100% satisfaction guarantee Immediately available after payment Both online and in PDF No strings attached
logo-home
Power Series solved questions $8.04   Add to cart

Exam (elaborations)

Power Series solved questions

 2 views  0 purchase
  • Course
  • Institution

Power Series solved questions

Preview 2 out of 14  pages

  • July 18, 2022
  • 14
  • 2021/2022
  • Exam (elaborations)
  • Questions & answers
avatar-seller
CHAPTER 38
Power Series

In Problems 38.1-38.24, find the interval of convergence of the given power series. Use the ratio test, unless otherwise
instructed.

38.1 2 x"/n.

Therefore, the series converges absolutely
for and diverges for When we have the divergent harmonic series E l/n. When
the series is which converges by the alternating series test. Hence, the series converges
for

38.2 E x"/n2.

Thus, the series converges absolute-
ly for and diverges for When * = 1, we have the convergent p-series E l/n 2 . When
*=-!, the series converges by the alternating series test. Hence, the power series converges for -1 s x s 1.

38.3 E*"/n!.

Therefore, the series converges for all x.

38.4 E nix"

(except when x = 0). Thus, the series converges only for
x = 0.

38.5 E x"/2".
This is a geometric series with ratio x/2. Hence, we have convergence for |j;/2|<l, |*|<2, and
divergence for |jc|>2. When x = 2, we have E l , which diverges. When x = -2, we have E(-l)",
which is divergent. Hence, the power series converges for -2 < x < 2.

38.6 Ex"/(rt-2").

Thus, we have convergence for
|*| < 2, and divergence for |jd>2. When x = 2, we obtain the divergent harmonic series. When x = —2.
we have the convergent alternating series E (-l)7n. Therefore, the power series converges for — 2 s j c < 2 .

38.7 E nx".

So we have convergence f&r \x\ < 1, and divergence foi
\x\ > 1. When x = 1, the divergent series E n arises. When x = — 1, we have the divergent series
E (— l)"n. Therefore, the series converges for — l < j t < l .

38.8 E 3"x"/n4".

Thus, we have convergence
for and divergence for For we obtain the divergent series E l/n, and, for
we obtain the convergent alternating series E(-l)"/n. Therefore, the power series converges for


326

, POWER SERIES 327

38.9 E (ax)", a > 0.

So we have convergence for |*| < 1 fa, and divergence for |*| > 1 la. When
x = I / a , we obtain the divergent series E 1, and, when x = — I / a , we obtain the divergent series E (-1)".
Therefore, the power series converges for — l/a<x<l/a.

38.10 E n(x - I)".
A translation in Problem 38.7 shows that the power series converges for 0 < x < 2.

38.11


Thus, we have conver
gence for \x\ < 1, and divergence for |jc| > 1. When x = 1, we get the convergent series E l/(/r + 1)
(by comparison with the convergent p-series E 1/n2); when x = —l, we have the convergent alternating
series E (—l)7(n 2 + 1). Therefore, the power series converges for — 1 s x < 1.

38.12 E (x 4- 2)7Vn.

So we have convergence
for |x + 2|<l, -1<* + 2<1, - 3 < x < - l , and divergence for x<-3 or x>-l. For x =-I,
we have the divergent series E 1/Vn (Problem 37.36), and, for x = -3, we have the convergent alternating
series E (—l)"(l/Vn). Hence, the power series converges for — 3==:e<-l.

38.13


Thus, the power series converges for all x.


38.14


Hence, the power series converges for all x.


38.15




Hence, we have convergence for |*|<1, and divergence for \x\ > 1. For x = l , E l / l n ( r c + l) is di-
vergent (Problem 37.100). For x = -I, E (-l)'Vln (n + 1) converges by the alternating series test. There-
fore, the power series converges for — 1 < x < 1.

38.16 E x"ln(n + 1).

Thus, we have convergence for
\x\ < 1 and divergence for \x\ > 1. When x = ±1, the series is convergent (by Problem 37.10). Hence,
the power series converges for — 1 < x ^ 1.

38.17

Hence, the series converges for all x.

The benefits of buying summaries with Stuvia:

Guaranteed quality through customer reviews

Guaranteed quality through customer reviews

Stuvia customers have reviewed more than 700,000 summaries. This how you know that you are buying the best documents.

Quick and easy check-out

Quick and easy check-out

You can quickly pay through credit card or Stuvia-credit for the summaries. There is no membership needed.

Focus on what matters

Focus on what matters

Your fellow students write the study notes themselves, which is why the documents are always reliable and up-to-date. This ensures you quickly get to the core!

Frequently asked questions

What do I get when I buy this document?

You get a PDF, available immediately after your purchase. The purchased document is accessible anytime, anywhere and indefinitely through your profile.

Satisfaction guarantee: how does it work?

Our satisfaction guarantee ensures that you always find a study document that suits you well. You fill out a form, and our customer service team takes care of the rest.

Who am I buying these notes from?

Stuvia is a marketplace, so you are not buying this document from us, but from seller jureloqoo. Stuvia facilitates payment to the seller.

Will I be stuck with a subscription?

No, you only buy these notes for $8.04. You're not tied to anything after your purchase.

Can Stuvia be trusted?

4.6 stars on Google & Trustpilot (+1000 reviews)

67474 documents were sold in the last 30 days

Founded in 2010, the go-to place to buy study notes for 14 years now

Start selling
$8.04
  • (0)
  Add to cart