1. C using ratio test 2PRACTICE EXERCISES FOR $11.8, §11.9, AND §11.101. Find the radius of convergence and interval of convergence of the power series.TD12"an= (x+3)ant) - (x+2) =• 4²(n+1) ₂2 (1+1)an (ntl)(x+2)²²a=2lim /01/2+1/1 = 1 im 2(71) √x+2) = 1/-4x+2) =호 금1/2 -1x+²2) = 12x+1²1 1/2 x=2 x=1(3x - 1)"(a)(b)(c)(d)M8 M8 IM8 IM8 IM1n2nn²222-1-1 (0*-n!(e) Σn=0(x-3)"(n+1)"3n12n+1-xn-(x-1) 2n2. Find the Taylor series of the function f(x) at the point a.(a) f(x) = ²x, a=11(b) f(x) =1-x(c) f(x) = lnx,3. Find the Maclaurin series of the function f(x).a=2a=3(x+2) ! ++^)(x+2ya (^+1)=2n

Answered: Image /qna-images/answer/56b34941-fe7c-4f81-918c-b235bfbf7215.jpg

PRACTICE EXERCISES FOR $11.8, §11.9, AND §11.10 1. Find the radius of convergence and interval of convergence of the power series. an= ant) = (x+2)+ (a) (c) n=0 1 n2n (x+2)" a=2 lim | 0111=1 | −1)″ (3x −1)″ n² n! (x-3)" 02 an ^ √x+2) = 1/2-1/x+2√ = 1 ₂2 (111) ● (n+1)2(+1) (x+1) 2x+1²11x=2 X=1 (+)2

PRACTICE EXERCISES FOR $11.8, §11.9, AND §11.10 1. Find the radius of convergence and interval of convergence of the power series. an= ant) = (x+2)+ (a) (c) n=0 1 n2n (x+2)" a=2 lim | 0111=1 | −1)″ (3x −1)″ n² n! (x-3)" 02 an ^ √x+2) = 1/2-1/x+2√ = 1 ₂2 (111) ● (n+1)2(+1) (x+1) 2x+1²11x=2 X=1 (+)2

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question

1. C using ratio test

2
PRACTICE EXERCISES FOR $11.8, §11.9, AND §11.10
1. Find the radius of convergence and interval of convergence of the power series.
TD
12"
an= (x+3)
ant) - (x+2) =• 4²
(n+1) ₂2 (1+1)
an (ntl)
(x+2)²²a=2
lim /01/2+1/1 = 1 im 2(71) √x+2) = 1/-4x+2) =
호 금
1/2 -1x+²2) = 12x+1²1 1/2 x=2 x=1
(3x - 1)"
(a)
(b)
(c)
(d)
M8 M8 IM8 IM8 IM
1
n2n
n²2
22-1-1 (0*-
n!
(e) Σ
n=0
(x-3)"
(n+1)"
3n
1
2n+1
-xn
-(x-1) 2n
2. Find the Taylor series of the function f(x) at the point a.
(a) f(x) = ²x, a=1
1
(b) f(x) =
1-x
(c) f(x) = lnx,
3. Find the Maclaurin series of the function f(x).
a=2
a=3
(x+2) ! ++^)
(x+2ya (^+1)=2
n

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