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Systems of Linear Equations
Using a Graph to Solve
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Systems of Equations: Two or more linear equations that use the same variables. May or may not have a solution that makes all equations true.
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Solution to a System of Equations
Any ordered pair that makes all the equations in the system of equations true.
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3 Possible Solutions Infinitely many solutions (all solutions)
No solution One solution
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Infinitely Many Solutions
When the equations in the system are equal. When graphed, the equations will give you the same line.
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No Solution When two lines are parallel, meaning they have equal slopes. If they lines are parallel, all the points on the lines will be an equal distance apart, so they will never cross.
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One Solution In the form of an ordered pair.
This x and y value will make the equations in the system true. On a graph, this is the one point where the equations of lines in the system will cross.
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If the lines cross once, there
will be one solution. If the lines are parallel, there will be no solutions. If the lines are the same, there will be an infinite number of solutions.
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Graphing to Solve a Linear System
Let's summarize! There are 4 steps to solving a linear system using a graph. Step 1: Put both equations in slope - intercept form (y=mx+b). Solve both equations for y, so that each equation looks like y = mx + b. Step 2: Graph both equations on the same coordinate plane. Use the slope and y - intercept for each equation in step 1. Step 3: Estimate where the graphs intersect. This is the solution! LABEL the solution! Step 4: Check to make sure your solution makes both equations true. Substitute the x and y values into both equations to verify the point is a solution to both equations.
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How to Use Graphs to Solve Linear Systems
x y Consider the following system: x – y = –1 x + 2y = 5 Using the graph to the right, we can see that any of these ordered pairs will make the first equation true since they lie on the line. (1 , 2) We can also see that any of these points will make the second equation true. However, there is ONE coordinate that makes both true at the same time… The point where they intersect makes both equations true at the same time.
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How to Use Graphs to Solve Linear Systems
x 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.
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Graphing to Solve a Linear System
Solve the following system by graphing: 3x + 6y = 15 –2x + 3y = –3 Start with 3x + 6y = 15 Subtracting 3x from both sides yields 6y = –3x + 15 Dividing everything by 6 gives us… While there are many different ways to graph these equations, we will be using the slope - intercept form. Similarly, we can add 2x to both sides and then divide everything by 3 in the second equation to get To put the equations in slope intercept form, we must solve both equations for y. Now, we must graph these two equations.
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Graphing to Solve a Linear System
Solve the following system by graphing: 3x + 6y = 15 –2x + 3y = –3 x y Using the slope intercept form of these equations, we can graph them carefully on graph paper. (3 , 1) Label the solution! Start at the y - intercept, then use the slope. Lastly, we need to verify our solution is correct, by substituting (3 , 1). Since and , then our solution is correct!
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Graphing to Solve a Linear System
Let's do ONE more…Solve the following system of equations by graphing. x y 2x + 2y = 3 x – 4y = -1 LABEL the solution! Step 1: Put both equations in slope - intercept form. Step 2: Graph both equations on the same coordinate plane. Step 3: Estimate where the graphs intersect. LABEL the solution! Step 4: Check to make sure your solution makes both equations true.
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