About
John Conway’s Game of Life
Description taken from Wikipedia, the free encyclopedia.
The Game of Life is a cellular automaton devised by the British mathematician John Horton Conway in 1970. It is the best-known example of a cellular automaton. The "game" is actually a zero-player game, meaning that its evolution is determined by its initial state, needing no input from human players. One interacts with the Game of Life by creating an initial configuration and observing how it evolves. A variant exists where two players compete. Rules: The universe of the Game of Life is an infinite two-dimensional orthogonal grid of square cells, each of which is in one of two possible states, live or dead. Every cell interacts with its eight neighbours, which are the cells that are directly horizontally, vertically, or diagonally adjacent. At each step in time, the following transitions occur:
- Any live cell with fewer than two live neighbors dies, as if by loneliness.
- Any live cell with more than three live neighbors dies, as if by overcrowding.
- Any live cell with two or three live neighbors lives, unchanged, to the next generation.
- Any dead cell with exactly three live neighbors comes to life.
Translations
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Credits
Francisco Esquembre; Wolfgang Christian; Tan Wei Chiong; lookang
Sample Learning Goals
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For Teachers
This is a simulation of John Conway's Game of Life, a cellular automation in which cells are placed in a grid, and individual cells either live or die according to these rules:
1) Any live cell with fewer than two live neighbours dies, as if caused by under-population.
2) Any live cell with two or three live neighbours lives on to the next generation.
3) Any live cell with more than three live neighbours dies, as if by over-population.
4) Any dead cell with exactly three live neighbours becomes a live cell, as if by reproduction.
This simulation only requires user input for the initial state, as every other state is determined by the iteration before it.
Interestingly, certain cellular constructs can be formed based on these rules. Three of them (gliders, diehards and acorns) are already preset in the simulation for your convenience.
Research
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Video
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Version:
- http://weelookang.blogspot.sg/2016/02/vector-addition-b-c-model-with.html improved version with joseph chua's inputs
- http://weelookang.blogspot.sg/2014/10/vector-addition-model.html original simulation by lookang
Other Resources
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- Details
- Written by Wei Chiong
- Parent Category: Interactive Resources
- Category: Biology
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