Exercise logic.propositional.cnf.unicode
Description
Proposition to CNF (unicode support)
Firsts
Rule | logic.propositional.falsezeroand |
Location | [0,1,0,1] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
¬((((r ↔ r) ∨ F) ∧ T ∧ r) ∨ ((((r ↔ r) ∧ T) ∨ F) ∧ (r ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ ((r ↔ r) ∨ F ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ T ∧ r))
ready: no
Rule | logic.propositional.falsezeroand |
Location | [0,1,0,1] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
¬((((r ↔ r) ∨ F) ∧ T ∧ r) ∨ ((((r ↔ r) ∧ T) ∨ (F ∧ r ∧ ((r ↔ r) ∨ F))) ∧ (r ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ ((r ↔ r) ∨ F ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ T ∧ r))
ready: no
Rule | logic.propositional.falsezeroand |
Location | [0,1,0,1] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
¬((((r ↔ r) ∨ F) ∧ T ∧ r) ∨ ((((r ↔ r) ∧ T) ∨ (F ∧ ((r ↔ r) ∨ F))) ∧ (r ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ ((r ↔ r) ∨ F ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ T ∧ r))
ready: no
Rule | logic.propositional.truezeroand |
Location | [0,1,0,0] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
¬((((r ↔ r) ∨ F) ∧ T ∧ r) ∨ (((r ↔ r) ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ (r ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ ((r ↔ r) ∨ F ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ T ∧ r))
ready: no
Rule | logic.propositional.truezeroand |
Location | [0,1,0,1] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
¬((((r ↔ r) ∨ F) ∧ T ∧ r) ∨ ((((r ↔ r) ∧ T) ∨ (F ∧ r ∧ ((r ↔ r) ∨ F))) ∧ (r ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ ((r ↔ r) ∨ F ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ T ∧ r))
ready: no
Rule | logic.propositional.truezeroand |
Location | [0,1,0,1,1] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
¬((((r ↔ r) ∨ F) ∧ T ∧ r) ∨ ((((r ↔ r) ∧ T) ∨ (F ∧ r ∧ ((r ↔ r) ∨ F))) ∧ (r ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ ((r ↔ r) ∨ F ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ T ∧ r))
ready: no
Rule | logic.propositional.falsezeroor |
Location | [0,1,0,1,1,1,1] |
Term | "Nothing" |
Focus | "Nothing" |
Environment | |
¬((((r ↔ r) ∨ F) ∧ T ∧ r) ∨ ((((r ↔ r) ∧ T) ∨ (F ∧ T ∧ r ∧ (r ↔ r))) ∧ (r ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ ((r ↔ r) ∨ F ∨ (F ∧ T ∧ r ∧ ((r ↔ r) ∨ F))) ∧ T ∧ r))
ready: no