Difference between revisions of "Number theory"
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** Covers different kinds of integers such as [[prime number]]s, [[composite number]]s, and their relationships ([[multiples]], [[divisors]], and more). Also includes [[base number]]s and [[modular arithmetic]]. | ** Covers different kinds of integers such as [[prime number]]s, [[composite number]]s, and their relationships ([[multiples]], [[divisors]], and more). Also includes [[base number]]s and [[modular arithmetic]]. | ||
* '''[[Number theory/Intermediate | Intermediate topics in number theory]]''' | * '''[[Number theory/Intermediate | Intermediate topics in number theory]]''' | ||
− | * '''[[Number theory/Olympiad | Olympiad | + | * '''[[Number theory/Olympiad | Olympiad topics in number theory]]''' |
* '''[[Number theory/Advanced topics | Advanced topics in number theory]]''' | * '''[[Number theory/Advanced topics | Advanced topics in number theory]]''' | ||
Revision as of 16:00, 4 August 2006
Number theory is the field of mathematics associated with studying the integers.
Contents
[hide]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)
- General Interest
Miscellaneous
- Intermediate
- Olympiad
Other Topics of Interest
These are other topics that aren't particularly important for competitions and problem solving, but are good to know.