Suppose the function g statisfies -32x 2x² 137 < g(x) < x² + 16x + 55. We want to use the Squeeze Theorem to evaluate lim g(x). I> - First evaluate: lim -32x - 2x² 137 248 - Next evaluate: lim x2 +16x + 55 18 Therefore, by the Squeeze Theorem, lim_ g(x) = Question Help: Message instructor Submit Question H Post to forum
Suppose the function g statisfies -32x 2x² 137 < g(x) < x² + 16x + 55. We want to use the Squeeze Theorem to evaluate lim g(x). I> - First evaluate: lim -32x - 2x² 137 248 - Next evaluate: lim x2 +16x + 55 18 Therefore, by the Squeeze Theorem, lim_ g(x) = Question Help: Message instructor Submit Question H Post to forum
Glencoe Algebra 1, Student Edition, 9780079039897, 0079039898, 2018
18th Edition
ISBN:9780079039897
Author:Carter
Publisher:Carter
Chapter9: Quadratic Functions And Equations
Section: Chapter Questions
Problem 28PT
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Question
![Suppose the function g statisfies
-321- 2x²
< g(x) < x² + 16x + 55.
We want to use the Squeeze Theorem to evaluate lim g(x).
137<
First evaluate: lim -32x - 21² - 137
→→ 8
Next evaluate: lim x² + 16x +55
18
Therefore, by the Squeeze Theorem, lim_ g(x) =
18
Question Help: Message instructor D Post to forum
Submit Question
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Transcribed Image Text:Suppose the function g statisfies
-321- 2x²
< g(x) < x² + 16x + 55.
We want to use the Squeeze Theorem to evaluate lim g(x).
137<
First evaluate: lim -32x - 21² - 137
→→ 8
Next evaluate: lim x² + 16x +55
18
Therefore, by the Squeeze Theorem, lim_ g(x) =
18
Question Help: Message instructor D Post to forum
Submit Question
Q Search
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