Exercise

Exercise logic.propositional.dnf

Description
Proposition to DNF

Derivation

Final term is not finished

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

⇒ logic.propositional.absorpand

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

⇒ logic.propositional.absorpand

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

⇒ logic.propositional.idempand

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

⇒ logic.propositional.falsezeroor

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

⇒ logic.propositional.absorpor

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

⇒ logic.propositional.notnot

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