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EXAMPLE 1 Use the elimination method Solve the system. 4x + 2y + 3z = 1 Equation 1 2x – 3y + 5z = –14 Equation 2 6x – y + 4z = –1 Equation 3 SOLUTION STEP 1 Rewrite the system as a linear system in two variables. 4x + 2y + 3z = 1 12x – 2y + 8z = –2 Add 2 times Equation 3 to Equation 1. 16x + 11z = –1 New Equation 1
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EXAMPLE 1 2x – 3y + 5z = –14 –18x + 3y –12z = 3 Add – 3 times Equation 3 to Equation 2. –16x – 7z = –11 New Equation 2 STEP 2 Solve the new linear system for both of its variables. 16x + 11z = –1 Add new Equation 1 and new Equation 2. –16x – 7z = –11 4z = –12 z = –3 Solve for z. x = 2 Substitute into new Equation 1 or 2 to find x. Use the elimination method
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6x – y + 4z = –1 EXAMPLE 1 Use the elimination method STEP 3 Substitute x = 2 and z = – 3 into an original equation and solve for y. Write original Equation 3. 6(2) – y + 4(–3) = –1 Substitute 2 for x and –3 for z. y = 1 Solve for y.
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EXAMPLE 2 Solve a three-variable system with no solution Solve the system. x + y + z = 3 Equation 1 4x + 4y + 4z = 7 Equation 2 3x – y + 2z = 5 Equation 3 SOLUTION When you multiply Equation 1 by – 4 and add the result to Equation 2, you obtain a false equation. Add – 4 times Equation 1 to Equation 2. –4x – 4y – 4z = –12 4x + 4y + 4z = 7 0 = –5 New Equation 1
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EXAMPLE 2 Solve a three-variable system with no solution Because you obtain a false equation, you can conclude that the original system has no solution.
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EXAMPLE 3 Solve a three-variable system with many solutions Solve the system. x + y + z = 4 Equation 1 x + y – z = 4 Equation 2 3x + 3y + z = 12 Equation 3 SOLUTION STEP 1 Rewrite the system as a linear system in two variables. Add Equation 1 to Equation 2. x + y + z = 4 x + y – z = 4 2x + 2y = 8 New Equation 1
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EXAMPLE 3 Solve a three-variable system with many solutions x + y – z = 4 Add Equation 2 3x + 3y + z = 12 to Equation 3. 4x + 4y = 16 New Equation 2 Solve the new linear system for both of its variables. STEP 2 Add –2 times new Equation 1 to new Equation 2. Because you obtain the identity 0 = 0, the system has infinitely many solutions. –4x – 4y = –16 4x + 4y = 16
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EXAMPLE 3 Solve a three-variable system with many solutions STEP 3 Describe the solutions of the system. One way to do this is to divide new Equation 1 by 2 to get x + y = 4, or y = –x + 4. Substituting this into original Equation 1 produces z = 0. So, any ordered triple of the form (x, –x + 4, 0) is a solution of the system.
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GUIDED PRACTICE for Examples 1, 2 and 3 Solve the system. 1. 3x + y – 2z = 10 6x – 2y + z = –2 x + 4y + 3z = 7 ANSWER (1, 3, –2)
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GUIDED PRACTICE for Examples 1, 2 and 3 2. x + y – z = 2 2x + 2y – 2z = 6 5x + y – 3z = 8 ANSWER no solution
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GUIDED PRACTICE for Examples 1, 2 and 3 3. x + y + z = 3 x + y – z = 3 2x + 2y + z = 6 ANSWER Infinitely many solutions
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EXAMPLE 4 Solve a system using substitution Marketing The marketing department of a company has a budget of $30,000 for advertising. A television ad costs $1000, a radio ad costs $200, and a newspaper ad costs $500. The department wants to run 60 ads per month and have as many radio ads as television and newspaper ads combined. How many of each type of ad should the department run each month?
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EXAMPLE 4 Solve a system using substitution SOLUTION STEP 1 Write verbal models for the situation.
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EXAMPLE 4 Solve a system using substitution STEP 2 Write a system of equations. Let x be the number of TV ads, y be the number of radio ads, and z be the number of newspaper ads. x + y + z = 60 Equation 1 1000x + 200y + 500z = 30,000 Equation 2 y = x + z Equation 3 STEP 3 Rewrite the system in Step 2 as a linear system in two variables by substituting x + z for y in Equations 1 and 2.
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EXAMPLE 4 Solve a system using substitution x + y + z = 60 Write Equation 1. x + (x + z) + z = 60 Substitute x + z for y. 2x + 2z = 60 New Equation 1 1000x + 200y + 500z = 30,000 Write Equation 2. 1000x + 200(x + z) + 500z = 30,000 Substitute x + z for y. 1200x + 700z = 30,000 New Equation 2
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EXAMPLE 4 Solve a system using substitution STEP 4Solve the linear system in two variables from Step 3. Add –600 times new Equation 1 to new Equation 2. –1200x – 1200z = – 36,000 1200x +700z = 30,000 – 500z = – 6000 z = 12 Solve for z. x = 18 Substitute into new Equation 1 or 2 to find x. y = 30 Substitute into an original equation to find y.
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EXAMPLE 4 Solve a system using substitution ANSWER The solution is x = 18, y = 30, and z = 12, or (18, 30, 12). So, the department should run 18 TV ads, 30 radio ads, and 12 newspaper ads each month.
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GUIDED PRACTICE for Example 4 4. What IF? In Example 4, suppose the monthly budget is $25,000. How many of each type of ad should the marketing department run each month? ANSWER the department should run 8 TV ads, 30 radio ads, and 12 newspaper ads each month.
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