, 1. Functions
1. 1 Functions domain and
,
range
i.
Definition function : A function f is a
correspondence between
two sets D I called the domain ) and < ( called the codomainl ,
that each element 17 and element of
assigns to of one
only
um
one
C
Notation : f :D HE
2.
Definition range
: the set of all
images is called the
range of f-
Notation : Rauf =
If :
XE Domf }
Domain &
Range
3. :
• For X E D , f- IX1E C
FIX)
× :
argument of f : the value of f- at X
( or the
image of × under ft
. Notation i.
such that statement
,
f- : DHL :
X t> f- 1×1
f is a
function from 17 to C that associate × in 17 to fix, in C
4.
Examples :
f IR IR HX2 f- takes IR to IR by f- 1×1=5
i
×
given
: :
,
Domf =
IR TX E IR
tail
Rauf =
[a ,
oo
)
2
f- 1×1 =
12×+4 ,
XE [a. 6 ]
Domf =
[ 0,6J
f- lol = 2 , f- 161 =
4
i.
Rauf =
[ 2,4J
,Default : . Take ← domain to be IR
.
Take domain to be the maximum set of real number ×
mum
st f- IX1 is a real number
Questions :
I
f- 1×1=12×+4
Domf = [ -2,0 ]
Rauf = [ a ,
oo ]
2
f- 1×1 = Itx
Damf = IR1 { I } = I -0,11 v It ,
oo )
"
IR takes out 1
Rauf = IR1 to } =
f- a ,o}v So , so }
Common
5. Notation :
YIX)
X -
independent variable
y
-
dependent variable
'
'
E.
g i FIX) =
X ,
y= ×
i.
f- 1×1 =y
'
So ,
the function f- IX1 is
defined by the
equation y=X
'
2
f- IX1 =
X ,
y =
×
When Xao has No real solutions
y
•
,
-
when × so ,
y
=
FX .
-
FX , two solutions
'
so ,
y
=
X does not define a ( non -
trivial ) function fty
works for a
1- 2 The
graph of a
function
I.
Definition graph :
The
graph of a
function f is the
set of all points IX1Y ) in the
xy
-
plane with X C-
Domf
1×1
and y=f
{ full }
'
graph f- = IX.
y ) EIR
:
XE Domf , y -_
, closed circle : included point
-
2 .
\ excluded
open
circle :
point .
3 Not function
.
every
curve is the
graph of a
The vertical line test :
If any
vertical line intersects the curve more than once then
m u m
not it
the curve is the
graph
mmmm
of a
function , otherwise is
proof :
following the
defining property of a
function ,
only one
element in the is associated with element in the
range
an
domain
Eg
is the
graph of function
-
a
NOT
is the
graph of function
-
a
However . For y 70 ,
the curve is the
graph of the function
Y :[ I , 3] H [o.O ]
domain
range
y= I4-1HT
1. 3 Evan and Odd Functions
I.
Definition Even
function : A function f is even if
f- 1×1 =
f- 1-X ) VIX t Domf
A function
Definition Odd function :
f- is odd if
1. 1 Functions domain and
,
range
i.
Definition function : A function f is a
correspondence between
two sets D I called the domain ) and < ( called the codomainl ,
that each element 17 and element of
assigns to of one
only
um
one
C
Notation : f :D HE
2.
Definition range
: the set of all
images is called the
range of f-
Notation : Rauf =
If :
XE Domf }
Domain &
Range
3. :
• For X E D , f- IX1E C
FIX)
× :
argument of f : the value of f- at X
( or the
image of × under ft
. Notation i.
such that statement
,
f- : DHL :
X t> f- 1×1
f is a
function from 17 to C that associate × in 17 to fix, in C
4.
Examples :
f IR IR HX2 f- takes IR to IR by f- 1×1=5
i
×
given
: :
,
Domf =
IR TX E IR
tail
Rauf =
[a ,
oo
)
2
f- 1×1 =
12×+4 ,
XE [a. 6 ]
Domf =
[ 0,6J
f- lol = 2 , f- 161 =
4
i.
Rauf =
[ 2,4J
,Default : . Take ← domain to be IR
.
Take domain to be the maximum set of real number ×
mum
st f- IX1 is a real number
Questions :
I
f- 1×1=12×+4
Domf = [ -2,0 ]
Rauf = [ a ,
oo ]
2
f- 1×1 = Itx
Damf = IR1 { I } = I -0,11 v It ,
oo )
"
IR takes out 1
Rauf = IR1 to } =
f- a ,o}v So , so }
Common
5. Notation :
YIX)
X -
independent variable
y
-
dependent variable
'
'
E.
g i FIX) =
X ,
y= ×
i.
f- 1×1 =y
'
So ,
the function f- IX1 is
defined by the
equation y=X
'
2
f- IX1 =
X ,
y =
×
When Xao has No real solutions
y
•
,
-
when × so ,
y
=
FX .
-
FX , two solutions
'
so ,
y
=
X does not define a ( non -
trivial ) function fty
works for a
1- 2 The
graph of a
function
I.
Definition graph :
The
graph of a
function f is the
set of all points IX1Y ) in the
xy
-
plane with X C-
Domf
1×1
and y=f
{ full }
'
graph f- = IX.
y ) EIR
:
XE Domf , y -_
, closed circle : included point
-
2 .
\ excluded
open
circle :
point .
3 Not function
.
every
curve is the
graph of a
The vertical line test :
If any
vertical line intersects the curve more than once then
m u m
not it
the curve is the
graph
mmmm
of a
function , otherwise is
proof :
following the
defining property of a
function ,
only one
element in the is associated with element in the
range
an
domain
Eg
is the
graph of function
-
a
NOT
is the
graph of function
-
a
However . For y 70 ,
the curve is the
graph of the function
Y :[ I , 3] H [o.O ]
domain
range
y= I4-1HT
1. 3 Evan and Odd Functions
I.
Definition Even
function : A function f is even if
f- 1×1 =
f- 1-X ) VIX t Domf
A function
Definition Odd function :
f- is odd if
