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