Step-by-step explanation:
If the graph of any function is an unbroken curve, then the function is continuous. Let's study the function at the the point [/tex]x=5[/tex]:
At this point the function has the following value:
[tex]f(5)=-\frac{3}{4}[/tex], so the function in fact exists here, but let's find the limit here using:
[tex]f(x)=\frac{x^2-7x+10}{x^2-14x+45}[/tex]
So:
[tex]\underset{x\rightarrow5}{lim}\frac{x^2-7x+10}{x^2-14x+45}[/tex]
By factoring out this function we have:
[tex]\underset{x\rightarrow5}{lim}\frac{(x-2)(x-5)}{(x-5)(x-9)} \\ \\ \therefore \underset{x\rightarrow5}{lim}\frac{(x-2)}{(x-9)} \\ \\ \therefore \frac{(5-2)}{(5-9)}=-\frac{3}{4}[/tex]
Since [tex]\underset{x\rightarrow5}{lim}f(x)=f(5)[/tex] then the function is continuous here.
Let's come back to our function:
[tex]f(x)=\frac{x^2-7x+10}{x^2-14x+45}[/tex]
If we factor out this function we get:
[tex]f(x)=\frac{(x-2)}{(x-9)}[/tex]
Notice that at x = 9 the denominator becomes 0 implying that at this x-value there is a vertical asymptote. The graph of this function is shown below and you can see that at x = 9 the function is not continous
Therefore, the answer is:
b. continous at every point exept [tex]x=9[/tex]
