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| has gloss | eng: Bijective numeration is any numeral system that establishes a bijection between the set of non-negative integers and the set of finite strings over a finite set of digits. In particular, bijective base-k numeration represents a non-negative integer by using a string of digits from the set 1, 2, ..., k} (k ≥ 1) to encode the integer's expansion in powers of k. (Although slightly misleading, this is the terminology in the literature. Ordinary base-k numeration also establishes a bijection, but not in the required sense, due to the absence of leading zeros; for example, there are only 90 two-digit decimal numerals, rather than the required 102.) Bijective base-k numeration is also called k-adic notation, not to be confused with the p-adic number system. Bijective base-1 is also called... |
| lexicalization | eng: Bijective numeration |
| instance of | (noun) a numeration system in which a real number is represented by an ordered set of characters where the value of a character depends on its position positional notation, positional representation system |
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| French | |
| has gloss | fra: Le système décimal sans zéro est un système de numération expérimental visant à montrer que l'humanité aurait pu développer un système positionnel ne faisant pas intervenir le symbole zéro. |
| lexicalization | fra: Systeme decimal sans zero |
| lexicalization | fra: Système décimal sans zéro |
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