Equação fracionária
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Equação fracionária
Boa noite alguém pode me ensinar passo a passo como resolver a seguinte questão (principalmente a parte de tirar o MMC):
![Equação fracionária 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)
Grato!
Grato!
Última edição por matsudav1 em Qua 03 Ago 2022, 20:32, editado 1 vez(es)
matsudav1- Iniciante
- Mensagens : 21
Data de inscrição : 12/11/2020
Re: Equação fracionária
(x² - 1) = (x + 1).(x - 1)
mmc = 3.(x + 1).(x - 1)
Multiplique os dois membros pelo mmc e calcule x
mmc = 3.(x + 1).(x - 1)
Multiplique os dois membros pelo mmc e calcule x
Elcioschin- Grande Mestre
- Mensagens : 72245
Data de inscrição : 15/09/2009
Idade : 77
Localização : Santos/SP
matsudav1 gosta desta mensagem
Re: Equação fracionária
Ufa graças ao senhor consegui chegar ao resultado.Elcioschin escreveu:(x² - 1) = (x + 1).(x - 1)
mmc = 3.(x + 1).(x - 1)
Multiplique os dois membros pelo mmc e calcule x
Muito obrigado pela ajuda, Mestre Elcio!
Abraços!
matsudav1- Iniciante
- Mensagens : 21
Data de inscrição : 12/11/2020
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