Proper Lower Section under Well-Ordering is Initial Segment

Theorem
Let $A$ be a class under a well-ordering $\preccurlyeq$.

Let $B$ be a proper lower section of $A$.

Let $b$ be the smallest element of $A \setminus B$.

Then $B$ is the initial segment of $b$ in $A$.

Proof
By definition of proper lower section of $A$:
 * $\forall x \in B: \forall a \in A \setminus B: x \preccurlyeq a$

while:
 * $B \ne \O$
 * $B \ne A$

Because $B \ne A$ we have that $A \setminus B \ne \O$.

Because $\preccurlyeq$ is a well-ordering, $A \setminus B$ does indeed have a smallest element, which we can indeed call $b$.

We have that:
 * $\forall x \in B: \forall a \in A \setminus B: x \preccurlyeq a$

This applies in particular to $b \in A \setminus B$:


 * $\forall x \in B: \exists b \in A \setminus B: x \preccurlyeq b$

That is, $B$ is the initial segment of $b$ in $A$ by definition.