please show all steps 6. For each series: • Use the specified test to deduce the...
Write several complete simple sentences about how each
series is convergent or divergent, including which testis applied!
nth-Term Test for Divergence, Geometric Series Test, p-Series Test,
Integral Test, Absolute Convergence, Alternating-Series Test, Ratio
Test, Root Test, Direct Comparison Test, & Limit Comparison
Test. Show each step clearly.
1 3. Σ=100 n
List of Series and Tests • Geometric series, • Telescoping series, • Divergence test. • Integral test, • P-series test, • Comparison test, • Limit comparison test, Alternating series test, Absolute convergence theorem (absolute and conditional convergence), Ratio test, and • Root test. 1. Determine the convergence of the following series. State the test(s) you used to determine convergence. C. Σε 4-2k+1
sd. Detamine the convergence or divergence of an aternating series tt Detemne me convergence or divergence of sees-.1 the-compl or direct comparisom test. (You must jusitity your answer to get a credit 12. Determine the convergence or divergence or inconclusive of the series:Using the rasio test tYou must justity your answer to get a credit) We were unable to transcribe this image10. Determine the convergence or divergence of an alternating ser (You must justithy os (-1) your answer to get...
series rest I want to know exact test name thank you
Write several complete simple sentences about how each series is convergent or divergent, including which test is applied! nth-Term Test for Divergence, Geometric Series Test, p-Series Test, Integral Test, Absolute Convergence, Alternating-Series Tes Ratio Test, Root Test, Direct Comparison Test, & Limit Comparison Test 4. 9(-1)*(1+4)
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
For each series indicate by name the test you are using, explain
why the test applies to the series, and clearly show how you are
applying the test.
The types/tests you will need to use are listed here:
Geometric Series, p-Series, Test for Divergence, Integral Test,
(Direct) Comparison Test, Limit Comparison Test
There are six series to test here. Each type/test listed above
will be used EXACTLY ONCE. Be aware that more than one test could
apply to a given...
Problem 5. (1 point) Consider the series j 6+ 6+(-1)"n5 11n5 4n Which of the following statements accurately describes the series? O A. The series diverges by the Divergence Test. OB. The series converges by the Integral Test. OC. The series converges by the Alternating Series Test. OD. The series diverges by the Integral Test. 6 E. The series converges by the Limit Comparison Test with the series ni 11n5
The convergent, divergent tests or techniques that are discussed
in chapter 11
1. Geometric Series 2. P-Series 3. Harmonic Series 4. Telescopic
series
5. Divergence Test 6. Integral Test 7. Comparison Test 8. Limit
Comparison Test 9. Alternating series test
10. Ratio Test 11. Root test
which method and why?
8. Ση (-1)* Inn (n=1
(a) State the First Comparison Test and show that the following series con- verges: O0 1 + cos ((2n +1)!) (b) Determine whether the following series converges (c) State the Integral Test and sketch its proof (d) Prove or disprove: If a series Σ001 an converges then Σηι an converges absolutely. e) Answer the following two questions without proof: For which r E R is the geometric series 0O convergent? What is the limit of the series in case of...
(1 point) This series converges Check all of the following that are true for the series 5 sin na n2 n-1 OA. This series converges OB. This series diverges C. The integral test can be used to determine convergence of this series. D. The comparison test can be used to determine convergence of this series. E. The limit comparison test can be used to determine convergence of this series. OF. The ratio test can be used to determine convergence of...