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LECTURE: 1-3: NEW FUNCTIONS FROM OLD FUNCTIONS
Example 1: Using transformations, sketch graphs of the following functions. Include a sketch of the parent func-tion as well as the final graph of the given function.
(a) f(x) = ln(x� 2) + 4
x
y
(b) f(x) = e
�x � 3
x
y
Example 2: Horizontal and vertical stretching and shrinking. Sketch graphs of the following functions on [�2⇡, 2⇡].How do they relate to the parent function f(x) = sinx?
(a) g(x) = 2 sinx
x
y
(b) h(x) = sin(2x)
x
y
Day 3 1 1-3 New Functions from Old Functions
reflects y=e× over
shifts y= lnx the y . axis , then
right 2, up 4 Shifts down 3
.
a
r.pt#i=nx ÷µ1
, •
!
←- -
#→1
← multiplies y - values Of Y= sinx by 2 .
¥fi÷¥igp¥÷theism:#retsina
← speeds up ,oscillates twice as fast .
In general ,sin ( ax )
goes through a cyclesp 6 Q
• @ 0
in ZI .
www.kei.hu#- zi ,- IT
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Example 3: Review: completing the square and then using transformations. Use completing the square to writethe following functions such that they can be graphed using transformations.
(a) f(x) = x
2 � 4x+ 5
x
y
(b) f(x) = 4x� x
2
x
y
Example 4: How to deal with absolute values. Sketch the graphs of the following functions:
(a) y = |x2 � 2|
x
y
(b) y = | cosx|
x
y
Day 3 2 1-3 New Functions from Old Functions
• fcx ) = ×2- 4 X + 5
th,
.µ÷%" " =×t¥×Iz4o←+514 ... ...
this, squared so f is not
-changed .
/fc×)=(x-2)2+y=x2Shifted right 2
, up 1
f ( X ) = - XZ + 4X
fcx ) = - ( ×2 - 4×+4 ) + 4
-
why + 4 ?t.pt?f.#*y=x2reflected over the
x. axis,
shifted right 2, up 4 .
pink is y=|cosx /Ik;¥E¥¥*i *⇐.**⇐e*n*
To graph 4=1 fix )l :
�1� graph y= fcx )
�2� all parts of y=fCx) below the taxis
reflect over the x - axis . WHL.
Combinations of Functions
Example 5: If f(x) =px and g(x) =
p4� x
2, find the following functions and their domains.
(a) (f + g)(x)
(b) (fg)(x) (c) (f/g)(x)
Composition of Functions
Given two functions f and g, the composite function f � g is defined by
(f � g)(x) = f(g(x)).
Note: this is a NEW operation and is NOT the same as multiplying f and g.
Example 6: Use the graph below to find the following values or explain why it is undefined.
(a) f(g(2))
(b) (g � g)(�2)
Example 7: If f(x) = x
2 and g(x) = x� 3, find the composite functions f � g and g � f . Is it true that f � g = g � f?
Day 3 3 1-3 New Functions from Old Functions
=fC×)tgC X ) =fC× ) .g( × ) =f#
gcx ) Leave
=p+jFx@= K¥2
= I things
need : Tx to exist,
thus=
-4€Vax tmhaafte
× 7 ° . D:[o,z]@ =✓¥€Lathem
.
and J ¥ to exist ,so Zew .
4×230 ← Yofvimnignmdisisnot ( same ask ' )
D.pe#ciansEs
.
like sowing an
equation .
- zE× €2
visual
,#\zSO,
Domain is :
o£xE2or[o,2]f )only thatpart is positive
anapgu,="5) =D
µfirst,
or
they - value
of g wheni
X=z
=g(gtzD=9( 1) = �4�
fog)(×)=fCg( xD (go f) ( x )=g( fcx ) )
=f( × . z ) =g( x2 )= ( × - 3) 2
|-|=×2@=×±6×t9_
Tow that ( foggy # ( got)& ).
Thus,
fog =/ gof ,in general .
we say that
function composition is a non commutative operation .
Example 8: If f(x) = cosx and g(x) = 1�px find the following and their domains.
(a) f � g (b) g � f
Example 9: Find f � g � h if f(x) = 2/(x+ 1), g(x) = cosx and h(x) =
px+ 3.
Example 10: What were those functions? Given the following compositions find, f , g and h such that F = f �g �h.
(a) F (x) = cos
2(x+ 9)
(b) F (x) = tan
4(x
2+ 1)
Example 11: Suppose g is an even function and let h = f � g. Is h also an even function?
Example 12: Let f and g be linear functions with equations f(x) = m1x + b1 and g(x) = m2x + b2. Is f � g also alinear function? If so, what is the slope of its graph? What is its y-intercept?
Day 3 4 1-3 New Functions from Old Functions
( )(×)=fCg( x ) ) ( )( × ) = gcfcx ) )=f( 1 - fx ) = g ( oosx )
=cos(1-F)@ =1@×not XZO because of FX
,we need oosx 70
,this
you can cosine anything ,
is hard,
let's look at a picture
50 Domain :xzoor[o,n)f t¥÷#¥
DC.fi#5EDufTz,7Duf5Yz,53fu_zfCgcnCxD=fCg(oxF3) )
=f( cos ( Fitz ) )= 2
=st@J) and
)OR others !
= fcgfx ) ) because g is
=f(g( × ) ) L even , gtx ) = g ( × )
=€og)(×)= hlx ) ; so @ , hissed
'ton "⇒Ym"¥m Inimitably= mlmzxtbz )tb|
= nmmzxtmibztb ,s°Yes!fogislinear_=
MX t b