Metrization conditions for topological vector spaces with Baire type properties

We show: (i) A Baire topological vector space is metrizable if and only if it has countable c^{s *}-character. (ii) A locally convex b-Baire-like space is metrizable if and only if it has countable c^{s *}-character. Both results extend earlier metrization theorems involving the concept of the c^{s *}-countable character. Theorem (ii) extends a theorem (Sakai) stating that the space _{C p}(X) has countable c^{s *}-character if and only if X is countable.