6. Consider a sequence {an}n=1∞ such that, for any convergent subsequence {ank} of {an}, the sequence {ank+1} also is convergent and has the same limit as {ank}. Prove that the sequence {an} is either convergent of has infinitely many accumulation points the set of which is dense in itself. Give an example for the second case. (A sequence xn→∞ or −∞ is considered to be convergente, too)
(S. 13) college contestsreal analysis