# 2nd Normal Form

I have a question:

Considering a relation R{A,B,C,D,E,F} with the next set of functional dependencies `{ABC->DEF,D->E,ABC->A}.` A, B and C are Prymary Keys.

Can you explain me why this is on 2nd NF? Thanks.

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`A,B,C` are PK ? – Grijesh Chauhan Jan 10 '13 at 17:24
Yes they are PK. – tomss Jan 10 '13 at 17:24
{ABC} is a candidate key. It's the only candidate key. – Mike Sherrill 'Cat Recall' Jan 10 '13 at 17:51

Can you explain me why this is on 2nd NF?

I'm not quite sure what "why this is on 2nd NF" means. (Typo?) But the relation R is not in 3NF, because there's a transitive dependency: ABC->D, and D->E. So relation R must be in either 1NF or 2NF.

Relation R is in 2NF if and only if

• it's in 1NF, and
• there are no partial key dependencies.

ABC->A might look like a partial key dependency, but it's not, because "A" is a prime attribute. (ABC->A is a trivial dependency, because A->A.) The non-prime attributes are {DEF}. None of those attributes are functionally dependent on only part of any candidate key (a more general way of saying they're not functionally dependent on part of this relation's primary key).

So relation R is in 2NF.

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Can you give me an example of a partial key example in this case? Thanks. – tomss Jan 10 '13 at 18:08
If C->Z were a functional dependency here, and {ABC} were the only candidate key, C->Z would be a partial key dependency. Z is dependent on part of a candidate key. – Mike Sherrill 'Cat Recall' Jan 10 '13 at 20:22