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

Core second year course for Honours Degrees in Mathematics and/or Statistics.

Syllabus summary: Functions from Rm to Rn, partial derivatives, chain rule. Curves, velocity, tangent lines. Integration over domains in R2 and R3. Standard curvilinear coordinate systems. Green's Theorem in the plane. Integration over curves and surfaces. Taylor series, stationary points.

? Pre-requisites : Passes at C-grade or better in MAT-1-PCa, MAT-1-SEq, MAT-1-GCo, MAT-1-GTh, or permission of the Head of the School of Mathematics

? Prohibited combinations : MAT-2-mm3, MAT-2-mc3, MAT-2-mc4, MAT-2-me3, MAT-2-me4

Home subject area

Specialist Mathematics & Statistics (Year 2), (School of Mathematics, Schedule P)

? Normal year taken : 2nd year

? Delivery Period : Semester 1 (Blocks 1-2)

? Contact Teaching Time : 2 hour(s) 30 minutes per week for 11 weeks

First Class Information

Date Start End Room Area Additional Information 20/09/2006 12:10 13:00 Lecture Theatre 1, Ashworth Labs KB

All of the following classes

Type Day Start End Area Lecture Monday 12:10 13:00 KB Lecture Wednesday 12:10 13:00 KB

? Additional Class Information : Tutorials: Th at 1110 and 1210.

1. Using Maple to plot surfaces, using both cartesian and polar co-ordinate presentations. Interpret Maple output. Sketch some surfaces by hand.
2. Sketching level curves by hand.
3. Calculating first and second order partial derivatives from formulae, and from first principles.
4. Calculating the gradient function, and the derivative map.
5. Using the chain rule to calculate partial derivatives of composite functions, in both scalar and matrix forms.
6. Calculating the Taylor approximation of a function, up to the quadratic terms.
7. Identifying local extrema and critical points. Use the Hessian matrix to investigate the form of a surface at a critical point. Identify when the Hessian is positive definite, in two and three dimensions, using the subdeterminant criterion.
8. Using the Lagrange multiplier method to find local extrema of functions, under one constraint only.
9. Calculating easy double integrals. Change the order of integration in double integrals, for easy regions.
10. Calculating arc-length and surface areas for easy functions. Use Green's Theorem in the plane.

Coursework (which may include a Project): 15%; Degree Examination: 85%.

Exam times

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

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

Course Secretary

Ms Rachel Henderson
Tel : (0131 6)50 6427
Email : R.Henderson@ed.ac.uk

Course Organiser

Prof Alexander Davie
Tel : (0131 6)50 5082
Email : A.Davie@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/