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Darwin Laylo
Darwin Laylo (born 1980) is a Filipino chess grandmaster. Laylo won the Philippine national championship in 2004 and 2006. These wins earned him a place on the Philippine teams in the 2004 Calvià Olympiad and in 2006 at Turin. In 2006 he gained two GM norms, the first from the 2006 Malaysian Open, and the second at the 2006 Bad Wiessee tournament in Germany. His third and final norm came in the 2007 Asian Chess Championship in Cebu, Philippines. Laylo placed in the top ten of the 2007 Asian Chess Championship, earning a place in the 2007 World Chess Cup, November, 2007, in Khanty-Mansiysk, Russia. Seeded 113th out of 128 participants, Laylo was eliminated in the first round, 1½–½, by the French grandmaster Étienne Bacrot. In 2008, he tied for 3rd-7th with Ashot Nadanian, Marat Dzhumaev, Dražen Sermek and Susanto Megaranto in the 5th Dato' Arthur Tan Malaysia Open Championship in Kuala Lumpur , anthem = ''Maju dan Sejahtera'' , image_map ... [...More Info...] [...Related Items...] OR: [Wikipedia] [Google] [Baidu] |
Philippines
The Philippines (; fil, Pilipinas, links=no), officially the Republic of the Philippines ( fil, Republika ng Pilipinas, links=no), * bik, Republika kan Filipinas * ceb, Republika sa Pilipinas * cbk, República de Filipinas * hil, Republika sang Filipinas * ibg, Republika nat Filipinas * ilo, Republika ti Filipinas * ivv, Republika nu Filipinas * pam, Republika ning Filipinas * krj, Republika kang Pilipinas * mdh, Republika nu Pilipinas * mrw, Republika a Pilipinas * pag, Republika na Filipinas * xsb, Republika nin Pilipinas * sgd, Republika nan Pilipinas * tgl, Republika ng Pilipinas * tsg, Republika sin Pilipinas * war, Republika han Pilipinas * yka, Republika si Pilipinas In the recognized optional languages of the Philippines: * es, República de las Filipinas * ar, جمهورية الفلبين, Jumhūriyyat al-Filibbīn is an archipelagic country in Southeast Asia. It is situated in the western Pacific Ocean and consists of around 7,641 islands t ... [...More Info...] [...Related Items...] OR: [Wikipedia] [Google] [Baidu] |
Chess World Cup 2007
The Chess World Cup 2007 served as a qualification tournament for the World Chess Championship 2010. It was held as a 128-player single-elimination tournament, between 24 November and 16 December 2007, in Khanty-Mansiysk, Russia. In an event attended by most leading players of the world, American Gata Kamsky emerged as the winner. He was unbeaten in the tournament, going into tie-break only once and defeating Spaniard Alexei Shirov, 2½–1½, in the four-game final. Two 17-year-old players, Sergey Karjakin and Magnus Carlsen, reached the semifinals. By winning, Kamsky qualified for the Challenger Match, the final stage in determining the challenger for the World Chess Championship 2010; his participation in that match allowed him direct entry into the Candidates Matches for the World Chess Championship 2012. The final four also received direct entry into the FIDE Grand Prix 2008–10, a qualifying stage for the World Chess Championship 2012. The winner of the Chess World C ... [...More Info...] [...Related Items...] OR: [Wikipedia] [Google] [Baidu] |
15th Asian Games
15 (fifteen) is the natural number following 14 and preceding 16. Mathematics 15 is: * A composite number, and the sixth semiprime; its proper divisors being , and . * A deficient number, a smooth number, a lucky number, a pernicious number, a bell number (i.e., the number of partitions for a set of size 4), a pentatope number, and a repdigit in binary (1111) and quaternary (33). In hexadecimal, and higher bases, it is represented as F. * A triangular number, a hexagonal number, and a centered tetrahedral number. * The number of partitions of 7. * The smallest number that can be factorized using Shor's quantum algorithm. * The magic constant of the unique order-3 normal magic square. * The number of supersingular primes. Furthermore, * 15 is one of two numbers within the ''teen'' numerical range (13-19) not to use a single-digit number in the prefix of its name (the first syllable preceding the ''teen'' suffix); instead, it uses the adjective form of five (''fif' ... [...More Info...] [...Related Items...] OR: [Wikipedia] [Google] [Baidu] |
18th Asian Cities Chess Championship
18 (eighteen) is the natural number following 17 and preceding 19. In mathematics * Eighteen is a composite number, its divisors being 1, 2, 3, 6 and 9. Three of these divisors (3, 6 and 9) add up to 18, hence 18 is a semiperfect number. Eighteen is the first inverted square-prime of the form ''p''·''q''2. * In base ten, it is a Harshad number. * It is an abundant number, as the sum of its proper divisors is greater than itself (1+2+3+6+9 = 21). It is known to be a solitary number, despite not being coprime to this sum. * It is the number of one-sided pentominoes. * It is the only number where the sum of its written digits in base 10 (1+8 = 9) is equal to half of itself (18/2 = 9). * It is a Fine number. In science Chemistry * Eighteen is the atomic number of argon. * Group 18 of the periodic table is called the noble gases. * The 18-electron rule is a rule of thumb in transition metal chemistry for characterising and predicting the stability of metal complexes. ... [...More Info...] [...Related Items...] OR: [Wikipedia] [Google] [Baidu] |
17th Asian Cities Chess Championship
17 (seventeen) is the natural number following 16 and preceding 18. It is a prime number. Seventeen is the sum of the first four prime numbers. In mathematics 17 is the seventh prime number, which makes seventeen the fourth super-prime, as seven is itself prime. The next prime is 19, with which it forms a twin prime. It is a cousin prime with 13 and a sexy prime with 11 and 23. It is an emirp, and more specifically a permutable prime with 71, both of which are also supersingular primes. Seventeen is the sixth Mersenne prime exponent, yielding 131,071. Seventeen is the only prime number which is the sum of four consecutive primes: 2, 3, 5, 7. Any other four consecutive primes summed would always produce an even number, thereby divisible by 2 and so not prime. Seventeen can be written in the form x^y + y^x and x^y - y^x, and, as such, it is a Leyland prime and Leyland prime of the second kind: :17=2^+3^=3^-4^. 17 is one of seven lucky numbers of Euler which produ ... [...More Info...] [...Related Items...] OR: [Wikipedia] [Google] [Baidu] |
