Answer to Question #307665 in Abstract Algebra for Nessielle Jean

Since "f'=f'," we conclude that "f\\sim f," and hence the relation is reflexive.

Let "f\\sim g." Then "f'=g'," and hence "g'=f'." We conclude that "g\\sim f," and hence the relation is symmetric.

Let "f\\sim g" and "g\\sim h." Then "f'=g'" and "g'=h'." It follows that "f'=h'," and hence the relation is transitive.

Therefore, this relation is an equivalence relation.

Let us describe the equivalence classes of "S."

It follows that

"[f]=\\{g\\in S:g\\sim f\\}=\\{g\\in S:g'=f'\\}\n\\\\=\\{g\\in S:g=f+C,C\\in \\R\\}=\\{f+C:C\\in \\R\\}"