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MODULE SPECIFICATION – UNDERGRADUATE PROGRAMMES
KEY FACTS
Module name Calculus and Linear Algebra (Maths 2)
Module code AS2051
School Cass Business School
Department or equivalent UG Programme
UK credits 20
ECTS 10.0
Level 5
Delivery location
(partnership programmes
only)
MODULE SUMMARY
Module outline and aims
To provide additional mathematical tools required for core statistical and actuarial
modules
[Calculus] To set up a framework for treating functions of several real variables and
consider further methods for solving ordinary differential equations.
[Linear Algebra] To introduce the elementary features of linear algebra.
Content outline
Functions of several variables: Differentiation: definition of partial derivative for function
of several variables, chain rules, differential, transformation of partial derivatives.
Method of Lagrange multipliers. Integration: standard coordinate systems in R2 and R3,
integration in R2 and R3, iterated integrals, change of variables, Jacobians.
Differential Equations: Ordinary differential equations: linear; constant coefficient order
greater than two; variable coefficient, one solution of the complementary function known,
variation of parameters, introduction to solution in series.
Laplace Transforms: Introduction to Laplace Transforms; inversion by partial fractions;
application to solution of ordinary differential equations.
Linear Algebra Vector spaces, linear combinations and subspaces, spanning sets, linear
independence and bases, dimension. Linear transformations, isomorphisms, matrix
representation, change of basis and similar matrices. Eigenvalues and eigenvectors of
matrices, diagonalisation of symmetric matrices. The Cayley-Hamilton Theorem. Inner
products, orthonormal bases, the Gram-Schmidt process, orthogonal transformations.
WHAT WILL I BE EXPECTED TO ACHIEVE?
On successful completion of this module, you will be expected to be able to:
Knowledge and understanding:
- Demonstrate an understanding of the calculus of several variables and associated
applications.
- Demonstrate an understanding of vector spaces and linear transformations
Skills:
- Improve manipulative skills in the application of calculus
- Use tolls for thinking logically
- Solve relevant linear ODEs
- Apply methods of linear algebra
Values and attitudes:
- Understand the importance of formal proofs and abstract definitions in the formulation
and solution of mathematical problems.
HOW WILL I LEARN?
Lectures and tutorials.
Teaching pattern:
Teaching Teaching Contact Self- Placement Total
component type hours directed hours student
study learning
hours hours
Linear Lecture 20 70 0 90
Algebra
lectures
Tutorial Tutorial 10 10 0 20
Calculus Lecture 20 70 0 90
lectures
TOTALS: 50 150 0 200
WHAT TYPES OF ASSESSMENT AND FEEDBACK CAN I EXPECT?
Assessments
Coursework and exam.
Assessment pattern:
Assessment Assessment Weighting Minimum Pass/Fail?
component type qualifying
mark
Calculus Written 5 40 N/A
coursework 1 assignment,
including
essay
Calculus Written 5 40 N/A
coursework 2 assignment,
including
essay
Examination (3 Written 80 40 N/A
hours) Exam
Linear Algebra Written 5 40 N/A
coursework 1 assignment,
including
essay
Linear Algebra Written 5 40 N/A
coursework 2 assignment,
including
essay
Assessment criteria
Assessment Criteria are descriptions of the skills, knowledge or attributes students need
to demonstrate in order to complete an assessment successfully and Grade-Related
Criteria are descriptions of the skills, knowledge or attributes students need to
demonstrate to achieve a certain grade or mark in an assessment. Assessment Criteria
and Grade-Related Criteria for module assessments will be made available to students
prior to an assessment taking place. More information will be available from the module
leader.
Feedback on assessment
Following an assessment, students will be given their marks and feedback in line with
the Assessment Regulations and Policy. More information on the timing and type of
feedback that will be provided for each assessment will be available from the module
leader.
Assessment Regulations
The Pass mark for the module is 40%. Any minimum qualifying marks for specific
assessments are listed in the table above. The weighting of the different components
can also be found above. The Programme Specification contains information on what
happens if you fail an assessment component or the module.
INDICATIVE READING LIST
Calculus, T.M. Apostol (Blaisdell, 1957).
Salas and Hille's Calculus: One and Several Variables, (Wiley, 1995).
Advanced Engineering Mathematics, E Kreyszig (Wiley, 1988).
3000 Solved Problems in Linear Algebra, S. Lipschutz (McGraw-Hill, 1989) Schaum
series.
Schaum's Outline of Theory and Problems of Linear Algebra, S. Lipschutz (McGraw Hill,
1991).
Linear Algebra done right, S. Axler (Springer, 1997).
Algebra, P M Cohn (vol 1, Wiley, 1974).
A Survey of Modern Algebra, S MacLane and G Birkhoff (Collier-MacMillan, 1965).
Mathematical Methods for Physics and Engineers by K. F. Riley, M. P. Hobson & S. J.
Bence.
Student Solution Manual for Mathematical Methods for Physics and Engineers by K. F.
Riley, M. P. Hobson & S. J. Bence.
Version: 2.0
Version date: July 2013
For use from: 2013-14
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