# Proving log_2(n) is in Ω(log_2(log_2(n)) [closed]

I'm studying for an Algorithms exam and one of the practice problems is a little confusing to me. I'm supposed to prove logn is in Ω(log(logn)). I know of two ways to go about this: either using the definition of Ω (finding some constant C such that logn >= c * log(logn) for all c>=C), or using a limit comparison (take lim as n->inf of logn/log(logn) and show it equals infinity). My problem is that I don't really know how to go about finding a constant for the first method, and for the second method I haven't a clue as to how to evaluate that limit. Any tips? Thanks!

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## closed as off topic by Glenn Slaven, Mitch Wheat, poke, Fabio, LittleBobbyTablesOct 9 '12 at 12:42

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`log n >= log (log n)`
using `x >= log x` which in turn is implied by `2^y >= y`.