Final answer:
The set of integers greater than 10 is countably infinite and can be put into a one-to-one correspondence with the natural numbers using the formula n ↔ n+10. Statements regarding it being finite or correspondences using incorrect formulas are incorrect.
Step-by-step explanation:
The question is asking about the characteristics of the set of integers greater than 10. To evaluate the given statements:
- The set of integers greater than 10 is countably infinite. This means that the set has an infinite number of elements but can be put into a one-to-one correspondence with the natural numbers.
- Statement a is correct because you can list the integers greater than 10 in a sequential order starting from 11, 12, 13, and so on, which demonstrates its countably infinite nature.
- Statement b is incorrect as the set of integers greater than 10 is not finite; there is no upper limit to the numbers.
- Statement c and e are incorrect because they provide various incorrect ways of creating a correspondence. The correct correspondence would be simply n ↔ n+10.
- Statement d is incorrect because n(n+10) does not create the integers greater than 10; it produces a different sequence of numbers.
- Statement f provides an incorrect formula for one-to-one correspondence. The correct formula for mapping a counting number n to an integer greater than 10 would be n ↔ n+10.