Questões de Concurso Público Prefeitura de Água Boa - MT 2024 para Atendente Geral em Saúde
Foram encontradas 20 questões
Ano: 2024
Banca:
SELECON
Órgão:
Prefeitura de Água Boa - MT
Provas:
SELECON - 2024 - Prefeitura de Água Boa - MT - Atendente Geral em Saúde
|
SELECON - 2024 - Prefeitura de Água Boa - MT - Operador de Máquinas Pesadas - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Motorista - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Mecânico |
SELECON - 2024 - Prefeitura de Água Boa - MT - Pedreiro - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Encanador de Rede de Água - 40H |
Q2466388
Raciocínio Lógico
O quadro a seguir indica o ano de nascimento e de falecimento
de quatro grandes cientistas.
Desses cientistas, aquele que viveu mais de 80 anos foi:
Desses cientistas, aquele que viveu mais de 80 anos foi:
Ano: 2024
Banca:
SELECON
Órgão:
Prefeitura de Água Boa - MT
Provas:
SELECON - 2024 - Prefeitura de Água Boa - MT - Atendente Geral em Saúde
|
SELECON - 2024 - Prefeitura de Água Boa - MT - Operador de Máquinas Pesadas - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Motorista - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Mecânico |
SELECON - 2024 - Prefeitura de Água Boa - MT - Pedreiro - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Encanador de Rede de Água - 40H |
Q2466389
Matemática
O edital de um concurso público informava que um candidato,
para ser aprovado, deveria acertar, no mínimo, 35% do total de
questões da prova. Se a prova tinha um total de 80 questões e
Moisés acertou 26, então Moisés:
Ano: 2024
Banca:
SELECON
Órgão:
Prefeitura de Água Boa - MT
Provas:
SELECON - 2024 - Prefeitura de Água Boa - MT - Atendente Geral em Saúde
|
SELECON - 2024 - Prefeitura de Água Boa - MT - Operador de Máquinas Pesadas - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Motorista - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Mecânico |
SELECON - 2024 - Prefeitura de Água Boa - MT - Pedreiro - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Encanador de Rede de Água - 40H |
Q2466390
Matemática
A média aritmética das idades de Abel e Saulo é igual a
32 anos. Se Abel é 4 anos mais velho do que Saulo, a idade de
Abel, em anos, é:
Ano: 2024
Banca:
SELECON
Órgão:
Prefeitura de Água Boa - MT
Provas:
SELECON - 2024 - Prefeitura de Água Boa - MT - Atendente Geral em Saúde
|
SELECON - 2024 - Prefeitura de Água Boa - MT - Operador de Máquinas Pesadas - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Motorista - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Mecânico |
SELECON - 2024 - Prefeitura de Água Boa - MT - Pedreiro - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Encanador de Rede de Água - 40H |
Q2466391
Matemática
Uma garrafa tem capacidade para 250 mililitros de azeite.
Logo, a quantidade total de azeite que pode ser armazenado em
32 dessas garrafas, em litros, é:
Ano: 2024
Banca:
SELECON
Órgão:
Prefeitura de Água Boa - MT
Provas:
SELECON - 2024 - Prefeitura de Água Boa - MT - Atendente Geral em Saúde
|
SELECON - 2024 - Prefeitura de Água Boa - MT - Operador de Máquinas Pesadas - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Motorista - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Mecânico |
SELECON - 2024 - Prefeitura de Água Boa - MT - Pedreiro - 40H |
SELECON - 2024 - Prefeitura de Água Boa - MT - Encanador de Rede de Água - 40H |
Q2466392
Matemática
O retângulo ABCD a seguir representa uma folha de cartolina
de dimensões 40 cm por 60 cm.
![Imagem associada para resolução da questão](data:image/png;base64,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)
Traçando-se uma linha reta do ponto M ao ponto D, essa cartolina fica dividida no triângulo MDC e no quadrilátero ABMD. O perímetro desse quadrilátero, em cm, corresponde a:
Traçando-se uma linha reta do ponto M ao ponto D, essa cartolina fica dividida no triângulo MDC e no quadrilátero ABMD. O perímetro desse quadrilátero, em cm, corresponde a: