Search results
Results From The WOW.Com Content Network
Chaturanga (Sanskrit: चतुरङ्ग, IAST: caturaṅga, pronounced [tɕɐtuˈɾɐŋɡɐ]) is an ancient Indian strategy board game. It is first known from India around the seventh century AD. It is first known from India around the seventh century AD.
Main page; Contents; Current events; Random article; About Wikipedia; Contact us
Chadarangam (Telugu: చదరంగము) is a Telugu version of Indian chess, Chaturanga. It became very famous among kings and courtesans. It became very famous among kings and courtesans. Previously chariots ( Ratha ) were used in warfare, but in medieval times chariots were replaced by camels ( Oṣṭra ).
The ferz is a very old piece, appearing in chaturanga and shatranj, the ancestors of all chess variants; it also featured in games such as Tamerlane chess. The ferz was a standard chess piece until the modern moves of queen and bishop were developed around the 15th century, with the ferz being replaced by the former.
The ancient Indian Brahmin mathematician Sissa (also spelt Sessa or Sassa and also known as Sissa ibn Dahir or Lahur Sessa) is a mythical character from India, known for the invention of Chaturanga, the Indian predecessor of chess, and the wheat and chessboard problem he would have presented to the king when he was asked what reward he'd like for that invention.
Antique Indian Chaturanga Chess set arranged for four players as in Chaturaji. Chaturaji (meaning "four kings") is a four-player chess-like game. It was first described in detail c. 1030 by Al-Biruni in his book India. [1] Originally, this was a game of chance: the pieces to be moved were decided by rolling two dice.
The pawn's two-step initial move is absent in Indian chess; thus, the en passant capture is also absent. Normal castling with rook and king is absent. The unchecked king can make a knight's move once in a game, known as Indian castling or king's leap.
If the knight ends on a square that is one knight's move from the beginning square (so that it could tour the board again immediately, following the same path), the tour is closed (or re-entrant); otherwise, it is open. [1] [2] The knight's tour problem is the mathematical problem of finding a knight's tour.