12.1 Finding limits: numerical and graphical approaches (Page 2/10)

Precalculus

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A General Note

The limit of a function

A quantity $L$ is the limit of a function $f (x)$ as $x$ approaches $a$ if, as the input values of $x$ approach $a$ (but do not equal $a),$ the corresponding output values of $f (x)$ get closer to $L .$ Note that the value of the limit is not affected by the output value of $f (x)$ at $a .$ Both $a$ and $L$ must be real numbers. We write it as

\lim_{x \to a} f (x) = L

Understanding the limit of a function

For the following limit, define $a, f (x),$ and $L .$

\lim_{x \to 2} (3 x + 5) = 11

First, we recognize the notation of a limit. If the limit exists, as $x$ approaches $a,$ we write

\lim_{x \to a} f (x) = L .

We are given

\lim_{x \to 2} (3 x + 5) = 11.

This means that $a = 2, f (x) = 3 x + 5, and L = 11.$

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For the following limit, define $a, f (x),$ and $L .$

\lim_{x \to 5} (2 x^{2} - 4) = 46

$a = 5,$ $f (x) = 2 x^{2} - 4,$ and $L = 46.$

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Understanding left-hand limits and right-hand limits

We can approach the input of a function from either side of a value—from the left or the right. [link] shows the values of

f (x) = x + 1, x \neq 7

as described earlier and depicted in [link] .

Table showing that f(x) approaches 8 from either side as x approaches 7 from either side.

Values described as “from the left” are less than the input value 7 and would therefore appear to the left of the value on a number line. The input values that approach 7 from the left in [link] are $6.9,$ $6.99,$ and $6.999.$ The corresponding outputs are $7.9, 7.99,$ and $7.999.$ These values are getting closer to 8. The limit of values of $f (x)$ as $x$ approaches from the left is known as the left-hand limit. For this function, 8 is the left-hand limit of the function $f (x) = x + 1, x \neq 7$ as $x$ approaches 7.

Values described as “from the right” are greater than the input value 7 and would therefore appear to the right of the value on a number line. The input values that approach 7 from the right in [link] are $7.1,$ $7.01,$ and $7.001.$ The corresponding outputs are $8.1,$ $8.01,$ and $8.001.$ These values are getting closer to 8. The limit of values of $f (x)$ as $x$ approaches from the right is known as the right-hand limit. For this function, 8 is also the right-hand limit of the function $f (x) = x + 1, x \neq 7$ as $x$ approaches 7.

[link] shows that we can get the output of the function within a distance of 0.1 from 8 by using an input within a distance of 0.1 from 7. In other words, we need an input $x$ within the interval $6.9 < x < 7.1$ to produce an output value of $f (x)$ within the interval $7.9 < f (x) < 8.1.$

We also see that we can get output values of $f (x)$ successively closer to 8 by selecting input values closer to 7. In fact, we can obtain output values within any specified interval if we choose appropriate input values.

[link] provides a visual representation of the left- and right-hand limits of the function. From the graph of $f (x),$ we observe the output can get infinitesimally close to $L = 8$ as $x$ approaches 7 from the left and as $x$ approaches 7 from the right.

To indicate the left-hand limit, we write

\lim_{x \to 7^{-}} f (x) = 8.

To indicate the right-hand limit, we write

\lim_{x \to 7^{+}} f (x) = 8.

Graph of the previous function explaining the function's limit at (7, 8) — The left- and right-hand limits are the same for this function.

A General Note

Left- and right-hand limits

The left-hand limit of a function $f (x)$ as $x$ approaches $a$ from the left is equal to $L,$ denoted by

\lim_{x \to a^{-}} f (x) = L .

The values of $f (x)$ can get as close to the limit $L$ as we like by taking values of $x$ sufficiently close to $a$ such that $x < a$ and $x \neq a .$

The right-hand limit of a function $f (x),$ as $x$ approaches $a$ from the right, is equal to $L,$ denoted by

\lim_{x \to a^{+}} f (x) = L .

The values of $f (x)$ can get as close to the limit $L$ as we like by taking values of $x$ sufficiently close to $a$ but greater than $a .$ Both $a$ and $L$ are real numbers.

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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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