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APPENDIX B MULTIDIGIT MULTIPLICATION AND DIVISION Participants examine multidigit multiplication and division strategies that build on students’ understanding of single-digit multiplication and division. Participants learn about area models for multiplication and division. They examine the meaning of the traditional multiplication and division algorithms and variations of these algorithms. Lesson Goals Identify advanced strategies that children use to solve multidigit multiplication and division problems in sense-making ways Connect concepts of multiplication and division to standard procedures Discuss teaching strategies that enhance a child’s understanding of multidigit multiplication and division Word Bank skip counting area model expanded notation commutative property of multiplication associative property of multiplication distributive property of multiplication Focus Questions How does an understanding of the meaning of multiplication and division affect the appropriate and accurate use of these operations? What are some interim strategies students can use to develop multiplication and division procedures? How do interim strategies connect to the standard algorithms? UCLA Math Content Program for Teachers Multidigit Multiplication and Division COMP5 – PG1 Appendix B MULTIDIGIT MULTIPLICATION AND DIVISION (Estimated Time: 4 hours) Lesson Summary Lesson Goals Word Bank Participants examine multidigit multiplication and division strategies that build on students’ understanding of single-digit multiplication and division. Participants learn about area models for multiplication and division. They examine the meaning of the traditional multiplication and division algorithms and variations of these algorithms. • Identify advanced strategies that children use to solve multidigit multiplication and division problems in sense-making ways • Connect concepts of multiplication and division to standard procedures • Discuss teaching strategies that enhance a child’s understanding of multidigit multiplication and division skip counting area model expanded notation commutative property of multiplication associative property of multiplication distributive property of multiplication Materials Reproducibles Blank paper 3-4 LUCIMATH Video TV/VCR Base-10 blocks OH base-10 blocks Overhead transparencies and pens Chart paper and markers R1-3*: Teaching and Learning Notes Participant Pages Overhead Transparencies Focus Questions PP1: Summary Page PP2: Selected CA Math Standards PP3: A Warmup PP4: 27 X 4 PP5-6: Multiplication and Division Strategies PP7: Analyze and Assess PP8-9: Student Work PP10: Strategies that Promote Classroom Discourse PP11: The Art of Questioning in Mathematics PP12: The Importance of Recording PP13: Using Area Models PP14-17: Algorithms from Around the World PP18: Journal 1: Algorithms Around the World PP19: Brown and Green PP20-22: Multidigit Division Student Work PP23: Journal 2: Base-10 Block Division PP24: Problem Starters PP25-30: Multicultural Mathematics Article OH1: Focus Questions OH2: CA Math Standards – In Brief OH3: A Warmup OH4: Multiplication and Division Strategies OH5: Division Questions • How does an understanding of the meaning of multiplication and division affect the appropriate and accurate use of these operations? • What are some interim strategies students can use to develop multiplication and division procedures? • How do interim strategies connect to the standard algorithms? • How might we increase parental involvement for children? Problem of the Week Journal Idea Assessment Idea Problem Starters* Select one of the algorithms from around the world. Explain how it works and why it works. Write a story problem to go along with 380÷20 = 19. Solve problem two different ways. Identify problem type and strategies used to solve it. *Use as preview or review Strategies for Special Needs • Use physical models (ALL) • Ask students to explain strategies to each other (ELL, L-R, L-E) • Encourage students to use the fourfold way (pictures, numbers, symbols, words) to explain strategies in writing (ALL) Prepare Ahead *distribute as desired UCLA Math Content Program for Teachers Multidigit Multiplication and Division COMP5 – PG2 Appendix B MULTIDIGIT MULTIPLICATION AND DIVISION This module builds on the concepts developed in the single-digit multiplication and division module (COMP4). Students extend strategies involving direct modeling, counting, and derived facts to multidigit operations. An important new strategy that students use is a grouping strategy. The grouping strategy is based on a stronger content knowledge of place value, which is further developed in third grade. Grouping strategies lead naturally to the traditional algorithm for multiplication. The area model provides a concrete picture for visualizing grouping strategies and for interpreting the laws of arithmetic. Formal strategies for solving multidigit multiplication and division problems depend on base-10 number concepts. It has usually been assumed that it is necessary for children to develop base-10 number concepts before they add, subtract, multiply, and divide two- and three-digit numbers. According to research in the field of Cognitively Guided Instruction, this assumption is not valid. As long as children can count, they can solve problems involving two-digit numbers even when they have limited notions of grouping by ten. By encouraging the use of sense-making strategies for computation, teachers can help children develop computational proficiency as they develop meaning for the number system. R1-3* (Teaching and Learning Notes) are reproductions of many FYI boxes in this lesson. They provide an additional reference for participants. Instructors may distribute them as desired. Preview (5 minutes) Use OH1 (Focus Questions) and PP1 (Summary Page) to introduce the goals of the lesson. Use OH2, PP2 (California Math Standards) to introduce standards addressed in the lesson. Participants may want to make a note of them on appropriate participant pages. Some participants may need a fast review of some of the properties of real numbers: • Commutative Property of multiplication: ab = ba 3(4) = 4(3) • Associative Property of multiplication: (ab)c = a(bc) (2 x 3) x 4 = 2 x (3 x 4) • Distributive Property (connects multiplication and addition): a (b + c) = ab + ac 3(5 + 2) = 3(5) + 3(2) UCLA Math Content Program for Teachers Multidigit Multiplication and Division COMP5 – PG3 Appendix B Part One: Multiplication Warmup (15 minutes) Use OH3, PP3 (A Warm-up) to remind participants of useful estimation and mental math strategies for multiplication. (Useful procedural strategies include determining the number of digits in a solution, rounding, and understanding how to multiply by powers of 10.) Introduce (20 minutes) (Pairs) Use PP4 (27 X 4). Invite participants to compute 27 X 4 two different ways using pictures, words, or numbers; explain one of their solutions strategies to their partner; and be prepared to explain their partner’s solution to the whole group. Think-Pair-Share: A Strategy for Students with Special Needs Activities where students first work on a problem individually, then exchange ideas with a partner, and finally discuss with a larger group are called “thinkpair-share” activities. Think-pair-share gives students opportunities to talk in a safe environment. It is especially recommended for English language learners and students with receptive or expressive language disorders. (Whole group) Participants share the varied strategies of their partners with the whole group. Demonstrate appropriate recording strategies on chart paper. Name invented strategies (i.e. Lindsay’s way). Use OH4, PP5-6 (Multiplication and Division Strategies). Identify participant strategies used in the 27 X 4 example and arrange the various solutions in a developmental sequence. Use the “Possible Developmental Sequence” chart below as a backup to discuss any strategies not demonstrated. POSSIBLE DEVELOPMENTAL SEQUENCE FOR MULTIPLICATION Direct Modeling (record by 1s) Direct Modeling (count in chunks) Counting (repeated addition, skip counting) Modeling (using 10s and 1s) Written Records (using 10s and 1s) Other invented strategies (Double half, benchmarks, distributive property) Algorithm (compact recording) UCLA Math Content Program for Teachers Multidigit Multiplication and Division COMP5 – PG4 Appendix B Explore: Student Work (20 minutes) Use PP7 (Analyze and Assess) and PP8-9 (Student Work). Participants analyze student work. Encourage participants to discuss the mathematical knowledge that each student knows and an appropriate question to ask each student that would help to clarify or extend their thinking. ABOUT THE STUDENT WORK This student work came from a third grade classroom in Phoenix, Arizona. The class contained 29 students: 11 girls and 18 boys. It was predominately Caucasian, but had an equal share of African American, Native American, Asian, and Hispanic students. The socio-economic level of this class ranged from affluent to free lunch status with the majority of the students falling in the middle range. The math class included 3 resource students, 6 ELL (minimal or no English) students, 3 severe behavior students, and 4 gifted students. All participated in the daily math lessons. • What does the child know? [A: Advanced Grouping; B: Advanced Counting; C: Direct Modeling; D: Advanced Counting; E: Advanced Grouping; F: Standard Algorithm; G: Advanced Direct modeling; H: Advanced Grouping.] • What might be a good next step? [See “Next Step” Talking Points.] NEXT STEP TALKING POINTS Although base-10 number concepts are not prerequisites for solving multidigit problems, this knowledge increases efficiency of finding solutions. Encourage children to solve problems using tens. Multiplication problems normally place the larger number above the smaller number when using a vertical alignment. For some student strategies, the work is not lined up in traditional columns. Most students will eventually move to the more conventional-looking alignment. It is important for the teacher to focus attention on the meaning of the operation, the student’s understanding of the problem, and the student’s ability to solve the problem, rather than simply the procedure to get the answer. Students will develop mathematical thinking and reasoning by solving problems in two ways and sharing strategies with the class. Identify properties of arithmetic (such as commutative property) that are illustrated by the various student strategies. Encourage children to show multiplication with rectangular arrays. This is a good way to show partial products and the distributive property. Classroom Connection (20 minutes) Use PP10 (Strategies that Promote Classroom Discourse). Show Video Clip 1 (24 x 9). Ask participants to pay close attention to the teacher’s role in facilitating classroom discussions about mathematics. UCLA Math Content Program for Teachers Multidigit Multiplication and Division COMP5 – PG5 Appendix B # Who 1 Susan Aldridge’s 4th Grade Class Problem 24 X 9 Strategy Talking Points Notice how teacher records Sofia’s Sofia (girl with pigtails) benchmark numbers, repeated strategy. addition, compensation. Ken: Comment on teacher recording Ken (boy with red shirt) benchmark numbers, doubles, strategy (note error in writing equalities; teacher might use arrows incremental addition. instead). Explain how Alison uses distributive Alison (gray sweatshirt) grouping, distributive property. property to multiply. Explain how Rachel uses Rachel (girl with glasses) grouping, distributive property. distributive property to multiply. Permission for limited use of this video clip was granted by Creative Publications, 2001. • What is mathematical discourse? [Discourse is a process where students present mathematical explanations and evaluate strategies by verifying, challenging, and comparing them.] • The teacher does not correct wrong answers or tell how to carry out the computation. What message do you think this communicates to students? [Rather than give students the message that “teaching is telling,” the teacher models a disposition towards mathematics and a way of thinking that she wants her students to develop.] • What are some of the benefits of having the teacher record the steps of students’ solutions? What did you like or dislike about her recordings? [Teacher recordings help discussion move more quickly. Skillful recordings help students follow each other’s explanations and connect symbolic notation to informal language and language of mathematics. Teachers may find it beneficial to record class strategies on chart paper for future reference.] • At one point in the lesson, the teacher wrote “225-10=215+1=216”. Do you think this notation is problematic? Why or why not? [The statements are not all equal to each other. Arrows indicating sequential thinking would be more appropriate here.] Use PP11 (The Art of Questioning in Mathematics) and PP12 (The Importance of Recording) to discuss appropriate classroom questioning and recording techniques. UCLA Math Content Program for Teachers Multidigit Multiplication and Division COMP5 – PG6 Appendix B Part Two: Area Models Introduce (15 minutes) This part of the lesson focuses on area models, another sense-making strategy that draws upon students understanding of base-10 number concepts and expanded notation. Use base-10 blocks. Put 14 X 3 on the overhead as 3 rows of 14. • How can we use this model to help us solve this problem? [3 groups of 14 ones, 14 groups of 3, area of rectangle that is 3 by 14, 3 groups of 10 and 3 groups of 4.] • Does the mathematical meaning change if the array is rotated 90 degrees? [No, by Commutative Property.] Using base-10 blocks, guide participants through the use of an area model to find 12 X 13, emphasizing how the distributive property is used. See “12 X 13 – Area Models” below. 12 X 13 – AREA MODELS 12 rows of 13 12 X 10 = 120 12 X 3 = 36 156 12 rows of 13 10 X 13 = 130 2 X 13 = 26 156 13 rows of 12 13 X 10 = 130 13 X 2 = 26 156 Rectangle 12 X 3 100 + 20 + 30 + 6 = 156 Many people learned the FOIL method (First, Outer, Inner, Last), which applies the distributive property of multiplication twice. Note that the order of multiplication does not matter as long as all of the products are found. (10 + 2)(10 + 3) UCLA Math Content Program for Teachers Multidigit Multiplication and Division COMP5 – PG7 Appendix B Explore (10 minutes) (Pairs/Tables) Use PP13 (Using Area Models) and base-10 blocks. Participants use area models (blocks or drawings) to find products. They record the solution both pictorially and numerically. Summarize (10 minutes) Invite participants to make overheads to share their approaches to the problem. Be sure a variety of approaches are included. • How did the blocks help you to solve the problems? • How might the base-10 blocks help a student connect concepts of multiplication to written recordings of multiplication? [Many common student errors for multiplication center around place value, and confusion between the name of the digit and the value of the digit. In the numeral 24, the first digit has a name of 2 (two), but it has a value of 20. Base-10 blocks make this distinction clear.] Connect the area models to the traditional algorithm. See 12 X 13 – Connections to the Traditional Algorithm. • Identify some specific mathematical ideas that are used in the traditional algorithm? [Place value, derived facts, addition, use of distribute property.] • Do you think that using base-10 blocks helps to give meaning to the multiplication algorithm? How? [One common concern when using models is that students will not make connections between the concrete models, their representations, and the mathematical concept. Base-10 blocks as an area model emphasize distributive property and provide a visual representation to the partial products of the multiplication algorithm.] 12 X 13 – Connections to Traditional Algorithm 12 rows of 13 12 x10 = 12 x 3 = Traditional Algorithm 12 x 13 120 36 156 UCLA Math Content Program for Teachers Multidigit Multiplication and Division 12 x 13 36 12 156 Rectangle 12 x 13 6 30 20 100 156 =2x3 = 10 x 3 = 10 x 2 = 10 x 10 COMP5 – PG8 Appendix B Extend (5 minutes) Demonstrate the area multiplication recording model for a larger problem. Students eventually outgrow the usefulness of manipulatives. However, drawing on their experiences with area models, students can now represent problems conceptually with expanded notation. Multiply 23 X 143 143 x 23 2000 800 300 60 120 + 9 3289 100 20 + 40 + 3 2000 800 60 300 120 9 + 3 Show how the area model extends for multiplying polynomials. x Multiply (x+2) (x+3) x 2 = x + 2x + 3x + 6 + 2 x2 2x 3x 6 + = x2 + 5x + 6 3 Use PP14-17 (Algorithms from Around the World), PP18 (Journal 1), and PP25-30 (Multicultural Mathematics Article). Invite participants to read about algorithms from around the world and explain one or more of them. Part Three: Division Introduce (15 minutes) (Pairs) Use PP19 (Brown and Green). Solve each problem two different ways. Try to use “child” strategies such as doubles, halves, and easy multiplication facts to solve the problems. • What did you do to solve these problems? • What operations were involved? • Do you consider the situation multiplication or division? Why? UCLA Math Content Program for Teachers Multidigit Multiplication and Division COMP5 – PG9 Appendix B • Compare your strategies others. How are they alike? How are they different? Did the problem type (partitive or measurement division) change your strategy? Record participant’s strategies exactly as given on chart paper (i.e. drawing pictures, repeated addition, repeated subtraction, manipulatives, multiplication facts, traditional algorithm). If necessary, ask clarifying questions to help these recordings make sense to others. Reinforce the importance of recording. Even when children explain their thinking orally, they may have difficulty putting their ideas into written form. Teachers who record as students explain strategies help them learn to represent their ideas in writing. In the classroom, recordings make student explanations public, serve as models, allow for comparisons and discussions, and help other children develop alternative strategies. Learning to record children’s thinking takes practice. Teachers can develop recording systems by watching how children record their thinking, and helping them to refine their methods. Explore 1/Summarize (30 minutes) (Whole group) Use PP20-22 (Multidigit Division Student Work). Participants analyze student work. Encourage participants to discuss the mathematical knowledge that each student knows, evaluate the efficiency of the student strategies for 3rd graders or 4th graders, and the extent the strategies can be generalized. Discuss strategies. • What number facts and strategies were most important in the student solutions? [Doubling, multiplying by 10, addition.] • What mathematical ideas did students use to solve the problems? [Kept numbers intact, kept the problem in mind, and performed actions of fair share division or measurement division.] • What mathematics do the students need to understand to “do” these interim algorithms? [Multiplication strategies, addition, subtraction, and derived facts.] • To what extent do these strategies generalize? offer good transitions toward a more traditional division algorithm? [Most interim strategies are based on writing the total amount for each step of the procedure; the traditional algorithm shortcuts this step by using carrying and addition for the next step thus reducing four steps in a double digit problem to two steps.] UCLA Math Content Program for Teachers Multidigit Multiplication and Division COMP5 – PG10 Appendix B Explore 2 (10-20 minutes) (Pairs/Tables) Use PP23 (Journal 2: Base-10 Block Division). Invite participants to think about how they might connect the manipulative to the standard division algorithm. Show Video Clip 2 (Marilyn Burns Division). Pay special attention to the language Marilyn uses to explain the algorithm. # Who Problem Strategy Talking Points Pay attention to the questions Marilyn asks: Marilyn • How many did you put in each Burns with Connects base-10 blocks group? 2 435 divided by 3 to division algorithm three 4th • How much did you use graders altogether? • How much is left on your board? Permission for limited use of this video clip was granted by Marilyn Burns and Associates. 2001 Summarize (10 minutes) (Pairs) Use OH5 (Division Questions). Allow time after the video clip for participants to role-play (Marilyn – Student) to practice modeling the algorithm as Marilyn did with the boys. Use PP25 (Problem Starters) as a homework problem of the week if desired. Closure (5 minutes) Use OH2, PP2 (California Math Standards) to revisit standards. Connect module activities to student outcome goals. Activity Estimation Warm up Multidigit strategies for multiplication & division Area modelmultiplication Multiplication & Division algorithms Grade 2 NS 3.1, 3.2, 3.3 AF 1.1 NS 3.1 Grade 3 NS 1.3, 1.5, 2.4 Grade 4 NS 1.3 NS 2.1, 2.3, 2.4 AF 1.1, 1.5 AF 1.5 NS 1.3, 1.5 NS 1.3, 1.5, 2.3, 2.4 AF 1.5 NS 3.2, 3.3, 3.4 MG 1.0 Grade 5 AF 1.3 NS 3.2, 3.3, 3.4 Use OH1 (Focus Questions) and PP1 (Summary Page) to revisit the goals for the lesson. Tie up loose ends. UCLA Math Content Program for Teachers Multidigit Multiplication and Division COMP5 – PG11 Appendix B TEACHING AND LEARNING NOTES This module builds on the concepts developed in the single-digit multiplication and division module (COMP4). Students extend strategies involving direct modeling, counting, and derived facts to multidigit operations. An important new strategy that students use is a grouping strategy. The grouping strategy is based on a stronger content knowledge of place value, which is further developed in third grade. Grouping strategies lead naturally to the traditional algorithm for multiplication. The area model provides a concrete picture for visualizing grouping strategies and for interpreting the laws of arithmetic. Formal strategies for solving multidigit multiplication and division problems depend on base-10 number concepts. It has usually been assumed that it is necessary for children to develop base-10 number concepts before they add, subtract, multiply, and divide two- and three-digit numbers. According to research in the field of Cognitively Guided Instruction, this assumption is not valid. As long as children can count, they can solve problems involving two-digit numbers even when they have limited notions of grouping by ten. By encouraging the use of sensemaking strategies for computation, teachers can help children develop computational proficiency as they develop meaning for the number system. Some participants may need a fast review of some of the properties of real numbers: • Commutative Property of multiplication: ab = ba 3(4) = 4(3) • Associative Property of multiplication: (ab)c = a(bc) (2 x 3) x 4 = 2 x (3 x 4) • Distributive Property (connects multiplication and addition): a (b + c) = ab + ac 3(5 + 2) = 3(5) + 3(2) POSSIBLE DEVELOPMENTAL SEQUENCE FOR MULTIPLICATION Direct Modeling (record by 1s) Direct Modeling (count in chunks) Counting (repeated addition, skip counting) Modeling (using 10s and 1s) Written Records (using 10s and 1s) Other invented strategies (Double half, benchmarks, distributive property) Algorithm (compact recording) UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – R1 Appendix B ABOUT THE STUDENT WORK This student work came from a third grade classroom in Phoenix, Arizona. The class contained 29 students: 11 girls and 18 boys. It was predominately Caucasian, but had an equal share of African American, Native American, Asian, and Hispanic students. The socio-economic level of this class ranged from affluent to free lunch status with the majority of the students falling in the middle range. The math class included 3 resource students, 6 ELL (minimal or no English) students, 3 severe behavior students, and 4 gifted students. All participated in the daily math lessons. 12 X 13 – PART 1 – AREA MODELS 12 rows of 13 13 rows of 12 12 X 10 = 120 12 X 3 = 36 156 13 X 10 = 130 13 X 2 = 26 156 Rectangle 12 X 3 12 rows of 13 100 + 20 + 30 + 6 = 156 10 X 13 = 130 2 X 13 = 26 156 Many people learned the FOIL method (First, Outer, Inner, Last) which applies the distributive property of multiplication twice. Note that the order of multiplication does not matter as long as all of the products are found. (10 + 2)(10 + 3) 12 X 13 – Part 2: Connections to Traditional Algorithm 12 rows of 13 12 x10 = 12 x 3 = Traditional Algorithm 12 x 13 120 36 156 UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division 12 x 13 36 12 156 Rectangle 12 x 13 6 30 20 100 156 =2x3 = 10 x 3 = 10 x 2 = 10 x 10 COMP5 – R2 Appendix B Multiply 23 X 143 143 x 23 2000 800 300 60 120 + 9 3289 100 20 + 40 800 60 300 120 9 + 3 x = x + 2x + 3x + 6 2 = x + 5x + 6 3 2000 Multiply (x+2) (x+3) 2 + x + 2 x2 2x 3x 6 + 3 Even when children explain their thinking orally, they may have difficulty putting their ideas into written form. Teachers who record as students explain strategies help them learn to represent their ideas in writing. In the classroom, recordings make student explanations public, serve as models, allow for comparisons and discussions, and help other children develop alternative strategies. Learning to record children’s thinking takes practice. Teachers can develop recording systems by watching how children record their thinking, and helping them to refine their methods. UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – R3 Appendix B FOCUS QUESTIONS • How does an understanding of the meaning of multiplication and division affect the appropriate and accurate use of these operations? • What are some interim strategies students can use to develop multiplication and division procedures? • How do interim strategies connect to the standard algorithms? • How does parental involvement affect the teaching and learning of mathematics? UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – OH1 Appendix B CA MATH STANDARDS – IN BRIEF Grade 2 • Strategies for multiplication and division • Concept of division Grade 3 • Multiplication and division as inverses • Procedures for multiplication and division • Commutative and associative properties • Represent quantities with expressions, sentences, inequalities Grade 4 • Rounding • Multiplication and division algorithms • Long division (1 digit divisors) Grade 5 • Distributive property UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – OH2 Appendix B A WARMUP Find each answer: 1) 3 X 4 = 2) 30 X 4 = 3) 300 X 40 4) 3 X 0.4 What strategies did you use to find the answers? Estimate each answer: 5) 34 x 56 = 6) 383 X 420 7) 15.09 X 3.4 8) 6390 divided by 32 What strategies did you use to estimate? UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – OH3 Appendix B MULTIPLICATION AND DIVISION STRATEGIES Direct Modeling Strategies Counting Strategies Derived Fact Strategies Grouping Strategies Other Invented Strategies UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – OH4 Appendix B DIVISION QUESTIONS To connect division using blocks to the division algorithm, ask: 1. How many did you put in each group? 2. How much did you use altogether? 3. How much is left on your board? UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – OH5 Appendix B MULTIDIGIT MULTIPLICATION AND DIVISION Participants examine multidigit multiplication and division strategies that build on students’ understanding of single-digit multiplication and division. Participants learn about area models for multiplication and division. They examine the meaning of the traditional multiplication and division algorithms and variations of these algorithms. Lesson Goals Identify advanced strategies that children use to solve multidigit multiplication and division problems in sense-making ways Connect concepts of multiplication and division to standard procedures Discuss teaching strategies that enhance a child’s understanding of multidigit multiplication and division Word Bank skip counting area model expanded notation commutative property of multiplication associative property of multiplication distributive property of multiplication Focus Questions How does an understanding of the meaning of multiplication and division affect the appropriate and accurate use of these operations? What are some interim strategies students can use to develop multiplication and division procedures? How do interim strategies connect to the standard algorithms? UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP1 Appendix B SELECTED CA MATH STANDARDS Grade 2 NS3.1 Use repeated addition, arrays, and counting by multiples to do multiplication. NS3.2 Use repeated subtraction, equal sharing, and forming equal groups with remainders to do division. NS3.3 Know the multiplication tables for 2s, 5s, and 10s (“two times ten”) and commit them to memory. AF1.1 Use the commutative and associative rules to simplify mental calculations and to check results. Grade 3 NS1.3 Identify the place value for each digit in numbers to 10,000. NS1.5 Use expanded notation to represent numbers (e.g. 3,206 = 3,000 + 200 +6). NS2.1 Find the sum or difference of two whole numbers between 0 and 10,000. NS2.3 Use the inverse relationship of multiplication and division to compute and check results. NS2.4 Solve simple problems involving multiplication of multidigit numbers by one-digit numbers (3671 x 3 = ). AF1.1 Represent relationships of quantities in the form of mathematical expressions, equations, and inequalities. AF1.5 Recognize and use the commutative and associative properties of multiplication. Grade 4 NS1.3 Round whole numbers through the millions to the nearest ten, hundred, thousand, ten thousand, or hundred thousand. NS3.2 Demonstrate an understanding of, and the ability to use, standard algorithms for multiplying a multidigit number by a two-digit number and for dividing a multidigit number by a one-digit number; use relationships between them to simplify computations and to check results. NS3.3 Solve problems involving multiplication of multidigit numbers by two-digit numbers. NS3.4 Solve problems involving division of multidigit numbers by one-digit numbers. MG1.0 Students understand perimeter and area. Grade 5 AF1.3 Know and use the distributive property in equations and expressions with variables. Activity Grade 2 Estimation Warm up Multidigit strategies for NS 3.1, 3.2, 3.3 multiplication & division AF 1.1 Area modelNS 3.1 multiplication Multiplication & Division algorithms NS: Number Sense MG: Measurement and Geometry Grade 3 NS 1.3, 1.5, 2.4 Grade 4 NS 1.3 NS 2.1, 2.3, 2.4 AF 1.1, 1.5 NS 1.3, 1.5 AF 1.5 NS 1.3, 1.5, 2.3, 2.4 AF 1.5 NS 3.2, 3.3, 3.4 UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division MG 1.0 Grade 5 AF 1.3 NS 3.2, 3.3, 3.4 AF: Algebra and Functions COMP5 – PP2 Appendix B A WARMUP Find each product: 9) 3x4= 10) 30 x 4 = 11) 300 x 40 12) 3 x 0.4 What strategies did you use to find the products? Estimate each answer: 13) 34 x 56 14) 383 x 420 15) 15.09 x 3.4 16) 6390 divided by 32 What strategies did you use to estimate? UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP3 Appendix B 27 X 4 Compute 27 x 4 two different ways using pictures, words, or numbers. UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP4 Appendix B MULTIPLICATION AND DIVISION STRATEGIES Direct Modeling Strategies These typically involve the use of manipulatives (fingers, tally marks, counters, base-10 blocks) to represent the problem. For multiplication, children model using “groups of,” “rows of,” or “arrays.” For division, modeling takes the form of “dealing” or “measuring.” Counting strategies Skip Counting 3, 6, 9, 12, 15…so 3 X 5 = 15 Repeated addition 6 + 6 + 6 =18 so 6 X 3 = 18 Repeated subtraction 18 – 6 = 12 and 12 – 6 = 6 and 6 – 6 = 0 so 18 ÷ 6 = 3 Doubling 8 + 8 = 16 and 8 + 8 = 16 and 16 + 16 = 32 so 8 X 4 = 32 Counting on, counting back 3 X 3 = 9…10,11,12…so 3 X 4 =12 4 X 4 = 16…15,14,13,12…so 4 X 3 = 12 Derived Fact Strategies Doubling 4 X 6 = 24… so 8 X 6 = 48 Squaring 6 X 6 = 36…+ 7 = 42…so 6 X 7 = 42 Add-on 4 X 6 = 24, 24 + 4 = 28, SO 4 X 7 = 28 Take-away 9 X 10 = 90…- 9 = 81…so 9 X 9 = 81 Grouping strategies Place value understanding is developed as children group by 1s, 10s, 100s, etc. 20 X 4 = 80 and 3 X 4 = 12 and 80 + 12 = 92 so 23 X 4 = 92 Breaking one number into smaller, more manageable groups 4 X 8 = 32 and 3 X 8 = 24 and 32 + 24 = 56 so 7 X 8 = 56 Other invented strategies Double/half, estimation, compensation, student inventions – children often invent strategies which defy classification. Naming strategies in honor of the inventor reinforces respect for good thinking. UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP5 Appendix B UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP6 Appendix B Count the number in each row (24). Take 120 blocks. Build 5 rows of blocks by dealing (partitive division) until all blocks are used up. Trade 100 block for 10s and 10s for 1s as needed. _____ _____ .... _____ _____ .... _____ _____ .... _____ _____ .... _____ _____ .... 6 X 20 = 120 (6 rows of 20) 6 X 4 = 24 (6 rows of 4) 120 + 24 = 144 Then add rectangular pieces together Build 6 rows of 24 using base-10 blocks. _____ _____ .... _____ _____ .... _____ _____ .... _____ _____ .... _____ _____ .... _____ _____ .... Advanced Modeling Strategies 150 - 6 = 144” So take away one 6. But that's too big. Round 24 to 25. “25 X 6 = 150. Advanced Derived Strategies 120 + 24 = 144 4 X 6 = 24 (6 groups of 4) 20 X 6 = 120 (6 groups of 20) 24 is two tens and four ones or 20 + 4. Advanced Grouping Strategies So it's 24.” So 24 5's make 120 I want to know how many 5s in 120 “I know 5 X 25 = 125. (measurement Skip count while division) keeping track of groups. But that's too big. 20 X 5 =100 “5, 10, 15, 20...120. 4 X 5 = 20 So take one 5 away to get 120. 120 That's 24 groups.” 48 + 96 = 144 (That's 6) 48 + 48 = 96 (That's 4) 24 + 24 = 48 (That's 2) Advanced Counting Strategies Extended from Research in Cognitively Guided Instruction Created by Shelley Kriegler (4/96) 120 ÷ 5 = 24 X 6 = Problem 12 X 12 = 144" 2 X 6 = 12 So and 120 ÷ 5 = 24” 12 X 2=24 “I know 120 ÷ 10=12 So and “I know 1/2 of 24 is 12. Other Invented Strategies MULTIDIGIT MULTIPLICATION AND DIVISION STRATEGIES ANALYZE AND ASSESS Student Strategies Next step? A B C D E F G H UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP7 Appendix B STUDENT WORK What mathematics does this student demonstrate in his/her strategy? UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP8 Appendix B STUDENT WORK UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP9 Appendix B STRATEGIES THAT PROMOTE CLASSROOM DISCOURSE STRATEGIES COMMENTS/QUESTIONS • Provide wait time • Who needs more time? • Promote full inclusion • Turn to your neighbor. • Teach listening skills • Listen to your classmates. • Foster communication skills • Teacher asks presenter to prove it. • Connect listening with participation • Who thought about it a different way? • Use questioning to highlight strategies • How did you think about that part in your head? • Focus on reasoning • Were you able to follow his thinking from beginning to end? • Encourage students to monitor their own explanation • Give students a chance to catch their own errors. Are you done? • Facilitate the exchange of ideas • What questions do you have for Allison? • Request clarification • Request clarification in order to help the class follow the presenters thinking. Where did that come from? UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP10 Appendix B THE ART OF QUESTIONING IN MATHEMATICS (From The NCTM Professional Teaching Standards) HELP STUDENTS WORK TOGETHER TO MAKE SENSE OF MATHEMATICS: “What do others think about what ____________ said?” “Do you agree? Disagree? Why or why not?” “Does anyone have the same answer but a different way to explain it?” “Would you ask the rest of the class that question?” “Do you understand what they are saying?” “Can you convince the rest of us that that makes sense?” HELP STUDENTS TO RELY MORE ON THEMSELVES TO DETERMINE WHETHER SOMETHING IS MATHEMATICALLY CORRECT “Why do you think that?” “Why is that true?” “How did you reach that conclusion?” “Does that make sense?” “Can you make a model and show that?” HELP STUDENTS TO LEARN TO REASON MATHEMATICALLY “Does that always work? Why or why not?” “Is that true for all cases? Explain?” “Can you think of a counter example?” “How could you prove that?” “What assumptions are you making?” HELP STUDENTS LEARN TO CONJECTURE, INVENT, AND SOLVE PROBLEMS “What would happen if ____________? What if not?” “Do you see a pattern? Explain?” “What are some possibilities here?” “Can you predict the next one? What about the last one?” “How did you think about the problem?” “What decision do you think he/she should make?” “What is alike and what is different about your method of solution and his/hers?” HELP STUDENT TO CONNECT MATHEMATICS, ITS IDEAS, AND ITS APPLICATIONS “How does this relate to __________?” “What ideas that we have learned before were useful in solving this problem?” “Have we ever solved a problem like this one before?” “What uses of mathematics did you find in the newspaper last night?” “Can you give me an example of ___________?” UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP11 Appendix B THE IMPORTANCE OF RECORDING Even when children explain their thinking orally, they may have difficulty putting their ideas into written form. Teachers who record as students explain their strategies help them learn to represent their ideas in writing. In the classroom, recordings make student explanations public, serve as models, allow for comparisons and discussions, and help other children develop alternative strategies. Learning to record children’s thinking takes practice. Teachers can develop recording systems by watching how children record their thinking, and helping them to refine their methods. Consider the product: 14 X 3 TEACHER RECORDINGS STUDENT WORDS / IDEAS USE A MODEL: “Three rows of fourteen” Use base-10 blocks on overhead or write _____…. _____…. _____…. 14 + 14 + 14 ADDITION: HORIZONTAL FORM 10 “10 + 10 + 10 = 30 4 + 4 + 4 = 12 30 + 12 = 42“ 30 3 10s 3 4s 30 + 12 = = = “3 times 10 is 30. 3 times 4 is 12. 30 + 12 equals 42.” “Think of 14 as 10 + 4. 10 times 3 is 30. 4 times 3 is 12. 30 and 12 is 42.” UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division 30 12 42 3 x 10 = 30 3 x 4 = 12 42 14 x3 30 12 42 MULTPLICATION: VERTICAL FORM GROUPING (BREAK APART NUMBERS) 12 10 10 10 30 12 42 “10 plus 10 plus 10 is 30. 4 plus 4 plus 4 is 12. 30 and 12 is 42.” “3 tens is 30. 3 fours is 12. 30 and 12 is 42.” 10 42 ADDITION: VERTICAL FORM MULTIPLICATION: HORIZONTAL FORM 10 14 = 10 + 4 10 x 3 = 30 or 4 x 3 = 12 30 + 12 = 42 10 x 3 = 30 4 x 3 = 12 42 COMP5 – PP12 Appendix B USING AREA MODELS Find each product using an area model. Record both pictures and numbers below. 6 x 12 14 x 15 23 x 13 UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP13 Appendix B ALGORITHMS FROM AORUND THE WORLD From a school in Southeast Asia Right to Left 14 x25 20 50 80 200 350 5 5 20 20 x x x x 4 10 4 10 = = = = 20 50 80 200 From a teacher in France Left to Right 14 x25 200 80 50 20 350 UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division 20 20 5 5 x x x x 10 4 10 4 = = = = 200 80 50 20 COMP5 – PP14 Appendix B VISUAL MULTIPLICATION ALGORITHMS From a 6th grade classroom in California Area Model 10 + 4 20 + 5 200 50 80 20 20 10 5 20 x x x x 10 = 4 = 5 = 4 = 200 80 50 20 From a popular adopted textbook in the United States Lattice Multiplication 2 0 2 0 8 5 0 5 2 0 15 0 1 4 2 hundreds = 15 tens = 0 tens = 200 150 0 350 2 UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP15 Appendix B BRITISH ALGORITHM from an Italian student attending a school in Iran taught by British nuns 648 x 279 648 648 648 x x x 200 70 9 = = = 129600 45360 + 5832 180,792 INTERESTING ALGORITHM From a teacher in Germany “Nike Math” (20 + 5)(10 + 4) First: Outside: Inside: Last: 20 20 x x 10 = 4 = 200 80 5 x 10 = 50 5 x 4 = 20 350 This application of the distributive property is sometimes referred to as “FOIL” – a procedure for multiplying binomials in algebra UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP16 Appendix B RUSSIAN PEASANT METHOD OF MULTIPLICATION In the 1800’s, peasants in a remote area of Russia were discovered multiplying numbers using a remarkably unusual process. This process, known as the “Russian peasant method” of multiplication, is said to be still in use in some parts of Russia. Assume you want to multiply 18 x 25. Halve this column: Discard remainders 18 Double this column x 25 9 50 4 100 Cross out all the rows which have an even number on the left, then add up all the remaining numbers on the right. 2 200 1 400 450 Use the Russian peasant method of multiplication to compute these products. 1) 20 x 25 ________ 3) 12 x 25 2) 16 x 30 __________ 4) 22 x 75 _________ _____________ Why and how does the Russian Peasant Method work? UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP17 Appendix B JOURNAL 1: ALGORITHMS AROUND THE WORLD The algorithms on the previous pages represent different ways that students from around the world were taught to multiply. Select one of the algorithms from around the world. Explain how it works and why it works. UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP18 Appendix B BROWN AND GREEN Solve each problem in two different “kid” ways. Be prepared to share your strategies. 1. Mrs. Brown has a bag of 258 candies. She wants to share them equally among her 22 students. How many candies will each student get? [Partitive Division] 2. Mrs. Green has 35 yards of fabric, which she is using to make jerseys for the soccer team. Each jersey requires 2 yards of fabric. How many jerseys can Mrs. Green make? [Measurement Division] UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP19 Appendix B BROWN Mrs. Brown has a bag of 258 candies. She wants to share them equally among her 22 students. How many candies will each student get? UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP20 Appendix B GREEN Mrs. Green has 35 yards of fabric, which she is using to make jerseys for the soccer team. Each jersey requires 2 yards of fabric. How many jerseys can Mrs. Green make? UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP21 Appendix B MORE STUDENT WORK UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP22 Appendix B JOURNAL 2: BASE-10 BLOCK DIVISION Describe how you might connect base-10 block model to the division algorithm. UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP23 Appendix B PROBLEM STARTERS Find the solution to each problem in a non-traditional way using the suggested starters. Can you think of another non-traditional way to computer the answer? Problem: Compute 14 X 9 Start with 10 X 9 Start with 7 X 9 Start with 14 X 10 Problem: Compute 18 X 43 Start with 10 X 43 Start with 2 X 43 and 20 X 43 Start by listing the first four multiples of 18 Problem: Compute 703 ÷ 17 Start with 17 X 10 Start by listing a few multiples of 17 and finding the largest one less than 703 Start by drawing a rectangle with one side of 17 Problem: Compute 504 ÷ 70 Start with 70 + 70 Start with 7 X 7 Start with 70 X 10 UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP24 Appendix B UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP25 Appendix B UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP26 Appendix B UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP27 Appendix B UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP28 Appendix B UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP29 Appendix B UCLA Math Programs for Teachers/LUCIMATH Project Multidigit Multiplication and Division COMP5 – PP30 Appendix B
