Determine the radius of convergence of this series. sum_{n=0}^infty(-1)^nfrac{x^{2n+1}}{2n+1}

sibuzwaW

sibuzwaW

Answered question

2020-12-17

Determine the radius of convergence of this series.
n=0(1)nx2n+12n+1

Answer & Explanation

liingliing8

liingliing8

Skilled2020-12-18Added 95 answers

The given series is n=0(1)nx2n+12n+1
By the series ratio test, a series n=0an converges if limn|an+1an|<1
Compare the series n=0(1)nx2n+12n+1 with n=0an and obtain an=(1)nx2n+12n+1
Now, an=(1)nx2n+12n+1 implies that an+1=(1)n+1x2(n+1)+12(n+1)+1=(1)n+1x2n+32n+3
Therefore, by the ratio test, the series n=0(1)nx2n+12n+1 converges if limn|an+1an|=limn|(1)n+1x2n+32n+3(1)nx2n+12n+1|<1
Note that,
limn|(1)n+1x2n+32n+3(1)nx2n+12n+1|<1
limn|(2n+1)x2n+3(2n+3)x2n+1|<1
limn|n(2+1n)x2n(2+3n)|<1
limn|(2+1n)x2(2+3n)|<1
|(2+1)x2(2+3)|<1
|2x22|<1
|x2|<1
|x2|<1
|x|2<1
|x|<1
Since the value |x|<1, the radius of convergence R of the series n=0(1)nx2n+12n+1 is R=1

Jeffrey Jordon

Jeffrey Jordon

Expert2021-12-27Added 2605 answers

Answer is given below (on video)

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