Determine where V(z)=z4(2z−8)3 is increasing and decreasing.

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Determine where V(z)=z4(2z−8)3 is increasing and decreasing.

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Thu Giang 4 years 2021-08-09T06:18:37+00:00 1 Answers 142 views 0

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  1. RuslanHeatt
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    2021-08-09T06:19:58+00:00
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    Answer and Explanation:

    A function is said to be increasing, if the derivative of function is f’(x) > 0 on each point. A function is said to be decreasing if f”(x) < 0.

    Let y = v (z) be differentiable on the interval (a, b). If two points z1 and z2 belongs to the interval (a, b) such that z1 < z2, then v (z1) ≤ v (z2), the function is increasing in this interval.

    Similarly, the function y = v(z) is said to be decreasing, when it is differentiable on the interval (a , b).

    Two points z1 and z2 Є (a, b) such that z1 > z2, then v (z1) ≥ v(z2). The function is decreasing on this interval.

    The function y = v (z)

    The derivative of function Y’ = v’(z) is positive, then the function is increasing.

    The function y = v (z)  

    The derivative of function y’ is negative, then the function is decreasing.

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