Do Now Simplify each expression: 1. (3x + y) – (2x + y) 1. 4(2x + 3y) – (8x – y) 1. 3(x + 4y)...
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Transcript of Do Now Simplify each expression: 1. (3x + y) – (2x + y) 1. 4(2x + 3y) – (8x – y) 1. 3(x + 4y)...
Do Now
Simplify each expression:
1. (3x + y) – (2x + y)
2. 4(2x + 3y) – (8x – y)
3. 3(x + 4y) + 2(2x – 6y)
4. (8x – 4y) + (-8x + 5y)
OBJECTIVE: SOLVE A SYSTEM OF LINEAR EQUATIONS IN TWO
VARIABLES BY THE ELIMINATION METHOD.
7-3, 7-4 Solving Linear Systems by Elimination
What is Elimination?
Elimination : Eliminating one variable from a system of equations by
(1) multiplying one or both equations by a constant, if necessary, and (2) adding the resulting equations.
Solving Systems by using Elimination
1. Multiply, if necessary, one or both equations by a constant so that the coefficients of one of the variables differ only in sign.
2. Add the revised equations from Step 1. Combining like terms will eliminate one variable. Solve for the remaining variable.
3. Substitute the value obtained in Step 2 into either of the original equations and solve for the other variable.
4. Check the solution in each of the original equations.
Solve
x + y = -1x – y = 9
Solve
x + 2y = -113x - 2y = -1
Multiply One Equation
2x – 3y = 64x – 5y = 8
Multiply One Equation
7x – 12y = -22-5x + 8y = 14
No Solution
-4x + 8y = -122x – 4y = 7