No ano de 2018, um aluno do 6º ano de uma escola municipal o...
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Com base no mesmo assunto
Ano: 2019
Banca:
FADESP
Órgão:
Prefeitura de Marabá - PA
Prova:
FADESP - 2019 - Prefeitura de Marabá - PA - Professor Licenciado em Matemática |
Q1832322
Matemática
No ano de 2018, um aluno do 6º ano de uma escola municipal obteve as seguintes notas bimestrais
em Matemática:
![Imagem associada para resolução da questão](data:image/png;base64,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)
Sua escola adota para média anual o maior valor calculado entre a média aritmética simples e a média ponderada, considerando-se nesse último caso os pesos 2, 3, 2 e 3 para o 1º, 2º, 3º e 4º bimestres, respectivamente. A média anual desse aluno foi
Sua escola adota para média anual o maior valor calculado entre a média aritmética simples e a média ponderada, considerando-se nesse último caso os pesos 2, 3, 2 e 3 para o 1º, 2º, 3º e 4º bimestres, respectivamente. A média anual desse aluno foi