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![proposiçoes 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)
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Re: proposiçoes
Pesquise sobre Leis de Morgan, pode ajudar.
Considere que
significa a negação da proposição a.
Para negar preposições faça isso:
![proposiçoes Png](https://latex.codecogs.com/png.latex?%5C%5C%5Coverline%7B%7B%28a%5Cwedge%20b%29%7D%7D%3D%5Cbar%7Ba%7D%5Cvee%20%5Cbar%7Bb%7D%5C%5C%5C%5C%5Coverline%7B%28a%5Cvee%20b%29%7D%3D%5Cbar%7Ba%7D%5Cwedge%20%5Cbar%7Bb%7D%5C%5C%5C%5C%5Coverline%7B%28a%5Crightarrow%20b%29%7D%3Da%5Cwedge%20%5Cbar%7Bb%7D)
![proposiçoes Png.latex?%5C%5C%5Cwedge%20%3D%20e%5C%5C%5Cvee%20%3Dou%5C%5C%5Crightarrow%20%3DSe..](https://latex.codecogs.com/png.latex?%5C%5C%5Cwedge%20%3D%20e%5C%5C%5Cvee%20%3Dou%5C%5C%5Crightarrow%20%3DSe...%5C%3Aent%5Ctilde%7Ba%7Do)
Partindo daí fica mais fácil. Lendo a proposição:
Se 2 é menor ou igual a 5, então 3 ao quadrado é menor ou igual a 5 ao quadrado.
Tente negar e veja se consegue.
Considere que
Para negar preposições faça isso:
Partindo daí fica mais fácil. Lendo a proposição:
Se 2 é menor ou igual a 5, então 3 ao quadrado é menor ou igual a 5 ao quadrado.
Tente negar e veja se consegue.
Eduardo Rabelo
24.10.2020 18:46:18
Eduardo Rabelo- Fera
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