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📰 Question: Define $ L(u) = u - rac{u^3}{6} $ for all real $ u $. If $ n $ is a positive integer, define $ a_n $ by $ a_1 = rac{\pi}{2} $, $ a_{n+1} = L(a_n) $. Find $ \lim_{n o \infty} a_n $. 📰 Solution: The recurrence $ a_{n+1} = a_n - rac{a_n^3}{6} $ resembles the Taylor series for $ rctan(u) $, where $ rac{d}{du} rctan(u) = rac{1}{1 + u^2} $. However, the recurrence is not exact. Assume the limit $ L $ exists. Then $ L = L - rac{L^3}{6} \Rightarrow rac{L^3}{6} = 0 \Rightarrow L = 0 $. To confirm convergence, note $ a_1 = \pi/2 pprox 1.57 > 1 $, and $ a_{n+1} = a_n(1 - rac{a_n^2}{6}) $. Since $ a_1 < \sqrt{6} $, $ a_n $ is decreasing and bounded below by 0. By monotone convergence, $ a_n o 0 $. 📰 Question: Find the center of the hyperbola $ 4x^2 - 12x - 9y^2 + 18y = 27 $. 📰 Sba Loan Interest Rates 📰 How To Send Zelle 📰 Verizon Wireless Philipsburg Pa 📰 How A Simple Syringe Might Be The Key To Better Control And Confidence Every Day 1772202 📰 Phishing Microsoft Email 📰 Windows On Startup 📰 Hidden Gains Awaitwatch The Intel Options Chain Like A Money Magnet 4488775 📰 Mercedes Share Price 📰 Verizon 4G Lte Network Extender 3 For Enterprise 📰 Why Oscar Adrian Bergoglio Stole The Spotlight Behind The Popes Shadow 2343113 📰 Credit Card For New Credit 8649239 📰 Ia Writer App 📰 Stock Symbol Opk 19339 📰 Get Ready The Blockbuster New Mario Movie Features Shockwave Moments You Must See 4461630 📰 Mycardwallet