Section 2.5 Transformation of Functions

Section 2.5Transformation of Functions

Graphs of Common Functions

Reciprocal Function

Domain: - ,0 0,

Range: - ,0 0,

Decreasing on - ,0 0,

Odd function

1( )f xx

Vertical Shifts

Vertical ShiftsLet be a function and be a positive real number. The graph of is the graph of shifted units

vertically upward. The graph of is the graph of shifted

f cy f x c y f x c

y f x c y f x c

vertically downward.

Vertical Shifts

Example

Use the graph of f(x)=|x| to obtain g(x)=|x|-2

Horizontal Shifts

Horizontal ShiftsLet be a function and a positive real number. The graph of is the graph of shifted

to the left units. The graph of is the graph of shifted

to the

f cy f x c y f x

cy f x c y f x

right units.c

Horizontal Shifts

Example

Use the graph of f(x)=x2 to obtain g(x)=(x+1)2

Combining Horizontal and Vertical Shifts

Example

Use the graph of f(x)=x2 to obtain g(x)=(x+1)2+2

Reflections of Graphs

Refection about the -AxisThe graph of is the graph of reflected

about the -axis.

xy f x y f x

Reflections about the x-axis

Reflection about the y-AxisThe graph of is the graph of reflected about - axis.

y f x y f xy

Example

Use the graph of f(x)=x3 to obtain the graph of g(x)= (-x)3.

Example

Use the graph of f(x)= x to graph g(x)=- x

Vertical Stretching and Shrinking

Vertically Shrinking

Vertically Stretching

yGraph of f(x)=x3

Graph of g(x)=3x3

This is vertical stretching – each y coordinate is multiplied by 3 to stretch the graph.

Example

Use the graph of f(x)=|x| to graph g(x)= 2|x|

Horizontal Stretching and Shrinking

Horizontal Shrinking

Horizontal Stretching

Example

Use the graph of f(x)= to obtain the

1graph of g(x)=3

Sequences of Transformations

A function involving more than one transformation can be graphed by performing transformations in the following order:

1. Horizontal shifting

2. Stretching or shrinking

3. Reflecting

4. Vertical shifting

Summary of Transformations

A Sequence of Transformations

Move the graph to the left 3 units

Starting graph.

Stretch the graph vertically by 2.

Shift down 1 unit.

Example

1Given the graph of f(x) below, graph ( 1).2f x

Example

Given the graph of f(x) below, graph - ( 2) 1.f x

Example

Given the graph of f(x) below, graph 2 ( ) 1.f x

Use the graph of f(x)= x to graph g(x)= -x.The graph of g(x) will appear in which quadrant?

Quadrant IQuadrant IIQuadrant IIIQuadrant IV

( )f x x

Write the equation of the given graph g(x). The original function was f(x) =x2

( ) ( 4) 3

Write the equation of the given graph g(x). The original function was f(x) =|x|

Section 2.5 Transformation of Functions

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