-3-x2f'(x) = for x <0. Find the x c value(s) for f (x) on the interval [-3, –1] guaranteed by theMean Value Theorem given that f(-1) = -2 and f(-3)%3Dx2= 2. Show your work.If there is only one value, search for it. If there is more than one value, search for the sum of the values.

We have to use mean value theorem.

Answered: -3-x2 f'(x) = for x <0. Find the x c…

-3-x2 f'(x) = for x <0. Find the x c value(s) for f(x) on the interval [-3,-1] guaranteed by the Mean Value Theorem given that f(-1) = -2 and f(-3) = 2. Show x2 your work.

Algebra: Structure And Method, Book 1

(REV)00th Edition

ISBN:9780395977224

Author:Richard G. Brown, Mary P. Dolciani, Robert H. Sorgenfrey, William L. Cole

Publisher:Richard G. Brown, Mary P. Dolciani, Robert H. Sorgenfrey, William L. Cole

Chapter8: Introduction To Functions

Section8.8: Linear And Quadratic Functions

Problem 4ST

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Concept explainers

Rate of Change

The relation between two quantities which displays how much greater one quantity is than another is called ratio.

Slope

The change in the vertical distances is known as the rise and the change in the horizontal distances is known as the run. So, the rise divided by run is nothing but a slope value. It is calculated with simple algebraic equations as:

Question

-3-x2
f'(x) = for x <0. Find the x c value(s) for f (x) on the interval [-3, –1] guaranteed by the
Mean Value Theorem given that f(-1) = -2 and f(-3)
%3D
x2
= 2. Show your work.
If there is only one value, search for it. If there is more than one value, search for the sum of the values.

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