I think that in this context it means true (so you have 4 booleans and you must produce true when exactly 2 are true). Your textbook should make more sense of the issue. Usually you assert that something is true.

Edit. Here's a 3 variable example for `Conjunctive normal form`

. I'm considering the function true whenever two of them are false. Notice how by reading the variables horizontally and then vertically you get the binary representation of numbers.

```
1 2 3 R
L1 0 0 0 0
L2 0 0 1 1
L3 0 1 0 1
L4 0 1 1 0
L5 1 0 0 1
L6 1 0 1 0
L7 1 1 0 0
L8 1 1 1 0
```

The theory is that you treat each line as a separate equation. If the variable value is 0, you write it as `v`

, and if it is 1 you write it as `~v`

. You use the logical or (`\/`

) between variables on one line, and logican and (`^`

) between different lines. You only and together lines which are false.

So, considering column 1 - `p`

, column 2 - `q`

and column 3 - `r`

, the first line is `p \/ q \/ r`

and the result is false, so it is added to the final formula, the second one `p \/ q \/ ~r`

but true so not added to the formula etc. You need to `and`

(`^`

) the lines together if and only if the formula for the line is false. So above, you would get the CNF by and-ing together lines L1, L4, L6, L7, L8. Once you have that gigantic formula, you can work on making it smaller.

It's been so long since I've done this I can't really remember the details as to why it is like this but I remember studying the proof at some point.