Questões de Concurso Público Prefeitura de São Paulo - SP 2016 para Analista - Informações, Cultura e Desporto
Foram encontradas 2 questões
Ano: 2016
Banca:
VUNESP
Órgão:
Prefeitura de São Paulo - SP
Prova:
VUNESP - 2016 - Prefeitura de São Paulo - SP - Analista - Informações, Cultura e Desporto |
Q1083697
Matemática
Um mesmo chocolate culinário é vendido em barras com
três opções de tamanhos (A, B e C), todas em forma de
paralelepípedo reto retângulo, com medidas das barras
e respectivos preços de cada uma indicados na figura a
seguir.
![Imagem associada para resolução da questão](https://arquivos.qconcursos.com/images/provas/66054/4f83f2168369f533bd02.png)
Sabendo-se que cada cm³ dessas barras contém a mesma massa de chocolate e considerando o valor pago por cm³, as barras que são menos e mais vantajosas são, respectivamente,
![Imagem associada para resolução da questão](https://arquivos.qconcursos.com/images/provas/66054/4f83f2168369f533bd02.png)
Sabendo-se que cada cm³ dessas barras contém a mesma massa de chocolate e considerando o valor pago por cm³, as barras que são menos e mais vantajosas são, respectivamente,
Ano: 2016
Banca:
VUNESP
Órgão:
Prefeitura de São Paulo - SP
Prova:
VUNESP - 2016 - Prefeitura de São Paulo - SP - Analista - Informações, Cultura e Desporto |
Q1083699
Matemática
Cinquenta tachinhas coloridas (brancas, azuis, vermelhas,
verdes e amarelas) foram soltas ao acaso no chão, sendo
verificado se elas caíram com a ponta virada para cima ou
para baixo. Os dados do experimento estão indicados na
tabela a seguir.
![Imagem associada para resolução da questão](https://arquivos.qconcursos.com/images/provas/66054/6f8c739c9a19d95d4bb7.png)
![Imagem associada para resolução da questão](data:image/png;base64,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)
De acordo com a tabela, a porcentagem de tachinhas brancas, dentre as que caíram com a ponta virada para baixo, no experimento, foi igual a
![Imagem associada para resolução da questão](https://arquivos.qconcursos.com/images/provas/66054/6f8c739c9a19d95d4bb7.png)
De acordo com a tabela, a porcentagem de tachinhas brancas, dentre as que caíram com a ponta virada para baixo, no experimento, foi igual a