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- The '''MathCounts Problem Series''' is a 12 week course designed to prepare highly motivated [[MathCounts]] ...ifferent topics so that students can spend time focusing on each area of [[problem solving]] tested at the competition.2 KB (295 words) - 05:15, 3 August 2006
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- * [[American Mathematics Competitions]] (AMC) are the largest series of national high school competitions in the United States. These exams lea * [[Mathematical problem solving]]6 KB (625 words) - 22:27, 13 January 2025
- *ten problems are projected one at a time on a screen. The time limit per problem is 3 minutes. *No team may submit more than one answer for any problem.8 KB (1,182 words) - 13:26, 3 April 2024
- ...idual articles often have sample problems and solutions for many levels of problem solvers. Many also have links to books, websites, and other resources rele CompetifyHub's Problem Sets [https://competifyhub.com/resources/ Free Competition Resources for Gr17 KB (2,329 words) - 04:01, 3 February 2025
- These '''Physics books''' are recommended by [[Art of Problem Solving]] administrators and members of the [[MathLinks|AoPS-MathLinks Comm ...urse/fma AoPS F=ma Problem-Solving Series] course for additional practice, problem-solving forums, an original practice exam, and personalized guidance from e10 KB (1,405 words) - 14:37, 13 January 2025
- ==Problem== Find the sum of the infinite series: <center><math>3+\frac{11}4+\frac 94 + \cdots + \frac{n^2+2n+3}{2^n}+\cdots1 KB (193 words) - 20:13, 18 May 2021
- ...0''' ('''AMC 10'''), along with the [[AMC 12]], are the first exams in the series of exams used to challenge bright students on the path towards choosing the ...administered by the [[American Mathematics Competitions]] (AMC). [[Art of Problem Solving]] (AoPS) is a proud sponsor of the AMC.4 KB (596 words) - 03:53, 3 February 2025
- ...2''' ('''AMC 12'''), along with the [[AMC 10]], are the first exams in the series of exams used to challenge bright students on the path towards choosing the ...administered by the [[American Mathematics Competitions]] (AMC). [[Art of Problem Solving]] (AoPS) is a proud sponsor of the AMC.5 KB (646 words) - 03:52, 3 February 2025
- ...tational Mathematics Examination''' ('''AIME''') is the second exam in the series of exams used to challenge bright students on the path toward choosing the ...ministered by the [[Mathematical Association of America]] (MAA). [[Art of Problem Solving]] (AoPS) is a proud sponsor of the AMC.5 KB (669 words) - 03:52, 3 February 2025
- The '''American Mathematics Competitions''' (AMC) consist of a series of increasingly difficult tests for students in middle school and high scho AMC tests [[mathematical problem solving]] with [[arithmetic]], [[algebra]], [[counting]], [[geometry]], [[n5 KB (696 words) - 02:47, 24 December 2019
- ...ad''' ('''USAMO'''), along with the [[USAJMO]], are the third exams in the series of exams used to challenge bright students on the path toward choosing the ...dministered by the [[Mathematical Association of America]] (MAA). [[Art of Problem Solving]] (AoPS) is a proud sponsor of the MAA.6 KB (836 words) - 03:57, 3 February 2025
- '''Valentin Vornicu''' is a former [[Art of Problem Solving]] administrator and webmaster. In 2002, he founded [[MathLinks]], Vornicu also has 9 World Series of Poker gold rings and is currently the 486th ranked poker player in the w740 bytes (108 words) - 10:22, 27 September 2024
- ...[[MAML]] (Maine Association of Math Leagues) Meets. Training includes the problem set "Pete's Fabulous 42." ...students in close areas may be welcome as well. The selection process is a series of individual tests, and other experience is taken into consideration if ne22 KB (3,532 words) - 10:25, 27 September 2024
- ...thlete]] [[Tom Clymer]], '''National Assessment & Testing''' administers a series of varied [[mathematics competitions]] to middle and high school students i ...com/Forum/index.php?f=209 National Assessment & Testing Forum] at [[Art of Problem Solving]]457 bytes (56 words) - 10:23, 10 July 2006
- ...heavily on developing deep understanding of the methods of [[mathematical problem solving]]. [https://artofproblemsolving.com/school/handbook/prospective/ab * [[Math Jams]] are free classes that include information sessions, problem solving lessons, and competition solution discussion immediately after majo8 KB (965 words) - 02:41, 17 September 2020
- ...oblem solving]] involves using all the tools at one's disposal to attack a problem in a new way. ...ng example of this kind of thinking is the calculation of the sum of the [[series]] <math>\frac11 + \frac14 + \frac19 + \cdots + \frac{1}{n^2} + \cdots</math2 KB (314 words) - 05:45, 1 May 2014
- ...power of <math>p</math> in the prime factorization of <math>n!</math>. The series is formally infinite, but the terms converge to <math>0</math> rapidly, as ([[2007 iTest Problems/Problem 6|Source]])10 KB (809 words) - 15:40, 17 March 2024
- ...uited to studying large-scale properties of prime numbers. The most famous problem in analytic number theory is the [[Riemann Hypothesis]]. called Eisenstein series. If we set <math>g_2(z)=60G_4(z)</math> and <math>g_3(z)=140G_6(z)</math>,5 KB (849 words) - 15:14, 18 May 2021
- ...give the terms of a [[sequence]] which is of interest. Therefore the power series (i.e. the generating function) is <math>c_0 + c_1 x + c_2 x^2 + \cdots </ma ...derived using the [[Geometric sequence#Infinite|sum formula for geometric series]] <cmath>\frac{1}{1-x} = \sum_{k=0}^{\infty} x^k = 1 + x + x^2 + x^3 + \do4 KB (659 words) - 11:54, 7 March 2022
- The [[Taylor series]] for <math>e^x</math> is <cmath>\sum_{n=0}^{\infty} \frac{x^n}{n!} = 1 + x ...+ b</math> is the [[Generating function#Convolutions|convolution]] of the series at <math>x = a</math> and <math>x = b</math>. Examining the degree-<math>n<5 KB (935 words) - 12:11, 20 February 2024
- Apply the finite geometric series formula to <math>(1+x)</math>: <cmath>1+(1+x)+(1+x)^2+...+(1+x)^n=\frac{(1+ .../www.artofproblemsolving.com/Forum/viewtopic.php?p=394407#394407 1986 AIME Problem 11]12 KB (1,993 words) - 21:22, 15 January 2025