# Determine the highest normal form

I really have no clue how to figure this out. I've read through all the normal forms, but still have trouble understanding it. I hope someone can help me understand it.

Relation schema is R(A,B,C,D,E,F) with (A -> BCD, BC -> DE, B -> D, D -> A).

What is the highest normal form and why?

Any help is appreciated, thanks.

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If A -> BCD and D -> A, surely you've got a recursive relationship? –  Mark Bannister Nov 5 '10 at 12:48
@Mark Bannister... The FD `A -> BCD` may be decomposed using Armstrong's axioms into `A -> B`, `A -> C` and `A -> D`. Then we have FD's: `A -> D` and `D -> A` which is just a strict 1 to 1 relationship. The "interesting" FD's are those with multiple attributes on the left hand side (eg. BC -> DE). –  NealB Nov 5 '10 at 16:52
@Roger Pate: thanks for letting me know, I was not aware of that fact. –  Gintautas Miliauskas Nov 9 '10 at 6:38

I believe the highest Normal Form you may achieve here would be 3NF or BCNF. I say this is because:

• 1NF requires the elimination of repeating groups and attributes are atomic. You do not have any repeating groups so the requirements for 1NF have been met by default.
• 2NF and 3NF deal with how relations are constructed with respect to Functional Dependencies. I see you have the following Functional Dependencies described: (A -> BCD, BC -> DE, B -> D, D -> A). Given these, you may structrue relations into 2NF, 3NF and possibly BCNF.
• 4NF and above deal with multi-valued facts. You have not described any of these so it is reasonable to presume there are none. Some may argue that any BCNF relation where no multi-valued facts exist is also in 4NF - I don't want to get into that one because it just boils down to a "glass half full/empty" type of arguement.

I have not taken the time to sort out all of the FD's (it is your homework after all), but I would pay close attention to the FD's: `BC -> D`, `D -> A` and `A -> B`.

The difference between 3NF and BCNF is a bit subtle. This slide show and Wikipedia article should help sort it out.

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The highest Normal form is 1NF here, because there are total 3 candidate keys which are AF,DF,BF. So from the given FD set there is partial FD exist, and as per rule , Partial FDs are not allowed in the 2NF. so highest Normal Form is 1NF.

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F doesn't appear anywhere.

There are two possibilities. Either that's the point of the exercise, or the exercise is flawed.

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Third possibility: `F` is a stand-alone attribute not involved in any functional dependency. –  NealB Nov 5 '10 at 18:00