''I Ching'' divination

Precursor to I Ching: Cracks in turtle shell

Plastromancy or the turtle shell oracle is probably the earliest recorded form of fortune telling. The diviner would apply heat to a piece of a turtle shell (sometimes with a hot poker), and interpret the resulting cracks. The cracks were sometimes annotated with inscriptions, the oldest Chinese writings that have been discovered. This oracle predated the earliest versions of the Zhou Yi (dated from about 1100 BC) by hundreds of years.

A variant on this method was to use ox shoulder bones, a practice called scapulimancy. When thick material was to be cracked, the underside was thinned by carving with a knife.

Yarrow stalks

A bunch of 50 yarrow (Achillea millefolium subsp. millefolium var. millefolium) stalks, used for I Ching divination.

Hexagrams may be generated by the manipulation of yarrow stalks. These are usually genuine Achillea millefolium stalks that have been cut and prepared for such purposes or any form of wooden rod or sticks (the quality ranging from cheap hardwood to very expensive red sandalwood etc.) which are plain, lacquered or varnished. When genuine Achillea is used, varieties local to the diviner are considered the best as they would contain qi closer to and more in-tune with the diviner, or they may come from a particularly spiritual or relevant place such as on the grounds of a Confucian temple. When not in use, they are kept in a cloth or silk bag/pouch or a wooden case/box.

Fifty yarrow stalks are used, though one stalk is set aside at the beginning and takes no further part in the process of consultation. The remaining forty-nine stalks are roughly sorted into two piles, and then for each pile one stalk is initially 'remaindered' then the pile is "cast off" in lots of four (i.e., groups of four stalks are removed). The remainders from each half are combined (traditionally placed between the fingers of one hand during the counting process) and set aside, with the process then repeated twice (i.e., for a total of three times). The total stalks in the remainder pile will necessarily (if the procedure has been followed correctly) be 9 or 5 in the first count and 8 or 4 in the second. 9 or 8 is assigned a value of 2, 5 or 4 a value of 3. The total of the three passes will be one of just four values: 6 (2+2+2), 7 (2+2+3), 8 (2+3+3), or 9 (3+3+3); that count provides the number of the first line.^[1] The forty-nine stalks are then gathered and the entire procedure repeated to generate each of the remaining five lines of the hexagram. (Each succeeding line is written above its predecessor, i.e., the first line is at the bottom of the "stack" of lines, and the final, sixth line is at the top.)

The yarrow-stalk method produces unequal probabilities^[2][3] for obtaining each of the four totals, as shown in the table.

Note that the Yarrow algorithm is the name of a particular algorithm for generating random numbers. While it is named for the I Ching yarrow-stalks method, the details of the algorithm are unrelated to it.

Coins

Three-coin method

Two heads and one tail of the original I-Ching Divination Coins.

The three coin method came into currency over a thousand years later. The quickest, easiest, and most popular method by far, it has largely supplanted the yarrow stalks, but produces outcomes with different likelihoods. Three coins are tossed at once. Each coin is given a value of 2 or 3 depending upon whether it is tails or heads respectively. Six such tosses make the hexagram.

Dice

Any dice with an even number of faces can also be used in the same fashion of the coin tosses with even die rolls for heads and odd for tails. An eight sided die (d8) can be used to simulate the chances of a line being an old moving line equivalent to the yarrow-stalk method. For example, because the chances of any yin line or any yang line are equal in the yarrow-stalk method, there is a one in eight chance of getting any basic trigram, the same chance held under the ba qian method so the ba qian method can thus be used to determine the basic hexagram. The d8 can then be used by rolling it once for each line to determine moving lines. A result of 1 on a yin line or 3 on a yang line will make that line a moving line, preserving the yarrow-stalk method's outcomes.

Another dice method that produces the 1:7:3:5 ratio of the yarrow-stalk method is to add 1d4 + 1d8. All odd results are considered yang, with the result of eleven denoting an old yang. Any even results would be considered yin and both fours and tens are treated as old yin.

Marbles or beads (Method of Sixteen)

Sixteen marbles can be used in four different colours. For example:

• 1 marble of a colour (such as blue) representing old yin
• 5 marbles of a colour (such as white) representing young yang
• 7 marbles of a colour (such as black) representing young yin
• 3 marbles of a colour (such as red) representing old yang

The marbles are drawn with replacement six times to determine the six lines. The distribution of results is the same as for the yarrow-stalk method.

Methods = It may be simpler to compare the yarrow-stalk and the Method of Sixteen procedures with probabilities.

A yarrow cast of 9 has a probability of 1/4, and a 5 of 3/4. Both 4 and 8 have probability of 1/2.

If P(cast) <= sqr(1) / 16 then a moving yin value 6 1/16 49 - 6 * 4 = 25 (9, 8, 8)

Else if P(cast) <= sqr(2) / 16 then a moving yang value 9 3/16 49 - 9 * 4 = 13 (5, 4, 4)

Else if P(cast) <= sqr(3) / 16 then a static yang value 7 5/16 49 - 7 * 4 = 21 (5, 8, 8), (9, 4, 8), (9, 8, 4)

Else if P(cast) <= sqr(4) / 16 then a static yin value 8 7/16 49 - 8 * 4 = 17 (5, 4, 8), (5, 8, 4), (9, 4, 4)

Even is yin, Odd is yang. Extrema are changing.

Yang and yin are equally likely. Static is more likely than changing.

The yarrow method produces "near" probabilities dependent upon the initial divisions into piles differing within two standard deviations of the mean. The diviner must attempt to divide equally, or the algorithm is lost.

The Method of Sixteen simply produces the correct numbers using sixteen instances of some element of equal probability, such as marbles, subdivided into four subsets of the correct numbers, i.e., 1, 3, 5, 7. The diviner just selects (with replacement) one marble at random.

^[4]

Rice grains

For this method, either rice grains or small seeds are used. Six small piles of rice grains are made by picking up rice between finger and thumb. The number of grains in a pile determines if it is yin or yang. This has the deficiency of forcing zero and exactly zero lines in the hexagram to be a moving line when using the traditional yarrow method there can from zero to six moving lines.

Calendric cycles and astrology

There is a tradition of Taoist thought which explores numerology, esoteric cosmology, astrology and feng shui in connection with the I Ching.

The Han period (206 BCE-220 CE)… saw the combination and correlation of the I Ching, particularly in its structural aspects of line, trigrams, and hexagrams, with the yin-yang and wu hsing (Five Element) theories of the cosmologists, with numerical patterns and speculations, with military theory, and, rather more nebulously, with the interests of the fang-shih or "Masters of Techniques," who ranged over many areas, from practical medicine, through alchemy and astrology, to the occult and beyond.

— Hacker, Moore and Patsco, I Ching: an annotated bibliography, "The I Ching in Time and Space", p. xiii

The eleventh-century Neo-Confucian philosopher Shao Yung contributed advanced methods of divination including the Plum Blossom Yi Numerology, an horary astrology^[5] that takes into account the number of calligraphic brush strokes of one's query. Following the associations Carl Jung drew between astrology and I Ching with the introduction of his theory of synchronicity, the authors of modern Yi studies are much informed by the astrological paradigm.^[6] Chu and Sherrill provide five astrological systems in An Anthology of I Ching^[7] and in The Astrology of I Ching^[8] develop a form of symbolic astrology that uses the eight trigrams in connection with the time of one's birth to generate an oracle from which further hexagrams and a daily line judgement are derived.^[5] Another modern development incorporates the planetary positions of one's natal horoscope against the backdrop of Shao Yung's circular Fu Xi arrangement and the Western zodiac to provide multiple hexagrams corresponding to each of the planets.^[5]

Wen Wang Gua method

This method goes back to Jing Fang (78–37 BC). While a hexagram is derived with one of the common methods like coin or yarrow stalks, here the divination is not interpreted on the basis of the classic I Ching text. Instead, this system connects each of the six hexagram lines to one of the Twelve Earthly Branches, and then the picture can be analyzed with the use of 5 Elements (Wu Xing).^[9]

By bringing in the Chinese calendar, this method not only tries to determine what will happen, but also when it will happen. As such, Wen Wang Gua makes a bridge between I Ching and the Four Pillars of Destiny.

Software methods

The preceding ("concrete"/physical) methods can be simulated in ("abstract"/conceptual) software. This has the theoretical advantage of improving randomness aspects of I Ching ("not-doing" in the personal sense, enhancing the "universal" principal), but the practical disadvantage of not pre-focusing/preparing the mind.

Here is a typical example (for the "modified 3-coin" method but you can change to 3-coin if you want to):

#!/usr/bin/python3
#
# iChing_Modified_3_coins.py
#
#   see https://github.com/kwccoin/I-Ching-Modified-3-Coin-Method
#
#   Create (two) I Ching hexagrams: present > future (might be same).
#
# With both "3-coin method" and "modified 3-coin method" (see https://en.wikipedia.org/wiki/I_Ching_divination).
#
# 3-coins Probabilities:
#   old/changing/moving yin    "6 : == x ==" = 1/8
#   (young/stable/static) yang "7 : =======" = 3/8
#   (young/stable/static) yin  "8 : ==   ==" = 3/8
#   old/changing/moving yang   "9 : == o ==" = 1/8
#
# Modified 3-coins Probabilities: 
# (only 1/8 chance with the special coin tail and 2 head; and 8/9 throw one more time)
#   old/changing/moving yin    "6 : == x ==" = 1/8 + 1/8*1/2   = 3/16
#   (young/stable/static) yang "7 : =======" = 3/8 + 1/8*1/2   = 7/16
#   (young/stable/static) yin  "8 : ==   ==" = 3/8 - 1/8*1/2   = 5/16
#   old/changing/moving yang   "9 : == o ==" = 1/8 - 1/8*1/2   = 1/16

import random

rng = random.SystemRandom()  # (auto-)seeded, with os.urandom()

#method = "3 coin"
method = "modified 3 coins"

special_coin = 0

def toss():

    val = 0

    for flip in range(3):        # 3 simulated coin flips
        val += rng.randint(2,3)  # tail=2, head=3
        if flip == 0:
            special_coin = val

    if method == "coin":
        return val
    else:
        # method similar to "yallow-stick"
            if val == 9:
                if rng.randint(2,3) == 3:
                    val = 9
                else:
                    value = 7
            if val == 8:
                if special_coin == 2:
                    if rng.randint(2,3) == 2: 
                        val = 6
                else:
                        val = 8
    return val

# We build in bottom to top

print("Method is ",method,"\n")
toss_array = [0, 0, 0, 0, 0, 0]

for line in range(0,6,1):
    toss_array[line] = toss()
    print("line is ",line+1,"; toss is ",toss_array[line],"\n")



# hence we print in reverse

def print_lines_in_reverse(toss_array):
    for line in range(5,-1,-1):
        val = toss_array[line]
        if   val == 6: print('6  :  == x == ||   ==   ==  >  -------')
        elif val == 7: print('7  :  ------- ||   -------  >  -------')
        elif val == 8: print('8  :  ==   == ||   ==   ==  >  ==   ==')
        elif val == 9: print('9  :  -- o -- ||   -------  >  ==   ==')

print_lines_in_reverse(toss_array)

print("\n\n")

With a modified 3 coin method as default, this may avoid the Sung dynasty issue i.e. when you have an easy available and simple method you use it but lost the probability! (Also, the first number shall be in the bottom and hence the printing shall start from the bottom).