MATH 221

Arun Ram
Department of Mathematics and Statistics
University of Melbourne
Parkville, VIC 3010 Australia
aram@unimelb.edu.au

Last updated: 14 August 2014

Lecture 20

Optimization

Critical points are where maxima and minima might occur.

Find the local maxima and minima of $f (x) = 2 x^{3} - 24 x + 107$ in the interval $[1, 3] .$

The critical points are

(a)	points where $\frac{d f}{d x}$ is $0,$ $\begin{matrix} \end{matrix}$
(b)	points where $f (x)$ is not continuous or not differentiable, $\begin{matrix} \end{matrix}$
(c)	points on the boundary of where $f (x)$ is defined $\begin{matrix} \end{matrix} or \begin{matrix} \end{matrix} or \begin{matrix} \end{matrix} or...$

For

f (x) = 2 x^{3} - 24 x + 107

in the interval

[1, 3],

x = 1

and

x = 3

are critical points of type (c), and

\frac{d f}{d x} = 6 x^{2} - 24

and

6 x^{2} - 24 = 0

when

x^{2} = \frac{24}{6} = 4 .

x = \pm 2

is when

\frac{d f}{d x}

0 .

x = 2

is a critical point in

[1, 3] .

Critical point $x = 1 :$ $\frac{d f}{d x} |_{x = 1} = 6 x^{2} - 24 |_{x = 1} = 6 - 24 < 0 .$ So $f (x)$ is decreasing at $x = 1 .$ So (from the picture) $x = 1$ is a maximum. $\begin{matrix} \end{matrix}$ Critical point $x = 3 :$ $\frac{d f}{d x} |_{x = 3} = 6 x^{2} - 24 |_{x = 3} = 6 \cdot 3^{2} - 24 = 30 > 0 .$ So $f (x)$ is increasing at $x = 3 .$ So (from the picture) $x = 3$ is a maximum. $\begin{matrix} \end{matrix}$ Critical point $x = 2 :$ $\frac{d f}{d x} |_{x = 2} = 0, \frac{d^{2} f}{d x^{2}} |_{x = 2} = 12 x |_{x = 2} = 24 > 0 .$ So $f (x)$ is flat and concave up at $x = 2 .$ So $x = 2$ is a minimum. $\begin{matrix} \end{matrix}$

An enemy jet is flying along the curve $y = x^{2} + 2 .$ A soldier is placed at the point $(3, 2) .$ At what point will the jet be at when the soldier and the jet will be the closest? $\begin{matrix} \end{matrix}$ If the jet is at the point $(p, q)$ the distance between them is $d = \sqrt{{(p - 3)}^{2} + {(q - 2)}^{2}} .$ The point $(p, q)$ is on the curve $y = x^{2} + 2$ so $q = p^{2} + 2 .$ So $d = \sqrt{{(p - 3)}^{2} + {(p^{2} + 2 - 2)}^{2}} .$ We want to minimize $d$ (as the jet moves, i.e. as $p$ changes). The distance $d$ will be minimum at the same time that $d^{2}$ will be minimum. So we can minimize $d^{2} .$ $d^{2} = {(p - 3)}^{2} + {(p^{2})}^{2} = {(p - 3)}^{2} + p^{4} .$ Find a critical point. When is $\frac{d d^{2}}{d p} = 2 (p - 3) + 4 p^{3} = 4 p^{3} + 2 p - 6 = (p - 1) (4 p^{2} + 4 p + 6)$ equals to $0 ??$ When $p = 1 .$ So $\frac{d d^{2}}{d p} |_{p = 1} = 0,$ so $p = 1$ is a critical point. From the picture ew can confirm that when the jet is at $(1, 3)$ (i.e. $p = 1,$ $q = 3)$ the distance to the soldier is minimum.

Maximize the volume of a cone with a given slant height. Show that the angle of inclination is ${tan}^{- 1} \sqrt{2} .$ $\begin{matrix} \begin{matrix} \end{matrix} & \begin{matrix} ℓ & = & slant height, \\ θ & = & angle of inclination, \\ \frac{r}{ℓ} & = & sin θ, \\ \frac{h}{ℓ} & = & cos θ . \end{matrix} \end{matrix}$ Volume of a cone is $V = \frac{1}{3} π r^{2} h = \frac{1}{3} π {(ℓ sin θ)}^{2} h = \frac{1}{3} π {(ℓ sin θ)}^{2} ℓ cos θ .$ $ℓ$ is fixed (given slant height). We want to maximize $V$ as $θ$ changes $\begin{matrix} \frac{d V}{d θ} & = & \frac{d \frac{1}{3} π ℓ^{3} {sin}^{2} θ cos θ}{d θ} \\ = & \frac{1}{3} π ℓ^{3} (2 sin θ {cos}^{2} θ - {sin}^{2} θ sin θ) \\ = & \frac{1}{3} π ℓ^{3} sin θ (2 {cos}^{2} θ - {sin}^{2} θ) . \end{matrix}$ A critical point is when $\frac{d V}{d θ}$ is zero or when $2 {cos}^{2} θ - {sin}^{2} θ = 0$ or $sin θ = 0 .$ So $2 = {tan}^{2} θ$ or $θ = 0 .$
So $\sqrt{2} = tan θ$ or $θ = 0 .$
So $θ = {tan}^{- 1} \sqrt{2}$ or $θ = 0 .$ When $θ = 0$ the cone looks like $\begin{matrix} \end{matrix}$ which clearly does not have maximum volume. So $θ = {tan}^{- 1} \sqrt{2}$ maximizes volume.

Notes and References

These are a typed copy of Lecture 20 from a series of handwritten lecture notes for the class MATH 221 given on October 25, 2000.

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