Os dados de cinco estabelecimentos comerciais da cidade est...
Próximas questões
Com base no mesmo assunto
Ano: 2019
Banca:
VUNESP
Órgão:
Prefeitura de Sorocaba - SP
Prova:
VUNESP - 2019 - Prefeitura de Sorocaba - SP - Fiscal Público |
Q1689426
Noções de Informática
Os dados de cinco estabelecimentos comerciais da
cidade estão em um documento de texto chamado
“C:\Estudos\empresas.txt” e organizados da seguinte
maneira, a partir da primeira linha e posição do arquivo:
![Imagem associada para resolução da questão](data:image/png;base64,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)
Considere que o usuário importou tais dados para uma planilha do MS-Excel 2010, utilizando o recurso “De Texto”, do grupo “Obter Dados Externos”, da guia “Dados”. O arquivo foi importado a partir da primeira linha, e os campos foram configurados como delimitados por ponto e vírgula, do tipo “Geral” e com codificação de caracteres compatível. Os dados foram colocados em uma planilha vazia a partir da célula A1.
Assinale a alternativa que descreve o conteúdo da célula B4 após a importação do documento de texto.
Considere que o usuário importou tais dados para uma planilha do MS-Excel 2010, utilizando o recurso “De Texto”, do grupo “Obter Dados Externos”, da guia “Dados”. O arquivo foi importado a partir da primeira linha, e os campos foram configurados como delimitados por ponto e vírgula, do tipo “Geral” e com codificação de caracteres compatível. Os dados foram colocados em uma planilha vazia a partir da célula A1.
Assinale a alternativa que descreve o conteúdo da célula B4 após a importação do documento de texto.