(9 marks) Let { ln(n+11) n+3 }n=1 be a sequence. a. Find the first 5 terms...
14 1. (10 marks) Let C be the curve 27x - y = 0 between y=0 and y=4. Sketch the graph of this curve. In each part, set up, but do not ovaluate, an integral or a sum of integrals that solves the problem. (a) Find the area of the surface generated by revolving C about the x-axis by integrating with respect to x (6) Find the area of the surface generated by revolving C about the y-axis by integrating...
Write out the first five terms of the sequence with, \(\left[\frac{\ln(n)}{n+1}\right]_{n=1}\), determine whether the sequence converges, and if so find its limit. Enter the following information for \(a_{n}=\frac{\ln (n)}{n+1}\). \(a_{1}=\) \(a_{2}=\) \(a_{3}=\) \(a_{4}=\) \(a_{5}=\) \(\lim_{n \rightarrow \infty} \frac{\ln (n)}{n+1}=\) (Enter DNE if limit Does Not Exist.) Does the sequence converge (Enter "yes" or "no").
Question 2 (12 marks) (a) Consider the sequence with terms 2n35"5 log n n 1,2,3,.. 13 n8n (i) Determine whether ah diverges. If the sequence converges, find its converges or limit. o0 (ii) Determine whether r diverges. Justify your ansv swer an Converges o n-1 (b) Consider the series (2n)! 2 (n!) and determine whether it converges or diverges. Justify your answer IM8 8 Question 2 (12 marks) (a) Consider the sequence with terms 2n35"5 log n n 1,2,3,.. 13...
1. Write down the first few terms of a sequence. How to determine if a sequence is convergent or divergent? 2. Write down the first few terms of a series. Partol sus 3. Tests to determine if a series is convergent or divergent. Divergent Test, Geometric Series Test, Telescopic Series Test, Integral Test, p-series Test, Comparison Test, Limit Comparison Test, Ratio Test, Root Test, Alternating Series Test 4. How to determine whether a series is geometric and whether it is...
1. Determine the first five terms of the sequence below and graph them using the grid below, clearly labeling the scales. Is the sequence convergent or divergent? If convergent, determine the limit, algebraically. (2 marks total) n - 1 f(n) = NEN n - 2
(1 point) Write out the first five terms of the sequence a n = (-1)^ n-1 (n+4)^ 2 Enter the following information for a, a 1 = a 2 = a 3 = a 4 = a 5 = lim n infty (-1)^ n-1 (n+4)^ 2 = Box (Enter DNE if limit Does Not Exist.) Does the sequence converge Bigg[ (-1)^ n-1 (n+4)^ 2 Bigg] n=1 ^ infty determine whether the sequence converges, and if so find its limit. (Enter...
11 points Problem 3. (3+3+5 pts) Consider the sequence: n sinn n3+1 an a. Is the sequence an convergent? If yes, find its limit. b. Is the sequence an bounded? Justify your answer. c. Is the series Ş an convergent? Justify your answer. n=1 TTT Arial 3 - T. 3.E. GEWindows Totod Lenovo F 7
(1 point) Write out the first five terms of the sequence determine whether the sequence converges, n=1 and if so find its limit. (-1)+1 Enter the following information for an = (n+1)2 lim (-1)^+1 n+ (n + 1)2 (Enter DNE if limit Does Not Exist.) Does the sequence converge (Enter "yes" or "no").
H-4-2. [5 marks] (a) Consider the sequence (2n 1)I and determine whether it is (eventually) (strictly) increasing or (eventually) (strictly) decreasing or not monotonic. YOU DON'T HAVE TO COMPUTE ANY LIMITS (b) Consider the sequence [10n -3"} and determine whether it is (eventually) (strictly) increasing or (eventually) (strictly) decreasing or not monotonic. YOU DONT HAVE TO COMPUTE ANY LIMITS Grading. M2 S1 R1 Cl
Question 2 (12 marks) (a) Consider the sequence with terms 2n3 5"5 log n , n = 1,2,3,.... an 13 n8n (i) Determine whether {an} converges or diverges. If the sequence converges, find its lmit (ii) Determine whether diverges. Justify your answer an COnverges or n-1 (b) Consider the series (2n)! 2" (n!)? n=1 and determine whether it converges or diverges. Justify your answer Question 2 (12 marks) (a) Consider the sequence with terms 2n3 5"5 log n , n...