Section 2'1: Properties of Functions presentation

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Title: Section 2'1: Properties of Functions

1
Section 2.1 Properties of Functions

Homework 1-65 (pages 59-62)

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Questions?

Let us use a few minutes to answer any urgent
questions you may have about last nights
homework

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Function Notation

A function is a rule f that assigns to every
input x one and only one output y.
For an input x, the output is usually denoted y
f(x), where f is the name given to the function.
Do not read the equation above as f times x
but, rather, as f of x.

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Examples (using people instead of numbers)

If one refers to xs brother as b(x), that would
not be a function.

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Examples (using people instead of numbers)

If one refers to xs brother as b(x), that would
not be a function.
When you talk about Davids brother, are you
talking about Daniel or Michael?

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Examples (using people instead of numbers)

If one refers to xs brother as b(x), that would
not be a function.
When you talk about Davids brother, are you
talking about Daniel or Michael?
Also, what if someone does not have a brother at
all?

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Examples (using people instead of numbers)

If one refers to xs father as f(x), that would
be a function.

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Examples (using people instead of numbers)

If one refers to xs father as f(x), that would
be a function.
Everybody has one and only one father.

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Examples with numbers

f(x) 3

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Examples with numbers

f(x) 3 is a function.

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Examples with numbers

f(x) 3 is a function.
g(x) 3x

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Examples with numbers

f(x) 3 is a function.
g(x) 3x is a function.

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Examples with numbers

f(x) 3 is a function.
g(x) 3x is a function.
y f(x) 2x 4

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Examples with numbers

f(x) 3 is a function.
g(x) 3x is a function.
y f(x) 2x 4 is a function.
We call them

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Examples with numbers

f(x) 3 is a function (a constant function)
g(x) 3x is a function
y f(x) 2x 4 is a function

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Examples with numbers

f(x) 3 is a function (a constant function)
g(x) 3x is a function (a linear function)
y f(x) 2x 4 is a function

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Examples with numbers

f(x) 3 is a function (a constant function)
g(x) 3x is a function (a linear function)
y f(x) 2x 4 is a function (a linear
function)

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Linear Functions

f(x) 3 is a function (a constant function)
g(x) 3x is a function (a linear function)
y f(x) 2x 4 is a function (a linear
function)
The terminology makes sense since the
relationship between x and y is given by a linear
equation y mx b.

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Domain and Range

The set of possible inputs is the domain.
The set of possible outputs is the range.

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Revisiting the brother function

If one refers to xs brother as b(x), that would
not be a function.
What if someone does not have a brother at all?
We could define the function b(x) so that the
domain consists of only people who have brothers.

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Revisiting the brother function

What if someone has more than one brother?
Well, define, for example, b(x) to be xs oldest
brother

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Going back to numerical examples

Let f(x) x2.
This is a function. Its domain is all real
numbers and its range is 0, infinity)
f(2)
f(-1)
f(10)

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Going back to numerical examples

Let f(x) x2.
This is a function. Its domain is all real
numbers and its range is 0, infinity)
f(2) 4
f(-1)
f(10)

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Going back to numerical examples

Let f(x) x2.
This is a function. Its domain is all real
numbers and its range is 0, infinity)
f(2) 4
f(-1) 1
f(10)

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Going back to numerical examples

Let f(x) x2.
This is a function. Its domain is all real
numbers and its range is 0, infinity)
f(2) 4
f(-1) 1
f(10) 100

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A numerical rule defined with words

g(x) the number which, when squared, yields x
back.

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A numerical rule defined with words

g(x) the number which, when squared, yields x
back.
Is this a function?

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A numerical rule defined with words

g(x) the number which, when squared, yields x
back.
Is this a function?
Does every input have an output? (In other words,
what should be the domain of g?)

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A numerical rule defined with words

g(x) the number which, when squared, yields x
back.
Is this a function?
Does every input have an output? (In other words,
what should be the domain of g?)
g(x) could be a function with domain
0,infinity). The output of -4,for example,
could not be defined.

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A numerical rule defined with words

For any non-negative number x, let g(x) the
number which, when squared, yields x back.
Is this a function?

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A numerical rule defined with words

For any non-negative number x, let g(x) the
number which, when squared, yields x back.
Is this a function?
Does every input have only one input?

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A numerical rule defined with words

For any non-negative number x, let g(x) the
number which, when squared, yields x back.
Is this a function?
Does every input have only one input?
As defined, g(4) could be either 2 or -2.

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A numerical function defined with words

For any non-negative number x, let g(x) the
non-negative number y which, when squared, yields
x back. (i.e. y2 x).

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A numerical function defined with words

For any non-negative number x, let g(x) the
non-negative number y which, when squared, yields
x back. (i.e. y2 x).
Now we recognize this function as g(x) the
square root of x.

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In this class

I will pay much more attention to the Domain of
Functions than to their Ranges.
Calculating ranges is a little more complicated
an, in general, does not seem to be worth the
extra work.

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Also

Calculating domains will usually boil down to
answering the question What values of x can we
not plug in?

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Calculating Domains

Calculating domains will usually boil down to
answering the question What values of x can we
not plug in?
There will only be two problems we face in this
class when it comes to domains of functions
zeroes in the denominator and negative numbers
under (even) radicals.

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Examples

The domain of f(x) 1/(x-5) consists of all
numbers but x 5.
The domain of g(x) / 2x 1 (the square root of
2x 1) consists of all numbers bigger than equal
to -1/2.

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