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- ...udy of [[number theory]] extends many of the topics of introductory number theory, but infuses [[mathematical problem solving]] as well as [[algebra]]: ...ving.com/school/course/intermediate-numbertheory AoPS Intermediate Number Theory]1,015 bytes (104 words) - 16:21, 1 September 2024
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- ...th-bowl style round, and team is a team round. This test is taken over the course of a day ...school. This competition has five rounds, mystery (misc), geometry, number theory, arithmetic, algebra, and team. Each scoring competitor competes in three i5 KB (733 words) - 10:59, 8 June 2024
- ...ofproblemsolving.com/store/item/intro-number-theory Introduction to Number Theory] * [https://artofproblemsolving.com/store/item/intermediate-algebra Intermediate Algebra]5 KB (658 words) - 09:03, 3 November 2024
- AMC 8/10/12 Course: https://math.llmlab.io/courses AMC 8 Fundamentals Course: https://www.omegalearn.org/amc8-fundamentals16 KB (2,192 words) - 22:06, 19 July 2024
- * Intermediate is recommended for students who can expect to pass the AMC 10/12. ...hool. It covers the basics of algebra, geometry, combinatorics, and number theory, along with sets of accompanying practice problems at the end of every sect24 KB (3,198 words) - 19:44, 4 December 2024
- * Intermediate is recommended for students grades 9 to 12. ...hool. It covers the basics of algebra, geometry, combinatorics, and number theory, along with sets of accompanying practice problems at the end of every sect7 KB (901 words) - 13:11, 6 January 2022
- === Chaos Theory === ...n.com/Dreams-Final-Theory-Steven-Weinberg/dp/0679419233/ Dreams of a Final Theory] by Weinberg10 KB (1,410 words) - 12:07, 20 February 2024
- ...guably a branch of [[elementary algebra]], and relate slightly to [[number theory]]. They deal with [[relations]] of [[variable]]s denoted by four signs: <ma For two [[number]]s <math>a</math> and <math>b</math>:12 KB (1,806 words) - 05:07, 19 June 2024
- ...5 points, to give a total score out of 150 points. From 2002 to 2006, the number of points for an unanswered question was 2.5 points and before 2002 it was ...g]] with [[arithmetic]], [[algebra]], [[counting]], [[geometry]], [[number theory]], and [[probability]] and other secondary school math topics. Problems ar4 KB (529 words) - 08:01, 24 July 2024
- ...g]] with [[arithmetic]], [[algebra]], [[counting]], [[geometry]], [[number theory]], and [[probability]] and other secondary school math topics. Problems us [[Category:Intermediate mathematics competitions]]8 KB (1,067 words) - 19:15, 24 October 2024
- ...er entire areas of mathematics such as [[algebra]], [[geometry]], [[number theory]], [[counting]], and [[probability]]. .../Prealgebra 1 | Prealgebra 1]] — [https://artofproblemsolving.com/school/course/catalog/prealgebra1 Details] ([https://artofproblemsolving.com/store/item/p8 KB (965 words) - 02:41, 17 September 2020
- ...re than algebra problems, sometimes going into other topics such as number theory. *Two different [[prime number]]s between <math>4</math> and <math>18</math> are chosen. When their sum is4 KB (682 words) - 12:13, 8 December 2024
- '''Number theory''' is the field of [[mathematics]] associated with studying the properties Number theory is a broad topic, and may cover many diverse subtopics, such as:3 KB (399 words) - 22:08, 8 January 2024
- An Olympiad level study of [[number theory]] involves familiarity with intermediate topics to a high level, a few new topics, and a highly developed [[proof wr * [[Number theory/Introduction | Introductory number theory]]734 bytes (79 words) - 17:27, 25 April 2008
- ...udy of [[number theory]] extends many of the topics of introductory number theory, but infuses [[mathematical problem solving]] as well as [[algebra]]: ...ving.com/school/course/intermediate-numbertheory AoPS Intermediate Number Theory]1,015 bytes (104 words) - 16:21, 1 September 2024
- ...ers]]. Since modular arithmetic is such a broadly useful tool in [[number theory]], we divide its explanations into several levels: * [[Intermediate modular arithmetic]]992 bytes (121 words) - 19:38, 19 July 2006
- '''Fermat's Little Theorem''' is highly useful in [[number theory]] for simplifying the computation of exponents in [[modular arithmetic]] (w If <math>{a}</math> is an [[integer]], <math>{p}</math> is a [[prime number]] and <math>{a}</math> is not [[divisibility|divisible]] by <math>{p}</math16 KB (2,660 words) - 22:42, 28 August 2024
- ...a in general deals with general classes of structure. Furthermore, number theory interacts more specifically with ...ematics (e.g., [[analysis]]) than does algebra in general. Indeed, number theory3 KB (369 words) - 20:18, 18 June 2021
- ...ed equal to <math>\frac{n(n+1)}{2}</math> (the <math>n</math>th triangular number is defined as <math>1+2+\cdots +n</math>; imagine an [[equilateral polygon ...e useful in almost any branch of mathematics. Often, problems in [[number theory]] and [[combinatorics]] are especially susceptible to induction solutions,5 KB (768 words) - 23:59, 28 September 2024
- ...impler one. And we can do this reduction again and again until the smaller number becomes <math>0</math>. ===Intermediate===6 KB (923 words) - 16:39, 30 September 2024
- Consider the task of counting the number of integers between 14 and 103 inclusive. We could simply list those [[int ...h <math>n</math> and end with <math>m</math> (i.e. m and n inclusive), the number of integers in the list is2 KB (289 words) - 16:17, 13 February 2009