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Prove that if $\lim_{n \to \infty}z_{n}=A$ then: $$\lim_{n \to \infty}\frac{z_{1}+z_{2}+\cdots + z_{n}}{n}=A$$ I was thinking spliting it in: $$(z_{1}+z_{2}+\cdots+z_{N-1})+(z_{N}+z_{N+1}+\cdots+z_{n})$$ where $N$ is value of $n$ for which $|A-z_{n}|<\epsilon$ then taking the limit of this sum devided by $n$ , and noting that the second sum is as close as you wish to $nA$ while the first is as close as you wish to $0$. Not sure if this helps....

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Possibly easier to first show for $A=0$ –  Thomas Andrews Oct 5 '12 at 19:19
    
@Thomas Andrews I edited the question, adding my idea. Could you tell me what you think, please? –  Mykolas Oct 5 '12 at 19:29
    
Changed the title. There is no series here. –  Did Oct 5 '12 at 20:54
    
Maybe this question was asked here before (I did not search), but at least I remember that we had questions such that this can be obtained as a consequence of the results from those questions, see, e.g., If $\sigma_n=\frac{s_1+s_2+\cdots+s_n}{n}$ then $\limsup\sigma_n \leq \limsup s_n$ and limit of quotient of two series. –  Martin Sleziak Oct 6 '12 at 9:28
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It is also worth mentioning that this is often called Cesaro mean. –  Martin Sleziak Oct 27 '12 at 6:53

2 Answers 2

up vote 3 down vote accepted

It seems like Homework problem,hence I'll just give hint: $$\frac{z_1+z_2+\cdots +z_n}{n}-A=\frac {(z_1-A)+(z_2-A)+\cdots +(z_n-A)}{n}$$ Now use the defn of limit that for every $\epsilon > 0$ there exists $N_0 \in \mathbb N$ such that $|z_m-A| < \epsilon \ \forall m \geq N_0$

Also remember triangle inequality : $|a_1+a_2+\cdots +a_n| \leq |a_1| + |a_2| +\cdots +|a_n|$

Can You find proper $a_i$ in terms of say $z_i$'s??

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thankyou for help. It's not homework. Would $a_{i}$ be $\frac{z_{i}}{n}$, and since for $n \to\infty $all sums go to $0$, it would be proved? @TheJoker –  Mykolas Oct 5 '12 at 19:40
    
and would my first idea be wrong? –  Mykolas Oct 5 '12 at 19:44
    
You can take $a_i=\frac{z_1-A}{n}$. Now use the fact that limit of $z_i$ is $A$. about your approach,it is true,just write rigorously :-).also there is no dofference between mine and your approach as your next step would be same. –  TheJoker Oct 5 '12 at 19:51

This can be an easy consequence of a more general statement which is from Polya's Problems and Theorems in Analysis:

Let $\{a_n\}_{n=1}^{\infty}$ be a real sequence such that $\lim_{n\to\infty}a_n=a$. And we have a family of finite sequences $\{\{b_{nm}\}_{m=1}^{m=n}\}_{n=1}^{\infty}$: $$ b_{11}\\ b_{21},b_{22}\\ b_{31},b_{32},b_{33}\\ \cdots $$ such that $$ b_{mn}\geq 0 $$ for all $m,n$, and $\sum_{m}b_{nm}=1$ for each $n=1,2,\cdots$. Let $\{c_n\}_{n=1}^{\infty}$ be such that $$ c_n=\sum_{m=1}^na_mb_{nm} $$ Then $\lim_{n\to\infty}c_n=a$ if and only if $\lim_{n\to\infty}b_{nm}=0$ for each $m$.

The question in OP is a special case of the statement by letting $$ b_{nm}=\frac{1}{n},\quad m=1,2,\cdots. $$

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