In mathematics, an alternating series is an infinite series of the form
∑
n
=
0
∞
(
−
1
)
n
a
n
{\displaystyle \sum _{n=0}^{\infty }(-1)^{n}a_{n}}
or
∑
n
=
0
∞
(
−
1
)
n
+
1
a
n
{\displaystyle \sum _{n=0}^{\infty }(-1)^{n+1}a_{n}}
with an > 0 for all n. The signs of the general terms alternate between positive and negative. Like any series, an alternating series converges if and only if the associated sequence of partial sums converges.
Hi, I'm having difficulty understanding why the interval of convergence is (0, 18].
When I tested x=18, I got the following conclusion using the ratio test.
When I attempt using AST, the function still diverges as the lim (n -> inf) = 2^n / n ≠ 0.
What am I missing?
Thanks!
The Alternating series test has to be used to determine whether this series converges or diverges: \sum\limits_{n=1}^{\infty} (-1)^n\frac{\sqrt n}{2n+3}
Here's what I have done:
Let a_n = \frac{\sqrt n}{2n+3}. Therefore, a_{n+1} = \frac{\sqrt {n+1}}{2n+5}
Now, for a_{n+1} to be less than or...
converge or diverge
$$S_n= \sum_{n=1}^{\infty} (-1)^{n+1}\frac{\sqrt{n}+6}{n+4}$$
ok by graph the first 10 terms it looks alterations are converging to 0
ETA. Read the bottom post first. Well, and..
Obviously mathematicians know this identity.
At the x=b=c=n=2 point, pi exists. There are also connections to the Wallis product (pi/2).
Anyway, I simplified it to the n=2 case. And re-remembered my fascination with the Pidentity, where...
1) Are there any periodic alternating series functions other than sine and cosine (and series derived from them, like the series for cos(a) * cos(b))?
2) What is the following series called when x is (0,1) and (1,2]? Quasiperiodic? Semi?
\sum_{n=0}^\infty \, (-1)^n \...
I'm looking at the proof of the alternating series test, and the basic idea is that the odd and even partial sums converge to the same number, and that this implies that the series converges as a whole. What I don't understand is why the even and odd partial sums converging to the same limit...
Homework Statement
Using the power series for ln(x + 1) and the Estimation Theorem for the Alternating Series, we conclude that the least number of terms in the series needed to approximate ln 2 with error < 3/1000 is: (i) 333 (ii) 534 (iii) 100 (iv) 9 (v) 201
Homework Equations
ln(x+1) =...
Homework Statement
[/B]
There are three problems that I am struggling with.
1. ∑[k2(x-2)k]/[3k]
2. ∑[(x-4)n]/[(n)(-9)n]
3. ∑[2k(x-3)k]/[k(k+1)]
The Attempt at a Solution
On the first two I am having problems finding the end-points of the interval of convergence. I use the ratio test.
1...
Homework Statement
I know that ∑n=1 to infinity (sin(p/n)) diverges due using comparison test with pi/n, despite it approaching 0 as n approaches infinity.
However, an alternating series with (-1)^n*sin(pi/n) converges. Which does not make sense because it consists of two diverging functions...
Homework Statement
∞
Σ (-1)n-1 n/n2 +4
n=1
Homework Equations
lim |an+1/an| = L
n→∞
bn+1≤bn
lim bn = 0
n→∞
The Attempt at a Solution
So I tried multiple things while attempting this solution and got inconsistent answers so I am thoroughly confused. My work is on the attached photo.
I found that...
Consider a sequence with the ##n^{th}## term ##u_n##. Let ##S_{2m}## be the sum of the ##2m## terms starting from ##u_N## for some ##N\geq1##.
If ##\lim_{N\rightarrow\infty}S_{2m}=0## for all ##m##, then the series converges. Why?
This is not explained in the following proof:
The criteria for testing for convergence with the alternating series test, according to my book, is:
Σ(-1)n-1bn
With bn>0, bn+1 ≤ bn for all n, and lim n→∞bn = 0.
My question is about the criteria. I'm running into several homework problem where bn is not always greater than bn+1, such as the...
Homework Statement
Do the following series converge or diverge?
## \sum_{n=2}^\infty \frac{1}{\sqrt{n} +(-1)^nn}## and
##\sum_{n=2}^\infty \frac{1}{1+(-1)^n\sqrt{n}}##.
Homework Equations
Leibniz convergence criteria:
If ##\{a_n\}_{k=1}^\infty## is positive, decreasing and ##a_n \to 0##, the...
Homework Statement
Homework Equations
The Attempt at a Solution
I don't get how they got what's stated in the above picture. Where does 1/2 and n/(n + 1) come from? Can't you just show that an + 1 ≤ an?
Hey guys, this one is just for funnsies. So when dealing with an alternating series test, 3 requirements must be met, :
Alternating
u(sub n) ≥ u(sub n+1) for all n ≥ N, for some integer N
u(sub n) → 0 as n → ∞.
So I have been coming up with examples where of these are true, and one isnt. A...
Homework Statement
Determine all values of P for which the series ∑((-1)^(n-1))((ln(x))^p)/(5n) is convergent, expressing your answer in interval notation (Problem is shown in attached picture).
Homework Equations
Alternating Series Test: If {a_n} is positive and decreasing, and if the lim as...
Hi PF!
The other day I was showing convergence for an alternating series, let's call it ##\sum (-1)^n b_n##. I showed that ##\lim_{n \to \infty} b_n = 0## and that ##b_n## was monotonically decreasing; hence the series converges by the alternating series test. but I needed also to show it did...
Homework Statement
∑ [ (-1)^n * n!/(10^n) ]
2. The attempt at a solution
the problem is that I cannot use derivative to make sure that a(n) is decreasing neither L hopital rule to find the limit.
Homework Statement
Find the sum of
starts at 0 to infinity ∑ (cos(k*pi))/pi^k
First, I determined that it does, indeed, converge with the alternating series test.
Second, I found the answer to be pi/(1+pi) via wolfram alpha.
But I am at a loss on how to find the answer here.
This is a...
Hello PF,
I've got a homework question I'm having some trouble with regarding series, particularily alternating series.
The question asks you to test the series for convergence or divergence for an alternate series by using the A.S.T. :
∞
∑ (-1)n-1e2/n
n=1
Homework Equations...
Homework Statement
Hey! So I just have a quick question. In my notes I wrote down that the alternating series test only proves absolute or conditional convergence, but can not prove divergence. Is this true or did I misunderstand my professor?
Homework Equations
The Attempt at a...
Homework Statement
∞n=1∑(-1)n\stackrel{10n}{(n+1)!}
Homework Equations
The Attempt at a Solution
I already found that the limit does equal zero by using the ratio test on bn. What I'm having trouble with is determining if it decreases or not. I know you can't take the derivative...
Homework Statement
Ʃ (-1)^n [ n+ln(n) / n-ln(n)] from n = 2 to infinity.
Homework Equations
I looked at the limit first because I thought lnn was very slow function. n would go faster.
The Attempt at a Solution
limit n --> ∞ [ n+ln(n) / n-ln(n)] = 1 so it diverges.
Limit is...
Homework Statement
Let Tn(x) be the degree n polynomial of the function sin x at a=0. Suppose you approx f(x) by Tn(x) if abs(x)<=1, how many terms are need (what is n) to obtain an error less than 1/120
Homework Equations
Rn(x)=M(x-a)^(n+1)/(n+1)!
sin(x)=sum from 0 to ∞ of...
Homework Statement
This is what I understand about Alternating Series right now:
If I have an alternate series, I can apply the alternative series test.
\sum(-1)^{n}a_{n}
Condition 1: Nth term test on a_{n}
Condition 2: 0 < a_{n+1} ≤ a_{n}If condition 1 is positive or ∞, convergence is...
Homework Statement
Problem taken from Boas Mathematical Methods book, Section 14 page 35.
Prove that if ##S=\sum_{n=1}^{\infty} a_n## is an alternating series with ##|a_{n+1}|<|a_n|##, and ##\lim_{n \to \infty} a_n=0##, then ##|S-(a_1+a_2+...+a_n)|\leq|a_{n+1}|##.
The Attempt at a...
I'm having trouble the underlined red part of this proof (attached image) of the what looks to be the alternate series test, not sure if it's an error but it's more likely I've perhaps misunderstood something.
If y_j is defined as the sequence of partial sums of the even terms of the sequence...
Homework Statement
Hi,
The question wanted to know if the alternating series converges or diverges.
$$A_n = \sum_{n=1}^\infty \frac{(-1)^{n+1}}{n+1}$$
Homework Equations
[b]3. The Attempt at a Solution [/b
You can see it here ...
Homework Statement
Ʃ(-1/2)^k from 0 to infinity.
Homework Equations
Ʃ(-1)^k*B_n from 0 to infinity
where if the series converges
1. lim of B_n as n goes to infinity must = 0
2. B_n must be decreasing
The Attempt at a Solution
It doesn't look like there is a B_n in the original equation...
According to my calculus book two parts to testing an alternating series for convergence. Let s = Ʃ(-1)n bn. The first is that bn + 1 < bn. The second is that the limn\rightarrow∞ bn = 0. However, isn't the first condition unnecessary since bn must be decreasing if the limit is zero. I...
Homework Statement
The problem contained five answer choices, of which I the answerer was to find one that fit the criteria of the question. The question was: "Which series of the following terms would be convergent?".
It listed five series, The answer was this term: 1 + (-1)n / n. Homework...
Homework Statement
determine either absolute convergence, conditional convergence, or divergence for the series.Homework Equations
\displaystyle \sum^{∞}_{n=1} (-1)^n \frac{6n^8 + 3}{3n^5 + 3} The Attempt at a Solution
I cannot use the alternating series test since the function is increasing...
Homework Statement
I have a series
Ʃ(1 to infinity) ((-1)^n*n^n)/n!
Homework Equations
The Attempt at a Solution
apparently you cannot use the alternating series for this question, why is this? It has the (-1)^n, what else is needed to allow you to use the alternating...
(I hope this is the right subforum)
I'm talking about the series 1, 1, -1, 1, -1, 1, -1... I thought about it for a long time but I have no idea. If that first term were gone it would just be (-1)^(n+1), but...it's there...
Homework Statement
Let a_{n} be an alternating series whose terms are decreasing in magnitude. How to compute the sum as precisely as possible using four-digit chopping arithmetic? In particular, apply the method to compute \sum\limits_{n = 0}^\infty {\frac{{{{( - 1)}^n}}}{{(2n)!}}} and...
So I've been practicing several series that can be solved using the alternating series test, but I've came to a question that's been bothering me for sometime now.
If a series fails the alternating series test, will the test for divergence always prove it to be divergent?
Typically, in...
Homework Statement
Determine an explicit function for this sequence and determine whether it is convergent.
an={1, 0, -1, 0, 1, 0, -1, 0, 1, ...}
The Attempt at a Solution
I came up with this function:
an = cos(nπ/2), and wrote that as sigma notation from n=0 to infinity. Is...
Homework Statement
Does this series converge absolutely or conditionally?Homework Equations
Series from n=1 to ∞ (-1)^(n+1) * n!/2^n
The Attempt at a Solution
In trying to apply the alternating series test, I have found the following:
1.) n!/2^n > 0 for n>0
2.) Next, in testing to see if...
Homework Statement
Okay from what I have learned to prove that a series converges via the alternating test, you must prove the following conditions
Homework Equations
1) an > 0
2) lim an (n--> infinity) = 0
and
3) a(n+1) < an
The Attempt at a Solution
However recently I've been encountering...
Prove that \sum^{∞}_{n=1}(-1)^{n} diverges.
I realized that the alternating series test can only be used for convergence and not necessarily for divergence. I might have to apply a ε-δ proof (Yikes!) which I have never been good at so please help me out.
BiP
I would imagine that an alternating series that goes of to infinity doesn't have a limit because it keeps switching back and forth, but I can't find anything in my textbook about it. I just want to make sure that this is right.
Homework Statement
After reading a few topics on this forum, i just realized that i had misunderstood the sequence v/s series theorem when it concerns the alternating sign. So, i went back to my notes, and I'm surprised to see that there is no mention of a series test. There is only a sequence...
Hello! I was working some practice problems for a Calc II quiz for Friday on the alternating series test for convergence or divergence of a series. I ran into a problem when I was working the following series, trying to determine whether it was convergent or divergent:
Homework Statement
∞...
1 \ - \ \frac{1}{2} \ + \ \frac{1}{3} \ - \ \frac{1}{4} \ + \ ... \ - \ \frac{1}{n - 1} \ + \ \frac{1}{n} \ - \ \frac{1}{2n + 1} \ < \ ln(n), where n is a positive odd integer
I worked this out (rediscovered it) and proved it by induction.
For example, when n = 71...
Alternating series test: If $\{a_n\}$ is positive and strictly decreasing, and $\lim a_n=0$, then $\sum(-1)^n a_n$ converges.
Is the alternating series test still valid if "strictly decreasing" is omitted? Give a proof or counterexample.
Homework Statement
If Ʃa_n is divergent, the absolute value of Ʃa_n is divergent. True or false. This is the main question I am trying to answer. I should be able to answer this problem on my own, but i ran into a problem that confused me.
What I Did
So I decided to start this...
Alternating series test:
1. All the u_n are all positive
2. u_n\geq u_{n+1} for all n \geq N. For some integer N
3. u_n \rightarrow 0
I thought it would hold with 2. and that the su m of the N first terms were not \infty
Here is the theroem just in case...
I read that an alternating series \Sigma (-1)^n a_n converges if "and only if" the sequence a_n is both monotonous and converges to zero.
I tried with this series:
\Sigma_{n=1}^{\infty} (-1)^n | \frac{1}{n^2} \sin(n)|
in the wolfram alpha and seems to converge to -0.61..., even if...
I have a question about the ratio test. Suppose it proves inconclusive, we must than use another test to check for conditional convergence - 1) this test has to be associated with an alternating series, such as the Alternating Series Test, correct? (we wouldn't be able to use something like...