Transcript Auditorium
Auditorium Problem 6.RP - Understand ratio concepts and use ratio reasoning to solve problems. 7.RP - Analyze proportional relationships and use them to solve real-world and mathematical problems. 8.EE - Understand the connections between proportional relationships, lines, and linear equations. 5/7 of the students seated in an auditorium were girls. There are 48 more girls than boys. How many students are seated in the auditorium? Use Proportional Reasoning- Method 1 5/7 of the students seated in an auditorium were girls. There are 48 more girls than boys. How many students are seated in the auditorium? girls 5 x + 48 = = boys 2 x 5x = 2(x + 48) 5x = 2x + 96 3x = 96 What does 32 represent? x = 32 Use Proportional Reasoning - Method 1 5/7 of the students seated in an auditorium were girls. There are 48 more girls than boys. How many students are seated in the auditorium? x = 32 girls 5 x + 48 32 + 48 80 = = = = boys x 32 32 2 Total # of Students = 80 + 32 Total # of Students = 112 Use Proportional Reasoning – Method 2 5/7 of the students seated in an auditorium were girls. There are 48 more girls than boys. How many students are seated in the auditorium? 5 x + 48 girls = = 7 2x + 48 total 5(2x + 48) = 7(x + 48) 10x + 240 = 7x + 336 3x = 96 x = 32 Use Proportional Reasoning – Method 2 5/7 of the students seated in an auditorium were girls. There are 48 more girls than boys. How many students are seated in the auditorium? x = 32 girls 5 x + 48 = = total 7 2x + 48 Total # of Students = 2x + 48 Total # of Students =112 Use logical Reasoning- Method 3 5/7 of the students seated in an auditorium were girls. There are 48 more girls than boys. How many students are seated in the auditorium? If 5/7 of the students are girls, then 2/7 of the students have to be boys. Therefore the difference between girls and boys is 3/7 of the students and since there are 48 more girls than boys, then 3/7 of the students must be equal to 48. Use logical Reasoning- Method 3 If 5/7 of the students are girls, then 2/7 of the students have to be boys. Therefore the difference between girls and boys is 3/7 of the students and since there are 48 more girls than boys, then 3/7 of the students must be equal to 48. 7 7 3 · x = 48· 3 3 7 x =112 Use Model Drawings – method 4 5/7 of the students seated in an auditorium were girls. There are 48 more girls than boys. How many students are seated in the auditorium? Girls 16 16 16 16 16 48¸ 3 =16 Each box represents 16 48 Boys 16 16 Total # of Students =16 ´ 7 =112 Use Systems of Equations – Method 5 5/7 of the students seated in an auditorium were girls. There are 48 more girls than boys. How many students are seated in the auditorium? 5 ( b + g) = g 7 g = b + 48 Let g = # of girls Let b = # of boys Total # of students = b + g Use Systems of Equations – Method 5 5 ( b + g) = g 7 é5 ù 7 ê ( b + g ) = gú ë7 û 5 ( b + g) = 7g 5b + 5g = 7g 5b - 2g = 0 g = b + 48 5b - 2g = 0 5b - 2(b + 48) = 0 5b - 2b - 96 = 0 3b = 96 b = 32 Use Systems of Equations – Method 5 5 ( b + g) = g 7 g = b + 48 if b = 32 then g = 32 + 48 = 80 How many students are seated in the auditorium? Total # of Students = b + g = 32 + 80 =112 Use Systems of Equations – Method 6 5 ( b + g) = g 7 [ 7 ] g = b + 48 2 g = g + 48 5 5b + 5g = 7g -5g -5g æ2 ö æ2 ö -ç g÷ -ç g÷ è5 ø è5 ø 5b = 2g 5 5 2 b= g 5 g = b + 48 80 = b + 48 b = 32 æ 5ö 3 æ 5ö ç ÷ g = 48 ç ÷ è 3ø 5 è 3ø g = 80 Use Systems of Equations- Method 6 5/7 of the students seated in an auditorium were girls. There are 48 more girls than boys. How many students are seated in the auditorium? Let g = # of girls Let b = # of boys Total # of students = b + g =112 g = 80 b = 32 Discussion • How are the solution methods similar? • How are the solution methods different? • Identify correspondences between different solution methods. What is the Error? girls 5 x + 48 = = boys 2 x 2x + 48 = 5x 3x = 48 x =16 Total = x + x + 48 = 80 What is the Error? girls 5 x = = boys 2 x + 48 5(x + 48) = 2x 5x + 240 = 2x -3x = 240 x = -80 What is the Error? girls 5 x + 48 = = boys 7 x 5x = 7(x + 48) 5x = 7x + 336 2x = 336 x =168 Total = x + x + 48 = 384