Exercise logic.propositional.cnf.unicode
Description
Proposition to CNF (unicode support)
Derivation
Final term is not finished
¬(((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r) ∧ ¬(((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r ∧ ((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r)) ∨ F) ∧ T ∧ r)
⇒ logic.propositional.falsezeroor¬(((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r) ∧ ¬(((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r ∧ ((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r)
⇒ logic.propositional.absorpand¬(((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r) ∧ ¬(((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r ∧ (r ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r)
⇒ logic.propositional.idempor¬(((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r) ∧ ¬(((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r ∧ (r ∨ (¬r ∧ ¬r)) ∧ T ∧ r)
⇒ logic.propositional.idempand¬(((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r) ∧ ¬(((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r ∧ (r ∨ ¬r) ∧ T ∧ r)
⇒ logic.propositional.complor¬(((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r) ∧ ¬(((r ∧ (r ∨ r)) ∨ (¬r ∧ ¬(r ∨ r))) ∧ T ∧ r ∧ T ∧ T ∧ r)