The database makes use of indexes. This way it can find quickly data related to a given userID.

Depending on the index structure, space occupation etc... there is a gain, i.e. instead of searching N columns, it searches - for instance - `log(N)`

. A search by dichotomy of 100 billions rows

```
N = 100,000,000,000
```

would be

```
Search(N) : search log2(N) = search (36 rows)
```

Instead a searching 10^12 rows, only 36 rows have to be analyzed.

In the case you mention, friends, each user may have several friends, so

```
user1 => (userX, userY, userZ, ...)
userX => (userU, userV, user1, ...)
```

meaning user1 is friend with userX, userY etc...
ie you *don't* have a unique index per user. But you have a unique index per couple of users.

on Mysql that would be

```
UNIQUE(user1,user2)
```

meaning the couple (user1,user2) is only once in the table. The syntax would be

```
CREATE UNIQUE INDEX friendsindex ON friends(user1,user2)
```

*friendsindex* being the index name, *friends* being the table. Or as you said, declaring the table *primary key* to be `(user1,user2)`

(primary keys are unique per table).

--

The strategy to win a game that consists of finding the exact price of a given object is based on the same principle. Say the price is between 1 and 10000. You tell a price, and the handler says `+`

or `-`

. You have to find the price in as less tries as possible. E.g. the price is 6000.

You could start from `1`

and give all prices until `6000`

(ie 6000 tries), but you could also proceed by *dichotomy*

- you: 5000
- gamer: +
- 7500 or (10000 - 5000)/2
- -
- 6250 or (7500 - 5000)/2
- -
- etc...

you divide the remaining range by 2 at each iteration. Instead of 6000 tries, you can find in 12 tries (log2(6000)).

--

About logarithms

For instance, how to find x in `2^x = 1024`

? Or `x = log2(1024)`

meaning *logarithm of 1024 in base 2* (answer: 10). In our story, a 1024 rows table having an index based on a binary tree would need 10 tries (max) to find the right element (instead of 1024 max).