The exercise is taken from Rudin, principles of mathematical analysis, chapter 2 ex. 1.
Let $A$ a set and let also $B$ such that $A \cap B = \emptyset$ This implies:
$$ \emptyset = A \cap B \subseteq A, $$
For given $A$ the set $B$ can always be found, for example take $B = A^C$, the complement of $A$. Is such proof correct?
Looks good. We can also do it like this:
$A \subset B$ is equivalent to saying $x \in A \implies x \in B$. This statement is vacuously true when $A = \varnothing$ (since there is no $x \in A$) and $B$ is any set. (even the empty set!)
You're missing the essential point. In fact, I'd say this is essentially circular. How do you know that the intersection of two sets is necessarily a subset of both of them? If $A \cap B$ is non-empty, then let $x \in A \cap B$ and, by definition, $x \in A \land x \in B$ which proves the theorem. However, if $A$ and $B$ are disjoint, then this proof isn't quite as obvious, is it?
To prove the exercise, note that $x \in \emptyset \implies x \in S$ means the same thing as $x \notin \emptyset \ \lor x \in S $. However, $\forall x, x \notin \emptyset$ and so the theorem is proved.
$$\emptyset \subset A \equiv (\forall x) (x \in \emptyset \Rightarrow x \in A) \equiv \neg (\exists x) (x \in \emptyset \land x \notin A)$$
As $\emptyset$ is the empty set, $x \in \emptyset$ can never be true, i.e., $x \in \emptyset \land x \notin A$ is always false. Thus, $(\exists x) (x \in \emptyset \land x \notin A)$ is false and its negation is true. Hence, $\emptyset \subset A$ is true regardless of $A$.
I don't like it.
It works in the context of some set $X$ serving as universe and containing $A$ as subset.
In my view preferable is: $\varnothing=A-A\subseteq A$.
Even more preferable: you can just prove that every element of $\varnothing$ is an element of $A$. This is vacuously true: no element of $\varnothing$ can be found that is not an element of $A$. Even stronger: no element of $\varnothing$ can be found at all.
