Select the FIRST correct reason why the given deries converges. A.

rheisf

rheisf

Answered question

2021-12-18

Select the FIRST correct reason why the given deries converges.
A. Convergent geometric series
B. Convergent p series
C. Comparison (of Limit Comparison) with a geometric or p series
D. Converges by alternating series test
1. n=1sin2(3n)n2
2. n=1(1)nln(en)n4cos(nπ)
3. n=1cos(nπ)ln(4n)
4. n=12(4)n62n
5. n=1(1)n2n+6
6. n=1(1)nnn+4

Answer & Explanation

Bob Huerta

Bob Huerta

Beginner2021-12-19Added 41 answers

1) an=sin2(3n)n2, an=1n2
Converges by comparsion with p-series
option (C)
2) an=(1)nln(en)n4cos(nπ)=(1)nnln(e)n4(1)n=1n3
convergent p-series
option (B)
RizerMix

RizerMix

Expert2021-12-29Added 656 answers

5) an=(1)n2n+6
convergent by alternating series test
option (D)
6) an=(1)nnn+4
diverges by alternating series test
option (D)

Jeffrey Jordon

Jeffrey Jordon

Expert2021-12-29Added 2605 answers

3) an=cos(nπ)ln(4n)=(1)nln(4n)
Converges by alternative series test
option (D)
4) an=24n62n=2(436)n=2(19)n
It is convergent Geometric series
option (A)

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