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The logo of the International Mathematical Olympiad. 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 widely regarded as the most prestigious mathematical competition in the world. The first IMO was held in Romania in 1959 ...
The International Mathematical Olympiad (IMO) is an annual international high school mathematics competition focused primarily on pre-collegiate mathematics, and is the oldest of the international science olympiads. [1]
Zhuo Qun Song (Chinese: 宋卓群; pinyin: Sòng Zhuōqún; born 1997), also called Alex Song, is a Chinese-born Canadian who is currently the most highly decorated International Mathematical Olympiad (IMO) contestant, with five gold medals and one bronze medal.
The first of the International Mathematical Olympiads (IMOs) was held in Romania in 1959. The oldest of the International Science Olympiads , the IMO has since been held annually, except in 1980. That year, the competition initially planned to be held in Mongolia was cancelled due to the Soviet invasion of Afghanistan . [ 1 ]
International Mathematical Modeling Challenge — team contest for high school students; International Mathematical Olympiad (IMO) — the oldest international Olympiad, occurring annually since 1959. International Mathematics Competition for University Students (IMC) — international competition for undergraduate students.
Rank Country Gold Silver Bronze Honorable mentions Gold in Last 10 contests (updated till 2024) 1 China: 185 37 6 0 51 2 United States [2]: 151 120 30
This article describes the selection process, by country, for entrance into the International Mathematical Olympiad. The International Mathematical Olympiad (IMO) is an annual mathematics olympiad for students younger than 20 who have not started at university. Each year, participating countries send at most 6 students.
In 1988, the method came to the attention to mathematical olympiad problems in the light of the first olympiad problem to use it in a solution that was proposed for the International Mathematics Olympiad and assumed to be the most difficult problem on the contest: [2] [3] Let a and b be positive integers such that ab + 1 divides a 2 + b 2.