Module Information
Course Delivery
Delivery Type | Delivery length / details |
---|---|
Lecture | 22 x 1 Hour Lectures |
Tutorial | 4 x 1 Hour Tutorials |
Assessment
Assessment Type | Assessment length / details | Proportion |
---|---|---|
Semester Assessment | Continuous assessment component is made up from a combination of attendance at lectures (6%), attendance at tutorials (6%) and marks gained from assessed assignments (8%). | 20% |
Semester Exam | 2 Hours (written examination) | 80% |
Supplementary Exam | 2 Hours (written examination) | 100% |
Learning Outcomes
On successful completion of this module students should be able to:
1. solve systems of linear equations,
2. manipulate matrices according to the laws of matrix algebra,
3. evaluate determinants of square matrices,
4. determine partial derivatives of functions of several variables and establish identities involving them,
5. obtain the critical points of functions of several variables,
6. evaluate multiple integrals in rectangular coordinates,
7. evaluate multiple integrals using change of variables.
Brief description
The aim of this module is to study situations in which functions of several variables arise naturally in Mathematics. Linear functions lead to techniques for the solution of linear equations and elementary matrix theory. Non-linear functions lead to a study of partial derivatives and multiple integrals.
Aims
To establish a clear understanding of the techniques for studying functions of several variables and a facility for recognising when these techniques may be profitably employed.
Content
2. LINEAR EQUATIONS: Systems of linear equations. Coefficient matrix, augmented matrix. Elementary row operations. Gaussian and Gauss-Jordan elimination.
3. DETERMINANTS: Properties of determinants. Computation of determinants.
4. PARTIAL DERIVATIVES: Functions of several variables. Partial Derivatives. Differentiability and linearisation. The chain rule. Critical points. Change of variables - the Jacobian.
5. MULTIPLE INTEGRALS: Riemann sums and definite integrals. Double integrals in rectangular coordinates; areas. Substitution in multiple integrals.
Notes
This module is at CQFW Level 4