Final answer:
The intersection of any two sets Aₙ and Aₙ₊₁ is the empty set. The set Aₙ is a subset of Aₙ₊₁ for all values of n.
Step-by-step explanation:
The given family of sets is defined as:
Aₙ = [-2n+1, 1/2n)
To determine which statements are true, let's analyze each option:
- Statement 1: The intersection of any two sets Aₙ and Aₙ₊₁ is the empty set.
- This statement is true because for any n, the interval [-2n+1, 1/2n) does not overlap with the interval [-2(n+1)+1, 1/2(n+1)), resulting in an empty intersection.
- Statement 2: The union of any two sets Aₙ and Aₙ₊₁ is the set Aₙ.
- This statement is false because the union of Aₙ and Aₙ₊₁ would include the intervals [-2n+1, 1/2n) and [-2(n+1)+1, 1/2(n+1)), resulting in a larger interval.
- Statement 3: The set Aₙ is a subset of Aₙ₊₁ for all values of n.
- This statement is true because the interval [-2n+1, 1/2n) is entirely contained within the interval [-2(n+1)+1, 1/2(n+1)).
Therefore, the correct statements are:
- The intersection of any two sets Aₙ and Aₙ₊₁ is the empty set.
- The set Aₙ is a subset of Aₙ₊₁ for all values of n.