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DRPS : Course Catalogue : School of Physics and Astronomy : Undergraduate (School of Physics and Astronomy)

Undergraduate Course: Mathematics for Physics 1 (PHYS08035)

Course Outline
School	School of Physics and Astronomy	College	College of Science and Engineering
Course type	Standard	Availability	Available to all students
Credit level (Normal year taken)	SCQF Level 8 (Year 1 Undergraduate)	Credits	20
Home subject area	Undergraduate (School of Physics and Astronomy)	Other subject area	None
Course website	None	Taught in Gaelic?	No
Course description	This course is designed for pre-honours physics students, primarily to develop their mathematical and problem solving skills in the context of basic algebra and calculus. A key element in understanding physics is the ability to apply elementary mathematics effectively in physical applications. For this, knowledge of mathematics is not enough, one also needs familiarity and practice. The course is centred on problem solving workshops, and supported by lectures.

Entry Requirements
Pre-requisites		Co-requisites	Students MUST also take: Physics 1A: Foundations (PHYS08016)
Prohibited Combinations	Students MUST NOT also be taking Practical Calculus (MATH08001) OR Solving Equations (MATH08002) OR Mathematical Methods 1 (MATH08029) OR Mathematical Methods 1 (Foundation) (MATH08030) OR Mathematical Methods 0 (Foundation) (MATH07001) OR Applicable Mathematics 1 (MATH08027) OR Applicable Mathematics 1 (Foundation) (MATH08028) OR Applicable Mathematics 0 (Foundation) (MATH07002) OR Mathematics for Informatics 1a (MATH08046) OR Mathematics for Informatics 1b (MINF08001) OR Applicable Mathematics 1+2 (Physics) (MATH08049) OR Mathematical Methods 1+2 (Physics) (MATH08050) OR	Other requirements	None
Additional Costs	None

Information for Visiting Students
Pre-requisites	None
Displayed in Visiting Students Prospectus?	No

Course Delivery Information

Delivery period: 2010/11 Semester 1, Available to all students (SV1)						WebCT enabled: Yes		Quota: None
Location	Activity	Description	Weeks	Monday	Tuesday	Wednesday	Thursday	Friday
Central	Lecture		1-11		12:10 - 13:00
Central	Lecture		1-11					12:10 - 13:00
King's Buildings	Tutorial		1-11	14:00 - 15:50	or 09:00 - 10:50
King's Buildings	Tutorial		1-11				09:00 - 10:50 or 14:00 - 15:50
First Class	Week 1, Monday, 14:00 - 15:50, Zone: King's Buildings. Workshop - Teaching Studio 3217 JCMB
Exam Information
Exam Diet	Paper Name		Hours:Minutes	Stationery Requirements		Comments
Main Exam Diet S1 (December)	Mathematics for Physics 1		3:00	20 sides		c/w PHYS08031
Resit Exam Diet (August)			3:00	20 sides		c/w PHYS08031

Summary of Intended Learning Outcomes
On completion of this course it is intended that the student will &� Demonstrate understanding and work with basic algebra: manipulating algebraic expressions, completing squares, polynomials and factor theorem, quadratic and root equations. &� Demonstrate understanding and work with functions: inequalities, modulus functions, exponential and logarithms, curve sketching, series expansions, harmonic potentials. &� Demonstrate understanding and work with geometry and trigonometry: trigonometric functions, lines and circles, conic sections. &� Demonstrate understanding and work with complex numbers: algebra with i, argand diagram, Euler and de-Moivre, trigonometric functions revisited. &� Demonstrate understanding and work with derivatives: differentiate standard functions, differentiate composite functions, higher derivatives, applications to simple physical problems. &� Demonstrate understanding and work with integrals: standard integrals, integrating by parts, integrating by substitution.

Assessment Information
20% coursework 80% examination

Special Arrangements
None

Additional Information
Academic description	Not entered
Syllabus	1. Basic algebra: manipulating algebraic expressions, completing squares, polynomials and factor theorem, quadratic and root equations. 2. Functions: inequalities, modulus functions, exponential and logarithms, curve sketching. 3. More Functions: series expansion, harmonic oscillators. 4. Trigonometry: trigonometric functions, algebra with trigonometric functions. 5. Complex numbers: algebra with i, argand diagram, Euler and de-Moivre, trigonometric functions revisited. 6. Revision and consolidation. 7. Differentiation: differentiate standard functions, differentiate composite functions, higher derivatives, applications. 8. Integration: standard integrals, integrating by parts, integrating by substitution. 9. Differential Equations: linear first order DE, ordinary second order DE, simultaneous linear DE. 10. Vectors and Matrices: basic vector and matrix algebra, determinants etc. 11. Revision.
Transferable skills	Not entered
Reading list	Not entered
Study Abroad	Not entered
Study Pattern	Not entered
Keywords	MfP1

Contacts
Course organiser	Dr Kristel Torokoff Tel: (0131 6)50 5270 Email: kristel.torokoff@ed.ac.uk	Course secretary	Miss Jennifer Wood Tel: (0131 6)50 7218 Email: J.Wood@ed.ac.uk

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copyright 2011 The University of Edinburgh - 31 January 2011 8:13 am