A utilização de Sulfato de Alumínio em meio aquoso na coagul...
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Com base no mesmo assunto
Ano: 2018
Banca:
FCC
Órgão:
SABESP
Prova:
FCC - 2018 - SABESP - Técnico em Sistemas de Saneamento 01 - Saneamento |
Q1016726
Meio Ambiente
A utilização de Sulfato de Alumínio em meio aquoso na coagulação de partículas coloidais gera uma alteração no pH devido à
liberação de íons H+, conforme mostra a equação abaixo:
![Imagem associada para resolução da questão](data:image/png;base64,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)
Para corrigir esta alteração no pH é necessário acrescentar uma base à mistura. Das substâncias abaixo, uma base que pode ser adicionada no tratamento de água, é:
Para corrigir esta alteração no pH é necessário acrescentar uma base à mistura. Das substâncias abaixo, uma base que pode ser adicionada no tratamento de água, é: