# How to understand the 5th Normal Form?

I'm using two online sources for gaining an understanding of the 5NF, without any rigor of Math and proofs.

1. A Simple Guide to Five Normal Forms in Relational Database Theory (by Kent. This one seems to have been reviewed and endorsed in one of his writings by none other than CJ Date himself)
2. Fifth Normal Form (Wikipedia article)

However, I'm unable to understand either of these references!

## Let's first examine Reference #1 (Kent's).

It says: "But suppose that a certain rule was in effect: if an agent sells a certain product, and he represents a company making that product, then he sells that product for that company."

and, then, goes on to break up the original table (all table names have been given by me)...

``````acp(agent, company, product)

-----------------------------
| AGENT | COMPANY | PRODUCT |
|-------+---------+---------|
| Smith | Ford    | car     |
| Smith | Ford    | truck   |
| Smith | GM      | car     |
| Smith | GM      | truck   |
| Jones | Ford    | car     |
-----------------------------
``````

... into 3 tables:

``````ac(agent, company)
cp(company, product)
ap(agent, product)

-------------------   ---------------------   -------------------
| AGENT | COMPANY |   | COMPANY | PRODUCT |   | AGENT | PRODUCT |
|-------+---------|   |---------+---------|   |-------+---------|
| Smith | Ford    |   | Ford    | car     |   | Smith | car     |
| Smith | GM      |   | Ford    | truck   |   | Smith | truck   |
| Jones | Ford    |   | GM      | car     |   | Jones | car     |
-------------------   | GM      | truck   |   -------------------
---------------------
``````

But I'm not even sure if I understand the English-language meaning of the above rule. My understanding of the above rule is that its 'then' clause is totally redundant! For,

IF an agent is selling a product

AND

IF this agent is representing a company making that product,

THEN, OBVIOUSLY, this agent is selling that product for that company.

So, where is the 'rule' in this statement? It, in fact, seems to be a non-statement to me!

Working backwards from the three tables -- ac, cp, and ap -- it seems the rule really is: "A company may make 1 or more products, an agent may represent 1 or more companies, and when representing a company he may or may not sell all its products."

But the original table acp was already capturing this rule. So, I'm not sure what is going on here with the explanation of 5NF.

## Let's now examine Reference #2 (Wikipedia).

It says: Suppose, however, that the following rule applies: "A Traveling Salesman has certain Brands and certain Product Types in his repertoire. If Brand B1 and Brand B2 are in his repertoire, and Product Type P is in his repertoire, then (assuming Brand B1 and Brand B2 both make Product Type P), the Traveling Salesman must offer products of Product Type P those made by Brand B1 and those made by Brand B2."

Once again, going just by the English-language meaning of this rule and nothing else,

IF a salesman has brands B1 and B2, and product P with him,

AND

IF product P is made by both brands B1 and B2,

THEN, why on earth wouldn't he be able to offer product P of brands B1 and B2 just as he could in the original 3-column table 'sbp(salesman, brand, product)' which was serving well even before this new 'rule' came into effect?

• It should read "only he sells that product for that company". Couldn't the primary key just be (company, product)? That would implement the rule. – usr Aug 3 '13 at 9:15
• Nope, the moment you throw in 'only', it becomes a totally different problem. I think, I've finally begun to grok what the rule is and therefore what the 5NF is. Inability to understand the rule was my problem, I believe. Thanks, regardless. – Harry Aug 8 '13 at 15:12
• "OBVIOUSLY" is wrong. In general, "IF an agent is selling a product AND [] this agent is representing a company making that product" then it might or might not be the case that "this agent is selling that product for that company"; they might sell it only for other companies. But they must sell it for that company when there's a rule that IF ... THEN .... So a given business might or might not have that rule. PS `if x then y == (not x) or y` So when there's a rule that EITHER NOT (...) OR .... – philipxy Apr 6 '20 at 20:32

See, it is much easier to understand the thing backwards.

First the 5NF; a table (relational variable) is in the 5NF if decomposing it would not remove any redundancies. So, it is final NF as far as removing redundancy is concerned.

The original table obviously has some redundancy. It claims that "Smith represents Ford." twice, and "Smith represents GM." twice.

So let's see is it possible to decompose this into two or more projections and reduce some redundancy.

Let's start backwards.

• Company exists. `{COMPANY}`

• Agent exists. `{AGENT}`

• Product exists. `{PRODUCT}`

• Company makes Product. `{COMPANY, PRODUCT}`

• Agent represents Company. `{AGENT, COMPANY}`

A pause here; suppose a rule was "If an agent represents a company, and the company makes a product, then the agent sells that product".

This would be simply `{AGENT, COMPANY} JOIN {COMPANY, PRODUCT}` ; but this would generate an extra tuple, namely `(Jones, Ford, truck)`; which is not true because Jones does not sell trucks.

So, not every agent sells every product, hence it is necessary to state that explicitly.

• Agent sells Product. `{AGENT, PRODUCT}`

Now if we join

`{AGENT, COMPANY} JOIN {COMPANY, PRODUCT} JOIN {AGENT, PRODUCT}`

that extra tuple is eliminated by the join to the `{AGENT, PRODUCT}`.

To grasp things intuitively, the rule can be modified a bit.

Original

If an agent sells a certain product, and he represents a company making that product, then he sells that product for that company.

Modified (same meaning)

If an agent sells product, and agent represents company, and the company makes that product, then agent sells that product for that company.

Explained (substitute from bullet points above)

If `{AGENT, PRODUCT}` and `{AGENT, COMPANY}` and `{COMPANY, PRODUCT}` then `{AGENT, COMPANY, PRODUCT}`.

So, the rule allows for the join to happen -- and hence the decomposition.

Now compare that to the predicate of the original table:

Agent represents a Company and sells some Product that the company makes.

Not the same as the rule, so it is open to anomalies which would violate the rule -- see Bill Karwin's example.

Suppose that we have the original table, but not the rule.

It is obvious that there is some redundancy in the table, so we may wonder if there is a way to remove that redundancy somehow -- usual way is decomposition into projections of the table.

So, after some tinkering, we figure out that it can be decomposed into `{AGENT, PRODUCT}, {AGENT, COMPANY}, {COMPANY, PRODUCT}`. Current data certainly allows for that -- as per your example.

And we do that, and whenever interested in "Which agent sells which product from which company?" the answer is simply

`{AGENT, COMPANY} JOIN {COMPANY, PRODUCT} JOIN {AGENT, PRODUCT}`

Then Honda shows up, and they make cars and trucks too. Well, no problem there, just insert `(Honda, truck) , (Honda, car)` into `{COMPANY, PRODUCT}`.

Then Smith decides to sell Honda cars, but not trucks. Sorry, no way, oops! Because he already sells cars and trucks, if he wants to represent Honda, he has to sell both.

Because we would have tuples

``````(Smith, Honda) (Honda, truck) (Smith, truck)
(Honda, car)   (Smith, car)
``````

So we have introduced the rule! Really did not want to -- was just trying to get rid of some redundancy.

The question is now, was the original dataset just a fluke, or was it a result of a rule which was enforced somehow outside of the DB?

The author (Kent) claims that the rule exists and the design does not match it. Certainly, it would not be a problem for the original table to accept `(Smith, Honda, car)` only -- not requiring `(Smith, Honda, truck)`.

Theoretical point (ignore if boring)

The rule

`If {AGENT, PRODUCT} and {AGENT, COMPANY} and {COMPANY, PRODUCT} then {AGENT, COMPANY, PRODUCT}`; for every `(Agent, Company, Product)` triplet.

explicitly states that join dependency

`* { {AGENT, COMPANY}, {COMPANY, PRODUCT}, {AGENT, PRODUCT} }`

holds for the original table.

As often stated, cases like this are rare; actually so rare that even textbook examples have to introduce weird rules in order to explain the basic idea.

EDIT II (the fun part, but may help understanding)

Suppose that the rule does not exist, and there is explicit requirement that any agent can sell what ever he wants from any company -- hence the rule would be plain wrong.

In that case we have the original table

`{AGENT, COMPANY, PRODUCT}`

I would argue that:

1. Being all-key, it is in BCNF.

2. It can not be decomposed (current data may allow it, but future does not).

3. It is in BCNF, all key, it can not be decomposed, hence it is in 5NF.

4. It is in 5NF and is all-key, hence it is in 6NF.

So, it is the presence or non-existence of the rule that determines if the table is in BCNF or 6NF -- same table same data.

• Damir, I understood your response only until the line "So, the rule allows for the join to happen ...". That was a VERY beautiful and unique presentation, one that I have never come across before in any database text - so, thanks for that. But could you please clarify the text of your response that includes and follows this line (that I've quote here in this comment)? +1. – Harry Aug 3 '13 at 15:01
• @Harry, ok; but have to travel now, so I'll expand on it sometimes this weekend. – Damir Sudarevic Aug 3 '13 at 16:44
• Thanks, Damir. I have meanwhile posted a comment to Bill Karnin's response also. – Harry Aug 4 '13 at 0:20
• Thanks @Damir for the explanation. I referred to related article by Kent, Wikipedia and Database systems by Thomas Connolly & Carolyn Beg but I find your explanation is simply excellent! Finally, it is rules that rule 5th normal form! – mvsagar Feb 27 '14 at 13:03
• @Damir beautiful explanation! thank you very much for it! – dee zg Jan 15 '17 at 21:36

All normal forms are meant to avoid anomalies, i.e. logical inconsistencies in data.

There's an anomaly possible when you violate 5th normal form, represented by this relation:

``````-----------------------------
| AGENT | COMPANY | PRODUCT |
|-------+---------+---------|
| Smith | Ford    | car     |
| Smith | Ford    | truck   |
| Smith | GM      | car     |
| Jones | Ford    | car     |
| Jones | GM      | truck   |
-----------------------------
``````

So we know Jones works for GM and Ford, and we know that Jones sells cars and trucks. And we know (from Smith) that GM makes cars. So why isn't there a row for `[Jones, GM, car]`? That's an anomaly. Jones should sell GM cars, but there's nothing in this table that makes that consistent.

The problems comes from trying to use one relation to represent multiple independent facts.
If we instead represent these independent facts as independent relations `ac`, `cp`, and `ap`, then we remove the possibility of anomalies.

For purposes of this example, we assume that a salesman is motivated to sell anything he can. If he can sell a type of vehicle, and he works for a company, and the company makes that type of vehicle, then the salesman will definitely sell it.

This premise is stated in William Kent's article:

But suppose that a certain rule was in effect: if an agent sells a certain product, and he represents a company making that product, then he sells that product for that company.

So based on this premise, it's implicit that every possible valid combination should result in a row in the three-column table. That's a business rule that we'd like the data to satisfy.

But in cases that our single table doesn't contain one of the rows necessary to be consistent with that premise, it fails to represent the business rule. Basically, because it introduces the possibility that a "fact" is stored redundantly.

By separating the facts into three tables, each fact is stored exactly once. The result of a JOIN between the three simpler tables naturally produces a relation that is like the original three-column table, except guaranteed to have no anomalies.

• Bill, why do you say, "Jones should sell GM cars..."? Where in the rule does it say that ALL agents representing a company must sell ALL products for that company? Your example relation simply echoes what I've been thinking is the interpretation of the rule. Namely, an agent representing a company may sell only SOME and NOT ALL products that the company makes. I still feel there's something lacking either in the relation data, or in the statement of the rule itself to illustrate 5NF. – Harry Aug 3 '13 at 14:55
• Bill, even though your response was quite enlightening (as are many others on this forum), I really would like to mark Damir's as 'final'. I hope this would be okay with you. (Regrettably, there is no way to mark multiple answers as 'final', making this a conscience-pricking moment for me.) – Harry Aug 8 '13 at 15:34
• @Harry, thanks for that comment. No hard feelings. :-) The important thing for me is that we share good information on StackOverflow. The points are secondary. – Bill Karwin Aug 8 '13 at 17:06
• @Bill Karwin Your single bolded sentence has made me finally realize 5NF after many hours of tedious searching, thank you! – George Menoutis Apr 6 '20 at 13:18
• @GeorgeMenoutis, Glad it clicked into place for you! I also find 4NF easier to understand. My bolded sentence above applies to both 4NF and 5NF, in different ways. – Bill Karwin Apr 6 '20 at 13:26

"IF an agent is selling a product

AND

IF this agent is representing a company making that product,

THEN, OBVIOUSLY, this agent is selling that product for that company. "

This is just totally wrong. Totally. Think about it again.

Ford makes taxis. Ford makes bycicles. GM makes taxis. GM makes bycicles.

I represent Ford. I represent GM. I sell taxis. I sell bycicles.

Now, are all of these 8 statements true in the case where :

I sell taxis, but only the Ford kind. I sell bycicles, but only the GM kind.