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This system results in "two thirds" for 2 ⁄ 3 and "fifteen thirty-seconds" for 15 ⁄ 32. This system is normally used for denominators less than 100 and for many powers of 10. Examples include "six ten-thousandths" for 6 ⁄ 10,000 and "three hundredths" for 0.03.
After all natural numbers comes the first infinite ordinal, ω, and after that come ω+1, ω+2, ω+3, and so on. (Exactly what addition means will be defined later on: just consider them as names.) After all of these come ω·2 (which is ω+ω), ω·2+1, ω·2+2, and so on, then ω·3, and then later on ω·4.
Exception to this rule are the ordinal numerals first, second and third. If the basic word ends on the letter t and we add the suffixes for ordinal numerals, then a double t is generally produced. For the ordinal numerals seventh and eighth, we reduce some of the letters of the basic number, for example: osum > osmi (eighth), sedum > sedmi ...
The Infobox — added at the top of the page using the template {{Infobox number}} — should include the symbol of the number in all known numeral systems for which Unicode characters exist, as long as it fits within a reasonable amount of space (examples include Egyptian, Roman, Tamil, Cyrillic, and Burmese; refer to the Infobox at the article for 1 for an example with relevant Wiki markup).
Add the third page, and it is 23:7 in favour of this article. Four pages, 30:10. Five pages has the total at 39:11 - though that extra result refers to the set theory concept specifically as "transfinite ordinal numbers". The ratio therefore falls somewhere between 3:1 and 4:1 in favour of the sense described on this page.
The dot is used as a separator, followed by space and matches the convention of pronouncing day, month and year as ordinal numbers (31. 12. 2006.). Note that dot is placed after the year as well. The space is, however, optional, as dates could be written and without the space (for example 31.12.2006.).
At that point it should meet ω which should be directly under 0. The spoke beginning with 0 would continue with ω, ω 2, ω 3, etc. until it reaches the center which would be ω ω. The spoke beginning with 1 would continue with ω·2, ω 2 ·2 ω 3 ·2, etc.. Between these, new spokes should begin in the second turn, ω+1 would continue with ...
[3] 6 is the largest of the four all-Harshad numbers. [ 4 ] 6 is the 2nd superior highly composite number , [ 5 ] the 2nd colossally abundant number , [ 6 ] the 3rd triangular number , [ 7 ] the 4th highly composite number , [ 8 ] a pronic number , [ 9 ] a congruent number , [ 10 ] a harmonic divisor number , [ 11 ] and a semiprime .