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3 mi 1: 三十 mi 1 so 1 (30) 4 yo 2: 四十 yo 2 so 1 (40), 四人 yo 2 tari (4 people) 5 itu: 五年 ituto 2 se (5 years) 6 mu: 六爪 mutuma (6 claws) 7 nana: 七瀬 nanase (many rapids) Often used to mean many. 8 ya: 八雲 yakumo 1 (many clouds) Often used to mean many. 9 ko 2 ko 2 no 2: 九柱 ko 2 ko 2 no 2 pasira (9 nobles / gods) 10 to ...
The numerals 0–9 have independent and modifier forms. The modifiers are used to form powers of 10 or modify the sum of objects. In some cases, there is more than one word for a numeral reflecting the Javanese register system of ngoko (low-register) and krama (high-register), as well as words from a literary form of Javanese called kawi and derived from Old Javanese.
The list on the right shows the Fibonacci sequence: 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377. The 2, 8, and 9 resemble Arabic numerals more than Eastern Arabic numerals or Indian numerals . Leonardo Fibonacci was a Pisan mathematician who had studied in the Pisan trading colony of Bugia , in what is now Algeria , [ 15 ] and he ...
The Eastern Arabic numerals, also called Indo-Arabic numerals or Arabic-Indic numerals as known by Unicode, are the symbols used to represent numerical digits in conjunction with the Arabic alphabet in the countries of the Mashriq (the east of the Arab world), the Arabian Peninsula, and its variant in other countries that use the Persian numerals on the Iranian plateau and in Asia.
The numerals 1–10 have basic, combining, and independent forms, many of which are formed through reduplication. The combining forms are used to form higher numbers. In some cases there is more than one word for a numeral, reflecting the Balinese register system; halus (high-register) forms are listed in italics.
The Abjad numerals are a decimal numeral system in which the 28 letters of the Arabic alphabet are assigned numerical values. From Wikipedia, the free encyclopedia.
English eight, from Old English eahta, æhta, Proto-Germanic *ahto is a direct continuation of Proto-Indo-European *oḱtṓ(w)-, and as such cognate with Greek ὀκτώ and Latin octo-, both of which stems are reflected by the English prefix oct(o)-, as in the ordinal adjective octaval or octavary, the distributive adjective is octonary.
The Hindu–Arabic system is designed for positional notation in a decimal system. In a more developed form, positional notation also uses a decimal marker (at first a mark over the ones digit but now more commonly a decimal point or a decimal comma which separates the ones place from the tenths place), and also a symbol for "these digits recur ad infinitum".