graph the function. use the graph to find the indicated limit, if it exists. lim f(x), f(x)=x - 1 x→1 use…

graph the function. use the graph to find the indicated limit, if it exists. lim f(x), f(x)=x - 1 x→1 use the graphing tool to graph the linear equation. click to enlarge graph

graph the function. use the graph to find the indicated limit, if it exists. lim f(x), f(x)=x - 1 x→1 use the graphing tool to graph the linear equation. click to enlarge graph

Answer

Explanation:

Step1: Recall limit - definition

The limit $\lim_{x\rightarrow a}f(x)$ is the value that $f(x)$ approaches as $x$ gets closer and closer to $a$. For the linear function $y = f(x)=x - 1$, it is continuous everywhere.

Step2: Substitute the value of $x$

We can find the limit $\lim_{x\rightarrow1}(x - 1)$ by substituting $x = 1$ into the function $f(x)=x - 1$. When $x = 1$, we have $f(1)=1-1$.

Answer:

$0$