Exercise logic.propositional.dnf.unicode
Description
Proposition to DNF (unicode support)
Firsts
Rule | logic.propositional.idempand |
Location | [0] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
(¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s ∨ (r ↔ s) ∨ ¬s)) ∨ (¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s))
ready: no
Rule | logic.propositional.falsezeroor |
Location | [0,0,1] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
((¬(q → p) ↔ ((r ↔ s) ∨ ¬s ∨ (r ↔ s) ∨ ¬s)) ∧ (¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s ∨ (r ↔ s) ∨ ¬s))) ∨ (¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s))
ready: no
Rule | logic.propositional.falsezeroor |
Location | [0,1,1] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
((¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s ∨ (r ↔ s) ∨ ¬s)) ∧ (¬(q → p) ↔ ((r ↔ s) ∨ ¬s ∨ (r ↔ s) ∨ ¬s))) ∨ (¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s))
ready: no
Rule | logic.propositional.idempor |
Location | [0,0,1] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
((¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s)) ∧ (¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s ∨ (r ↔ s) ∨ ¬s))) ∨ (¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s))
ready: no
Rule | logic.propositional.idempor |
Location | [0,0,1,1] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
((¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s)) ∧ (¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s ∨ (r ↔ s) ∨ ¬s))) ∨ (¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s))
ready: no
Rule | logic.propositional.idempor |
Location | [0,1,1] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
((¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s ∨ (r ↔ s) ∨ ¬s)) ∧ (¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s))) ∨ (¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s))
ready: no
Rule | logic.propositional.idempor |
Location | [0,1,1,1] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
((¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s ∨ (r ↔ s) ∨ ¬s)) ∧ (¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s))) ∨ (¬(q → p) ↔ (F ∨ (r ↔ s) ∨ ¬s))
ready: no