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A sine qua non (/ ˌ s aɪ n i k w eɪ ˈ n ɒ n, ˌ s ɪ n i k w ɑː ˈ n oʊ n /, [1] Latin: [ˈsɪnɛ kʷaː ˈnoːn]) or conditio sine qua non (plural: conditiones sine quibus non) is an indispensable and essential action, condition, or ingredient.
WordReference is an online translation dictionary for, among others, the language pairs English–French, English–Italian, English–Spanish, French–Spanish, Spanish–Portuguese and English–Portuguese. WordReference formerly had Oxford Unabridged and Concise dictionaries available for a subscription.
A miniature Danish–French dictionary. Bilingual dictionaries are available in a number of formats, and often include a grammar reference and usage examples.(For instance Yadgar Sindhi to English Dictionary) [9] Printed dictionaries – Printed dictionaries range from small pocket-sized editions to large, comprehensive multi-volume works.
Reverso has been active since 1998, with the aim of providing online translation and linguistic tools to corporate and mass markets. [3] [4] In 2013 it released Reverso Context, a bilingual dictionary tool based on big data and machine learning algorithms. [5] In 2016 Reverso acquired Fleex, a service for learning English via subtitled movies.
1. A natural craving or desire 2. An attraction or affinity; From French word "Appétence", derived from "Appétit" (Appetite). après moi, le déluge lit. "After me, the deluge", a remark attributed to Louis XV of France in reference to the impending end of a functioning French monarchy and predicting the French Revolution.
Dictionnaires Le Robert (pronounced [diksjɔnɛːʁ lə ʁɔbɛʁ]) is a French publisher of dictionaries founded by Paul Robert. Its Petit Robert is often considered one of the authoritative single-volume dictionary of the French language. The founding members of the editorial board were the lexicographers, Alain Rey and Josette Rey-Debove.
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The notions of necessity and possibility are then defined along the following lines: A proposition P follows necessarily from the set of accessible worlds, if all accessible worlds are part of P (that is, if p is true in all of these worlds).