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An Egyptian Mathematical Papyrus

Egyptian mathematics refers to the style and methods of mathematics performed in Ancient Egypt.Egyptian addition and multiplication employed the method of doubling and halving a known number to approach the solution. Subtraction and division employed other methods that are still not completely understood. The method of false position may or may not have been used for division and simple algebra problems. By using an Old Kingdom base 10 binary number system, Middle Kingdom unit fractions, and tables of common 2/nth results, scribes solved several complex mathematical problems, 84 of which are outlined in the Rhind Mathematical Papyrus. The traditional view of Old Kingdom 'additive' scholars reports that Egyptians confined themselves to applications of practical arithmetic with many problems addressing how a number of loaves can be divided equally between a number of men. The problems in the Moscow and Rhind Mathematical Papyrus are expressed in an instructional context, though three abstract definitions of number, and other higher forms of arithmetic have been reported by scholars. The three abstract definitions are in the Akhmim Wooden Tablet, the EMLR and the Rhind Mathematical Papyrus. The higher forms of arithmetic included the use of Egyptian fraction series as non-additive subtraction and division remainders. The remainders are preceeded by a binary series and followed by a scaling factor in the Akhmim Wooden Tablet, the RMP and other texts.

Overview

Circa 2700 BC Egyptians introduced the earliest fully developed base 10 numeration system. Though it was not a positional system, it allowed the use of large numbers and also fractions in the form of unit fractions and Eye of Horus fractions, or binary fractions. [1]

By 2700 BC, Egyptian construction techniques included precision surveying, marking north by the sun's location at noon. Clear records began to appear by 2000 BC citing approximations for π and square roots. Exact statements of number, written arithmetic tables, algebra problems, and practical applications with weights and measures also began to appear around 2000 BC, with several problems solved by abstract arithmetic methods.

The AWT, for example, lists five example divisions of a unit of volume called a hekat, beginning with one hekat unity valued as 64/64. The division of the hekat unity by 3, 7, 10, 11 and 13 were all exact. Scribal notes within the tablet(s) report five two-part answers. The first half of the answer cited a binary quotient. The scribe exactly partitioned one hekat (64/64), by 3, and found the correct quotient 21 with a correct remainder of 1. The scribe re-wrote 21 as 16 + 4 + 1, such that (16 + 4 + 1)/64 became 1/4 + 1/16 + 1/64, a binary series. In addition the scribe and correctly scaled the remainder one (1) to 1/320th (ro) units or 1/(192) = (5/3)*1/320 = (1 + 2/3)*1/320.

The scribe combined the quotient and remainder into one statement. The 1/3rd of a hekat answer was written as: 1/4 1/16 1/64 1 2/3 ro. Addition and multiplication signs were not used by the scribe (with the series of mostly unit fractions written from left to right). The AWT scribe proved all of his results by multiplying the five answers by the initial divisors, finding the initial hekat unity value of(64/64). The AWT scribe wrote out this exact partitioning method in more detail than followed by Ahmes and other Middle Kingdom scribes. Ahmes' steps did not include the proof aspect. However, Ahmes' partitioning steps, appearing 29 times in the RMP, were identitical to the division steps used in the AWT.

Hana Vymazalova published in 2002 a fresh copy of the AWT that showed that all five AWT divisions had been exact, by first parsing the proof steps, returning all five divsion answers to 64/64. Vymazalova thereby updated Daressy's 1906 incomplete discussion of the subject that had only found 1/3, 1/7 and 1/10 to be exact.

Beyond the fact that (64/64)/n = Q/64 + (5R/n)*ro, with Q = quotient and R = remainder, fairly states the 2,000 BCE scribal form of hekat division, two additional facts reveal early scribal thinking. One fact reveals that whenever the divisor n was between 1/64 and 64 a limit of 64 had been reached. RMP 80 details this two-part limit. Second, to go beyond the divisor n = 64 limit, hin, ro and other sub-units of the hekat were developed. Gillings summaries the RMP data with 29 examples in an appendix, thereby contrasting the two-part statements to the equivalent one-part hin statements. The medical texts and its 2,000 examples also used the extended one-part formats following: 10/n hin for 1/10th of a hekat, and 320/n ro for 1/320th of a hekat for prescription ingredients.

Ahmes was able to go beyond the 64 divisor limit and its two-part remainder arithmetic in other ways, one being to increase the size of the numerator. The two-part hekat partitioning method was described in problem 35 as 100 hekat divided by n= 70. Ahmes wrote 100*(64/64)/70 = (6400/64)/70 = 91/64 + 30/(70*64). The quotient was written as (64 + 16 + 8 + 2 + 1)/64 =(1 + 1/4 + 1/8 + 1/32+ 1/64). Ahmes then wrote the remainder part as (150/70)*1/320 = (2 + 1/7)ro. Finally, the combined 1 1/4 1/8 1/32 1/64 2 1/7 ro answer was written down following the right to left, using no arithmetic addition or multiplication signs, older notation rules set down in the 350 year older Akhmim Wooden Tablet.

Sources

Our understanding of ancient Egyptian mathematics has been impeded by the reported paucity of available sources. The most famous one is the Rhind, or Ahmes, Mathematical Papyrus (RMP), a text that can be read by comparing many of its elements against other texts, i.e., the EMLR and the Akhmim Wooden tablets. The RMP dates from the Second Intermediate Period (circa 1650 BC), but the author identifies it as a copy of a now lost Middle Kingdom papyrus. The Rhind Mathematical Papyrus contains a table of 2/n Egyptian fraction series (101 entries) and 84 problems. It uses a form of arithmetic that stresses unit fractions. The fractions were often preceeded by a whole number. Taking the whole numbers and unit fractions together as one statement, as quotients and remainders, or simply remainder arithmetic. Taking all the new ancient text comparisons into consideration, there is no longer a severe lack of available Egyptian math sources.

The RMP also includes formulas and methods for areas, and the arithmetic operations for addition, subtraction, multiplication and division of unit fractions. The RMP contains evidence of other mathematical knowledge, [2] including composite and prime numbers; arithmetic, geometric and harmonic means; and simplistic understandings of both the Sieve of Eratosthenes and perfect number theory[2]. It also shows how to solve first order linear equations [3] as well as summing arithmetic and geometric series. [4]

Henry Rhind's estate donated the Rhind papyrus to the British Museum in 1863. Also included in the donation was the Egyptian Mathematical Leather Roll (EMLR), dating from the Middle Kingdom era. It contains 26 1/n Egyptian fraction series,

The Berlin Papyrus, written around 1300 BC, shows that ancient Egyptians had solved two second-order Diophantine equations, though the Berlin method for solving x^2 + y^2 = 100 has not been confirmed in a second hieratic text. [5]

Other sources are the Moscow Mathematical Papyrus (MMP), the Reisner Papyrus, and the Akhmim (Cairo) Wooden Tablet (AWT), and several other texts including medical prescriptions.

Many of these texts contain "word problems".

Numerals

Two number systems were used in ancient Egypt. One, written in Hieroglyphs, was a decimal based tally system with separate symbols for 10, 100, 1000, etc, as Roman numerals were later written, and hieratic unit fractions. The second, written in a new ciphered one-number-to-one-symbol system was a digital system that was not similar to hieroglyphic system. The hieroglyphic number system existed from at least the Early Dynastic Period. The hieratic system differed from the hieroglyphic system beyond a use of simplifying ligatures for rapid writing and began around 2150 BC. Hieratic numerals used one symbol for each number replacing the tallies that had been used to denote multiples of a unit. For example, two symbols had been used to write three, thirty, three hundred, and so on, in a system that was superceded by the hieratic method. Later hieroglyphic numeration was modified and adopted by the Romans for official uses, and Egyptian fractions in everyday situations.

The Rhind Mathematical Papyrus was written in hieratic. It contains examples of how the Egyptians did their mathematical calculations. Fractions were denoted by placing a line over the letter n associated with the number being written, as 1/n. This method of writing numbers came to dominate the Ancient Near East, with Greeks 1,500 years later using two of their alphabets, Ionian and Doric, to cipher all of their numerals, alpha = 1, beta = 2 and so forth. Concerning fractions, Greeks wrote 1/n as n', so Greek numeration and problem-solving adopted or modified Egyptian numeration, arithmetic and other aspects of Egyptian math.

Multiplication

Egyptian multiplication was done by repeated doubling of the number to be multiplied (the multiplicand), and choosing which of the doublings to add together (essentially a form of binary arithmetic), a method that links to the Old Kingdom. The multiplicand was written next to the figure 1; the multiplicand was then added to itself, and the result written next to the number 2. The process was continued until the doublings gave a number greater than half of the multiplier. Then the doubled numbers (1, 2, etc.) would be repeatedly subtracted from the multiplier to select which of the results of the existing calculations should be added together to create the answer.

As a short cut for larger numbers, the multiplicand can also be immediately multiplied by 10, 100, etc.

For example, Problem 69 on the Rhind Papyrus (RMP) provides the following illustration, as if Hieroglyphic symbols were used (rather than the RMP's actual hieratic script).

To multiply 80 × 14
Egyptian calculation Modern calculation
Result Multiplier Result Multiplier
V20 V20 V20 V20
V20 V20 V20 V20
Z1
80 1
V1 V1 V1 V1
V1 V1 V1 V1
V20
/ 800 10
V20 V20 V20
V20 V20 V20
V1
Z1 Z1
160 2
V20
V20
V1 V1
V1
Z1 Z1 Z1 Z1
/ 320 4
V20
V20
V1M12
[= hiero] 1120 14

The / denotes the intermediate results that are added together to produce the final answer.

Hieratic and Middle Kingdom math followed this form of hieroglyphic multiplication.

Subtraction defined in the Egyptian Mathematical Leather Roll (EMLR), an 1800 BC document, included four additive or identity methods, followed by one non-additive, abstract, method that was used five to fifteen times for the 26 EMLR series listed, that looked like this:

1/pq = (1/A)* (A/pq)

with A = 3, 4, 5, 7, 25, citing A = (p + 1) 10 times.

1/8 was written using A = (2 + 1)= 3, the A = (p + 1) case, as used in the RMP 24 times, seeing p = 2, q = 4 and A = 25, following

A = 3: 1/8 = (1/3)*(3/8) = 1/3*(1/4 + 1/8) = 1/12 + 1/24

A = 25: 1/8 = 1/25*(25/8) = 1/5*(25/40)= 1/5 *(24/40 + 1/40)

           = 1/5*(3/5 + 1/40) = 1/5*(1/5 + 2/5 + 1/40)
           = 1/5 *(1/5 + 1/3 + 1/15 + 1/40)
           = 1/25 + 1/15 + 1/75 + 1/200

with the out-of-order 1/25 + 1/15 sequence marking the scribal method of partition.

Confirmation of the EMLR (1/A)* (A/pq), with A = (p + 1) rule is found 24 times in the RMP 2/nth table, using the form

2/pq = (2/A)* (A/pq), with A = (p + 1)

example, 2/27, a = 3, q = 9

2/27 = 2/(3 + 1)*(3 + 1)/9 = 1/4*(1/3 + 1/9) = 1/12 + 1/36

Another subtraction method is seen in the RMP 2/nth table as first suggested by F. Hultsch in 1895, and confirmed by E.M. Bruins in 1944, or

2/p - 1/A = (2A - p)/Ap

or,

2/p = 1/A + (2A -p)/Ap

where the divisors of A, from the first partition, were used to additively find (2A - p), thereby exactly solving (2A -p)/Ap.

For example,

2/19 - 1/12 = (24 - 19)/(12*19)

with the divisors of 12 = 6, 4, 3, 2, 1 being inspected to find (24 - 19) = 5 taken only from the divisors of 12. Optimally (3 + 2) was selected, by Ahmes and other scribes, over (4 + 1) such that,

2/19 = 1/12 + (3 + 2)/(12*19) = 1/12 + 1/76 + 1/114

Fractions

Rational numbers could also be expressed, but only as sums of unit fractions, i.e. sums of reciprocals of positive integers, 2/3, and 3/4. The hieroglyph indicating a fraction looked like a mouth, which meant "part", and fractions were written with this fractional solidus, i.e. the numerator 1, and the positive denominator below. Special symbols were used for 1/2 and for two non-unit fractions, 2/3 (used often) and 3/4 (used less often).

Problem 25 on the Rhind Papyrus may have used the method of false position to solve the problem "a quantity and its half added together become 16; what is the quantity?" (i.e., in modern algebraic notation, what is x if xx=16).

Assume 2

       1 2 /
       ½ 1 /
Total 1½ 3

As many times as 3 must be to give 16, so many times must 2 be multiplied to give the answer.

     1      3 /
     2      6
     4     12 /
     2/3    2
     1/3    1 /

Total 5 1/3 16

So:

 1   5 1/3 (1 + 4 + 1/3)
 2  10 2/3

The answer is 10 2/3.

Check -

     1   10 2/3
     ½    5 1/3

Total 1½ 16

A more likely and direct approach to solve this class of problem is given by: x + (1/2)x = 16, using these steps

1. (3/2)x = 16, 2. x = 32/3, 3. x = 10 2/3.

Problem 31 sets the problem "q quantity, its 1/3, its 1/2 and its 1/7, added together, become 33; what is the quantity?" In modern algebraic notation, "what is x if x + 1/3 x + 1/2 x + 1/7 x =33?" The answer is 14 1/4 1/56 1/97 1/194 1/388 1/679 1/776, or 14 and 28/97. To solve the problem as Ahmes wrote his answer 28/97 had to be broken up into 2/97 and 26/97, and solved the two separate vulgar fraction conversion problems using Hultsch-Bruins (without using false position, as other algebra problem may have been solved).

The remainder arithmetic solution, the historical method that is most likely, for x + (1/3)x + (1/2)x + (1/7)x = 33 looks like this:

1. 97/42 x = 33, 2. x = 1386/97, and 3. x = 14 + 28/97.

with, 2/97 - 1/56 = (112 - 97)/(56*97) = (8 + 7)/(56*97) = 1/679 1/776,

and 26/97 - 1/4 = (104-97/(4*97) = (4 + 2 + 1)/(4*97)= 1/97 1/194 1/388,

or,

2/97 = 1/56 1/670 1/776,

26/97 = 1/4 1/97 1/194 1/388

such that, writing out x = 14 + 28/97 in an ordered unit fraction series

4. x = 14 1/4 1/56 1/97 1/194 1/388 1/679 1/776, as written by Ahmes.

Geometry

Problem 50 of the Ahmes papyrus uses these methods to calculate the area of a circle, according to a rule that the area is equal to the square of 8/9 of the circle's diameter (so 1/9 is subtracted from the diameter, and the resulting figure is multiplied by itself, using the doubling method). This assumes that π is 4×(8/9)² (or 3.160493...), with an error of slightly over 0.63 percent. This value was slightly less accurate than the calculations of the Babylonians (25/8 = 3.125, within 0.53 percent), but was not otherwise surpassed until Archimedes' approximation of 211875/67441 = 3.14163, which had an error of just over 1 in 10,000).

Problem 48 involved using a square with side 9 units. This square was cut into a 3x3 grid. The diagonal of the corner squares were used to make an irregular octagon with an area of 63 units. This gave a second value for π of 3.111...

The two problems together indicate a range of values for Pi between 3.11 and 3.16.

A problem in the Moscow Mathematical Papyrus considered finding the volume of a truncated pyramid with sides of 2 and 4 units and a height of 6: "Add together this 16 with this 8 and this 4. You get 28. Compute a third of 6. You get 2. Multiply 28 by 2. You get 56. Behold: it is 56. You have found right." [6]

Notes

  1. [1]
  2. 2.0 2.1 [2]
  3. [3]
  4. [4]
  5. [5]
  6. Van der Waerden, 1961, Plate 5

External links

Further reading

  • Boyer, Carl B., "History of Mathematics", John Wiley, 1968. Reprint Princeton U. Press (1985).
  • Chace, Arnold Buffum. 1927–1929. The Rhind Mathematical Papyrus: Free Translation and Commentary with Selected Photographs, Translations, Transliterations and Literal Translations. 2 vols. Classics in Mathematics Education 8. Oberlin: Mathematical Association of America. (Reprinted Reston: National Council of Teachers of Mathematics, 1979). ISBN 0-87353-133-7
  • Clagett, Marshall. 1999. Ancient Egyptian Science: A Source Book. Volume 3: Ancient Egyptian Mathematics. Memoirs of the American Philosophical Society 232. Philadelphia: American Philosophical Society. ISBN 0-87169-232-5
  • Couchoud, Sylvia. 1993. Mathématiques égyptiennes: Recherches sur les connaissances mathématiques de l'Égypte pharaonique. Paris: Éditions Le Léopard d'Or
  • Daressy, G. " Ostraca, Cairo Museo des Antiquities Egyptiennes Catalogue General Ostraca hieraques, vol 1901, number 25001-25385.
  • Gillings, Richard J., "Mathematics in the Time of the Pharaohs", MIT, Press, 1972 (Dover reprints available).
  • Neugebauer, Otto, "Exact Sciences in Antiquity" Harper & Row, 1962, Dover Reprint (1969).
  • Peet, Thomas Eric. 1923. The Rhind Mathematical Papyrus, British Museum 10057 and 10058. London: The University Press of Liverpool limited and Hodder & Stoughton limited
  • Robins, R. Gay. 1995. "Mathematics, Astronomy, and Calendars in Pharaonic Egypt". In Civilizations of the Ancient Near East, edited by Jack M. Sasson, John R. Baines, Gary Beckman, and Karen S. Rubinson. Vol. 3 of 4 vols. New York: Charles Schribner's Sons. (Reprinted Peabody: Hendrickson Publishers, 2000). 1799–1813
  • Robins, R. Gay, and Charles C. D. Shute. 1987. The Rhind Mathematical Papyrus: An Ancient Egyptian Text. London: British Museum Publications Limited. ISBN 0-7141-0944-4
  • Sarton, George "Introduction to the History of Science", Vol I, Willians & Williams, 1927.
  • Struve, Vasilij Vasil'evič, and Boris Aleksandrovič Turaev. 1930. Mathematischer Papyrus des Staatlichen Museums der Schönen Künste in Moskau. Quellen und Studien zur Geschichte der Mathematik; Abteilung A: Quellen 1. Berlin: J. Springer
  • Van der Waerden, B.L., "Science Awakening", Oxford U. Press, 1961.
  • Vymazalova, Hana, "Wooden Tablets from Cairo .... Archiv Orientalni, Vol I, pages 27-42, 2002.

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