find the limit. write ∞ or - ∞ where appropriate.\nlim(x→0⁻) - 1/(11x)\nlim(x→0⁻) - 1/(11x) = (simplify your…

find the limit. write ∞ or - ∞ where appropriate.\nlim(x→0⁻) - 1/(11x)\nlim(x→0⁻) - 1/(11x) = (simplify your answer.)

find the limit. write ∞ or - ∞ where appropriate.\nlim(x→0⁻) - 1/(11x)\nlim(x→0⁻) - 1/(11x) = (simplify your answer.)

Answer

Explanation:

Step1: Analyze x approaching 0 from left

As (x\to0^{-}), (x) is a very small negative number.

Step2: Evaluate the fraction

Let (x) be a small negative number. Then (\frac{1}{11x}) is a large negative number since (11x) is negative and close to 0. So (-\frac{1}{11x}) is a large positive number.

Answer:

(\infty)