MATH 221 Lecture 15

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

Last update: 6 August 2012

Lecture 15

A function $f (x)$ is continuous at $x = a$ if it doesn't jump at $x = a$ ,

$i.e. if lim_{x \to a} f (x) = f (a)$

Not continuous at $x = a$ .

Think about

${\frac{d f}{d x}|}_{x = a} = lim_{Δ x \to 0} \frac{f (a + Δ x) - f (a)}{Δ x}$

in terms of the graph

$lim_{Δ x \to 0} \frac{f (a + Δ x) - f (a)}{Δ x} = slope of f at the point x = a .$

A function $f (x)$ differentiable at $x = a$ if the derivative ${\frac{d f}{d x}|}_{x = a}$ exists,
$i.e. if the slope of the graph of f (x) at x = a exists.$

Example: $Graph f (x) = | x | = \{\begin{matrix} x, & if x \geq 0, \\ - x, & if x \leq 0, \end{matrix}$

Then

${\frac{d f}{d x} |}_{x = a} = {\begin{matrix} 1, & if a > 0, \\ - 1, & if a < 0, \\ does not exist, & if a = 0, \end{matrix}$

So $f$ is not differentiable at $x = 0$ .

Example: $Graph y = x^{\frac{1}{3}}$

Notes:
(a)	$y = x^{\frac{1}{3}} is the same as y^{3} = x .$ is a basic circle of radius 1

$\frac{d y}{d x} = \frac{1}{3} x^{- \frac{2}{3}} = \frac{1}{3 x^{\frac{2}{3}}}$

$So {\frac{d y}{d x} |}_{x = 0} = \infty . So f (x) is not differentiable at x = 0$ .

A function $f (x)$ is increasing at $x = a$ if it is going up at $x = a,$
$i.e. if f (a + Δ x) > f (x) for all small Δ x > 0,$
$i.e. if the slope of f (x) at x = a is positive,$
$i.e. if {\frac{d f}{d x} |}_{x = a} > 0$ .

A function $f (x)$ is decreasing at $x = a$ if it is going down at $x = a,$
$i.e. if f (a + Δ x) < f (x) for all small Δ x > 0,$
$i.e. if the slope of f (x) at x = a is negative,$
$i.e. if {\frac{d f}{d x} |}_{x = a} < 0$ .

$f$ is concave up at $x = a$ if it is right side up bowl shaped $x = a,$
$i.e. if the slope of f is getting larger at x = a,$
$i.e. if \frac{d f}{d x} is increasing at x = a,$
$i.e. if {\frac{d^{2} f}{d x^{2}} |}_{x = a} > 0$ .

$f$ is concave down at $x = a$ if it is upside down bowl shaped $x = a,$
$i.e. if the slope of f is getting smaller at x = a,$
$i.e. if \frac{d f}{d x} is decreasing at x = a,$
$i.e. if {\frac{d^{2} f}{d x^{2}} |}_{x = a} < 0$ .

A point of inflection is a point where $f$ changes from concave up to concave down, or from concave down to concave up.

A local maximum is a point $x = a$ where $f (a)$ is bigger then the $f (x)$ around it.

A local minimum is a point $x = a$ where $f (a)$ is smaller then the $f (x)$ around it.
$i.e. f (a) < f (a + Δ x) for small Δ x$ .

A critical point is a point where a maximum or minimum might occur.

Note:
(1)	If $f (x)$ is continuous and differentiable and $x = a$ is a maximum then ${\frac{d f}{d x} \|}_{x = a} = 0 and {\frac{d^{2} f}{d x^{2}} \|}_{x = a} < 0$
(2)	If $f (x)$ is continuous at $x = a,$ $f (x)$ is differentiable at $x = a,$ ${\frac{d f}{d x} \|}_{x = a} = 0 and {\frac{d^{2} f}{d x^{2}} \|}_{x = a} > 0 then$ $x = a$ is a minimum.

Where can a maximum or minimum occur?
(a)	A point $x = a$ where $f (x)$ is differentiable and ${\frac{d f}{d x} \|}_{x = a} = 0$ .
(b)	A point $x = a$ where $f (x)$ is not continuous. $x = 1$ is a maximum
(c)	A point $x = a$ on the boundary of where $f (x)$ is defined. $x = 0$ is a minimum

Notes and References

These are a typed copy of lecture notes given by Arun Ram on October 11, 2000.

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