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Tradução e análise de palavras por inteligência artificial ChatGPT
Nesta página você pode obter uma análise detalhada de uma palavra ou frase, produzida usando a melhor tecnologia de inteligência artificial até o momento:
- como a palavra é usada
- frequência de uso
- é usado com mais frequência na fala oral ou escrita
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- exemplos de uso (várias frases com tradução)
- etimologia
O que (quem) é non-absorbent - definição
SET THAT CAN BE "INFLATED" TO REACH ANY POINT
Absorbent set
Non-place
![[[Baggage reclaim]] at [[Beijing Capital International Airport]].](https://commons.wikimedia.org/wiki/Special:FilePath/Beijing Capital International Airport Terminal 2 Baggage Claim Hall 20140502.jpg?width=200 "[[Baggage reclaim]] at [[Beijing Capital International Airport]].")
CONCEPT IN ANTHROPOLOGY
Nonplace; Non-lieu; Non-lieux; Non place
Non-place or nonplace is a neologism coined by the French anthropologist Marc Augé to refer to anthropological spaces of transience where human beings remain anonymous, and that do not hold enough significance to be regarded as "places" in their anthropological definition. Examples of non-places would be motorways, hotel rooms, airports and shopping malls.
Non-heterosexual
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SEXUAL ORIENTATION OTHER THAN HETEROSEXUAL / STRAIGHT
Non-heterosexuals; Nonheterosexual; Non‐heterosexual; Non-straight; Non-heterosexuality
Non-heterosexual is a word for a sexual orientation or sexual identity that is not heterosexual. The term helps define the "concept of what is the norm and how a particular group is different from that norm".
Non-Inscrits
MEMBERS OF THE EUROPEAN PARLIAMENT NOT IN A POLITICAL GROUP
Non-Attached; Non-attached; Non-inscrits; Non-Inscrit; Non-inscrit; Non-Attached Members
Non-Inscrits (; abbreviated NI; also non-attached members, abbreviated NA) are Members of the European Parliament (MEP) who do not belong to one of the recognised political groups.
Wikipédia
Absorbing set
In functional analysis and related areas of mathematics an absorbing set in a vector space is a set which can be "inflated" or "scaled up" to eventually always include any given point of the vector space. Alternative terms are radial or absorbent set. Every neighborhood of the origin in every topological vector space is an absorbing subset.
