You can solve the following system of linear equations by graphing: x + 2y = 10 4x – y = -14 Point of intersection seems to be (-2, 6) What other systems.

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You can solve the following system of linear equations by graphing: x + 2y = 10 4x – y = -14 Point of intersection seems to be (-2, 6) What other systems of linear equations have the same solution? 1.We can add the equations. 2. We can subtract the equations.

Add x + 2y = x – y = -14 5x + y = -4 Subtract x + 2y = x – y = x + 3y = 24 5x + y = -4 and -3x + 3y = 24 have the same point of intersection as the original equations which created them. These are all equivalent systems of linear equations.

Multiply x + 2y = 10 by 4 and 4x – y = -14 by -2. Graph the original and two new equations on the same axes. 4x + 8y = 40 and -8x + 2y = 28 The lines are exactly the same as the original ones (because both sides got multiplied by the same number). Both have same point of intersection.

Just as we can add 2 equations and have the point of intersection be unchanged, and just as we can multiply both sides of an equation by the same number and have the point of intersection be unchanged, we can perform both these operations at the same time and still have the point of intersection be unchanged.

When you add/subtract the equations in a linear system: New linear system has same solutions as original system (same point of intersection) Graphs of new equations are different than graphs of original equations: When you multiply an equation with a constant other than 0: This does not change the graph of the equation New linear system has equations with same point of intersection as original equations