Difference between revisions of "Number theory"
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− | * [ | + | * [https://www.math.muni.cz/~bulik/vyuka/pen-20070711.pdf ''Problems in Elementary Number Theory'' by Hojoo Lee] |
* [http://artofproblemsolving.com/articles/files/SatoNT.pdf Number Theory by Naoki Sato] | * [http://artofproblemsolving.com/articles/files/SatoNT.pdf Number Theory by Naoki Sato] | ||
Revision as of 16:08, 19 February 2018
Number theory is the field of mathematics associated with studying the properties and identities of real numbers.
Contents
Overview
Number theory is a broad topic, and may cover many diverse subtopics, such as:
Some branches of number theory may only deal with a certain subset of the real numbers, such as integers, positive numbers, natural numbers, rational numbers, etc. Some algebraic topics such as Diophantine equations as well as some theorems concerning integer manipulation (like the Chicken McNugget Theorem ) are sometimes considered number theory.
Student Guides to Number Theory
- Introductory topics in number theory
- Covers different kinds of integers such as prime numbers, composite numbers, and their relationships (multiples, divisors, and more). Also includes base numbers and modular arithmetic.
- Intermediate topics in number theory
- Olympiad topics in number theory
- Advanced topics in number theory
Resources
Books
- Introductory
- the Art of Problem Solving Introduction to Number Theory by Mathew Crawford (details)
- Elementary Number Theory: A Problem Oriented Approach by Joe Roberts (details) Out of print but if you can find it in a library or used, you might love it and learn a lot. Writen caligraphically by the author.
- General Interest
E-Book
Miscellaneous
- Intermediate
Other Topics of Interest
These are other topics that aren't particularly important for competitions and problem solving, but are good to know.