resolva a equação irracional a seguir √(5√3) =3
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resolva a equação irracional a seguir √(5√3) =3
As raízes estão juntas, tentei usar a propriedade de multiplicação de raízes de mesmo índice e depois elevando os dois lados a 4, mas não obtive o resultado esperado, a resposta seria S= {13}.
Última edição por Akiraishere em Qua 04 maio 2022, 20:16, editado 2 vez(es)
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Re: resolva a equação irracional a seguir √(5√3) =3
Olá Akira;
As raízes estão juntas como?
![resolva a equação irracional a seguir √(5√3) =3 Png](https://latex.codecogs.com/png.latex?%5Cdpi%7B100%7D%20%5C%5C%5Cmathrm%7BI%29%5C%20%5Csqrt%7B5%7D%5Csqrt%7B3%7D%7D%5C%5C%5Cmathrm%7BII%29%20%5C%20%5Csqrt%7B5%5Csqrt%7B3%7D%7D%7D)
I) ou II)? Ou nenhuma das duas, utilize a tabela de símbolos ao lado direito superior, e faça o uso de parênteses, não da pra identificar um enunciado assim.
![resolva a equação irracional a seguir √(5√3) =3 UL6YNM4HPdIAAAAASUVORK5CYII=](data:image/png;base64,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)
Aparentemente você sabe o gabarito, segundo as regras do fórum:
XI- Da mesma forma não deixe de postar a resposta esperada, se a conhecer. Isso será de valia para quem tentar ajudá-lo(a).
Se souber, [EDIT] sua postagem.
As raízes estão juntas como?
I) ou II)? Ou nenhuma das duas, utilize a tabela de símbolos ao lado direito superior, e faça o uso de parênteses, não da pra identificar um enunciado assim.
Aparentemente você sabe o gabarito, segundo as regras do fórum:
XI- Da mesma forma não deixe de postar a resposta esperada, se a conhecer. Isso será de valia para quem tentar ajudá-lo(a).
Se souber, [EDIT] sua postagem.
qedpetrich- Monitor
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Re: resolva a equação irracional a seguir √(5√3) =3
Seria como a II.qedpetrich escreveu:Olá Akira;
As raízes estão juntas como?
I) ou II)? Ou nenhuma das duas, utilize a tabela de símbolos ao lado direito superior, e faça o uso de parênteses, não da pra identificar um enunciado assim.
Aparentemente você sabe o gabarito, segundo as regras do fórum:
XI- Da mesma forma não deixe de postar a resposta esperada, se a conhecer. Isso será de valia para quem tentar ajudá-lo(a).
Se souber, [EDIT] sua postagem.
Eu editei a minha pergunta colocando o resultado, muito obrigado.
Akiraishere- Iniciante
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Re: resolva a equação irracional a seguir √(5√3) =3
Então você pode escrever assim, com parênteses sempre: √(5√3). Assim indica raiz de raiz. O gabarito não está correto, existe problema no enunciado ou erro no gabarito. De onde é essa questão?
qedpetrich- Monitor
- Mensagens : 2497
Data de inscrição : 05/07/2021
Idade : 24
Localização : Erechim - RS / Passo Fundo - RS
Re: resolva a equação irracional a seguir √(5√3) =3
A questão foi tirada do livro Fundamentos da Matemática elementar, primeiro volume, estranhei mesmo que o gabarito estaria errado, mas como seria o processo da solução dessa questão ?qedpetrich escreveu:Então você pode escrever assim, com parênteses sempre: √(5√3). Assim indica raiz de raiz. O gabarito não está correto, existe problema no enunciado ou erro no gabarito. De onde é essa questão?
Akiraishere- Iniciante
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Data de inscrição : 18/04/2022
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Localização : São Paulo, Mococa
Re: resolva a equação irracional a seguir √(5√3) =3
Antes você tinha escrito a seguinte expressão:
√(5√3) + x = 3 → x = 3 - √(5√3) .:. x ≈ 0,057
Agora nem sequer existe x na equação kkkkk.
![resolva a equação irracional a seguir √(5√3) =3 8BDlAOtjOiZTEAAAAASUVORK5CYII=](data:image/png;base64,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)
Faça as alterações e escreva o enunciado correto somente assim da pra te ajudar.
√(5√3) + x = 3 → x = 3 - √(5√3) .:. x ≈ 0,057
Agora nem sequer existe x na equação kkkkk.
Faça as alterações e escreva o enunciado correto somente assim da pra te ajudar.
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Data de inscrição : 05/07/2021
Idade : 24
Localização : Erechim - RS / Passo Fundo - RS
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» Resolva a equação matricial a seguir:
» Resolva a equação irracional:
» Equação irracional - (resolva)
» Resolva em R a seguinte equação irracional
» resolva a equação irracional abaixo
» Resolva a equação irracional:
» Equação irracional - (resolva)
» Resolva em R a seguinte equação irracional
» resolva a equação irracional abaixo
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