The image you uploaded shows symbols related to set theory and their corresponding membership interpretations. These symbols are typically used to denote membership or non-membership of elements within sets.

Here is an interpretation of each symbol:

1. ∈ (Element of): This symbol means that an element is a member of a set.
2. ∃ (There exists): This symbol is used in logic to indicate the existence of at least one element that satisfies a given property.
3. ∉ (Not an element of): This symbol means that an element is not a member of a set.
4. ∀ (For all): This symbol is used in logic to indicate that a property holds for all elements in a set or domain.

If you have a list of interpretations in the dropdown, you can match them accordingly.

Would you like further details on these symbols or need clarification on something specific?

Here are 5 related questions:

1. What are some other set symbols used in mathematics?
2. How do existential quantifiers relate to set theory?
3. Can you provide examples of sets using these symbols?
4. What is the difference between ∈ and ∉ in practical examples?
5. How are these symbols used in proofs and mathematical logic?

Tip: When working with symbols like ∈ and ∉, always remember that they express relationships between elements and sets, which are foundational in mathematical set theory.