Observe o quadro a seguir. Cada um desses símbolos diferent...
Próximas questões
Com base no mesmo assunto
Ano: 2019
Banca:
FUNDEP (Gestão de Concursos)
Órgão:
Prefeitura de Nova Serrana - MG
Prova:
FUNDEP (Gestão de Concursos) - 2019 - Prefeitura de Nova Serrana - MG - Professor de Educação Básica |
Q1733871
Raciocínio Lógico
Observe o quadro a seguir.
![Imagem associada para resolução da questão](data:image/png;base64,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)
Cada um desses símbolos diferentes representa um número natural. Os números fora do quadro indicam as somas dos símbolos nas colunas 1 e 3 e na linha 2.
De acordo com essas informações, o
representa o
número
Cada um desses símbolos diferentes representa um número natural. Os números fora do quadro indicam as somas dos símbolos nas colunas 1 e 3 e na linha 2.
De acordo com essas informações, o