For any Lie-Rinehart algebra $(A,L)$, B(atalin)-V(ilkovisky) algebra structures $\partial$ on the exterior $A$-algebra ${\Lambda }_{A}L$ correspond bijectively to right $(A,L)$-module structures on $A$; likewise, generators for the Gerstenhaber algebra ${\Lambda }_{A}L$ correspond bijectively to right $(A,L)$-connections on $A$. When $L$ is projective as an $A$-module, given a B-V algebra structure $\partial$ on ${\Lambda }_{A}L$, the homology of the B-V algebra $({\Lambda }_{A}L,\partial )$ coincides with the homology of $L$ with coefficients in $A$ with reference to the right $(A,L)$-module structure determined by $\partial$. When $L$ is also of finite rank $n$, there are bijective correspondences between $(A,L)$-connections on ${\Lambda }_A^{n}L$ and right $(A,L)$-connections on $A$ and between left $(A,L)$-module structures on ${\Lambda }_A^{n}L$ and right $(A,L)$-module structures on $A$. Hence there are bijective correspondences between $(A,L)$-connections on ${\Lambda }_A^{n}L$ and generators for the Gerstenhaber bracket on ${\Lambda }_{A}L$ and between $(A,L)$-module structures on ${\Lambda }_A^{n}L$ and B-V algebra structures on ${\Lambda }_{A}L$. The homology of such a B-V algebra $({\Lambda }_{A}L,\partial )$ coincides with the cohomology of $L$ with coefficients in ${\Lambda }_A^{n}L$, with reference to the left $(A,L)$-module structure determined by $\partial$. Some applications to Poisson structures and to differential geometry are discussed.