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This course is available through clearing
MChem Chemistry with International Study / Course details
Year of entry: 2021
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Course unit details:
|Unit level||Level 1|
|Teaching period(s)||Semester 2|
|Offered by||Department of Mathematics|
|Available as a free choice unit?||No|
The course unit aims to provide a second semester course in calculus and algebra to students in school of Electrical and Electronic Engineering and the school of Chemistry.
On completion of this unit successful students will be able to:
1- compute the mean and root mean square (rms) values of a given signal on a given interval.
2- compute the area under a curve given in Cartesian or Polar coordinates, compute the length of a curve described in Cartesian or polar cordinates either explicitly or parametrically, compute the surface area and volume of bodies of revolution described in Cartesian cordinates.
3- calculate the limit of a sequence and evaluate partial sums of arithmetic and geometric sequences.
4- write down the series and (generalised) power series associated to a given sequence, determine if a geometric series is divergent or convergent.
5- calculate the Taylor Polynomial of a given order and the Taylor Series of a given function of one or two variables around a given point as well as state and use Taylor's theorem.
6- calculate partial derivatives of a given function of more than one variables and use it to compute the gradient and the directional derivative of such function, use the chain rule to pass from one coordinate system to another, calculate the total differential of such functions and apply it to error prediction.
7- compute scalar or vectorial line integrals in 2 or 3 dimensions, compute plane surface integrals of a given function of two cartesian coordinates over domains of type I or II.
8- determine the location and the type (minimum, maximum, saddle) of the stationary points of a given function of two variables
9- determine the order of a given ODE, solve constant coefficient first or second order linear ODEs, write the general solution in terms of the homogeneous solution and a particular integral when the non-homogeneous part of the ODE is of exponential, polynomial or trigonometric form (or a combination of those) and apply given conditions to determine the particular solution. For cases when the coefficients are not constant apply appropriate techniques e.g. integrating factor for first order ODEs.
10- determine physical behaviour of solutions of ODEs arising from a RLC circuit or anothe modelled situation, e.g. time constant,large time behaviour and resonance frequency.
Coursework 1 (week 4) Weighting within unit 5%. Computerised exercise.
Coursework 2 (week 6-7) Weighting within unit 5%. Computerised exercise.
Coursework 3 (week 9) Weighting within unit 5%. Computerised exercise.
Coursework 4 (week 11-12) Weighting within unit 5%. Computerised exercise.
Semester 2 examination Weighting within unit 80%
KA Stroud, Engineering Mathematics, Palgrave
Croft et al., Introduction to Engineering Mathematics, Pearson
|Scheduled activity hours|
|Independent study hours|
|Raphael Assier||Unit coordinator|
|Julien Landel||Unit coordinator|
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