find the limit. write ∞ or - ∞ where appropriate.\nlim(x→5⁻) 3/(x - 5)\nlim(x→5⁻) 3/(x - 5)= (simplify your…

find the limit. write ∞ or - ∞ where appropriate.\nlim(x→5⁻) 3/(x - 5)\nlim(x→5⁻) 3/(x - 5)= (simplify your answer.)
Answer
Explanation:
Step1: Analyze the denominator
As $x\to5^{-}$, we consider values of $x$ that are less than 5 but approaching 5. So, $x - 5\to0^{-}$.
Step2: Analyze the fraction
We have the fraction $\frac{3}{x - 5}$. Since the numerator is a non - zero constant 3 and the denominator is approaching 0 from the negative side, $\frac{3}{x - 5}\to-\infty$.
Answer:
$-\infty$