Quantidade de Algarismos divisão exata
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Quantidade de Algarismos divisão exata
Seja dividir ab cde por xy, quantos algarismo terá o quociente?
Resposta: 4 algarismo
Resolução: (exemplo 1),
Não consegui entender a resolução.
![Quantidade de Algarismos divisão exata 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)
Resposta: 4 algarismo
Resolução: (exemplo 1),
Não consegui entender a resolução.
Armando Vieira- Mestre Jedi
- Mensagens : 652
Data de inscrição : 03/01/2015
Idade : 24
Localização : Bahia, Brasil
Re: Quantidade de Algarismos divisão exata
Se xy for igual ou menor que ab, sim, quociente terá mesmo 4 dígitos.Armando Vieira escreveu:Seja dividir ab cde por xy, quantos algarismo terá o quociente?
Resposta: 4 algarismo
Resolução: (exemplo 1),
Não consegui entender a resolução.
Mas se xy for maior que ab, quociente terá apenas 3 dígitos.
Um abraço.
ivomilton- Membro de Honra
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Localização : São Paulo - Capital
Re: Quantidade de Algarismos divisão exata
Muito obrigado mestre!!!
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Armando Vieira- Mestre Jedi
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Data de inscrição : 03/01/2015
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Localização : Bahia, Brasil
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