Question

Texts: #66- Determine the convergence or divergence. Methods covered so far: 47. 1 + √n^2 + 9 48. cos(n) / √n^2 + 50 49. cos(√n) / √n^3 + √n^2 + 12 + sin(n) - (√n)^12 / √n^9 + 8 / 2n 50. √n + √n + 1 51. n(√n)^2 52. 12 - 4(√n)^3 / 2n^3 53. √n: 2 + (-1)^n / √n^3/2 54. An = 1 + 9 / √(4/5)n 55. √n^3/2 ln(n) 56. 41 / √k 57. 59. M = 1 / (√n)^4 58. 61. 63. √n^(-1) + (-1)^n 59. 65.

Name: texts 66 determine the convergence or divergence methods covered so far 47 1 n2 9 48 cosn n2 50 49 cosn n3 n2 12 sinn n12 n9 8 2n 50 n n 1 51 nn2 52 12 4n3 2n3 53 n 2 1n n32 54 an 1 9 45n 55 51354
Uploaded: 2023-04-08T13:40:22-08:00
Duration: 2 min 1 s
Channel: Adi S
Description: texts 66 determine the convergence or divergence methods covered so far 47 1 n2 9 48 cosn n2 50 49 cosn n3 n2 12 sinn n12 n9 8 2n 50 n n 1 51 nn2 52 12 4n3 2n3 53 n 2 1n n32 54 an 1 9 45n 55 51354

          Texts: #66- Determine the convergence or divergence.
Methods covered so far: 
47. 1 + √n^2 + 9
48. cos(n) / √n^2 + 50
49. cos(√n) / √n^3 + √n^2 + 12 + sin(n) - (√n)^12 / √n^9 + 8 / 2n
50. √n + √n + 1
51. n(√n)^2
52. 12 - 4(√n)^3 / 2n^3
53. √n: 2 + (-1)^n / √n^3/2
54. An = 1 + 9 / √(4/5)n
55. √n^3/2 ln(n)
56. 41 / √k
57. 59. M = 1 / (√n)^4
58. 61. 63. √n^(-1) + (-1)^n
59. 65.

texts 66 determine the convergence or divergence methods covered so far 47 1 n2 9 48 cosn n2 50 49 cosn n3 n2 12 sinn n12 n9 8 2n 50 n n 1 51 nn2 52 12 4n3 2n3 53 n 2 1n n32 54 an 1 9 45n 55 51354

Added by Eileen M.

Elementary and Intermediate Algebra

Alan S. Tussy, R. David Gustafson 5th Edition

Instant Answer

Solved by Expert Adi S

04/08/2023

Step 1

Since the terms of the series are increasing as n increases, the series diverges. Show more…

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Texts: #66- Determine the convergence or divergence. Methods covered so far: 47. 1 + √n^2 + 9 48. cos(n) / √n^2 + 50 49. cos(√n) / √n^3 + √n^2 + 12 + sin(n) - (√n)^12 / √n^9 + 8 / 2n 50. √n + √n + 1 51. n(√n)^2 52. 12 - 4(√n)^3 / 2n^3 53. √n: 2 + (-1)^n / √n^3/2 54. An = 1 + 9 / √(4/5)n 55. √n^3/2 ln(n) 56. 41 / √k 57. 59. M = 1 / (√n)^4 58. 61. 63. √n^(-1) + (-1)^n 59. 65.