I cannot understand the following solution from my tutorial note.
The question is like this:
Let $P(x)$ be a predicate with universe of discourse $\{a,b,c\}$. The quantifier $\exists!$ is used to assert that there is a unique element of the universe of discourse which makes a predicate true. Now express $\exists ! xP(x)$ using only the operators $\land$, $\lor$ and $\lnot$.
The answer is:
$\exists ! xP(x) \equiv P(a) \lor P(b) \lor P(c) \lor [\lnot P(a) \land P(b) \land \lnot P(c)] \lor [P(a) \land \lnot P(b) \land \lnot P(c)]\lor [\lnot P(a) \land \lnot P(b) \land P(c)]$
What is the meaning of the last three parts?
$\lor [\lnot P(a) \land P(b) \land \lnot P(c)] \lor [P(a) \land \lnot P(b) \land \lnot P(c)]\lor [\lnot P(a) \land \lnot P(b) \land P(c)]$