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7.1 SOLVING LINEAR SYSTEMS BY GRAPHING • SOLVE A LINEAR EQUATION BY GRAPHING • MODELING A REAL LIFE PROBLEM USING A LINEAR SYSTEM WHAT IS A SYSTEM? Working with 2 equations at one time: Example: 2x – 3y = 6 X + 5y = -12 WHAT IS A SYSTEM OF EQUATIONS? A system of equations is when you have two or more equations using the same variables. The solution to the system is the point that satisfies ALL of the equations. This point will be an ordered pair. INTERSECTING LINES The point where the lines intersect is your solution. The solution of this graph is (1, 2) (1,2) How to Use Graphs to Solve Linear Systems y Consider the following system: x – y = –1 x + 2y = 5 We must ALWAYS verify that your coordinates actually satisfy both equations. (1 , 2) To do this, we substitute the coordinate (1 , 2) into both equations. x – y = –1 (1) – (2) = –1 x + 2y = 5 (1) + 2(2) = 1+4=5 Since (1 , 2) makes both equations true, then (1 , 2) is the solution to the system of linear equations. x SOLVING A SYSTEM OF EQUATIONS BY GRAPHING. Let's summarize! There are 3 steps to solving a system using a graph. Step 1: Graph both equations. Write each equation in a form that is easy to graph. (Slope and y – intercept or x- and yintercepts.) Be sure to use a ruler and graph paper! Step 2: Do the graphs intersect? This is the solution! LABEL the solution! Step 3: Check your solution. Substitute the x and y values into both equations to verify the point is a solution to both equations. 1. FIND THE SOLUTION TO THE FOLLOWING SYSTEM: 2x + y = 4 x-y=2 Graph both equations. I will graph using x- and y- intercepts (plug in zeros). 2x + y = 4 (0, 4) and (2, 0) x–y=2 (0, -2) and (2, 0) Graph the ordered pairs. 2. GRAPH THE EQUATIONS 2x + y = 4 (0, 4) and (2, 0) x-y=2 (0, -2) and (2, 0) Where do the lines intersect? (2, 0) 3. CHECK YOUR ANSWER! To check your answer, plug the point back into both equations. 2x + y = 4 2(2) + (0) = 4 x-y=2 (2) – (0) = 2 Graphing to Solve a Linear System Work on Foldable!!!! Solve the following system by graphing: 3x + 6y = 15 y –2x + 3y = –3 Using the slope intercept form of these equations, we can graph them carefully on graph paper. y = - 12 x + y = 23 x - 1 (3 , 1) 5 2 Start at the y - intercept, then use the slope. Label the solution! Lastly, we need to verify our solution is correct, by substituting (3 , 1). Since 3(3)+ 6 (1) = 15 and - 2(3)+ 3(1) = - 3 , then our solution is correct! x ASSIGNMENT Ch 7.1 (pg. 401-402) # 12-36 EVEN
