A figura a seguir apresenta esquematicamente as cinco etapa...
Próximas questões
Com base no mesmo assunto
Ano: 2021
Banca:
IESES
Órgão:
Prefeitura de Palhoça - SC
Prova:
IESES - 2021 - Prefeitura de Palhoça - SC - Engenheiro Civil |
Q1726248
Engenharia Civil
A figura a seguir apresenta esquematicamente as cinco
etapas do ciclo de uma obra. Observe atentamente a
figura e avalie as alternativas, que apresentam uma
ordem de grandeza dos valores percentuais dos custos
envolvidos, em cada etapa do ciclo da obra:
I. Etapa 1: estudo de viabilidade do empreendimento
– 5,8%. Etapa 2: projeto e planejamento da
edificação – 2,4%.
II. Etapa 3: mobilização do canteiro de obras – 2,4%.
III. Etapa 4: construção da edificação – 87,5%.
IV. Etapa 5: desmobilização do canteiro de obras –
1,9%. ![Imagem associada para resolução da questão](data:image/png;base64,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)
A sequência de afirmativas corretas é:
A sequência de afirmativas corretas é: