1220-90 Exam 2 Fall 2012 Name KY Instructions. Show all work and include appropriate explanations when necessary. A correct answer without accompanying work may not receive full credit. Please try to do all all work in the space provided. Please circle your final answer. 1. (l6pts) Evaluate the following limits using L’Hôpital’s rule or any other method. Ll+ X (a) (4pts) lim (_j,,) x—*oln(1—x) (4pts) urn - cosx—1 X- I (fr)(1) )( —) 0 yx .L — (d) (4pts) lirn xe — •2- I x 2... 2-. Z 2... 9 — —— lnx x-+oov; ) — — (c) (4pts) lim (x—i I I.AA — x— — 2. (8pts) Consider the sequence with first five terms given by 2 a = 2 1 a 1 3 a = 3 4 a4= 5 a = 5 (a) (3pts) Assuming the sequence continues on in this manner, find a formula for a. a (b) (3pts) lim a = I (c) (2pts) Is this sequence convergent or divergent? 1 =___________ 3. (llpts) In this problem, you will compute the value of an indefinite integral in two steps. (a) (7pts) Use substitution to compute the definite integral I 2 zeX Jo Note: Your answer should be a function of t. I C Jx€ - (e —1 - /0 0 ) 2(b) (4pts) Take the limit as t —+ cc of your answer in part (a) to find I pt 2 xe dx Jo = lim I 2 xe_X dx. 0 t_cxJ / -- (,‘ —xz_• (Lz* L Ja xe-,t?( b : 4. (l5pts) All of the following series are convergent. Evaluate them. ()fl L (a) (5pts) 1- (j ‘1---L)i 6--I-v- e..L4S r4<l, CL% )i2’-c- rLC1e9)YW J L) r ([-r I (b) (5pts) a/c) 22 2— (o 00/1 (c) (5pts) > 1 n+1 - ÷c1+’ 4 it’,’- LA- k-I) L2 (j 1 PH 5. (2Opts) Determine, by whatever method you wish, whether the following series are convergent or divergent. Circle ‘C’ if the series is convergent or ‘D’ if the series is divergent. C ? D 2n+3 C D ne c(2)fl1 D LI 2—I 6. (lOpts) Find the first four terms of the power series representation = v;at is 3 (1 2x) = C0 + dx x + cx 2 3 +... +c the radius of convergence of this power series? f l( . 3 1.- 3 (—2.x) 3 — (p—ax) + R ) iD I, /1 -1’ — LA xx “ d ,- / ‘ / \.- 11 c_ — — \J .? cJ- ‘-) F H S U’ I.” F ‘— cf\