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Select the FIRST correct reason why the given series diverges. A. Divergent p-series B. Divergent geometric...
(1 point) Select the FIRST correct reason why the given series diverges. A. Diverges because the terms don't have limit zero B. Divergent geometric series C. Divergent p series D. Integral test E. Comparison with a divergent p series F Diverges by limit comparison test G. Diverges by alternating series test 1. 2. n ln(n) cos(nT) In(4) 02n 3 (n182 +1)" 2n (1 point) Select the FIRST correct reason why the given series diverges. A. Diverges because the terms don't...
(3 points) NOTE: Only 3 attempts are allowed for the whole problem Select the FIRST correct reason why the given series diverges A. Diverges because the terms don't have limit zero B. Divergent geometric series C. Divergent p series D. Integral test E. Comparison with a divergent p series F. Diverges by limit comparison test G. Diverges by alternating series test cos(nT) In(5) 2 1t 00 n(n) 4 1t 1t n In(n) (3 points) NOTE: Only 3 attempts are allowed...
Series Practice: Problem 4 Previous Problem List Next (3 points) NOTE: Only 3 attempts are allowed for the whole problem Select the FIRST correct reason why the given series diverges. A. Diverges because the terms don't have limit zero B. Divergent geometric series C. Divergent p series D. Integral test E. Comparison with a divergent p series F. Diverges by limit comparison test G. Diverges by alternating series test 1.Zn) 2. o0_ ln(n) cos(nT) nIn(6) 4 Series Practice: Problem 4...
Ch9 Review: Problem 17 Prev Up Next (1 pt) Select the FIRST correct reason why the given series diverges. A. Diverges because the terms don't have limit zero B. Divergent geometric series C. Divergent p series D. Integral test E. Comparison with a divergent p series F Diverges by limit comparison test G. Cannot apply any test done so far in class In(n) 72 2. 72 3. COS 7) Cos nTT In(7) 4. 72 72 12 Note: You can earn...
(1 point) Select the FIRST correct reason why the given series converges. A. Convergent geometric series B. Convergent p series C. Comparison with a geometric or p series D. Alternating Series Test E. None of the above 1. Cos(17) (ln(6n) (n + 1)(80)" (n + 2)92n n² | 6. § (-1)",
(1 point) Select the FIRST correct reason why the given series converges. A. Convergent geometric series B. Convergent p series C. Comparison (or Limit Comparison) with a geometric or p series D. Alternating Series Test E. None of the above 1. n² + √n n4 – 4 sin?(2n) n2 E 4 (n + 1)(9)" n=1 2n + 2 cos(NT) 16. In(3n)
(1 pt) Test each of the following series for convergence by either the Comparison Test or the Limit Comparison Test. If either test can be applied to the series, enter CONV if it converges or DIV If it diverges. If neither test can be applied to the series, enter NA. (Note: this means that even if you know a given series converges by some other test, but the comparison tests cannot be applied to it, then you must enter NA...
(1 point) Select the FIRST correct reason on the list why the given series converges. D-1)", n 6 E 1 sin2 (3n) 2. n2 00 (п+ 1)(15)" 3. B 42n n-1 OC 6(6)" A 4. 2n 11 n 1 00 (-1)" In(e") п° cos(пт) C 5. n-1 1 D 6. п(m(n))? п-2 A. Geometric series B. Ratio test C. Integral test D. Comparison with a convergent p series. E. Alternating series test c2 (1 point) Select the FIRST correct reason...
Determine whether the series converges or diverges. n + 1 Σ +n n = 1 The series converges by the Limit Comparison Test. Each term is less than that of a convergent geometric series. The series converges by the Limit Comparison Test. The limit of the ratio of its terms and a convergent p-series is greater than 0. The series diverges by the Limit Comparison Test. The limit of the ratio of its terms and a divergent p-series is greater...
Seleft the FIRST correct reason why the given series converges or chose E for diverges. webwork.math.ttu.edu Select the FIRST correct reason why the given series converges or choose E for Diverges A. Compartson with convergent geonetric serles B. Convergent p serles C. Comparlson with a convergent p serles D. Converges by limit comparlson test E. Diverges 1,000 in 3. kow1 In(k) 7. 8. k+2(k +3) In(k) 10. Note: You can eam partial credit on this problem Preview My Answers Submit...