Difference between revisions of "Baker's dozen"
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{{Oscillator | {{Oscillator | ||
'''Baker's dozen''' | |name = Baker's dozen | ||
|pname = bakersdozen | |||
|c = 39 | |||
|bx = 25 | |||
|by = 11 | |||
|p = 12 | |||
|m = 6 | |||
|h = 36.3 | |||
|v = 0.89 | |||
|sv = 0.41 | |||
|discoverer = Robert Wainwright | |||
|discoveryear = 1989 | |||
|rulemin = B3/S23 | |||
|rulemax = B38/S2378 | |||
|rulespecial = [[Conway's Game of Life|Conway Life]] | |||
|isorulemin = B3-ky/S23-cejk | |||
|isorulemax = B34ceikqy5-acik6-an7e8/S234cekqtwz5-cinr6ein78 | |||
|synthesis = 26 | |||
|synthesisRLE = true | |||
|plaintext = true | |||
|rle = true | |||
|animated = true | |||
|apgcode = xp12_2hqz037133zccw6q4wi6zy1oogtozy4bh8 | |||
|pentadecathlonid = 39P12.1 | |||
|viewerconfig = #C [[ GPS 3 ZOOM 15 LOOP 12 ]] | |||
}} | |||
'''Baker's dozen''' is a {{period|12}} [[oscillator]] consisting of a [[loaf]] [[hassle]]d by two [[block]]s and two [[caterer]]s. The original form (using {{period|4}} and {{period|6}} oscillators to hassle) was found by [[Robert Wainwright]] in August {{year|1989}}.<ref>{{CiteHickersonOscillators|accessdate=March 14, 2020}}</ref> | |||
It can be stabilised and welded in many ways. A caterer can be used in 2 ways, one way is also suitable for the [[jam]]. A [[mazing]] would work, and two can be stabilised next to each other. Two opposite ones can be stabilised with two [[bookend]]s (shown below as bookend on snake). | |||
{| | |||
|- | |||
|{{EmbedViewer | |||
|viewerconfig = #C [[ AUTOSTART GPS 12 LOOP 13 THUMBLAUNCH THUMBSIZE 2 THEME 6 ZOOM 12 HEIGHT 320 ]] | |||
|pname = bakersdozen2 | |||
|position = center | |||
|caption = A 37-cell variant of baker's dozen<br> | |||
|}} | |||
|{{EmbedViewer | |||
|viewerconfig = #C [[ AUTOSTART GPS 12 LOOP 13 THUMBLAUNCH THUMBSIZE 2 THEME 6 ZOOM 12 HEIGHT 360 ]] | |||
|pname = bakersdozenreactions | |||
|position = center | |||
|caption = Several ways to stabilize baker's dozen<br> | |||
|}} | |||
|} | |||
==References== | |||
<references /> | |||
==External links== | ==External links== | ||
{{LinkLexicon|lex_b.htm#bakersdozen}} | |||
{{LinkCatagolue|xp12_2hqz037133zccw6q4wi6zy1oogtozy4bh8}} | |||
{{LinkPentadecathlonObject|39P12.1}} | |||
{{Symmetry|osc=turn180}} |
Revision as of 01:36, 8 May 2020
Baker's dozen | |||||||||||
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Pattern type | Oscillator | ||||||||||
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Number of cells | 39 | ||||||||||
Bounding box | 25 × 11 | ||||||||||
Period | 12 | ||||||||||
Mod | 6 | ||||||||||
Heat | 36.3 | ||||||||||
Volatility | 0.89 | ||||||||||
Strict volatility | 0.41 | ||||||||||
Discovered by | Robert Wainwright | ||||||||||
Year of discovery | 1989 | ||||||||||
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Baker's dozen is a period-12 oscillator consisting of a loaf hassled by two blocks and two caterers. The original form (using period-4 and period-6 oscillators to hassle) was found by Robert Wainwright in August 1989.[1]
It can be stabilised and welded in many ways. A caterer can be used in 2 ways, one way is also suitable for the jam. A mazing would work, and two can be stabilised next to each other. Two opposite ones can be stabilised with two bookends (shown below as bookend on snake).
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References
- ↑ Dean Hickerson's oscillator stamp collection. Retrieved on March 14, 2020.
External links
- Baker's dozen at the Life Lexicon
- 39P12.1 at Heinrich Koenig's Game of Life Object Catalogs
Categories:
- Patterns
- Oscillators with 39 cells
- Periodic objects with minimum population 39
- Patterns with 39 cells
- Patterns found by Robert Wainwright
- Patterns found in 1989
- Patterns that can be constructed with 26 gliders
- Oscillators
- Oscillators with period 12
- Oscillators with mod 6
- Oscillators with heat 36
- Oscillators with volatility 0.89
- Oscillators with strict volatility 0.41
- Non-flipping oscillators that turn 180 degrees