The competition consists of Theoretical and Experimental rounds.

Students will be asked to solve 5 problems in theoretical round, and 2 problems in experimental round. The estimated duration of each round is 4 hours.

Participants will be provided with two versions of tasks: in English and in student's mother tongue.

Requirements and tasks examples.

The competition consists of Theoretical and Experimental rounds.

Students will be asked to solve 3 problems in theoretical round, and 1 problem in experimental round. The estimated duration of each round is 5 hours.

Participants will be provided with two versions of tasks: in English and in student's mother tongue.

Requirements and tasks examples.

The competition consists of two rounds of practice.

Students will be asked to solve 4 problems in each round. The estimated duration of each round is 4 hours.

Participants will be provided with two versions of tasks: in English and in student's mother tongue.

Requirements and tasks examples.

The updated contestant image for VirtualBox, which will be used during the rounds on informatics is available here: https://yadi.sk/d/jsbKAZEbufmGK. If you don't log in automatically, choose username 'contestant' and press 'Enter'.

The Contest includes two rounds and it takes place in two consecutive days. On each day of the Contest the examination starts in the morning and lasts for 4,5 hours. Each of two papers consists of 3 problems.

A participant can receive a maximum of seven points for each problem. Each participant may receive the problems in two languages (in English and in student's mother tongue).

The format and the level of tasks correspond to the level of the International Mathematical Olympiad and other major international competitions, such as the Romanian Masters or International Zhautykov Olympiad.

Themes of problems are in line with the All-Russian Olympiad, the Tournament of Towns and the Moscow Mathematical Olympiad. The problems cover various fields of school mathematics (mostly geometry, number theory, algebra and combinatorics). The problems do not require knowledge of higher mathematics. Generally, all the problems have short solutions.