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The ancient Egyptian units of measurement are those used by the dynasties of ancient Egypt prior to its incorporation in the Roman Empire and general adoption of Roman, Greek, and Byzantine units of measurement. The units of length seem to have originally been anthropic, based on various parts of the human body, although these were standardized using cubit rods, strands of rope, and official measures maintained at some temples.
Egyptian units of length are attested from the Early Dynastic Period. Although it dates to the 5th dynasty, the Palermo stone recorded the level of the Nile River during the reign of the Early Dynastic pharaohDjer, when the height of the Nile was recorded as 6 cubits and 1 palm (about 3.217 m or 10 ft 6.7 in). A Third Dynasty diagram shows how to construct an elliptical vault using simple measures along an arc. The ostracon depicting this diagram was found near the Step Pyramid of Saqqara. A curve is divided into five sections and the height of the curve is given in cubits, palms, and digits in each of the sections.
At some point, lengths were standardized by cubit rods. Examples have been found in the tombs of officials, noting lengths up to remen. Royal cubits were used for land measures such as roads and fields. Fourteen rods, including one double-cubit rod, were described and compared by Lepsius. Two examples are known from the Saqqara tomb of Maya, the treasurer of Tutankhamun. Another was found in the tomb of Kha (TT8) in Thebes. These cubits are about 52.5 cm (20.7 in) long and are divided into palms and hands: each palm is divided into four fingers from left to right and the fingers are further subdivided into ro from right to left. The rules are also divided into hands so that for example one foot is given as three hands and fifteen fingers and also as four palms and sixteen fingers.
Cubit rod from the Turin Museum.
Surveying and itinerant measurement were undertaken using rods, poles, and knotted cords of rope. A scene in the tomb of Menna in Thebes shows surveyors measuring a plot of land using rope with knots tied at regular intervals. Similar scenes can be found in the tombs of Amenhotep-Sesi, Khaemhat and Djeserkareseneb. The balls of rope are also shown in New Kingdom statues of officials such as Senenmut, Amenemhet-Surer, and Penanhor.
The digit was also subdivided into smaller fractions of 1⁄2, 1⁄3, 1⁄4, and 1⁄16. Minor units include the Middle Kingdom reed of 2 royal cubits, the Ptolemaic xylon (Ancient Greek: ξύλον, lit. "timber") of three royal cubits, the Ptolemaic fathom (Ancient Greek: ὀργυιά, orgyiá; Ancient Egyptian: ḥpt; Coptic: ϩⲡⲟⲧ, hpot) of four lesser cubits, and the kalamos of six royal cubits.
Area
Records of land area also date to the Early Dynastic Period. The Palermo stone records grants of land expressed in terms of kha and setat. Mathematical papyri also include units of land area in their problems. For example, several problems in the Moscow Mathematical Papyrus give the area of rectangular plots of land in terms of setat and the ratio of the sides and then require the scribe to solve for their exact lengths.
The setat was the basic unit of land measure and may originally have varied in size across Egypt's nomes. Later, it was equal to one square khet, where a khet measured 100 cubits. The setat could be divided into strips one khet long and ten cubit wide (a kha).
During the Ptolemaic period, the cubit strip square was surveyed using a length of 96 cubits rather than 100, although the aroura was still figured to compose 2,756.25 m. A 36 square cubit area was known as a kalamos and a 144 square cubit area as a hamma. The uncommon bikos may have been 1+1⁄2 hammata or another name for the cubit strip. The Coptic shipa (ϣⲓⲡⲁ) was a land unit of uncertain value, possibly derived from Nubia.
Units of volume appear in the mathematical papyri. For example, computing the volume of a circular granary in RMP 42 involves cubic cubits, khar, heqats, and quadruple heqats. RMP 80 divides heqats of grain into smaller henu.
Problem 80 on the Rhind Mathematical Papyrus: As for vessels (debeh) used in measuring grain by the functionaries of the granary: done into henu, 1 hekat makes 10; 1⁄2 makes 5; 1⁄4 makes 2+1⁄2; etc.
Green glazed faience weight discovered at Abydos, inscribed for the high steward Aabeni during the late Middle KingdomSerpentine weight of 10 daric, inscribed for Taharqa during the 25th Dynasty
Weights were measured in terms of deben. This unit would have been equivalent to 13.6 grams in the Old Kingdom and Middle Kingdom. During the New Kingdom however it was equivalent to 91 grams. For smaller amounts the qedet (1⁄10 of a deben) and the shematy (1⁄12 of a deben) were used.
The qedet or kedet is also often known as the kite, from the Coptic form of the same name (ⲕⲓⲧⲉ or ⲕⲓϯ). In 19th-century sources, the deben and qedet are often mistakenly transliterated as the uten and kat respectively, although this was corrected by the 20th century.
The Egyptian civil calendar in place by Dynasty V followed regnal eras resetting with the ascension of each new pharaoh. It was based on the solar year and apparently initiated during a heliacal rising of Sirius following a recognition of its rough correlation with the onset of the Nile flood. It followed none of these consistently, however. Its year was divided into 3 seasons, 12 months, 36 decans, or 360 days with another 5 epagomenal days—celebrated as the birthdays of five major gods but feared for their ill luck—added "upon the year". The Egyptian months were originally simply numbered within each season but, in later sources, they acquired names from the year's major festivals and the three decans of each one were distinguished as "first", "middle", and "last". It has been suggested that during the Nineteenth Dynasty and the Twentieth Dynasty the last two days of each decan were usually treated as a kind of weekend for the royal craftsmen, with royal artisans free from work. This scheme lacked any provision for leap yearintercalation until the introduction of the Alexandrian calendar by Augustus in the 20s BC, causing it to slowly move through the Sothic cycle against the solar, Sothic, and Julian years. Dates were typically given in a YMD format.
The civil calendar was apparently preceded by an observational lunar calendar which was eventually made lunisolar and fixed to the civil calendar, probably in 357 BC. The months of these calendars were known as "temple months" and used for liturgical purposes until the closing of Egypt's pagan temples under Theodosius I in the AD 390s and the subsequent suppression of individual worship by his successors.
Smaller units of time were vague approximations for most of Egyptian history. Hours—known by a variant of the word for "stars"—were initially only demarcated at night and varied in length. They were measured using decan stars and by water clocks. Equal 24-part divisions of the day were only introduced in 127 BC. Division of these hours into 60 equal minutes is attested in Ptolemy's 2nd-century works.
Alternative representations of the 1⁄8 setat include
Z30
.
Alternative representations of the quarter-setat include
.
Alternative representations of the half-setat include
, pronounced gs,
, pronounced rmn, and
.
Alternative representations of the thousand-ta measure include
,
, and
.
Parker extensively developed the thesis that the predynastic lunar calendar was already lunisolar, using intercalary months every 2 or 3 years to maintain Sirius's return to the night sky in its twelfth month, but no evidence of such intercalation exists predating the schematic lunisolar calendar developed in 4th century BC.
Variant representations of hour include
,
,
,
,
,
,
(properly
N46B
with a star at the end of the line and a second shorter line to its right),
,
,
,
,
,
,
,
, and
. As nwt, hour also appears as
.
Variant representations of day include
,
, and
. In the plural sww, it appears as
and
. As hrw ("daytime", "day"), it appears as
,
,
,
,
,
,
,
,
,
,
,
,
, and
. As rꜥ ("sun", "day"), it appears as
,
, and
. As ḏt, day appears as
, although properly the loaf and stroke are smaller and fit within the curve of the snake.
Variant representations of decan include
.
Variant representations of month include
,
,
,
,
,
,
, and
. In the plural ꜣbdtyw, it appears as
. As ꜣbdw, month appears as
.
In the plural ı͗trw, "seasons" appears as
(properly
M5B
with a triangular leaf),
, and
, although properly the palm branches of the last are reversed. As tr ("time", "period", "season"), it appears as
Abd el-Mohsen Bakir (1978), Hat-'a em Sbayet r-en Kemet: An Introduction to the Study of the Egyptian Language: A Semitic Approach, General Egyptian Book Organization, p. 70.
^ Katz, Victor J.; et al., eds. (2007), The Mathematics of Egypt, Mesopotamia, China, India, and Islam: A Sourcebook, Princeton University Press, p. 17, ISBN978-0-691-11485-9.
"Weights and Measures", Encyclopaedia Britannica, 9th ed., vol. XXIV, 1888.
