Final answer:
For t to be a subsequential limit of sequence (an), there must be infinitely many terms within the interval (t - ε, t + ε) for any epsilon (ε) greater than 0, making the correct answer A.
Step-by-step explanation:
The student asked about the condition for a real number t to be a subsequential limit of a sequence (an) where n exists in natural numbers (N). For a real number t to be a subsequential limit of the sequence (an), for all epsilon (ε) greater than 0, there must exist infinitely many terms of the sequence within the interval (t - ε, t + ε). Therefore, the correct answer is A. (t - ε, t + ε).
This criterion for subsequential limits relates to the concept of a sequence converging to a limit. If the sequence has infinitely many terms within every interval around t, no matter how small, this indicates that t can be approached as closely as desired by terms of the sequence, which is the definition of a subsequential limit.