Para o gráfico a seguir, é incorreto afirmar que:
Próximas questões
Com base no mesmo assunto
Ano: 2014
Banca:
FEI
Órgão:
FEI
Prova:
FEI - 2014 - FEI - Vestibular - Engenharia e Ciência da Computação |
Q1270777
Química
Para o gráfico a seguir, é incorreto afirmar que:
![Imagem associada para resolução da questão](data:image/png;base64,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)