Exercise

Exercise logic.propositional.dnf

Description
Proposition to DNF

Derivation

Final term is not finished

~~(p /\ T /\ ~q) /\ ~~(p /\ ~q) /\ (~~(~~~~(p /\ ~q) /\ q) || (~~~~(p /\ ~q) /\ ~r)) /\ ~~(p /\ ~q) /\ ~~(p /\ ~q /\ T) /\ ~~(p /\ ~q /\ T) /\ ~~(p /\ ~q) /\ T

⇒ logic.propositional.notnot

~~(p /\ T /\ ~q) /\ ~~(p /\ ~q) /\ ((~~~~(p /\ ~q) /\ q) || (~~~~(p /\ ~q) /\ ~r)) /\ ~~(p /\ ~q) /\ ~~(p /\ ~q /\ T) /\ ~~(p /\ ~q /\ T) /\ ~~(p /\ ~q) /\ T

⇒ logic.propositional.notnot

~~(p /\ T /\ ~q) /\ ~~(p /\ ~q) /\ ((~~(p /\ ~q) /\ q) || (~~~~(p /\ ~q) /\ ~r)) /\ ~~(p /\ ~q) /\ ~~(p /\ ~q /\ T) /\ ~~(p /\ ~q /\ T) /\ ~~(p /\ ~q) /\ T

⇒ logic.propositional.notnot

~~(p /\ T /\ ~q) /\ ~~(p /\ ~q) /\ ((p /\ ~q /\ q) || (~~~~(p /\ ~q) /\ ~r)) /\ ~~(p /\ ~q) /\ ~~(p /\ ~q /\ T) /\ ~~(p /\ ~q /\ T) /\ ~~(p /\ ~q) /\ T

⇒ logic.propositional.compland

~~(p /\ T /\ ~q) /\ ~~(p /\ ~q) /\ ((p /\ F) || (~~~~(p /\ ~q) /\ ~r)) /\ ~~(p /\ ~q) /\ ~~(p /\ ~q /\ T) /\ ~~(p /\ ~q /\ T) /\ ~~(p /\ ~q) /\ T

⇒ logic.propositional.falsezeroand

~~(p /\ T /\ ~q) /\ ~~(p /\ ~q) /\ (F || (~~~~(p /\ ~q) /\ ~r)) /\ ~~(p /\ ~q) /\ ~~(p /\ ~q /\ T) /\ ~~(p /\ ~q /\ T) /\ ~~(p /\ ~q) /\ T