Suppose that the series a,(x – 1)" converges for x = 3 and diverges for x = -4.= -4.n=0(a) Does this power series converge at r = 0?(b) What can you say about the radius of convergence, R?(What is the smallest value R can take and what is the larges value R can take?)

Given that ∑n=0∞an(x-1)n The series converges for x=3. The series diverges for x=-4. (a) At x=0,…

Suppose that the series a,(x – 1)" converges for r = 3 and diverges for x = -4. (a) Does this power series converge at x= 0? (b) What can you say about the radius of convergence, R? (What is the smallest value R can take and what is the larges value R can take?)

Suppose that the series a,(x – 1)" converges for r = 3 and diverges for x = -4. (a) Does this power series converge at x= 0? (b) What can you say about the radius of convergence, R? (What is the smallest value R can take and what is the larges value R can take?)

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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Question

Suppose that the series a,(x – 1)" converges for x = 3 and diverges for x = -4.
= -4.
n=0
(a) Does this power series converge at r = 0?
(b) What can you say about the radius of convergence, R?
(What is the smallest value R can take and what is the larges value R can take?)

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