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Zhuo Qun Song, the most highly decorated IMO contestant with 5 golds and 1 bronze medal. Ciprian Manolescu, the only person to achieve three perfect scores at the IMO (1995–1997). The following table lists all IMO Winners who have won at least three gold medals, with corresponding years and non-gold medals received noted (P denotes a perfect ...
The International Mathematical Olympiad (IMO) is a mathematical olympiad for pre-university students, and is the oldest of the International Science Olympiads. [1] It is "the most prestigious" mathematical competition in the world. The first IMO was held in Romania in 1959. It has since been held annually, except in 1980.
The Asian Pacific Mathematics Olympiad; IMO selection exams in the AMOC Selection School in April; The Australian Mathematical Olympiad (AMO) is held annually in the second week of February. It is composed of two four-hour papers held over two consecutive days. There are four questions in each exam for a total of eight questions.
Gold in Last 10 contests (updated till 2024) 1 China: 185 37 6 0 51 2 United States [2] 151 120 30 1 46 3 Russia: 106 62 12 0 19 4 South Korea: 95 83 28 7 38 5 Hungary: 88 174 116 10 10 6 Romania: 86 158 111 7 12 7 Soviet Union A: 77 67 45 0 - 8 Vietnam: 69 117 85 3 17 9 Bulgaria: 57 130 121 15 4 10 United Kingdom: 56 124 131 18 15 11 Germany ...
North Korea is the only country whose entire team has been caught cheating, resulting in its disqualification at the 32nd IMO in 1991 and the 51st IMO in 2010. [6] (However, the 2010 case was controversial. [7] [8]) There have been other disqualifications of contestants due to cheating, but such cases are not officially made public. [9]
-10 Questions 1968–1972: 35-5 Questions 1973 Annual High School Mathematics Examination 35 1974–1982: 30-5 Questions 1983–1999 American High School Mathematics Examination 30 AIME introduced in 1983, now is a middle step between AHSME and USAMO. AJHSME, now AMC 8, introduced in 1985 2000–present American Mathematics Competition 25 -5 ...
Canadian Mathematical Olympiad — competition whose top performers represent Canada at the International Mathematical Olympiad The Centre for Education in Mathematics and Computing (CEMC) based out of the University of Waterloo hosts long-standing national competitions for grade levels 7–12 [ 1 ] [ 2 ]
Problem #6 at IMO 1988: Let a and b be positive integers such that ab + 1 divides a 2 + b 2. Prove that a 2 + b 2 / ab + 1 is a perfect square. [8] [9] Fix some value k that is a non-square positive integer. Assume there exist positive integers (a, b) for which k = a 2 + b 2 / ab + 1 .