Finding subclasses of formulae for which the SAT problem can be solved in polynomial time has been an important problem in computer science. We present a new hierarchy of propositional formulae subclasses for which the SAT and counting SAT problems can be solved in polynomial time. Our tractable subclasses are those propositional formulae in conjunctive normal form where any set of k + 1 clauses are related, i.e., there exists at least one literal in one clause that appears negated in another clause of the considered set of k + 1 clauses. We say this subclass of formulae is of rank k and it is different from previously known subclasses that are solvable in polynomial time. This is an improvement over the SAT Dichotomy Theorem and the counti...