1. CV compare with p= 2 series 2. CV compare with geometric r=3/5, 3) DVTcompare with p=1 series 4) DVT compare with geometric r=5/3.1. CV compare with p= 2 series 2. CV compare with geometric r=3/5, 3) CVcompare with p=3/2 series 4) DVT compare with geometric r=5/4.O 1. DVT compare with p= 1 series 2. CV compare with geometric r=3/5, 3) CVcompare with p=3/2 series 4) CV compare with geometric r=3/4.O 1. DVT compare with p= 1 series 2. CV compare with geometric r=3/5, 3) CVcompare with p=3/2 series 4) DVT compare with geometric r=5/3. When applying the limit comparison test for convergence one needsto compare the given series with series that one knows thebehaviour of.For each of the following series what is the type of series onecompares the given series to and is it convergent (CV) of divergent(DVT):2n3 +n?En=0 n5+2n4+12+3n2.Σn=15n+4ΣVn5 +4n=13.n4+357 +3"4.

Answered: Image /qna-images/answer/2238ca6f-8511-4963-92cb-cd896baa7ed7.jpg

When applying the limit comparison test for convergence one needs to compare the given series with series that one knows the behaviour of. For each of the following series what is the type of series one compares the given series to and is it convergent (CV) of divergent (DVT): 2n3 +n? En=0 n5+2n4+1 1. n 2+3n 2. Σ n=D1 5n+4 Vn5+4 Σ 3. n4+3 5+3" 4.

When applying the limit comparison test for convergence one needs to compare the given series with series that one knows the behaviour of. For each of the following series what is the type of series one compares the given series to and is it convergent (CV) of divergent (DVT): 2n3 +n? En=0 n5+2n4+1 1. n 2+3n 2. Σ n=D1 5n+4 Vn5+4 Σ 3. n4+3 5+3" 4.

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. CV compare with p= 2 series 2. CV compare with geometric r=3/5, 3) DVT
compare with p=1 series 4) DVT compare with geometric r=5/3.
1. CV compare with p= 2 series 2. CV compare with geometric r=3/5, 3) CV
compare with p=3/2 series 4) DVT compare with geometric r=5/4.
O 1. DVT compare with p= 1 series 2. CV compare with geometric r=3/5, 3) CV
compare with p=3/2 series 4) CV compare with geometric r=3/4.
O 1. DVT compare with p= 1 series 2. CV compare with geometric r=3/5, 3) CV
compare with p=3/2 series 4) DVT compare with geometric r=5/3.

When applying the limit comparison test for convergence one needs
to compare the given series with series that one knows the
behaviour of.
For each of the following series what is the type of series one
compares the given series to and is it convergent (CV) of divergent
(DVT):
2n3 +n?
En=0 n5+2n4+1
2+3n
2.
Σ
n=1
5n+4
Σ
Vn5 +4
n=1
3.
n4+3
57 +3"
4.

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