Question

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1. (a) Find T5(x), the Taylor polynomial of degree 5, for Inx centered at x = 1. (b) Evaluate Ts (3). How close is its value to In 3? (c) The interval of convergence for the Taylor series of In x centered at x= 1 is (0,2). Use the fact that Inx= - In to find a different value of x to use in Ts(x) to approximate In 3. How close is your approximation? 2. Long ago, we saw that some functions cannot be integrated symbolically, but that we could approximate such an integral numerically. Another approach uses Taylor series. (-1)"x2+1 (a) Use the fact that sin x = 2 (2n +1)! to write a series expression for sint? dt. (b) Use the first four non-zero terms of your series to approximate sint? dt.

Answer 1

③ a Times = lun centered the 1. Taylor series at point n a i fas = fras t ' f'al (uma) + f "cas comoditat fa" (aCerested to foco complet Forening t.; If”(93(x-ajn Inn n! let Tong = Tayla series be fm cas Caragh nco facasenn h = taciu kan pro nel fias (arag" CHY (1) no a thics (oc) -- Centro - Como M-3 ficar que el seu continuo 2 cm de n= 4 façan) kepada- nos focos (aq)" • 84 hrad* 0 460 eur

using -2 £ x L 2 J set da Ts (2) = (2-1) 1 (1) + + - ₂ + + Ts (2) = 0.78333 o sinn - 7 Ei un senti Eijn ocantl Quf|3! Sint = Guntento d=t² (anti! neo - thot & Sin t² = to to * 14 t 5040 sont dt = - +5" -t team 2/2 Tino 75600 -dt = et olete Cos Set x=2 sin to dt = 2 27 +2" - als 1320 75600 = 0.7371236

T, CH = (4) -- L (9-134 + 6-p? - Gamb teule 1(-10 ² - Cox 6) Ts (8) at d=3 tight alon Ts as ::TO) = (2) - $0.45 +65_-61437632.) . Ts (3) = 5.06667 In3 = 1.0986123 not so close at ces since lun converge on Co, e] then lox - Ž Girl (x-u Ost nal since since i Inn = - in(t) a Inde - 5 tront (-1)?.. 1 nal. (ijn (1-xJn 2LRL to let nel a= L = 2