O sistema de água, formado desde a captação de água bruta a...
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Ano: 2021
Banca:
IESES
Órgão:
Prefeitura de Palhoça - SC
Prova:
IESES - 2021 - Prefeitura de Palhoça - SC - Engenheiro Sanitarista |
Q1726399
Engenharia Ambiental e Sanitária
O sistema de água, formado desde a captação de água
bruta até a distribuição de água potável, é constituído
por várias etapas. Em relação a etapa de adução, leia
atentamente as alternativas a seguir:
I. As adutoras são canalizações água entre as
unidades do sistema, que precedem a rede de
distribuição. Não possuem derivações para
alimentarem distribuidores de rua ou ramais
prediais.
II. As válvulas de redução de pressão são peças
colocadas nos pontos elevados da tubulação de
modo a expulsar, durante o enchimento da adutora,
o ar que normalmente se acumula nesses pontos.
Deixam também penetrar o ar, quando a tubulação
está sendo esvaziada, de modo a se evitar a
ocorrência de pressões internas negativas,
podendo originar o colapso ou achatamento ou
ovalização das tubulações, bem como a
possibilidade de entrada de líquido externo devido a
defeitos provocados nas tubulações ou através das
juntas.
III. No dimensionamento de uma adutora por recalque,
os parâmetros a serem considerados são a vazão
de adução (Q), o comprimento da adutora (L), o
desnível a ser vencido (H), o material do conduto
e seu coeficiente C. Procura-se determinar o
diâmetro (D) da linha e a potência (P) da bomba,
que vai gerar a pressão necessária para vencer o
desnível indicado, à vazão desejada.
IV. Pode-se afirmar que o esquema abaixo refere-se a
uma adutora mista com trechos por recalque e
trechos por gravidade. Os trechos em condutos
livres formam os aquedutos e os trechos em
condutos forçados formam os sifões invertidos.
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questão](data:image/png;base64,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)
A sequência de afirmativas INCORRETAS é:
A sequência de afirmativas INCORRETAS é: