The Problem "Consider a relation R with five attributes ABCDE. You are given the following dependancies
List all the keys for R.
The teacher gave us the keys, Which are ACD,BCD,CDE
And we need to show the work to get to them.
The First two I solved. For BCD, the transitive of 2 with 3 to get (BC->E)D->A => BCD->A.
and for ACD id the the transitive of 1 with 4 (BCD), to get (A->B)CD->A => ACD->A But I can't figure out how to get CDE.
So it seems I did it wrong, after googling I found this answer
- methodology to find keys: consider attribute sets α containing: a. the determinant attributes of F (i.e. A, BC, ED) and b. the attributes NOT contained in the determined ones (i.e. C,D). Then do the attribute closure algorithm: if α+ superset R then α -> R Three keys: CDE, ACD, BCD Source
From what I can tell, since C,D are not on the left side of the dependencies. The keys are left sides with CD pre-appended to them. Can anyone explain this to me in better detail as to why?