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
- opções de tradução de palavras
- exemplos de uso (várias frases com tradução)
- etimologia
O que (quem) é équivalent$1$ - definição
![Jeremias Benjamin Richter (1762–1807), one of the first chemists to publish tables of equivalent weights, and also the coiner of the word "[[stoichiometry]]".](https://commons.wikimedia.org/wiki/Special:FilePath/Jeremias Benjamin Richter.jpeg?width=200 "Jeremias Benjamin Richter (1762–1807), one of the first chemists to publish tables of equivalent weights, and also the coiner of the word \"[[stoichiometry]]\".")
2.JPG?width=200 "Powdered bis(dimethylglyoximate)nickel. This coordination compound can be used for the gravimetric determination of nickel.")
![Burette over a conical flask with [[phenolphthalein]] indicator used for [[acid–base titration]]](https://commons.wikimedia.org/wiki/Special:FilePath/Titration.png?width=200 "Burette over a conical flask with [[phenolphthalein]] indicator used for [[acid–base titration]]")
Wikipédia
In linear algebra, two rectangular m-by-n matrices A and B are called equivalent if
for some invertible n-by-n matrix P and some invertible m-by-m matrix Q. Equivalent matrices represent the same linear transformation V → W under two different choices of a pair of bases of V and W, with P and Q being the change of basis matrices in V and W respectively.
The notion of equivalence should not be confused with that of similarity, which is only defined for square matrices, and is much more restrictive (similar matrices are certainly equivalent, but equivalent square matrices need not be similar). That notion corresponds to matrices representing the same endomorphism V → V under two different choices of a single basis of V, used both for initial vectors and their images.
