1. SWBAT… Solve a system of equations using the graphing method Tues, 2/5 Agenda 1. WU (5 min) 2. Notes (15 min) 3. Graphing method posters (30 min) Warm-Up: Set-up your notes – Topic is “System of Equations – Graphing Method” HW#1: Systems - Graphing

2. We are starting a new unit: System of Linear Equations SWBAT… 1. Solve a system of linear equations using the graphing method 2. Solve a system of linear equations using the substitution method 3. Solve a system of linear equations using the elimination method (adding, subtracting, or multiplying) 4. Write and solve a system of equations based on real life scenarios (application word problems) (3 – 4 week unit)

3. What should I already know to be successful in this unit (pre-requisite skills)? 1. Distributive property 2. Combining like terms 3. Solving a multi-step equation 4. Solving a literal equation 5. Finding the slope and y-intercept of lines 6. Graphing lines (solving for y) 7. Writing equations of lines in slope-intercept form 8. Writing and finding ordered pairs 9. Parallel lines and intersecting lines

4. MT = Math Tutoring T = Tuesday Th = Thursday R206 = Room 206 R208 = Room 208 MT = T + Th + R206 + R208

5. System of Equations: Graphing Method What is a system of equations?  A collection of equations involving the same set of variables.  We will be dealing with two equations and two variables. x – y = 2 3y + 2x = 9

6. Step 1) Write the equations of the lines in slope intercept form. Step 2) Graph each line on the same graph. Step 3) Determine the point of intersection and write this point as an ordered pair. If the two equations have no points in common, the system of equations has no solution. Parallel lines; same m and different b If the two equations represent the same line, the system of equations has infinitely many solutions. Same line; same m and same b Step 4) If there is one solution, check your work. Substitute the ordered pair for x and y in each equation.

7. Graph the system of equations. Determine whether the system has one solution, no solution, or infinitely many solutions. If the system has one solution, determine the solution and check your answer. x – y = 2 3y + 2x = 9 Step 1: Write each equation in slope-intercept form. x – y = 2 -x -x -y = -x + 2 y = x – 2 3y + 2x = 9 -2x -2x 3y = -2x + 9 333

8. x y Step 2: Graph each line on the same graph Step 3: Determine the point of intersection. (3,1). This system of equations has one solution, the point (3, 1). y = x – 2 Step 4: Check your answer 3 – 1 = 2 3(1) + 2(3) = 9 2 = 2 3 + 6 = 9 9 = 9

9. Activity-System of equations – Graphing Method You and a partner will be given a system of equations to graph on poster board Directions: 1. Solve the system using the graphing method (show work on poster) 2. Determine the number of solutions it has 3. If the system has one solution, name it 4. If the system has one solution, check your answer

10. SWBAT… Solve a system of equations using the graphing method Wed, 2/6 Agenda 1. WU (15 min) 2. Conclusions about graphing method and solutions (25 min) 3. Review HW#1 and graphing examples (10 min) Warm-Up: What are advantages and disadvantages to the graphing method.

11. Advantage to graphing? Graphing clearly shows whether a system of equations has one solution, no solution, or infinitely many solutions. It’s visual! Disadvantage to graphing? Finding the exact values of x and y from a graph can be difficult.

12. Graph the system of equations. Determine whether the system has one solution, no solution, or infinitely many solutions. If the system has one solution, determine the solution.

13. x y The two equations in slope-intercept form are: This system of equations has one solution, the point (3,0). The point of intersection of the two lines is the point (3, 0). Lines Intersect

14. The two equations in slope-intercept form are: x y This system of equations represents two parallel lines. This system of equations has no solution because these two lines have no points in common. Lines Do Not IntersectParallel Lines

15. The two equations in slope-intercept form are: These two equations represent the same line. Therefore, this system of equations has infinitely many solutions. Lines that are the Same x y

16. Compare slope (m) and the y-intercept ( b) Types of lines Picture /Diagram Number of solutions

17. Compare slope (m) and the y-intercept ( b) Types of lines Picture /Diagram Number of solutions One solution

18. Compare slope (m) and the y-intercept ( b) Types of lines Picture /Diagram Number of solutions Different slope (m) Same or different y-intercept (b ) Intersecting lines One solution

19. Compare slope (m) and the y-intercept ( b) Types of lines Picture /Diagram Number of solutions Different slope (m) Same or different y-intercept (b) Intersecting lines One solution No Solution

20. Compare slope (m) and the y-intercept ( b) Types of lines Picture /Diagram Number of solutions Different slope (m) Same or different y-intercept (b) Intersecting lines One solution Same slope (m) Different y-intercept (b) Parallel lines No Solution

21. Compare slope (m) and the y-intercept ( b) Types of lines Picture /Diagram Number of solutions Different slope (m) Same or different y-intercept (b) Intersecting lines One solution Same slope (m) Different y-intercept (b) Parallel lines No Solution Infinite Solutions

22. Compare slope (m) and the y-intercept ( b) Types of linesPicture /Diagram Number of solutions Different slope (m) Same or different y-intercept (b ) Intersecting lines One solution Same slope (m) but Different y-intercept (b) Parallel lines No Solution Same slope (m) and Same y-intercept (b) Same lines Infinite Solutions

23. HW#1: Systems-Graphing Method Answers: 1. 1 Solution: (1, 2) 2. 1 Solution: (-4, -2) 3. No Solution (parallel lines) 4. No Solution (parallel lines) 5. 1 Solution: (-3, 5) 6. Infinite Solutions

24. Exit Slip: On graph paper y = -x – 3 y – 2x = 6 1.Find the solution to the below system of equations using the graphing method. (Hint: Write each equation in slope-intercept form) 2.Write the solution as an ordered pair. 3.Check your answer.