Answer:
The limit of the function does not exists.
Step-by-step explanation:
From the graph it is noticed that the value of the function is 6 from all values of x which are less than 2. At x=2, the line y=6 has open circle. It means x=2 is not included.
For x<2
[tex]f(x)=6[/tex]
The value of the function is -3 from all values of x which are greater than 2. At x=2, the line y=-3 has open circle. It means x=2 is not included.
For x>2
[tex]f(x)=-3[/tex]
The value of y is 1 at x=2, because of he close circles on (2,1).
For x=2
[tex]f(x)=1[/tex]
Therefore the graph represents a piecewise function, which is defined as
[tex]f(x)=\begin{cases}6& \text{ if } x<2\\ 1& \text{ if } x=2 \\ -3& \text{ if } x>2 \end{cases}[/tex]
The limit of a function exist at a point a if the left hand limit and right hand limit are equal.
[tex]lim_{x\rightarrow a^-}f(x)=lim_{x\rightarrow a^+}f(x)[/tex]
The function is broken at x=2, therefore we have to find the left and right hand limit at x=2.
[tex]lim_{x\rightarrow 2^-}f(x)=6[/tex]
[tex]lim_{x\rightarrow 2^+}f(x)=-3[/tex]
[tex]6\neq-3[/tex]
Since the left hand limit and right hand limit are not equal therefore the limit of the function does not exists.
