? Credit Points : 10  ? SCQF Level : 8  ? Acronym : MAT-2-me4

Partial differentiation with applications in Electrical Engineering and Mechanical Engineering; functions of two or more variables, contours (level sets); partial and directional derivatives, gradient, tangent plane, normals; differentials and chain rule; extrema; applications. Scalar and vector fields; divergence and curl; conservative fields and potential; vector differential identities; simple applications from properties of continua and electromagnetism. Repeated multiple integration (change of order of integration); integration in plane polar coordinates; line integrals (link to exact differentials, potential and work); surface integrals (flux); divergence, Green's and Stokes's theorems; applications and physical interpretations.

? Pre-requisites : Prior attendance at MAT-2-me3

? Prohibited combinations : MAT-2-mm3, MAT-2-mm4, MAT-2-SVC, MAT-2-MAM, MAT-2-mc4

Home subject area

Mathematics for Physical Science & Engineering, (School of Mathematics, Schedule P)

? Normal year taken : 2nd year

? Delivery Period : Semester 2 (Blocks 3-4)

? Contact Teaching Time : 3 hour(s) per week for 11 weeks

First Class Information

Date Start End Room Area Additional Information 07/01/2008 10:00 11:00 Lecture Theatre A, JCMB KB

All of the following classes

Type Day Start End Area Lecture Monday 10:00 10:50 KB Lecture Thursday 10:00 10:50 KB

? Additional Class Information : Tutorials: Tu at 0900 and 1000

1. An ability to handle partial derivatives, to relate them to directional derivatives, contours and extrema of functions of several variables.
2. An understanding of vector fields, their divergence and curl.
3. An ability to use the basic vector differential identities.
4. A competence in evaluating repeated and multiple integrals.
5. An understanding of line integrals, their calculation and relation to the potential of a conservative field.
6. An ability to calculate integrals, such as flux, over simple curved surfaces.
7. An ability to use the divergence theorem and Stokes's theorem in simple situations, and a realization of their great practical importance.

Coursework: 15%; Degree Examination: 85%; at least 40 must be achieved in each component.

Exam times

Diet Diet Month Paper Code Paper Name Length 1ST May 1 - 1 hour(s) 30 minutes 2ND August 1 - 1 hour(s) 30 minutes

The Course Secretary should be the first point of contact for all enquiries.

Course Secretary

Mrs Alison Fairgrieve
Tel : (0131 6)50 6427
Email : Alison.Fairgrieve@ed.ac.uk

Course Organiser

Prof Alastair Gillespie
Tel : (0131 6)50 5081
Email : t.a.gillespie@ed.ac.uk

Course Website : http://student.maths.ed.ac.uk

School Website : http://www.maths.ed.ac.uk/

College Website : http://www.scieng.ed.ac.uk/