Set Intersection Preserves Subsets/Families of Sets/Intersection is Empty Implies Intersection of Subsets is Empty

Theorem
Let $I$ be an indexing set.

Let $\left \langle {A_\alpha} \right \rangle_{\alpha \mathop \in I}$ and $\left \langle {B_\alpha} \right \rangle_{\alpha \mathop \in I}$ be indexed families of subsets of a set $S$.

Let:
 * $\forall \beta \in I: A_\beta \subseteq B_\beta$

Then:
 * $\displaystyle \bigcap_{\alpha \mathop \in I} B_\alpha = \empty \implies \bigcap_{\alpha \mathop \in I} A_\alpha = \empty$

Proof
Let $\displaystyle \bigcap_{\alpha \mathop \in I} B_\alpha = \empty$.

From Set Intersection Preserves Subsets/Families of Sets,
 * $\displaystyle \bigcap_{\alpha \mathop \in I} A_\alpha \subseteq \bigcap_{\alpha \mathop \in I} B_\alpha = \empty$

From Subset of Empty Set,
 * $\displaystyle \bigcap_{\alpha \mathop \in I} A_\alpha = \empty$.