Latest revision as of 15:14, 21 October 2021

The Uniqueness of Limits of a Function Theorem

Recall from The Limit of a Function page that for a function $f:A\to \mathbb {R}$ where $c$ is a cluster point of $A$ , then $\lim _{x\to c}f(x)=L$ if $\forall \epsilon >0$ $\exists \delta >0$ such that if $x\in A$ and $0<\mid x-c\mid <\delta$ then $\mid f(x)-L\mid <\epsilon$ . We have not yet established that the limit $L$ is unique, so is it possible that $\lim _{x\to c}f(x)=L$ and $\lim _{x\to c}f(x)=M$ where $L\neq M$ ? The following theorem will show that this cannot happen.

Theorem (Uniqueness of Limits): Let

f:A\to \mathbb {R}

be a function and let

c

be a cluster point of

A

. Then if

L,M\in \mathbb {R}

are both limits of

f

at

c

, that is

\lim _{x\to c}f(x)=L

and

\lim _{x\to c}f(x)=M

, then

L=M

.

Proof: Let $f:A\to \mathbb {R}$ be a function and let $c$ be a cluster point of $A$ . Also let $\lim _{x\to c}f(x)=L$ and $\lim _{x\to c}f(x)=M$ . Suppose that $L\neq M$ . We will show that this leads to a contradiction. Let $\epsilon >0$ be given.

Since $\lim _{x\to c}f(x)=L$ , then for $\epsilon _{1}={\frac {\epsilon }{2}}$ $\exists \delta _{1}>0$ such that if $x\in A$ and $0<\mid x-c\mid <\delta _{1}$ then $\mid f(x)-L\mid <\epsilon _{1}={\frac {\epsilon }{2}}$ .

Similarly, since $\lim _{x\to c}f(x)=M$ then for $\epsilon _{2}={\frac {\epsilon }{2}}$ $\exists \delta _{2}>0$ such that if $x\in A$ and $0<\mid x-c\mid <\delta _{2}$ then $\mid f(x)-M\mid <\epsilon _{2}={\frac {\epsilon }{2}}$ . Now let $\delta =\mathrm {min} \{\delta _{1},\delta _{2}\}$ and so we have that:

${\begin{aligned}\quad \quad \mid L-M\mid =\mid L-f(x)+f(x)-M\mid \leq \mid L-f(x)\mid +\mid f(x)-M\mid <\epsilon _{1}+\epsilon _{2}={\frac {\epsilon }{2}}+{\frac {\epsilon }{2}}=\epsilon \end{aligned}}$

But $\epsilon >0$ is arbitrary, so this implies that $\mid L-M\mid =0$ , that is $L=M$ , a contradiction. So our assumption that $L\neq M$ was false, and so if $\lim _{x\to c}f(x)=L$ then $L$ is unique. $\blacksquare$

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 <h1 id="toc0">The Uniqueness of Limits of a Function Theorem</h1>
-<p>Recall from The Limit of a Function</a> page that for a function <math>f : A \to \mathbb{R}</math> where <math>c</math> is a cluster point of <math>A</math>, then <math>\lim_{x \to c} f(x) = L</math> if <math>\forall \epsilon > 0</math> <math>\exists \delta > 0</math> such that if <math>x \in A</math> and <math>0 < \mid x - c \mid < \delta</math> then <math>\mid f(x) - L \mid < \epsilon</math>. We have not yet established that the limit <math>L</math> is unique, so is it possible that <math>\lim_{x \to c} f(x) = L</math> and <math>\lim_{x \to c} f(x) = M</math> where <math>L \neq M</math>? The following theorem will show that this cannot happen.</p>
+<p>Recall from The Limit of a Function page that for a function <math>f : A \to \mathbb{R}</math> where <math>c</math> is a cluster point of <math>A</math>, then <math>\lim_{x \to c} f(x) = L</math> if <math>\forall \epsilon > 0</math> <math>\exists \delta > 0</math> such that if <math>x \in A</math> and <math>0 < \mid x - c \mid < \delta</math> then <math>\mid f(x) - L \mid < \epsilon</math>. We have not yet established that the limit <math>L</math> is unique, so is it possible that <math>\lim_{x \to c} f(x) = L</math> and <math>\lim_{x \to c} f(x) = M</math> where <math>L \neq M</math>? The following theorem will show that this cannot happen.</p>
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Difference between revisions of "The Limit Theorems for Functions"

Latest revision as of 15:14, 21 October 2021

The Uniqueness of Limits of a Function Theorem

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