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Graphing Linear Systems Math Tech II Everette Keller
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Variables are unknown numbers in disguise represented by letters that are usually x or y.
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y = 3x + 4
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Two of more linear equations in the same variable form a system of linear equations, or simply a linear system.
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y = 3x y = x + 4
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A solution of a linear system in two variables is a pair of numbers a and b for which x = a and y = b make each equation a true statement. Such a solution can be written as an ordered pair (a,b) in which a and b are the values of x and y that solve the linear system. The point (a,b) that lies of the graph of each equation is called point of intersection of the graphs.
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Find the solution to the linear system by graphing 3x + 2y = 4 -x + 3y = -5
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Step 1 – Write each equation in a form that is easy to graph Step 2 – Graph both equations in the same coordinate plane Step 3 – Estimate the coordinates of the point of intersection Step 4 – Check whether the coordinates give a solution by substituting them into each equation of the original linear system.
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Find the solution to the linear system by graphing x + y = -2 2x – 3y = -9
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Find the solution to the linear system by graphing 3x - 2y = 11 -x + 6y = 7
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Find the solution to the linear system by graphing x + 3y = 15 4x + y = 6
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Find the solution to the linear system by graphing -15x + 7y = 1 3x – y = 1
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1.What is the independent and dependent variables mean in a linear function? 2.What makes the equation have a linear relationship? 3.Explain to me what a system of linear equations is 4.What does it mean for the lines to linear functions in a system to intersect?
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What are the benefits and limitations of solving linear systems through graphing?
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Find a real life problem that relates to solving linear systems by graphing and state it for the next class period Problems 1 – 10 on the Handout
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