Power Series In this exercise you will find the sum of the series(-1)3n+322n+3 (п + 1)00n=01for -1 < x < 1. Show that (-1, 1) is the interval of convergence.(a) Find a power series centered at 0 which converges to1+ x2(b) Integrate the power series from part (a), and find a power series centered at 0 that converges to x In(1 + x²) on some interval. Find theinterval of convergence of this power series.Š (-1)3n+322n+3 (n + 1)(c) Explain whyis convergent, and find its sum.n=0

In this exercise you will find the sum of the series S(-1)3n+3 22n+3 (n + 1) n=0 1 - for -1 < x < 1. Show that (-1, 1) is the interval of convergence. 1+ x2 (a) Find a power series centered at 0 which converges to (b) Integrate the power series from part (a), and find a power series centered at 0 that converges to x In(1 + x²) on some interval. Find the interval of convergence of this power series. (-1)3n+3 22n+3 (n + 1) (c) Explain why > is convergent, and find its sum. n=0

In this exercise you will find the sum of the series S(-1)3n+3 22n+3 (n + 1) n=0 1 - for -1 < x < 1. Show that (-1, 1) is the interval of convergence. 1+ x2 (a) Find a power series centered at 0 which converges to (b) Integrate the power series from part (a), and find a power series centered at 0 that converges to x In(1 + x²) on some interval. Find the interval of convergence of this power series. (-1)3n+3 22n+3 (n + 1) (c) Explain why > is convergent, and find its sum. n=0

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section10.3: Geometric Sequences

Problem 49E

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