be constructed. Structures such as partial orders and functions will be studied. And of course, we will explore infinite sets.
Study Type | Undergraduate | Level | 1 |
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Term | Second Term | Credit Points | 15 credits (7.5 ECTS credits) |
Campus | Aberdeen | Sustained Study | No |
Co-ordinators |
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Syllabus
Information on contact teaching time is available from the course guide.
Assessment Type | Summative | Weighting | 70 | |
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Assessment Weeks | Feedback Weeks | |||
Feedback |
2-hour Exam (on campus) |
Knowledge Level | Thinking Skill | Outcome |
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Assessment Type | Summative | Weighting | 30 | |
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Assessment Weeks | Feedback Weeks | |||
Feedback |
5 x Short Question Sheets (every two weeks, weighted 6% each) |
Knowledge Level | Thinking Skill | Outcome |
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There are no assessments for this course.
Assessment Type | Summative | Weighting | ||
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Assessment Weeks | Feedback Weeks | |||
Feedback |
Best of (resit exam mark) or (resit exam mark combined with CA marks) |
Knowledge Level | Thinking Skill | Outcome |
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Knowledge Level | Thinking Skill | Outcome |
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Factual | Remember | ILOs for this course can be found in the course guide |
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