Square and Cube Function
Families
Raja Almukahhal
Larame Spence
Mara Landers
Nick Fiori
Art Fortgang
Melissa Vigil
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Printed: November 5, 2012
AUTHORS
Raja Almukahhal
Larame Spence
Mara Landers
Nick Fiori
Art Fortgang
Melissa Vigil
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C ONCEPT
Concept 1. Square and Cube Function Families
1
Square and Cube Function
Families
Here you will learn about evaluating more complex functions involving powers and roots by identifying the ’family’
each function belongs to in order to simplify the general form of the function’s graph.
Often, the most challenging part of completing a math problem is just getting started on the right track. Once you
have a ’feel’ for how a particular problem should be solved, crunching the numbers is generally not very difficult.
An understanding of function families can be a big help with this, as it gives you an idea of what a more complex
function should look like once it has been graphed, just by identifying the parent or most simplified version of the
function.
Do you know the parent functions for the Square, Cube, Square Root, and Reciprocal function families?
Watch This
Embedded Video:
MEDIA
Click image to the left for more content.
TMatsu31: IBMath Section 5AFamilies ofFunctions
Guidance
Function Family: Square Functions
A square function is a 2nd degree equation, meaning it has an x2 .
The graph of every square function is a parabola. A parabola has a vertex, and an axis of symmetry. The graph
below shows these aspects of the graph of y = x2 - 3.
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Function Family: Cubic Functions A cube function is a third-degree equation: x3 and which does not contain
negative or fractional exponents. In general, the graphs of cube functions have a particular shape, illustrated by the
graph shown here:
Cubic functions have a similar shape. However, only some cubic functions will have a relative maximum and
minimum. For example, the graph of yx - 2)3 - 5x shown above, has a relative maximum around x = 0.7, and a
relative minimum around x = 3.3. The shape of the cubic graph means that we can predict end behavior: one end
will approach ∞, and the other will approach −∞.
It is important to note here that the cubic function grows faster than an associated quadratic function. For example,
yx3 grows faster than y = x2 .
Function Family: Square Root Functions
√
Consider the parent of the family, y = x. The domain of the function is limited to real numbers ≥ 0, as the square
root of a negative number is not a real number. Similarly, the range of the function is limited to real numbers ≥
0. This may seem√confusing if you think of squares having two roots. For example, 9 has two roots: 3, and -3.
However, for y = x, we have to define the function value as the principal root, which means the positive root.
The function y =
2
√
x is shown below:
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Concept 1. Square and Cube Function Families
The same kind of limitations of domain and range will exist for any square root function.
Function Family: Reciprocal Function
The function yx has a rather surprising graph. First, the domain cannot include 0, as the fraction (1/0) is undefined.
The range also does not include 0, as a fraction can only be zero if the numerator is zero, and the numerator of y =
1/x is always 1.
In order to understand what these limitations mean for the graph, we will consider function values near xy = 0. First,
consider very small values of x. For example, consider x = 0.001. This yields y = 1/x = (1/0.001) = 1000 . As we get
closer and closer to x = 0, the function values approach ∞. On the other side of the x-axis the function values will
approach −∞. We can see this behavior in the graph as a vertical asymptote: the graph is asymptotic to the y-axis.
We can also see in the graph that as x+∞ or −∞, the function values approach 0. The exclusion of y = 0 from the
range means that the function is asymptotic to the x-axis.
Example A
Describe the end behavior of each function, and identify the parent function for each:
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TABLE 1.1:
a. yx2 - 1
b. yx2 + 1
Solution:
The parent of both functions is yx2
a. yx2 - 1
The graph of this function is a parabola that opens up. Therefore limx→±∞ (x2 − 1) = ∞.
b. yx2 + 1
The graph of this function is a parabola that opens down. Therefore lim−x→±∞ (x2 − 1) = −∞.
All square functions have either a global maximum or minimum. The location of the maximum or minimum is
always the vertex of the parabola. Square functions also share behavior in terms of their average rate of change.
Consider for example the functions fx) = x2 , g(x) = x2 - 3 , and g(x) = 2x2 - 3. The table below shows the average
rate of change (ARC) of each function on several intervals.
Note: The ARC of a function on the interval (a, b) is
f (b)− f (a)
b−a .
TABLE 1.2:
Interval
(-1, 0)
(0, 1)
(1, 2)
(2, 3)
ARC of fx)
ARC of gx)
ARC of hx)
1
3
5
1
3
5
2
6
10
Notice that the average rate of change of fx) and g(x) is the same on each interval, and the average rate of change
of h(x) is twice that of the other two functions. You may also notice that the average rate of change follows a linear
pattern: on each interval the rate increases at a constant rate of 2. While linear functions have a constant rate of
change, quadratic functions have an average rate of change that follows a linear pattern.
Example B
Graph the function y =
4
√
3 − x + 1, identify the parent function, and state the domain and range of the function.
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Concept 1. Square and Cube Function Families
Solution:
The parent function is y =
√
x
From the graph you can see that the function does not take on any x values above 3. (Why not?) Therefore the
domain is limited to real numbers ≤ 3. The function’s lowest value is 1, so the range is limited to all real numbers
≥1.
It is important to note that while the graph of a square root function might look as if it has horizontal asymptote, it
does not. The function values will grow without bound (though relatively slowly!).
Example C
Graph the function fx) = 2/(x - 3), identify the parent, and identify horizontal and vertical asymptotes.
Solution:
The parent function is y = 1/x
The graph is asymptotic to the xy = 0) and to the line x = 3.
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TABLE 1.3:
Can you identify the parent functions of the square, cube, square root, and reciprocal functions now?
Square: y = x2
Cube: y = x3
√
Square Root: y = x
Reciprocal: y = 1/x
Learning the function families is one of the fastest way to graph complex equations. Using parent functions
and transformations (which are detailed in another set of lessons), you can graph very complex equations rather
easily.
Vocabulary
A set of functions which share a similar type of graph is called a Function Family.
Transformations are used to change the graph of a parent function into the graph of a more complex function.
A principal root is the positive root of a number.
The graph of a quadratic function is usually a parabola (a rounded "V" shape). A parabola has a vertex, which is
the maximum or minimum value of the function, and an axis of symmetry which separates the two identical halves
of the parabola.
Guided Practice
Questions
Identify the parent function within each set of functions. Graph each set of functions using a graphing
calculator. Identify similarities and differences of each set.
TABLE 1.4:
f (x) = x2 − 10
f (x) = x2 + 3
f (x) = x2 − 1
f (x) = x2 + 9
f (x) = x2
1) a) Parent Function:
b) Similarities:
c) Differences:
TABLE 1.5:
f (x) = 18 x2
f (x) = x2
2) a) Parent Function:
b) Similarities:
c) Differences:
6
f (x) = 53 x2
f (x) = 3x2
9 2
f (x) = 10
x
2
f (x) = 8x
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Concept 1. Square and Cube Function Families
TABLE 1.6:
f (x) = (x + 9)3
f (x) = (x − 4)3
f (x) = (x + 2)3
f (x) = (x − 8)3
f (x) = x3
3) a) Parent Function:
b) Similarities:
c) Differences:
TABLE 1.7:
1 3
f (x) = 16
x
3
f (x) = 5x
f (x) = 21 x3
f (x) = 10x3
f (x) = x3
4) a) Parent Function:
b) Similarities:
c) Differences:
Solutions
1) This set of graphs can be seen at: Graph for Q#1
a) The parent function of this group of quadratic functions is the most basic function in the set: f (x) = x2
b) Similarities in this set include: width, shape, end behavior, and degree
c) Differences in this set include: xy intercepts
2) This set of graphs can be seen at: Graph for Q#2
a) The parent function in this group of quadratic functions is the same as the last: f (x) = x2
b) Similarities include: width, domain, xy intercept, shape, and degree
3) Differences include: direction, range, end behavior
3) This set of graphs can be seen at: Graph for Q#3
a) The parent function of this group of quartic functions is the most basic function in the set: y = x3
b) Similarities include: end behavior, domain and range, direction, and width
c) Differences include: xy intercepts, increasing and decreasing intervals
4) This set of graphs can be seen at: Graph for Q#4
a) The parent function of this group of quartic functions is the same as problem #3: y = x3
b) Similarities include: xy intercepts, degree, domain, and direction
c) Differences include: width and increasing/decreasing intervals
Practice
1.
2.
3.
4.
5.
Explain what a Square Function is:
What is a cube function?
Describe the rate of growth of a cubic function related to the growth of a squared function
For square root functions we have to define the function value as the positive root, also known as what?
Why are reciprocal functions asymptotic to the x-axis?
Identify the parent function within each set of squared functions. Graph each set of functions using a graphing
calculator. Identify similarities and differences of each set.
7
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Set 1:
8
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Concept 1. Square and Cube Function Families
TABLE 1.8:
f (x) = x2 − 10
f (x) = x2 + 3
f (x) = x2 − 1
f (x) = x2 + 9
f (x) = x2
6. Set 1: a) Parent Function: b) Similarities: c) Differences:
Set 2:
TABLE 1.9:
f (x) = (x + 10)2
f (x) = (x − 2)2
f (x) = (x + 4)2
f (x) = (x − 5)2
f (x) = x2
7. Set 2: a) Parent Function: b) Similarities: c) Differences:
Set 3:
TABLE 1.10:
f (x) = −x2
f (x) = x2
8. Set 3: a) Parent Function: b) Similarities: c) Differences:
Use the above information and the vertex form of a quadratic equation: f (x) = a(x − h)2 + kto help you answer
the following questions:
9.
10.
11.
12.
13.
14.
15.
How does the a value affect the graph?
How does the h value affect the graph?
How does the k value affect the graph?
How are domain values similar/different?
How are range values similar/different?
Does the a, h, and/or k value affect the domain?
Does the a, h, and/or k value affect the range?
Cubic Functions:
Circle the parent function within each set of cubic functions. Graph each set of functions using a graphing
calculator. Identify similarities and differences of each set.
Set 4:
TABLE 1.11:
f (x) = x3 − 5
f (x) = x3 + 1
f (x) = x3 − 3
f (x) = x3 + 6
f (x) = x3
16. Set 4: a) Parent Function: b) Similarities: c) Differences:
Set 5:
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TABLE 1.12:
f (x) = −x3
f (x) = x3
17. Set 5: a) Parent Function: b) Similarities: c) Differences:
10