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)

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.

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.

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.