TBIL-Precal Graphing Quadratic Functions (PR1)

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Section 4.1 Graphing Quadratic Functions (PR1)

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Objectives

Graph quadratic functions and identify their axis of symmetry, and maximum or minimum point.

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Subsection 4.1.1 Activities

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Observation 4.1.1.

Quadratic functions have many different applications in the real world. For example, say we want to identify a point at which the maximum profit or minimum cost occurs. Before we can interpret some of these situations, however, we will first need to understand how to read the graphs of quadratic functions to locate these least and greatest values.

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Activity 4.1.2.

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Use the graph of the quadratic function

f (x) = 3 (x - 2)^{2} - 4

to answer the questions below.

Quadratic function that opens upward — Figure 4.1.3.

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(a)

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Make a table for values of

f (x)

corresponding to the given

x

-values. What is happening to the

y

-values as the

x

-values increase? Do you notice any other patterns of the

y

-values of the table?

Table 4.1.4.

$x$	$f (x)$
-2
-1
0
1
2
3
4
5

Answer.

Table 4.1.5.

$x$	$f (x)$
-2	44
-1	23
0	8
1	-1
2	-4
3	-1
4	8
5	23

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(b)

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At which point

(x, y)

does

f (x)

have a minimum value? That is, is there a point on the graph that is lower than all other points?

The minimum value appears to occur near $(0, 8) .$
The minimum value appears to occur near $(- \frac{1}{5}, 10) .$
The minimum value appears to occur near $(2, - 4) .$
There is no minimum value of this function.

Answer.

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(c)

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At which point

(x, y)

does

f (x)

have a maximum value? That is, is there a point on the graph that is higher than all other points?

The maximum value appears to occur near $(- 2, 44) .$
The maximum value appears to occur near $(- \frac{1}{5}, 10) .$
The maximum value appears to occur near $(2, - 4) .$
There is no maximum value of this function.

Answer.

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Definition 4.1.6.

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The point at which a quadratic function has a maximum or minimum value is called the vertex. The vertex form of a quadratic function is given by

f (x) = a (x - h)^{2} + k,

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where

(h, k)

is the vertex of the parabola.

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Definition 4.1.7.

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The axis of symmetry, also known as the line of symmetry, is the line that makes the shape of an object symmetrical. For a quadratic function, the axis of symmetry always passes through the vertex

(h, k)

and so is the vertical line

x = h .

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Activity 4.1.8.

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Use the given quadratic function,

f (x) = 3 (x - 2)^{2} - 4,

to answer the following:

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(a)

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Applying Definition 4.1.6, what is the vertex and axis of symmetry of

f (x) ?

vertex: $(2, - 4);$ axis of symmetry: $x = 2$
vertex: $(- 2, 4);$ axis of symmetry: $x = - 2$
vertex: $(- 2, - 4);$ axis of symmetry: $x = - 2$
vertex: $(2, 4);$ axis of symmetry: $x = 2$

Answer.

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(b)

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Compare what you got in part

a

with the values you found in Activity 4.1.2. What do you notice?

Answer.

Students will probably notice that the vertex is also the minimum of the quadratic function and that the axis of symmetry goes through the minimum.

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Definition 4.1.9.

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The standard form of a quadratic function is given by

f (x) = a x^{2} + b x + c,

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where

a, b,

and

c

are real coefficients.

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Observation 4.1.10.

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Just as with the vertex form of a quadratic, we can use the standard form of a quadratic to find the axis of symmetry and the vertex by using the values of