Power Set Exists and is Unique

Theorem
Let $V$ be a basic universe.

Let $x \in V$ be a set.

Let $\powerset x$ denote the power set of $x$.

Then $\powerset x$ is guaranteed to exist and is unique.

Proof
By the Axiom of Specification an arbitrary subclass of $x$ can be created.

Hence we can create the class of all such subclasses.

Hence $\powerset x$ exists.

Let $\powerset x$, $\map \QQ x$ both be power sets of $x$.

From definition of power sets:
 * $\forall T$:
 * $T \in \powerset x \iff T \subseteq x$
 * $T \in \map \QQ x \iff T \subseteq x$

From Biconditional is Commutative and Biconditional is Transitive:
 * $T \in \powerset x \iff T \in \map \QQ x$

By the Axiom of Extension:
 * $\powerset x = \map \QQ x$

Hence the power set is unique.