X .111 60% 21:50 < 3.2 cc DETAILS SUBMISSIONS GRADE 3.2 CC Due: Feb 11, 2019 18:00 Last Submission: None 1. Write out the limit definition of the derivative function 2. What does h represent in this definition? 3. Explain the difference between the dx notation and dx. You can use an example to help your explanation 3. In section 2.6, we explored the definition of a function being continuous at a point. We can also determine when a function is differentiable (has a derivative) at a point. List 3 examples of when a function cannot be differentiable at a point x - a. (hint: go to page 147 of your book Dashboard
X .111 60% 21:50 < 3.2 cc DETAILS SUBMISSIONS GRADE 3.2 CC Due: Feb 11, 2019 18:00 Last Submission: None 1. Write out the limit definition of the derivative function 2. What does h represent in this definition? 3. Explain the difference between the dx notation and dx. You can use an example to help your explanation 3. In section 2.6, we explored the definition of a function being continuous at a point. We can also determine when a function is differentiable (has a derivative) at a point. List 3 examples of when a function cannot be differentiable at a point x - a. (hint: go to page 147 of your book Dashboard
X .111 60% 21:50 < 3.2 cc DETAILS SUBMISSIONS GRADE 3.2 CC Due: Feb 11, 2019 18:00 Last Submission: None 1. Write out the limit definition of the derivative function 2. What does h represent in this definition? 3. Explain the difference between the dx notation and dx. You can use an example to help your explanation 3. In section 2.6, we explored the definition of a function being continuous at a point. We can also determine when a function is differentiable (has a derivative) at a point. List 3 examples of when a function cannot be differentiable at a point x - a. (hint: go to page 147 of your book Dashboard
What are three examples of when a function is not differential? (Last Question)
Transcribed Image Text:X .111 60% 21:50
< 3.2 cc
DETAILS
SUBMISSIONS
GRADE
3.2 CC
Due: Feb 11, 2019 18:00
Last Submission: None
1. Write out the limit definition of the
derivative function
2. What does h represent in this definition?
3. Explain the difference between the dx
notation and dx. You can use an example to
help your explanation
3. In section 2.6, we explored the definition of a
function being continuous at a point. We can
also determine when a function is differentiable
(has a derivative) at a point. List 3 examples of
when a function cannot be differentiable at a
point x - a. (hint: go to page 147 of your
book
Dashboard
With integration, one of the major concepts of calculus. Differentiation is the derivative or rate of change of a function with respect to the independent variable.
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