§ 8.3 Quadratic Functions and Their Graphs. Graphing Quadratic Functions Blitzer, Intermediate Algebra, 5e – Slide #2 Section 8.3 The graph of any quadratic

§ 8.3

Quadratic Functions and Their Graphs

Graphing Quadratic Functions

Blitzer, Intermediate Algebra, 5e – Slide #2 Section 8.3

The graph of any quadratic function is a parabola. Parabolas are shaped either like bowls or like inverted bowls.Consider the quadratic equation:

cbxaxy 2

If a is positive, the parabola opens upward (like a bowl) and if a is negative, the parabola opens downward (like an inverted bowl). Whether the parabola opens upward or downward depends on the coefficient a of the leading term of the quadratic.

In this section, we will learn to recognize characteristics of parabolas, will graph parabolas, and will determine a quadratic function’s maximum or minimum value.



Graphs of Quadratic FunctionsThe graph of the quadratic function

is called a parabola. 0,2 acbxaxxf



-5

0

5

10

15

20

25

30

-6 -4 -2 0 2 4 6-6

0

6

12

18

24

30

-6 -4 -2 0 2 4 6

-6

0

6

12

18

24

30

-6 -4 -2 0 2 4 6

2xxf 23xxf

2

3

1xxf



Graphing Quadratic Functions With Equations in the Form T

To graph

1) Determine whether the parabola opens upward or downward. If a > 0, it opens upward. It a < 0, it opens downward.

2) Determine the vertex of the parabola. The vertex is (h, k).

3) Find any x-intercepts by replacing f (x) with 0. Solve the resulting Quadratic equation for x.

4) Find the y-intercept by replacing x with 0.

5) Plot the intercepts and vertex and additional points as necessary. Connect these points with a smooth curve that is shaped like a cup.

,2 khxaxf

khxaxf 2



EXAMPLEEXAMPLE

Graph the function

SOLUTIONSOLUTION

We can graph this function by following the steps in the preceding box. We begin by identifying values for a, h, and k.

.842 2 xxf

khxaxf 2

842 2 xxf

a = -2

b = -4

c = -8

1) Determine how the parabola opens. Note that a, the coefficient of , is -2. Thus, a < 0; this negative value tells us that the parabola opens downward.

2x


.842 2 xxf

2) Find the vertex. The vertex of the parabola is at (h, k). Because h = -4 and k = -8, the parabola has its vertex at (-4, -8).

CONTINUECONTINUEDD

3) Find the x-intercepts. Replace f (x) with 0 in

8420 2 x Find x-intercepts, setting f (x) equal to 0.


842 2 x Add to both sides. 242 x

44 2 x Divide both sides by 2.

44 x Apply the square root property.

ix 24 Simplify the radical.

ix 24 Subtract 4 from both sides.


.842 2 xxf

Since no real solutions resulted from this step, there are no x-intercepts.

CONTINUECONTINUEDD

4) Find the y-intercept. Replace x with 0 in

40832816284284020 22 f


The y-intercept is -40. The parabola passes through (0,-40).

5) Graph the parabola. With a vertex at (-4,-8), no x-intercepts, and a y-intercept at -40, the graph of f is shown below. The axis of symmetry is the vertical line whose equation is x = -4.


CONTINUECONTINUEDD


-80

-70

-60

-50

-40

-30

-20

-10

0

-15 -10 -5 0 5

y-intercept is: -40

Vertex: (-4,-8)

Axis of symmetry: x = -4



The Vertex of a Parabola Whose Equation is T

Consider the parabola defined by the quadratic function

The parabola’s vertex is

cbxaxxf 2

.2 cbxaxxf

.2

,2

a

bf

a

b



EXAMPLEEXAMPLE

Graph the function Use the graph to identify its domain and its range.

SOLUTIONSOLUTION

1) Determine how the parabola opens. Note that a, the coefficient of , is 1. Thus, a > 0; this positive value tells us that the parabola opens upward.

.46 2xxxf

2) Find the vertex. We know that the x-coordinate of the vertex

is We identify a, b, and c for the given function.

Note that a = 1, b = -4, and c = 6.

.2a

bx

2x



.248622462 2 f

Substitute the values of a and b into the equation for the x-coordinate:

.222

4

12

4

2

a

bx

CONTINUECONTINUEDD

The x-coordinate for the vertex is 2. We substitute 2 for x in the equation of the function to find the corresponding y-coordinate.

The vertex is (2,2).

3) Find the x-intercepts. Replace f (x) with 0 in the original function. We obtain . This equation cannot be solved by factoring. We will use the quadratic formula instead.

2460 xx



CONTINUECONTINUEDD

Clearly, the discriminant is going to be negative, 16 – 24 = -8. Therefore, there will be no x-intercepts for the graph of the function.

600600460 2 f

2

24164

12

61444

2

422

a

acbbx

4) Find the y-intercept. Replace x with 0 in the original function.

The y-intercept is 6. The parabola passes through (0,6).



CONTINUECONTINUEDD 5) Graph the parabola. With a vertex of (2,2), no x-intercepts,

and a y-intercept at 6, the graph of f is shown below. The axis of symmetry is the vertical line whose equation is x = 2.

0

5

10

15

20

25

30

-4 -2 0 2 4 6 8

Vertex: (2,2)

y-intercept is: 6

0

5

10

15

20

25

30

-4 -2 0 2 4 6 8

Axis of symmetry: x = 2

Domain: All real numbers

Range: All real numbers greater than or equal to 2.



CONTINUECONTINUEDDNow we are ready to determine the domain and range of the

original function. We can use the second parabola from the preceding page to do so. To find the domain, look for all inputs on the x-axis that correspond to points on the graph.

. ,or number real a is | is ofDomain xxf

To find the range, look for all the outputs on the y-axis that correspond to points on the graph. Looking at the first parabola from the preceding page, we see the parabola’s vertex is (2,2). This is the lowest point on the graph. Because the y-coordinate of the vertex is 2, outputs on the y-axis fall at or above 2.

. 2,or 2| is of Range yyf


Minimums & Maximums

Minimum and Maximum: Quadratic FunctionsConsider

1) If a > 0, then f has a minimum that occurs at

This minimum value is

2) If a < 0, then f has a maximum that occurs at

This maximum value is

.2 cbxaxxf

.2a

bx

.2a

bx

.2

a

bf

.2

a

bf


Minimums & Maximums

EXAMPLEEXAMPLE

A person standing close to the edge on the top of a 200-foot building throws a baseball vertically upward. The quadratic function

models the ball’s height above the ground, s (t), in feet, t seconds after it was thrown.

How many seconds does it take until the ball finally hits the ground? Round to the nearest tenth of a second.

2006416 2 ttts


Minimums & Maximums

SOLUTIONSOLUTION

CONTINUECONTINUEDD

It might first be useful to have some sort of picture representing the situation. Below is some sort of picture.

0

50

100

150

200

250

300

0 2 4 6 8

Time (seconds)

Hei

gth

of

Bal

l (f

eet)

2006416 2 ttts

Point of interest


Minimums & Maximums

CONTINUECONTINUEDDWhen the ball is released, it is at a height of 200 feet. That is,

when the ball is released, the value of s (t) = 200. By the same token, when the ball finally hits the ground, it will of course be 0 feet above the ground. That is, when the ball hits the ground, the value of s (t) = 0. Therefore, to determine for what value of t the ball hits the ground, we replace s (t) with 0 in the original function.

2006416 2 ttts This is the given function.

20064160 2 tt Replace s (t) with 0.

258280 2 tt Factor -8 out of all terms.

25820 2 tt Divide both sides by -8.


Minimums & Maximums

CONTINUECONTINUEDDWe will use the quadratic formula to solve this

equation. 4

200648

22

252488

2

422

a

acbbt

4

2.168or

4

2.168

4

2.168

4

2648

4

2.8or

4

2.24

05.2or 6.05

Since time cannot be a negative quantity, the answer cannot be -2.05 seconds. Therefore, the ball hits the ground after 6.05 seconds (to the nearest tenth of a second).


Minimums & Maximums

Strategy for Solving Problems Involving Maximizing or Minimizing Quadratic Functions

1) Read the problem carefully and decide which quantity is to be maximized or minimized.

2) Use the conditions of the problem to express the quantity as a function in one variable.

3) Rewrite the function in the form

4) Calculate . If a > 0, f has a minimum at . This minimum

value is . If a < 0, f has a maximum at . This maximum

value is .

5) Answer the question posed in the problem.

.2 cbxaxxf

a

bx

2

a

bf

2

a

b

2

a

bx

2

a

bf

2


Minimums & Maximums

EXAMPLEEXAMPLE

Among all pairs of numbers whose sum is 20, find a pair whose product is as large as possible. What is the maximum product?

SOLUTIONSOLUTION

1) Decide what must be maximized or minimized. We must maximize the product of two numbers. Calling the numbers x and y, and calling the product P, we must maximize

P = xy.2) Express this quantity as a function in one variable. In the formula P = xy, P is expressed in terms of two variables, x and y. However, because the sum of the numbers is 20, we can write

x + y = 20.


Minimums & Maximums

We can solve this equation for y in terms of x, substitute the result into P = xy, and obtain P as a function of one variable.

CONTINUECONTINUEDD

y = 20 - x Subtract x from both sides of the equation: x + y = 20.

Now we substitute 20 – x for y in P = xy.

P = xy = x(20 – x).

Because P is now a function of x, we can writeP (x) = x(20 – x).

3) Write the function in the form . We apply the distributive property to obtain

cbxaxxf 2


Minimums & Maximums

CONTINUECONTINUEDD

4) Calculate . If a < 0, the function has a maximum at

this value. The voice balloons show that a = -1 and b = 20.

P (x) = (20 – x)x = 20x - .2x

b = 20

a = -1

a

b

2

10102

20

12

20

2

a

bx

This means that the product, P, of two numbers who sum is 20 is a maximum when one of the numbers, x, is 10.


Minimums & Maximums

CONTINUECONTINUEDD 5) Answer the question posed by the problem. The problem

asks for the two numbers and the maximum product. We found that one of the numbers, x, is 10. Now we must find the second number, y.

The number pair whose sum is 20 and whose product is as large as possible is 10, 10. The maximum product is 10 x 10 = 100.

y = 20 – x = 20 – 10 = 10.


Minimums & Maximums

EXAMPLEEXAMPLE

You have 200 feet of fencing to enclose a rectangular plot that borders on a river. If you do not fence the side along the river, find the length and width of the plot that will maximize the area. What is the largest area that can be enclosed?

SOLUTIONSOLUTION

1) Decide what must be maximized or minimized. We must maximize area. What we do not know are the rectangle’s dimensions, x and y.

xx

y


Minimums & Maximums

CONTINUECONTINUEDD 2) Express this quantity as a function in one variable.

Because we must maximize area, we have A = xy. We need to transform this into a function in which A is represented by one variable. Because you have 200 feet of fencing, the sum of the lengths of the three sides of the rectangle that need to be fenced is 200 feet. This means that

2x + y = 200.

We can solve this equation for y in terms of x, substitute the result into A = xy, and obtain A as a function in one variable. We begin by solving for y.

y = 200 – 2x Subtract 2x from both sides.


Minimums & Maximums

CONTINUECONTINUEDDNow we substitute 200 – 2x for y in A = xy.

A = xy = x(200 – 2x)

This function models the area, A (x), of any rectangle whose perimeter is 200 feet (and one side is not counted) in terms of one of its dimensions, x.

The rectangle and its dimensions are illustrated in the picture at the beginning of this exercise. Because A is now a function of x, we can write

A (x) = x(200 – 2x).


Minimums & Maximums

CONTINUECONTINUEDD 3) Write the function in the form . We

apply the distributive property to obtain cbxaxxf 2

.200222002200 22 xxxxxxxA

a = -2 b = 200

4) Calculate . If a < 0, the function has a maximum at

this value. The voice balloons show that a = -2 and b = 200.a

b

2

50504

200

22

200

2

a

bx


Minimums & Maximums

CONTINUECONTINUEDD

5) Answer the question posed in the problem. We found that x = 50. The picture at the beginning of this exercise shows that the rectangle’s other dimension is 200 – 2x = 200 – 2(50) = 200 – 100 = 100 feet. The dimensions of the rectangle that maximize the enclosed area are 50 feet by 100 feet. The rectangle that gives the maximum area has an area of (50 feet) x (100 feet) = 5,000 square feet.

This means that the area, A (x), of a rectangle with a “3-sided” perimeter 200 feet is a maximum when the lengths of the two sides that are the same, x, are 50 feet.

In summary…


We consider two standard forms for the quadratic function. In either form, it is easy to see whether the parabola opens upward or downward. We just consider the sign of a in either equation. In the first form that we considered, we could easily see the vertex of the parabola. In the second form, we could easily see the y intercept.You must decide which form is easiest for you to use in a given situation.

The vertex of the parabola is important. For a parabola opening upward, at the vertex we obtain a minimum function value. For a parabola opening downward, at the vertex we obtain a maximum function value.

Have you met Mini and Maxi? Mini is always smiling. Maxi is always frowning.

Documents

§ 8.3 Quadratic Functions and Their Graphs. Graphing Quadratic Functions Blitzer, Intermediate Algebra, 5e – Slide #2 Section 8.3 The graph of any quadratic