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wu :: forums    riddles    putnam exam (pure math) (Moderators: Icarus, towr, Eigenray, Grimbal, william wu, SMQ)    Fibonacci convergence... « Previous topic | Next topic » Pages: 1  Reply Notify of replies Send Topic Print    Author  Topic: Fibonacci convergence...  (Read 589 times) Michael Dagg Senior Riddler     Gender: Posts: 500 Fibonacci convergence...   « on: Jun 23rd, 2006, 8:01am » Quote Modify Let F be Fibonacci. Discuss the convergence of     H = F_1 + sqrt(F_2 + sqrt(F_3 + sqrt(F_4 + ...))). IP Logged Regards, Michael Dagg Barukh Uberpuzzler     Gender: Posts: 2276 Re: Fibonacci convergence...   « Reply #1 on: Jun 25th, 2006, 4:32am » Quote Modify Here’s my attempt on the solution.   1. Define Hn = F1 + sqrt(F2 + sqrt(…+sqrt(Fn)…). Then {Hn} is monotonically increasing sequence.   2. Define Gn = 21 + sqrt(22 + sqrt(…+sqrt(2n)…). Because Fn < 2n, it follows that Fn < Gn.   3. Define also In = 21sqrt(22sqrt(…sqrt(2n)…), where every addition is substituted by a product. It is easy to see that Gn <= In.   4. But In = 2En, where En = sum i21-i. This last sequence has a finite limit (vis. 4).     5. Therefore, Hn < 16, and converges.   Of course, better estimates can be obtained, together with much more general results. IP Logged Barukh Uberpuzzler     Gender: Posts: 2276 Re: Fibonacci convergence...   « Reply #2 on: Jun 25th, 2006, 11:47pm » Quote Modify A better estimate is obtained by using the following identity: (2n+1)2 = 22n+(2n+1+1), therefore   3 = (21+1) = sqrt(22+(22+1)) = sqrt(22+sqrt(24+(23+1))) = … = sqrt(22+sqrt(24+ sqrt(26+…))).   Now, because Fn < 22n-2, it follows H < 4. IP Logged towr wu::riddles Moderator Uberpuzzler Some people are average, some are just mean.     Gender: Posts: 13730 Re: Fibonacci convergence...   « Reply #3 on: Jun 26th, 2006, 2:40am » Quote Modify In a similar way as above, I've tried using (sqrt(2)n + 1)2 = 2n + 2 sqrt(2)n + 1 > 2n + sqrt(2)n+1 + 1   F(n) <= 2n-2 for n >= 2     2 = sqrt(2)0 + 1 > sqrt(20 + (sqrt(2)1 + 1))   > sqrt(20 + sqrt(21 + (sqrt(2)2 + 1)))   > sqrt(20 + sqrt(21 +  sqrt(22 + ... )))   >= sqrt(F(2) + sqrt(F(3) + ...))   1 + 2 = 3 > H   [edit]finally found where I went wrong..[/edit] « Last Edit: Jun 26th, 2006, 3:03am by towr » IP Logged Wikipedia, Google, Mathworld, Integer sequence DB Pages: 1  Reply Notify of replies Send Topic Print Forum Jump: ----------------------------- riddles -----------------------------  - easy   - medium   - hard   - what am i   - what happened   - microsoft   - cs => putnam exam (pure math)   - suggestions, help, and FAQ   - general problem-solving / chatting / whatever ----------------------------- general -----------------------------  - guestbook   - truth   - complex analysis   - wanted   - psychology   - chinese « Previous topic | Next topic »

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