Query Results for
SELECT * FROM `Item` LEFT JOIN `IndexEntry` USING (ItemID) WHERE `Type` = 'Game' AND `IsHidden` = 0 AND `Item`.`IsDeleted` = 0 AND `YearInvented` >= '1993' AND `YearInvented` <= '2003' AND `Language` = 'English' AND `LinkText` LIKE 'R%' ORDER BY `LinkText`, `Item`.`Summary` ASC LIMIT 500 OFFSET 0
- Raft Chess. Part of the board is a lake, where rafts can transport pieces. (8x8, Cells: 64) Author: Jörg Knappen.
- Ramayana Chess. Chess variant inspired by the Ramayana epic. (Cells: 84) By Luiz Carlos Campos.
- Random Pawns. Randomly select your Pawns' movement and capture abilities. (8x8, Cells: 64) By Gavin King.
- Random Wormhole Chess. Introduces "wormholes" and "toroidal" movement in a fun and manageable way. (8x8, Cells: 64) By Adrian Alvarez de la Campa.
- Ravioli Chess. Chess on two boards squeezed together at the edges. (2x(8x8), Cells: 100) By Antoine Fourrière.
- Ready Chess. Pieces cannot capture right after capturing, they have to be restored first. (8x8, Cells: 64) By Tony Quintanilla.
- Rebel Chess. King's Pawn is replaced by Recruiter piece that moves like an Alfil and can change a piece's side. (8x8, Cells: 64)
- Rectahex Chesss. A chess variant that looks like hexagonal chess but can be played on a normal chess board. (8x8, Cells: 64) By Ralph Betza.
- Rectangular Cubic Chess. Experimental variant on 3d shaped board. (6x(), Cells: 72) By Robert J. Bell.
- Recycle Chess. Players can capture and drop their own pieces. (8x8, Cells: 64) By Robert Huber.
- Renezans Chess. 9x9 game with gnus and central powerup square. Author: Ben M Reiniger. Inventor: Bi-Triad.
- Retrochess. Play chess from the end of the game backwards. (8x8, Cells: 64) By João Pedro Neto and Ralph Betza.
- Rollerball. Chess race fight on board formed by removing 3 by 3 square from center of 7 by 7 square. (7x7, Cells: 40) By Jean-Louis Cazaux.
- Rook Mania. Game where all pieces have different sorts of Rook-like moves. (7x7, Cells: 43) By Jared B. McComb.
- Round Table Chess 84. Chess on a special round board with 84 squares. (Cells: 84) By Richard G. VanDeventer.
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