022 Exam 2 Sample A, Problem 8

Use differentials to approximate the change in profit given ${\displaystyle x=10}$  units and ${\displaystyle dx=0.2}$  units, where profit is given by ${\displaystyle P(x)=-4x^{2}+90x-128}$.

Foundations:
A differential is a method of linearly approximating the change of a function. We use the derivative of the function at an initial point ${\displaystyle x_{0}}$ as the slope of a line, and use the standard relation
${\displaystyle m\,=\,{\frac {\Delta y}{\Delta x}},}$
where ${\displaystyle \Delta y}$ represents the change in ${\displaystyle y}$ values, and ${\displaystyle \Delta x}$ represents the change in ${\displaystyle x}$ values. Due to the use of the derivative ${\displaystyle f'\left(x_{0}\right)}$ as the slope, we usually rewrite this using ${\displaystyle dy}$ and ${\displaystyle dx}$ to indicate the relative changes. Thus,
${\displaystyle f'(x_{0})\,=\,m\,=\,{\frac {dy}{dx}}.}$
We can then rearrange this to find ${\displaystyle dy=f'(x_{0})\cdot dx.}$

 Solution:

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