Difference between revisions of "Long⁴ snake"
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{{Stilllife | {{Stilllife | ||
|name | |name = Long<sup>4</sup> snake | ||
|pname | |pname = long4snake | ||
|c | |c = 10 | ||
|bx | |bx = 8 | ||
|by | |by = 6 | ||
|rulemin | |fc = 30.3 | ||
|rulemax | |rulemin = B/S23 | ||
|rulespecial | |rulemax = B35678/S012345678 | ||
| | |rulespecial = [[Conway's Game of Life|Conway Life]], [[HighLife]] | ||
| | |isorulemin = B/S2aen3n | ||
| | |isorulemax = B2ikn34-r5678/S012345678 | ||
| | |synthesis = 6 | ||
|plaintext | |synthesisRLE = true | ||
|rle | |plaintext = true | ||
|apgcode | |rle = true | ||
|apgcode = xs10_wg853z65 | |||
|niemiecid = 10.12 | |||
|pentadecathlonid = 10.15 | |||
}} | }} | ||
''' | '''Long<sup>4</sup> snake''' (or '''remarkably long snake''') is the [[long^4|long<sup>4</sup>]] version of a [[snake]]. | ||
==See also== | ==See also== | ||
*[[Extra long snake]] | *[[Extra long snake]] | ||
*[[ | *[[Very long canoe]] | ||
==External links== | ==External links== | ||
{{LinkCatagolue|xs10_wg853z65 | {{LinkCatagolue|xs10_wg853z65}} | ||
{{LinkNiemiec|p1.htm#p1-10|patternname=The 25 ten-bit still-lifes}} | {{LinkNiemiec|p1.htm#p1-10|patternname=The 25 ten-bit still-lifes}} | ||
{{Symmetry|180degree}} | {{Symmetry|180degree}} | ||
[[Category:Diagonal line stabilisations]] |
Revision as of 22:02, 25 February 2019
Long4 snake | |||||||||
View static image | |||||||||
Pattern type | Strict still life | ||||||||
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Number of cells | 10 | ||||||||
Bounding box | 8 × 6 | ||||||||
Frequency class | 30.3 | ||||||||
Discovered by | Unknown | ||||||||
Year of discovery | Unknown | ||||||||
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Long4 snake (or remarkably long snake) is the long4 version of a snake.
See also
External links
- The 25 ten-bit still-lifes at Mark D. Niemiec's Life Page
Categories:
- Patterns
- Patterns with Catagolue frequency class 30
- Natural periodic objects
- Periodic objects with minimum population 10
- Patterns with 10 cells
- Patterns that can be constructed with 6 gliders
- Still lifes
- Strict still lifes
- Strict still lifes with 10 cells
- Patterns with 180-degree rotation symmetry
- Diagonal line stabilisations