Why does the maximum and minimum pointsfor y = f(x) occur among the minimum andmaximum points for y = ƒ² (x)?Since f(x) is non-negative smooth functionSince if the first derivative of the square function is zero then f'(x)=0.Since f(x) is non-positive smooth functionSince f(x) is non-smooth function and hence differentiable at critical points

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Answered: Why does the maximum and minimum points…

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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Let f(x) be a function with second derivative of f"(x) = -(5x+11)²(x – 2) Determine the local maximums and minimums of f(x) if its critical points are x = -4 and x=7.
A calculator is allowed on this question. The functions f and g are differentiable functions of x. It is known that the derivative of f is given by f'(x) = x · ln x. It is also known that g(2) = 3 and g′(2) = −1. A curve in the xy-plane is defined as f(x) − (g(x))² = 4xy. Find the slope of this curve at the point (2, 3). Elimination Tool Select one answer A -1.077 B -0.577 C D -0.538 0.923
Suppose a differentiable function f (x) has first and second derivatives that are positive or negative as indicated. (-00, -2) (-2,2) (2,6) (6, 00) f'(x) f"(x) + a. Where must f have a local maximum? Justify your response using the appropriate theoretical result. b. Where does f have an inflection point? Justify your response using the appropriate theoretical result.
There is strong evidence that the first level of processing what we see is done in the retina. It involves detecting something called edges or positions of transitions from dark to bright or bright to dark points in images. These points usually coincide with boundaries of objects. To model the edges, derivatives of functions such as f(x) = 1 e-ax, x ≥ 0 eax 1, x ≤0 need to be found. Use the central divided difference approximation of the first derivative of f(x) to calculate the functions derivative at x = 0.5 for a = 0.24. Use a step size of Ax = 0.125. Express your answer up to five (5) decimal places. Present your solution in your answer sheets.
I need the next 3 parts pls!
Suppose the derivative of a function f is Then f(x) is decreasing on the following interval: 0 (-∞0, 2) (-1,2) (2,4) O, O (2,00) ƒ'(x) = (x − 4) (x + 1)²(x − 2) ³. ܙܝ
Please show step by step and show your work
Please help it's not graded.
2) If f'(x)=(x-1)²(x-2), where does the graph of f(x) have relative extrema? Justify.

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