This course syllabus is discontinued or replaced by a new course syllabus. |
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Course Syllabus |
Foundations of Analysis, 7.5 Credits |
Course Code: | MA109G | Subject Area: | Field of Science |
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Main Field of Study: | Mathematics | Credits: | 7.5 |
Subject Group (SCB): | Mathematics | ||
Education Cycle: | First Cycle | Progression: | G1F |
Established: | 2014-12-09 | Last Approved: | 2018-03-28 |
Valid from: | Autumn semester 2018 | Approved by: | Head of School |
General aims for first cycle education
First-cycle courses and study programmes shall develop:
- the ability of students to make independent and critical assessments
- the ability of students to identify, formulate and solve problems autonomously, and
- the preparedness of students to deal with changes in working life.
In addition to knowledge and skills in their field of study, students shall develop the ability to:
- gather and interpret information at a scholarly level
- stay abreast of the development of knowledge, and
- communicate their knowledge to others, including those who lack specialist knowledge in the field.
(Higher Education Act, Chapter 1, Section 8)
Knowledge and comprehension
After having completed the course the student shall be able to
- discriminate between a mathematical proof and a general reasoning.
Proficiency and ability
After having completed the course the student shall be able to
- prove mathematical propositions within the scope of the present course using standard techniques and known theorems, and
- propose mathematical proofs with good structure and stringent notation.
Values and attitude
After having completed the course the student shall be able to
- give written and oral presentations of mathematical proofs which emphasize the crucial parts and are easy to follow.
Real numbers. Number sequences and convergence, subsequences, Cauchy sequences and series. Topology and the Heine-Borel theorem. Continuous functions, compact functions and supremum. Uniform continuity. Differentiable functions, Riemann integrals, mean value theorems. Sequences of functions, absolute convergence and power series. Metric spaces.
Lectures and seminars.
The teaching methods may be altered, should only a few students take the course.
Students who have been admitted to and registered on a course have the right to receive tuition and/or supervision for the duration of the time period specified for the particular course to which they were accepted (see, the university's admission regulations (in Swedish)). After that, the right to receive tuition and/or supervision expires.
For further information, see the university's local examination regulations (in Swedish).
According to the Higher Education Ordinance, Chapter 6, Section 18, a grade is to be awarded on the completion of a course, unless otherwise prescribed by the university. The university may prescribe which grading system shall apply. The grade is to be determined by a teacher specifically appointed by the university (an examiner).
According to regulations on grading systems for first- and second-cycle education (vice-chancellor's decision 2010-10-19, reg. no. CF 12-540/2010), one of the following grades is to be used: fail, pass, or pass with distinction. The vice-chancellor or a person appointed by the vice-chancellor may decide on exceptions from this provision for a specific course, if there are special reasons.
Grades used on course are Fail (U), Pass (G) or Pass with Distinction (VG).
The course grading is translated to the ECTS grading scale.
For further information, see the university's local examination regulations (in Swedish).
Multivariable Calculus, 9 Credits.
For further information, see the university's admission regulations (in Swedish).
Students who have previously completed higher education or other activities are, in accordance with the Higher Education Ordinance, entitled to have these credited towards the current programme, providing that the previous studies or activities meet certain criteria.
For further information, see the university's local credit transfer regulations (in Swedish).
Required Reading