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Ch. 2 - Limits and Continuity
Hass - Thomas' Calculus 15th Edition
Hass15th EditionThomas' CalculusISBN: 9780137616077Not the one you use?Change textbook
All textbooksHass 15th EditionCh. 2 - Limits and ContinuityProblem 100
Chapter 2, Problem 100

Use the formal definitions from Exercise 97 to prove the limit statements in Exercises 98–102.
lim x→2⁻ (1 / (x − 2)) = −∞

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1
Understand the problem: We need to prove that as x approaches 2 from the left (x → 2⁻), the function f(x) = 1 / (x - 2) approaches negative infinity.
Recall the formal definition of a limit approaching negative infinity: For every positive number M, there exists a δ > 0 such that if 0 < |x - 2| < δ and x < 2, then f(x) < -M.
Set up the inequality: We want to show that 1 / (x - 2) < -M. This implies that x - 2 < -1/M, which further implies x < 2 - 1/M.
Choose δ: To satisfy the condition 0 < |x - 2| < δ and x < 2, we can choose δ = min(1, 1/M). This ensures that x is close to 2 from the left and satisfies the inequality.
Conclude the proof: With this choice of δ, whenever 0 < |x - 2| < δ and x < 2, the inequality 1 / (x - 2) < -M holds, thus proving that the limit of f(x) as x approaches 2 from the left is negative infinity.

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Key Concepts

Here are the essential concepts you must grasp in order to answer the question correctly.

Limit Definition

The limit of a function at a point describes the behavior of the function as it approaches that point. Formally, we say that the limit of f(x) as x approaches a is L if, for every ε > 0, there exists a δ > 0 such that whenever 0 < |x - a| < δ, it follows that |f(x) - L| < ε. This definition is crucial for proving limit statements rigorously.
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One-Sided Limits

One-sided limits consider the behavior of a function as it approaches a specific point from one side only. The left-hand limit, denoted as lim x→a⁻ f(x), examines the values of f(x) as x approaches a from the left. Understanding one-sided limits is essential for analyzing functions that exhibit different behaviors from either side of a point, particularly in cases of discontinuity.
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Behavior of Rational Functions

Rational functions are ratios of polynomials, and their limits can often lead to infinite values. In the case of lim x→2⁻ (1 / (x - 2)), as x approaches 2 from the left, the denominator approaches zero negatively, causing the function to decrease without bound. Recognizing how rational functions behave near their vertical asymptotes is key to understanding limits that result in ±∞.
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Related Practice
Textbook Question

Find the limits in Exercises 59–62. Write ∞ or −∞ where appropriate.


lim (2 − 3 / t¹/³) as


a. t → 0⁺

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Textbook Question

Oblique Asymptotes


Graph the rational functions in Exercises 103–108. Include the graphs and equations of the asymptotes.


y = (x² − 1) / x

226
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Textbook Question

Oblique Asymptotes


Graph the rational functions in Exercises 103–108. Include the graphs and equations of the asymptotes.


y = (x² − 4) / (x − 1)

232
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Textbook Question

Oblique Asymptotes


Graph the rational functions in Exercises 103–108. Include the graphs and equations of the asymptotes.


y = x² / (x − 1)

217
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Textbook Question

Theory and Examples


Suppose that g(x) ≤ f(x) ≤ h(x) for all x≠2 and suppose that lim x→2 g(x) = lim x→2 h(x) = −5. Can we conclude anything about the values of f, g, and h at x = 2? Could f(2) = 0? Could limx→2 f(x)=0? Give reasons for your answers.

310
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Textbook Question

Theory and Examples


If x⁴ ≤ f(x) ≤ x² for x in [−1,1] and x² ≤ f(x) ≤ x⁴ for x < - 1 and x > 1, at what points c do you automatically know limx→c f(x)? What can you say about the value of the limit at these points?

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