Image of Intersection under Injection

Theorem
Let $$f: S \to T$$ be an injection. Let $$A$$ and $$B$$ be subsets of $$S$$. Then:

$$f \left({A \cap B}\right) = f \left({A}\right) \cap f \left({B}\right)$$

Proof
An injection is a type of one-to-one relation, and therefore also a one-to-many relation. Therefore, from One-to-Many Image of Intersections:

$$\mathcal{R} \left({A \cap B}\right) = \mathcal{R} \left({A}\right) \cap \mathcal{R} \left({B}\right)$$