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MPhys Physics with Astrophysics / Course details

Year of entry: 2021

Course unit details:Mathematics 1

Unit code PHYS10071 10 Level 1 Semester 1 Department of Physics & Astronomy No

Mathematics 1

Aims

To allow students to develop their mathematical competence with functions, calculus, complex numbers, power series, linear algebra and differential equations to a level where they can cope with the demands of the first year of the physics course and beyond.

Learning outcomes

This course unit detail provides the framework for delivery in 20/21 and may be subject to change due to any additional Covid-19 impact.  Please see Blackboard / course unit related emails for any further updates.

On completion successful students will be able to:

1. describe the properties of different types of functions and be able to sketch them in both 2D cartesian and polar cordinates
2. integrate and differentiate functions of one variable using a range of techniques and be able to apply integration and differentiation to a range of physical problems.
3. show how smooth functions can be expressed in terms of power series.
4. explain the properities of complex numbers and construct some basic complex functions.
5. employ matrix notation, carry out matrix algebra and use matrices to solve systems of linear equations.
6. compute the properities of determinants, be able to evaluate them, and use them to test for unique solutions of linear equations.
7. solve first and second order ordinary differential equations using a range of techniques.

Syllabus

1.  Functions and 2D coordinates

Properties of functions. 2D and 3D coordinate systems. Index notation, Sketching functions, logarithmic functions.

(2 lectures)

2.  Complex numbers

Definition, modulus and argument; addition, multiplication, division; roots of quadratic equations; complex numbers in polar form; De Moivre's theorem; Hyperbolic functions.

(2 lectures)

3.  Differential Calculus

Review of differentiation, the differential; differentiation of products, functions of functions; maxima, minima and inflexions; partial differentiation; examples and applications from physics.

(3 lectures)

4.  Power Series

Series, limits of series; binomial expansion; Taylor's and Maclaurin's series expansions.

(2 lectures)

5.  Integral Calculus

Review of integration; integration by parts, substitution, standard integrals, partial fractions and completing the square; simple line integrals; physical applications.

(4 lectures)

6.  Linear Algebra

Matrix algebra, inverse matrix. Definition and properties of determinants, scalar triple product, test of unique solution to linear equations. Eigenvalues and eigenvectors, eigenanalysis.

(5 lectures)

7.  Ordinary Differential Equations

Physical motivation. 1st order separable. 1st order homogeneous. 1st order linear: integrating factors. 2nd order with constant coefficients. Physical applications.

(4 lectures)

Assessment methods

Method Weight
Other 10%
Written exam 80%
Oral assessment/presentation 10%

Feedback methods

Feedback will be offered by tutors on students’ written solutions to weekly examples sheets, and model answers will be issued.

Recommended texts:

Jordan, D. & Smith, P. Mathematical Techniques (OUP)

Tinker, M. & Lambourne, R. Further Mathematics for the Physical Sciences (Wiley)

Supplementary texts:

Lambourne, R. & Tinker, M. Basic Mathematics for the Physics Sciences (Wiley)

Study hours

Scheduled activity hours
Assessment written exam 1.5
Lectures 22
Practical classes & workshops 11
Tutorials 6
Independent study hours
Independent study 59.5

Teaching staff

Staff member Role
Roger Jones Unit coordinator
Justin Evans Unit coordinator