Final answer:
To show that sup(x_k) is bounded, we need to prove that the sequence (x_k) is bounded. the correct option is c) The sequence is bounded.
Step-by-step explanation:
To show that sup(x_k) is bounded, we need to prove that the sequence (x_k) is bounded. A sequence (x_k) is bounded if there exists a real number M such that |x_k| < M for all k. Given that Xn is bounded above, this means that there exists a real number N such that Xn < N for all n.
Now, consider the sequence sup(x_k, for k ≥ n). Since Xn is bounded above, we know that Xn < N for all n. Therefore, the elements of the sequence sup(x_k, for k ≥ n) will be less than or equal to N for all n.
This implies that the sequence sup(x_k, for k ≥ n) is bounded above by N, which in turn means that sup(x_k) is bounded. Hence, the correct option is c) The sequence is bounded.