Textbook Question
Domains and Asymptotes
Determine the domain of each function in Exercises 69–72. Then use various limits to find the asymptotes.
y = x³ / (x³ − 8)
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Ch. 2 - Limits and Continuity
Hass15th EditionThomas' CalculusISBN: 9780137616077
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Table of contents
- Ch. 1 - Functions155
- Ch. 2 - Limits and Continuity240
- Ch. 3 - Derivatives337
- Ch. 4 - Applications of Derivatives293
- Ch. 5 - Integrals41
- Ch. 6 - Applications of Definite Integrals25
- Ch. 7 - Transcendental Functions489
- Ch. 8 - Techniques of Integration398
- Ch. 9 - First-Order Differential Equations60
- Ch. 10 - Infinite Sequences and Series119
- Ch. 11 - Parametric Equations and Polar Coordinates58
Chapter 2, Problem 2.4.43
Using limθ→0 sin θ / θ = 1
Find the limits in Exercises 23–46.
limθ→0 tan θ / θ²cot 3θ
Verified step by step guidance1
First, recognize that the limit involves trigonometric functions and their behavior as θ approaches 0. We will use the known limit limθ→0 sin θ / θ = 1 to help simplify the expression.
Rewrite tan θ in terms of sin θ and cos θ: tan θ = sin θ / cos θ. Similarly, rewrite cot 3θ as cos 3θ / sin 3θ.
Substitute these expressions into the limit: limθ→0 (sin θ / cos θ) / (θ² * (cos 3θ / sin 3θ)).
Simplify the expression: limθ→0 (sin θ * sin 3θ) / (θ² * cos θ * cos 3θ).
Apply the limit properties and the known limit limθ→0 sin θ / θ = 1 to evaluate the limit as θ approaches 0. Consider the behavior of each trigonometric function and their derivatives at θ = 0.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Limit of a Function
The limit of a function describes the behavior of the function as the input approaches a particular value. In calculus, understanding limits is crucial for analyzing the continuity and differentiability of functions. For the given problem, evaluating the limit as θ approaches 0 is essential to determine the behavior of the expression tan θ / θ²cot 3θ.
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Limits of Rational Functions: Denominator = 0
Trigonometric Limits
Trigonometric limits involve evaluating limits that include trigonometric functions like sine, cosine, and tangent. A fundamental trigonometric limit is limθ→0 sin θ / θ = 1, which is often used to simplify expressions involving small angles. This concept is key in solving the given problem, as it helps in simplifying the trigonometric components of the expression.
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6:04Introduction to Trigonometric Functions
L'Hôpital's Rule
L'Hôpital's Rule is a method for finding limits of indeterminate forms like 0/0 or ∞/∞. It states that if the limit of f(x)/g(x) as x approaches a value results in an indeterminate form, the limit can be found by differentiating the numerator and denominator separately. This rule is useful in the given problem if direct substitution leads to an indeterminate form, allowing for further simplification.
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Guided course
5:50Power Rules
Related Practice
Textbook Question
Find the limits in Exercises 31–40. Are the functions continuous at the point being approached?
lim t → 0 sin (π/2 cos (tan t))
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Textbook Question
Define g(4) in a way that extends g(x) = (x² − 16)/(x² − 3x − 4) to be continuous at x = 4.
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Textbook Question
Using limθ→0 sin θ / θ = 1
Find the limits in Exercises 23–46.
limx→0 (cos²x − cos x) / x²
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Textbook Question
Limits of quotients
Find the limits in Exercises 23–42.
limx→−5 (x² + 3x − 10) / x + 5
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Textbook Question
Suppose that a function f(x) is defined for all real values of x except x=c. Can anything be said about the existence of limx→c f(x)? Give reasons for your answer.
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