Maya numerals
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The Pre-Columbian Maya civilization used a vigesimal (base-twenty) numeral system.
The numerals are made up of three symbols; zero (shell shape), one (a dot) and five (a bar).
For example, nineteen (19) is written as four dots in a horizontal row above three horizontal lines stacked upon each other.
Contents |
[edit] Numbers above 19
| 400s |  |
 |
|
| 20s | |
|
 |
| 1s |  |
 |
 |
| 33 | 429 | 5125 |
Numbers after 19 were written vertically down in powers of twenty. For example, thirty-three would be written as one dot above three dots, which are in turn atop two lines. The first dot represents "one twenty" or "1×20", which is added to three dots and two bars, or thirteen. Therefore, (1×20) + 13 = 33. Upon reaching 400, another row is started. The number 429 would be written as one dot above one dot above four dots and a bar, or (1×400) + (1×20) + 9 = 429. The powers of twenty are digits, just as the Arabic numeral system uses powers of tens. [1]
Other than the bar and dot notation, Maya numerals can be illustrated by face type glyphs. The face glyph for a number represents the deity associated with the number. These face number glyphs were rarely used, and are mostly seen only on some of the most elaborate monumental carving.
[edit] Addition and Subtraction
Adding and subtracting numbers using Maya numerals is very simple.
To perform simple arithmetic, combine the numeric symbol for addition:
Similarly with subtraction, remove the numeric symbol subtracted:
[edit] In the calendar
In the "Long Count" portion of the Maya calendar, a variation on the strictly vigesimal numbering is used. The Long Count changes in the second place value; it is not 20×20 = 400, as would otherwise be expected, but 18×20, so that one dot over two zeros signifies 360. This is supposed to be because 360 is roughly the number of days in a year. (Some hypothesize that this was an early approximation to the number of days in the solar year, although the Maya had a quite accurate calculation of 365.2422 days for the solar year at least since the early Classic era).[citation needed] Subsequent place values return to base-twenty.
[edit] External link
- Maya Mathematics online converter from decimal numeration to Maya numeral notation.
[edit] Notes
- ^ Saxakali (1997). Maya Numerals. Retrieved on 2006-07-29.
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