2021 Fall AMC 12B Problems/Problem 18
Problem
Set , and for let be determined by the recurrence
This sequence tends to a limit; call it . What is the least value of such that
Solution
If we list out the first few values of k, we get the series , which seem to always be a negative power of 2 away from . We can test this out by setting to .
Now,
This means that this series approaches , as the second term is decreasing. In addition, we find that .
We see that seems to always be above a power of . We can prove this using induction.
Claim:
Base case:
Induction:
It follows that , and . Therefore, the least value of would be .
-ConcaveTriangle