![]() ![]() Notice this argument almost contradicts itself since it assumes 10 as the basic unit for division! Now there are sixty of these basic units in a circle so again we have the proposed reason for choosing 60 as a base. Now an angle of an equilateral triangle is 60° so if this were divided into 10, an angle of 6° would become the basic angular unit. For example one theory is that an equilateral triangle was considered the fundamental geometrical building block by the Sumerians. Another hypothesis concerns the fact that the sun moves through its diameter 720 times during a day and, with 12 Sumerian hours in a day, one can come up with 60. Again the idea is not that convincing since the Sumerians certainly knew that the year was longer than 360 days. That the year was thought to have 360 days was suggested as a reason for the number base of 60 by the historian of mathematics Moritz Cantor. The suggestion that 60 is the product of the number of months in the year (moons per year ) with the number of planets (Mercury, Venus, Mars, Jupiter, Saturn ) again seems far fetched as a reason for base 60. Several theories have been based on astronomical events. However although Neugebauer may be correct, the counter argument would be that the system of weights and measures was a consequence of the number system rather than visa versa. For example the decimal 12345 representsġ × 6 0 3 57 × 6 0 2 46 × 60 40 1 \times 60^\normalsize 3 2 as basic fractions. Now given a positional system one needs a convention concerning which end of the number represents the units. Here are the 59 symbols built from these two symbols This is because the 59 numbers, which go into one of the places of the system, were built from a 'unit' symbol and a 'ten' symbol. Now although the Babylonian system was a positional base 60 system, it had some vestiges of a base 10 system within it. However, rather than have to learn 10 symbols as we do to use our decimal numbers, the Babylonians only had to learn two symbols to produce their base 60 positional system. Now of course this comment is based on knowledge of our own decimal system which is a positional system with nine special symbols and a zero symbol to denote an empty place. Often when told that the Babylonian number system was base 60 people's first reaction is: what a lot of special number symbols they must have had to learn. Some would argue that it was their biggest achievement in mathematics. Yet neither the Sumerian nor the Akkadian system was a positional system and this advance by the Babylonians was undoubtedly their greatest achievement in terms of developing the number system. From the number systems of these earlier peoples came the base of 60, that is the sexagesimal system. Certainly in terms of their number system the Babylonians inherited ideas from the Sumerians and from the Akkadians. We give a little historical background to these events in our article Babylonian mathematics. I’m not sure I can offer much trouble-shooting advice if you can’t get this to work on your computer.The Babylonian civilisation in Mesopotamia replaced the Sumerian civilisation and the Akkadian civilisation. It took me quite a while to get all this to work. ![]() ![]() I tried for a while, but couldn’t get them to work.ĭisclaimer: I know my way around TeX pretty well, but I’m not a power user. I’d love to be able to do something similar with the Mayan numbers. If you would like to give this a try, download my. To create a number board with the Chinese counting rods representing 123 I type To express 123 in cuneiform all I have to write is Because the syntax was often messy, I spent a while burying the complicated TeX in the headers so that the numbers would be easy to work with in the document.įor example, to generate the Egyptian hieroglyphics for 123 I write In the end I was able to typeset Egyptian hieroglyphics, Babylonian cuneiform, and Chinese rod numerals. It was a fun (although time consuming) exercise. It quickly became apparent that, because fonts are involved, I would have to use XeTeX rather than LaTeX. As I was writing up the first homework assignment it occured to me that I should investigate whether these numbers could be typeset using LaTeX. We are beginning with a brief discussion of ancient number systems: Egyptian, Babylonian, Mayan, Chinese, Incan, Greek, Roman, and Hindu-Arabic. I am teaching a history of mathematics class this semester. ![]()
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