All tutorials are in Nighingale building.
Module 
Friday 
Saturday 
Saturday 
Sunday 
Sunday 
M208 
Group theory 1  Linear algebra  Analysis 1  Group theory 2  Analysis 2 
M303 
Number Theory  Groups  Metric Spaces: Metrics Mostly on the Plane.  Rings and Fields  Metric Spaces: C[0,1] and Other Spaces. 
M337 
Introduction, exam strategies, warm up and Units A1 and A2  Units A3, A4, B1  Units B2, B3, B4  Units C1, C2, C3  Units D1, D2 Consolidation 
M343 
Epidemics  Lagrange; Genetics  Events in Time; Patterns in Space; Branching Processes  More population models; Renewal Models  Markov Chains; Queues 
M346 
Exam Q1  Exam Q2  Exam Q3  Exam Q4  Exam Q5 
M347 
General discussion and introduction to June 2017 and June 2018 Exams  Distribution theory with applications from June 2017 and June 2018 Exams  Classical inference with applications from June 2017 and June 2018 Exams  Bayesian statistics with applications from June 2017 and June 2018 Exams  Linear modelling with applications from June 2017 and June 2018 Exams 
M373 
1.1, 1.2  1.3,1.4, 1.5  2.1, 2.2, 2.3  2.4, 3.1, 3.2  3.3, 3.4 
M820

Overview of the module; EulerLagrange equation and first integral 
Gateaux differential and global extrema; Application of the Calculus of Variations 
Change of dependent and independent variables; Parametrised functionals 
Noether’s theorem and the Jacobi equation  Constrained functionals; SturmLiouville theory and the RayleighRitz method 
M821 
Foundations and Hamiltonian systems  Bendixson’s criterion, Poincare index, averaging  Fourier series, perturbation, Lindstedt’s method, multiple scales  Harmonic balance, slowly varying amplitudes, Floquet theory  Stability, PoincareBendixson’s theorem 
M823 
Scene setting: Exam preparation, basic techniques; Chapter 1  Chapters 2 and 3  Chapters 4 and 5  Chapters 6 and 7  Chapter 9, exam technique and short accounts 
M829

Dirichlet characters and Gauss sums (Chapters 8 and 9)  Primitive roots (Chapter 10)  Dirichlet series and Euler products (Chapter 11)  Riemann zeta function (Chapters 12 and 13)  Partitions (Chapter 14) 
M832 
Introduction; Annotating Powell; Q1 Lagrange ch 4; Q2 Newton ch 5  Q3 Bernstein ch 6; Q4 minimax ch 7; Q4 exchange ch 8  Q5 orthogonality ch 11,12; Q6 Fourier ch 13  Q6 FFT ch 13; Q7 splines ch 18,19  Q8 Peano ch 22; any other topics; M840 Advances in Approximation Theory 
M836 
Linear and Hamming codes  Cyclic codes, MOLS, and codes from block designs  Perfect codes, bounds and practical aspects  Cryptography  Miscellaneous 
MS327 
Introduction to MS327, Units 1,2  Deterministic I, Units 5,6  Deterministic II, Units 3,7,8  Diffusion & Random processes I, Units 4, 9, 10  Diffusion & Random processes II, Units 11,12 
MST124

Intro and Units 1 and 2  Units 3, 4 and 6  Units 7 and 8  Units 5, 9 and 10  Unit 12, Exam Technique and any other questions 
MST125 
Block A  Block B  Block C  Block D  Strategy especially long questions 
MST210 
Differential Equations 19:30 Introduction; 19:40 Exam Techniques; 19:50 First Order (unit 1); 20:35 Second Order (Unit 1) 
Mechanics 1 (units 2, 3, 9, 10)  Methods 1 (units 4, 5, 6, 7, 12, 13)  Mechanics 2 (units 11, 19, 20, 21)  Methods 2 (units 14, 15, 16, 17) 
MST224 
Book 1  Books 1 and 2  Book 3  Book 4  Practice exam 
MST326 
Differential equations  Problems in Fluid Mechanics 1  Problems in Fluid Mechanics 2  Fourier series and more differential equations  Water waves, boundary layers and turbulence 
MT365  Graphs part 1  Networks part 1/ Design part 1  Design part 1/ Graphs part 2  Graphs part 2/ Networks part 2  Design part 2 