4 Let f (x) = Determine the form of the interval(s) on which f is continuous. Then enter value(s) for the endpoint(s) if appropriate, If there is no value for a letter, type DNE in the blank. O((o, a] U [b, o) O [a, 0) 2o, a] 2a, a) 2(a, a) U (a, o) (a, o) O (a, 0) U (0, b) O (a, 0) U (0, b] O [a, 0) U (0, b) O [a, 0) U (0, b] a = b =

4 Let f (x) = Determine the form of the interval(s) on which f is continuous. Then enter value(s) for the endpoint(s) if appropriate, If there is no value for a letter, type DNE in the blank. O((o, a] U [b, o) O [a, 0) 2o, a] 2a, a) 2(a, a) U (a, o) (a, o) O (a, 0) U (0, b) O (a, 0) U (0, b] O [a, 0) U (0, b) O [a, 0) U (0, b] a = b =

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter5: Inverse, Exponential, And Logarithmic Functions

Section5.2: Exponential Functions

Problem 63E

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Concept explainers

Limits

When it comes to calculus, limits are considered to be a very important topic of discussion. The main importance of limit lies in expressing the value of a function as it gets closer to a certain value. Also, limits can help you to understand other topics, such as continuity and differentiability better. In a broader sense, every calculus notion is a limit. Other branches of calculus have also been derived from limits.

Question

4
x2
x4
Let f (x) =
Determine the form of the interval(s) on which f is continuous. Then enter value(s) for the endpoint(s) if appropriate. If there is no value for a letter, type DNE in the blank.
O(a, a] U [b, ∞)
O [a, 0)
O (-0, a]
O (-∞, a)
O (-0, a) U (a, o)
O (a, o)
(-00, 00)
O (a, 0) U (0, b)
O (a, 0) U (0, b]
O [a, 0) U (0, b)
O [a, 0) U (0, b]
a =
b =

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