5.1 Understanding Linear Functions

Name Class Date 5.1 Understanding Linear Functions Essential Question: What is a linear function? Resource Locker Eplore 1 Recognizing Linear Functions A race car can travel up to 210 mph. If the car could travel continuousl at this speed, = 210 gives the number of miles that the car would travel in hours. Solutions are shown in the graph below. 1050 (5, 1050) Distance (miles) 0 (, 0) 630 (3, 630) 20 (2, 20) 210 (1, 210) 0 1 2 3 5 Time (hours) Houghton Mifflin Harcourt Publishing Compan Image Credits: Corbis The graph of the car s speed is a function because ever -value is paired with eactl one -value. Because the graph is a non-vertical straight line, it is also a linear function. Fill in the table using the data points from the graph above. B Using the table, check that has a constant change between consecutive terms. Module 5 199 Lesson 1

C Now check that has a constant change between consecutive terms. D Using the answers from before, what change in corresponds to a change in? E All linear functions behave similarl to the one in this eample. Based on this information, a generalization can be made that a change in will correspond to a change in. Reflect 1. Discussion Will a non-linear function have a constant change in that corresponds to a constant change in? 2. = 2 represents a tpical non-linear function. Using the table of values, check whether a constant change in corresponds to a constant change in. = 2 1 1 2 3 9 16 5 25 Houghton Mifflin Harcourt Publishing Compan Module 5 200 Lesson 1

Eplore 2 Proving Linear Functions Grow b Equal Differences Over Equal Intervals Linear functions change b a constant amount (change b equal differences) over equal intervals. Now ou will eplore the proofs of these statements. 2-1 and - 3 represent two intervals in the -values of a linear function. It is also important to know that an linear function can be written in the form ƒ() = m + b, where m and b are constants. Complete the proof that linear functions grow b equal differences over equal intervals. Given: 2-1 = - 3 f is a linear function of the form ƒ () = m + b. Prove: ƒ ( 2 ) - ƒ ( 1 ) = ƒ ( ) - ƒ ( 3 ) Proof: 1. 2-1 = - 3 Given. 2. m ( 2-1 ) = ( - 3 ) Mult. Propert of Equalit 3. m 2 - = m -. m 2 + b - m 1 - b = m + - m 3-5. m 2 + b - (m 1 + b) = m + b - 6. ƒ ( 2 ) - ƒ ( 1 ) = Definition of ƒ () Reflect 3. Discussion Consider the function = 3. Use two equal intervals to determine if the function is linear. The table for = 3 is shown. Houghton Mifflin Harcourt Publishing Compan = 3 1 1 2 3 27 6 5 125. In the given of the proof it states that: f is a linear function of the form ƒ () = m + b. What is the name of the form for this linear function? Module 5 201 Lesson 1

Eplain 1 Graphing Linear Functions Given in Standard Form An linear function can be represented b a linear equation. A linear equation is an equation that can be written in the standard form epressed below. Standard Form of a Linear Equation A + B = C where A, B, and C are real numbers and A and B are not both 0. An ordered pair that makes the linear equation true is a solution of a linear equation in two variables. The graph of a linear equation represents all the solutions of the equation. Eample 1 Determine whether the equation is linear. If so, graph the function. 5 + = 10 The equation is linear because it is in the standard form of a linear equation: A = 5, B = 1, and C = 10. To graph the function, first solve the equation for. 5 + = 10 = 10-5 Make a table and plot the points. Then connect the points. -1 0 1 2 3 15 10 5 0-5 Note that because the domain and range of functions of a nonhorizontal line are all real numbers, the graph is continuous. (-1, 15) 12 6 - -2 0-6 (0, 10) (1, 5) (2, 0) 2 (3, -5) B - + = 11 The equation is linear because it is in the of a linear equation: form -12 5 + = 10 A =, B =, and C =. To graph the function, first solve the equation for. Make a table and plot the points. Then connect the points. - -2 0 2 - + = 11 = 11 + 0 20 0 2-20 -0 Houghton Mifflin Harcourt Publishing Compan Module 5 202 Lesson 1

Reflect 5. Write an equation that is linear but is not in standard form. 6. If A = 0 in an equation written in standard form, how does the graph look? Your Turn 7. Determine whether 6 + = 12 is linear. If so, graph the function. 20 10-2 -1 0-10 1 2-20 Eplain 2 Modeling with Linear Functions A discrete function is a function whose graph has unconnected points, while a continuous function is a function whose graph is an unbroken line or curve with no gaps or breaks. For eample, a function representing the sale of individual apples is a discrete function because no fractional part of an apple will be represented in a table or a graph. A function representing the sale of apples b the pound is a continuous function because an fractional part of a pound of apples will be represented in a table or graph. Eample 2 Graph each function and give its domain and range. Houghton Mifflin Harcourt Publishing Compan Sal opens a new video store and pas the film studios $2.00 for each DVD he bus from them. The amount Sal pas is given b ƒ () = 2, where is the number of DVDs purchased. ƒ () = 2 0 ƒ (0) = 2 (0) = 0 1 ƒ (1) = 2 (1) = 2 2 ƒ (2) = 2 (2) = 3 ƒ (3) = 2 (3) = 6 ƒ () = 2 () = This is a discrete function. Since the number of DVDs must be a whole number, the domain is {0, 1, 2, 3, } and the range is {0, 2,, 6, }. Cost ($) DVD Purchases (, ) 6 (2, ) (3, 6) 2 (1, 2) (0, 0) 0 1 2 3 Number of DVDs Module 5 203 Lesson 1

B Elsa rents a booth in her grandfather s mall to open an ice cream stand. She pas $1 to her grandfather for each hour of operation. The amount Elsa pas each hour is given b ƒ () =, where is the number of hours her booth is open. ƒ () = 0 ƒ (0) = 1 ƒ (1) = 2 ƒ (2) = 3 ƒ (3) = ƒ () = Ice Cream Booth Rental Cost ($) 3 2 1 0 1 2 3 Number of hours This is a function. The domain is and the range is. Reflect. Wh are the points on the graph in Eample 2B connected? 9. Discussion How is the graph of the function in Eample 2A related to the graph of an arithmetic sequence? Your Turn 10. Kristoff rents a kiosk in the mall to open an umbrella stand. He pas $6 to the mall owner for each umbrella he sells. The amount Kristoff pas is given b ƒ () = 6, where is the number of umbrellas sold. Graph the function and give its domain and range. Cost ($) 2 1 12 Umbrella Sales Houghton Mifflin Harcourt Publishing Compan 6 0 1 2 3 Number of umbrellas Module 5 20 Lesson 1

Elaborate 11. What is a solution of a linear equation in two variables? 12. What tpe of function has a graph with a series of unconnected points? 13. Essential Question Check-In What is the standard form for a linear equation? Evaluate: Homework and Practice Determine if the equation is linear. If so, graph the function. 1. 2 + = Online Homework Hints and Help Etra Practice - 0-2. 2 2 + = 6 Houghton Mifflin Harcourt Publishing Compan 3. 2_ + _ = 3_ 2-0 - - 0 - Module 5 205 Lesson 1

. 3 + = - 0-5. + 2 = 1-0 - 6. + = 1-0 - State whether each function is discrete or continuous. 7. The number of basketballs manufactured per da. = _, where is the number of hours and is the miles walked 9. The number of bulls ees scored for each hour of practice 10. =, where is the time and is gallons of water Houghton Mifflin Harcourt Publishing Compan 11. = 35 1, where is distance and is height 12. The amount of boes shipped per shift Module 5 206 Lesson 1

Graph each function and give its domain and range. 13. Hans opens a new video game store and pas the gaming companies $5.00 for each video game he bus from them. The amount Hans pas is given b ƒ () = 5, where is the number of video games purchased. 1. Peter opens a new bookstore and pas the book publisher $3.00 for each book he bus from them. The amount Peter pas is given b ƒ () = 3, where is the number of books purchased. Video Game Purchases Book Purchases 25 15 20 12 Cost ($) 15 10 Cost ($) 9 6 5 3 0 1 2 3 5 0 1 2 3 5 Number of video games Number of books 15. Steve opens a jewelr shop and makes $15.00 profit for each piece of jewelr sold. The amount Steve makes is given b ƒ () = 15, where is the number of pieces of jewelr sold. 16. Anna owns an airline and pas the airport $35.00 for each ticket sold. The amount Anna pas is given b ƒ () = 35, where is the number of tickets sold. 75 Jewelr Sales 175 Airplane Ticket Sales Houghton Mifflin Harcourt Publishing Compan Profit ($) 60 5 30 15 0 1 2 3 5 Number of pieces Cost ($) 10 105 70 35 0 1 2 3 5 Number of tickets Module 5 207 Lesson 1

17. A hot air balloon can travel up to 5 mph. If the balloon travels continuousl at this speed, = 5 gives the number of miles that the hot air balloon would travel in hours. Fill in the table using the data points from the graph. Determine whether and have constant change between consecutive terms and whether the are in a linear function. Number of miles 765 595 25 255 (9, 765) (7, 595) (5, 25) (3, 255) 5 (1, 5) 1 3 5 7 9 Number of hours 1. State whether each function is in standard form. a. 3 + = b. - = 15z c. 2 + = 11 d. 3 + 2 = e. + = 12 f. 5 + 2 = 5 19. Phsics A phsicist working in a large laborator has found that light particles traveling in a particle accelerator increase velocit in a manner that can be described b the linear function - + 3 = 15, where is time and is velocit in kilometers per hour. Use this function to determine when a certain particle will reach 30 km/hr. Houghton Mifflin Harcourt Publishing Compan Image Credits: Cultura Creative/Alam Module 5 20 Lesson 1

20. Travel The graph shows the costs of a hotel for one night for a group traveling. The total cost depends on the number of hotel rooms the group needs. Does the plot follow a linear function? Is the graph discrete or continuous? Total cost ($) 200 150 100 50 (1, 50) (2, 100) (3, 150) (, 200) 0 1 2 3 Number of rooms 21. Biolog The migration pattern of a species of tree frog to different swamp areas over the course of a ear can be described using the graph below. Fill in the table and epress whether this pattern follows a linear function. If the migration pattern is a linear function, epress what constant change in corresponds to a constant change in. 15 (5, 15) Houghton Mifflin Harcourt Publishing Compan Image Credits: Alekse Stemmer/Shutterstock Distance (km) 12 9 6 3 0 (1, 3) (2, 6) (3, 9) 1 2 3 5 Time (das) H.O.T. Focus on Higher Order Thinking (, 12) 1 2 3 5 22. Representing Real-World Problems Write a real-world problem that is a discrete non-linear function. Module 5 209 Lesson 1

23. Eplain the Error A student used the following table of values and stated that the function described b the table was a linear function. Eplain the student s error. -1 0 2 3-5 0 5 10 15 2. Communicate Mathematical Ideas Eplain how graphs of the same function can look different. Lesson Performance Task Jordan has started a new dog-walking service. His total profits over the first weeks are epressed in this table. a. Show that his business results can be described b a linear function. Time (weeks) Profits($) 1 150 2 300 3 50 600 b. Graph this function and use the graph to predict his business profit 9 weeks after he opens. 1500 1200 Profits ($) 900 600 300 0 2 6 10 Time (weeks) c. Eplain wh it is or is not a good idea to project his profits so far into the future. Give eamples to support our answer. Houghton Mifflin Harcourt Publishing Compan Module 5 210 Lesson 1