Solving Systems Using Word Problems

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Presentation transcript:

Solving Systems Using Word Problems

Objectives Use reading strategies to write formulas Solve the equations using substitution or elimination

Steps to Follow 1. Identify Variables 2. Write 2 equations (Use key words and reading strategies to help) 3. Solve using substitution or elimination 4. Write answer in a complete sentence

Example 1 Kevin would like to buy 10 bouquets. The standard bouquet costs $7, and the deluxe bouquet costs $12. He can only afford to spend $100. How many of each type can he buy? Define Variables: X: standard bouquet Y: deluxe bouquet Equation 1 Cost: 7x+12y=100 Equation 2 Bouquets : x+y=10 Best Method : Elimination Solution: (4,6)

Example 3 A group of 3 adults and 10 students paid $102 for a cavern tour. Another group of 3 adults and 7 students paid $84 for the tour. Find the admission price for an adult ticket and a student ticket. Define Variables: x= adult ticket price y=student ticket price Equation 1 3x+10y=102 Equation 2 3x+7y=84 Best Method Solution (14,6) Elimination

Example 5 An Algebra Test contains 38 problems. Some of the problems are worth 2 points each. The rest of the questions are worth 3 points each. A perfect score is 100 points. How many problems are worth 2 points? How many problems are worth 3 points? Define Variables: x=2 pt. questions y=3 pt. questions Equation 1 x+y=38 Equation 2 2x+3y=100 Best Method Solution (14,24) Elimination or Substitution

Example 7 The perimeter of a parking lot is 310 meters. The length is 10 more than twice the width. Find the length and width. (Remember: P=2L+2W) Define Variables L=length W=width Equation 1 2L+2W=310 Equation 2 L=2W+10 Best Method Solution (106 2/3, 48 1/3) Substitution

Example 8 The sum of two numbers is 112. The smaller is 58 less than the greater. Find the numbers. Define Variables x=smaller number y=larger number Equation 1 x+y=112 Equation 2 x=y-58 Best Method Solution (27,85) Substitution

Example 9 The sum of the ages of Ryan and his father is 66. His father is 10 years more than 3 times as old as Ryan. How old are Ryan and his father? Define Variables x=Ryan’s age y=Dad’s age Equation 1 x+y=66 Equation 2 y=3x+10 Best Method Solution (14,52) Substitution

Example 12 The larger of two numbers is 7 less than 8 times the smaller. If the larger number is decreased by twice the smaller, the result is 329. Find the two numbers. Define Variables x=smaller number y=larger number Equation 1 y=8x-7 Equation 2 y-2x=329 Best Method Solution (56,441) Substitution