Category:Conditional is Equivalent to Negation of Conjunction with Negative
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This category contains pages concerning Conditional is Equivalent to Negation of Conjunction with Negative:
Formulation 1
- $p \implies q \dashv \vdash \neg \paren {p \land \neg q}$
Formulation 2
- $\vdash \paren {p \implies q} \iff \paren {\neg \paren {p \land \neg q} }$
Pages in category "Conditional is Equivalent to Negation of Conjunction with Negative"
The following 10 pages are in this category, out of 10 total.
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- Conditional is Equivalent to Negation of Conjunction with Negative
- Conditional is Equivalent to Negation of Conjunction with Negative/Formulation 1
- Conditional is Equivalent to Negation of Conjunction with Negative/Formulation 1/Forward Implication
- Conditional is Equivalent to Negation of Conjunction with Negative/Formulation 1/Proof by Truth Table
- Conditional is Equivalent to Negation of Conjunction with Negative/Formulation 1/Reverse Implication
- Conditional is Equivalent to Negation of Conjunction with Negative/Formulation 2
- Conditional is Equivalent to Negation of Conjunction with Negative/Formulation 2/Forward Implication
- Conditional is Equivalent to Negation of Conjunction with Negative/Formulation 2/Proof 1
- Conditional is Equivalent to Negation of Conjunction with Negative/Formulation 2/Proof by Truth Table
- Conditional is Equivalent to Negation of Conjunction with Negative/Formulation 2/Reverse Implication