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