The Problem "Consider a relation R with five attributes ABCDE. You are given the following dependancies

- A->B
- BC->E
- ED->A

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?