Exercise logic.propositional.dnf
Description
Proposition to DNF
Derivation
Final term is not finished(q || (~~(~~~r /\ ~~(~r /\ T)) /\ ~~(~~~r /\ ~~(~r /\ T)))) /\ ~~((q || p) /\ ~q) /\ ~~T /\ T
⇒ logic.propositional.truezeroand(q || (~~(~~~r /\ ~~(~r /\ T)) /\ ~~(~~~r /\ ~~(~r /\ T)))) /\ ~~((q || p) /\ ~q) /\ ~~T
⇒ logic.propositional.notnot(q || (~~(~~~r /\ ~~(~r /\ T)) /\ ~~(~~~r /\ ~~(~r /\ T)))) /\ (q || p) /\ ~q /\ ~~T
⇒ logic.propositional.notnot(q || (~~(~~~r /\ ~~(~r /\ T)) /\ ~~(~~~r /\ ~~(~r /\ T)))) /\ (q || p) /\ ~q /\ T
⇒ logic.propositional.truezeroand(q || (~~(~~~r /\ ~~(~r /\ T)) /\ ~~(~~~r /\ ~~(~r /\ T)))) /\ (q || p) /\ ~q
⇒ logic.propositional.andoveror(q || (~~(~~~r /\ ~~(~r /\ T)) /\ ~~(~~~r /\ ~~(~r /\ T)))) /\ ((q /\ ~q) || (p /\ ~q))
⇒ logic.propositional.compland(q || (~~(~~~r /\ ~~(~r /\ T)) /\ ~~(~~~r /\ ~~(~r /\ T)))) /\ (F || (p /\ ~q))
⇒ logic.propositional.falsezeroor(q || (~~(~~~r /\ ~~(~r /\ T)) /\ ~~(~~~r /\ ~~(~r /\ T)))) /\ p /\ ~q