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Grant Langseth · Answer 1 · 2023-10-24T20:10:57+0000

Solution:

The average rate of change is given by;

$(\Delta h)/(\Delta x)=(h_2-h_1)/(x_2-x_1)_{}$

Given:

$\begin{gathered} h_2=h(1) \\ h_1=h(-2) \\ x_2=1 \\ x_1=-2 \end{gathered}$
$\begin{gathered} h(1)\text{ means susbstituting when x =1 into h(x);} \\ h(x)=3x^3-3x^2-2 \\ h(1)=3(1^3)-3(1^2)-2 \\ h(1)=3(1)-3(1)-2 \\ h(1)=3-3-2 \\ h(1)=-2 \end{gathered}$

$\begin{gathered} h(-2)\text{ means susbstituting when x =-2 into h(x);} \\ h(x)=3x^3-3x^2-2 \\ h(-2)=3(-2^3)-3(-2^2)-2 \\ h(-2)=3(-8)-3(4)-2 \\ h(-2)=-24-12-2 \\ h(-2)=-38 \end{gathered}$

$\begin{gathered} (\Delta h)/(\Delta x)=(h_2-h_1)/(x_2-x_1)_{} \\ (\Delta h)/(\Delta x)=(h_2-h_1)/(x_2-x_1)_{}=(h(1)-h(-2))/(x_2-x_1) \\ (\Delta h)/(\Delta x)=\frac{-2-(-38)_{}}{1-(-2)} \\ (\Delta h)/(\Delta x)=(-2+38)/(1+2) \\ (\Delta h)/(\Delta x)=(36)/(3) \\ (\Delta h)/(\Delta x)=12 \end{gathered}$

Therefore, the average rate of change of h(x) from x = -2 to x = 1 is 12.

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