L 2 . Then, the sequence is: Tb Exercise. Consider{an}n=1 where an = increasing decreasing monotonic bounded above bounded below bounded ? Check work (Select all that apply) Now, let .9" 2 22:1 ah. given that lim,HOG s\" = %2' the sequence {sn}n:1 is: increasing decreasing monotonic bounded above bounded below bounded ? Check work (Select all that apply) Exercise. Consider{an}n:1 where a." = 732. Then, the sequence is: increasing decreasing monotonic bounded above bounded below bounded ? Check work (Select all that apply) Now, let .5:n = 22:1 ah. The sequence {sn}n=1 is: increasing decreasing monotonic ? Check work (Select all that apply) Exercise. Select all of the following statements that are true A sequence that is increasing must be bounded below. A sequence that is bounded below must be increasing. An increasing sequence must be bounded above. An increasing sequence that has a limit must be bounded above. A bounded, monotonic sequence must have a limit. If a sequence has a limit, it must be bounded and monotonic. ? Check work Exercise. Consider{an }n=1 where an = 2 + sin(n). Then, the sequence is: increasing decreasing monotonic bounded above bounded below bounded ? Check work (Select all that apply) Now, let 3\" 2 22:1 ak. The sequence {sn}n=1 is: increasing decreasing monotonic (Select all that apply) Exercise. Select all of the following statements that are true A sequence that has a limit must be bounded. If a sequence has a limit, it must be bounded and monotonic. A sequence that is increasing is bounded below by its rst term. If {an} and {bu} are both bounded, then {on + bu} is bounded. A bounded, monotonic sequence must have a limit. A monotonic sequence must have a (nite) limit. 8 Try again