Na Tabela abaixo, são mostrados os dados de uma reação quími...
Próximas questões
Com base no mesmo assunto
Ano: 2019
Banca:
PUC - RJ
Órgão:
PUC - RJ
Prova:
PUC - RJ - 2019 - PUC - RJ - Vestibular - Matemática \ Ciências da Natureza \ Ciências Humanas - Grupo 5 - 2º dia - Tarde |
Q1298461
Química
Na Tabela abaixo, são mostrados os dados de uma reação química entre um brometo de alquila (C4
H9
Br) e iodeto (I- ), a
25°C, onde foram utilizadas diferentes concentrações iniciais dos reagentes.
C4 H9 Br + I- -> C4 H9 I + Br-
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questão](data:image/png;base64,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)
Sobre a cinética dessa reação, assinale a alternativa CORRETA.
C4 H9 Br + I- -> C4 H9 I + Br-
Sobre a cinética dessa reação, assinale a alternativa CORRETA.