QUESTION IMAGE
Question
use the graph of the function f shown to estimate the following limits and the function value. complete parts (a) through (d). (a) find lim f(x). select the correct choice below and, if necessary, fill in the answer box to complete your choice. a. lim f(x)= (type an integer or a decimal) x→4⁻ b. the limit does not exist. (b) find lim f(x). select the correct choice below and, if necessary, fill in the answer box to complete your choice. a. lim f(x)= (type an integer or a decimal) x→4⁺ b. the limit does not exist. (c) find lim f(x). select the correct choice below and, if necessary, fill in the answer box to complete your choice. a. lim f(x)= (type an integer or a decimal) x→4 b. the limit does not exist. (d) find the function value f(4). select the correct choice below and, if necessary, fill in the answer box to complete your choice. a. f(4)= (type an integer or a decimal.) b. the function is not defined at x = 4
Step1: Analyze left - hand limit
To find $\lim_{x
ightarrow4^{-}}f(x)$, we look at the values of the function as $x$ approaches 4 from the left - hand side of the graph. We trace the graph from the left towards $x = 4$.
Step2: Analyze right - hand limit
To find $\lim_{x
ightarrow4^{+}}f(x)$, we look at the values of the function as $x$ approaches 4 from the right - hand side of the graph. We trace the graph from the right towards $x = 4$.
Step3: Determine overall limit
The limit $\lim_{x
ightarrow4}f(x)$ exists if and only if $\lim_{x
ightarrow4^{-}}f(x)=\lim_{x
ightarrow4^{+}}f(x)$.
Step4: Find function value
To find $f(4)$, we check the value of the function at the point $x = 4$ on the graph. If there is a closed - circle or a defined point at $x = 4$, that is the function value; if there is an open - circle or no point at $x = 4$, the function is not defined at $x = 4$.
Since the graph is not provided here, we cannot give specific numerical answers. But the general process for answering each part is as follows:
(A)
If as $x$ approaches 4 from the left, the $y$ - values approach a single number $L_1$, then $\lim_{x
ightarrow4^{-}}f(x)=L_1$. If the graph has a break or jump as $x$ approaches 4 from the left, the limit does not exist.
(B)
If as $x$ approaches 4 from the right, the $y$ - values approach a single number $L_2$, then $\lim_{x
ightarrow4^{+}}f(x)=L_2$. If the graph has a break or jump as $x$ approaches 4 from the right, the limit does not exist.
(C)
If $\lim_{x
ightarrow4^{-}}f(x)=\lim_{x
ightarrow4^{+}}f(x)=L$, then $\lim_{x
ightarrow4}f(x)=L$. If $\lim_{x
ightarrow4^{-}}f(x)
eq\lim_{x
ightarrow4^{+}}f(x)$, then $\lim_{x
ightarrow4}f(x)$ does not exist.
(D)
If there is a closed - circle or a defined point on the graph at $x = 4$ with $y$ - value $y_0$, then $f(4)=y_0$. If there is an open - circle or no point at $x = 4$, then the function is not defined at $x = 4$.
Since the graph is missing, we cannot provide specific answers. But the steps to find them are as above.
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Step1: Analyze left - hand limit
To find $\lim_{x
ightarrow4^{-}}f(x)$, we look at the values of the function as $x$ approaches 4 from the left - hand side of the graph. We trace the graph from the left towards $x = 4$.
Step2: Analyze right - hand limit
To find $\lim_{x
ightarrow4^{+}}f(x)$, we look at the values of the function as $x$ approaches 4 from the right - hand side of the graph. We trace the graph from the right towards $x = 4$.
Step3: Determine overall limit
The limit $\lim_{x
ightarrow4}f(x)$ exists if and only if $\lim_{x
ightarrow4^{-}}f(x)=\lim_{x
ightarrow4^{+}}f(x)$.
Step4: Find function value
To find $f(4)$, we check the value of the function at the point $x = 4$ on the graph. If there is a closed - circle or a defined point at $x = 4$, that is the function value; if there is an open - circle or no point at $x = 4$, the function is not defined at $x = 4$.
Since the graph is not provided here, we cannot give specific numerical answers. But the general process for answering each part is as follows:
(A)
If as $x$ approaches 4 from the left, the $y$ - values approach a single number $L_1$, then $\lim_{x
ightarrow4^{-}}f(x)=L_1$. If the graph has a break or jump as $x$ approaches 4 from the left, the limit does not exist.
(B)
If as $x$ approaches 4 from the right, the $y$ - values approach a single number $L_2$, then $\lim_{x
ightarrow4^{+}}f(x)=L_2$. If the graph has a break or jump as $x$ approaches 4 from the right, the limit does not exist.
(C)
If $\lim_{x
ightarrow4^{-}}f(x)=\lim_{x
ightarrow4^{+}}f(x)=L$, then $\lim_{x
ightarrow4}f(x)=L$. If $\lim_{x
ightarrow4^{-}}f(x)
eq\lim_{x
ightarrow4^{+}}f(x)$, then $\lim_{x
ightarrow4}f(x)$ does not exist.
(D)
If there is a closed - circle or a defined point on the graph at $x = 4$ with $y$ - value $y_0$, then $f(4)=y_0$. If there is an open - circle or no point at $x = 4$, then the function is not defined at $x = 4$.
Since the graph is missing, we cannot provide specific answers. But the steps to find them are as above.