Splendid Wisdom consolidates power, 76,368 AD
Emperor Manwell-the-Bloody, 11,134-11,144
Emperor Zankatal-the-Pious, “the Noose,” 11,907-11,925
Emperor Sarin-the-Gross, assassinated by bodyguards, 11,926-11,931
Stannelle-the-Peaceful, assassinated by bodyguards, 11,985-12,010
Founder bom on Licon in Nora’s Toes, 11,988
Future Emperor Cleopon-the-First bom, 11,988
13th Millennium GE:
Splendid Wisdom cultural and organizational decline, 77,425 AD
Emperor Cleopon-the-First, 12,010, assassinated 12,052. benefactor of psychohistorical research
Emperor Agile-the-Quintessence, 12,052-12,066 impotent tool of feuding clans
Founder gives 8th Speech to Group of Forty-six, 12,061 plots Faraway project
Emperor Dalubbar-the-Pliant, 12,066-12,100 coronation when four years old, tool of deceptive advisors
Fellowship set up on Faraway, 12,068; 0 FE
Founder dies, 12,069; 1 FE
Precinct of Nacreome revolts successfully on Periphery, 12,116
beginning of Interregnum collapse First Psychohistorical Crisis, 12,118; 50 FK Faraway balances local power vacuum Second Psychohistorical Crisis, 12,148; 80 FE
Ambitions of local warlords constrained by religion based on technical magic
Oversee takes on hidden task of protecting the Thousand Suns, 12,170
Regent of Emperor Tien-the-Young seizes power through boy, 12,216
Viceroy Wisard of distant Sewinna plots usurpation of throne, 12,217
Loyalist local rebellion against Wisard, 12,219
Tien crushes Wisard and revenges himself cruelly on Sewinnese.
Massacre of Sewinnese by new Admiral-Viceroy Tien-the-Young, his Regent, advisors, and concubines assassinated, 12,222
Exiled father of Cleopon II seizes throne, 12,222-12,238
Third Psychohistorical Crisis, 12,223; 155 FE Religion vs Trade; Merchant Princes of Faraway dominate
Faraway begins economic conquests independent of religious power.
Splendid Wisdom accepts with relief strong Emperor Cleopon II, 12,238
Fourth Psychohistorical Crisis, 12,263; 195 FE
War organized by banished general against Faraway Successful general recalled to Splendid Wisdom and executed by Cleopon-the-Second, 12,264 Revolt against Firm hand of Cleopon II; he is murdered, 12,278
General time of troubles and retreat for Splendid Wisdom
Sack of Splendid Wisdom, Cainali Invasions begin, 12,338 Era of warlords Cloun-the-Stubbom bom, 12,351
Tuned-probes built by Helmarians for Lakgan pleasure houses, 12,370
Cloun begins rise to power within Lakgan, using probe, 12,371 Technique not covered by psychohistorical parameters
Cloun takes over Lakgan as First Citizen by mental coercion, 12,378
Fifth Psychohistorical Crisis, 12,379; 311 FE Civil War between Faraway and Traders, mispredicted
Cloun Conquers Faraway
Emergency action by Pscholars restabilizes Founder’s Plan, 12,383; 315 FE
Cloun dies, last years as enlightened despot, 12,388
Faraway breaks Lakgan rule, reestablishes economic sphere, 12,389
The Pscholars, having revealed themselves to Faraway during the Cloun crisis, make long range plans to go into hiding by pretending they have been destroyed, sacrificing 50 martyrs, 12,419-12,446; 351-378 FE
Pscholars provoke a six month Lakgan and Faraway war, which they know Faraway will win, to restore Faraway confidence in their destiny, 12,445; 377 FE “Violence is the last refuge of the competent”
Tamic Smythos and forty-nine others are captured at the end Lakganian War to deceive their Faraway hosts into believing that the capture of fifty psychohistorians based on Faraway is a clean sweep. Exiled to barren Zural, 12,446; 378 FE
Tamic Smythos is smuggled off Zural by corrupt Chancellor Linus, 12,454
Period of Coalescence, 12,820-13,000
Slow but general acceptance of quantronic familiar
14th Millennium GE:
Second Empire comprises twenty million systems, 78,482 AD
Formal establishment of Second Empire, Pax Pschol-aris, 13,157; 1089 FE Rebuilding of Splendid Wisdom begun Pscholars induce power shift from the Periphery back to galactic core
15th Millennium GE: Splendid Wisdom controls twenty-eight million systems, 79,539 AD Kargin Linmax bom, 14,650 Jars Hanis bom, 14,703 Hahukum Kon bom, 14,707 Kikaju Jama bom, 14,726 Rigone bom, 14,762
Nejirt Kambu and Hiranimus Scogil bom, 14,765 Eron Osa bom, 14,778 GE, watch 328, hour 7; 80,362 AD, 3rd februan, 2nd hour
Frightfulperson Otaria of the Calmer Sea bom, 14,784 Petunia Scogil bom, 14,797
Story begins 14,790 GE; 80,374 AD; 2722 FE
Appendix C
ANCIENT RITHIAN MEASURES
From the Cathusian Excalifate’s Compendium of Ancient Metric Documents:
Surviving Fragment of an Article on Ancient Metrics by Donald Kingsbury, (probably written before the Great Die-off).
[Basic Instrument:]
...commonly acknowledged that we use the time-reckoning devised by ancient astronomers of the Mediterranean. But few of us are aware that the foundation of the linear measures and weights that drove this ancient economy also rests upon that same time framework, the length of the pendulum that completes a full cycle in one sidereal-second, moving to-and-fro 86,400 times while the stars rotate back to the same position in the sky that they held the previous evening.
The ancients might have developed an escapement to keep their pendulums powered but we can’t make such an assumption without evidence—however, it is plausible that the priestly team which counted swings either by tossing pebbles in a pot or by flipping beads on an abacus could also be imposed upon to man a small bellows. Puffing at the bob would not compromise the timekeeping as long as the swing angle of the pendulum was controlled.
The one second pendulum is not of constant length, primarily because our planet is a flattened sphere and gravity becomes stronger as we move toward the poles. Pendulum length decreases as the latitude decreases from pole to equator, decreases with increasing altitude, decreases as the swing angle increases, and will depend upon how much air and rock lies below the pendulum. We can expect a normal value well inside the range 0.246 to 0.248 meters. In spite of its variability, the length of the pendulum was the most stable of the lengths available to the ancient geometers.
Since these metricians derived their weight standards by variously dividing a carefully measured cubic foot of water, and since we have reasonable data on these ancient weights, we can calculate from such fossil artifacts the standard length of the pendulum used in ancient times. Livio Stecchini determined that the standard Roman libra was 324 grams and that there were 80 of them to the Roman talent comprising a cubic Roman foot, giving us a Roman talent of 25,920 grams. If we make the assumption—to be justified later—that the Roman foot is 6/5ths of the sidereal-second pendulum we can calculate a standard pendulum length equal to the cube root of 15,000 cc.
Stecchini did all of his work on Roman weights in the metric system, thus we can suspect that rounding error played a part, however, we can also make a similar derivation from the venerable English avoirdupois ounce which is not dependent upon the meter. The avoirdupois ounce (modem value) is 28.34952313 grams, the avoirdupois pound is 453.5923701 grams. The conversion between pound and libra was always via an English pound of 7000 grains and a Roman libra of 5000 grains. Therefore the Roman talent derived from English units is 80 x 323.9945501 grams = 25,919.56401 grams, giving the standard pendulum length as the cube root of 14,999.75 cc.
The cube root of 15,000 cc gives a pendulum of 24.6621 cm or 0.246621 meters.
Can we place a pendulum of this length and period at any reasonable ancient site? Keith R Johnson has made a very plausible case for the niche in the Queen’s Room of the Great Pyramid as housing for one such pendulum. Assuming that t
he Great Pyramid is on the 30th parallel and located 100 meters above sea level, at a gravity of 9.7930417 m/sec2, we get the following values for the length of the pendulum that beats exactly 86,400 times in one sidereal day:
L = 0.246708 m, for a swing angle of 0 degrees
L = 0.246621 m, for a swing angle of 3.0374 degrees
L = 0.246482 m, for a swing angle of 4.9 degrees
L = 0.246370 m, for a swing angle of 6 degrees
(Do not make the mistake of assuming that gravity measured in meters per second squared is the same as gravity measured in meters per sidereal-second squared.)
Other sites should be investigated. Persian measures are a tad short and suggest that their calibration was done in the mountains around Persepolis, at an altitude of 1890 meters.
Back Derivation of the Standard Foot
The Roman talent of 25,920 grams was divided into 80 libras of 324 grams, the libra broken into 12 unciae of 27 grams, the uncia broken into 3 shekels of 9 grams. For fine work in precious metals the libra was shaved into 5000 grains.
More conventionally, the sides of this cubic talent of water could be divided integrally to give a variety of weights:
(1) 12 by 12 by 12 = 1728 cubes of 15 grams
(2) 6 by 6 by 6 = 216 cubes of 120 grams
(3) 4 by 4 by 4 = 64 cubes of 405 grams*
(4) 3 by 3 by 3 = 27 cubes of 960 grams
(5) 2 by 2 by 2 = 8 cubes of 3240 grams, ten libra
*This weight, called the mina of the Heraion, is equal to a water filled cube whose sides are three tenths the length of a one sidereal-second pendulum (three Roman inches), or is equal to the wheat filled standard pint ration of 486 cc. It occurs repeatedly in ancient measures—64 in the Roman talent, 70 in the English talent where it is 404.9931876 grams, 72 in the Egyptian artaba of 29,160 grams (1000 ounces Tower), et cetera.
These kinds of divisions were convenient for a civilization that computed in fractions with an arithmetic so clumsy that they had been forced to invent a calculation-free geometry just to get their surveying and geography done in reasonable time. Note that 1000 cubes of 15 grams pile up to make a cube whose side is the one sidereal-second pendulum length at the Great Pyramid;
Thus the Roman foot can be calculated at 6/5ths of the standard one sidereal-second pendulum.
The Calibration Latitude and the Reference Latitude
It is known from many documents that the ancient navigators calculated 75 Roman miles to a degree of latitude. Since there are 5000 Roman feet in a mile and 360 degrees in a circumference, there are 135 million Roman feet in the circumference of the Earth*, and 375,000 Roman feet in a degree, 6250 in a minute of arc. Multiply these numbers by 6/5 and we get 162 million sidereal-second lengths in the Earth’s circumference, 450,000 sidereal-second lengths to the degree, and 7500 sidereal-second lengths to the minute of arc.
What kind of numbers does this give us? Multiplying the pendulum length of 0.246621 meters by 450,000 gives us 110,979.5 meters, which is the number of meters to a degree in the notorious Stecchini latitude at 37°36 which Stecchini claimed was the reference latitude by which the ancients measured the circumference of the Earth. (There are 110,572 meters in a degree of latitude at the equator, 111,697 meters per degree of latitude at the pole, and 111 ,322 meters per degree of longitude at the equator.) Stecchini, himself, did not believe that the ancients used pendulums, extracting his numbers from old weights and measures, ancient building surveys, and by reading widely among old economic documents, as well as by reading Aristotle, Herodotus, Sumerian inscriptions, Egyptian tomb walls, et cetera.
*Earth: one of the ancient names that the early Solurthians gave to the planet Rith.
Note here that the number 1.62 is an approximation to the golden section, 1.61803398... If we were to send out surveyors to measure the length of the degree at 30 degrees of latitude in terms of a standard foot of 0.246621 meters we would get, not 450,000 sidereal-second lengths per degree but 449,454 lengths, which, when multiplied by 360, gives us 161,803,400 such lengths for the circumference (of a sphere tangent to the oblate spheroid) of the Earth at the Great Pyramid. This might be coincidence. Or it might be that the Egyptian astronomer-priests chose the very strange number, 86,400 seconds, to make the circumference divisible by the golden section. The Fibonacci numbers, which Fibonacci learned while his father worked as a diplomat in the Middle East, were known in antiquity and provide a very easy tool for computing the golden section if you are limited to an arithmetic heavily dependent upon fractions.
Two critical latitudes emerge once the sidereal clock is set at 86,400 seconds and the circumference at 162 million pendulum lengths.
The Calibration Latitude: To define the length of the pendulum whose period is one sidereal-second we must specify at which latitude our apparatus functions and at what altitude (usually ground level)—while at the same time being careful to confine the pendulum to a predetermined swing angle. At the Great Pyramid the sidereal-second foot cannot be greater than 0.2467 meters, corresponding to a swing angle of zero. At a swing angle of 5 degrees its length would decrease to 0.24647 meters. The evidence is good that in the later period it was calibrated close to 0.246621 meters using a swing angle of 3.04 degrees. The Egyptian Royal cubit of the King’s Chamber of the Great Pyramid, as measured by Petrie, would have been calculated at a swing angle of 4.9 degrees as the 7/6th part of a pendulum with a sidereal cycle of 64,000.
The Reference Latitude: Once calibrated, the sidereal-second foot defines a mythical reference latitude at which a sphere with a circumference of 162 million feet will be tangent to the inside surface of our flattened planet.
Example 1: For a calibration latitude of 30 degrees, altitude 100 meters, and a 3.04 degree swing angle, we get a foot of 0.246621 meters and a reference latitude of 37°36'
Example 2: Other regimes are possible. For instance, a pendulum set up just north of the Black Sea at a calibration latitude of 45°24' altitude of 100 meters, with a normal swing angle of 3.04 degrees will have a length of 0.246956 meters and a reference latitude of 45°24'—this being the one latitude at which the calibration and reference latitudes are identical. Stecchini, without invoking pendulums, claims that there is evidence of a very early Egyptian survey team that worked at this latitude from the mouth of the Danube, cutting across the Crimea, and ending at the foot of the Caucasus.
Example 3: If we go farther north, say to a calibration latitude 4/7ths of the way from the equator to the pole, a sacred latitude to the Egyptians, we will be setting up our pendulum near the Neolithic site of Avebury in England at 51°25' or even Greenwich in London at 51°28' In this case our sidereal-second foot is 0.247092 meters and our reference latitude is to the south at 48°30 Probably there was such a pendulum station at this latitude in England because the English foot can be derived from this foot, and, for very good reasons, the standard reference latitude of the British Navy was 48°30'.
Circles
The ancients used different circle templates depending upon which estimate of pi they employed.
(a) Using 3+1/6 = 3.16667 for pi and a diameter of 24 we get a circumference of 76. This is the template used for the English foot. Eighty times 76 equals 6080 (8 stadia of 760 feet) which is the number of English feet in a minute of arc, which gives us 131,328,000 English feet in the circumference at the reference latitude of 48°30'.
(b) Using 3+1/8 = 3.125 for pi and a diameter of 24 we get a circumference of 75. This is the template used for the Nautical foot. Eighty times 75 equals 6000 (10 stadia of 600 feet) which is the number of nautical feet in a minute of arc, which gives us 129,600,000 Nautical feet in the circumference at the specified reference latitude.
The Roman foot also uses this template: 75x1,800,000 = 135 million, since it is based on a diameter of 43,200,000 feet at its reference latitude.
(c) Using 3+1/7 = 22/7 for pi and a diameter of 21 we get a circumference of 66. This is the template used for the foot which divides the minute of arc into 528
0 feet, since 80 times 66 = 5280 (8 stadia of 660 feet). This foot is exactly 76/66 times the English foot in length and 75/66 times the Nautical foot in length. The value of 5280 English feet in a mile is probably an error introduced into the English metric system by an error in the translation of Ptolemy’s writings from the Arabic which led the unsophisticated Europeans to believe that their planet was smaller than it really was. Early eighteenth century English texts such as Cocker's Arith-metick still assumed that there were 5280 English feet in the minute of arc because of this transcription error.
The Circumference of the Earth
Aristotle’s mathematikoi quoted 400,000 stadia as the circumference of the Earth. This is a stadium of 300 feet of a very common Mesopotamian foot, computed as the 60th part of a nine sidereal-second pendulum that divides the Earth’s circumference into 120 million parts. It is 27/20ths of the standard sidereal-second pendulum calibrated at the 30th degree of latitude, a foot of 0.33294 meters, and was the commonest foot used in Greece at the time according to Stecchini.
Archimedes quoted 300,000 stadia for the circumference. This is a stadium of 300 Roman cubits. The Roman cubit divides the Earth’s circumference into 90 million parts and is 9/5ths of the standard sidereal-second pendulum, 0.44392 meters. It is the 20th part of a six sidereal-
second pendulum. The Roman foot is the 30th part of the same pendulum.
Eratosthenes never had to leave his library. All he had to do was dust off a scroll that Alexander had looted from an Egyptian school. He didn’t even bother to get the latitude of Alexandria right. His quote of 250,000 stadia in the Earth’s circumference is a reference to a stadium of 300 cubits of the standard Great Cubit which divides the Earth’s circumference into 75 million parts. It is the 24th part of a pendulum that beats out 12,000 cycles per sidereal day, 2.16 times the sidereal-second length, 0.53270 meters, and was the standard cubit of Egypt in his day.
Psychohistorical Crisis Page 74