Exercise logic.propositional.dnf.unicode
Description
Proposition to DNF (unicode support)
All applications
Rule | defimpl.inv |
Location | [1,0,0] |
F ∨ (¬(q → p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [] |
F ∨ F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))) ∨ F
ready: no
Rule | falsezeroor.inv |
Location | [0] |
F ∨ F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [0] |
F ∨ F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1] |
F ∨ F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))) ∨ F
ready: no
Rule | falsezeroor.inv |
Location | [1,0] |
F ∨ ((F ∨ ¬(¬q ∨ p)) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,0] |
F ∨ ((¬(¬q ∨ p) ∨ F) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,0,0] |
F ∨ (¬(F ∨ ¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,0,0] |
F ∨ (¬(¬q ∨ p ∨ F) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,0,0,0] |
F ∨ (¬(F ∨ ¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,0,0,0] |
F ∨ (¬(¬q ∨ F ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,0,0,0,0] |
F ∨ (¬(¬(F ∨ q) ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,0,0,0,0] |
F ∨ (¬(¬(q ∨ F) ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,0,0,1] |
F ∨ (¬(¬q ∨ F ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,0,0,1] |
F ∨ (¬(¬q ∨ p ∨ F) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1] |
F ∨ (¬(¬q ∨ p) ↔ (F ∨ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))))
ready: no
Rule | falsezeroor.inv |
Location | [1,1] |
F ∨ (¬(¬q ∨ p) ↔ ((((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)) ∨ F))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ ((F ∨ (r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s) ∨ F) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ ((F ∨ (r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ F ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ ((((F ∨ r) ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ ((((r ∨ F) ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ (F ∨ s)) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ (s ∨ F)) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ F ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s) ∨ F) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ ((F ∨ T) ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ ((T ∨ F) ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ (F ∨ ¬s))) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ (¬s ∨ F))) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬(F ∨ s))) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,0,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬(s ∨ F))) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (F ∨ ((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s ∨ F)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (F ∨ ((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ F ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((F ∨ (r ↔ s)) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((((r ↔ s) ∨ F) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((((F ∨ r) ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((((r ∨ F) ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ (F ∨ s)) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ (s ∨ F)) ∧ T) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ (F ∨ T)) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ (T ∨ F)) ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ F ∨ ¬s)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s ∨ F)))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬(F ∨ s))))
ready: no
Rule | falsezeroor.inv |
Location | [1,1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬(s ∨ F))))
ready: no
Rule | idempand.inv |
Location | [] |
(F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))) ∧ (F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))))
ready: no
Rule | idempand.inv |
Location | [0] |
(F ∧ F) ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1] |
F ∨ ((¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))) ∧ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))))
ready: no
Rule | idempand.inv |
Location | [1,0] |
F ∨ ((¬(¬q ∨ p) ∧ ¬(¬q ∨ p)) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,0,0] |
F ∨ (¬((¬q ∨ p) ∧ (¬q ∨ p)) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,0,0,0] |
F ∨ (¬((¬q ∧ ¬q) ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,0,0,0,0] |
F ∨ (¬(¬(q ∧ q) ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,0,0,1] |
F ∨ (¬(¬q ∨ (p ∧ p)) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s) ∧ ((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ ((((r ↔ s) ∧ (r ↔ s)) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ ((((r ∧ r) ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ (s ∧ s)) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s ∧ T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,0,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,0,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,0,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬(s ∧ s))) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T ∧ (r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ (r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((((r ∧ r) ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ (s ∧ s)) ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T ∧ T) ∨ ¬s)))
ready: no
Rule | idempand.inv |
Location | [1,1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ (¬s ∧ ¬s))))
ready: no
Rule | idempand.inv |
Location | [1,1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬(s ∧ s))))
ready: no
Rule | idempor.inv |
Location | [] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))) ∨ F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [0] |
F ∨ F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))) ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,0] |
F ∨ ((¬(¬q ∨ p) ∨ ¬(¬q ∨ p)) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,0,0] |
F ∨ (¬(¬q ∨ p ∨ ¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,0,0,0] |
F ∨ (¬(¬q ∨ ¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,0,0,0,0] |
F ∨ (¬(¬(q ∨ q) ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,0,0,1] |
F ∨ (¬(¬q ∨ p ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1] |
F ∨ (¬(¬q ∨ p) ↔ ((((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)) ∨ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))))
ready: no
Rule | idempor.inv |
Location | [1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s) ∨ (r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ ((((r ∨ r) ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ (s ∨ s)) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,0,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ ((T ∨ T) ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,0,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ (¬s ∨ ¬s))) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,0,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬(s ∨ s))) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s ∨ ((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((((r ↔ s) ∨ (r ↔ s)) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((((r ∨ r) ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ (s ∨ s)) ∧ T) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ (T ∨ T)) ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s ∨ ¬s)))
ready: no
Rule | idempor.inv |
Location | [1,1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬(s ∨ s))))
ready: no
Rule | logic.propositional.andoveror |
Location | [1,1] |
F ∨ (¬(¬q ∨ p) ↔ ((((r ↔ s) ∨ (T ∧ ¬s)) ∧ (r ↔ s) ∧ T) ∨ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ¬s)))
ready: no
Rule | logic.propositional.andoveror |
Location | [1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∧ (((r ↔ s) ∧ T) ∨ ¬s)) ∨ (T ∧ ¬s ∧ (((r ↔ s) ∧ T) ∨ ¬s))))
ready: no
Rule | logic.propositional.buggy.assoc |
Location | [1,1] |
Rule | logic.propositional.buggy.assoc |
Location | [1,1] |
Rule | logic.propositional.buggy.assoc |
Location | [1,1,0] |
Rule | logic.propositional.buggy.assoc |
Location | [1,1,1] |
Rule | logic.propositional.buggy.defimpl.inv |
Location | [1,0] |
Rule | logic.propositional.buggy.defimpl.inv |
Location | [1,0,0] |
Rule | logic.propositional.buggy.defimpl.inv |
Location | [1,1,0,1] |
Rule | logic.propositional.buggy.defimpl.inv |
Location | [1,1,1] |
Rule | logic.propositional.buggy.demorgan1 |
Location | [1,0] |
Rule | logic.propositional.buggy.demorgan1 |
Location | [1,0] |
Rule | logic.propositional.buggy.demorgan1 |
Location | [1,0] |
Rule | logic.propositional.buggy.demorgan2 |
Location | [1,0] |
Rule | logic.propositional.buggy.demorgan4 |
Location | [1,0] |
Rule | logic.propositional.buggy.distr |
Location | [1,1] |
Rule | logic.propositional.buggy.distr |
Location | [1,1] |
Rule | logic.propositional.buggy.distr |
Location | [1,1] |
Rule | logic.propositional.buggy.distr |
Location | [1,1] |
Rule | logic.propositional.buggy.distr |
Location | [1,1,0] |
Rule | logic.propositional.buggy.distr |
Location | [1,1,0] |
Rule | logic.propositional.buggy.distr |
Location | [1,1,1] |
Rule | logic.propositional.buggy.distr |
Location | [1,1,1] |
Rule | logic.propositional.buggy.distrnot |
Location | [1,1,1] |
Rule | logic.propositional.buggy.distrnot |
Location | [1,1,1] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1,1,0,0] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1,1,0,0] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1,1,0,0] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1,1,0,0] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1,1,0,0] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1,1,1,0,0] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1,1,1,0,0] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1,1,1,0,0] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1,1,1,0,0] |
Rule | logic.propositional.buggy.equivelim1 |
Location | [1,1,1,0,0] |
Rule | logic.propositional.buggy.equivelim2 |
Location | [1] |
Rule | logic.propositional.buggy.equivelim2 |
Location | [1] |
Rule | logic.propositional.buggy.equivelim2 |
Location | [1] |
Rule | logic.propositional.buggy.equivelim2 |
Location | [1,1,0,0] |
Rule | logic.propositional.buggy.equivelim2 |
Location | [1,1,0,0] |
Rule | logic.propositional.buggy.equivelim2 |
Location | [1,1,0,0] |
Rule | logic.propositional.buggy.equivelim2 |
Location | [1,1,1,0,0] |
Rule | logic.propositional.buggy.equivelim2 |
Location | [1,1,1,0,0] |
Rule | logic.propositional.buggy.equivelim2 |
Location | [1,1,1,0,0] |
Rule | logic.propositional.buggy.equivelim3 |
Location | [1] |
Rule | logic.propositional.buggy.equivelim3 |
Location | [1,1,0,0] |
Rule | logic.propositional.buggy.equivelim3 |
Location | [1,1,1,0,0] |
Rule | logic.propositional.buggy.falseprop |
Location | [] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [0] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,0] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,0,0] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,0,0,0] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,0,0,0,0] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,0,0,1] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,0] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,0,0] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,0,0,0] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,0,0,1] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,0,1] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,0,1,0] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,0,1,1] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,0,1,1,0] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,1] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,1,0] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,1,0,0] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,1,0,0,0] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,1,0,0,1] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,1,0,1] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,1,1] |
Rule | logic.propositional.buggy.idemequiv.inv |
Location | [1,1,1,1,0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,0,0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,0,0,0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,0,0,0,0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,0,0,1] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,0,0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,0,0,0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,0,0,1] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,0,1] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,0,1,0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,0,1,1] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,0,1,1,0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,1] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,1,0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,1,0,0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,1,0,0,0] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,1,0,0,1] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,1,0,1] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,1,1] |
Rule | logic.propositional.buggy.idemimp.inv |
Location | [1,1,1,1,0] |
Rule | logic.propositional.buggy.parenth1 |
Location | [1,0] |
Rule | logic.propositional.buggy.parenth3 |
Location | [1,0] |
Rule | logic.propositional.buggy.trueprop |
Location | [1,1,0,1] |
Rule | logic.propositional.buggy.trueprop |
Location | [1,1,1,0] |
Rule | logic.propositional.command |
Location | [1,1] |
F ∨ (¬(¬q ∨ p) ↔ ((((r ↔ s) ∧ T) ∨ ¬s) ∧ ((r ↔ s) ∨ (T ∧ ¬s))))
ready: no
Rule | logic.propositional.command |
Location | [1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (¬s ∧ T)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | logic.propositional.command |
Location | [1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((T ∧ (r ↔ s)) ∨ ¬s)))
ready: no
Rule | logic.propositional.commor |
Location | [] |
(¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))) ∨ F
ready: no
Rule | logic.propositional.commor |
Location | [1,0,0] |
F ∨ (¬(p ∨ ¬q) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | logic.propositional.commor |
Location | [1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((T ∧ ¬s) ∨ (r ↔ s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | logic.propositional.commor |
Location | [1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (¬s ∨ ((r ↔ s) ∧ T))))
ready: no
Rule | logic.propositional.defequiv |
Location | [1] |
F ∨ (¬(¬q ∨ p) ∧ ((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)) ∨ (¬¬(¬q ∨ p) ∧ ¬(((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | logic.propositional.defequiv |
Location | [1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ∧ s) ∨ (¬r ∧ ¬s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | logic.propositional.defequiv |
Location | [1,1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((((r ∧ s) ∨ (¬r ∧ ¬s)) ∧ T) ∨ ¬s)))
ready: no
Rule | logic.propositional.demorganor |
Location | [1,0] |
F ∨ ((¬¬q ∧ ¬p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | logic.propositional.falsezeroor |
Location | [] |
¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))
ready: no
Rule | logic.propositional.oroverand |
Location | [1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ T) ∧ ((r ↔ s) ∨ ¬s) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | logic.propositional.oroverand |
Location | [1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((r ↔ s) ∨ ¬s) ∧ (T ∨ ¬s)))
ready: no
Rule | logic.propositional.truezeroand |
Location | [1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ ¬s) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | logic.propositional.truezeroand |
Location | [1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((r ↔ s) ∨ ¬s)))
ready: no
Rule | notfalse.inv |
Location | [1,1,0,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (¬F ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notfalse.inv |
Location | [1,1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ ¬F) ∨ ¬s)))
ready: no
¬¬(F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))))
ready: no
Rule | notnot.inv |
Location | [0] |
¬¬F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1] |
F ∨ ¬¬(¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,0] |
F ∨ (¬¬¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,0,0] |
F ∨ (¬¬¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,0,0,0] |
F ∨ (¬(¬¬¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,0,0,0,0] |
F ∨ (¬(¬¬¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,0,0,1] |
F ∨ (¬(¬q ∨ ¬¬p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1] |
F ∨ (¬(¬q ∨ p) ↔ ¬¬(((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (¬¬((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ ((¬¬(r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((¬¬r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ ¬¬s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ ¬¬(T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,0,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (¬¬T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,0,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬¬¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,0,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬¬¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ¬¬(((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (¬¬((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((¬¬(r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((¬¬r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ ¬¬s) ∧ T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ ¬¬T) ∨ ¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬¬¬s)))
ready: no
Rule | notnot.inv |
Location | [1,1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬¬¬s)))
ready: no
Rule | nottrue.inv |
Location | [0] |
¬T ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [] |
T ∧ (F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))))
ready: no
Rule | truezeroand.inv |
Location | [] |
(F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))) ∧ T
ready: no
Rule | truezeroand.inv |
Location | [0] |
(T ∧ F) ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [0] |
(F ∧ T) ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1] |
F ∨ (T ∧ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))))
ready: no
Rule | truezeroand.inv |
Location | [1] |
F ∨ ((¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s))) ∧ T)
ready: no
Rule | truezeroand.inv |
Location | [1,0] |
F ∨ ((T ∧ ¬(¬q ∨ p)) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,0] |
F ∨ ((¬(¬q ∨ p) ∧ T) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,0,0] |
F ∨ (¬(T ∧ (¬q ∨ p)) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,0,0] |
F ∨ (¬((¬q ∨ p) ∧ T) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,0,0,0] |
F ∨ (¬((T ∧ ¬q) ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,0,0,0] |
F ∨ (¬((¬q ∧ T) ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,0,0,0,0] |
F ∨ (¬(¬(T ∧ q) ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,0,0,0,0] |
F ∨ (¬(¬(q ∧ T) ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,0,0,1] |
F ∨ (¬(¬q ∨ (T ∧ p)) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,0,0,1] |
F ∨ (¬(¬q ∨ (p ∧ T)) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1] |
F ∨ (¬(¬q ∨ p) ↔ (T ∧ ((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s) ∧ T))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (T ∧ ((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ T ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((T ∧ (r ↔ s)) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ ((((r ↔ s) ∧ T) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ ((((T ∧ r) ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ ((((r ∧ T) ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ (T ∧ s)) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ (s ∧ T)) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s ∧ T)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s ∧ T)) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬(T ∧ s))) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,0,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬(s ∧ T))) ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ T ∧ (((r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬s) ∧ T))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((T ∧ (r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((T ∧ (r ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((((T ∧ r) ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,0,0,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ ((((r ∧ T) ↔ s) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ (T ∧ s)) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,0,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ (s ∧ T)) ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,0,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T ∧ T) ∨ ¬s)))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ (T ∧ ¬s))))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,1] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ (¬s ∧ T))))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬(T ∧ s))))
ready: no
Rule | truezeroand.inv |
Location | [1,1,1,1,0] |
F ∨ (¬(¬q ∨ p) ↔ (((r ↔ s) ∨ (T ∧ ¬s)) ∧ (((r ↔ s) ∧ T) ∨ ¬(s ∧ T))))
ready: no