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Along with numerals, and special-purpose words like some, any, much, more, every, and all, they are quantifiers. Quantifiers are a kind of determiner and occur in many constructions with other determiners, like articles: e.g., two dozen or more than a score. Scientific non-numerical quantities are represented as SI units.
Most determiners are very basic in their morphology, but some are compounds. [1]: 391 A large group of these is formed with the words any, every, no, and some together with body, one, thing, or where (e.g., anybody, somewhere). [1]: 411 The morphological phenomenon started in Old English, when thing, was combined with some, any, and no.
Augustus De Morgan confirmed this in 1847, but modern usage began with De Morgan in 1862 where he makes statements such as "We are to take in both all and some-not-all as quantifiers". [ 13 ] Gottlob Frege , in his 1879 Begriffsschrift , was the first to employ a quantifier to bind a variable ranging over a domain of discourse and appearing in ...
wife wò 2SG. POSS âka that nà the ani wò âka nà wife 2SG.POSS that the ´that wife of yours´ There are also languages in which demonstratives and articles do not normally occur together, but must be placed on opposite sides of the noun. For instance, in Urak Lawoi, a language of Thailand, the demonstrative follows the noun: rumah house besal big itu that rumah besal itu house big that ...
Many words of different parts of speech indicate number or quantity. Such words are called quantifiers. Examples are words such as every, most, least, some, etc. Numerals are distinguished from other quantifiers by the fact that they designate a specific number. [3] Examples are words such as five, ten, fifty, one hundred, etc.
In predicate logic, an existential quantification is a type of quantifier, a logical constant which is interpreted as "there exists", "there is at least one", or "for some". It is usually denoted by the logical operator symbol ∃, which, when used together with a predicate variable, is called an existential quantifier (" ∃x" or "∃(x)" or ...