Canonical Injection into Cartesian Product of Modules

Theorem
Let $\struct {R, +_R, \times_R}$ be a ring.

Let $\struct {G, +, \circ}_R$ be the cartesian product of a sequence $\sequence {\struct {G_n, +_n, \circ_n}_R}$ of $R$-modules.

Then for each $j \in \closedint 1 n$, the canonical injection $\inj_j$ from $\struct {G_j, +_j, \circ_j}_R$ into $\struct {G, +, \circ}_R$ is a monomorphism.