Warm Up Solve each equation for y. 1. 6 y – 12 x = 24 2. – 2 y – 4 x = 20 3. 2 y – 5 x = 16

1. Graphing Linear Equations 11-1 5 2 y = x + 8 Course 3 Warm Up Solve each equation for y. 1.6y – 12x = 24 2.–2y – 4x = 20 3. 2y – 5x = 16 4. 3y + 6x = 18 y = 2x + 4 y = –2x– 10 y = –2x + 6

2. Review Skills For Chapter 11 • Operations with Integers (to include fractions) • Solving Multistep Equations and Inequalities i.e. solve 4m-5(m+2)=1 • Solve Equations for One Variable (i.e. solve 5y-x = 4 for y) • Solve Inequalities for One Variable

3. Graphing Linear Equations 11-1 Course 3 Essential Question: Explain whether an equation is linear if three ordered pair solutions lie on a straight line but a fourth does not. Learn to identify and graph linear equations. Objective: 5.01a, 5.01b, 5.03 Develop an understanding of function with algebraic representations and identify relations as linear or nonlinear.

4. Graphing Linear Equations 11-1 Course 3 Vocabulary (Add to vocabulary folder) A linear equation is an equation whose solutions fall on a line on the coordinate plane. All solutions of a particular linear equation fall on the line, and all the points on the line are solutions of the equation. To find a solution that lies between two points (x1, y1) and (x2, y2), choose an x-value between x1 and x2 and find the corresponding y-value.

5. Graphing Linear Equations 11-1 Course 3 Insert Lesson Title Here Reading Math Read x1 as “x sub one” or “x one.” So, x2- x1 would be read, X sub 2 minus x sub 1 You will see this again very soon! (Hint: 11-2) We will be referencing ordered pairs to determine the value of the x’s and the y’s.

6. Common Error Alert! • Students may incorrectly graph a point so that it is not collinear with the others. Encourage students to double check any points that are not collinear. (Collinear – points lying on the same line) In short, if you graph a point and it is NOT on the line, double check your work to ensure that you have not made a mistake!

7. Graphing Linear Equations 11-1 Course 3 If an equation is linear, a constant change in the x-valuecorresponds to a constant change in the y-value. The graph shows an example where each time the x-value increases by 3, the y-value increases by 2. 2 Hey! This is Important! you will see this again very soon! 3 2 3 2 3

8. Graphing Linear Equations 11-1 Course 3 Additional Example 1A: Graphing Equations Graph the equation and tell whether it is linear. A. y = 3x – 1 3(–2) – 1 –7 (–2, –7) 3(–1) – 1 –4 (–1, –4) (0, –1) 3(0) – 1 –1 3(1) – 1 2 (1, 2) (2, 5) 3(2) – 1 5

9. Graphing Linear Equations 11-1 Course 3 Additional Example 1A Continued The equation y = 3x – 1 is a linear equation because it is the graph of a straight line and each time x increases by 1 unit, y increases by 3 units.

10. Graphing Linear Equations 11-1 Course 3 Additional Example 1B: Graphing Equations Graph the equation and tell whether it is linear. B. y = x3 (–2)3 –8 (–2, –8) (–1)3 –1 (–1, –1) (0, 0) (0)3 0 (1)3 1 (1, 1) (2, 8) (2)3 8

11. Graphing Linear Equations 11-1 Course 3 Additional Example 1B Continued The equation y = x3 is not a linear equation because its graph is not a straight line. Also notice that as x increases by a constant of 1 unit, the change in y is not constant. +7 +1 +1 +7

12. Graphing Linear Equations 11-1 3x 4 Course 3 Additional Example 1C: Graphing Equations Graph the equation and tell whether it is linear. C. y = –

13. Graphing Linear Equations 11-1 The equation y = – is a linear equation because the points form a straight line. Each time the value of x increases by 1, the value of y decreases by or y decreases by 3 each time x increases by 4. 3x 3 4 4 Course 3 Additional Example 1 Continued

14. Graphing Linear Equations 11-1 Course 3 Additional Example 1D: Graphing Equations Graph the equation and tell whether it is linear. D. y = 2 2 2 (–2, 2) 2 2 (–1, 2) (0, 2) 2 2 2 2 (1, 2) (2, 2) 2 2 For any value of x, y = 2.

15. Graphing Linear Equations 11-1 Course 3 Additional Example 1D Continued The equation y = 2 is a linear equation because the points form a straight line. As the value of x increases, the value of y has a constant change of 0.

16. Graphing Linear Equations 11-1 Course 3 Try This: Example 1A Graph the equation and tell whether it is linear. A. y = 2x + 1 2(–2) + 1 –3 (–3, –3) 2(–1) + 1 –1 (–2, –1) (–1, 1) 2(0) + 1 1 2(1) + 1 3 (0, 3) (2, 5) 2(2) + 1 5

17. Graphing Linear Equations 11-1 Course 3 Try This: Example 1A Continued The equation y = 2x + 1is linear equation because it is the graph of a straight line and each time x increase by 1 unit, y increases by 2 units.

18. Group Work • The next 5 problems (3 equations & 2 word problems) will be done in groups of 2. • Each group will write and graph their answers on the handout provided. • A classroom participation grade will be given on this group work. • The groups are….

19. Graphing Linear Equations 11-1 Course 3 Try This: Example 1B Graphing the equation and tell whether it is linear. B. y = x2 (–2)2 4 (–2, 4) (–1)2 1 (–1, 1) (0, 0) (0)2 0 (1)2 1 (1, 1) (2, 4) (2)2 4

20. Graphing Linear Equations 11-1 Course 3 Try This: Example 1B Continued The equation y = x2 is not a linear equation because its graph is not a straight line.

21. Graphing Linear Equations 11-1 Course 3 Try This: Example 1C Graph the equation and tell whether it is linear. C. y = x –8 (–8, –8) –6 (–6, –6) (0, 0) 0 4 (4, 4) (8, 8) 8

22. Graphing Linear Equations 11-1 The equation y = x is a linear equation because the points form a straight line. Each time the value of x increases by 1, the value of y increases by 1. Course 3 Try This: Example 1C Continued

23. Graphing Linear Equations 11-1 Course 3 Try This: Example 1D Graph the equation and tell whether it is linear. D. y = 7 7 7 (–8, 7) 7 7 (–4, 7) (0, 7) 7 7 7 7 (4, 7) (8, 7) 7 7 For any value of x, y = 7.

24. Graphing Linear Equations 11-1 Course 3 Try This: Example 1D Continued The equation y = 7 is a linear equation because the points form a straight line. As the value of x increases, the value of y has a constant change of 0.

25. Graphing Linear Equations 11-1 Course 3 Additional Example 2: Sports Application A lift on a ski slope rises according to the equation a = 130t + 6250, where a is the altitude in feet and t is the number of minutes that a skier has been on the lift. Five friends are on the lift. What is the altitude of each person if they have been on the ski lift for the times listed in the table? Draw a graph that represents the relationship between the time on the lift and the altitude.

26. Graphing Linear Equations 11-1 Course 3 Additional Example 2 Continued

27. Graphing Linear Equations 11-1 Course 3 Additional Example 2 Continued (Chart might look like this…)

28. Graphing Linear Equations 11-1 Course 3 Additional Example 2 Continued The altitudes are: Anna, 6770 feet; Tracy, 6640 feet; Kwani, 6510 feet; Tony, 6445 feet; George, 6380 feet. This is a linear equation because when t increases by 1 unit, a increases by 130 units. Note that a skier with 0 time on the lift implies that the bottom of the lift is at an altitude of 6250 feet. Notice the broken line!

29. Summary of Stepsfor Graphing Equations • 1. Choose a value for x • 2. Substitute the x-value into the equation & find the corresponding y-value • 3. Form an ordered pair with the x and y-value • 4. Graph the ordered pair • 5. Repeat the process to achieve a minimum of 3 points

30. Graphing Linear Equations 11-1 14 Course 3 Insert Lesson Title Here Lesson Quiz Graph each equation and tell whether it is linear. 1.y = 3x – 1 2.y = x 3. y = x2 – 3 yes yes no

31. Homework for 12-10-07! • Answer the Essential Question on your homework paper for tonight • Homework workbook section 11-1