Course image FYP THESIS SOURCE FILES
2020 - 2021

Dear students,


This Moodle is only to gather the source files of your FYP thesis. Please submit the zip file containing all source files to this Media.

Course image BSC123 Calculus II (Group 2) 2021/04 Chi Xiong
2020 - 2021
This course introduces students to infinite series, multivariable calculus and vector calculus including infinite series and convergence test, Taylor series and approximation, parametric equations and polar coordinates, geometry of space, vector functions, partial derivatives, application of partial derivatives, maxima and minima, multiple integrals, iterated integrals, applications of multiple integrals, line and surface integrals, Green’s Theorem, Gauss’s Divergence Theorem and Stokes’s Theorem, Fourier series.


Course image MAT209 Combinatorics 2021/04
2020 - 2021

This course is an advanced course in discrete mathematics. It introduces students to advanced techniques in combinatorics. The course consist of two parts: graph theory and combinatorics. Topics in graph theory include planar graphs, Euler cycles, Hamilton circuits, graph coloring, trees, spanning trees, traveling salesperson problem, tree analysis of sorting algorithm, network algorithms (shortest paths, minimum spanning trees, ...). Topics in Combinatorics include counting principles, generating functions, partitions, recurrence relations, divide-and-conquer relations, inclusion-exclusion formula, Polya’s enumeration formula.

Course image MAT106 Discrete Mathematics 2021/04
2020 - 2021

This course introduces methods of discrete mathematics to students. Topics covered include: logic, arguments, algorithms, well-ordering principle, recursion, counting techniques, pigeonhole principle, permutations and combinations, divide-and-conquer algorithms, generating functions, inclusion-exclusion, equivalence relation, partial orderings

Course image MAT105 Linear Algebra II 2021/04
2020 - 2021

The main platform for this course is Microsoft Teams. Classes would be conducted live on Teams when classes are in online mode. This moodle platform is for students to submit their homework, quizzes, project and exams. 

Students registered for this course would be enrolled into the MS Teams and Moodle platform by the lecturer. If you are not enrolled, kindly please contact the lecturer via Teams' chat. 


Course image MAT104 Linear Algebra I 2021/04
2020 - 2021

The main platform for this course is Microsoft Teams. Classes would be conducted live on Teams when classes are in online mode. This moodle platform is for students to submit their homework, quizzes and exams. 

Students registered for this course would be enrolled into the MS Teams and Moodle platform by the lecturer. If you are not enrolled, kindly please contact the lecturer via Teams' chat. 


Course image MAT318 Financial Mathematics 3 2021/04
2020 - 2021

This course introduces students to the advanced mathematical theory of financial economics. Topics covered include: binomial option pricing model, Black-Scholes formula, Black-Scholes-Merton formula, market making, delta-hedging, exotic options, lognormal distribution, Monte-Carlo valuations, Brownian motion and Itô’s lemma, volatility.

Course image MAT103 Calculus II - 2021/04 Copy 2
2020 - 2021

Infinite series and convergence test, Taylor series and approximation, vector functions, partial derivatives, application of partial derivatives, maxima and minima, multiple integrals, iterated integrals, applications of multiple integrals, line and surface integrals, Green’s Theorem, Gauss’s Divergence Theorem and Stokes’s Theorem, Fourier series, Fourier transforms.

Course image BSC125 Probability and Statistics A - 2021/04
2020 - 2021

This course covers various topics on probability and statistics, including conditional probability, random variables and distributions, expectation, typical distributions, stochastic processes, estimation, testing hypotheses, categorical data and nonparametric methods, and linear statistical models.


Course image MAT103 Calculus II - 2021/04
2020 - 2021

Infinite series and convergence test, Taylor series and approximation, vector functions, partial derivatives, application of partial derivatives, maxima and minima, multiple integrals, iterated integrals, applications of multiple integrals, line and surface integrals, Green’s Theorem, Gauss’s Divergence Theorem and Stokes’s Theorem, Fourier series, Fourier transforms.

Course image G0212 Introduction to Advanced Mathematics II (2021/02)
2020 - 2021

This course introduces students to multivariable calculus. Topics covered include three-dimensional geometry, conics, quadric surfaces, polar coordinates, cylindrical coordinates, spherical coordinates, partial derivatives, gradient, maximum and minimum, double integrals, triple integrals, divergence, curl, line integrals, surface integrals, Green’s Theorem, Gauss’s Divergence Theorem, Stokes’s Theorem.

Course image G0111 Elementary Number Theory 2021/02 (A. Bazdar)
2020 - 2021

This is the moodle platform for G0111 Elementary Number Theory for 2021/02 semester.

It is for both Group 1 and Group 2. 

The classes are conducted live on Teams. Students that cannot join live classes cannot take this course.

 

Course image COM210 Engineering Mathematics III 2020/09 Xiong Chi
2020 - 2021

This course introduces students to infinite series, multivariable calculus and vector calculus. Topics covered include: Infinite series and convergence test, Taylor series and approximation, vector functions, partial derivatives, application of partial derivatives, maxima and minima, multiple integrals, iterated integrals, applications of multiple integrals, line and surface integrals, Green’s Theorem, Gauss’s Divergence Theorem and Stokes’s Theorem.

Credit value: 4

Lecturer: Xiong Chi

Tuesday 9-12am, Thursday group 2: 10-11am, group 1: 11-12am

Course image BSC123 Calculus II 2020/09 Xiong Chi
2020 - 2021

This course introduces students to infinite series, multivariable calculus and vector calculus. Topics covered include: Infinite series and convergence test, Taylor series and approximation, parametric equations and polar coordinates, geometry of space, vector functions, partial derivatives, application of partial derivatives, maxima and minima, multiple integrals, iterated integrals, applications of multiple integrals, line and surface integrals, Green’s Theorem, Gauss’s Divergence Theorem and Stokes’s Theorem, Fourier series.

Lecturer: Xiong Chi

Credit value: 5

Monday 8-11am, Wednesday 9-11am. 

Venue: A1#G06