Introduction to Pure Mathematics (G5087)
15 credits, Level 4
In this module, the topics you will cover will include:
- numbers; introduction of mathematical symbols, natural numbers, integers, rationals, real numbers, basic number algebra
- ordering, inequalities, absolute value (modulus), homogeneity, triangle inequality
- concept of algebraic structure, groups
- sequences, induction principle, well-ordering principle, sums, products, factorials, Fibonacci numbers, fractions
- irrational roots of integers, divisibility, prime numbers, Euclidean Division, highest common factor, Euclidean algorithm, number theory, atomic property of primes, coprime factorisation, fundamental theorem of arithmetic, square-free numbers
- logic; concept of proof, logical argument, direct proof, propositional manipulation, basic logic, and, or, not, implication, contraposition, contradiction, logical equivalence, quantifiers
- operations with sets; equality, intersection, difference, union, empty set, ordered pairs, cartesian products, power set
- counting; maps and functions, distinguished functions, injections, surjections, bijections, one-to-one correspondences, pigeonhole principle, counting the power set, counting subsets of the power set, cherry picking, binomial coefficients, binomial formula, combinatorics, inclusion-exclusion formula, permutations, counting maps
- functions and maps; formal definition, finite and infinite sets, pigeonhole principle revisited, counterimage, inverse functions, partial inverses
- relations; relations, equivalence relations, modular arithmetic and quotient sets, order relations, partial ordering, total ordering, linear ordering
- rigorous extension of N to Z and Q
- rings, fields.
21%: Practical (Workshop)
20%: Coursework (Problem Set, Test)
80%: Examination (Unseen examination)
Contact hours and workload
We’re currently reviewing contact hours for modules and will update with further information as soon as it is available.
This module is running in the academic year 2019/20. We also plan to offer it in future academic years. It may become unavailable due to staff availability, student demand or updates to our curriculum. We’ll make sure to let our applicants know of such changes to modules at the earliest opportunity.
This module is offered on the following courses: