|
Search: id:A102241
|
|
|
| A102241 |
|
Hexagrams of the Yi Jing [or I Ching] interpreted in base 10, with the top line = 2^5 (most significant bit) and the bottom line as 2^0 (least significant bit). |
|
+0
2
|
|
| 63, 0, 17, 34, 23, 58, 2, 16, 55, 59, 7, 56, 61, 47, 4, 8, 25, 38, 3, 48, 41, 37, 32, 1, 57, 39, 33, 30, 18, 45, 28, 14, 60, 15, 40, 5, 53, 43, 20, 10, 35, 49, 31, 62, 24, 6, 26, 22, 29, 46, 9, 36, 52, 11, 13, 44, 54, 27, 50, 19, 51, 12, 21, 42
(list; graph; listen)
|
|
|
OFFSET
|
1,1
|
|
|
COMMENT
|
Traditionalists insist that the hexagrams were built from trigrams, which were in turn built from single lines. Historians point out that this is not supported by facts, the hexagrams came first and the rest has evolved from commentary.
There are at least 5 orderings: The popular book order (known as the Wen-Wan ordering, this sequence), the MaWangDui order (A125638), the Lian-Shan ordering (partial), the Kuei-Tsan ordering (partial) and the most recent binary ordering, known as the Fu-Hsi ordering (probably by Shao Yung, +1000 most certainly influenced by Yang Hsiung's Tai Hsuan Jing +10).
In a similar vein the Tai-Hsuan Jing (Han Dynasty, Yang Tze-Yun or Yang Hsiung about +10). This book uses four layers of unbroken, broken once and twice-broken lines that results in the numbers 00 - 77 arranged in an octal number system order. This book may have also influenced Leibnitz.
To my knowledge the orderings of the hexagrams have not been explained mathematically (apart from the obvious fact that each hexagram is followed by its binary reversal or binary complement if it is a binary palindrome).
|
|
REFERENCES
|
Unknown author, Yi Jing (also known as the Chou Yi). Translation by Richard Wilhelm (Chinese to German) and Cary F. Baynes (German to English).
Unknown author, Yi Jing, English Translation of the MaWangDui text (which has a different ordering).
|
|
LINKS
|
Andreas Schoeter, Yi Jing Algebra
Greg Whincup, The I Ching on the Net
Wikipedia, I Ching
|
|
EXAMPLE
|
The original hexagrams (in binary) are 111111, 000000, 010001, 100010, 010111, 111010, 000010, 010000, 110111, 111011, 000111, 111000, 111101, 101111, 000100, 001000, 011001, 100110, 000011, 110000, 101001, 100101, 100000, 000001, 111001, 100111, 100001, 011110, 010010, 101101, 011100, 001110, 111100, 001111, 101000, 000101, 110101, 101011, 010100, 001010, 100011, 110001, 011111, 111110, 011000, 000110, 011010, 010110, 011101, 101110, 001001, 100100, 110100, 001011, 001101, 101100, 110110, 011011, 110010, 010011, 110011, 001100, 010101, 101010.
|
|
CROSSREFS
|
Cf. A125638.
Sequence in context: A093262 A115460 A116270 this_sequence A084507 A145585 A033383
Adjacent sequences: A102238 A102239 A102240 this_sequence A102242 A102243 A102244
|
|
KEYWORD
|
nonn,fini,full
|
|
AUTHOR
|
Patrick A. Kirol [Sun Wu Kong] (sunwukong(AT)hananet.net), Feb 18 2005
|
|
EXTENSIONS
|
Corrected by David Applegate (david(AT)research.att.com), Nov 28 2006.
|
|
|
Search completed in 0.002 seconds
|
