Table of contents

0. Functions7h 52m
1. Limits and Continuity2h 2m
2. Intro to Derivatives1h 33m
3. Techniques of Differentiation3h 18m
4. Applications of Derivatives2h 38m
5. Graphical Applications of Derivatives6h 2m
6. Derivatives of Inverse, Exponential, & Logarithmic Functions2h 37m
7. Antiderivatives & Indefinite Integrals1h 26m
8. Definite Integrals4h 44m
9. Graphical Applications of Integrals2h 27m
- Area Between Curves
  1h 18m
- Introduction to Volume & Disk Method
  1h 8m
10. Physics Applications of Integrals 3h 16m
- Kinematics
  1h 13m
- Work
  2h 3m
11. Integrals of Inverse, Exponential, & Logarithmic Functions2h 34m
12. Techniques of Integration7h 39m
13. Intro to Differential Equations2h 55m
14. Sequences & Series5h 36m
15. Power Series2h 19m
- Introduction to Power Series
  1h 9m
- Taylor Series & Taylor Polynomials
  1h 10m
16. Parametric Equations & Polar Coordinates7h 58m

1. Limits and Continuity

Finding Limits Algebraically

Calculus

1. Limits and Continuity

Finding Limits Algebraically

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2:04 minutes

Problem 3h

Textbook Question

Limits and Continuity

Suppose that ƒ(t) and ƒ(t) are defined for all t and that lim t → t₀ ƒ(t) = ―7 and lim (t → t₀) g (t) = 0 . Find the limit as t → t₀ of the following functions.
h. 1 / ƒ(t)

Verified step by step guidance

Identify the given limits: lim t → t₀ ƒ(t) = -7 and lim t → t₀ g(t) = 0. We need to find lim t → t₀ of 1/ƒ(t).

Recall the limit property for the reciprocal function: If lim t → t₀ ƒ(t) = L and L ≠ 0, then lim t → t₀ 1/ƒ(t) = 1/L.

Apply the property to the given function: Since lim t → t₀ ƒ(t) = -7 and -7 ≠ 0, we can use the reciprocal limit property.

Substitute the limit value into the reciprocal property: lim t → t₀ 1/ƒ(t) = 1/(-7).

Conclude that the limit of 1/ƒ(t) as t approaches t₀ is the reciprocal of -7, which is -1/7.

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Key Concepts

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

Limits

A limit describes the value that a function approaches as the input approaches a certain point. In this context, the limit of ƒ(t) as t approaches t₀ is given as -7, indicating that as t gets closer to t₀, ƒ(t) gets closer to -7. Understanding limits is crucial for analyzing the behavior of functions near specific points, especially when dealing with continuity and discontinuity.

Continuity

A function is continuous at a point if the limit of the function as it approaches that point equals the function's value at that point. In this case, since lim t → t₀ ƒ(t) = -7, we can infer that ƒ(t) is continuous at t₀ if ƒ(t₀) is also -7. Continuity is essential for ensuring that limits can be evaluated without encountering undefined behavior.

Reciprocal Limits

The limit of the reciprocal of a function, such as 1/ƒ(t), can be evaluated using the limit of the function itself. If lim t → t₀ ƒ(t) = -7, then lim t → t₀ (1/ƒ(t)) = 1/(-7) = -1/7, provided that ƒ(t) does not approach zero. This concept is important for understanding how limits behave under operations like taking reciprocals.

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Suppose that ƒ(t) and ƒ(t) are defined for all t and that lim t → t₀ ƒ(t) = ―7 and lim (t → t₀) g (t) = 0 . Find the limit as t → t₀ of the following functions.

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