Proporcionalidade
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Proporcionalidade
A tabela a seguir traz os resultados de um experimento composto de três ensaios que media a taxa de multiplicação diária de uma colônia de bactérias com a alteração de algumas variáveis experimentais. Outras variáveis, não registradas na tabela, mantiveram-se constantes nesse experimento.
![Proporcionalidade 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)
Sendo k uma constante real, qual das expressões a seguir relaciona corretamente a taxa de multiplicação diária dessa colônia de bactérias (M), a temperatura (T), em grau celsius, e a umidade (U), em grama de água por quilograma da colônia?
![Proporcionalidade 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)
Sendo k uma constante real, qual das expressões a seguir relaciona corretamente a taxa de multiplicação diária dessa colônia de bactérias (M), a temperatura (T), em grau celsius, e a umidade (U), em grama de água por quilograma da colônia?
- Gabarito:
- D
Última edição por estudosxlia em Dom 05 Jun 2022, 22:56, editado 1 vez(es)
estudosxlia- Jedi
- Mensagens : 360
Data de inscrição : 25/04/2022
Re: Proporcionalidade
Basta testar cada alternativa. Vou testar a D) M = k.√T/U
I ---> 1,5 = k.√9/4 ---> k = 2
II ---> 3 = 2.√36/4 ---> 12 = 12 ---> OK
III --> 1,5 = 2.√36/8 ---> 12 = 12 ---> OK
Caso vc queira, teste as demais alternativas e verá que não dá certo.
I ---> 1,5 = k.√9/4 ---> k = 2
II ---> 3 = 2.√36/4 ---> 12 = 12 ---> OK
III --> 1,5 = 2.√36/8 ---> 12 = 12 ---> OK
Caso vc queira, teste as demais alternativas e verá que não dá certo.
Elcioschin- Grande Mestre
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