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Page 129 #24-57 ANSWERS Student Learning Goal Chart Lesson Reflections 3-1, 3-2, 3-3, 3-4, 3-5, 3-6 Pre-Algebra Learning Goal Students will understand rational and real numbers. Students will understand rational and real numbers by being able to do the following: • Learn to write rational numbers in equivalent forms (3.1) • Learn to add and subtract decimals and rational numbers with like denominators (3.2) • Learn to add and subtract fractions with unlike denominators (3.5) • Learn to multiply fractions, decimals, and mixed numbers (3.3) • Learn to divide fractions and decimals (3.4) • Learn to solve equations with rational numbers (3.6) 3-6 Solving Equations with Rational Numbers Today’s Learning Goal Assignment Learn to solve equations with rational numbers. Pre-Algebra 3-6 Solving Equations with Rational Numbers Pre-Algebra HW Page 138 #14-26 all Pre-Algebra Equations with Rational Numbers 3-6 Solving Equations with Rational Numbers 3-6 Solving Warm Up Problem of the Day Lesson Presentation Pre-Algebra Pre-Algebra 3-6 Solving Equations with Rational Numbers Warm Up Multiply. 1. 5 7 + 10 10 11 5 3 5 2. 2 –1 8 16 11 16 3. 4.8 + 3.6 8.4 4. 2.4 – 0.05 2.35 Pre-Algebra 3-6 Solving Equations with Rational Numbers Problem of the Day A computer word is made of strings of 0’s and 1’s. How many different words can be formed using 8 characters? (An example is 01010101.) 256 Pre-Algebra 3-6 Solving Equations with Rational Numbers Today’s Learning Goal Assignment Learn to solve equations with rational numbers. Pre-Algebra 3-6 Solving Equations with Rational Numbers Additional Example 1A: Solving Equations with Decimals. Solve. A. m + 4.6 = 9 m + 4.6 = 9 Subtract 4.6 from – 4.6 = – 4.6 both sides. m = 4.4 Remember! Once you have solved and equation it is a good idea to check your answer. To check your answer, substitute your answer for the variable in the original equation. Pre-Algebra 3-6 Solving Equations with Rational Numbers Additional Examples 1B: Solving Equations with Decimals Solve. B. 8.2p = –32.8 8.2p = –32.8 8.2 8.2 p = –4 Pre-Algebra Divide both sides by 8.2 3-6 Solving Equations with Rational Numbers Additional Examples 1C: Solving Equations with Decimals Solve. x C. 1.2 = 15 x = 1.2 • 15 1.2 • 1.2 x = 18 Pre-Algebra Multiply both sides by 1.2 3-6 Solving Equations with Rational Numbers Try This: Example 1A & 1B Solve. A. m + 9.1 = 3 m + 9.1 = 3 –9.1 = –9.1 Subtract 9.1 from both sides. m = –6.1 B. 5.5b = 75.9 75.9 5.5 b = 5.5 5.5 b = 13.8 Pre-Algebra Divide both sides by 5.5 3-6 Solving Equations with Rational Numbers Try This: Examples 1C Solve. y = 90 C. 4.5 y = 4.5 • 90 4.5 • 4.5 y = 405 Pre-Algebra Multiply both sides by 4.5 3-6 Solving Equations with Rational Numbers Additional Examples 2A: Solving Equations with Fractions Solve. 3 2 A. n + = – 7 7 2 2 3 2 n– + =– – 7 7 7 7 n=– Pre-Algebra 5 7 2 Subtract from both sides. 7 3-6 Solving Equations with Rational Numbers Additional Examples 2B: Solving Equations with Fractions Solve. B. y – 1 = 2 6 3 1 y 1 2 1 + – = + 6 6 3 6 4 1 y= + 6 6 5 y= 6 Pre-Algebra 1 Add to both sides. 6 Find a common denominator; 6. Simplify. 3-6 Solving Equations with Rational Numbers Additional Examples 2C: Solving Equations with Fractions Solve. C. 5 x = 5 6 8 5 6 5 63 • x= 8 • 5 6 5 4 3 x = 4 Pre-Algebra 6 Multiply both sides by . 5 Simplify. 3-6 Solving Equations with Rational Numbers Try This: Example 2A Solve. A. n + 1 = – 5 9 9 1 1 5 1 n– + =– – 9 9 9 9 2 n=– 3 Pre-Algebra 1 Subtract 9 from both sides. 6 Simplify – . 9 3-6 Solving Equations with Rational Numbers Try This: Example 2B Solve. 1 3 B. y – 2 = 4 1 y 1 3 1 + – = + 2 2 4 2 3 2 + 4 4 1 y= 1 4 y= Pre-Algebra 1 Add to both sides. 2 Find a common denominator; 4. Simplify. 3-6 Solving Equations with Rational Numbers Try This: Examples 2C Solve. 6 3x = C. 8 19 6 3x = 19 8 2 6 8 3 8 • • x = 19 31 8 3 16 x = 19 Pre-Algebra 8 Multiply both sides by . 3 Simplify. 3-6 Solving Equations with Rational Numbers Additional Examples 3: Solving Word Problems Using Equations Mr. Rios wants to prepare a casserole that requires 2 1 cups of milk. If he makes the 2 casserole, he will have only 3 cup of milk left 4 for his breakfast cereal. How much milk does Mr. Rios have? 2(2)+1 5 1 Convert fractions: 2 = = 2 2 2 Write an equation: Original amount of milk c Pre-Algebra – – Milk for casserole = 5 2 = Milk for cereal 3 4 3-6 Solving Equations with Rational Numbers Additional Examples 3 Continued Now solve the equation. c – 5 = 3 2 4 5 5 3 5 c – 2 +2 = 4 +2 3 10 c = 4 + 4 1 13 c = 4 , or 3 4 Mr. Rios has 3 Pre-Algebra 1 cups of milk. 4 Add 5 to both sides. 2 Find a common denominator, 4. Simplify. 3-6 Solving Equations with Rational Numbers Try This: Examples 3 2 Rick’s car holds 3 the amount of gasoline as his wife’s van. If the car’s gas tank can hold 15.5 gallons of gasoline, how much gasoline can the tank in the minivan hold? Convert decimal 15(2)+1 31 1 to a fraction: 15.5 = 15 = = 2 Write an equation: Van’s gas tank g Pre-Algebra • Ratio of car’s tank to van’s tank • 2 3 2 2 = Capacity of car’s tank = 31 2 3-6 Solving Equations with Rational Numbers Try This: Examples 3 Continued Now solve the equation. 31 2 g• = 2 3 3 g • 3 • 2 = 31 • 2 2 3 2 g = 93 4 Multiply both sides by 3 . 2 Simplify. 1 g = 23 4 The van’s gas tank holds 23 Pre-Algebra 1 gallons of gasoline. 4 3-6 Solving Equations with Rational Numbers Lesson Quiz: Part 1 Solve. 1. x – 23.3 = 17.8 x = 41.1 3 2 2. j + = –14 4 3 5 j = –15 12 3. 9y = 3 5 y= 1 15 d = 23 4. 5 8 1 d=9 2 Pre-Algebra 3-6 Solving Equations with Rational Numbers Lesson Quiz: Part 2 5. Tamara had 6 bags of mulch for her 1 garden. Each bag contained 8 lb of 3 mulch. What was the total weight of the mulch? 50 lb Pre-Algebra 3-6 Solving Equations with Rational Numbers Pre-Algebra
