This chapter will build upon previous achievements on monadic rough objects over the category Set, and show how rough object approximation and algebraic manipulation in general can be enriched by extending constructions to work similarly over monoidal closed categories embracing both algebraic as well as order structures. The chapter will also show how the rough information model in this monoidal closed category extension connects with other information models being relational in their basic original structures. Additionally, the chapter will discuss the potential of real world applications.