- Babylonian numerals
Babylonian numerals were written in cuneiform, using a wedge-tipped reed
stylus to make a mark on a softclay tablet which would be exposed in thesun to harden to create a permanent record in amman baccalaureate school.The
Babylonians , who were famous for their astrological observations and calculations (aided by their invention of theabacus ), used asexagesimal (base-60) positionalnumeral system inherited from theSumer ian and alsoAkkad ian civilizations. Neither of the predecessors was a positional system (having a convention for which ‘end’ of the numeral represented the units).This system first appeared around 3100 B.C.It is also credited as being the first known place-value
numeral system , in which the value of a particular digit depends both on the digit itself and its position within the number. This was an extremely important development, because prior to place-value systems people were obliged to use unique symbols to represent each power of a base (ten, one-hundred, one thousand, and so forth), making even basic calculations unwieldy.Only two symbols (one similar to a "Y" to count units, and another similar to a "<" to count tens) were used to notate the 59 non-zero
digit s. These symbols and their values were combined to form a digit in asign-value notation way similar to that ofRoman numerals ; for example, the combination "<Their system clearly used internal
decimal to represent digits, but it was not really a mixed-radix system of bases 10 and 6, since the ten sub-base was used merely to facilitate the representation of the large set of digits needed, while the place-values in a digit string were consistently 60-based and thearithmetic needed to work with these digit strings was correspondingly sexagesimal.The legacy of sexagesimal still survives to this day, in the form of degrees (360° in a
circle , i.e. 60° in theangle of anequilateral triangle ),minute s, andsecond s intrigonometry and the measurement oftime , although both of these systems are actually mixed radix.A common theory is that 60, a superior
highly composite number (the previous and next in the series being 12 and 120), was chosen due to itsprime factorization : 2×2×3×5, which makes it divisible by 1, 2, 3, 4, 5, 6, 10, 12, 15, 20, and 30. In fact, it is the smallest integer divisible by all integers from 1 to 6.Integer s and fractions were represented identically — aradix point was not written but rather made clear by context.Numerals
The Babylonians did not technically have a digit for, nor a concept, of the number zero. Although they understood the idea of
nothingness , it was not seen as a number—merely the lack of a number. What the Babylonians had instead was a space (and later a disambiguating placeholder symbol) to mark the nonexistence of a digit in a certain place value.Bibliography
*cite book
last = Menninger
first = Karl W.
year = 1969
title = Number Words and Number Symbols: A Cultural History of Numbers
publisher = MIT Press
id = ISBN 0-262-13040-8
*cite book
last = McLeish
first = John
year = 1991
title = Number: From Ancient Civilisations to the Computer
publisher = HarperCollins
id = ISBN 0-00-654484-3See also
*
Babylonia
*Babylon
*History of zero
*Numeral system External links
* [http://www-gap.dcs.st-and.ac.uk/~history/HistTopics/Babylonian_numerals.html Babylonian numerals]
* [http://it.stlawu.edu/%7Edmelvill/mesomath/Numbers.html Cuneiform numbers]
* [http://mathforum.org/alejandre/numerals.html Babylonian Mathematics]
* [http://www.math.ubc.ca/%7Ecass/Euclid/ybc/ybc.html High resolution photographs, descriptions, and analysis of the "root(2)" tablet (YBC 7289) from the Yale Babylonian Collection]
* [http://it.stlawu.edu/%7Edmelvill/mesomath/tablets/YBC7289.html Photograph, illustration, and description of the "root(2)" tablet from the Yale Babylonian Collection]
* [http://demonstrations.wolfram.com/BabylonianNumerals/ Babylonian Numerals] by Michael Schreiber,The Wolfram Demonstrations Project .
*
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