12.1 Finding limits: numerical and graphical approaches (Page 4/10)

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Using the graph of the function $y = f (x)$ shown in [link] , estimate the following limits.

Graph of a piecewise function that has three segments: 1) negative infinity to 0, 2) 0 to 2, and 3) 2 to positive inifnity, which has a discontinuity at (4, 4)

a. 0; b. 2; c. does not exist; d. $- 2;$ e. 0; f. does not exist; g. 4; h. 4; i. 4

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Finding a limit using a table

Creating a table is a way to determine limits using numeric information. We create a table of values in which the input values of $x$ approach $a$ from both sides. Then we determine if the output values get closer and closer to some real value, the limit $L .$

Let’s consider an example using the following function:

\lim_{x \to 5} (\frac{x^{3} - 125}{x - 5})

To create the table, we evaluate the function at values close to $x = 5.$ We use some input values less than 5 and some values greater than 5 as in [link] . The table values show that when $x > 5$ but nearing 5, the corresponding output gets close to 75. When $x > 5$ but nearing 5, the corresponding output also gets close to 75.

Table shows that as x values approach 5 from the positive or negative direction, f(x) gets very close to 75. But when x is equal to 5, y is undefined.

Because

\lim_{x \to 5^{-}} f (x) = 75 = \lim_{x \to 5^{+}} f (x),

then

\lim_{x \to 5} f (x) = 75.

Remember that $f (5)$ does not exist.

How To

Given a function $f,$ use a table to find the limit as $x$ approaches $a$ and the value of $f (a),$ if it exists.

Choose several input values that approach $a$ from both the left and right. Record them in a table.
Evaluate the function at each input value. Record them in the table.
Determine if the table values indicate a left-hand limit and a right-hand limit.
If the left-hand and right-hand limits exist and are equal, there is a two-sided limit.
Replace $x$ with $a$ to find the value of $f (a) .$

Finding a limit using a table

Numerically estimate the limit of the following expression by setting up a table of values on both sides of the limit.

\lim_{x \to 0} (\frac{5 \sin (x)}{3 x})

We can estimate the value of a limit, if it exists, by evaluating the function at values near $x = 0.$ We cannot find a function value for $x = 0$ directly because the result would have a denominator equal to 0, and thus would be undefined.

f (x) = \frac{5 \sin (x)}{3 x}

We create [link] by choosing several input values close to $x = 0,$ with half of them less than $x = 0$ and half of them greater than $x = 0.$ Note that we need to be sure we are using radian mode. We evaluate the function at each input value to complete the table.

The table values indicate that when $x < 0$ but approaching 0, the corresponding output nears $\frac{5}{3} .$

When $x > 0$ but approaching 0, the corresponding output also nears $\frac{5}{3} .$

Table shows that as x values approach 0 from the positive or negative direction, f(x) gets very close to 5 over 3. But when x is equal to 0, y is undefined.

Because

\lim_{x \to 0^{-}} f (x) = \frac{5}{3} = \lim_{x \to 0^{+}} f (x),

then

\lim_{x \to 0} f (x) = \frac{5}{3} .

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Q&A

Is it possible to check our answer using a graphing utility?

Yes. We previously used a table to find a limit of 75 for the function $f (x) = \frac{x^{3} - 125}{x - 5}$ as $x$ approaches 5. To check, we graph the function on a viewing window as shown in [link] . A graphical check shows both branches of the graph of the function get close to the output 75 as $x$ nears 5. Furthermore, we can use the ‘trace’ feature of a graphing calculator. By appraoching $x = 5$ we may numerically observe the corresponding outputs getting close to $75.$

Graph of an increasing function with a discontinuity at (5, 75)

Try It

Numerically estimate the limit of the following function by making a table:

\lim_{x \to 0} (\frac{20 \sin (x)}{4 x})

$\lim_{x \to 0} (\frac{20 \sin (x)}{4 x}) = 5$

Table showing that f(x) approaches 5 from either side as x approaches 0 from either side.

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Q&A

Is one method for determining a limit better than the other?

No. Both methods have advantages. Graphing allows for quick inspection. Tables can be used when graphical utilities aren’t available, and they can be calculated to a higher precision than could be seen with an unaided eye inspecting a graph.

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Source: OpenStax, Precalculus. OpenStax CNX. Jan 19, 2016 Download for free at https://legacy.cnx.org/content/col11667/1.6

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