Answer:
-60
Step-by-step explanation:
The objective is to state whether or not the following limit exists
[tex]\lim_{x \to -2} \frac{3(2x-1)^2 - 75}{x+2}[/tex].
First, we simplify the expression in the numerator of the fraction.
[tex]3(2x-1)^2 -75 = 3(4x^2 - 4x +1) -75 = 12x^2 - 12x + 3 - 75 = 12x^2 - 12x -72[/tex]
Now, we obtain
[tex]12(x^2-x-6) = 12(x+2)(x-3)[/tex]
and the fraction is transformed into
[tex]\frac{3(2x-1)^2 - 75}{x+2} = \frac{12(x+2)(x-3)}{x+2} = 12 (x-3)[/tex]
Therefore, the following limit is
[tex]\lim_{x \to -2} \frac{3(2x-1)^2 - 75}{x+2} = \lim_{x \to -2} 12(x-3) = 12 \lim_{x \to -2} (x-3)[/tex]
You can plug in [tex]-2[/tex] in the equation, hence
[tex]12 \lim_{x \to -2} (x-3) = 12 (-2-3) = -60[/tex]
