Homework Answers
sir
series a converges by limit comparision test and series b converges
by direct comparision test. We can't use other test because root
test gives value 1.and there is sine function on second series.
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Consider the series Consider the statments (A) The series a) converge by the ....... test with...
Series converge or diverge By using integral test, the convergence or divergence of following series can...
Series converge or diverge
By using integral test, the convergence or divergence of following series can be determined.. * cos(n2 + 1 732 TRUE (because ...... FALSE Explain why. The following integral Converges by direct comparison test. TRUE because. .... FALSE because
00 Does the series Σ (-1)". n n+6 converge absolutely, converge conditionally, or diverge? n=1 Choose...
00 Does the series Σ (-1)". n n+6 converge absolutely, converge conditionally, or diverge? n=1 Choose the correct answer below and, if necessary, fill in the answer box to complete your choice. A. The series converges conditionally per the Alternating Series Test and because the limit used in the Root Tes O B. The series converges absolutely because the limit used in the Ratio Test is O C. The series diverges because the limit used in the Ratio Test is...
Does the series (-1)"+1 n n+1 converge absolutely, converge conditionally, or diverge? n=1 Choose the correct...
Does the series (-1)"+1 n n+1 converge absolutely, converge conditionally, or diverge? n=1 Choose the correct answer below and, if necessary, fill in the answer box to complete your choice. OA. 1 The series converges conditionally per Alternating Series Test and the Comparison Test with n + 1 n = 1 O B. The series diverges because the limit used in the Ratio Test is not less than or equal to 1. OC. The series converges conditionally per the Alternating...
please show all steps 00 Does the series 2 (-1)n +16+n 8+n converge absolutely, converge conditionally,...
please show all steps
00 Does the series 2 (-1)n +16+n 8+n converge absolutely, converge conditionally, or diverge? n=1 Choose the correct answer below and, if necessary, fill in the answer box to complete your choice. O A The series diverges because the limit used in the Ratio Test is not less than or equal to 1. OB. The series converges absolutely because the corresponding series of absolute values is geometric with Ir] =- Oc. The series converges conditionally per...
(a) (6 marks) Does the series (–19* sin( , ) converge or divergor Justi (a) (6...
(a) (6 marks) Does the series (–19* sin( , ) converge or divergor Justi (a) (6 marks) Does the series converge or diverge? Justify your answer and state any test(s) you used. (-1)" cos(4n) (b) (2 marks) Consider the series . Explain why the Alternating Series Test can NOT be consider the senes 2 2n3 . used to determine whether the series converges or diverges.
(1 point) Test each of the following series for convergence by either the Comparison Test or the Limit Comparison Test....
(1 point) Test each of the following series for convergence by either the Comparison Test or the Limit Comparison Test. If at least one 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...
Does the series (-1)" (n + 2)" ? converge absolutely, converge conditionally, or diverge? (5n)" Choose...
Does the series (-1)" (n + 2)" ? converge absolutely, converge conditionally, or diverge? (5n)" Choose the correct answer below and, if necessary, fill in the answer box to complete your choice O A. The series converges absolutely because the limit used in the Root Test is OB. The series diverges because the limit used in the nth-Term Test is different from zero, OC. The series converges conditionally per the Alternating Series Test and because the limit used in the...
(1 pt) Test each of the following series for convergence by either the Comparison Test or...
(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) We will determine whether the series n3 + 2n an - is convergent or...
(1 point) We will determine whether the series n3 + 2n an - is convergent or divergent using the Limit Comparison Test (note that the Comparison Test is difficult to apply in this case). The given series has positive terms, which is a requirement for applying the Limit Comparison Test. First we must find an appropriate series bn for comparison (this series must also have positive terms). The most reasonable choice is ba - (choose something of the form 1/mp...
Use the Divergence Test to determine whether the following series diverges or state that the test...
Use the Divergence Test to determine whether the following series diverges or state that the test is inconclusive. n=1 Select the correct answer below and fill in the answer box to complete your choice. k-+00 O A. According to the Divergence Test, the series converges because lima ko (Simplify your answer.) OB. According to the Divergence Test, the series diverges because lim aka (Simplify your answer.) OC. The Divergence Test is inconclusive because lima. (Sirrplify your answer.) OD. The Divergence...
Series converge or diverge
By using integral test, the convergence or divergence of following series can be determined.. * cos(n2 + 1 732 TRUE (because ...... FALSE Explain why. The following integral Converges by direct comparison test. TRUE because. .... FALSE because
00 Does the series Σ (-1)". n n+6 converge absolutely, converge conditionally, or diverge? n=1 Choose the correct answer below and, if necessary, fill in the answer box to complete your choice. A. The series converges conditionally per the Alternating Series Test and because the limit used in the Root Tes O B. The series converges absolutely because the limit used in the Ratio Test is O C. The series diverges because the limit used in the Ratio Test is...
Does the series (-1)"+1 n n+1 converge absolutely, converge conditionally, or diverge? n=1 Choose the correct answer below and, if necessary, fill in the answer box to complete your choice. OA. 1 The series converges conditionally per Alternating Series Test and the Comparison Test with n + 1 n = 1 O B. The series diverges because the limit used in the Ratio Test is not less than or equal to 1. OC. The series converges conditionally per the Alternating...
please show all steps
00 Does the series 2 (-1)n +16+n 8+n converge absolutely, converge conditionally, or diverge? n=1 Choose the correct answer below and, if necessary, fill in the answer box to complete your choice. O A The series diverges because the limit used in the Ratio Test is not less than or equal to 1. OB. The series converges absolutely because the corresponding series of absolute values is geometric with Ir] =- Oc. The series converges conditionally per...
(a) (6 marks) Does the series (–19* sin( , ) converge or divergor Justi (a) (6 marks) Does the series converge or diverge? Justify your answer and state any test(s) you used. (-1)" cos(4n) (b) (2 marks) Consider the series . Explain why the Alternating Series Test can NOT be consider the senes 2 2n3 . used to determine whether the series converges or diverges.
(1 point) Test each of the following series for convergence by either the Comparison Test or the Limit Comparison Test. If at least one 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...
Does the series (-1)" (n + 2)" ? converge absolutely, converge conditionally, or diverge? (5n)" Choose the correct answer below and, if necessary, fill in the answer box to complete your choice O A. The series converges absolutely because the limit used in the Root Test is OB. The series diverges because the limit used in the nth-Term Test is different from zero, OC. The series converges conditionally per the Alternating Series Test and because the limit used in the...
(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) We will determine whether the series n3 + 2n an - is convergent or divergent using the Limit Comparison Test (note that the Comparison Test is difficult to apply in this case). The given series has positive terms, which is a requirement for applying the Limit Comparison Test. First we must find an appropriate series bn for comparison (this series must also have positive terms). The most reasonable choice is ba - (choose something of the form 1/mp...
Use the Divergence Test to determine whether the following series diverges or state that the test is inconclusive. n=1 Select the correct answer below and fill in the answer box to complete your choice. k-+00 O A. According to the Divergence Test, the series converges because lima ko (Simplify your answer.) OB. According to the Divergence Test, the series diverges because lim aka (Simplify your answer.) OC. The Divergence Test is inconclusive because lima. (Sirrplify your answer.) OD. The Divergence...
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