Week 2 - Functions.pptx PDF

Summary

This is a presentation about functions, including definitions, relations, characteristics of functions, evaluation of functions, mapping diagrams, ordered pairs, graphs, and real-life examples. It is for an undergraduate-level mathematics course at UST Angelicum College.

Full Transcript

GENERAL
MATHEMATIC
S
Ms. Rose Ann P. Ramos, LPT
Learning Facilitator
Opening Prayer

Almighty Father, we praise
and thank you for the
opportunity to learn today
from our facilitator and
from one another. Help us
to focus our hearts and
minds on what we are
about to learn in this
Inspire us by your Holy Spirit
so that we may understand
the lessons, and see its
practical application in our
everyday activities.

Guide us by your eternal light
as we discover more truths
about the world around us.
We ask this through the
GOOD
MORNING,
EVERYONE!
Find
my
Rectangle

Parallelogra
m
Square

Kite

Trapezoi
d
Rhombu
𝟐
Composite
number
𝟒
Even
number
𝟏𝟏
Odd
number
𝟏𝟓
Prime number
𝟐𝟏
 𝟐 Even
Trapezoi Prime number
number
d
𝟒 Even
Rhombu Composite
number
s number
Odd
𝟏𝟏 Prime number
number
Kite
Odd
𝟏𝟓 Composite
number
number
Parallelogra Odd
m 𝟐𝟏 Composite
number
Function
s and
Relations
Learning Outcomes:

At the end of the week, the students should be able to:
a.define function;
b.differentiate function from relation;
c.explain the different characteristics of function;
d.evaluate a function;
e.determine if the given is function or not by applying the
different methods;
f. graph a function using graphing paper and Geogebra; and
A relation is a set of ordered pairs. The
domain of a relation is the set of first
coordinates, while range is the set of
second coordinates.

Domai Rang Domai Rang
 𝟐 Even
Trapezoi Prime number
number
d
𝟒 Even
Rhombu Composite
number
s number
Odd
𝟏𝟏 Prime number
number
Kite
Odd
𝟏𝟓 Composite
number
number
Parallelogra Odd
m 𝟐𝟏 Composite
number
 A function is a relation in which each
elements of the domain corresponds to
exactly one element of the range.

Domai Rang
n e
 A relation A relation
which is not a which is a
function. function.
A relation A relation
which is a which is not a
 All functions are
relations, but not
all relations are
Characteristics of a
function:
X Y
1. Each element of X 1 A
must be assigned to an
2 B
element of Y.

Y
2. Some elements of Y X
A
may not be an image of 1
B
an element of X. 2
C
 X Y
3. Two or more elements 1 A
of X may be assigned to 2 B
the same element of Y. 3 C

X Y
4. An element of X 1 A
cannot be assigned to
2 B
two or more different
3 C
elements of Y.
Representation of a
function:
A function can be
represented by:

Mapping Diagram
Set of Ordered Pairs
{(2,1) ,(7 ,4) ,(−3,1),(9,−4)}
Table
Graph
 Vertical Line Test:

A set of points in a
coordinate plane is
the graph of y as a
function of x if and
only if no vertical
line intersects the
graph at more than
one point.
 Go to
kahoot.
Evaluating a
function:

𝒇 ( 𝒙 ) =𝟑 𝒙 𝒊𝒇 𝒙 =𝟒 ; 𝒙 =− 𝟔

𝒊𝒇 𝒙=𝟒 : 𝒊𝒇 𝒙=−𝟔 :
𝒇 ( 𝒙 ) =𝟑 𝒙 𝒇 ( 𝒙 ) =𝟑 𝒙
𝒇 ( 𝟒 ) =𝟑(𝟒) 𝒇 ( − 𝟔 ) =𝟑(− 𝟔)
𝒇 ( 𝟒 ) =𝟏𝟐 𝒇 ( − 𝟔 ) =− 𝟏𝟖
 𝟐
𝒇 ( 𝒃 ) =𝒃 − 𝟕 𝒃 𝒊𝒇 𝒃=− 𝟓 ; 𝒃=𝟑 𝒃

𝒊𝒇 𝒃=−𝟓 : 𝒊𝒇 𝒃=𝟑 𝒃:
𝟐
𝟐
𝒇 ( 𝒃 ) =𝒃 − 𝟕 𝒃 𝒇 ( 𝒃 ) =𝒃 − 𝟕 𝒃
𝟐
𝟐
𝒇 ( −𝟓 )=(−𝟓) −𝟕 (−𝟓) 𝒇 ( 𝟑 𝒃 ) =(𝟑 𝒃) −𝟕(𝟑 𝒃)
𝒇 ( − 𝟓 )=𝟐𝟓+𝟑𝟓 𝟐
𝒇 ( 𝟑 𝒃 ) =𝟗 𝒃 −𝟐𝟏 𝒃
𝒇 ( − 𝟓 )=𝟔𝟎
 TRY
THIS!
𝑓 ( 𝑥 ) =12 𝑥+ 3
a.) x = 4 b.) x = -9 c.) x
=0
2
𝑓 ( 𝑥 ) =3 𝑥 − 15
a.) x = 3 b.) x = -1
c.) x = 4
𝑓 ( 𝑥 ) =12 𝑥+ 3
𝒇 ( 𝟒 ) =𝟓𝟏 𝒇 ( − 𝟗 )=− 𝟏𝟎𝟓 𝒇 ( 𝟎 ) =𝟑

2
𝑓 ( 𝑥 ) =3 𝑥 − 15
𝒇 ( 𝟑 )=𝟏𝟐 𝒇 ( − 𝟏 )=− 𝟏𝟐 𝒇 ( 𝟒 ) =𝟑𝟑
Functions in Real
Life:
Mikha is a cashier in a small grocery having a daily salary
of What is her salary for the month if she worked for 22
days?
𝒊𝒏𝒑𝒖𝒕 :𝒍𝒆𝒕 𝒙 𝒃𝒆𝒕𝒉𝒆 𝒏𝒐. 𝒐𝒇 𝒅𝒂𝒚𝒔

𝒇 ( 𝒙 ) =𝟓𝟖𝟓 ( 𝒙 )

𝒇 ( 𝟐𝟐 ) =𝟓𝟖𝟓( 𝟐𝟐)

𝒇 ( 𝟐𝟐 ) =𝟏𝟐 , 𝟖𝟕𝟎
Functions in Real
Life:
Aiah walks at the speed of 7km/hr. Find the distance
covered if she walks for 3 hours.

𝒊𝒏𝒑𝒖𝒕 :𝒍𝒆𝒕 𝒙 𝒃𝒆𝒕𝒉𝒆 𝒏𝒐. 𝒐𝒇 𝒉𝒐𝒖𝒓𝒔

𝒇 ( 𝒙 ) =𝟕( 𝒙 )

𝒇 ( 𝟑 )= 𝟕(𝟑)

𝒇 ( 𝟑 )= 𝟐𝟏
Functions in Real
Life:
A ball is dropped from a 75m building. The height (in m.)
after t seconds is Find its height from the ground after 5
seconds.
𝒊𝒏𝒑𝒖𝒕 :𝒍𝒆𝒕 𝒕 𝒃𝒆𝒕𝒉𝒆 𝒏𝒐. 𝒐𝒇 𝒔𝒆𝒄𝒐𝒏𝒅𝒔
𝟐
𝒉 ( 𝒕 ) =𝟓.𝟖 𝒕 +𝟕𝟐
𝟐
𝒉 ( 𝟓 ) =𝟓. 𝟖( 𝟓) +𝟕𝟐

𝒉 ( 𝟓 ) =𝟐𝟏𝟕
 TRY
THIS!
1. The function A described by gives the area of an
equilateral triangle with side s.
a. Find the area when a side measures 8 cm.
b. Find the area when a side measures 16 cm.

2. The function C described by gives the Celsius
temperature corresponding to the Fahrenheit
temperature F.
a. Find the C temperature equivalent to
b. Find the C temperature equivalent to.
Answer the
given items
on a paper
and send it
thru G-chat.
Operatio
ns on
Function
Sum:

Difference:

Product:

Quotient:
Sum of

Let f and g be two functions with
overlapping domains. Then for all x
common to both domains, the sum of f
and g is defined as:
 Given and , find.

( 𝑓 + 𝑔 ) ( 𝑥 )=( 3 𝑥 − 3 ) +(10 𝑥 +4)

( 𝒇 + 𝒈 ) ( 𝒙 )= 𝟏𝟑 𝒙 +𝟏
Given and
Find.

( 𝑓 + 𝑔 ) ( 𝑥 )=( 8 𝑥 +2 𝑥 − 5 ) +( 𝑥 +2)
2 2

( 𝒇 + 𝒈 ) ( 𝒙 )= ¿
Given and
Find then evaluate the sum when.

( 𝑓 + 𝑔 ) ( 𝑥 )=( 4 𝑥 − 2 𝑥+1 ) +(7 𝑥 − 3)
2 3

( 𝒇 + 𝒈 ) ( 𝒙 )= ¿

Evaluate: when
3 2
( 𝑓 + 𝑔 ) ( 5 ) =7 𝑥 + 4 𝑥 − 2 𝑥 − 2
3 2
( 𝑓 + 𝑔 ) ( 5 ) =7(5) + 4(5) − 2(5) − 2
( 𝒇 + 𝒈 ) ( 𝟓 ) =𝟗𝟔𝟑
Difference of

Let f and g be two functions with
overlapping domains. Then for all x
common to both domains, the difference
of f and g is defined as:
 Given and , find.

2
( 𝑓 − 𝑔 ) ( 𝑥 ) =( 𝑥 − 1 ) − (6 𝑥 +2 𝑥+ 4)

𝟐
( 𝒇 − 𝒈 ) ( 𝒙 ) =− 𝟔 𝒙 − 𝒙 − 𝟓
 Given and
Find.

( 𝑓 − 𝑔 ) ( 𝑥 ) =( 15 𝑥 − 2 𝑥 − 10 ) −( 𝑥 +8)
2

( 𝒇 − 𝒈 ) ( 𝒙 ) =¿
 Given and
Find then evaluate the difference when.

2
( 𝑓 − 𝑔 ) ( 𝑥 ) =( 3 𝑥+7 ) − ( 𝑥 − 2 𝑥+9)
( 𝒇 + 𝒈 ) ( 𝒙 )= ¿
Evaluate: when
2
( 𝑓 − 𝑔 ) ( 4 ) =− 𝑥 + 5 𝑥 − 2
2
( 𝑓 − 𝑔 ) ( 4 ) =−( 4) +5( 4)− 2
( 𝒇 − 𝒈 ) ( 𝟒 ) =𝟐
Product of

Let f and g be two functions with
overlapping domains. Then for all x
common to both domains, the product of
f and g is defined as:
 Given and , find.

( 𝑓𝑔 ) ( 𝑥 )= ( 3 𝑥 − 4 ) (𝑥 +8)
2
( 𝑓𝑔 )( 𝑥 )=3 𝑥 +24 𝑥 − 4 𝑥 − 32
𝟐
( 𝒇𝒈 ) ( 𝒙 ) =𝟑 𝒙 +𝟐𝟎 𝒙 − 𝟑𝟐
Given and , find.

( 𝑓𝑔 ) ( 𝑥 )= ( 5 𝑥 + 𝑥 +3 ) (2 𝑥+1)
2

( 𝑓𝑔 ) ( 𝑥 ) = ¿

( 𝒇𝒈 ) ( 𝒙 ) =¿
 Given and
Find then evaluate the product when.
2
( 𝑓𝑔 ) ( 𝑥 )= ( 6 𝑥 − 5 ) ( 4 𝑥 +2 𝑥+9)
( 𝑓𝑔 ) ( 𝑥 ) = ¿
( 𝒇𝒈 ) ( 𝒙 ) =¿
Evaluate: when
3 2
( 𝑓𝑔 )( − 2 )=24 𝑥 − 8 𝑥 +44 𝑥 − 45
3 2
( 𝑓𝑔 )( − 2 )=24 (− 2) − 8 ( − 2 ) + 44( − 2) − 45
( 𝒇𝒈 ) ( − 𝟐 )=− 𝟑𝟓𝟕
Quotient of

Let f and g be two functions with
overlapping domains. Then for all x
common to both domains, the quotient of
f and g is defined as:
 Given and
Find.

( 𝑥 +2 ) ( 𝑥 − 4)
( 𝑓 / 𝑔) ( 𝑥 ) =
( 𝑥 − 5) ( 𝑥 − 4 )

𝒙+𝟐
( 𝒇 / 𝒈 ) ( 𝒙 )=
𝒙 −𝟓
 Given and
Find.

2
𝑥 +5 𝑥 − 24 ( 𝑥 − 3)
( 𝑓 / 𝑔) ( 𝑥 ) = 2 ( 𝑓 / 𝑔) ( 𝑥 ) =
𝑥 +6 𝑥 − 16 ( 𝑥 − 2)

𝒙 −𝟑
( 𝒇 / 𝒈 ) ( 𝒙 )=
𝒙 −𝟐
ACTIVITY #1: (20 pts.)

Create your own example for each
operations on functions.
Solve the examples that you created.
Do this activity on a yellow paper.