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