Matemática básica. VUNESP
Página 1 de 1
Matemática básica. VUNESP
Olá, tenho algumas lacunas em matemática básica, se alguém souber resolver esta questão fico agradecida ![Very Happy](https://2img.net/i/fa/i/smiles/icon_biggrin.png)
(Vunesp-2005) Em um dado comum, a soma dos
números de pontos desenhados em quaisquer duas faces opostas é sempre igual a 7.Três dados comuns e idênticos
são colados por faces com o mesmo número de pontos. Em
seguida, os dados são colados sobre uma mesa não
transparente, como mostra a figura. Sabendo-se que a soma
dos números de pontos de todas as faces livres é igual a 36,
a soma dos números de pontos das três faces que estão em
contato com a mesa é igual a
![Matemática básica. VUNESP B5SPS6EEEIIIfaCBFchhBBCCLEXJLgKIYQQQoi9IMFVCCGEEELsBQmuQgghhBBiL0hwFUIIIYQQe0GCqxBCCCGE2AsSXIUQQgghxF74X8hBKFKqxamGAAAAAElFTkSuQmCC](data:image/png;base64,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)
a) 13.
b) 14.
c) 15.
d) 16.
e) 18.
![Very Happy](https://2img.net/i/fa/i/smiles/icon_biggrin.png)
(Vunesp-2005) Em um dado comum, a soma dos
números de pontos desenhados em quaisquer duas faces opostas é sempre igual a 7.Três dados comuns e idênticos
são colados por faces com o mesmo número de pontos. Em
seguida, os dados são colados sobre uma mesa não
transparente, como mostra a figura. Sabendo-se que a soma
dos números de pontos de todas as faces livres é igual a 36,
a soma dos números de pontos das três faces que estão em
contato com a mesa é igual a
a) 13.
b) 14.
c) 15.
d) 16.
e) 18.
Maria Bernardo- Iniciante
- Mensagens : 21
Data de inscrição : 12/09/2022
JADJONE gosta desta mensagem
![-](https://2img.net/i/empty.gif)
» Matemática básica. VUNESP
» Matemática básica. VUNESP
» Matemática básica. VUNESP
» Matemática básica
» matemática básica?
» Matemática básica. VUNESP
» Matemática básica. VUNESP
» Matemática básica
» matemática básica?
Página 1 de 1
Permissões neste sub-fórum
Não podes responder a tópicos
|
|