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Big Ideas Math Book Algebra 1 Answer Key Chapter 4 Writing Linear Functions

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Writing Linear Functions Maintaining Mathematical Proficiency

Use the graph to answer the question.

Question 1.
What ordered pair corresponds to point G?

Answer:
The ordered pair (-5, -2) corresponds to point G.

Explanation:
The coordinates of point G are (-5, -2). So, the x coordinate is -5, y coordinate is -2.
The ordered pair (-5, -2) corresponds to point G.

Question 2.
What ordered pair corresponds to point D?

Answer:
The ordered pair (2, 0) corresponds to point D.

Explanation:
The coordinates of point D are (2, 0). So, the x coordinate is 2, y coordinate is 0.
The ordered pair (2, 0) corresponds to point D.

question 3.
Which point is located in Quadrant I?

Answer:
Point C is located in Quadrant I.

Explanation:
The coordinates of point C are (3, 5). So, the x coordinate is 3, y coordinate is 5.
Both coordinates are positive. So, point C is located in quadrant I.

Question 4.
Which point is located in Quadrant IV?

Answer:
Point E is located in Quadrant IV.

Explanation:
The coordinates of point E are (3, -3). So, the x coordinate is 3, y coordinate is -3.
x-coordinate is positive and y coordinate is negative. So point E is located in quadrant IV.

Solve the equation for y.

Question 5.
x – y = 5

Answer:
y = x – 5

Explanation:
Given that,
x – y = 5
Subtract x from both sides
x – y – x = 5 – x
-y = 5 – x
Multiply both sides by -1
-1(-y) = -1(5 – x)
y = x – 5

Question 6.
6x + 3y = -1

Answer:
y = \(\frac { -1 – 6x }{ 3 } \)

Explanation:
Given that,
6x + 3y = -1
Subtract 6x from both sides
3y = -1 – 6x
Divide both sides by 3
y = \(\frac { -1 – 6x }{ 3 } \)

Question 7.
0 = 2y – 8x + 10

Answer:
y = 4x – 5

Explanation:
Given that,
0 = 2y – 8x + 10
Add both sides by 8x
8x = 2y + 10
Subtract 10 from both sides
8x – 10 = 2y
Divide both sides by 2
y = 4x – 5

Question 8.
-x + 4y – 28 = 0

Answer:
y = \(\frac { x + 28 }{ 4 } \)

Explanation:
Given that,
-x + 4y – 28 = 0
Add x to both sides
4y – 28 = x
Add 28 to both sides
4y = x + 28
Divide both sides by 4
y = \(\frac { x + 28 }{ 4 } \)

Question 9.
2y + 1 – x = 7x

Answer:
y = \(\frac { 8x – 1 }{ 2 } \)

Explanation:
Given that,
2y + 1 – x = 7x
Add x to both sides
2y + 1 = 7x + x
2y + 1 = 8x
2y = 8x – 1
y = \(\frac { 8x – 1 }{ 2 } \)

Question 10.
y – 4 = 3x + 5y

Answer:
y = \(\frac { -4 – 3x }{ 4 } \)

Explanation:
Given that,
y – 4 = 3x + 5y
-4 = 3x + 5y – y
-4 = 3x + 4y
4y = -4 – 3x
y = \(\frac { -4 – 3x }{ 4 } \)

Question 11.
ABSTRACT REASONING
Both coordinates of the point (x, y) are multiplied by a negative number. How does this change the location of the point? Be sure to consider points originally located in all four quadrants.

Answer:
If both coordinates of the point in the 1st quadrant are multiplied by a negative number, then the point is shifted to 3rd quadrant and viceversa.
If both coordinates of the point in 2nd quadrant are multiplied by a negative number, then the point is shifted to 4th quadrant and viceversa.

Writing Linear Functions Mathematical Practices

Monitoring Progress

Question 1.
You work 37\(\frac{1}{2}\) hours and earn $352.50. What is your hourly wage?

Answer:
$9.4 is your hourly wage.

Explanation:
The wagesfor 37.5 hours is 352.50
1 hour wage = \(\frac { 352.50 }{ 37.5 } \)
= $9.4

Question 2.
You drive 1244.5 miles and use 47.5 gallons of gasoline. What is your car’s gas mileage (in miles per gallon)?

Answer:
My car gas milage is 26.2 miles per gallon.

Explanation:
You drive 1244.5 miles and use 47.5 gallons of gasoline.
Car gas milage = \(\frac { 1244.5 }{ 47.5 } \) = 26.2

Question 3.
You drive 236 miles in 4.6 hours. At the same rate, how long will it take you to drive 450 miles?

Answer:
It takes 8.8235 hours to drive 450 miles.

Explanation:
You drive 236 miles in 4.6 hours.
Speed = \(\frac { 236 }{ 4.6 } \) = 51.3043 miles per hour
The time takes to drive 450 miles = \(\frac { 450 }{ 51.3043 } \) = 8.8235

Lesson 4.1 Writing Equations in Slope-Intercept Form

Essential Question

Given the graph of a linear function, how can you write an equation of the line?

EXPLORATION 1
Writing Equations in Slope-Intercept Form
Work with a partner.

  • Find the slope and y-intercept of each line.
  • Write an equation of each line in slope-intercept form.
  • Use a graphing calculator to verify your equation.

Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 1

EXPLORATION 2
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 2
Mathematical Modeling
Work with a partner. The graph shows the cost of a smartphone plan.
a. What is the y-intercept of the line? Interpret the y-intercept in the context of the problem.
b. Approximate the slope of the line. Interpret the slope in the context of the problem.
c. Write an equation that represents the cost as a function of data usage.
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 3

Communicate Your Answer

Question 3.
Given the graph of a linear function, how can you write an equation of the line?

Question 4.
Give an example of a graph of a linear function that is different from those above. Then use the graph to write an equation of the line.

4.1 Lesson

Monitoring Progress

Write an equation of the line with the given slope and y-intercept.

Question 1.
slope = 7; y-intercept = 2

Answer:
y = 7x + 2

Explanation:
The slope intercept form of a line is y = mx + b
y = 7x + 2

Question 2.
slope = \(\frac{1}{3}\) ; y-intercept = -1

Answer:
y = \(\frac{1}{3}\)x – 1

Explanation:
The slope intercept form of a line is y = mx + b
y = \(\frac{1}{3}\)x – 1

Write an equation of the line in slope-intercept form.

Question 3.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 4

Answer:
y = \(\frac { 1 }{ 2 } \)x + 1

Explanation:
Slope m = \(\frac { 3 – 1 }{ 4 – 0 } \) = \(\frac { 1 }{ 2 } \)
Because the line crosses the y-axis at (0, 1) the y-intercept is 1
So, the equation is y = \(\frac { 1 }{ 2 } \)x + 1

Question 4.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 5

Answer:
y = \(\frac { -2 }{ 5 } \)x – 1

Explanation:
Slope m = \(\frac { -3 + 1 }{ 5 – 0 } \) = \(\frac { -2 }{ 5 } \)
Because the line crosses the y-axis at (0, -1) the y-intercept is -1
So, the equation is y = \(\frac { -2 }{ 5 } \)x – 1

Question 5.
Write an equation of the line that passes through (0, -2) and (4, 10).

Answer:
The equation is y = 3x – 2

Explanation:
Slope m = \(\frac { 10 + 2 }{ 4 – 0 } \) = 3
Because the line crosses the y-axis at (0, -2) the y-intercept is -2
So, the equation is y = 3x – 2

Question 6.
Write a linear function g with the values g(0) = 9 and g(8) = 7.

Answer:
g(x) = \(\frac { -1 }{ 4 } \)x + 9

Explanation:
(0, 9) and (8, 7) are the coordinates of points on a line
Slope m = \(\frac { 7 – 9 }{ 8 – 0 } \) = \(\frac { -1 }{ 4 } \)
Y-intercept is 9
So, the equation is y = \(\frac { -1 }{ 4 } \)x + 9
The linear function is g(x) = \(\frac { -1 }{ 4 } \)x + 9

Monitoring Progress

Question 7.
The corresponding data for electricity generated by hydropower are 248 million megawatt hours in 2007 and 277 million megawatt hours in 2012. Write a linear model that represents the number of megawatt hours generated by hydropower as a function of the number of years since 2007.

Answer:
y = 5.8x + 248

Explanation:
Let x represents the time and y represents the number of megawatt-hours.
2007 corresponds to x = 0 and 2012 corresponds to x = 5
Let (x₁, y₁) = (0, 248) and (x₂, y₂) = (5, 277)
The y-intercept is 248.
Slope m = \(\frac { 277 – 248 }{ 5 – 0 } \)
= 5.8
Megawatt hours = initialvalue + rate of change • Years
y = 248 + 5.8 • x
y = 5.8x + 248

Writing Equations in Slope-Intercept Form 4.1 Exercises

Question 1.
COMPLETE THE SENTENCE
A linear function that models a real-life situation is called a __________.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 1

Question 2.
WRITING
Explain how you can use slope-intercept form to write an equation of a line given its slope and y-intercept.

Answer:
Substitute the given value for the slope and the y-intercept in the slope intercept form to get the equation of the line.

Explanation:
Writing the equation of a line with the slope and y-intercept
y = mx + b
Substitute the given value for the slope and y-intercept in the above form to get the equation of the line.

Monitoring Progress and Modeling with Mathematics

In Exercises 3–8, write an equation of the line with the given slope and y-intercept.

Question 3.
slope: 2
y-intercept: 9
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 3

Question 4.
slope: 0
y-intercept: 5

Answer:
y = 5

Explanation:
y = mx + b
y = 0x + 5
y = 5

Question 5.
slope: -3
y-intercept: 0
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 5

Question 6.
slope: -7
y-intercept: 1

Answer:
y = -7x + 1

Explanation:
y = mx + b
y = -7x + 1

Question 7.
slope: \(\frac{2}{3}\)
y-intercept: -8
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 7

Question 8.
slope: –\(\frac{3}{4}\)
y-intercept: -6

Answer:
y = –\(\frac{3}{4}\)x – 6

Explanation:
y = mx + b
y = –\(\frac{3}{4}\)x – 6

In Exercises 9–12, write an equation of the line in slope-intercept form.

Question 9.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 6
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 9

Question 10.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 7

Answer:
y = \(\frac { -1 }{ 4 } \)x + 3

Explanation:
Slope m = \(\frac { 3 – 2 }{ 0 – 4 } \)
= \(\frac { -1 }{ 4 } \)
Because the line crosses y-axis at (0, 3), the y-intercept is 3
Equation is y = \(\frac { -1 }{ 4 } \)x + 3

Question 11.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 8
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 11

Question 12.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 9

Answer:
Equation is y = 2x – 2

Explanation:
Slope m = \(\frac { 2 + 2 }{ 2 – 0 } \)
= 2
Because the line crosses y-axis at (0, -2), the y-intercept is -2
Equation is y = 2x – 2

In Exercises 13–18, write an equation of the line that passes through the given points.

Question 13.
(3, 1), (0, 10)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 13

Question 14.
(2, 7), (0, -5)

Answer:
The equation is y = 6x – 5

Explanation:
Slope m = \(\frac { -5 – 7 }{ 0 – 2 } \) = 6
Because the line crosses the y-axis at (0, -5), the y-intercept is -5
The equation is y = 6x – 5

Question 15.
(2, -4), (0, -4)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 15

Question 16.
(-6, 0), (0, -24)

Answer:
The equation is y = -4x – 24

Explanation:
Slope m = \(\frac { -24 – 0 }{ 0 + 6 } \) = -4
Because the line crosses the y-axis at (0, -24), the y-intercept is -24
The equation is y = -4x – 24

Question 17.
(0, 5), (-1.5, 1)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 17

Question 18.
(0, 3), (-5, 2.5)

Answer:
The equation is y = 0.1x + 3

Explanation:
Slope m = \(\frac { 2.5 – 3 }{ -5 – 0 } \) = 0.1
Because the line crosses the y-axis at (0, 3), the y-intercept is 3
The equation is y = 0.1x + 3

In Exercises 19–24, write a linear function f with the given values.

Question 19.
f(0) = 2, f(2) = 4
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 19

Question 20.
f(0) = 7, f(3) = 1

Answer:
A function is f(x) = -2x + 7

Explanation:
f(0) = 7 is (0, 7) and  f(3) = 1 is (3, 1)
Slope m = \(\frac { 1 – 7 }{ 3 – 0 } \) = -2
Because the line crosses the y-axis at (0, 7), the y-intercept is 7
y = mx + b
y = -2x + 7
A function is f(x) = -2x + 7

Question 21.
f(4) = -3, f(0) = -2
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 21

Question 22.
f(5) = -1, f(0) = -5

Answer:
A function is f(x) = \(\frac { 12 }{ 2 } \)x + -5

Explanation:
f(5) = -1 is (5, -1) and  f(0) = -5 is (0, -5)
Slope m = \(\frac { -5 + 1 }{ 0 – 5 } \) = \(\frac { 4 }{ 5 } \)
Because the line crosses the y-axis at (0, -5), the y-intercept is -5
y = mx + b
y = \(\frac { 12 }{ 2 } \)x + -5
A function is f(x) = \(\frac { 12 }{ 2 } \)x + -5

Question 23.
f(-2) = 6, f(0) = -4
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 23

Question 24.
f(0) = 3, f(-6) = 3

Answer:
A function is f(x) = 3

Explanation:
f(0) = 3 is (0, 3) and  f(-6) = 3 is (-6, 3)
Slope m = \(\frac { 3 – 3 }{ -6 – 0 } \) = 0
Because the line crosses the y-axis at (0, 3), the y-intercept is 3
y = mx + b
y = 0x + 3
y = 3
A function is f(x) = 3

In Exercises 25 and 26, write a linear function f with the given values.

Question 25.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 10
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 25

Question 26.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 11

Answer:
A function f(x) = \(\frac { 12 }{ 2 } \)x

Explanation:
The points are (-4, -2) and (-2, -1)
Slope m = \(\frac { -1 + 2 }{ -2 + 4 } \) = \(\frac { 1 }{ 2 } \)
y = mx + b
y = \(\frac { 12 }{ 2 } \)x + b
The line passes through the point (0, 0)
0 = \(\frac { 12 }{ 2 } \)(0) + b
b = 0
So, y = \(\frac { 12 }{ 2 } \)x + 0
y = \(\frac { 12 }{ 2 } \)x
A function f(x) = \(\frac { 12 }{ 2 } \)x

Question 27.
ERROR ANALYSIS
Describe and correct the error in writing an equation of the line with a slope of 2 and a y-intercept of 7.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 12
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 27

Question 28.
ERROR ANALYSIS
Describe and correct the error in writing an equation of the line shown.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 13
Answer:
Slope = \(\frac { 1 – 4 }{ 5 – 0 } \) = \(\frac { -3 }{ 5 } \)
y = \(\frac { -3 }{ 5 } \)x + 4

Question 29.
MODELING WITH MATHEMATICS
In 1960, the world record for the men’s mile was 3.91 minutes. In 1980, the record time was 3.81 minutes.
a. Write a linear model that represents the world record (in minutes) for the men’s mile as a function of the number of years since 1960.
b. Use the model to estimate the record time in 2000 and predict the record time in 2020.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 29

Question 30.
MODELING WITH MATHEMATICS
A recording studio charges musicians an initial fee of $50 to record an album. Studio time costs an additional $75 per hour.
a. Write a linear model that represents the total cost of recording an album as a function of studio time (in hours).
b. Is it less expensive to purchase 12 hours of recording time at the studio or a $750 music software program that you can use to record on your own computer? Explain.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 14
Answer:
a. y = 75x + 50
b. It is less expensive to purchase a music software

Explanation:
a. Let x be the time measured in hours, y is the total cost in dollars
The slope-intercept form is y = mx + b
Let us consider that x = x₁ = 0 initially and the cost y = y₁ = $50. After 1 hour x₂ = 1, y₂ = 50 + 75 = 125
The line passes through the points (0, 50) and (1, 125)
Slope m = \(\frac { 125 – 50 }{ 1 – 0 } \) = 75 dollars per hour
y = 75x + 50
b. with the linear model it is possible to estimate thecost after t = 12 hours
y(12) = 75(12) + 50 = 950 dollars
Hence, it is less expensive to purchase music software.
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 1

Question 31.
WRITING
A line passes through the points (0, -2) and (0, 5). Is it possible to write an equation of the line in slope-intercept form? Justify your answer.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 31

Question 32.
THOUGHT PROVOKING
Describe a real-life situation involving a linear function whose graph passes through the points.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 15
Answer:
Let us take x as the time and y as the distance covered.
A person starts jogging from 20 meters. The person reaches 80 kilometers in 4 hours.

Question 33.
REASONING
Recall that the standard form of a linear equation is Ax + By = C. Rewrite this equation in slope-intercept form. Use your answer to find the slope and y-intercept of the graph of the equation -6x + 5y = 9.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 33

Question 34.
MAKING AN ARGUMENT
Your friend claims that given f(0) and any other value of a linear function f, you can write an equation in slope-intercept form that represents the function. Your cousin disagrees, claiming that the two points could lie on a vertical line. Who is correct? Explain.
Answer:

Question 35.
ANALYZING A GRAPH
Line ℓ is a reflection in the x-axis of line k. Write an equation that represents line k.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 16
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 35

Question 36.
HOW DO YOU SEE IT?
The graph shows the approximate U.S. box office revenues (in billions of dollars) from 2000 to 2012, where x = 0 represents the year 2000.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 17
a. Estimate the slope and y-intercept of the graph.
b. Interpret your answers in part (a) in the context of the problem.
c. How can you use your answers in part (a) to predict the U.S. box office revenue in 2018?

Answer:
a. slope is \(\frac { 1 }{ 5 } \), y-intercept is 8.
b. The slope is \(\frac { y₂ – y₁ }{ x₂ – x₁ } \) and y intercept is 8 because the point (0, 8) crosses the y-axis.
c. y = \(\frac { 1 }{ 5 } \)x + 8

Explanation:
The points are(0, 8), (10, 10)
The slope m = \(\frac { 10 – 8 }{ 10 – 0 } \) = \(\frac { 1 }{ 5 } \)
The slope intercept form is y = \(\frac { 1 }{ 5 } \)x + 8

Question 37.
ABSTRACT REASONING
Show that the equation of the line that passes through the points (0, b) and (1, b + m) is y = mx + b. Explain how you can be sure that the point (-1, b – m) also lies on the line.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 37

Maintaining Mathematical Proficiency

Solve the equation. (Section 1.3)

Question 38.
3(x – 15) = x + 11

Answer:
x = 28

Explanation:
3(x – 15) = x + 11
3x – 45 = x + 11
3x – x = 11 + 45
2x = 56
x = 28

Question 39.
-4y – 10 = 4(y – 3)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 39

Question 40.
2(3d + 3) = 7 + 6d

Answer:
The equation is not correct.

Explanation:
2(3d + 3) = 7 + 6d
6d + 6 = 7 + 6d
6d – 6d = 7 – 6
0 = 1

Question 41.
-5(4 – 3n) = 10(n – 2)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 41

Use intercepts to graph the linear equation. (Section 3.4)

Question 42.
-4x + 2y = 16

Answer:
The x-intercept is -4.
The y-intercept is 8

Explanation:
-4x + 2y = 16
Let x = 0
-4(0) + 2y = 16
2y = 16
y = 8
the y-intercept is 8
Let y = 0
-4x + 2(0) = 16
-4x = 16
x = -4
The x-intercept is -4.
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 2

Question 43.
3x + 5y = -15
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 43

Question 44.
x – 6y = 24

Answer:
The x-intercept is 24, The y-intercept is -4

Explanation:
x – 6y = 24
Let y = 0
x – 6(0) = 24
x = 24
The x-intercept is 24
Let x = 0
0 – 6y = 24
y = -4
The y-intercept is -4
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 3

Question 45.
-7x – 2y = -21
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.1 Question 45

Lesson 4.2 Writing Equations in Point-Slope Form

Essential Question
How can you write an equation of a line when you are given the slope and a point on the line?

EXPLORATION 1
Writing Equations of Lines
Work with a partner.

  • Sketch the line that has the given slope and passes through the given point.
  • Find the y-intercept of the line.
  • Write an equation of the line.

Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 18

EXPLORATION 2
Writing a Formula
Work with a partner.

The point (x1, y1) is a given point on a nonvertical line. The point (x, y) is any other point on the line. Write an equation that represents the slope m of the line. Then rewrite this equation by multiplying each side by the difference of the x-coordinates to obtain the point-slope form of a linear equation.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 19

EXPLORATION 3
Writing an Equation
Work with a partner.

For four months, you have saved $25 per month. You now have $175 in your savings account.
a. Use your result from Exploration 2 to write an equation that represents the balance A after t months.
b. Use a graphing calculator to verify your equation.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 20
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 21

Communicate Your Answer

Question 4.
How can you write an equation of a line when you are given the slope and a point on the line?

Question 5.
Give an example of how to write an equation of a line when you are given the slope and a point on the line. Your example should be different from those above.

4.2 Lesson

Monitoring Progress

Write an equation in point-slope form of the line that passes through the given point and has the given slope.

Question 1.
(3, -1); m = -2

Answer:
(y + 1) = -2(x – 3)

Explanation:
The point-slope form of the line is (y – y₁) = m(x – x₁)
(y + 1) = -2(x – 3)

Question 2.
(4, 0); m = – \(\frac{2}{3}\)

Answer:
y = – \(\frac{2}{3}\)(x – 4)

Explanation:
The point-slope form of the line is (y – y₁) = m(x – x₁)
(y – 0) = – \(\frac{2}{3}\)(x – 4)
y = – \(\frac{2}{3}\)(x – 4)

Write an equation in slope-intercept form of the line that passes through the given points.

Question 3.
(1, 4), (3, 10)

Answer:
y = 3x + 1

Explanation:
Slope m = \(\frac { 10 – 4 }{ 3 – 1 } \) = 3
Use slope, (1, 4) to write the equation
(y – 4) = 3(x – 1)
y – 4 = 3x – 3
y = 3x – 3 + 4
y = 3x + 1

Question 4.
(-4, -1), (8, -4)

Answer:
y = \(\frac { -3 }{ 12 } \)x – 2

Explanation:
Slope m = \(\frac { -4 + 1 }{ 8 + 4 } \) = \(\frac { -3 }{ 12 } \)
Use slope, (-4, -1) to write the equation
(y + 1) = \(\frac { -3 }{ 12 } \)(x + 4)
12(y + 1) = -3(x + 4)
12y + 12 = -3x – 12
12y = -3x – 24
y = \(\frac { -3 }{ 12 } \)x – 2

Question 5.
Write a linear function g with the values g(2) = 3 and g(6) = 5.

Answer:
y = \(\frac { 1 }{ 2 } \)x + 2

Explanation:
The points are (2, 3) and (6, 5)
Slope m = \(\frac { 5 – 3 }{ 6 – 2 } \) = \(\frac { 1 }{ 2 } \)
Use slope, (2, 3) to write the equation
(y – 3) = \(\frac { 1 }{ 2 } \)(x – 2)
y = \(\frac { 1 }{ 2 } \)x – 1 + 3
y = \(\frac { 1 }{ 2 } \)x + 2

Question 6.
You pay an installation fee and a monthly fee for Internet service. The table shows the total cost for different numbers of months. Can the situation be modeled by a linear equation? Explain. If possible, write a linear model that represents the total cost as a function of the number of months.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 22

Answer:
y = 42x + 50   .

Explanation:
The points are (3, 176), (6, 302)
Slope m = \(\frac { 302 – 176 }{ 6 – 3 } \) = \(\frac { 126 }{ 3 } \) = 42
Use slope, (3, 176) to write the equation
y – 176 = 42(x – 3)
y – 176 = 42x – 126
y = 42x + 50

Writing Equations in Point-Slope Form 4.2 Exercises

Vocabulary and Core Concept Check

Question 1.
USING STRUCTURE
Without simplifying, identify the slope of the line given by the equation y – 5 = -2(x + 5). Then identify one point on the line.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 1

Question 2.
WRITING
Explain how you can use the slope formula to write an equation of the line that passes through (3, -2) and has a slope of 4.

Answer:
The equation of a line passes through a point (x₁, y₁) and having slope m is (y – y₁) = m(x – x₁)
(y + 2) = 4(x – 3)
y + 2 = 4x – 12
y = 4x – 14

Monitoring Progress and Modeling with Mathematics

In Exercises 3−10, write an equation in point-slope form of the line that passes through the given point and has the given slope.

Question 3.
(2, 1); m = 2
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 3

Question 4.
(3, 5); m = -1

Answer:
The equation is y – 5 = -1(x – 3)

Explanation:
(y – y₁) = m(x – x₁)
y – 5 = -1(x – 3)

Question 5.
(7, -4); m = -6
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 5

Question 6.
(-8, -2); m = 5

Answer:
The equation is (y + 2) = 5(x + 8)

Explanation:
(y – y₁) = m(x – x₁)
(y + 2) = 5(x + 8)

Question 7.
(9, 0); m = -3
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 7

Question 8.
(0, 2); m = 4

Answer:
The equation is y – 2 = 4x

Explanation:
(y – y₁) = m(x – x₁)
(y – 2) = 4(x – 0)
y – 2 = 4x

Question 9.
(-6, 6); m – \(\frac{3}{2}\)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 9

Question 10.
(5, -12); m = –\(\frac{2}{5}\)

Answer:
The equation is (y + 12) = –\(\frac{2}{5}\)(x – 5)

Explanation:
(y – y₁) = m(x – x₁)
(y + 12) = –\(\frac{2}{5}\)(x – 5)

In Exercises 11−14, write an equation in slope-intercept form of the line shown.

Question 11.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 23
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 11

Question 12.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 24

Answer:
The equation is y = -x – 4

Explanation:
m = \(\frac { -5 – 0 }{ 1 + 4 } \) = -1
(y – y₁) = m(x – x₁)
(y + 5) = -1(x – 1)
y + 5 = -x + 1
y = -x + 1 – 5
y = -x – 4

Question 13.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 25
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 13

Question 14.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 26

Answer:
The equation is y = \(\frac { 3 }{ 7 } \)x – \(\frac { 5 }{ 7 } \)

Explanation:
m = \(\frac { 1 – 4 }{ 4 – 8 } \) = \(\frac { 3 }{ 7 } \)
(y – y₁) = m(x – x₁)
(y – 1) = \(\frac { 3 }{ 7 } \)(x – 4)
y – 1 = \(\frac { 3 }{ 7 } \)x – \(\frac { 12 }{ 7 } \)
y = \(\frac { 3 }{ 7 } \)x – \(\frac { 5 }{ 7 } \)

In Exercises 15−20, write an equation in slope-intercept form of the line that passes through the given points.

Question 15.
(7, 2), (2, 12)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 15

Question 16.
(6, -2), (12, 1)

Answer:
The equation is y = \(\frac { 1 }{ 2 } \)x – 5

Explanation:
m = \(\frac { 1 + 2 }{ 12 – 6 } \) = \(\frac { 1 }{ 2 } \)
(y – y₁) = m(x – x₁)
(y – 1) = \(\frac { 1 }{ 2 } \)(x – 12)
y = \(\frac { 1 }{ 2 } \)x – 6 + 1
y = \(\frac { 1 }{ 2 } \)x – 5

Question 17.
(6, -1), (3, -7)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 17

Question 18.
(-2, 5), (-4, -5)

Answer:
The equation is y = 5x + 15

Explanation:
m = \(\frac { -5 – 5 }{ -4 + 2} \) = 5
(y – y₁) = m(x – x₁)
(y – 5) = 5(x + 2)
y = 5x + 10 + 5
y = 5x + 15

Question 19.
(1, -9), (-3, -9)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 19

Question 20.
(-5, 19), (5, 13)

Answer:
The equation is y = \(\frac { -3 }{ 5 } \)x + 16

Explanation:
m = \(\frac { 13 – 19 }{ 5 + 5 } \) = \(\frac { -3 }{ 5 } \)
(y – y₁) = m(x – x₁)
(y – 13) = \(\frac { -3 }{ 5 } \)(x – 5)
y = \(\frac { -3 }{ 5 } \)x + 3 + 13
y = \(\frac { -3 }{ 5 } \)x + 16

In Exercises 21−26, write a linear function f with the given values.

Question 21.
f(2) = -2, f(1) = 1
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 21

Question 22.
f(5) = 7, f(-2) = 0

Answer:
The equation is y = -x – 2

Explanation:
Rewrite f(5) = 7 as (5, -7), f(-2) = 0 as (-2, 0)
m = \(\frac { 0 + 7 }{ -2 – 5 } \) = -1
(y – y₁) = m(x – x₁)
y + 7 = -1(x – 5)
y + 7 = -x + 5
y = -x + 5 – 7
y = -x – 2

Question 23.
f(-4) = 2, f(6) = -3
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 23

Question 24.
f(-10) = 4, f(-2) = 4

Answer:
The equation is y = 4.

Explanation:
Rewrite f(-10) = 4 as (-10, 4), f(-2) = 4 as (-2, 4)
m = \(\frac { 4 – 4 }{ -2 + 10 } \) = 0
(y – y₁) = m(x – x₁)
y – 4 = 0(x + 2)
y = 4

Question 25.
f(-3) = 1, f(13) = 5
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 25

Question 26.
f(-9) = 10, f(-1) = -2

Answer:
The equation is y = \(\frac { -3 }{ 2 } \)x – \(\frac { 7 }{ 2 } \)

Explanation:
Rewrite f(-9) = 10 as (-9, 10), f(-1) = -2 as (-1, -2)
m = \(\frac { -2 – 10 }{ -1 + 9 } \) = \(\frac { -3 }{ 2 } \)
(y – y₁) = m(x – x₁)
y + 2 = \(\frac { -3 }{ 2 } \)(x + 1)
y = \(\frac { -3 }{ 2 } \)x – \(\frac { 3 }{ 2 } \) – 2
y = \(\frac { -3 }{ 2 } \)x – \(\frac { 7 }{ 2 } \)

In Exercises 27−30, tell whether the data in the table can be modeled by a linear equation. Explain. If possible, write a linear equation that represents y as a function of x.

Question 27.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 27
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 27

Question 28.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 28

Answer:
Because the y values increase at a constant rate, the data can be modeled by a linear equation. A linear model is y = -3x + 7

Explanation:
\(\frac { 10 – 16 }{ -1 + 3 } \) = -3, \(\frac { 4 – 10 }{ 1 + 1 } \) = -3
\(\frac { -2 – 4 }{ 3 – 1 } \) = -3
\(\frac { -8 + 2 }{ 5 – 3 } \) = -3
y – 16 = -3(x + 3)
y – 16 = -3x – 9
y = -3x – 9 + 16
y = -3x + 7

Question 29.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 29
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 29

Question 30.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 30

Answer:
Because the y values are not changing at a constant rate, the data cannot be modeled by a linear equation.

Explanation:
\(\frac { 15 – 18 }{ 2 – 1 } \) = -3
\(\frac { 12 – 15 }{ 4 – 2 } \) = \(\frac { -3 }{ 2 } \)
\(\frac { 9 – 12 }{ 8 – 4 } \) = \(\frac { -3 }{ 4 } \)
Because the y values are not changing at a constant rate, the data cannot be modeled by a linear equation.

Question 31.
ERROR ANALYSIS
Describe and correct the error in writing a linear function g with the values g(5) = 4 and g(3) = 10.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 31
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 31

Question 32.
ERROR ANALYSIS
Describe and correct the error in writing an equation of the line that passes through the points (1, 2) and (4, 3).
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 32

Answer:
m = \(\frac { 3 – 2 }{ 4 – 1 } \) = \(\frac { 1 }{ 3 } \)
y – 2 = \(\frac { 1 }{ 3 } \)(x – 1)

Question 33.
MODELING WITH MATHEMATICS
You are designing a sticker to advertise your band. A company charges $225 for the first 1000 stickers and $80 for each additional 1000 stickers.
a. Write an equation that represents the total cost (in dollars) of the stickers as a function of the number (in thousands) of stickers ordered.
b. Find the total cost of 9000 stickers.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 33

Question 34.
MODELING WITH MATHEMATICS
You pay a processing fee and a daily fee to rent a beach house. The table shows the total cost of renting the beach house for different numbers of days.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 33
a. Can the situation be modeled by a linear equation? Explain.
b. What is the processing fee? the daily fee?
c. You can spend no more than $1200 on the beach house rental. What is the maximum number of days you can rent the beach house?

Answer:
a. Because the y values increase at a constant rate, the data can be modeled by a linear equation.
b. The processing fee is 42 and the daily fee is 102.
c. You can spend at least 11 days on the beach house rental with $1200

Explanation:
a. \(\frac { 450 – 246 }{ 4 – 2 } \) = 102
\(\frac { 654 – 450 }{ 6 – 4 } \) = 102
\(\frac { 858 – 654 }{ 8 – 6 } \) = 102
b. (y – 246) = 102(x – 2)
y – 246 = 102x – 204
y = 102x + 42
So, the processing fee is 42 and the daily fee is 102.
c. 102x + 42 < 1200
102x < 1158
x < 11.3
So, you can spend at least 11 days on the beach house rental with $1200

Question 35.
WRITING
Describe two ways to graph the equation y – 1 = \(\frac{3}{2}\)(x – 4).
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 35.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 35.2

Question 36.
THOUGHT PROVOKING
The graph of a linear function passes through the point (12, -5) and has a slope of \(\frac{2}{5}\). Represent this function in two other ways.

Answer:
f(x) = \(\frac{2}{5}\)x – \(\frac{49}{5}\)

Explanation:
y + 5 = \(\frac{2}{5}\)(x – 12)
y + 5 = \(\frac{2}{5}\)x – \(\frac{24}{5}\)
y = \(\frac{2}{5}\)x – \(\frac{49}{5}\)
f(x) = \(\frac{2}{5}\)x – \(\frac{49}{5}\)

Question 37.
REASONING
You are writing an equation of the line that passes through two points that are not on the y-axis. Would you use slope-intercept form or point-slope form to write the equation? Explain.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 37

Question 38.
HOW DO YOU SEE IT? The graph shows two points that lie on the graph of a linear function.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 34
a. Does the y-intercept of the graph of the linear function appear to be positive or negative? Explain.
b. Estimate the coordinates of the two points. How can you use your estimates to confirm your answer in part (a)?

Answer:
a. y-intercept is negative.

Explanation:
a. Points are (4, 1.5), (8, 4)
m = \(\frac { 4 – 1.5 }{ 8 – 4 } \) = \(\frac { 2.5 }{ 4 } \)
y – 4 = \(\frac { 2.5 }{ 4 } \)(x – 8)
y = \(\frac { 2.5 }{ 4 } \)x – 5 + 4
y = \(\frac { 2.5 }{ 4 } \)x – 1

Question 39.
CONNECTION TO TRANSFORMATIONS
Compare the graph of y = 2x to the graph of y – 1 = 2(x + 3). Make a conjecture about the graphs of y = mx and y – k = m(x – h).
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 39

Question 40.
COMPARING FUNCTIONS
Three siblings each receive money for a holiday and then spend it at a constant weekly rate. The graph describes Sibling A’s spending, the table describes Sibling B’s spending, and the equation y = -22.5x + 90 describes Sibling C’s spending. The variable y represents the amount of money left after x weeks.
Big Ideas Math Answer Key Algebra 1 Chapter 4 Writing Linear Functions 35
a. Which sibling received the most money? the least money?
b. Which sibling spends money at the fastest rate? the slowest rate?
c. Which sibling runs out of money first? last?

Answer:
a. Sibling C received the most money and Sibling A received the less money.
b. Sibling B spends the amount at the fastest rate and Sibling A spend the amount at the slowest rate.
c. Sibling A runs out of money first, Sibling C runs out of money last.

Explanation:
m = \(\frac{20 – 50}{4 – 2}\) = -15
y – 20 = -15(x – 4)
y = -15x + 60 + 20
y = -15x + 80 is the sibling A spending
m = -25
y – 100 = -25(x – 1)
y = -25x + 25 + 100
y = -25x + 125 is the sibling B spending
y = -22.5x + 90 is sibling C spending
After 10 weeks,
Sibling A amount left is y = -15(10) + 80 = -70
Sibling B amount left is y = -25(10) + 125 = -125
Sibling C amount left is y = -22.5(10) + 90 = -135

Maintaining Mathematical Proficiency

Write the reciprocal of the number.

Question 41.
5
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 41

Question 42.
-8

Answer:
The reciprocal of -8 is \(\frac { -1 }{ 8 } \)

Question 43.
–\(\frac{2}{7}\)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.2 Question 43

Question 44.
\(\frac{3}{2}\)

Answer:
The reciprocal of \(\frac{3}{2}\) is \(\frac{2}{3}\)

Lesson 4.3 Writing Equations of Parallel and Perpendicular Lines

Essential Equation
How can you recognize lines that are parallel or perpendicular?

EXPLORATION 1
Recognizing Parallel Lines
Work with a partner.
Write each linear equation in slope-intercept form. Then use a graphing calculator to graph the three equations in the same square viewing window. (The graph of the first equation is shown.) Which two lines appear parallel? How can you tell?
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 36

EXPLORATION 2
Recognizing Perpendicular Lines
Work with a partner.
Write each linear equation in slope-intercept form. Then use a graphing calculator to graph the three equations in the same square viewing window. (The graph of the first equation is shown.) Which two lines appear perpendicular? How can you tell?
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 37

Communicate Your Answer

Question 3.
How can you recognize lines that are parallel or perpendicular?

Answer:
If the slopes of two lines are equal, then they are parallel lines.
If the slope of one line is the negative reciprocal of the second line, then the lines are perpendicular.

Question 4.
Compare the slopes of the lines in Exploration 1. How can you use slope to determine whether two lines are parallel? Explain your reasoning.

Answer:
Slopes are \(\frac { -3 }{ 4 } \), \(\frac { -5 }{ 2 } \)
The slopes are not equal.
So, the lines are not parallel.

Question 5.
Compare the slopes of the lines in Exploration 2. How can you use slope to determine whether two lines are perpendicular? Explain your reasoning.

Answer:
Slopes are \(\frac { -3 }{ 4 } \), \(\frac { -2 }{ 5 } \)
the slopes are not negative reciprocals.
So, the lines are not perpendicular.

4.3 Lesson

Question 1.
Line a passes through (-5, 3) and (-6, -1). Line b passes through (3, -2) and (2, -7). Are the lines parallel? Explain.

Answer:
The lines are not parallel

Explanation:
Line a slope m = \(\frac { -1 – 3 }{ -6 + 5 } \) = 4
Line b slope M = \(\frac { -7 + 2 }{ 2 – 3 } \) = 5
The slopes are not equal.
so, the lines are not parallel

Question 2.
Write an equation of the line that passes through (-4, 2) and is parallel to the line y = \(\frac{1}{4}\)x + 1

Answer:
The equation of the line is y = \(\frac{1}{4}\)x + 3

Explanation:
The line is parallel to y = \(\frac{1}{4}\)x + 1
So, the line slope is \(\frac{1}{4}\)
The equation of the line  is (y – 2) = \(\frac{1}{4}\)(x + 4)
y = \(\frac{1}{4}\)x + 1 + 2
y = \(\frac{1}{4}\)x + 3

Monitoring Progress

Question 3.
Determine which of the lines, if any, are parallel or perpendicular. Explain.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 38

Answer:
Line b, c are parallel and line a, b and a, c are perpendicular.

Explanation:
Line a is 6y = -3 – 2x
y = \(\frac { -1 }{ 3 } \)x – \(\frac { 1 }{ 2 } \)
Slope is \(\frac { -1 }{ 3 } \)
line b slope is 3
line c is 18x – 9 = 6y
y = 3x – \(\frac { 3 }{ 2 } \)
slope is 3
So, line b, c are parallel and line a, b and a, c are perpendicular.

Question 4.
Write an equation of the line that passes through (-3, 5) and is perpendicular to the line y = -3x – 1.

Answer:
The equation is y = \(\frac { 1 }{ 3 } \)x + 6

Explanation:
The slope of a line perpendicular to y = -3x – 1 is \(\frac { 1 }{ 3 } \)
y – 5 = \(\frac { 1 }{ 3 } \)(x + 3)
y = \(\frac { 1 }{ 3 } \)x + 1 + 5
y = \(\frac { 1 }{ 3 } \)x + 6

Question 5.
In Example 5, a boat is traveling parallel to the shoreline and passes through (9, 3). Write an equation that represents the path of the boat.

Answer:
The equation that represents the path of the boat is y = \(\frac { -2 }{ 3 } \)x + 9.

Explanation:
The boat is travelling parallel to the shoreline. So, the slope of the shoreline is \(\frac { -2 }{ 3 } \)
The equation of line is y – 3 = \(\frac { -2 }{ 3 } \)(x – 9)
y – 3 = \(\frac { -2 }{ 3 } \)x + 6
y = \(\frac { -2 }{ 3 } \)x + 9

Writing Equations of Parallel and Perpendicular Lines 4.3 Exercises

Vocabulary and Core Concept Check

Question 1.
COMPLETE THE SENTENCE
Two distinct nonvertical lines that have the same slope are ____.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 1

Question 2.
VOCABULARY
Two lines are perpendicular. The slope of one line is –\(\frac{5}{7}\). What is the slope of the other line? Justify your answer.

Answer:
The slope of the perpendicular line is \(\frac{7}{5}\)

Monitoring Progress and Modeling with Mathematics

In Exercises 3–8, determine which of the lines, if any, are parallel. Explain.

Question 3.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 39
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 3

Question 4.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 40

Answer:
Lines b , c are parallel

Explanation:
Line a slope = \(\frac { 0 – 5 }{ 2 – 0 } \) = \(\frac { -5 }{ 2 } \)
Line b slope = \(\frac { 0 – 4 }{ 5 – 3 } \) = -2
Line c slope = \(\frac { 4 – 6 }{ 5 – 4 } \) = -2
Lines b , c are parallel

Question 5.
Line a passes through (-1, -2) and (1, 0).
Line b passes through (4, 2) and (2, -2).
Line c passes through (0, 2) and (-1, 1).
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 5

Question 6.
Line a passes through (-1, 3) and (1, 9).
Line b passes through (-2, 12) and (-1, 14).
Line c passes through (3, 8) and (6, 10).

Answer:
No lines are parallel

Explanation:
Line a slope = \(\frac { 9 – 3 }{ 1 + 1 } \) = 3
Line b slope = \(\frac { 14 – 12 }{ -1 + 2 } \) = 2
Line c slope = \(\frac { 10 – 8 }{ 6 – 3 } \) = \(\frac { 2 }{ 3 } \)
No lines are parallel. Because they have different slopes.

Question 7.
Line a: 4y + x = 8
Line b: 2y + x = 4
Line c: 2y = -3x + 6
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 7.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 7.2

Question 8.
Line a: 3y – x = 6
Line b: 3y = x + 18
Line c: 3y – 2x = 9

Answer:
Lines a, b are parallel. Because they have the same slope.

Explanation:
Line a slope = \(\frac { 1 }{ 3 } \)
Line b slope = \(\frac { 1 }{ 3 } \)
Line c slope = \(\frac { 2 }{ 3 } \)
Lines a, b are parallel. Because they have the same slope.

In Exercises 9–12, write an equation of the line that passes through the given point and is parallel to the given line.

Question 9.
(-1, 3); y = 2x + 2
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 9

Question 10.
(1, 2); y = -5x + 4

Answer:
The equation of line is y = -5x + 7

Explanation:
The slope of the line is -5 as it is parallel to y = -5x + 4
y – 2 = -5(x – 1)
y = -5x + 5 + 2
y = -5x + 7

Question 11.
(18, 2); 3y – x = -12
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 11

Question 12.
(2, -5); 2y = 3x + 10

Answer:
The equation of the line is y = \(\frac { 3 }{ 2 } \)x – 8

Explanation:
The slope of the line is \(\frac { 3 }{ 2 } \) as it is parallel to 2y = 3x + 10
y + 5 = \(\frac { 3 }{ 2 } \)(x – 2)
y = \(\frac { 3 }{ 2 } \)x – 3 – 5
y = \(\frac { 3 }{ 2 } \)x – 8

In Exercises 13–18, determine which of the lines, if any, are parallel or perpendicular. Explain.

Question 13.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 41
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 13

Question 14.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 42

Answer:
Red and blue lines are parallel as they have the same slope.

Explanation:
Green line slope = \(\frac { 5 – 0 }{ 2 – 0 } \) = \(\frac { 5 }{ 2 } \)
Red line slope = \(\frac { 4 – 5 }{ 3 – 0 } \) = \(\frac { -1 }{ 3 } \)
Blue line slope = \(\frac { 0 – 1 }{ 2 + 1 } \) = \(\frac { -1 }{ 3 } \)
Red and blue lines are parallel as they have the same slope.

Question 15.
Line a passes through (-2, 1) and (0, 3).
Line b passes through (4, 1) and (6, 4).
Line c passes through (1, 3) and (4, 1).
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 15

Question 16.
Line a passes through (2, 10) and (4, 13).
Line b passes through (4, 9) and (6, 12).
Line c passes through (2, 10) and (4, 9).

Answer:
Lines a, b are parallel as they have the same slope.

Explanation:
Line a slope = \(\frac { 13 – 10 }{ 4 – 2 } \) = \(\frac { 3 }{ 2 } \)
Line b slope = \(\frac { 12  – 9}{ 6 – 4 } \) = \(\frac { 3 }{ 2 } \)
Line c slope = \(\frac { 9 – 10 }{ 4 – 2 } \) = \(\frac { -1 }{ 2 } \)
Lines a, b are parallel as they have the same slope.

Question 17.
Line a: 4x – 3y = 2
Line b: y = \(\frac{4}{3}\)x + 2
Line c: 4y + 3x = 4
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 17

Question 18.
Line a: y = 6x – 2
Line b: 6y = -x
Line c: y + 6x = 1

Answer:
The lines a, b are perpendicular.

Explanation:
Line a slope = 6
Line b slope = \(\frac { -1 }{ 6 } \)
Line c slope = -6
The lines a, b are perpendicular.

In Exercises 19–22, write an equation of the line that passes through the given point and is perpendicular to the given line.

Question 19.
(7, 10); y = \(\frac{1}{2}\)x – 9
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 19

Question 20.
(-4, -1); y = \(\frac{4}{3}\)x + 6

Answer:
Equation of the perpendicular line is y = \(\frac{-3}{4}\)x – 4

Explanation:
Slope of the given line is \(\frac{4}{3}\)
Slope of the perpendicular line is \(\frac{-3}{4}\)
Equation of the perpendicular line is (y + 1) = \(\frac{-3}{4}\)(x + 4)
y = \(\frac{-3}{4}\)x – 3 – 1
y = \(\frac{-3}{4}\)x – 4

Question 21.
(-3, 3); 2y = 8x – 6
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 21

Question 22.
(8, 1); 2y + 4x = 12

Answer:
The equation of the perpendicular line is y = \(\frac { 1 }{ 2 } \)x – 3

Explanation:
2y + 4x = 12
2y = -4x + 12
y = -2x + 6
The slope of the given line is -2
The slope of the perpendicular line is \(\frac { 1 }{ 2 } \)
The equation of the perpendicular line is (y – 1) = \(\frac { 1 }{ 2 } \)(x – 8)
y – 1 = \(\frac { 1 }{ 2 } \)x – 4
y = \(\frac { 1 }{ 2 } \)x – 3

In Exercises 23 and 24, write an equation of the line that passes through the given point and is (a) parallel and(b) perpendicular to the given line.

Question 23.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 43
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 23

Question 24.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 44

Answer:
a. The equation of the parallel line is y = 3x – 11
b. the equation of the perpendicular line is y = \(\frac { -1 }{ 3 } \)x – 1

Explanation:
The points on the line are (1, -4) and (2, -1)
The slope of the line = \(\frac { -1 + 4 }{ 2 – 1 } \) = 3
a. The slope of the parallel line is 3
y + 2 = 3(x – 3)
y = 3x – 9 – 2
y = 3x – 11
b. The slope of the perpendicular line is \(\frac { -1 }{ 3 } \)
y + 2 = \(\frac { -1 }{ 3 } \)(x – 3)
y = \(\frac { -1 }{ 3 } \)x + 1 – 2
y = \(\frac { -1 }{ 3 } \)x – 1

Question 25.
ERROR ANALYSIS
Describe and correct the error in writing an equation of the line that passes through (1, 3) and is parallel to the line y = \(\frac{1}{4}\)x + 2.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 45
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 25

Question 26.
ERROR ANALYSIS
Describe and correct the error in writing an equation of the line that passes through (4, -5) and is perpendicular to the line y = \(\frac{1}{3}\)x + 5.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 46
Answer:
The perpendicular line slope is -3
y + 5 = -3(x – 4)
y + 5 = -3x + 12
y = -3x + 12 – 5
y = -3x + 7

Question 27.
MODELING WITH MATHEMATICS
A city water department is proposing the construction of a new water pipe, as shown. The new pipe will be perpendicular to the old pipe. Write an equation that represents the new pipe.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 47
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 27

Question 28.
MODELING WITH MATHEMATICS
A parks and recreation department is constructing a new bike path. The path will be parallel to the railroad tracks shown and pass through the parking area at the point (4, 5). Write an equation that represents the path.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 48

Answer:
The equation that represents the path is y = \(\frac { 4 }{ 3 } \)x – \(\frac { 1 }{ 3 } \)

Explanation:
The slope of line = \(\frac { 0 – 4 }{ 8 – 11 } \) = \(\frac { 4 }{ 3 } \)
The slope of the parallel line is \(\frac { 4 }{ 3 } \)
The equation of the line represents path is (y – 5) = \(\frac { 4 }{ 3 } \)(x – 4)
y – 5 = \(\frac { 4 }{ 3 } \)x – \(\frac { 16 }{ 3 } \)
y = \(\frac { 4 }{ 3 } \)x – \(\frac { 16 }{ 3 } \) + 5
y = \(\frac { 4 }{ 3 } \)x – \(\frac { 1 }{ 3 } \)

Question 29.
MATHEMATICAL CONNECTIONS
The vertices of a quadrilateral are A(2, 2), B(6, 4), C(8, 10), and D(4, 8).
a. Is quadrilateral ABCD a parallelogram? Explain.
b. Is quadrilateral ABCD a rectangle? Explain.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 29.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 29.2

Question 30.
USING STRUCTURE
For what value of a are the graphs of 6y = -2x + 4 and 2y = ax – 5 parallel? perpendicular?

Answer:
If a = \(\frac { -2 }{ 3 } \), the lines are parallel
If a = 6, then lines are perpendicular

Explanation:
6y = -2x + 4
y = \(\frac { -1 }{ 3 } \)x + \(\frac { 2 }{ 3 } \)
The slope of first line is \(\frac { -1 }{ 3 } \)
Second line is 2y = ax – 5
y = \(\frac { a }{ 2 } \) – \(\frac { 5 }{ 2 } \)
Two lines are parallel means they have the same slope
\(\frac { a }{ 2 } \) = \(\frac { -1 }{ 3 } \)
a = \(\frac { -2 }{ 3 } \)
If \(\frac { a }{ 2 } \) = 3, then lines are perpendicular
a = 6

Question 31.
MAKING AN ARGUMENT
A hockey puck leaves the blade of a hockey stick, bounces off a wall, and travels in a new direction, as shown. Your friend claims the path of the puck forms a right angle. Is your friend correct? Explain.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 49
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 31

Question 32.
HOW DO YOU SEE IT?
A softball academy charges students an initial registration fee plus a monthly fee. The graph shows the total amounts paid by two students over a 4-month period. The lines are parallel.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 50
a. Did one of the students pay a greater registration fee? Explain.
b. Did one of the students pay a greater monthly fee? Explain.

Answer:

REASONING
In Exercises 33–35, determine whether the statement is always, sometimes, or never true. Explain your reasoning.

Question 33.
Two lines with positive slopes are perpendicular.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 33

Question 34.
A vertical line is parallel to the y-axis.

Answer:
Always, Since the equation of the vertical line is in the form x = a, where a is any number.
The equation of the y-axis is x = 0
Therefore, the vertical line always parallel to the y-axis

Question 35.
Two lines with the same y-intercept are perpendicular.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 35

Question 36.
THOUGHT PROVOKING
You are designing a new logo for your math club. Your teacher asks you to include at least one pair of parallel lines and at least one pair of perpendicular lines. Sketch your logo in a coordinate plane. Write the equations of the parallel and perpendicular lines.

Answer:
Have been sketched a trapezoid with vertex at A(0, 0), B(0, 2), C(1, 1) and D(0, 1)
This quadrilateral has two parallel lines y = 0 and y = 1 and a vertical line x = 0, which is perpendicular to both horizontal lines.

Explanation:
Here, you can design a logo with a rectangle, a square, a diamond or with a simple trapezoid with a right angle. In the figure have been sketched a trapezoid with vertex at A(0, 0), B(0, 2), C(1, 1) and D(0, 1)
This quadrilateral has two parallel lines y = 0 and y = 1 and a vertex line x = 0 which is perpendicular to both horizontal lines.
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 1

Maintaining Mathematical Proficiency

Determine whether the relation is a function. Explain. (Section 3.1)

Question 37.
(3, 6), (4, 8), (5, 10), (6, 10), (7, 14)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.3 Question 37

Question 38.
(-1, 6), (1, 4), (-1, 2), (1, 6), (-1, 5)

Answer:
Yes, each x-value is paired with exactly one y-value. So, the relation is a function.

Writing Linear Functions Study Skills: Getting Actively Involved in Class

4.1–4.3 What Did You Learn

Core Vocabulary
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 51

Core Concepts

Section 4.1
Using Slope-Intercept Form, p. 176

Section 4.2
Using Point-Slope Form, p. 182

Section 4.3
Parallel Lines and Slopes, p. 188
Perpendicular Lines and Slopes, p. 189

Mathematical Practices

Question 1.
How can you explain to yourself the meaning of the graph in Exercise 36 on page 180?

Answer:
The graph has tears on the x-axis and revenue on the y-axis. The graph represents approximate U.S box office revenues from 2000 to 2012.

Question 2.
How did you use the structure of the equations in Exercise 39 on page 186 to make a conjecture?

Answer:

Question 3.
How did you use the diagram in Exercise 31 on page 192 to determine whether your friend was correct?

Study Skills

Getting Actively Involved in Class

If you do not understand something at all and do not even know how to phrase a question, just ask for clarification. You might say something like, “Could you please explain the steps in this problem one more time?”If your teacher asks for someone to go up to the board, volunteer. The student at the board often receives additional attention and instruction to complete the problem.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 52

Writing Linear Functions 4.1 – 4.3

4.1 – 4.3 Quiz

Write an equation of the line in slope-intercept form. (Section 4.1)

Question 1.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 53

Answer:
The equation of the line is y = 5x – 2

Explanation:
Slope m = \(\frac { 3 + 2 }{ 1 – 0 } \) = 5
y = mx + b
3 = 5(1) + b
b = -2
The equation of the line is y = 5x – 2

Question 2.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 54

Answer:
The equation of the line is y = \(\frac { -1 }{ 3 } \)x + 5

Explanation:
Slope m = \(\frac { 5 – 4 }{ 0 – 3 } \) = \(\frac { -1 }{ 3 } \)
y = mx + b
5 = \(\frac { -1 }{ 3 } \)(0) + b
b = 5
The equation of the line is y = \(\frac { -1 }{ 3 } \)x + 5

Question 3.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 55

Answer:
The equation of the line is y = -2x

Explanation:
Slope m = \(\frac { 4 – 0 }{ -2 – 0 } \) = -2
y = mx + b
4 = -2(-2) + b
4 = 4 + b
b = 0
The equation of the line is y = -2x

Write an equation in point-slope form of the line that passes through the given points. (Section 4.2)

Question 4.
(-2, 5), (1, -1)

Answer:
The equation is y – 5 = -2(x + 2)

Explanation:
Slope m = \(\frac { -1 – 5 }{ 1 + 2 } \) = -2
(y – y₁) = m(x – x₁)
y – 5 = -2(x + 2)
The equation is y – 5 = -2(x + 2)

Question 5.
(-3, -2), (2, -1)

Answer:
The equation is y + 2 = \(\frac { 1 }{ 5 } \)(x + 3)

Explanation:
Slope m = \(\frac { -1 + 2 }{ 2 + 3 } \) = \(\frac { 1 }{ 5 } \)
(y – y₁) = m(x – x₁)
y + 2 = \(\frac { 1 }{ 5 } \)(x + 3)
The equation is y + 2 = \(\frac { 1 }{ 5 } \)(x + 3)

Question 6.
(1, 0), (4, 4)

Answer:
The equation is y  – 0 = \(\frac { 3 }{ 4 } \)(x – 1)

Explanation:
Slope m = \(\frac { 4 – 1 }{ 4 – 0 } \) = \(\frac { 3 }{ 4 } \)
(y – y₁) = m(x – x₁)
y  – 0 = \(\frac { 3 }{ 4 } \)(x – 1)
The equation is y  – 0 = \(\frac { 3 }{ 4 } \)(x – 1)

Write a linear function f with the given values. (Section 4.1 and Section 4.2)

Question 7.
f(0) = 2, f(5) = -3

Answer:
The linear function is f(x) = 2 – x

Explanation:
Rewrite f(0) = 2 as (0, 2), f(5) = -3 as (5, -3)
Slope m = \(\frac { -3 – 2 }{ 5 – 0 } \) = -1
(y – y₁) = m(x – x₁)
y – 2 = -1(x – 0)
y – 2 = -x
y = -x + 2
f(x) = 2 – x

Question 8.
f(-1) = -6, f(4) = -6

Answer:
The linear function is f(x) = \(\frac { -12 }{ 5 } \)x + \(\frac { 18 }{ 5 } \)

Explanation:
Rewrite f(-1) = -6 as (-1, 6), f(4) = -6 as (4, -6)
Slope m = \(\frac { -6 – 6 }{ 4 + 1 } \) = \(\frac { -12 }{ 5 } \)
(y – y₁) = m(x – x₁)
y – 6 = \(\frac { -12 }{ 5 } \)(x + 1)
y = \(\frac { -12 }{ 5 } \)x – \(\frac { 12 }{ 5 } \) + 6
y = \(\frac { -12 }{ 5 } \)x + \(\frac { 18 }{ 5 } \)
f(x) = \(\frac { -12 }{ 5 } \)x + \(\frac { 18 }{ 5 } \)

Question 9.
f(-3) = -2, f(-2) = 3

Answer:
The linear function is f(x) = x + 5

Explanation:
Rewrite f(-3) = -2 as (-3, 2), f(-2) = 3 as (-2, 3)
Slope m = \(\frac { 3 – 2}{ -2 + 3 } \) = 1
(y – y₁) = m(x – x₁)
y – 2 = 1(x + 3)
y = x + 3 + 2
y = x + 5
f(x) = x + 5

Determine which of the lines, if any, are parallel or perpendicular. Explain. (Section 4.3)

Question 10.
Line a passes through (-2, 2) and (2, 1).
Line b passes through (1, -8) and (3, 0).
Line c passes through (-4, -3) and (0, -2).

Answer:
Lines a, b are perpendicular

Explanation:
Line a slope = \(\frac { 1 – 2 }{ 2 + 2 } \) = \(\frac { -1 }{ 4 } \)
Line b slope = \(\frac { 0 + 8 }{ 3 – 1 } \) = 4
Line c slope = \(\frac { -2 + 3 }{ 0 + 4 } \) = \(\frac { 1 }{ 4 } \)
Lines a, b are perpendicular as their slopes are negative reciprocals.

Question 11.
Line a: 2x + 6y = -12
Line b: y = \(\frac{3}{2}\)x – 5
Line c : 3x – 2y = -4

Answer:
Lines b, c are parallel.

Explanation:
6y = -2x – 12
y = \(\frac { -1 }{ 3 } \)x – 2
Line a slope = \(\frac { -1 }{ 3 } \)
Line b slope = \(\frac{3}{2}\)
3x + 4 = 2y
y = \(\frac{3}{2}\)x + 2
Line c slope = \(\frac{3}{2}\)
Lines b, c are parallel.

Write an equation of the line that passes through the given point and is (a) parallel and (b) perpendicular to the given line. (Section 4.3)

Question 12.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 56

Answer:
a. y = 3x – 16
b. y = \(\frac { -1 }{ 3 } \)x + 4

Explanation:
The points on the lines are (1, -1), (2, 2)
Slope of the line = \(\frac { 2 + 1 }{ 2 – 1 } \) = 3
Slope of the parallel line is 3
Equation of parallel line is y – 2 = 3(x – 6)
y = 3x – 18 + 2
y = 3x – 16
Slope of the perpendicular line is \(\frac { -1 }{ 3 } \)
Equation of the perpendicular line is y – 2 = \(\frac { -1 }{ 3 } \)(x – 6)
y = \(\frac { -1 }{ 3 } \)x + 2 + 2
y = \(\frac { -1 }{ 3 } \)x + 4

Question 13.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 57

Answer:
a. y = \(\frac { -1 }{ 2 } \) – 4
b. y = 2x + 1

Explanation:
The points on the lines are (2, 1), (-2, 3)
Slope of the line = \(\frac { 3 – 1 }{ -2 – 2 } \) = \(\frac { -1 }{ 2 } \)
Slope of the parallel line is \(\frac { -1 }{ 2 } \)
Equation of parallel line is y + 3 = \(\frac { -1 }{ 2 } \)(x + 2)
y = \(\frac { -1 }{ 2 } \)x – 1 – 3
y = \(\frac { -1 }{ 2 } \) – 4
Slope of the perpendicular line is 2
Equation of the perpendicular line is y + 3 = 2(x + 2)
y + 3 = 2x + 4
y = 2x + 4 – 3
y = 2x + 1

Question 14.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 58

Answer:
a. y = -4x – 16
b. y = \(\frac { 1 }{ 4 } \)x + 1

Explanation:
The points on the lines are (-3, 3), (-2, -1)
Slope of the line = \(\frac { -1 – 3 }{ -2 + 3 } \) = -4
Slope of the parallel line is -4
Equation of parallel line is y – 0 = -4(x + 4)
y = -4x – 16
Slope of the perpendicular line is \(\frac { 1 }{ 4 } \)
Equation of the perpendicular line is y – 0 = \(\frac { 1 }{ 4 } \)(x + 4)
y = \(\frac { 1 }{ 4 } \)x + 1

Question 15.
A website hosting company charges an initial fee of $48 to set up a website. The company charges $44 per month to maintain the website. (Section 4.1)
a. Write a linear model that represents the total cost of setting up and maintaining a website as a function of the number of months it is maintained.
b. Find the total cost of setting up a website and maintaining it for 6 months.
c. A different website hosting company charges $62 per month to maintain a website, but there is no initial set-up fee. You have $620. At which company can you set up and maintain a website for the greatest amount of time? Explain.

Answer:
a. The linear model that represents the total cost is y = 44x + 48
b. The total cost for 6 months is $312.
c. The first company can set up and maintain a website for 13 months.

Explanation:
a. Let y be the cost and x be the number of months
Since the company charges 44 per month, the slope of the line is m = 44
Since the company charges an initial fee of 48, the y-intercept is b = 48
Use the slope-intercept formula
So, y = 44x + 48
Therefore, the linear model that represents the total cost is y = 44x + 48
b. To find the total cost for 6 months
substitute x = 6 into the equation
y = 44(6) + 48
y = 312
Therefore, the total cost for 6 months is $312.
c. Since you have $620
Substitute y = 620 into the two equations
y = 44x + 48
620 = 44x + 48
x = 13
Therefore, the first company with an initial fee of $48 and $44 per month can set up and maintain a website for 13 months
y = 62x
620 = 62x
x = 10
Therefore, the second company with a charge of $62 per month can set up and maintain a website for 10 months.

Question 16.
The table shows the amount of water remaining in a water tank as it drains. Can the situation be modeled by a linear equation? Explain. If possible, write a linear model that represents the amount of water remaining in the tank as a function of time. (Section 4.2)
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 59

Answer:
The linear equation is y = \(\frac { -5 }{ 2 } \)x + 159

Explanation:
\(\frac { 150 – 155 }{ 10 – 8 } \) = \(\frac { -5 }{ 2 } \)
\(\frac { 145 – 150 }{ 12 – 10 } \) = \(\frac { -5 }{ 2 } \)
\(\frac { 140 – 145 }{ 14 – 12 } \) = \(\frac { -5 }{ 2 } \)
\(\frac { 135 – 140 }{ 6 – 14 } \) = \(\frac { -5 }{ 2 } \)
So, the data can be modeled by a linear equation
Slope = \(\frac { -5 }{ 2 } \)
y – 155 = \(\frac { -5 }{ 2 } \)(x – 8)
y = \(\frac { -5 }{ 2 } \)x + 4 + 155
y = \(\frac { -5 }{ 2 } \)x + 159

Lesson 4.4 Scatter Plots and Lines of Fit

Essential Question

How can you use a scatter plot and a line of fit to make conclusions about data?
A scatter plot is a graph that shows the relationship between two data sets. The two data sets are graphed as ordered pairs in a coordinate plane.

EXPLORATION 1
Finding a Line of Fit
Work with a partner.
A survey was taken of 179 married couples. Each person was asked his or her age. The scatter plot shows the results.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 60
a. Draw a line that approximates the data. Write an equation of the line. Explain the method you used.
b. What conclusions can you make from the equation you wrote? Explain your reasoning.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 61

EXPLORATION 2
Work with a partner.
The scatter plot shows the median ages of American women at their first marriage for selected years from 1960 through 2010.
a. Draw a line that approximates the data. Write an equation of the line. Explain the method you used.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 62
b. What conclusions can you make from the equation you wrote?
c. Use your equation to predict the median age of American women at their first marriage in the year 2020.

Communicate Your Answer

Question 3.
How can you use a scatter plot and a line of fit to make conclusions about data?

Question 4.
Use the Internet or some other reference to find a scatter plot of real-life data that is different from those given above. Then draw a line that approximates the data and write an equation of the line. Explain the method you used.

4.4 Lesson

Monitoring Progress

Question 1.
How many calories are in the smoothie that contains 51 grams of sugar?

Answer:
Draw a horizontal line from the point that has an x-value of 51. It crosses the y-axis at 260
So, 51 grams of sugar has 260 calories.

Question 2.
How many grams of sugar are in the smoothie that contains 250 calories?

Answer:
Draw a vertical line from the point that has a y-value of 250. It crosses the x-axis at 55.
So, the smoothie has 55 grams of sugar.

Make a scatter plot of the data. Tell whether the data show a positive, a negative, or no correlation.

Question 3.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 63

Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 1
The number of attendees increases as the average temperature increases.
So, the scatter plot shows a positive correlation.

Question 4.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 64

Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 2
As the age of car increases the value decreases.
So, the scatter plot shows a negative correlation.

Question 5.
The following data pairs show the monthly income x (in dollars) and the monthly car payment y (in dollars) of six people: (2100, 410), (1650, 315), (1950, 405), (1500, 295), (2250, 440), and (1800, 375). Write an equation that models the monthly car payment as a function of the monthly income. Interpret the slope and y-intercept of the line of fit.

Scatter Plots and Lines of Fit 4.4 Exercises

Question 1.
COMPLETE THE SENTENCE
When data show a positive correlation, the dependent variable tends to ____________ as the independent variable increases.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 1

Question 2.
VOCABULARY
What is a line of fit?

Answer:
A line on a graph showing the general direction that a group of points.

Monitoring Progress and Modeling with Mathematics

In Exercises 3–6, use the scatter plot to fill in the missing coordinate of the ordered pair.

Question 3.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 65
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 3

Question 4.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 203
Answer:
(3, 14)

Question 5.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 67
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 5

Question 6.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 69
Answer:
(8, 17)

Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 70

Question 7.
INTERPRETING A SCATTER PLOT
The scatter plot shows the hard drive capacities (in gigabytes) and the prices (in dollars) of 10 laptops.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 71
a. What is the price of the laptop with a hard drive capacity of 8 gigabytes?
b. What is the hard drive capacity of the $1200 laptop?
c. What tends to happen to the price as the hard drive capacity increases?
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 7

Question 8.
INTERPRETING A SCATTER PLOT
The scatter plot shows the earned run averages and the winning percentages of eight pitchers on a baseball team.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 72
a. What is the winning percentage of the pitcher with an earned run average of 4.2?
b. What is the earned run average of the pitcher with a winning percentage of 0.33?
c. What tends to happen to the winning percentage as the earned run average increases?

Answer:
a. 0.600 is the winning percentage of the pitcher with an earned run average of 4.2
b. 5 is the earned run average of the pitcher with a winning percentage of 0.33
c. As earned run average increase the winning percentage decreases.

In Exercises 9–12, tell whether x and y show a positive, a negative, or no correlation.

Question 9.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 73
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 9

Question 10.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 74

Answer:
The y-value tend to increase as the x-values increases. So, the scatter plot shows the positive correlation.

Question 11.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 75
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 11

Question 12.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 76

Answer:
The y value tend to decrease as the x-value increase. So, the scatter plot shows the negative correlation.

In Exercises 13 and 14, make a scatter plot of the data. Tell whether x and y show a positive, a negative, or no correlation.

Question 13.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 77
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 13

Question 14.
Big Ideas Math Algebra 1 Solutions Chapter 4 Writing Linear Functions 78

Answer:
As the x value increases, y value decreases. So, the scatter plot shows a negative correlation.

Question 15.
MODELING WITH MATHEMATICS
The table shows the world birth rates y (number of births per 1000 people) x years since 1960.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 79
a. Write an equation that models the birthrate as a function of the number of years since 1960.
b. Interpret the slope and y-intercept of the line of fit.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 15.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 15.2

Question 16.
MODELING WITH MATHEMATICS
The table shows the total earnings y (in dollars) of a food server who works x hours.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 80
a. Write an equation that models the server’s earnings as a function of the number of hours the server works.
b. Interpret the slope and y-intercept of the line of fit.

Answer:
a. y = 22x – 4
b. The slope is 22 and y-intercept is -4.

Explanation:
a. Use the points (1, 18), (2, 40)
m = \(\frac { 40 – 18 }{ 2 – 1 } \) = 22
y – 18 = 22(x – 1)
y – 18 = 22x – 22
y = 22x – 4

Question 17.
OPEN-ENDED
Give an example of a real-life data set that shows a negative correlation.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 17

Question 18.
MAKING AN ARGUMENT
Your friend says that the data in the table show a negative correlation because the dependent variable y is decreasing. Is your friend correct? Explain.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 81

Answer:
No, because as the x value increases, y value also increase. So, the scatter plot shows the positive correlation.

Question 19.
USING TOOLS
Use a ruler or a yardstick to find the heights and arm spans of five people.
a. Make a scatter plot using the data you collected. Then draw a line of fit for the data.
b. Interpret the slope and y-intercept of the line of fit.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 19.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 19.2

Question 20.
THOUGHT PROVOKING
A line of fit for a scatter plot is given by the equation y = 5x + 20. Describe a real-life data set that could be represented by the scatter plot.

Answer:

x 0 1 2 3
y 20 25 30 35

Explanation:
Substitute x = 0, y = 5(0) + 20 = 20
x = 1, y = 5(1) + 20 = 25
x = 2, y = 5(2) + 20 = 30
x = 3, y = 5(3) +20 = 35

Question 21.
WRITING
When is data best displayed in a scatter plot, rather than another type of display, such as a bar graph or circle graph?
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 21

Question 22.
HOW DO YOU SEE IT?
The scatter plot shows part of a data set and a line of fit for the data set. Four data points are missing. Choose possible coordinates for these data points.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 82

Answer:
By observing the graph the missing four data points are (10, 85), (14, 115), (16, 140), (18, 160)

Question 23.
REASONING
A data set has no correlation. Is it possible to find a line of fit for the data? Explain.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 23

Question 24.
ANALYZING RELATIONSHIPS
Make a scatter plot of the data in the tables. Describe the relationship between the variables. Is it possible to fit a line to the data? If so, write an equation of the line. If not, explain why.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 83

Answer:
As the slopes are different, it is not possible to fit a line to the data.

Explanation:
First table: \(\frac { 76 – 150 }{ -9 + 12 } \) = \(\frac { -74 }{ 3 } \)
\(\frac { 50 – 76 }{ -7 + 9 } \) = \(\frac { -26 }{ 2 } \)
Second table: \(\frac { 22 – 5 }{ 5 – 2 } \) = \(\frac { 17 }{ 3 } \)
\(\frac { 37 – 22 }{ 6 – 5 } \) = 15
As the slopes are different, it is not possible to fit a line to the data.

Maintaining Mathematical Proficiency

Evaluate the function when x = −3, 0, and 4. (Section 3.3)

Question 25.
g(x) = 6x
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 25

Question 26.
h(x) = -10x

Answer:
When x = -3, h(x) = 30
When x = 0, h(x) = 0
When x = 4, h(x) = -40

Explanation:
h(x) = -10x
h(-3) = -10(-3) = 30
h(0) = -10(0) = 0
h(4) = -10(4) = -40

Question 27.
f(x) = 5x – 8
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.4 Question 27

Question 28.
v(x) = 14 – 3x

Answer:
When x = -3, v(x) = 23
When x = 0, v(x) = 14
When x = 4, v(x) = 2

Explanation:
v(x) = 14 – 3x
v(-3) = 14 – 3(-3) = 14 + 9 = 23
v(0) = 14 – 3(0) = 14
v(4) = 14 – 3(4) = 14 – 12 = 2

Lesson 4.5 Analyzing Lines of Fit

Essential Question
How can you analytically find a line of best fit for a scatter plot?

EXPLORATION 1
Finding a Line of Best Fit
Work with a partner.

The scatter plot shows the median ages of American women at their first marriage for selected years from 1960 through 2010. In Exploration 2 in Section 4.4, you approximated a line of fit graphically. To find the line of best fit, you can use a computer, spreadsheet, or graphing calculator that has a linear regression feature.
a. The data from the scatter plot is shown in the table. Note that 0, 5, 10, and so on represent the numbers of years since 1960. What does the ordered pair (25, 23.3) represent?
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 84
b. Use the linear regression feature to find an equation of the line of best fit. You should obtain results such as those shown below.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 85
c. Write an equation of the line of best fit. Compare your result with the equation you obtained in Exploration 2 in Section 4.4.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 85.1

Communicate Your Answer

Question 2.
How can you analytically find a line of best fit for a scatter plot?

Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 86
Question 3.
The data set relates the number of chirps per second for striped ground crickets and the outside temperature in degrees Fahrenheit. Make a scatter plot of the data. Then find an equation of the line of best fit. Use your result to estimate the outside temperature when there are 19 chirps per second.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 87

4.5 Lesson

Monitoring Progress

Question 1.
The table shows the attendances y (in thousands) at an amusement park from 2005 to 2014, where x = 0 represents the year 2005. The equation y = -9.8x + 850 models the data. Is the model a good fit?
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 88

Answer:
The equation is y = -9.8x + 850 is not a good fit.

Explanation:
Calculate the residuals and organise your data in a table
Use the point x to make the scatter plot

x y y value from the model residual
0 850 850 850 – 850 = 0
1 845 840.2 845 – 840.2 = 4.8
2 828 830.4 828 – 830.4 = -2.4
3 798 820.6 798 – 820.6 = -22.6
4 800 810.8 800 – 810.8 = -10.8
5 792 801 792 – 801 = -9
6 785 791.2 785 – 791.5 = -6.2
7 781 781.4 781 – 781.4 = -0.4
8 775 771.6 775 – 771.6 = 3.4
9 760 761.8 760 – 761.8 = -1.8

The points are not evenly dispersed above the horizontal axis. So, the equation is y = -9.8x + 850 is not a good fit.

Question 2.
Use the data in Monitoring Progress Question 1.
(a) Use a graphing calculator to find an equation of the line of best fit. Then plot the data and graph the equation in the same viewing window.
(b) Identify and interpret the correlation coefficient.
(c) Interpret the slope and y-intercept of the line of best fit.

Answer:
b. Correlation coefficient is -0.9636. So, the relation is a strong negative correlation.
c. Slope is -9.58788, y-intercept is 844.54545

Explanation:
a. Using the linear regression feature the equation y = -9.8x + 850 can be rounded to y = -9.6X + 844
Slope = -9.58788
y-intercept is 844.54545
correlation coefficient r = -0.9636
 Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 1

Question 3.
Refer to Monitoring Progress Question 2. Use the equation of the line of best fit to predict the attendance at the amusement park in 2017.

Answer:
x = 732.4

Explanation:
y = -9.8x + 850
If x = 12, y = -9.8(12) + 850 = 732.4

Question 4.
Is there a correlation between time spent playing video games and grade point average? If so, is there a causal relationship? Explain your reasoning.

Analyzing Lines of Fit 4.5 Exercises

Vocabulary and Core Concept Check

Question 1.
VOCABULARY
When is a residual positive? When is it negative?
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 1

Question 2.
WRITING
Explain how you can use residuals to determine how well a line of fit models a data set.

Answer:
A residual is a measurement to determine how well a scatter plot’s data fits its trend line. The actual value is represented by the dot on the scatter plot. The predicted value is given by the trend line or line of best fit. This is they-value that the trend line guesses our data point will appear at.

Question 3.
VOCABULARY
Compare interpolation and extrapolation.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 3

Question 4.
WHICH ONE DOESN’T BELONG?
Which correlation coefficient does not belong with the other three? Explain your reasoning.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 89

Answer:
r = -0.09 does not belong with other three.

Monitoring Progress and Modeling with Mathematics

In Exercises 5–8, use residuals to determine whether the model is a good fit for the data in the table. Explain.

Question 5.
y = 4x – 5
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 90
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 5.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 5.2

Question 6.
y = 6x + 4
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 91

Answer:
Equation y = 6x + 4 is a good fit

Explantion:

x y y value from the model residual
1 13 10 13 – 10 = 3
2 14 16 14 – 16 = -2
3 23 22 23 – 22 = 1
4 26 28 26 – 28 = -2
5 31 34 31 – 34 = -3
6 42 40 42 – 40 = 2
7 45 46 45 – 46 = -1
8 52 52 52 – 52 = 0
9 62 58 62 – 58 = 4

Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 2
The points are even;y dispersed about the horizontal axis. So the equation is a good fit.

Question 7.
y = -1.3x + 1
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 92
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 7.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 7.2

Question 8.
y = -0.5x – 2
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 93

Answer:
The equation y = -0.5x – 2 is a good fit.

Explanation:

x y y value from the model residual
4 -1 -4 -1 + 4 = 3
6 -3 -5 -3 + 5 = 2
8 -6 -6 -6 + 6 = 0
10 -8 -7 -8 + 7 = -1
12 -10 -8 -10 + 8 = -2
14 -10 -9 -10 + 9 = -1
16 -10 -10 -10 + 10 = 0
18 -9 -11 -9 + 11 = 2
20 -9 -12 -9 + 12 = 3

 Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 3
The points are even;y dispersed about the horizontal axis. So the equation is a good fit.

Question 9.
ANALYZING RESIDUALS
The table shows the growth y (in inches) of an elk’s antlers during week x. The equation y = -0.7x + 6.8 models the data. Is the model a good fit? Explain.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 94
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 9

Question 10.
ANALYZING RESIDUALS
The table shows the approximate numbers y (in thousands) of movie tickets sold from January to June for a theater. In the table, x = 1 represents January. The equation y = 1.3x + 27 models the data. Is the model a good fit? Explain.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 95

Answer:
The equation y = 1.3x + 27 does not model the data well.

Explanation:

x y y value from the model residual
1 27 28.3 27 – 28.3 = -1.3
2 28 29.6 28 – 29.6 = -1.6
3 36 30.9 36 – 30.1 = 5.1
4 28 32.2 28 – 32.2 = -4.2
5 32 33.5 32 – 33.5 = -1.5
6 35 34.8 35 – 34.8 = 0.2

Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 4
Most of the residuals are below the horizontal axis. So, the equation does not model the data well.

In Exercises 11–14, use a graphing calculator to find an equation of the line of best fit for the data. Identify and interpret the correlation coefficient.

Question 11.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 96
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 11

Question 12.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 97

Answer:
After entering the data from the table into two lists using a graphing calculator, the linear regression feature yields the equation y = -1.3x + 7.7. The correlation coefficient is about -0.8858. This means the relationship between the dependant and independent variables has a strong negative correlation and the equation closely models the data.

Question 13.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 98
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 13

Question 14.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 99

Answer:
After entering the data from the table into two lists using a graphing calculator, the linear regression feature yields the equation y = -1x + 11.25. The correlation coefficient is about -0.4435. This means the relationship between the dependant and independent variables has a strong negative correlation and the equation closely models the data.

ERROR ANALYSIS
In Exercises 15 and 16, describe and correct the error in interpreting the graphing calculator display.

Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 100

Question 15.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 101
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 15

Question 16.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 102

Answer:
The data have a strong negative correlation.

Question 17.
MODELING WITH MATHEMATICS
The table shows the total numbers y of people who reported an earthquake x minutes after it ended.
a. Use a graphing calculator to find an equation of the line of best fit. Then plot the data and graph the equation in the same viewing window.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 103
b. Identify and interpret the correlation coefficient.
c. Interpret the slope and y-intercept of the line of best fit.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 17

Question 18.
MODELING WITH MATHEMATICS
The table shows the numbers y of people who volunteer at an animal shelter on each day x.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 104
a. Use a graphing calculator to find an equation of the line of best fit. Then plot the data and graph the equation in the same viewing window.
b. Identify and interpret the correlation coefficient.
c. Interpret the slope and y-intercept of the line of best fit.

Answer:
a.  Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 5
The equation is y = -2x + 19
b. correlation coefficient is 0.6193.
c. Slope is 1, y-intercept is 6.75.

Question 19.
MODELING WITH MATHEMATICS
The table shows the mileages x (in thousands of miles) and the selling prices y (in thousands of dollars) of several used automobiles of the same year and model.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 105
a. Use a graphing calculator to find an equation of the line of best fit.
b. Identify and interpret the correlation coefficient.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 106
c. Interpret the slope and y-intercept of the line of best fit.
d. Approximate the mileage of an automobile that costs $15,500. e. Predict the price of an automobile with 6000 miles.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 19.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 19.2

Question 20.
MODELING WITH MATHEMATICS
The table shows the lengths x and costs y of several sailboats.
a. Use a graphing calculator to find an equation of the line of best fit.
b. Identify and interpret the correlation coefficient.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 107
c. Interpret the slope and y-intercept of the line of best fit.
d. Approximate the cost of a sailboat that is 20 feet long.
e. Predict the length of a sailboat that costs $147,000.

Answer:
a. The line that best fit is y = 4.8x – 37.6
b. The correlation coefficient is 0.9357
c. Slope is 4.8 and y-intercept is -37.6
d. y = 4.8(20) – 37.6
y = 96 – 37.6 = 58.4
The cost of 20 feet long sailboat is 58.4 thousand dollars
e. 147 = 4.8x – 37.6
4.8x = 184.6
x = 38.45
So, the 38 ft long sailboat costs $147,000.

In Exercises 21–24, tell whether a correlation is likely in the situation. If so, tell whether there is a causal relationship. Explain your reasoning.

Question 21.
the amount of time spent talking on a cell phone and the remaining battery life
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 21

Question 22.
the height of a toddler and the size of the toddler’s vocabulary

Answer:
Positive correlation, but there is not a casual relationship.

Question 23.
the number of hats you own and the size of your head
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 23

Question 24.
the weight of a dog and the length of its tail

Answer:
There is no correlation between dog weight and its tail length.

Question 25.
OPEN-ENDED
Describe a data set that has a strong correlation but does not have a causal relationship.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 25

Question 26.
HOW DO YOU SEE IT?
Match each graph with its correlation coefficient. Explain your reasoning.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 108
Answer:

Question 27.
ANALYZING RELATIONSHIPS
The table shows the grade point averages y of several students and the numbers x of hours they spend watching television each week.
a. Use a graphing calculator to find an equation of the line of best fit. Identify and interpret the correlation coefficient.
b. Interpret the slope and y-intercept of the line of best fit.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 109
c. Another student watches about 14 hours of television each week. Approximate the student’s grade point average.
d. Do you think there is a causal relationship between time spent watching television and grade point average? Explain.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 27.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 27.2

Question 28.
MAKING AN ARGUMENT
A student spends 2 hours watching television each week and has a grade point average of 2.4. Your friend says including this information in the data set in Exercise 27 will weaken the correlation. Is your friend correct? Explain.

Answer:
No.
The correlation is -0.6672. Means a moderate negative correlation.

Question 29.
USING MODELS
Refer to Exercise 17.
a. Predict the total numbers of people who reported an earthquake 9 minutes and 15 minutes after it ended.
b. The table shows the actual data. Describe the accuracy of your extrapolations in part (a).
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 110
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 29.1

Question 30.
THOUGHT PROVOKING
A data set consists of the numbers x of people at Beach 1 and the numbers y of people at Beach 2 recorded daily for 1 week. Sketch a possible graph of the data set. Describe the situation shown in the graph and give a possible correlation coefficient. Determine whether there is a causal relationship. Explain.

Answer:
Here we show the table of data nad fitted line of graph. The correlation coeeficient is positive r = 0.96, but there is no casual relationship.

Explanation:
The table shows the number of people who attended beaches 1 and 2

Day People at Beach 1 People at Beach 2
1 16 15
2 21 18
3 25 30
4 36 41
5 47 39
6 83 71
7 79 90

These data were plotted on a coordinate axis system. A line was also graphed that fits the data function resulting
y = 0.97x + 099
You can also see the correlation is positive and the correlation coefficient is 0.96. Despite having a strong correlation, there is not necessarily a casual relationship.
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 6
Question 31.
COMPARING METHODS
The table shows the numbers y (in billions) of text messages sent each year in a five-year period, where x = 1 represents the first year in the five-year period.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 111
a. Use a graphing calculator to find an equation of the line of best fit. Identify and interpret the correlation coefficient.
b. Is there a causal relationship? Explain your reasoning.
c. Calculate the residuals. Then make a scatter plot of the residuals and interpret the results.
d. Compare the methods you used in parts (a) and (c) to determine whether the model is a good fit. Which method do you prefer? Explain.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 31.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 31.2
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 31.3

Maintaining Mathematical Proficiency

Determine whether the table represents a linear or nonlinear function. Explain. (Section 3.2)

Question 32.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 112

Answer:
Nonlinear function

Question 33.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 113
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.5 Question 33

Lesson 4.6 Arithmetic Sequences

Essential Question
How can you use an arithmetic sequence to describe a pattern?

An arithmetic sequence is an ordered list of numbers in which the difference between each pair of consecutive terms, or numbers in the list, is the same.

EXPLORATION 1
Describing a Pattern
Work with a partner.
Use the figures to complete the table. Plot the points given by your completed table. Describe the pattern of the y-values.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 114

Communicate Your Answer

Question 2.
How can you use an arithmetic sequence to describe a pattern? Give an example from real life.

Question 3.
In chemistry, water is called H2O because each molecule of water has two hydrogen atoms and one oxygen atom. Describe the pattern shown below. Use the pattern to determine the number of atoms in 23 molecules.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 115

4.6 Lesson

Monitoring Progress

Write the next three terms of the arithmetic sequence.

Question 1.
-12, 0, 12, 24, . . .

Answer:

Position 1 2 3 4 5 6 7
Term -12 0 12 24 36 48 60

Add -12 to the term to find the next term.
The next 3 terms are 36, 48, 60.

Question 2.
0.2, 0.6, 1, 1.4, . . .

Answer:

Position 1 2 3 4 5 6 7
Term 0.2 0.6 1 1.4 1.8 2.2 2.6

Add 0.4 to the term to get the next term.
The next 3 terms are 1.8, 2.2, 2.6

Question 3.
4, 3\(\frac{3}{4}\), 3\(\frac{1}{2}\), 3\(\frac{1}{4}\)

Answer:
Subtract 0.25 from each term to find next term

Position 1 2 3 4 5 6 7
Term 4 3(3/4) 3(1/2) 3(1/4) 3 2(3/4) 2(1/2)

The next 3 terms are 3, 2(3/4), 2(1/2)

Graph the arithmetic sequence. What do you notice?

Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 116

Question 4.
3, 6, 9, 12, . . .

Answer:

Position 1 2 3 4
Term 3 6 9 12

Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 1
The points lie on the same line.

Question 5.
4, 2, 0, -2, . . .

Answer:

Position 1 2 3 4
Term 4 2 0 -2

Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 2
The points lie on the same line

Question 6.
1, 0.8, 0.6, 0.4, . . .

Answer:

Position 1 2 3 4
Term 1 0.8 0.6 0.4

Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 3
The points lie on the same line.

Question 7.
Does the graph shown represent an arithmetic sequence? Explain.

Answer:
Yes.

Write an equation for the nth term of the arithmetic sequence. Then find a25.

Question 8.
4, 5, 6, 7, . . .

Answer:
The equation for nth term is an = 3 + n, a25 = 28

Explanation:
The nth term is an = a1 + (n – 1)d
an = 4 + (n – 1)1 = 4 + n – 1 = 3 + n
a25 = 3 + 25 = 28

Question 9.
8, 16, 24, 32, . . .

Answer:
The equation for nth term is an = 8n, a25 = 200

Explanation:
The nth term is an = a1 + (n – 1)d
an = 8 + (n – 1)8 = 8 + 8n – 8 = 8n
a25 = 8(25) = 200

Question 10.
1, 0, -1, -2, . . .

Answer:
The equation for nth term is an = n, a25 = 25

Explanation:
The nth term is an = a1 + (n – 1)d
an = 1 + (n – 1)1 = 1 + n – 1 = n
a25 = 25

Question 11.
A carnival charges $2 for each game after you pay a $5 entry fee.
a. Write a function that represents the arithmetic sequence.
b. Graph the function.
c. How many games can you play when you take $29 to the carnival?
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 117

Answer:
a. The function f(n) = 2n + 5 represents the arithmetic sequence.
b. Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 4
c. You can play 12 games when you take $29 to the carnival.

Explanation:
a. f(n) = a1 + (n – 1)d
f(n) = 7 + (n – 1)2
= 7 + 2n – 2 = 2n + 5
The function f(n) = 2n + 5 represents the arithmetic sequence.
c. 29 = 2n + 5
24 = 2n
n = 12

Arithmetic Sequences 4.6 Exercises

Vocabulary and Core Concept Check

Question 1.
WRITING
Describe the graph of an arithmetic sequence.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 1

Question 2.
DIFFERENT WORDS, SAME QUESTION
Consider the arithmetic sequence represented by the graph. Which is different? Find “both” answers.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 118

Answer:
Find the difference between the terms a2 and a4.

Monitoring Progress and Modeling with Mathematics

In Exercises 3 and 4, write the next three terms of the arithmetic sequence.

Question 3.
First term: 2
Common difference: 13
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 3

Question 4.
First term: 18
Common difference: −6

Answer:

Position 1 2 3 4
Term 18 12 6 0

The next 3 terms are 12, 6, 0.
In Exercises 5−10, find the common difference of the arithmetic sequence.

Question 5.
13, 18, 23, 28, . . .
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 5

Question 6.
175, 150, 125, 100, . . .

Answer:
150 – 175 = -25, 125 – 150 = -25, 100 – 125 = -25
The common difference is -25.

Question 7.
-16, -12, -8, -4, . . .
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 7

Question 8.
4, 3\(\frac{2}{3}\), 3\(\frac{1}{3}\), 3, . . .

Answer:
3\(\frac{2}{3}\) – 4 = \(\frac{-1}{3}\), 3\(\frac{1}{3}\) – 3\(\frac{2}{3}\) = \(\frac{-1}{3}\), 3 – 3\(\frac{1}{3}\) = \(\frac{-1}{3}\)
The common difference is \(\frac{-1}{3}\)

Question 9.
6.5, 5, 3.5, 2, . . .
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 9

Question 10.
-16, -7, 2, 11, . . .

Answer:
-7 + 16 = 9
2 + 7 = 9
11 – 2 = 9
The common difference is 9

In Exercises 11−16, write the next three terms of the arithmetic sequence.

Question 11.
19, 22, 25, 28, . . .
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 11

Question 12.
1, 12, 23, 34, . . .

Answer:

Position 1 2 3 4 5 6 7
Term 1 12 23 34 46 58 70

The next 3 terms are 46, 58, 70

Question 13.
16, 21, 26, 31, . . .
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 13

Question 14.
60, 30, 0, -30, . . .

Answer:

Position 1 2 3 4 5 6 7
Term 60 30 0 -30 -60 -90 -120

The next 3 terms are -60, -90, -120.

Question 15.
1.3, 1, 0.7, 0.4, . . .
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 15

Question 16.
\(\frac{5}{6}\), \(\frac{2}{3}\), \(\frac{1}{2}\), \(\frac{1}{3}\), . . .

Answer:

Position 1 2 3 4 5 6 7
Term \(\frac{5}{6}\) \(\frac{2}{3}\) \(\frac{1}{2}\) \(\frac{1}{3}\) \(\frac{1}{6}\) 0 \(\frac{-1}{6}\)

The next 3 terms are \(\frac{1}{6}\), 0, \(\frac{-1}{6}\)

In Exercises 17−22, graph the arithmetic sequence.

Question 17.
4, 12, 20, 28, . . .
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 17

Question 18.
-15, 0, 15, 30, . . .

Answer:

Position 1 2 3 4
Term -15 0 15 30

Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 5

Question 19.
−1, −3, −5, −7, . . .
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 19

Question 20.
2, 19, 36, 53, . . .

Answer:

Position 1 2 3 4
Term 2 19 36 53

Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 6

Question 21.
0, 41\(\frac{1}{2}\), 9, 13\(\frac{1}{2}\), . . .
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 21

Question 22.
6, 5.25, 4.5, 3.75, . . .

Answer:

Position 1 2 3 4
Term 6 5.25 4.5 3.75

Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 7

In Exercises 23−26, determine whether the graph represents an arithmetic sequence. Explain.

Question 23.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 119
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 23

Question 24.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 120

Answer:
The points lie on the line. So, the sequence 5, 12, 19, 26 is arithmetic.

Explanation:

Position 1 2 3 4
Term 5 12 19 26

The consecutive terms have a common difference of 7.
So, the graph 5, 12, 19, 26, . . represents the arithmetic sequence.

Question 25.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 121
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 25

Question 26.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 122

Answer:
The points lie on the line. So, the sequence 2, 10, 16, 20 is not arithmetic.

Explanation:

Position 1 2 3 4
Term 2 10 16 20

The consecutive terms do not have a common difference
So, the graph 2, 10, 16, 20, . . represents the arithmetic sequence.

In Exercises 27−30, determine whether the sequence is arithmetic. If so, find the common difference.

Question 27.
13, 26, 39, 52, . . .
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 27

Question 28.
5, 9, 14, 20, . . .29.

Answer:

Position 1 2 3 4
Term 5 9 14 20

The sequence is not arithmetic.

Question 29.
48, 24, 12, 6, . . .
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 29

Question 30.
87, 81, 75, 69, . . .

Answer:

Position 1 2 3 4
Term 87 81 75 69

The sequence is arithmetic with a common difference of 6.

Question 31.
FINDING A PATTERN
Write a sequence that represents the number of smiley faces in each group. Is the sequence arithmetic? Explain.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 123
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 31

Question 32.
FINDING A PATTERN
Write a sequence that represents the sum of the numbers in each roll. Is the sequence arithmetic? Explain.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 124

Answer:

Position 1 2 3 4
Term 2 5 9 11

The consecutive terms do not have a common difference.
So, the sequence is not arithmetic.

In Exercises 33−38, write an equation for the nth term of the arithmetic sequence. Then find a10.

Question 33.
-5, -4, -3, -2, . . .
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 33

Question 34.
-6, -9, -12, -15, . . .

Answer:
An equation for the nth term of the arithmetic sequence is an = -3 – 3n
The tenth term of the sequence is -33.

Explanation:
d = -9 -(-6) = -9 + 6 = -3
an = a₁ + (n – 1)d
= -6 + (n – 1)(-3)
= -6 – 3n + 3
= -3 – 3n
An equation for the nth term of the arithmetic sequence is an = -3 – 3n
a10  = -3 – 3(10) = -3 – 30
= -33

Question 35.
\(\frac{1}{2}\), 1, 1\(\frac{1}{2}\), 2, ……
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 35

Question 36.
100, 110, 120, 130, ….

Answer:
An equation for the nth term of the arithmetic sequence is an = 10n + 90
The tenth term of the sequence is 190

Explanation:
d = 110 – 100 = 10
an = a₁ + (n – 1)d
= 100 + (n – 1)(10)
= 100 + 10n – 10
= 10n + 90
An equation for the nth term of the arithmetic sequence is an = 10n + 90
a10  = 10(10) + 90 = 100 + 90
= 190

Question 37.
10, 0, -10, -20, ……
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 37

Question 38.
\(\frac{3}{7}\), \(\frac{4}{7}\), \(\frac{5}{7}\), \(\frac{6}{7}\), ………

Answer:
An equation for the nth term of the arithmetic sequence is an = \(\frac{2 + n}{7}\)
The tenth term is \(\frac{12}{7}\)

Explanation:
d = \(\frac{4}{7}\) – \(\frac{3}{7}\) = \(\frac{1}{7}\)
an = a₁ + (n – 1)d
= \(\frac{3}{7}\) + (n – 1)(\(\frac{1}{7}\))
= \(\frac{3}{7}\) + \(\frac{n}{7}\) – \(\frac{3}{7}\)
= \(\frac{2 + n}{7}\)
An equation for the nth term of the arithmetic sequence is an = \(\frac{2 + n}{7}\)
a10  = \(\frac{2 + 10}{7}\)
= \(\frac{12}{7}\)

Question 39.
ERROR ANALYSIS
Describe and correct the error in finding the common difference of the arithmetic sequence.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 125
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 39

Question 40.
ERROR ANALYSIS
Describe and correct the error in writing an equation for the nth term of the arithmetic sequence.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 126

Answer:
The nth term in the sequence is an = a₁ + (n – 1)d
an = 14 + (n – 1)8

Question 41.
NUMBER SENSE
The first term of an arithmetic sequence is 3. The common difference of the sequence is 1.5 times the first term. Write the next three terms of the sequence. Then graph the sequence.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 41

Question 42.
NUMBER SENSE
The first row of a dominoes display has 10 dominoes. Each row after the first has two more dominoes than the row before it. Write the first five terms of the sequence that represents the number of dominoes in each row. Then graph the sequence.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 127

Answer:
10, 12, 14, 16, 18

Explanation:
The equation to give the number of dominoes in the nth row is an = a₁ + (n – 1)d
= 10 + (n – 1)2
= 10 + 2n – 2
= 2n + 8
The nth term of the arithmetic sequence is an = 2n + 8
First row a1 = 10
second row a2 = 2(2) + 8 = 12
third row a3 = 2(3) + 8 = 14
fourth row = 2(4) + 8 = 16
fifth row = 2(5) + 8 = 18
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 8

REPEATED REASONING
In Exercises 43 and 44, (a) draw the next three figures in the sequence and (b) describe the 20th figure in the sequence.

Question 43.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 128
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 43

Question 44.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 129

Answer:
a. The next three figures are
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 9

Question 45.
MODELING WITH MATHEMATICS
The total number of babies born in a country each minute after midnight January 1st can be estimated by the sequence shown in the table. (See Example 5.)
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 130
a. Write a function that represents the arithmetic sequence.
b. Graph the function.
c. Estimate how many minutes after midnight January 1st it takes for 100 babies to be born.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 45.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 45.2

Question 46.
MODELING WITH MATHEMATICS
The amount of money a movie earns each week after its release can be approximated by the sequence shown in the graph.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 131
a. Write a function that represents the arithmetic sequence.
b. In what week does the movie earn $16 million?
c. How much money does the movie earn overall?

Answer:
a. f = 64 – 8n
b. In 6 weeks the movie earn $16 million
c. $224 millon

Explanation:
a. Common difference is d = 48 – 56 = -8
Arithmetic sequence of nth term = 56 + (n – 1)(-8)
= 56 – 8n + 8 = 64 – 8n
b. 16 = 64 – 8n
8n = 64 – 16
8n = 48
n = 6
c. 0 = 64 – 8n
64 = 8n
n = 8
The sum of amount earned in 8 weeks = 56 + 48 + 40 + 32 + 24 + 16 + 8
= 224

MATHEMATICAL CONNECTIONS
In Exercises 47 and 48, each small square represents 1 square inch. Determine whether the areas of the figures form an arithmetic sequence. If so, write a function f that represents the arithmetic sequence and find f(30).

Question 47.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 132
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 47

Question 48.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 133

Answer:

Position 1 2 3
Term 4 6 25

The boxes do not represent the arithmetic sequence.
Question 49.
REASONING
Is the domain of an arithmetic sequence discrete or continuous? Is the range of an arithmetic sequence discrete or continuous?
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 49

Question 50.
MAKING AN ARGUMENT
Your friend says that the range of a function that represents an arithmetic sequence always contains only positive numbers or only negative numbers. Your friend claims this is true because the domain is the set of positive integers and the output values either constantly increase or constantly decrease. Is your friend correct? Explain.

Answer:
The friend is not correct.
The range of the arithmetic sequence contains positive, negative both.
For example, let the first term of the sequence is 5, common difference is -2
The germs will be 5, 3, 1, -1, . .

Question 51.
OPEN-ENDED
Write the first four terms of two different arithmetic sequences with a common difference of -3. Write an equation for the nth term of each sequence.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 51Question 52.
THOUGHT PROVOKING
Describe an arithmetic sequence that models the numbers of people in a real-life situation.
Answer:

Question 53.
REPEATED REASONING
Firewood is stacked in a pile. The bottom row has 20 logs, and the top row has 14 logs. Each row has one more log than the row above it. How many logs are in the pile?
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 53

Question 54.
HOW DO YOU SEE IT?
The bar graph shows the costs of advertising in a magazine.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 134
a. Does the graph represent an arithmetic sequence? Explain.
b. Explain how you would estimate the cost of a six-page advertisement in the magazine.

Answer:
a. The graph does not represent the arithmetic sequence as they do not have a common difference.

Question 55.
REASONING
Write a function f that represents the arithmetic sequence shown in the mapping diagram.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 135
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 55

Question 56.
PROBLEM SOLVING
A train stops at a station every 12 minutes starting at 6:00 A.M. You arrive at the station at 7:29 A.M. How long must you wait for the train?

Answer:
A train stops at a station every 12 minutes starting at 6:00 A.M
Therefore, the sequence is 6:12, 6:24, 6:36, 6:48, 7:00, 7:12, 7:24, . . .
You arrive at the station at 7:29 AM
The train will stop at 7:36 AM
36 – 29 = 7
So, you must wait for 7 minutes.

Question 57.
ABSTRACT REASONING
Let x be a constant. Determine whether each sequence is an arithmetic sequence. Explain.
a. x + 6, 3x + 6, 5x + 6, 7x + 6, . . .
b. x + 1, 3x + 1, 9x + 1, 27x + 1, . . .
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 57.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 57.2

Maintaining Mathematical ProficiencySolve the inequality. Graph the solution. (Section 2.2)Question 58.
x + 8 ≥ -9

Answer:
x ≥ -9 – 8
x ≥ -17
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 10

Question 59.
15 < b – 4
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 59

Question 60.
t – 21 < -12

Answer:
t < -12 + 21
t < 9
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 11

Question 61.
7 + y ≤ 3
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 61

Graph the function. Compare the graph to the graph of f(x) = | x |. Describe the domain and range. (Section 3.7)

Question 62.
h(x) = 3 | x |

Answer:

x 1 2 3 4
h(x) 3 6 9 12

Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 12

Question 63.
v(x) = | x – 5 |
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 63

Question 64.
g(x) = | x | + 1
Answer:

Question 65.
r(x) = -2 | x |
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.6 Question 65

Lesson 4.7 Piecewise Functions

Essential Question

 How can you describe a function that is represented by more than on equation?

EXPLORATION 1
Writing Equations for a Function
Work with a partner.

a. Does the graph represent y as a function of x? Justify your conclusion.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 135.1
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 135.4
b. What is the value of the function when x = 0? How can you tell?
c. Write an equation that represents the values of the function when x ≤ 0.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 136
d. Write an equation that represents the values of the function when x > 0.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 137
e. Combine the results of parts (c) and (d) to write a single description of the function.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 138

EXPLORATION 2
Writing Equations for a Function
Work with a partner.

a. Does the graph represent y as a function of x? Justify your conclusion.
b. Describe the values of the function for the following intervals.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 139
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 140

Communicate Your Answer

Question 3.
How can you describe a function that is represented by more than one equation?

Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 141

Question 4.
Use two equations to describe the function represented by the graph.

4.7 LessonMonitoring ProgressEvaluate the function.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 142

Question 1.
f(-8)

Answer:
f(-8) = 3 because x < -2

Question 2.
f(-2)

Answer:
f(-2) = -2 + 2
f(-2) = 0

Question 3.
f(0)

Answer:
f(0) = 0 + 2
f(0) = 2

Question 4.
f(3)

Answer:
f(3) = 3 + 2
f(3) = 5

Question 5.
f(5)

Answer:
f(5) = 5 + 2 = 7

Question 6.
f(10)

Answer:
f(10) = 4(10) = 40 as x > 5

Describe the domain and range.

Question 7.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 143

Answer:
The first line points downwards in the third quadrant.
The second line is in the fourth quadrant.
The range is -1.
The domain is 1.

Question 8.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 144

Answer:

Write a piecewise function for the graph.

Question 9.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 145

Answer:
When x > 0, the line is y = x + 2
When x ≤ 0, the line is y = x – 1

Question 10.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 146

Answer:
The straight-line equation is y = 2, when -2 ≤ x ≤ 1
The left side equation is y = -2 + x when x < 0
The right side equation is y = -x when x > 0

Question 11.
A landscaper rents a wood chipper for 4 days. The rental company charges $100 for the first day and $50 for each additional day. Write and graph a step function that represents the relationship between the number x of days and the total cost y (in dollars) of renting the chipper.

Answer:
y = 100 + 50x

Explanation:
The total cost, y is given by
y = 100 + 50x where x is the number of days
When graphing, using y=mx+c,
the gradient will be always 50 and at point when x = 0, y = 100 when x = 1, y = 150, when x = 2, y = 200 when x = 3, y = 250 and when x = 4, y = 300

Question 12.
WHAT IF?

The reference beam originates at (3, 0) and reflects off a mirror at (5, 4).
a. Write an absolute value function that represents the path of the reference beam.
b. Write the function in part (a) as a piecewise function.

Answer:
The vertex of the path of the reference beam is (3, 0). So, the function has the form g(x) = a|x – 3|.
Substitute the coordinates (5, 4)
4 = a|4 – 3|
4 = a
So, the function g(x) = 4|x – 3| represents the path of the reference beam

Piecewise Functions

4.7 Exercises

Vocabulary and Core Concept Check

Question 1.
VOCABULARY
Compare piecewise functions and step functions.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 1

Question 2.
WRITING
Use a graph to explain why you can write the absolute value function y = | x | as a piecewise function.
Answer:

Monitoring Progress and Modeling with MathematicsIn Exercises 3–12, evaluate the function.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 500

Question 3.
f(-3)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 3

Question 4.
f(-2)

Answer:
f(x) = x + 3
f(-2) = -2 + 3 = 1

Question 5.
f(0)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 5

Question 6.
f(5)

Answer:
f(x) = x + 3
f(5) = 5 + 3 = 8

Question 7.
g(-4)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 7

Question 8.
g(-1)

Answer:
g(x) = -x + 4
(g(-1) = -(-1) + 4 = 5

Question 9.
g(0)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 9

Question 10.
g(1)

Answer:
g(x) = 3
g(1) = 3

Question 11.
g(2)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 11

Question 12.
g(5)

Answer:
g(x) = 2x – 5
g(5) = 2(5) – 5 = 10 – 5 = 5

Question 13.
MODELING WITH MATHEMATICS
On a trip, the total distance (in miles) you travel in x hours is represented by the piecewise function
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 147
How far do you travel in 4 hours?
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 13

Question 14.
MODELING WITH MATHEMATICS
The total cost (in dollars) of ordering x custom shirts is represented by the piecewise function
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 148
Determine the total cost of ordering 26 shirts.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 148.1
Answer:
c(x) = 15.80x + 20
c(26) = 15.80(26) + 20
= 430.8

In Exercises 15–20, graph the function. Describe the domain and range.

Question 15.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 149
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 15

Question 16.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 150

Answer:

x -6 -3 -3 6
y -18 -9 9 18

The domain is all real numbers and the range is y ≤ -3.

Question 17.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 151
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 17

Question 18.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 152

Answer:

x 0 2 4 4
y 8 10 14 12

The domain is all real numbers and the range is y < 4

Question 19.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 153
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 19

Question 20.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 154

Answer:

x -1 0 1 2 2
y -1 2 1 0 -3

The domain is all real numbers and the range is y < 2.

Question 21.
ERROR ANALYSIS
Describe and correct the error in finding f(5) when Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 155.1
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 155
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 21

Question 22.
ERROR ANALYSIS
Describe and correct the error in graphing Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 157
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 158
Answer:
The graph is wrong for the first statement.

In Exercises 23–30, write a piecewise function for the graph.

Question 23.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 159
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 23

Question 24.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 160
Answer:
For x ≤ 0, y = -3
use the points (0, 3) and (1, 1)
m = \(\frac { 1 – 3 }{ 1 – 0 } \) = -2
y – 1 = -2(x – 1)
y – 1 = -2x + 2
y = -2x + 3, for x < 0

Question 25.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 161
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 25.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 25.2

Question 26.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 162
Answer:
Use the points (-2, -2) and (2, 0)
m = \(\frac { 0 + 2 }{ 2 + 2 } \) = \(\frac { 1 }{ 2 } \)
The equation is y – 2 = \(\frac { 1 }{ 2 } \)(x – 0)
y = \(\frac { 1 }{ 2 } \)x + 2
y = \(\frac { 1 }{ 2 } \)x + 2 for x > -2
Use the points (-2, -2) and (-4, -6)
m = \(\frac { -6 + 2 }{ -4 + 2 } \) = 2
y + 2 = 2(x + 2)
y = 2x + 2 for x < -2

Question 27.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 163
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 27.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 27.2

Question 28.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 164
Answer:
Use the points (-1, 3), (-2, 2)
m = \(\frac { 2 – 3 }{ -2 + 1 } \) = 1
y – 2 = 1(x + 2)
y = x – 4 for x < -1
Use the points (-2, 0) and (3, -1)
m = \(\frac { -1 – 0 }{ 3 + 2 } \) = \(\frac { -1 }{ 5 } \)
y – 0 = \(\frac { -1 }{ 5 } \)(x + 2)
y = \(\frac { -1 }{ 5 } \)(x + 2) for -2 > x < 3
y = -3 for x > 3

Question 29.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 165
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 29.1

Question 30.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 166
Answer:
y = 1 for 4 < x < 3
y = 2 for 3 < x < 2
y = 3 for 2 < x < 1
y = 4 for 1 < x < 0

In Exercises 31–34, graph the step function. Describe the domain and range.

Question 31.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 167
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 31

Question 32.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 168

Answer:

Question 33.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 169
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 33

Question 34.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 170
Answer:

Question 35.
MODELING WITH MATHEMATICS
The cost to join an intramural sports league is $180 per team and includes the first five team members. For each additional team member, there is a $30 fee. You plan to have nine people on your team. Write and graph a step function that represents the relationship between the number p of people on your team and the total cost of joining the league.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 35.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 35.2

Question 36.
MODELING WITH MATHEMATICS
The rates for a parking garage are shown. Write and graph a step function that represents the relationship between the number x of hours a car is parked in the garage and the total cost of parking in the garage for 1 day.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 171
Answer:

In Exercises 37–46, write the absolute value function as a piecewise function.

Question 37.
y = | x | + 1
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 37

Question 38.
y = | x | – 3

Answer:
A piecewise function is
g(x) = {-x – 3, if < 0
x – 3, if x ≥ 0

Question 39.
y = | x – 2 |
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 39

Question 40.
y = | x + 5 |

Answer:
g(x) = { -(x + 5), if x + 5 < 0
x + 5, if x + 5 ≥ 0
i.e g(x) = {-x – 5, if x < -5
x + 5, if x ≥ -5

Question 41.
y = 2 | x + 3 |
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 41

Question 42.
y = 4 | x – 1 |

Answer:
g(x) = {-4(x – 1), if 4(x – 1) < 0 and 4(x – 1), if 4(x – 1) ≥ 0
g(x) = {4 -4x, if x < 1
4x – 4, if x ≥ 1

Question 43.
y = -5 | x – 8 |
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 43

Question 44.
y = -3 | x + 6 |

Answer:
g(x) = {3(x + 6), if -3(x+6) < 0 and -3(x + 6), if -3(x+6) ≥ 0
g(x) = {3(x + 6), if x < -2
-3(x + 6), if x ≥ -2

Question 45.
y = – | x – 3 | + 2
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 45

Question 46.
y = 7| x + 1 | – 5

Answer:
g(x) = -7(x + 1) – 5, if 7(x + 1) – 5 < 0
7(x + 1) – 5, if 7(x + 1) – 5 ≥ 0
g(x) = {-7x – 13, if x < -2/7
7x + 2 , if x ≥ -2/7

Question 47.
MODELING WITH MATHEMATICS
You are sitting on a boat on a lake. You can get a sunburn from the sunlight that hits you directly and also from the sunlight that reflects off the water.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 172
a. Write an absolute value function that represents the path of the sunlight that reflects off the water.
b. Write the function in part (a) as a piecewise function.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 47.1

Question 48.
MODELING WITH MATHEMATICS
You are trying to make a hole in one on the miniature golf green.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 173
a. Write an absolute value function that represents the path of the golf ball.
b. Write the function in part (a) as a piecewise function.
Answer:

Question 49.
REASONING
The piecewise function f consists of two linear “pieces.” The graph of f is shown.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 174
a. What is the value of f(-10)?
b. What is the value of f(8)?
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 49.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 49.2

Question 50.
CRITICAL THINKING
Describe how the graph of each piecewise function changes when < is replaced with ≤ and ≥ is replaced with >. Do the domain and range change? Explain.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 175
Answer:

Question 51.
USING STRUCTURE Graph
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 176
Describe the domain and range.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 51.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 51.2

Question 52.
HOW DO YOU SEE IT? The graph shows the total cost C of making x photocopies at a copy shop.
Big Ideas Math Algebra 1 Answer Key Chapter 4 Writing Linear Functions 177
a. Does it cost more money to make 100 photocopies or 101 photocopies? Explain.
b. You have $40 to make photocopies. Can you buy more than 500 photocopies? Explain.
Answer:
Each piece of a function is linear
C(x) = {0.15x, 0 < x ≤ 25,
0.10x, 25 < x ≤ 100,
0.07x, 100 < x ≤ 500,
0.05x, x > 500

Question 53.
USING STRUCTURE
The output y of the greatest integer function is the greatest integer less than or equal to the input value x. This function is written as Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 204. Graph the function for -4 ≤ x < 4. Is it a piecewise function? a step function? Explain.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 53.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 53.2

Question 54.
THOUGHT PROVOKING
Explain why
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 205
does not represent a function. How can you redefine y so that it does represent a function?
Answer:

Question 55.
MAKING AN ARGUMENT
During a 9-hour snowstorm, it snows at a rate of 1 inch per hour for the first 2 hours, 2 inches per hour for the next 6 hours, and 1 inch per hour for the final hour.
a. Write and graph a piecewise function that represents the depth of the snow during the snowstorm.
b. Your friend says 12 inches of snow accumulated during the storm. Is your friend correct? Explain.
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 55.1
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 55.2

Maintaining Mathematical ProficiencyWrite the sentence as an inequality. Graph the inequality.(Section 2.5)

Question 56.
A number r is greater than -12 and no more than 13.

Answer:
A number r is greater than -12
r > -12
r ≤ 13
-12 < r ≤ 13
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 1

Question 57.
A number t is less than or equal to 4 or no less than 18.Graph f and h. Describe the transformations from the graph of f to the graph of h.(Section 3.6)
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 57

Question 58.
f(x) = x; h(x) = 4x + 3

Answer:

Question 59.
f(x) = x; h(x) = -x – 8
Answer:
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 4.7 Question 59

Question 60.
f(x) = x; h(x) = –\(\frac{1}{2}\) + 5
Answer:

Writing Linear Functions Performance Task: Any Beginning

4.4–4.7 What Did You Learn?

Core VocabularySection 4.4
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 179

Section 4.5
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 178

Section 4.6
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 181

Section 4.7
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 182

Mathematical Practices

Question 1.
What resources can you use to help you answer Exercise 17 on page 200?

Question 2.
What calculations are repeated in Exercises 11–16 on page 214? When finding a term such as a50, is there a general method or shortcut you can use instead of repeating calculations?

Question 3.
Describe the definitions you used when you explained your answer in Exercise 53 on page 224.

Performance TaskAny Beginning
With so many ways to represent a linear relationship, where do you start? Use what you know to move between equations, graphs, tables, and contexts.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 183
To explore the answers to this question and more, go to Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 206

Writing Linear Functions Chapter Review

Question 1.
Write an equation of the line in slope-intercept form.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 207

Answer:
y = \(\frac { -1 }{ 2 } \)x + 1

Explanation:
m = \(\frac { -1 – 1 }{ 4 – 0 } \) = \(\frac { -1 }{ 2 } \)
y + 1 = \(\frac { -1 }{ 2 } \)(x – 4)
y + 1 = \(\frac { -1 }{ 2 } \)x + 2
y = \(\frac { -1 }{ 2 } \)x + 1

Question 2.
Write an equation in point-slope form of the line that passes through the point (4, 7) and has a slope of -1.

Answer:
y = -x + 11

Explnation:
y – 7 = -1(x – 4)
y = -x + 4 + 7
y = -x + 11

Write a linear function f with the given values.

Question 3.
f(10) = 5, f(2) = -3

Answer:
f(x) = x + 5

Explanation:
The points are (10, 5), (2, -3)
m = \(\frac { -3 – 5 }{ 2 – 8 } \) = 1
The point-slope form of the line is (y – y₁) = m(x – x₁)
y – 5  = 1(x – 10)
y = x -10 + 5
y = x + 5
f = x + 5

Question 4.
f(3) = -4, f(5) = -4

Answer:
f(x) = -4

Explanation:
the points are (3, -4) and (5, -4)
The point-slope form of the line is (y – y₁) = m(x – x₁)
m = \(\frac { -4 + 4 }{ 5 – 3 } \) = 0
y + 4 = 0
y = -4
f(x) = -4

Question 5.
f(6) = 8, f(9) = 3

Answer:
f = \(\frac { -3x }{ 5 } \) + \(\frac { 54 }{ 5 } \)

Explanation:
The points are (8, 6) and (3, 9)
The point-slope form of the line is (y – y₁) = m(x – x₁)
m = \(\frac { 9 – 6 }{ 3 – 8 } \) = \(\frac { -3 }{ 5 } \)
y – 6 = \(\frac { -3 }{ 5 } \)(x – 8)
y = \(\frac { -3x }{ 5 } \) + \(\frac { 24 }{ 5 } \) + 6
y = \(\frac { -3x }{ 5 } \) + \(\frac { 54 }{ 5 } \)

Question 6.
Line a passes through (0, 4) and (4, 3).
Line b passes through (0, 1) and (4, 0).
Line c passes through (2, 0) and (4, 4).

Answer:
Line a: y = \(\frac { -x }{ 4 } \) + 4
Line b: y = \(\frac { -x }{ 4 } \) + 1
Lines a, b are parallel
Line c: y = 2(x – 2)

Explanation:
Line a: (y – 4) = \(\frac { 3 – 4 }{ 4 – 0 } \)(x – 0)
y = \(\frac { -x }{ 4 } \) + 4
Line b: (y – 1) = \(\frac { 0 – 1 }{ 4 – 0 } \)(x – 0)
y = \(\frac { -x }{ 4 } \) + 1
Line c: y – 0 = \(\frac { 4 – 0 }{ 4 – 2 } \)(x – 2)
y = 2(x – 2)

Question 7.
Line a: 2x – 7y = 14
Line b: y = \(\frac{7}{2}\)x – 8
Line c: 2x + 7y = -21

Answer:
Lines b and c are perpendicular

Explanation:
Line a: 2x – 14 = 7y
y = \(\frac { 2x }{ 7 } \) – 2
Line c: 7y = -21 – 2x
y = \(\frac { -2x }{ 7 } \) – 3

Question 8.
Write an equation of the line that passes through (1, 5) and is parallel to the line y = -4x + 2.

Answer:
y = -4x + 9

Explanation:
The line slope m = -4
y – 5 = -4(x – 1)
y – 5 = -4x + 4
y = -4x + 4 + 5
y = -4x + 9

Question 9.
Write an equation of the line that passes through (2, -3) and is perpendicular to the line y = -2x – 3

Answer:
y = \(\frac { 1 }{ 2 } \)x – 4

Explanation:
The slope of the line m = \(\frac { 1 }{ 2 } \)
y + 3 = \(\frac { 1 }{ 2 } \)(x – 2)
y = \(\frac { 1 }{ 2 } \)x – 4

Question 10.
What is the roasting time for a 12-pound turkey?

Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 185

Answer:
The roasting time for a 12-pound turkey is 4.0 hours.

Question 11.
Write an equation that models the roasting time as a function of the weight of a turkey. Interpret the slope and y-intercept of the line of fit.

Answer:
(12, 4) and (20, 5.5)
(y – 4) = \(\frac { 5.5 – 4 }{ 20 – 12 } \)(x – 12)
y – 4 = \(\frac { 1.5 }{ 8 } \)x – 2.25
y = \(\frac { 1.5 }{ 8 } \)x + 1.75
The y-intercept is 1.75 and slope is \(\frac { 1.5 }{ 8 } \)

Question 12.
Make a scatter plot of the residuals to verify that the model in the example is a good fit.

Question 13.
Use the data in the example.
(a) Approximate the height of a student whose shoe size is 9.
(b) Predict the shoe size of a student whose height is 60 inches.

Answer:
(a) The height of the students whose shoe size is 9 is 9 = 0.5x – 23.5
0.5x = 32.5
x = 65
(b) y = 0.5(60) – 23.5
y = 30 – 23.5 = 6.5

Question 14.
Is there a causal relationship in the data in the example? Explain.

write an equation for the nth term of the arithmetic sequence. Then find a30.

Question 15.
11, 10, 9, 8, …..

Answer:
nth term is 12 – n
a30 = -18

Explanation:
Common difference d = 10 – 11 = -1
nth term an = 11 + (n – 1)(-1)
= 11 – n + 1 = 12 – n
a30 = 12 – 30 = -18

Question 16.
6, 12, 18, 24,….

Answer:
nth term is 6n
a30 = 180

Explanation:
Common difference d = 12 – 6 = 6
nth term an = 6 + (n – 1)(6)
= 6 + 6n – 6 = 6n
a30 = 6(30) = 180

Question 17.
-9, -6, -3, 0,….

Answer:
nth term is 3n – 12
a30 = 78

Explanation:
Common difference d = -6 + 9 = 3
nth term an = -9 + (n – 1)3
= -9 + 3n – 3 = 3n – 12
a30 = 3(30) – 12 = 90 – 12 = 78

Question 18.
Evaluate the function in the example when (a) x = 0 and (b) x = 5.

Answer:
(a) f(0) = 3
(b) f(5) = -10

Explanation:
(a) f(x) = \(\frac { 3 }{ 2 } \)x + 3
f(0) = 3
(b) f(x) = -2x
f(5) = -2(5) = -10

Graph the function. Describe the domain and range.

Question 19.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 186

Answer:
The domain is all real values and the range is -6.

Question 20.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 187

Answer:
The domain is all real values and the range is 3.

Write the absolute value function as a piecewise function.

Question 21.
y =| x | + 15

Answer:
g(x) = {-x + 15, if x + 15 < 0 and x + 15, if x + 15 ≥ 0
g(x) = {-x + 15, if x < -15
x + 15, if x ≥ -15

Question 22.
y = 4| x + 5 |

Answer:
g(x) = {-4(x + 5), if 4(x + 5) < 0 and 4(x + 5), if 4(x + 5) ≥ 0
g(x) = {-4(x + 5), if x < -5
4(x + 5), if x ≥ -5

Question 23.
y = 2 | x + 2 | – 3

Answer:
g(x) = {-2(x + 2) – 3, if 2(x + 2) – 3 < 0 and 2(x + 2) – 3, if 2(x + 2) – 3 ≥ 0
g(x) = {-2(x + 2) – 3, if x < -0.5
2(x + 2) – 3, if x > -0.5

Question 24.
You are organizing a school fair and rent a popcorn machine for 3 days. The rental company charges $65 for the first day and $35 for each additional day. Write and graph a step function that represents the relationship between the number x of days and the total cost y (in dollars) of renting the popcorn machine

Answer:
The rent for two days = 35 + 65 + 65 = 165
The rent for 3 days = 165 + 65 + 35 = 265

.Writing Linear Functions Chapter Test

Graph the function. Describe the domain and range.

Question 1.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 188

Question 2.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 189

Write an equation in slope-intercept form of the line with the given characteristics.

Question 3.
slope = \(\frac{2}{5}\) ; y-intercept = -7

Answer:
y = \(\frac{2}{5}\)x – 7

Question 4.
passes through (0, 6) and (3, -3)

Answer:
y = -3x + 6

Explanation:
y – 6 = \(\frac{-3 – 6}{3 – 0}\)(x – 0)
y – 6 = -3x
y = -3x + 6

Question 5.
parallel to the line y = 3x – 1; passes through (-2, -8)

Answer:
y = 3x – 2

Explanation:
y + 8 = 3(x + 2)
y + 8 = 3x + 6
y = 3x – 2

Question 6.
perpendicular to the line y = \(\frac{1}{4}\)x – 9; passes through (1, 1)

Answer:
y = -4x + 5

Explanation:
y – 1 = -4(x – 1)
y = -4x + 4 + 1
y = -4x + 5

Write an equation in point-slope form of the line with the given characteristics.

Question 7.
slope = 10; passes through (6, 2)

Answer:
The equation is y – 2 = 10(x – 6)

Explanation:
The point-slope form of the line is (y – y₁) = m(x – x₁)
y – 2 = 10(x – 6)

Question 8.
passes through (-3, 2) and (6, -1)

Answer:
The equation is y – 2 = \(\frac { -1 }{ 3 } \)(x + 3)

Explanation:
Slope m = \(\frac { -1 – 2 }{ 6 + 3 } \) = \(\frac { -1 }{ 3 } \)
The point-slope form of the line is (y – y₁) = m(x – x₁)
y – 2 = \(\frac { -1 }{ 3 } \)(x + 3)

Question 9.
The first row of an auditorium has 42 seats. Each row after the first has three more seats than the row before it.
a. Find the number of seats in Row 25.
b. Which row has 90 seats?

Answer:
a1 = 42
d = 3
a. a25 = 42 + (25 – 1)3
= 42 + 24(3) = 114
The number of seats in row 25 are 114
b. 90 = 42 + (n – 1)3
48 = 3n – 3
3n = 51
n = 17
17th row has 90 seats.

Question 10.
The table shows the amount x (in dollars) spent on advertising for a neighborhood festival and the attendance y of the festival for several years.
a. Make a scatter plot of the data. Describe the correlation.
b. Write an equation that models the attendance as a function of the amount spent on advertising.
c. Interpret the slope and y-intercept of the line of fit.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 190

Answer:
a.
Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 1
b. the points are (2000, 800) and (1500, 550)
(y – 800) = \(\frac { 550 – 800 }{ 1500 – 2000 } \)(x – 2000)
y – 800 = 0.5(x – 2000)
y = 0.5x – 1000 + 800
y = 0.5x – 200
c. slope is 0.5 and y-intercept is -200.

Question 11.
Consider the data in the table in Exercise 10.
a. Use a graphing calculator to find an equation of the line of best fit.
b. Identify and interpret the correlation coefficient.
c. What would you expect the scatter plot of the residuals to look like?
d. Is there a causal relationship in the data? Explain your reasoning.
e. Predict the amount that must be spent on advertising to get 2000 people to attend the festival.

Answer:

Question 12.
Let a, b, c, and d be constants. Determine which of the lines, if any, are parallel or perpendicular. Explain.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 191

Answer:
None of the lines are parallel or perpendicular.

Explanation:
Line 1: y = ax + c
Line 2: y = \(\frac { -x }{ a } \) – \(\frac { b }{ a } \)
Line 3: y = -ax + d

Question 13.
Write a piecewise function defined by three equations that has a domain of all real numbers and a range of -3 < y ≤ 1.

Answer:

Writing Linear Functions Cumulative Assessment

Question 1.
Which function represents the arithmetic sequence shown in the graph?
A. f(n) = 15 + 3n
B. f(n) = 4 – 3
C. f(n) = 27 – 3n
D. f(n) = 24 – 3n
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 192

Answer:
C. f(n) = 27 – 3n
f(1) = 27 – 3 = 24
f(2) = 27 -6 = 21
f(3) = 27 – 9 = 18

Question 2.
Which of the inequalities are equivalent?
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 193

Answer:
5x – 5 ≥ 7x – 9, 12 – 3x ≤ 18, -2 -3/2 x ≥ -3 – x are equivalent.

Explanation:
3x + 6 ≤ 8 + 2x
3x – 2x ≤ 8 – 6
x ≤ 2
5x – 5 ≥ 7x – 9
-5 + 9 ≥ 7x – 5x
4 ≥ 2x
x ≥ 2
12 – 3x ≤ 18
-3x ≤ 18 – 12
-3x ≤ 6
x ≤ -2
x ≥ 2
-2 -3/2 x ≥ -3 – x
-3/2 x + x ≥ -3 + 2
-0.5x ≥ -1
x ≥ 2

Question 3.
Complete the table for the four situations below. Explain your reasoning.
a. the price of a pair of pants and the number sold
b. the number of cell phones and the number of taxis in a city
c. a person’s IQ and the time it takes the person to run 50 meters
d. the amount of time spent studying and the score earned
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 194

Answer:

Question 4.
Consider the function f(x) = x – 1. Select the functions that are shown in the graph. Explain your reasoning.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 195

Answer:
g(x) = x + 2 – 1 = x + 1
h(x) = 3x – 1
k(x) = x – 1 + 4 = x + 3
p(x) = -x – 1
r(x) = 3(x – 1) = 3x – 3
q(x) = -(x – 1) = 1 – x

Question 5.
Use the numbers to fill in values for m and b in the equation y = mx + b so that its graph passes through the points (6, 1) and (-2, -3).
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 196

Answer:
m = \(\frac { 1 }{ 2 } \), b = -2

Explanation:
slope m = \(\frac { -3 – 1 }{ -2 – 6 } \) = \(\frac { 1 }{ 2 } \)
y – 1 = \(\frac { 1 }{ 2 } \)(x – 6)
y = \(\frac { 1 }{ 2 } \)x – 3 + 1
y = \(\frac { 1 }{ 2 } \)x – 2

Question 6.
Fill in the piecewise function with -, +, <, ≤, >, or ≥ so that the function is represented by the graph.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 197Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 198

Answer:
y = {2x – 3, if x < 0
2x – 3, if x > 0

Question 7.
You claim that you can create a relation that is a function, and your friend claims that she can create a relation that is not a function. Using the given numbers, create a relation of five ordered pairs that supports your claim. What relation of five ordered pairs can your friend use to support her claim?
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 199

Answer:

Question 8.
You have two coupons you can use at a restaurant. Write and solve an equation to determine how much your total bill must be for both coupons to save you the same amount of money.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 200

Answer:
The total bill is $25.

Explanation:
Let the total purchase is $x
By using the first coupon of 20%, we get a discount of x/5
This discount must be equal to $5 as a discount on the second coupon
x/5 = 5
x = 25

Question 9.
The table shows the daily high temperatures x (in degrees Fahrenheit) and the numbers y of frozen fruit bars sold on eight randomly selected days. The equation y = 3x – 50 models the data.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 201
a. Select the points that appear on a scatter plot of the residuals.
Big Ideas Math Answers Algebra 1 Chapter 4 Writing Linear Functions 202
b. Determine whether the model is a good fit for the data. Explain your reasoning.

Answer:
a.

x y y value from the model residual
54 40 112 40 – 112 = -72
60 120 130 120 – 130 = -10
68 180 154 180 – 154 = 26
72 260 166 260 – 166 = 94
78 280 184 280 – 184 = 96
84 260 202 260 – 202 = 58
92 220 226 220 – 226 = -6
98 180 244 180 – 244 = -64

(92, -6), (78, 96), (60, -10), (84, 58), (98, -64), (72, 94), (54, -72), (68, 26)
b. Big Ideas Math Algebra 1 Answers Chapter 4 Writing Linear Functions 2
The points are not above the x-axis. So the model does not fill well.

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