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Questions tagged [sequences-and-series]

For questions concerning sequences and series. Typical questions concern, but are not limited to: identifying sequences, identifying terms, recurrence relations, $\epsilon-N$ proofs of convergence, convergence tests, finding closed forms for sums. For questions on finite sums, use the (summation) tag instead.

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Closed form of coefficients of a finite field polynomial

I want to find a valid polynomial for a finite field $\mathbb{Z}_p[x]_{f(x)}$ with $d=deg(f(x))$. For this definition to hold, it can be deduced that $p$ must be prime and the polynomial $f(x)$ ...
Cardstdani's user avatar
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0 answers
11 views

Series with Hermite polynomials (Mehler Formula)

After a long calculation, I end up with this series: $$\sum_{n = 0}^{+\infty} \frac{1}{2^n n! (k^2 - 4(2n+1))} H_n(x) H_n(y), $$ where $H_n(x)$ is the physicist's Hermite polynomial and k is a real ...
N230899's user avatar
  • 115
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0 answers
14 views

Fisher information for Poisson distribution

The context for the question is this paper. I am trying to understand how to get from Eq. (5) to Eq. (7). For simplicity I will only consider 1 dimension, whereas the equations in the paper are ...
user2132672's user avatar
6 votes
1 answer
61 views

True or false: $(a_n)$ is equidistributed in $[0,1]\iff$ for each $x\in [0,1],\vert a_n-x\vert<\frac{1}{n}$ for infinitely many $n\in\mathbb{N}.$

I am wondering if either implication is true: $$(a_n) \text{ is equidistributed in } [0,1] \iff\text{ For each } x\in [0,1],\ \vert a_n-x\vert<\frac{1}{n}\text{ for infinitely many } n\in\mathbb{N}....
Adam Rubinson's user avatar
1 vote
1 answer
82 views

Prove that these following limits are 0 using squeeze theorem

Problems: Prove that the following limits are $0$. $\displaystyle \lim_{n\to\infty}\frac{n+\cos(n^2-3)}{2n^2+1}$ $\displaystyle \lim_{n\to\infty}\frac{3^n}{n!}$ $\displaystyle \lim_{n\to\infty}\frac{...
Hiếu Trần's user avatar
0 votes
2 answers
55 views

If the logarithm of two sequences gets close together, do the sequences get close together?

I should define what I mean by two sequences $(a_n)$ and $(b_n)$ that are close together. What I mean is that for any $\epsilon > 0$, $\exists N$ such that for $n \geq N$ we have $|a_n-b_n| < \...
user1560499's user avatar
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0 answers
40 views

Proving $\lim_{k \to \infty} \frac{x_0}{a} \cdot \frac{x_0+1}{a+1} \cdot \frac{x_0+2}{a+2} \cdots \frac{x_0+k-1}{a+k-1}=\left(\frac{x_0}{a}\right)^k$

I am trying to understand why for this sequence: $$\lim_{k \to \infty} \frac{x_0}{a} \cdot \frac{x_0+1}{a+1} \cdot \frac{x_0+2}{a+2} \cdots \frac{x_0+k-1}{a+k-1}=\left(\frac{x_0}{a}\right)^k$$ I ...
stats_noob's user avatar
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4 votes
1 answer
61 views

Is "$x_n>y_n \text{ holds for arbitrarily large } n \Leftrightarrow \limsup\limits_{n\to\infty} \frac{x_n}{y_n} >1$" true?

Let $\{x_n\}_{n=1}^\infty \subseteq (0,\infty)$ and $\{y_n\}_{n=1}^\infty \subseteq (0,\infty)$ be some positive (possibly unbounded) sequences. I am trying to "cleanly" and "tightly&...
cluelessmathematician's user avatar
-2 votes
0 answers
19 views

Convergence of a sequence if its subsequences of interval 3 are convergent

Given a sequence $a_n$, is it convergent if its subsequences $\{a_{3n}\},\{a_{3n+1}\}$ and $\{a_{3n+2}\}$ are convergent to the same number? $$ \lim_{n\to\infty} a_{3n} = \lim_{n\to\infty} a_{3n+1} = \...
Black Pan's user avatar
-1 votes
1 answer
42 views

Calculator For Mathematical Sequence [closed]

I'm wanting to calculate a mathematical sequence of adding (54.5782*0.99997105^n) (in which n increases by 1 each time) (until n reaches 436,422). That looks like ...
UnderTiger's user avatar
2 votes
1 answer
77 views

Does $\sum^{\infty}_{n=1} \exp{\left(\frac{-n^\epsilon}{2\log_2n}\right)}$ converge?

I'm working through the proof for the longest run of heads in a Bernoulli process and I'm having some trouble with the infinite series in the title. Let $n$ be the total number of tosses in the ...
Kob's user avatar
  • 63
3 votes
1 answer
80 views

Are the following 2 equations equal to each other?

I'm in highschool learning about integrals and I wanted to find out what $$ \int{x}^{x}\,dx $$ equals. I was wondering if the equation I made below is actually equal to it. $$ \sum_{k=1}^{\infty} \...
Pizmos's user avatar
  • 31
1 vote
1 answer
36 views

generating function of recursion with a hyperbolic function

I am looking to solve a recursion for a certain sequence $\{a_n\}_{n \geq 1}$ through its generating function $$f(x)=\sum_{n\geq 1} a_n x^n\tag{1}\label{1},$$ which after plugging-in the specific ...
EmFed's user avatar
  • 149
3 votes
1 answer
171 views

Is it true, for every $n,m\in\Bbb{N}$ and some election of signs, that $\sum_{i \in \{m+1,...,m+n\} }\pm \frac{1}{i}=0$?

Motivated by Sum of reciprocal of primes I have the question of it is true that for every $n,m \in \mathbb{N}$ we can have $$\sum_{i \in \{m+1,...,m+n\} }\pm \frac{1}{i}=0$$ for some election of the ...
Sikora's user avatar
  • 121
0 votes
1 answer
70 views

Is there any counter example that any infinite triangle construction converge?

Given an Initial Triangle $A_1B_1 C_1$ construct the triangle $A_{n+1}B_{n+1}C_{n+1} $ from $A_n B_n C_n$, where $A_{n+1}$ is the $r_1$-th triangle center of $A_n B_n C_n$, $B_{n+1}$ is the $r_2$-th ...
pie's user avatar
  • 6,745
1 vote
0 answers
20 views

Nonnegativity of a Summed Gaussian Difference Series for 1D Dirichlet Heat Kernel

Consider: $$G(z;\alpha) = e^{-\alpha z^2}$$ Take $x,y \in [0,1]$. Is it possible to show that: $$ \sum_{n \in \mathbb Z} G(x-y+2n; \alpha) - G(x+y + 2n; \alpha) \geq 0$$ for all $\alpha > 0$? If we ...
jacktrnr's user avatar
  • 283
0 votes
0 answers
29 views

Reshuffling and Fubini's theorem

Suppose I have an absolutely convergent series $$ \sum_{k = 0}^\infty a_k x^{E_k} $$ but the sequence $\{E_k\}$ of positive real numbers is not nice: it will contains accumulation points and ...
fanfare's user avatar
  • 31
1 vote
1 answer
53 views

Prove that the inner limit of a set sequence is closed

I am reading the book "Set-Valued, Convex, and Nonsmooth Analysis in Dynamics and Control: An Introduction" by Goebel (https://epubs.siam.org/doi/10.1137/1.9781611977981). I am confused by ...
rbertollo's user avatar
3 votes
0 answers
67 views

Do all tetration sequences converge modulo an integer? [duplicate]

I was messing around with tetration sequences, i.e. sequences of the form, \begin{equation} x_n = x \uparrow \uparrow n \mod{c} \end{equation} where $x$, $c$, and $n$ are integer numbers. I noticed ...
The Esoteric Mathematician's user avatar
1 vote
1 answer
36 views

For all $n\in\mathbb{N},\ n+1/2$ is in a $3-$term A.P. with two other members of Szekeres's sequence.

Let $A:=$ Szekeres's sequence = $1,2,4,5,10,11,13,14,28,29,31,32,37,38,\ldots$ Due to the greedy construction of this sequence, appending any number not already in the sequence causes it to no longer ...
Adam Rubinson's user avatar
1 vote
1 answer
36 views

On the identity $\sum_{n \leq x} \frac{1}{n} \sum_{k \leq \frac{x}{n}} \frac{\mu(k)}{k}=1$

For all $x\geq 2$ $$ \sum_{n \leq x} \frac{1}{n} \sum_{k \leq \frac{x}{n}} \frac{\mu(k)}{k}=1. $$ This is an exercise in The Development of Prime Number Theory: From Euclid to Hardy and Littlewood by ...
Lonaldin's user avatar
  • 590
4 votes
0 answers
35 views

Is there a Salem-Spencer set whose sum of reciprocals is greater than that of Szekeres's sequence?

Edit: My question is basically the same as This question, which I think remains unanswered, although in the comments, ReverseFlowControl claims to have found a sequence, but I don't understand their ...
Adam Rubinson's user avatar
-1 votes
0 answers
39 views

Find $\lim_{n\to \infty }\frac{\left(2n^{1/n}-1\right)^n}{n^2}$ [duplicate]

Find $\lim_{n\to \infty }\left(2n^{1/n}-1\right)^n/n^2$. I can use L'Hospital rule and differentiate it two times. But is there a simple way to solve this?
Ketan Choudhary's user avatar
-1 votes
0 answers
19 views

How many rounds needed to transform a subconstant $\delta_0$ to a constant by iteratively doing $\delta_{i+1} = \delta_i + (1-\delta_i)\delta_i^p/2$

Suppose we have a large constant $p > 1$, and a subconstant $\delta_0 = \delta_0(n) = n^{-0.01}$. In each iteration we obtain a new $\delta$ by $$ \delta_{i+1} = \delta_i + (1-\delta_i)\delta_i^p/2,...
Heda Chen's user avatar
1 vote
1 answer
51 views

A confusion about evaluating a sequential limit using the definition of the Riemann integral.

So the question is as below: $$\lim_{n\to +\infty} \left(\frac{1}{n^2+n+1}+\frac{2}{n^2+n+2}+\frac{3}{n^2+n+3}+\cdots +\frac{n}{n^2+n+n}\right)$$ And my strategy to tackle this is to make use of the ...
user3835's user avatar
7 votes
4 answers
321 views

Finding out if a series converges without solving linear recurrence relation

I am to study the convergence of the $\sum_{k=1}^{\infty}\frac{a_k}{5^k}$, where $a_{k+2} = 7a_{k+1}-12a_k$, $a_1 = 7, a_2 = 25$. I have found that the series converges and the value of the sum is $\...
Avgustine's user avatar
  • 253
-3 votes
0 answers
37 views

A tricky series [duplicate]

I am pretty sure I have seen this somewhere before. The problem states $$\sum_{n=0}^{\infty}\frac{(-1)^n}{2n+1}\sum_{k=0}^{2n}\frac{1}{2n+4k+3}=\frac{3\pi}{8}\log \left(\frac{1+\sqrt5}{2} \right)-\...
Tolaso's user avatar
  • 6,680
0 votes
0 answers
81 views

If $\alpha$ is irrational, $\lim_{n \to \infty} \sin(n \alpha \pi)$ DNE

I've read an answer to this on another post here. According to the green-checked answer there, let $y=x/2$, and we first know that $a_n = \text{ny} \mod{1}$ (i.e., the fractional part of $ny$) is ...
KitanaKatana's user avatar
0 votes
0 answers
32 views

Find upper bound of convergence rate of sequence under recurrence relation

Let $x_0 > 1$, $a, b \in (0, 1],$ and $c > 0,$ and define a sequence $\{x_n\}_n$ as follows: $$ x_{n+1} = x_n - c (x_n^a - 1)(x_n^b - 1). $$ Assume that $c$ is small enough (depending on $...
mtcrawshaw's user avatar
3 votes
2 answers
126 views

Fixed points of $\tan\sqrt{x}$

This question came in my class test in an MCQ format. $\DeclareMathOperator{\N}{\mathbb N}$ Let $X=\{x\in\mathbb R^+: \tan(\sqrt{x})= x\}$. Consider the sequence $(b_n)_{n\in\N}$ of real numbers ...
Nothing special's user avatar
0 votes
1 answer
101 views

Let $A=\frac 1{1^2}+\frac 1{2^2}+\frac 1{3^2}+\cdots$ and $B=\frac 1{1^2}+\frac 1{3^2}+\frac 1{5^2}+\cdots$. Find A/B [closed]

I have actually tried solving this question and have got the answer as 2/1. But, the answer is 4/3, can someone please explain why and how? $A= \frac{1}{1^2}+\frac{1}{2^2}+\frac{1}{3^2}+\cdots\tag1$ $...
Disha's user avatar
  • 35
4 votes
2 answers
74 views

Domain of the Maclaurin Expansion for $\ln(1+x)$

The Maclaurin expansion for $\ln(1+x)$ is: $$\ln(1+x)=x-\frac{x^2}2+\frac{x^3}3-\frac{x^4}4...\infty$$ In my book, it is given that this infinite series representation is valid only when $x\in (-1,1]$....
Rakshith PL's user avatar
0 votes
0 answers
69 views

Sum of scalar map in $\mathbb{R}^3$

Given the following function defined in $\mathbb{R}^3$, with the restriction $0\leq p\leq 1$: $$f(x,y,z)=p^{| x+y-z| +| x-y+z| +| -x+y+z| +| x+y+z| +| x-y| +| x+y| +| x-z| +| x+z| +| x| +| y-z| +| y+z|...
Cardstdani's user avatar
1 vote
2 answers
51 views

Proving the series $\sum _{n=1}^\infty \big( (-1)^n (1-x)x^n \big)$ uniformly converges in $[0,1]$

I am trying to prove the following series of functions uniformly converges in $[0,1]$: $\sum _{n=1}^\infty \big( (-1)^n (1-x)x^n \big)$ I proved that the limit function is $f(x) = \frac{x^2-x}{1+x}$, ...
Daniel's user avatar
  • 145
-1 votes
0 answers
56 views

How to check whether the following summation converges or diverges? [duplicate]

How to check that the summation $$\sum_{n=1}^{\infty}\frac{n}{2^{n}}$$ converges or diverges? I really don't know how to check out whether a summation from $n=1$ to $\infty$ converges or diverges. ...
Delhi's user avatar
  • 17
2 votes
0 answers
95 views

Show $\sum_{k=0}^{\infty}{\frac{1}{2} \choose k}\frac{(-1)^k}{2k+1}=\sum_{k=0}^{\infty}\frac{(-1)^k}{2k+1}$ [closed]

From the binomial theorem, it can be shown that $\pi=4\sum_{k=0}^{\infty}{\frac{1}{2} \choose k}\frac{(-1)^k}{2k+1}$ However, the Leibniz formula is $\pi=4\sum_{k=0}^{\infty}\frac{(-1)^k}{2k+1}$ I ...
Levi's user avatar
  • 55
5 votes
1 answer
311 views
+50

Convergence of $\sin\left(\frac{S}{\sin\left(\frac{S}{\sin(\cdots)}\right)}\right)$

I was framing a question about the number of solutions of the following function defined in $\mathbb R^+$ with $y=\frac{\pi}{4x}$: $$f(x)=\lim_{n\to \infty} \frac{\sin^{-1}x+x^{2n}\tan^{-1}(x-1)}{x(1+...
Rakshith PL's user avatar
1 vote
1 answer
37 views

Prove the sequence $\lim_{ n \to \infty } a_{n}=1$ given $a_{n}=\frac{2n}{2n+\sin n}$ using definition of limit

I'm trying to prove that the sequence $a_{n}$ converges to 1 where $a_{n}$ is: $$ a_{n}=\frac{2n}{2n+\sin n} $$ Where: $$ \lim_{ n \to \infty } a_{n}=1 $$ But I'm having trouble solving for $N$ and ...
CFD's user avatar
  • 117
1 vote
1 answer
33 views

Using the Borel-Cantelli-Lemma to show that numbers 0,...,b-1 appear almost surely infinitely often in the b-adic representation of a real number

following problem: let $U \sim unif([0,1])$ be a uniformly distributed random variable on the unit intervall $[0,1]$. The $b$-adic representation of $U$ is then given as $\sum_{n=1}^{\infty} D_n \cdot ...
Sgt. Slothrop's user avatar
1 vote
1 answer
61 views

What is $\lim_{n\rightarrow\infty}(L_n)^{\frac1n}$ about the LCM of this special double sequence?

As an intermediate step looking for the irrationality of the Catalan's constant, I need the value of this limit $$\rho=\lim_{n\rightarrow\infty}(L_n)^{\frac1n}$$ where $L_n$ is the least common ...
Jorge Zuniga's user avatar
0 votes
0 answers
44 views

what $a_i$ ensures that $\sum^{\infty}_{i=0}a_i^2 < \infty$?

What requirements are needed on $a_i$, a non-negative sequence to ensure that $\sum^{\infty}_{i=0}a_i^2 < \infty$? My answer: If the series converges then it must be that $a_i^2$ approaches $0$, so ...
Jennie Shar's user avatar
0 votes
1 answer
131 views

If $\sqrt{\frac{2}{\pi}}$ is Diophantine?

Is $\sqrt{\frac{2}{\pi}}$ Diophantine? Which means does $\sqrt{\frac{2}{\pi}}$ have the property: exist $\tau,\gamma>0, $ for $\forall p,q\in\mathbb{Z}$ $$\left|p-q\sqrt{\frac{2}{\pi}}\right|\geq\...
Trinifold's user avatar
  • 127
-2 votes
0 answers
24 views

Find the value of $\sum_{x,y\ge0}\frac {1}{2^{x+y}+|x-y|}$ [closed]

Find the value of $\sum_{x=0}^\infty \sum_{y=0}^\infty \frac {1}{2^x.2^y +|x-y|}$ I approached this problem by expanding for $y$ first but it is not becoming an infinite G.P. Can you give me a hint ...
shivam Jaiswal's user avatar
4 votes
2 answers
204 views

Approximating the integral of $\arctan(p(x))$

I am interested in methods to estimate the integral $$\int_0^1\arctan(p(x))\text{d}x$$ where $p(x)$ is a generic polynomial in $x$. The motive behind this question is the following problem I ...
Zima's user avatar
  • 3,728
5 votes
0 answers
111 views

Infinite sum of $(\sqrt{n^2+1}-n)^{2r}$

I came across the following sum in a statistical physics context, $$ \sum_{n=\frac{1}{2},\frac{3}{2}\cdots}^\infty \left(\sqrt{\left(\frac{n}{\beta}\right)^2+1}-\frac{n}{\beta}\right)^{2r}=\sum_{n=\...
Dylan_Physics's user avatar
0 votes
0 answers
51 views

Cauchy product for integer sums

For a sequence $(a_i)_{i \in \mathbb{Z}}$ of real numbers we consider the two sided sum: $$\sum_{i=-\infty}^\infty a_i$$ We say that this sum is (absolutely) convergent, if both parts: $$\sum_{i=0}^\...
Goldstern420's user avatar
0 votes
0 answers
28 views

How to find a sum of reciprocals of powers of two minus 1 [duplicate]

I came across the following series while solving my math problem: $$ \sum_{x=1}^\infty \frac{1}{2^x - 1} $$ While it's easy to check the convergence of the series, finding the sum itself seems to be ...
Dark_Furia's user avatar
0 votes
0 answers
29 views

Does $\limsup_{𝑛\to\infty} ( 𝑛*𝑎_𝑛 ) = \infty$ imply that the series $\sum_n 𝑎_𝑛$ ​ diverges? [closed]

Consider the series $$ ( \sum a_n ) $$ where $$( a_n \geq 0 ) $$ for all $$( n )$$ Assume that $$ \limsup_{n \to \infty} (n a_n) = \infty. $$ Does this imply that the series $$ ( \sum a_n ) $$ ...
yitz's user avatar
  • 11
0 votes
3 answers
70 views

Prove that the series below converges to $\frac{e}{(e-1)^2}$

I'm given the series $\sum_{n=1}^{\infty} ne^{-n}$ and I want to prove that it converges to $\frac{e}{(e-1)^2}$. This is the little work I've done: Consider the sequence of the partial sums $s_n=e^{-1}...
WolfX 491's user avatar
4 votes
1 answer
99 views

Proving $\sum\limits_{k\ge0}\frac1{2k+2}\left[\frac1{2^{2k}(1-2k)}\binom{2k}k\right]^2=\frac{16}{9\pi}$

Whilst looking at Jack's answer to this question, he claims that $$\sum_{k\geq 0}\frac{1}{2k+2}\left[\frac{1}{2^{2k}(1-2k)}\binom{2k}{k}\right]^2=\frac{16}{9\pi}$$ and, as suggested by OP, this result ...
Hug de Roda's user avatar
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