H(x) = 1/8^3 -x^2 What is the average rate of change of h over the interval -2 ≤ x ≤ 2?

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asked Mar 20, 2023 228k views

17 votes

H(x) = 1/8^3 -x^2 What is the average rate of change of h over the interval -2 ≤ x ≤ 2?

Mathematics
college

DenLanden asked

by DenLanden

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8 votes

Answer: 0

Explanation:

I will assume you meant
h(x)=(1)/(8^(3))-x^2 , which is equal to
h(x)=(1)/(512)-x^2 .

$f(-2)=(1)/(512)-(-2)^(2)=-(2047)/(512)\\\\f(2)=(1)/(512)-2^(2)=-(2047)/(512)\\\\\therefore (f(2)-f(-2))/(2-(-2))=(-(2047)/(512)-\left(-(2047)/(512) \right))/(2-(-2))=\boxed{0}$

H(x) = 1/8^3 -x^2 What is the average rate of change of h over the interval -2 ≤ x-example-1

Justin Abrahms answered Mar 24, 2023

by Justin Abrahms

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