(a) Give an example of a continuous function whose derivative does not exist at x = 0. (Hint: this would be relatively easy to do with a piecewise function, but you have to think of a function that uses a formula that Mobius recognises. Check the Mobius Syntax Guide on MyUni for examples of the functions that are accepted by Mobius - the answer is in there.) (b) Give an example of a function which is continuous at x = 2 but whose derivative does not exist at z = 2. (c) Give an example of a function that is continuous at x = -2, x = 0 and x = 3 but whose derivative does not exist at any of those points.
(a) Give an example of a continuous function whose derivative does not exist at x = 0. (Hint: this would be relatively easy to do with a piecewise function, but you have to think of a function that uses a formula that Mobius recognises. Check the Mobius Syntax Guide on MyUni for examples of the functions that are accepted by Mobius - the answer is in there.) (b) Give an example of a function which is continuous at x = 2 but whose derivative does not exist at z = 2. (c) Give an example of a function that is continuous at x = -2, x = 0 and x = 3 but whose derivative does not exist at any of those points.
Functions and Change: A Modeling Approach to College Algebra (MindTap Course List)
6th Edition
ISBN:9781337111348
Author:Bruce Crauder, Benny Evans, Alan Noell
Publisher:Bruce Crauder, Benny Evans, Alan Noell
Chapter1: Functions
Section1.2: Functions Given By Tables
Problem 32SBE: Does a Limiting Value Occur? A rocket ship is flying away from Earth at a constant velocity, and it...
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Transcribed Image Text:(a) Give an example of a continuous function whose derivative does not exist at x = 0.
(Hint: this would be relatively easy to do with a piecewise function, but you have to think of a function that uses a formula that Mobius recognises.
Check the Mobius Syntax Guide on MyUni for examples of the functions that are accepted by Mobius - the answer is in there.)
(b) Give an example of a function which is continuous at x = 2 but whose derivative does not exist at x = 2.
(c) Give an example of a function that is continuous at x = -2, x = 0 and x = 3 but whose derivative does not exist at any of those points.
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