Casselgren, Markstörm, and Pham conjectured that any precolored dis\-tan\-ce-2 matching in the $d$-dimensional cube $Q_d$ with at most $d$ colors can be extended to a proper $d$-edge-coloring. In this paper, we prove this conjecture and some related theorems. Especially, our result establishes that if $G$ is a bipartite graph, then a precolored distance-2 matching in the Cartesian product $H = G \mathbin{\Box} K_{2m}$ with at most $χ'(H) = Δ(H) = Δ(G) + 2m - 1$ colors can be extended to an edge-coloring using at most $χ'(H)$ colors. As another generalization, we establish a similar result for the Cartesian product $G \mathbin{\Box} K_{1,m}$.