Holt Algebra 1
1-8 Introduction to Functions1-8 Introduction to Functions
Holt Algebra 1
Warm UpWarm Up
Lesson PresentationLesson Presentation
Lesson QuizLesson Quiz
Holt Algebra 1
1-8 Introduction to Functions
Warm UpAdd.
1. Draw and label a number line. Then plot the points –2, 0, and 4.
Evaluate each expression for the given value of x.
210123456 6543- - - - - -• • •
2. 2x + 1 for x = 314
3. – x + 3 for x = 8
4. |x + 6| for x = –10
7
1
4
Holt Algebra 1
1-8 Introduction to Functions
Graph ordered pairs in the coordinate plane.Graph functions from ordered pairs.
Objectives
Holt Algebra 1
1-8 Introduction to Functions
coordinate planeaxesoriginx-axisy-axisordered pairx-coordinate
Vocabulary
y-coordinate
quadrant
input
output
Holt Algebra 1
1-8 Introduction to Functions
The coordinate plane is formed by the intersection of two perpendicular number lines called axes. The point of intersection, called the origin, is at 0 on each number line. The horizontal number line is called the x-axis, and the vertical number line is called the y-axis.
Holt Algebra 1
1-8 Introduction to Functions
Points on the coordinate plane are described using ordered pairs. An ordered pair consists of an x-coordinate and a y-coordinate and is written (x, y). Points are often named by a capital letter.
The x-coordinate tells how many units to move left or right from the origin. The y-coordinate tells how many units to move up or down.
Reading Math
Holt Algebra 1
1-8 Introduction to Functions
Example 1: Graphing Points in the Coordinate Plane
Graph each point.
A. T(–4, 4)
Start at the origin.Move 4 units left and 4 units up.
B. U(0, –5)Start at the origin.Move 5 units down.
•T(–4, 4)
•U(0, –5)
C. V (–2, –3)Start at the origin.Move 2 units left and 3 units down.
•V(–2, −3)
Holt Algebra 1
1-8 Introduction to Functions
Check It Out! Example 1Graph each point.
A. R(2, –3)
B. S(0, 2)
Start at the origin.Move 2 units right and 3 units down.
Start at the origin.Move 2 units up.
C. T(–2, 6)
Start at the origin.Move 2 units left and6 units up.
•R(2, –3)
S(0,2)
T(–2,6)
Holt Algebra 1
1-8 Introduction to Functions
Look at the graph at the top of this lesson. The axes divide the coordinate plane into four quadrants. Points that lie on an axis are not in any quadrant.
Holt Algebra 1
1-8 Introduction to Functions
Example 2: Locating Points in the Coordinate Plane
Name the quadrant in which each point lies.
A. EQuadrant ll
B. Fno quadrant (y-axis)
C. GQuadrant l
D. HQuadrant lll
•E
•F
•H
•Gx
y
Holt Algebra 1
1-8 Introduction to Functions
Name the quadrant in which each point lies.
A. Tno quadrant (y-axis)
B. UQuadrant l
C. VQuadrant lll
D. WQuadrant ll
Check It Out! Example 2
•T
•W
•V
•U
x
y
Holt Algebra 1
1-8 Introduction to Functions
An equation that contains two variables can be used as a rule to generate ordered pairs. When you substitute a value for x, you generate a value for y. The value substituted for x is called the input, and the value generated for y is called the output.
y = 10x + 5
Output Input
In a function, the value of y (the output) is determined by the value of x (the input). All of the equations in this lesson represent functions.
Holt Algebra 1
1-8 Introduction to Functions
Example 3: Art Application
An engraver charges a setup fee of $10 plus $2 for every word engraved. Write a rule for the engraver’s fee. Write ordered pairs for the engraver’s fee when there are 5, 10, 15, and 20 words engraved.
Let y represent the engraver’s fee and x represent the number of words engraved.
Engraver’s fee is $10 plus $2 for each word
y = 10 + 2 · x
y = 10 + 2x
Holt Algebra 1
1-8 Introduction to Functions
The engraver’s fee is determined by the number of words in the engraving. So the number of words is the input and the engraver’s fee is the output.
Writing Math
Holt Algebra 1
1-8 Introduction to Functions
Example 3 Continued
Number ofWords
EngravedRule Charges
Ordered Pair
x (input) y = 10 + 2x y (output) (x, y)
y = 10 + 2(5)5 20 (5, 20)
y = 10 + 2(10)10 30 (10, 30)
y = 10 + 2(15)15 40 (15, 40)
y = 10 + 2(20)20 50 (20, 50)
Holt Algebra 1
1-8 Introduction to Functions
Check It Out! Example 4
What if…? The caricature artist increased his fees. He now charges a $10 set up fee plus $20 for each person in the picture. Write a rule for the artist’s new fee. Find the artist’s fee when there are 1, 2, 3 and 4 people in the picture.
y = 10 + 20x
Let y represent the artist’s fee and x represent the number of people in the picture.
Artist’s fee is $10 plus $20 for each person
y = 10 + 20 · x
Holt Algebra 1
1-8 Introduction to Functions
Number of People in Picture
Rule ChargesOrdered
Pair
x (input) y = 10 + 20x y (output) (x, y)
y = 10 + 20(1)1 30 (1, 30)
y = 10 + 20(2)2 50 (2, 50)
y = 10 + 20(3)3 70 (3, 70)
y = 10 + 20(4)4 90 (4, 90)
Check It Out! Example 4 Continued
Holt Algebra 1
1-8 Introduction to Functions
When you graph ordered pairs generated by a function, they may create a pattern.
Holt Algebra 1
1-8 Introduction to Functions
Example 4A: Generating and Graphing Ordered Pairs Generate ordered pairs for the function using the given values for x. Graph the ordered pairs and describe the pattern.
y = 2x + 1; x = –2, –1, 0, 1, 2
–2
–101
2
2(–2) + 1 = –3 (–2, –3)(–1, –1)(0, 1)
(1, 3)(2, 5)
2(–1) + 1 = –12(0) + 1 = 1
2(1) + 1 = 32(2) + 1 = 5
•
•
•
•
•
Input OutputOrdered
Pairx y (x, y)
The points form a line.
Holt Algebra 1
1-8 Introduction to Functions
Example 4B: Generating and Graphing Ordered Pairs
y = x2 – 3; x = –2, –1, 0, 1, 2
–2
–101
2
(–2)2 – 3 = 1 (–2, 1)
(–1, –2)(0, –3)
(1, –2)(2, 1)
(–1)2 – 3 = –2(0)2 – 3 = –3
(1)2 – 3 = –2(2)2 – 3 = 1
Input OutputOrdered
Pairx y (x, y)
The points form a U shape.
Holt Algebra 1
1-8 Introduction to Functions
Example 4C: Generating and Graphing Ordered Pairs
y = |x – 2|; x = 0, 1, 2, 3, 4
0
123
4
|0 – 2| = 2 (0, 2)
(1, 1)(2, 0)
(3, 1)(4, 2)
|1 – 2| = 1|2 – 2| = 0
|3 – 2| = 1
|4 – 2| = 2
Input OutputOrdered
Pairx y (x, y)
The points form a V shape.
Holt Algebra 1
1-8 Introduction to Functions
–4
–202
4
–2 – 4 = –6 (–4, –6)
(–2, –5)(0, –4)
(2, –3)
(4, –2)
–1 – 4 = –50 – 4 = –4
1 – 4 = –3
2 – 4 = –2
Input OutputOrdered
Pairx y (x, y)
The points form a line.
Check It Out! Example 4a
y = x – 4; x = –4, –2, 0, 2, 412
Holt Algebra 1
1-8 Introduction to Functions
–3
–101
3
3(–3)2 + 3 = 30 (–3, 30)
(–1, 6)(0, 3)
(1, 6)(3, 30)
3(–1)2 + 3 = 63(0)2 + 3 = 3
3(1)2 + 3 = 63(3)2 + 3 = 30
Input OutputOrdered
Pairx y (x, y)
The points form a U shape.
Check It Out! Example 4b
y = 3x2 + 3; x = –3, –1, 0, 1, 3
Holt Algebra 1
1-8 Introduction to Functions
0
123
4
|0 – 2| = 2 (0, 2)
(1, 1)(2, 0)
(3, 1)(4, 2)
|1 – 2| = 1|2 – 2| = 0
|3 – 2| = 1
|4 – 2| = 2
Input OutputOrdered
Pairx y (x, y)
The points form a V shape.
Check It Out! Example 4c
y = |x – 2|; x = 0, 1, 2, 3, 4
Holt Algebra 1
1-8 Introduction to Functions
Lesson Quiz: Part 1
Graph each point. Name the quadrant in which each point lies.
1. (2, 0)
2. (–3, –4)
3. (1, –1)
4. (–5, 4)
None
lll
lV
ll
•
•
•
•
Holt Algebra 1
1-8 Introduction to Functions
Lesson Quiz: Part 2
5. A cable company charges $50 to set up a movie channel and $3.00 per movie watched. Write a rule for the company’s fee. Write ordered pairs for the fee when a person watches 1, 2, 3, or 4 movies.
y = 50 + 3x; (1, 53), (2, 56), (3, 59), (4, 62)
Holt Algebra 1
1-8 Introduction to Functions
Lesson Quiz: Part 3
6. Generate ordered pairs for y = x² –5 using x = –2, –1, 0, 1, and 2. Graph the ordered pairs, and describe the pattern.
(–2, –1)
(–1, –4)
(0, –5)
(1, –4)
(2, –1)
The pattern is U-shaped.
•
••
•
•