Textbook Question
Using the Formal Definition
Prove the limit statements in Exercises 37–50.
limx →4 (9 − x) = 5
Ch. 2 - Limits and Continuity
Hass15th EditionThomas' CalculusISBN: 9780137616077
Not the one you use?Change textbookSelect a different textbook
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 2.2.58
Limits of Average Rates of Change
Because of their connection with secant lines, tangents, and instantaneous rates, limits of the form limh→0 (f(x+h) − f(x)) / h occur frequently in calculus. In Exercises 57–62, evaluate this limit for the given value of x and function f.
f(x) = x², x = -2
Verified step by step guidance1
Identify the function f(x) = x² and the point x = -2 where we need to evaluate the limit.
Substitute f(x) = x² into the limit expression: lim(h→0) [(f(x+h) - f(x)) / h]. This becomes lim(h→0) [((x+h)² - x²) / h].
Expand the expression (x+h)² to get x² + 2xh + h². Substitute this back into the limit expression: lim(h→0) [(x² + 2xh + h² - x²) / h].
Simplify the expression by canceling out x²: lim(h→0) [(2xh + h²) / h].
Factor out h from the numerator: lim(h→0) [h(2x + h) / h]. Cancel h from the numerator and denominator, resulting in lim(h→0) [2x + h]. Now, substitute x = -2 and evaluate the limit as h approaches 0.
Verified video answer for a similar problem:
This video solution was recommended by our tutors as helpful for the problem above.
Video duration:
4mWas this helpful?
Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Limits
In calculus, a limit describes the behavior of a function as its input approaches a certain value. It is fundamental for understanding continuity, derivatives, and integrals. The notation lim h→0 (f(x+h) - f(x)) / h specifically represents the limit of the average rate of change of a function as the interval approaches zero, which leads to the concept of the derivative.
Recommended video:
05:50
One-Sided Limits
Derivatives
The derivative of a function at a point quantifies the instantaneous rate of change of the function with respect to its variable. It is defined as the limit of the average rate of change as the interval shrinks to zero. In the context of the given question, finding the derivative of f(x) = x² at x = -2 involves evaluating the limit expression provided.
Recommended video:
05:44Derivatives
Secant and Tangent Lines
Secant lines connect two points on a curve and represent the average rate of change between those points. As the two points get infinitely close, the secant line approaches the tangent line, which touches the curve at a single point and represents the instantaneous rate of change. Understanding this relationship is crucial for grasping how limits lead to derivatives in calculus.
Recommended video:
05:13Slopes of Tangent Lines
Related Practice
Textbook Question
Finding One-Sided Limits Algebraically
Find the limits in Exercises 11–20.
limh→0− (√6 − √(5h² + 11h + 6))/ h
Textbook Question
Finding Limits of Differences When x → ±∞
Find the limits in Exercises 84–90. (Hint: Try multiplying and dividing by the conjugate.)
lim x → ∞ (√(9x² − x) − 3x)
Textbook Question
Find the limits in Exercises 31–40. Are the functions continuous at the point being approached?
lim ϴ → 0 cos (πϴ/sin ϴ)
Textbook Question
Theory and Examples
If limx→4 (f(x) − 5) / (x − 2) = 1, find limx→4 f(x).
Textbook Question
Finding Limits of Differences When x → ±∞
Find the limits in Exercises 84–90. (Hint: Try multiplying and dividing by the conjugate.)
lim x → ∞ (√(x² + 25) − √(x² − 1))