Undergraduate Programme and Module Handbook 2006-2007 (archived)

Module FOUN0257: MATHEMATICAL APPLICATIONS 1

Department: FOUNDATION YEAR [Queen's Campus, Stockton]

FOUN0257: MATHEMATICAL APPLICATIONS 1

Type	Open	Level	0	Credits	10	Availability	Available in 2006/07	Module Cap	None.	Location	Queen's Campus Stockton

Prerequisites

None.

Corequisites

None.

Excluded Combination of Modules

None.

Aims

To extend and develop knowledge of the six trigonometrical functions and inverses.
to introduce and develop understanding of a range of trigonometric identities and their uses.
to extend knowledge of Cartesian coordinates in two and three dimensions to include equations of circles, lines and planes.
to introduce the concept of polar coordinates.
to extend and develop knowledge of complex numbers.
to develop a knowledge of vectors and their applications in two and three dimensions to include equations of lines and planes

Content

Radian measure.
trigonometrical functions of angles, real numbers and graphs.
inverse functions and calculation of sine cosine and tangent.
use of trigonometric identities.
trigonometric equations.
Cartesian equations in two and three dimensions of straight lines, perpendicular lines, circles and planes.
polar coordinates.
complex numbers: +, -, x, /, complex conjugate, polar form, Argand diagrams, De Moivre's theorem.
vectors in two and three dimensions including: use of column and unit vectors, addition, subtraction and multiplication by scalar.
Scalar (dot) and vector (cross) product and their applications.
vector equations of lines and planes and conversion to Cartesian form.

Learning Outcomes

Subject-specific Knowledge:

Subject-specific Skills:

By the end of the module the student will have acquired the skills to be able to:
select and use trigonometric identities and techniques as required in problems appropriate to the syllabus.
confidently manipulate a range of Cartesian and vector equations in two and three dimensions.
plot a graph using polar coordinates.
understand and use complex numbers in a range of situations as appropriate to the syllabus.

Key Skills:

By the end of the module the student will:
be able to communicate effectively in writing
be able to apply number in the tackling of numerical problems
have improved their own learning and performance
be able to demonstrate problem solving skills

Modes of Teaching, Learning and Assessment and how these contribute to the learning outcomes of the module

Theory, initial concepts and techniques will be introduced during lectures.
Much of the learning, understanding and consolidation will take place through the use of structured worksheets during tutorials and students' own time.
Ability to recall, select and use knowledge will be tested by: a coursework portfolio containing students solutions to questions or tasks set by the tutor on a weekly basis, mid-module invigilated test and an end of module invigilated test.

Teaching Methods and Learning Hours

Activity	Number	Frequency	Duration	Total/Hours
Lectures	10	Weekly	1 hour	10
Tutorials	20	Weekly	2 hours	20
Prep ass				33
Prep contact hours				37
Total				100

Summative Assessment

Component: Test 1		Component Weighting: 40%
Element	Length / duration	Element Weighting	Resit Opportunity
Test 1		100%
Component: End of Module Test		Component Weighting: 50%
Element	Length / duration	Element Weighting	Resit Opportunity
End of Module Test		100%
Component: Portfolio of assessed work		Component Weighting: 10%
Element	Length / duration	Element Weighting	Resit Opportunity
Portfolio of assessed work		100%

Formative Assessment:

Weekly self-testing units

■ Attendance at all activities marked with this symbol will be monitored. Students who fail to attend these activities, or to complete the summative or formative assessment specified above, will be subject to the procedures defined in the University's General Regulation V, and may be required to leave the University