Course 2

1. Course 2 Solving Multiplication Equations

2. Objectives • Review vocabulary • Review solving equations by adding or subtracting • Solve multiplication equations using Algebra tiles and paper and pencil • Solve practical problems

3. Review • Use the following to answer the questions: • 6x + 5 – 3y = 12 • Is it an equation, expression or an inequality? How do you know? • Identify the term(s). • Identify the variable(s). • Identify the constant(s). • Identify the coefficient(s). Equation, it has an equals sign 6x, 5, 3y and 12 x and y 5 and 12 6 and -3

4. Review Remember: Equations must be in balance, like a scale. • How would you solve this equation? • x – 4 = 12 • Use the opposite operation to undo the subtraction. • x – 4 + 4 = 12 + 4 • x = 16

5. Let’s look at how to solve an a multiplication equation.

6. Division Property of Equality • If you divide each side of an equation by the same nonzero number, the two sides remain equal.

7. Let’s Try It! • 1) 2x = -8 • What is the coefficient in this equation? • What is the opposite (inverse) of multiplying by 2? 2 Dividing by 2

8. 2x = -8 • Use the division property of equality: • Divide both sides of the equation by 2 • 2x = -8 • 2x = -8 2 2 • x = -4

9. 2x = -8 • Check: 2x = -8 • Replace the variable with the solution: • 2(-4) = -8 • -8 = -8

10. 2) -5m = 40 • What is the coefficient in this equation? • What is the opposite (inverse) of multiplying by -5? • Divide both sides of the equation by -5? • -5m = 40 • -5m = 40 -5 -5 • m = -8 -5 Dividing by -5

11. -5m = 40 • Check -5m = 40 • Replace the variable with the solution: • -5(-8) = 40 • 40 = 40

12. 3) 30 = 6n • What is the coefficient in this equation? • What is the opposite (inverse) of multiplying by 6? • Divide both sides of the equation by 6. • 30 = 6n • 30 = 6n 6 6 • 5 = n 6 Dividing by 6

13. 30 = 6n • Check 30 = 6n • Replace the variable with the solution: • 30 = 6(5) • 30 = 30

14. 4) 1.2x = -4.8 1.2 • What is the coefficient in this equation? • What is the opposite (inverse) of multiplying by 1.2? • Divide both sides of the equation by 1.2. • 1.2x = -4.8 • 1.2x = -4.8 1.2 1.2 • x = -4 Dividing by 1.2

15. 1.2x = -4.8 • Check 1.2x = -4.8 • Replace the variable with the solution: • 1.2(-4) = -4.8 • -4.8 = -4.8

16. 5) -3y = 2 • What is the coefficient in this equation? • What is the opposite (inverse) of multiplying by -3? • Divide both sides of the equation by -3. • -3y = 2 • -3y = 2 -3 -3 • y = -3 Dividing by -3

17. -3y = 2 • Check -3y = 2 • Replace the variable with the solution: • -3( ) = 2 • 2 = 2

18. Using an Equation to Solve a Problem • 1) Sarah earns $5 per hour when she baby-sits. How many hours does she need to work to earn $75? • Write an equation: • 5h = 75 • Solve the equation: • 5h = 75 5 5 h = 15 • Sarah must work 15 hours to earn $75.00.

19. Using an Equation to Solve a Problem. • 2) A 125 pound person uses 4.4 calories per minute when walking. How many minutes will it take this person to use 44 calories? • Write an equation: • 4.4m = 44 • Solve the equation: • 4.4m = 44 4.4 4.4 m = 10 • A 125 pound person must walk for 10 minutes to use 44 calories.