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Prove that if $\begin{equation}\lim_{x\to a\,}\,f(x)=L\end{equation}$ then $\begin{equation}\lim_{x\to a-}\,f(x)=L\quad\mbox{and}\quad\lim_{x\to a+}\,f(x)=L.\end{equation}$

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Lesson Parent:

Function Limits IV: The Gory Details Of One-Sided Limits

Problem:

Answer:

It is true that if $\begin{equation}\lim_{x\to a\,}\,f(x)=L\end{equation}$ then $\begin{equation}\lim_{x\to a-}\,f(x)=L\quad\mbox{and}\quad\lim_{x\to a+}\,f(x)=L.\end{equation}$

Solution:

Because

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we know that for every <Sign in to see all the formulas> there exists a <Sign in to see all the formulas> such that if <Sign in to see all the formulas> then <Sign in to see all the formulas>.

Now let's pick an arbitrary <Sign in to see all the formulas> and use the same <Sign in to see all the formulas> we would use to prove

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Furthermore, let's assume that we are at an

$x$ such that <Sign in to see all the formulas>. Because <Sign in to see all the formulas> means that <Sign in to see all the formulas> or <Sign in to see all the formulas> and because

<Sign in to see all the formulas>

we know that when <Sign in to see all the formulas> then <Sign in to see all the formulas>. But this is precisely the definition of our left-sided limit and therefore

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Using the same <Sign in to see all the formulas> and <Sign in to see all the formulas> as in the previous paragraph, let's assume that we are at an $x$ such that <Sign in to see all the formulas>. Because <Sign in to see all the formulas> means that <Sign in to see all the formulas> or <Sign in to see all the formulas> and because

<Sign in to see all the formulas>

we know that when <Sign in to see all the formulas> then <Sign in to see all the formulas>. But this is precisely the definition of our right-sided limit and therefore

Prove that if limx→af(x)=L\begin{equation}\lim_{x\to a\,}\,f(x)=L\end{equation} then limx→a−f(x)=Landlimx→a+f(x)=L.\begin{equation}\lim_{x\to a-}\,f(x)=L\quad\mbox{and}\quad\lim_{x\to a+}\,f(x)=L.\end{equation}

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SAMPLE SOLUTION

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<Sign in to see all the formulas>

GAIN AN ADVANTAGE

Prove that if $\begin{equation}\lim_{x\to a\,}\,f(x)=L\end{equation}$ then $\begin{equation}\lim_{x\to a-}\,f(x)=L\quad\mbox{and}\quad\lim_{x\to a+}\,f(x)=L.\end{equation}$