Search results
Results from the WOW.Com Content Network
Guild Wars Factions is a fantasy action role-playing game and the second stand-alone campaign in the Guild Wars series developed by ArenaNet, a subsidiary of NCSOFT corporation.
Relic Entertainment is a Canadian video game developer based in Vancouver and founded in June 1997 by Alex Garden and Luke Moloney. [1] After its debut title Homeworld (1999), the company developed two more games, Impossible Creatures (2003) and Homeworld 2 (2003), and signed a contract with publisher THQ for an additional two games. [2]
Relic Entertainment Inc. (formerly known as THQ Canada Inc.) is a Canadian video game developer based in Vancouver, founded in 1997. The studio specializes in real-time strategy games and is known for series such as Homeworld , Warhammer 40,000: Dawn of War and Company of Heroes .
Impossible Creatures is a 2003 steampunk real-time strategy game developed by Relic Entertainment and published by Microsoft Game Studios.Its unique feature is that the armies used in gameplay are all created by the player, and involve combining two animals to make a new super creature with various abilities.
Each branch carries 3 branches (here 90° and 60°). The fractal dimension of the entire tree is the fractal dimension of the terminal branches. NB: the 2-branches tree has a fractal dimension of only 1. 1.5850: Sierpinski triangle: Also the limiting shape of Pascal's triangle modulo 2.
The Koch snowflake (also known as the Koch curve, Koch star, or Koch island [1] [2]) is a fractal curve and one of the earliest fractals to have been described. It is based on the Koch curve, which appeared in a 1904 paper titled "On a Continuous Curve Without Tangents, Constructible from Elementary Geometry" [3] by the Swedish mathematician Helge von Koch.
This article lists those elements of the Siegfried Line (German: Westwall) that have survived or whose function is still clearly recognisable.The structures are listed roughly from north to south and grouped by the individual construction programmes involved in building the Siegfried Line.
The Möbius transformations of the plane preserve the shapes and tangencies of circles, and therefore preserve the structure of an Apollonian gasket. Any two triples of mutually tangent circles in an Apollonian gasket may be mapped into each other by a Möbius transformation, and any two Apollonian gaskets may be mapped into each other by a Möbius transformation.