Exercise logic.propositional.dnf

Description
Proposition to DNF

Derivation

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

⇒ logic.propositional.falsezeroand

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

⇒ logic.propositional.falsezeroor

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

⇒ logic.propositional.falsezeroand

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

⇒ logic.propositional.falsezeroor

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

⇒ logic.propositional.falsezeroor

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

⇒ logic.propositional.idempor

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

⇒ logic.propositional.notnot

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

⇒ logic.propositional.absorpand

q || p