I've been reading many different sources on how to differentiate relations that are in 3NF/BCNF. And I've so far this is my understanding...

I will use this relation as an example...

`R = {A, B, C, D, E}`

and

`F = {A -> B, B C - > E, E D -> A}`

.

Firstly we must find the keys of the relation. I used this video to help me do that. And I got

`Keys = {ACD, BCD, CDE}`

Now to make sure `R`

is in **BCNF**, we must make sure that the left hand side of every functional dependency in `F`

is one of the `Keys`

. We instantly know this is not the case, because the first FD is `A -> B`

and `A`

is not one of the keys. **So it is not in BCNF.**

Now to make sure `R`

is in **3NF**, we must make sure that the left hand side of every functional dependency in `F`

is one of the `Keys`

**OR** the right hand side of every functional dependency in `F`

is a subset of one of the `Keys`

. If you look at the right hand side of every FD, they are `B`

, `E`

and `A`

. These are each a subset of a `Key`

, so this means that **it is in 3NF**.

So this is one of the *rare* cases (according to wiki) where a relation is in `3NF`

but **not** in `BCNF`

. Is this method correct? Is it reliable? Am I missing anything?