PROJECT Objective To extend the U.S. traditional long division algorithm for single-digit divisors to four- and five-digit dividends and dividends in dollars-and-cents notation. 1 Doing the Project materials Recommended Use: After Lesson 9-9 and after Project 11. Key Activities Students explore and practice the U.S. traditional long division algorithm for single-digit divisors to four- and five-digit dividends and dividends in dollars-and-cents notation. Key Concepts and Skills Subtract multidigit numbers [Operations and Computation Goal 2] Apply multiplication facts to long-division situations. [Operations and Computation Goal 3] Solve equal-sharing division problems and number stories. [Operations and Computation Goal 4] Divide decimals by whole numbers. [Operations and Computation Goal 4] Key Vocabulary long division quotient dividend Math Journal, pp. 15 17 Student Reference Book, pp. 24E 24H and 4D 4F and bills (Math Masters, p. 428; optional) bills (optional) coins (optional) base-1 blocks (optional) index cards (optional) See Advance Preparation 2 Extending the Project materials Students write division number stories and use the U.S. traditional long division algorithm to solve them. Student Reference Book, pp. 24E 24H and 4D 4F Additional Information Today there are no longer any bills larger than in circulation, but it was not always so. Beginning in the late 192s and early 193s the U.S. Treasury issued a small number of large bills, including $5,,, $5,,,, and, bills. By the mid-194s, the Treasury stopped making these bills, and in 1969 President Nixon removed them from circulation because they were rarely used and attractive to counterfeiters. Technology See the itlg and isrb. Advance Preparation If you intend to have students use coins and bills to model the division problems, you will need and, bills. Make several copies of Third Grade Math Masters, page 41 for the bills or use index cards to create them. Use index cards to create, bills. 975U Project 12 Long Division, Part 2
1 Doing the Project Solving a Division Problem (Math Journal, p. 15) Ask students to solve Problem 1 on journal page 15. Tell them they may use paper and pencil or any tools they wish, except calculators. Have students discuss and share solutions. Expect a variety of approaches, including the U.S. traditional long division method, which was introduced in Project 11. Have students explain why each of the steps in their procedures make sense. For example: Sharing play money or base-1 blocks Using an informal paper-and-pencil method 4353 3 1353 3 153 3 753 3 453 3 153 15 3 3 for each player for each player for each player for each player for each player $5 for each player for each player + + + + + $5 + = 451 WHOLE-CLASS DISCUSSION Date PROJECT 12 Larger Dividends Time 1. Four friends were playing a board game. Jen quit. The three other players decided to divide Jen s money equally. Jen had $4,353. How much should each of the three other players get? Be ready to explain how you got your answer. 2. $5,385 / 5 4. 1,225 8,575 / 7,451,77 3. $7,896 / 6,316 Math Journal, p. 15 5. 2,79 8,127 / 3 Using the partial-quotients algorithm 3 4353-3 1353 12 153 15 3-3 1 4 5 3 1451 Using the U.S. traditional long division algorithm 1451 3 4353-3 13 12 15 15 3 3 Project 12 975V
Extending Long Division to Larger Dividends WHOLE-CLASS ACTIVITY,,,, After you have discussed students solutions, regardless of whether some students used the U.S. traditional long division algorithm, demonstrate the problem again as described below. Illustrate each step in the algorithm with pictures of play money. Help students make connections between the steps in the algorithm and the actions of sharing money. Step 1: Set up the problem. Think about sharing actual bills: 4 [,]s, 3 []s, 5 []s, and 3 []s. (See margin.) Long Division: $4,353 is to be shared. Three players will share Jen s money.,,,,,,, Step 2: Share the [,]s. Each player gets 1 [,]. There is 1 [,] left. (See margin.) Long Division: 1 Each player gets 1 [,]. 1 [,] each for 3 players 3 [,]s. 1 1 [,] is left. Step 3: Trade the 1 [,] for 1 []s. (See margin.) 1 1 []s from the 1 [,] 3 []s 13 []s. 975W Project 12 Long Division, Part 2
Step 4: Share the 13 []s. Each player gets 4 []s; 1 [] is left. (See margin.) 1 4 Each player gets 4 []s. 1 2 4 []s each for 3 players 12 []s. 1 1 [] is left. Step 5: Trade the 1 [] for 1 []s. (See margin.) 1 4 1 2 1 5 1 []s from the 1 [] 5 []s 15 []s. Step 6: Share the 15 []s. Each player gets 5 []s. (See margin.) 1 4 5 Each player gets 5 []s. 1 2 1 5 1 5 5 []s each for 3 players 15 []s. []s are left. Step 7: Share the 3 []s. Each player gets 1 []. (See margin.) 1 4 5 1 Each player gets 1 []s. 1 2 1 5 1 5 3 3 []s are to be shared. 3 1 [] each for 3 players 3 []s. []s are left to be shared.,,,,,,,,,,,, $4,353 / 3,451. Each of the continuing players gets,451. Project 12 975X
Date PROJECT 12 Time Larger Dividends continued Solving Long Division Problems (Math Journal, pp. 15 and 16; Student Reference Book, pp. 24E 24H) PARTNER ACTIVITY Fill in the missing numbers. 6. 7. 1 7 39 5 8695 5 36 35 1 9 15 4 5 45 542 6 3252 32 3 2 5 24 1 2 1 2 8. The total cost for one year (26-27) at University of California, Los Angeles (UCLA) is about $23,394 for a California resident living in a residence hall. Books and supplies account for about,544 of the total cost. a. How many hours of babysitting at $4 per hour would it take to earn,544? 386 hours Math Journal, p. 16 Date PROJECT 12 Dividing Dollars and Cents 1. Dennis solved $9.45 / 7 like this. a. Study Dennis s work. b. Explain to your partner how he solved the problem. 2. $8.92 / 4 4. 1.97 15.76 / 8 Time Solve these division problems using Dennis s method. b. How many hours of babysitting at $6 per hour would it take to earn $23,394? 3,899 hours 1. 3 5 7 9. 4 5 7 2 4 2 1 3 5 3 5 $2.23 3. $7.56 / 6.26 5. 2.13 19.17 / 9 Have partners use the U.S. traditional long division algorithm to solve the problems on journal pages 15 and 16. Students may find the examples on Student Reference Book, pages 24E 24H helpful. Extending Long Division to Dollars-and-Cents Notation (Math Journal, p. 17; Student Reference Book, pp. 4D 4F) Have students solve Problems 1 and 2 on journal page 17. As a class, discuss how Dennis solved the problem. Be sure to include the following points: The long division algorithm for dollars and cents looks almost exactly the same as for whole numbers. The money in Dennis s method would include dimes and pennies, not just bills as in whole-number long division with money. There are decimal points separating dollars from cents in Dennis s quotient and dividend. In whole-number long division there were no decimal points. With Dennis s method, we know exactly where the decimal point belongs. If we use partial quotients division to solve the problem, we use estimation to place the decimal point. For example, to solve $9.45 / 7 by partial quotients: Estimate the answer. $9.45 / 7 would be more than but less than $2. Divide as though the dividend were a whole number. 945 / 7 135 Use the estimate to place the decimal point in the quotient. Since the answer must be between and $2, the decimal point must go between the 1 and the 3;.35. Pose additional problems such as the following. Review Student Reference Book, pages 4D 4F as necessary..72 / 4 $.43 $7.5 / 5.41 $9.27 / 3 $3.9 $9.42 / 6.57 WHOLE-CLASS DISCUSSION Math Journal, p. 17 975Y Project 12 Long Division, Part 2
2 Extending the Project Writing and Solving Division Number Stories (Student Reference Book, pp. 24E 24H and 4D 4F) PARTNER ACTIVITY Decimals and Percents U.S. Traditional Long Division Method: Decimals You can use the U.S. traditional long division method to divide money in dollars and cents notation. Share $7.95 among 3 people:,, and. Have students write division number stories that include single-digit divisors, four- and five-digit dividends, and dividends in dollars-and-cents notation. Partners use the U.S. traditional long division algorithm to solve them. Students may find the examples on Student Reference Book, pages 24E 24H and 4D 4F helpful. Step 1: Share the []s. 2 Ò Each person gets 2 []s. Ò 2 []s each for 3 people 1 Ò 1 [] is left. Step 2: Trade the one [] for ten []s. 2 19 Ò 1 []s 9 []s 4D Student Reference Book, p. 4D Decimals and Percents Decimals and Percents continued continued Step 3: Share the []s. Step 5: Share the []s. 2.6 19 1 8 1 Step 4: Trade the one [] for ten []s. Ò Each person gets 6 []s. Write a decimal point above the line to show amounts less than. Ò 6 []s each for 3 people Ò 1 [] is left. 2.65 19 1 8 15 15 Ò Each person gets 5 []s. Ò 5 []s each for 3 people Ò []s are left. Each person gets $2.65. $7.95 / 3 $2.65 2.6 19 1 8 15 Ò 1 []s 5 []s Divide. 1. $6.25 / 5? 2. 5.7 5 3. 8 4.8 4. $38.96 / 4? Check your answers on page 347. 4E 4F Student Reference Book, p. 4E Student Reference Book, p. 4F Project 12 975Z