Calculus: Radius of Convergence for the Taylor Series Expansion of the Natural Log

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A Taylor series is a power series. In previous videos, you learned how to calculate the radius of convergence for a power series. Now you can apply this method to Taylor series. This video demonstrates calculating the radius of convergence for the Taylor series expansion of the natural log.
  1. Christina Knudson (Dr. Knudson)
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Комментарии
Автор

Excelentes videos profesora Cristina espero sigas subiendo mas videos, me gustaría del tema de ECONOMETRIA seria interesante que expliques ese curso, espero se encuentre bien, saludos desde Latinoamérica, Perú 🇵🇪

JoseLuisChavez-hn
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aactually, you can't just assume convergence interval without testing the endpoints, yes you can assume the radius by just checking half of the interval, but if you see carefully x=0 diverges by harmonic series, but x=2 converges by alternating test. Thus interval is 0>x>=2.

Blackearbaiya
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Hey,
Why you stopped uploading more videos

abhisheksoni
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Hello mam I am from India 🇮🇳
And where are you from

anupampatel