The following table gives values of the differentiable function y = f(x). x012 3 45 6 7 89 10 y31-2-4-32-1-314 5 Estimate the z-values of critical points of f(z) on the interval 0 < z < 10. Classify each critical point as a local maximum, local minimum, or neither. (Enter your critical points as comma-separated xvalue,çlassification pairs. For example, if you found the critical points z = -2 and z = 3, and that the first was a local minimum and the second neither a minimum nor a maximum, you should enter (-2,min), (3,neither). Enter none if there are no critical points.) critical points and classifications:|| Now assume that the table gives values of the continuous function y = f'(x) (instead of f(x)). Estimate and classify critical points of the function f(x). critical points and classifications:

The following table gives values of the differentiable function y = f(x). x012 3 45 6 7 89 10 y31-2-4-32-1-314 5 Estimate the z-values of critical points of f(z) on the interval 0 < z < 10. Classify each critical point as a local maximum, local minimum, or neither. (Enter your critical points as comma-separated xvalue,çlassification pairs. For example, if you found the critical points z = -2 and z = 3, and that the first was a local minimum and the second neither a minimum nor a maximum, you should enter (-2,min), (3,neither). Enter none if there are no critical points.) critical points and classifications:|| Now assume that the table gives values of the continuous function y = f'(x) (instead of f(x)). Estimate and classify critical points of the function f(x). critical points and classifications:

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Description: Please help with the 2nd part. 3. The following table gives values of the differentiable function y = f(x).x01 2 3 456 7 8910-2-4-32-1-314 5Estimate the x-values of critical points of f(x) on the interval 0

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Please help with the 2nd part.

3.
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The following table gives values of the differentiable function y = f(x).
x01 2 3 456 7 8910
-2-4-32-1-314 5
Estimate the x-values of critical points of f(x) on the interval 0 <x < 10. OClassify each critical point as a local maximum, local minimum, or neither.
(Enter your critical points as comma-separated xvalue,classification pairs. For example, if you found the critical points x = -2 and æ = 3, and that the first was a local minimum and the second neither a
minimum nor a maximum, you should enter (-2,min), (3,neither). Enter none if there are no critical points.)
critical points and classifications:||
Now assume that the table gives values of the continuous function y = f'(x) (instead of f(x)). Estimate and classify critical points of the function f(x).
critical points and classifications:

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