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  • ...ed States at the [[International Mathematics Olympiad]] (IMO). While most AIME participants are high school students, some bright middle school students a ...Junior Mathematics Olympiad (USAJMO) for qualification from taking the AMC 10.
    8 KB (1,067 words) - 19:15, 24 October 2024
  • ...ake. Sometimes, the administrator may ask other people to sign up to write problems for the contest. ...AMC]] competition. There is no guarantee that community members will make Mock AMCs in any given year, but there probably will be one.
    51 KB (6,175 words) - 20:41, 27 November 2024
  • The '''Mock AIME 1 2010''' was created by AoPS users Brut3Forc3, dysfunctionalequations, and Zhero. * [[Mock AIME 1 2010 Problems | Problems]]
    1 KB (117 words) - 18:42, 28 January 2023
  • In the context of problem-solving, the characteristic polynomial is often used to find closed forms f ...Indeed, if we define <math>T = \lambda I - A</math> and let <math>\bold{T}^1, \bold{T}^2, \ldots, \bold{T}^n</math> denote the column vectors of <math>T
    19 KB (3,412 words) - 13:57, 21 September 2022
  • == Problem 1 == ...th>. Find the number of perfect squares among <math>\{a_1, a_2, \ldots, a_{2010}\}</math>.
    8 KB (1,377 words) - 12:20, 2 August 2024
  • The '''Mock AIME 2 2010''' was created by AoPS users [[User:Andersonw|andersonw]], [[User:Brut3Forc * [[Mock AIME 2 2010 Problems | Problems]]
    1 KB (126 words) - 18:44, 28 January 2023
  • {{AIME Problems|year=Mock|n=2 2010}} == Problem 1 ==
    7 KB (1,150 words) - 08:10, 8 October 2018
  • The '''Mock AIME 3 2010''' was created by AoPS users andersonw, [[User:Brut3Forc3|Brut3Forc3]], dys * [[Mock AIME 3 2010 Problems | Problems]]
    1 KB (127 words) - 14:16, 3 July 2012
  • Mock AIME III April 1, 2010
    14 KB (2,904 words) - 17:24, 16 May 2017
  • == Problem 1 == [[2013 Mock AIME I Problems/Problem 1|Solution]]
    7 KB (1,159 words) - 08:15, 30 July 2024
  • == Problem == point O = (A+B)/2+(0,10*sqrt(2));
    4 KB (629 words) - 08:45, 2 August 2024
  • == Problem == ...nd 7, respectively, and suppose that the distance between their centers is 10. There exists a circle <math>\omega_3</math> that is internally tangent to
    4 KB (633 words) - 15:52, 2 August 2024