QuestionSuppose $C$ is a constant and $g(x)$ is a function of $x$ such that $$C x+2 \leq g(x) \leq x-4$$ for all values of $x$ near 16 but not equal to 16 . We wish to find $\lim _{x \rightarrow 16} g(x)$ by using the Squeeze Theorem. a. In order for the Squeeze Theorem to be applicable in this case, what must the value of $C$ be equal to? Enter your answer as an exact value (enter as a fraction if necessary). $$C=\square$$ b. Find $\lim _{x \rightarrow 16} g(x)$ using the Squeeze Theorem. Enter your answer as an exact value (enter as a fraction if necessary).
Answer: $\square$