Mathematical Olympiad in China (2007-2008): Problems and SolutionsWorld Scientific, 2009 - 221 pages The International Mathematical Olympiad (IMO) is a competition for high school students. China has taken part in the IMO 21 times since 1985 and has won the top ranking for countries 14 times, with a multitude of golds for individual students. The six students China has sent every year were selected from 20 to 30 students among approximately 130 students who took part in the annual China Mathematical Competition during the winter months. This volume comprises a collection of original problems with solutions that China used to train their Olympiad team in the years from 2006 to 2008. Mathematical Olympiad problems with solutions for the years 2002OCo2006 appear in an earlier volume, Mathematical Olympiad in China." |
Table des matières
China Mathematical Competition | 1 |
China Mathematical Competition Extra Test | 29 |
China Mathematical Olympiad | 40 |
China National Team Selection Test | 67 |
China Cirls Mathematical Olympiad | 95 |
China Western Mathematical Olympiad | 123 |
China Southeastern Mathematical Olympiad | 143 |
International Mathematical Olympiad | 170 |
Autres éditions - Tout afficher
Mathematical Olympiad in China (2007-2008): Problems and Solutions Bin Xiong,Peng Yee Lee Aucun aperçu disponible - 2009 |
Expressions et termes fréquents
AABC acº arº assume awarded bad pair Captain Jack China Mathematical Olympiad circle circumcenter circumcircle clique color competition in China completes the proof composite number concyclic points contradiction Denote East China Normal equality holds equation exists Fields Medal given points Hence Hua Luogeng Huawei inequality infinite International Mathematical Olympiad isogonal trapezoid isosceles Lemma mathematical competition mathematical induction Mathematical Society maximum medalist of IMO midpoint minimum value mod q Nevanlinna Prize orthocenter permutation pigeonhole principle player positive integer positive real numbers prime number problems prove radius rational numbers respectively satisfies the condition satisfying the property segments sequence Solution subset Suppose symmetric tangent theorem triangle ABC vertex winner Yingtan ZACB Zhejiang