Rational Numbers and Representations

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Rational Numbers and Representations Fractions and Decimals Grades 3 -5 Workshop Longwood University Dr. Virginia Lewis Cathlene Hincker Miriah Eisenman

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Rational Numbers and Representations. Fractions and Decimals Grades 3 -5 Workshop Longwood University. Dr. Virginia Lewis Cathlene Hincker Miriah Eisenman. Before we get started. Instructor Introductions. First…Pre-Workshop Content Assessment. - PowerPoint PPT Presentation

Transcript of Rational Numbers and Representations

Page 1: Rational Numbers and Representations

Rational Numbers and Representations

Fractions and Decimals Grades 3 -5 WorkshopLongwood University

Dr. Virginia LewisCathlene HinckerMiriah Eisenman

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Before we get started

› Instructor Introductions

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First…Pre-Workshop Content Assessment

› Remember, you are not be graded during this workshop!

› Please answer the questions to the best of your ability.

› At the end of our third day together, you will take a post-workshop assessment to see how this workshop has impacted your knowledge of Grades 3-5 fractions, decimals and representations.

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Community of Learners

› Complete 3 X 5 note card:– Name– Email– Where do you teach?– Number of years teaching & grade levels– Favorite mathematics topic– Why are you here?– What weaknesses/concerns do you have about your own

understanding of fractions and decimals?

› Introductions – Introduce another person in our class to everyone!

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What do students need to know about fractions and decimals?

›What is the essential knowledge?

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Goals of the Workshop1. To know more about rational numbers than you expect

your students to know and learn.

2. An awareness of different models and representations to enhance thinking about rational numbers.

3. To become familiar with the connections between fractions, decimals, and place value.

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Goals of the Workshop4. To know what mathematics to emphasize and why in

planning & implementing lessons.

5. To anticipate, recognize, and dispel students’ misconceptions about fractions and decimals.

6. Build on prior grades’ fraction ideas and know later-grade connections vertical alignment.

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The StandardsNational Council of Teachers of Mathematics

Standards and the Virginia Standards of Learning

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What do NCTM’s Principles and Standards for School Mathematics say?

Understand numbers, ways of representing numbers, relationships among numbers, and number systems

› Grades 3 -5–develop understanding of fractions as parts of unit wholes, as parts of a collection, as locations on number lines, and as divisions of whole numbers;

–use models, benchmarks, and equivalent forms to judge the size of fractions;

–recognize and generate equivalent forms of commonly used fractions, decimals, and percents;

National Council of Teachers of Mathematics. 2000. Principles and Standards for School Mathematics. Reston, VA: NCTM.

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What do NCTM’s Principles and Standards for School Mathematics say?

Compute fluently and make reasonable estimates

› Grades 3 -5

–develop and use strategies to estimate computations involving fractions and decimals in situations relevant to students' experience;

–use visual models, benchmarks, and equivalent forms to add and subtract commonly used fractions and decimals;

National Council of Teachers of Mathematics. 2000. Principles and Standards for School Mathematics. Reston, VA: NCTM.

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Fractions/Decimals in Virginia SOLs K-2

Kindergarten

› K.5 Identify parts of a set and/or region that represent fractions for halves and fourths

1st

› 1.3 Identify parts of a set and/or region that represent fractions for halves, thirds, and fourths and write the fractions

2nd

› 2.3 Identify parts of a set and/or region that represent fractions for halves, thirds, fourths, sixths, eighths, and tenths (connects to decimals later)

Virginia Department of Education. 2009. Mathematics Standards of Learning for Virginia Public Schools. Richmond, VA: Commonwealth of Virginia Board of Education.

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What do students currently learn about fractions/decimals in your grade level?

› Organize into grade level groups

› Without looking at the SOLs brainstorm and record what you teach in your grade level about fractions and decimals.

› Look over the SOLs and adjust anything that needs adjusting on your chart paper.

› Record the SOL number next to each of your big ideas.

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Identify on the grade level charts concepts that build on knowledge from previous grades.

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Building on grades 3-5

In grade 6– Describe and compare data, using ratios using the

appropriate notations a/b, a to b and a:b.

– Investigate and describe fractions, decimals, and percents as ratios

– Identify a fraction, decimal, or percent from a representation

– Demonstrate equivalent relationships among fractions, decimals, and percents

– Compare and order fractions, decimals, and percentsVirginia Department of Education. 2009. Mathematics Standards of Learning for Virginia Public Schools. Richmond, VA: Commonwealth of Virginia Board of Education.

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Building on grades 3-5

More grade 6– Demonstrate multiple representations of multiplication and

division of fractions

– Multiply and divide fractions and mixed numbers

– Estimate solutions and then solve single-step and multistep practical problems involving addition, subtraction, multiplication and division of fractions

– Solve single-step and multistep practical problems involving addition, subtraction, multiplication, and division of decimals

Virginia Department of Education. 2009. Mathematics Standards of Learning for Virginia Public Schools. Richmond, VA: Commonwealth of Virginia Board of Education.

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Building on grades 3-5

In grade 7– Compare and order fractions, decimals, percents, and

numbers written in scientific notation;

– Identify and describe absolute value for rational numbers

– Solve single-step and multistep practical problems, using proportional reasoning

Virginia Department of Education. 2009. Mathematics Standards of Learning for Virginia Public Schools. Richmond, VA: Commonwealth of Virginia Board of Education.

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Building on grades 3-5In grade 8

– Simplify numerical expressions involving positive exponents, using rational numbers, order of operations, and properties of operations with real numbers; and

– Compare and order decimals, fractions, percents, and numbers written in scientific notation

– Describe orally and in writing the relationships between the subsets of the real number system

– Solve practical problems involving rational numbers, percents, ratios, and proportions

Virginia Department of Education. 2009. Mathematics Standards of Learning for Virginia Public Schools. Richmond, VA: Commonwealth of Virginia Board of Education.

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The Common Core Standards

› You will find a copy of the grades 3-5 standards for fraction instruction in your packet

› While Virginia is not currently participating in the Common Core it is interesting to see these standards too.

› http://www.corestandards.org/math

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But there’s more to the standards

› In your group–Read the Introduction to the Standards of Learning

–Highlight anything of interest you would like to discuss

–Read your assigned Process Standard. Be prepared to summarize for the class what this standard encompasses.

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What representations do you currently use during fraction and decimal instruction?

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Multiple Representations

› How many different ways can you represent ¾?

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Fraction Models

› Area Models for ¾.

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Fraction Models

› Set Models for ¾.

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Fraction Models

› Measurement Models for ¾.

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Problems and Models

› In Mrs. Park’s class there are 24 students. One third of the students play soccer.

› My dad made me a pan of brownies for my birthday. I ate 5/8 of my pan.

› I tried to run from my school to my favorite ice cream shop. I ran 9/10 of the way before I stopped because I was tired.

Adapted from page 98 ofMcNamara, J. & Shaughnessy, M. 2010. Beyond Pizzas and Pies. Sausalito, CA: Math Solutions.

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Using representations to solve problems› It takes 18 minutes for John to walk home from

school. He has walked 2/3 of the way at a constant speed. How many minutes has he been walking?

› There are 18 marbles in Suzanne’s marble collection. 2/3 of the marbles are green. How many green marbles does Suzanne have?

› Joanna filled 18 bowls with 2/3 cup of flour in each. How much flour did Joanna use?

Adapted from page 130 ofVan de Walle, J.A., Bay-Williams, J.M., Lovin, L. H., & Karp, K.S. 2014. Teaching Student-Centered Mathematics Developmentally Appropriate Instruction for Grades 6-8 (2nd ed). Boston, MA: Pearson Education, Inc.

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What are the meanings of fractions?

› Fractions as part of a whole or part of a set

› Fractions as quotients- the result of division

› Fractions as ratios or rates – comparing quantities with like (ratio) or unlike (rate) units

› Fractions as operators – Stretches or shrinks the magnitude of another number

› Fractions as measures – Rational number thought of as a unit fraction to be repeated

Lamon, Susan J. 2007. Rational Numbers and Proportional Reasoning Toward a Theoretical Framework for Research. In Frank K. Lester, Jr (Ed.), Second handbook of research on mathematics teaching and learning (pp. 629 – 667). Charlotte, NC: Information Age Publishing, Inc.

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Fractions as part of a set

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Fractions in our Class

› I need 10 volunteers to come to the front of the room.– What fraction are girls?– What fraction are wearing jeans?– What other fraction questions can we ask and answer?

– Why is the denominator for every fraction 10? What does the denominator represent?

– Why is the numerator different? What does the numerator represent?

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Use Student Data to Write Fractions› Which of the following statements is true for you?

– My last name is longer than my first name.– My last name and first name are the same length.– My last name is shorter than my last name.

› What fraction of the class has last names that are longer?

› What fraction of the class has last names that are shorter?

› What fraction of the class has names that are the same length?

First and Last Names

My last name is longer

My names are the same

My last name is shorter

Tally

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Use Student Data to Write Fractions› How many syllables are in your first name?

› What fraction of the class has one syllable in their first name?

› What fraction of the class has fewer than three syllables in their first names?

› What fraction of the class has more than three syllables in their first names?

Number of Letters in Our First Names

1 2 3 4 5

Tally

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Fractions as a part of a whole› Use color tiles to build a rectangle that is ½ red, ¼

yellow, and 1/8 green and 1/8 blue. Make a drawing of your rectangle.

› Can you find another rectangle that also satisfies the requirements? Make a drawing of your rectangle

› Use color tiles to build a rectangle that is 1/6 red, 1/2 green, 1/3 blue. Make a drawing of your rectangle.

› Can you find another rectangle that satisfies these requirements? Make a drawing of your rectangle.

› Why do you think we used the ½, ¼, and 1/8 fractions in one rectangle and the ½, 1/3, and 1/6 in another rectangle?

Adapted from pg 280 Burns, M. 2007. About Teaching Mathematics a K-8 Resource (3rd ed). Sausalito, CA: Math Solutions

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Why is the whole important?

› If the whole is a group of 12 color tiles, what is ½?

› If the whole is a group of 10 color tiles, what is ½?

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Blocking Out Fractions: An AIMS activity

› This activity can be purchased in PDF form from Aims Education Foundation at the following web address.

› http://www.aimsedu.org/item/DA6539/Blocking-Out-Fractions/1.html

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Grade 3 Sol Practice Item Made Available by the Virginia Department of Education (VDOE)

How does instruction which focuses on the role of the whole help students interpret this question?

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Is the ability to think of a quantity in different sized chunks

Fold an isosceles triangle in half three different times. Then unfold the triangle…

Can you see eighths?Can you see fourths?Can you see halves?

Students need to be able to think flexibly about fractions!

Unitizing

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What is Partitioning?

› Partitioning is the act of breaking the whole into parts

› Students need experiences where partitioning in different ways results in equivalent amounts

› For example the following partitions have different representations but all are equivalent to 1 whole.

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Partitioning the Whole› How can you divide this square into halves? Is there more than one way to divide your square?

› Write a number sentence to represent how the halves combine to make a whole.

› How can you divide this square into fourths? Is there more than one way to divide your square?

› Write a number sentence to represent how the fourths combine to make a whole.

Adapted from pg 52 ofSchuster, L., and Anderson, N.C. 2005. Good Questions for Math Teaching . Sausalito, CA: Math Solutions.

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Partitioning the Whole› How can you divide this square into eighths?

› Write a number sentence to represent how the eighths combine to make a whole.

› How can you divide this square into halves, fourths, and eighths? –Label and color-code each fractional part.–Write a number sentence to represent how the parts combine to make the whole.

Adapted from pg 52 ofSchuster, L., and Anderson, N.C. 2005. Good Questions for Math Teaching . Sausalito, CA: Math Solutions.

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Egg Carton Fractions› Can you make halves? Thirds? Fourths? Sixths?

Twelfths?

› Can you make 2/3? How many twelfths are the same as 2/3? How many sixths are the same as 2/3?

› Can you make ¾? How many twelfths in ¾?

› Put two cartons together and make:– 1 ½– 1 5/6

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Equivalent names using red and yellow counters

› You need 18 counters, 6 red and 12 yellow.

› The 24 counters make up the whole.

› Can you group the counters to “see”– 6/18 – 12/18– 4/6– 1/3

Adapted from pp. 153-154 in Van de Walle, J.A. and Lovin, L.H. 2006. Teaching Student-Centered Mathematics Grades 3-5. Boston, MA: Pearson Education, Inc.

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Find the fraction name for each piece.

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Fractions, Decimals and the Open Number Line› Draw an open number line like this:

0 2

› Locate 0.50 on the number line with your finger.› Locate ¼ on the number line with your finger.› Locate 0.75 on the number line with your finger.› Locate 1 ½ on the number line with your finger

› What could this task reveal to a teacher using it for formative assessment?

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Fractions as OperatorsInput Output

2 1

3 1.5

6 3

8 4

Input Output

1 2/3

2 4/3

3 6/3

4 8/3

Find the input-output rules for these function machines.

Input Output

1 4/3

2 8/3

3 4

4 16/3

Adapted from pg 83 of Chapin, S. H. and Johnson, A. 2000. Math Matters Grades K-6 Understanding the Math You Teach. Sausalito, CA: Math Solutions Publications.

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A focus on Visualization

› Can you see 4/10 of something? What is the whole?

› Can you see 1 ½ of something? What is the whole?

› Can you see 2/3 of 3/5? What fraction would that be?

Adapted from pg 329 of Van de Walle, J. A., Karp, K. S., and Bay-Williams, J. M. 2013. Elementary and Middle School Mathematics Teaching Developmentally (8th ed.) Boston, MA: Pearson Education, Inc.

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Is this 3/8?

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Wrapping Up Wholes and Parts

› Students need opportunities to think about the whole– Use materials where the size of the whole changes

› Students need to encounter unequally partitioned areas and number lines

› Students need to design their own strategies for partitioning areas and number lines

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Decimal Basics

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Cube activity: What’s special about base 10?› Grab two handfuls of unifix cubes. Divide the cubes into the

specified group size.

› Record the number of groups and the number of leftovers in your chart. For each different sized group do three trials.

› What do you notice when we make groups of size 10? What is so special about base 10?

Number of cubes in

each group

Number of Groups

Number of Leftovers

Total Cubes

7

3

8

10

Adapted from pp. 47-50. Cohen, S. C., Lester, J. B., and Yaffee, L. 1999. Building a System of Tens Casebook. Parsippany, NJ: Dale Seymour Publications.

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Ways to Build a number with Base Ten Blocks

› Build 156 with your base ten blocks

› With your partner build and record all the possible ways you were able to make 156.

› How many different ways are there?

› How did you know when you had found them all?

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Introduction to Decimals› The decimal point separates the whole units from the

fractional parts.

› The whole units are to the left of the decimal point. The fractional parts are to the right of the decimal point.

› Represent the fraction 3/10 with the Decimal grids in tenths. Then use decimal notation to name this number.

› Represent the fraction 3/10 with the Decimal grids in the hundredths.

› Why is 3/10 = 30/100? How could we write this equation using decimals?

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Representing decimals

› Represent the decimals 0.7 and 0.07– On 10 x 10 grids– Coins– Base-ten blocks– Number lines

› Consider the number 7,777.777

Place

Thousands

Hundreds

Tens Ones . Tenths

Hundredths

Thousandths

Digit 7 7 7 7 . 7 7 7

Value 7,000 700 70 7 .7

10

7

1000

7

100

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Ways to Build a Number with Base Ten Blocks: Part 2

› Build 1.56 with your base ten blocks

› With your partner build and record all the possible ways to make 1.56.

› How was your thinking the same or different from when you modeled 156 with base ten blocks?

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Decimals and Base Ten blocks› If I use a flat to represent one whole, a long to

represent tenths, and a unit to represent hundredths, what numbers can I represent using exactly 8 pieces?

› How do you know you have found them all?

› Put the numbers you were able to build in order from smallest to largest.

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Guess my rule

In Out

3 30

4 40

5 50

6 60

In Out

.03 .3

.04 .4

.05 .5

.06 .6

In Out

.3 3

.4 4

.5 5

.6 6

We often “tell” students when you multiply by 10 you “add a zero”. Does this rule hold true with decimals?

Another rule we “tell” is that when you multiply by 10 you move the decimal one place to the right and when you divide by 10 you move the decimal one place to the left. Why does this rule work? What conceptual understanding do students need in order to “see” why this rule works?

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Comparing money and decimal numbers› How could we show $2.20 using the fewest number

of dollar bills and coins?

› How could we show 2.20 using the fewest number of base ten blocks?

› How could we show $2.50 using the fewest number of dollar bills and coins?

› How could we show 2.50 using the fewest number of base ten blocks?

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How much money with 10 coins?

› Find all the different amounts of money we can represent using exactly 10 coins (only dimes and pennies).

› List them in order and look for patterns in your list.

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Decimal Designs› This activity can be purchased in PDF form from Aims

Education Foundation at the following web address.

› http://www.aimsedu.org/item/DA10352/Decimal-Designs/1.html

› Teaching Tip: Post the designs on a bulletin board (minus the decimal information) to make an interactive board or center where you can post questions about their designs and have students answer them. Your questions could focus on decimals and/or fractions. You could also have them to write number sentences on how the colors add to 1 and focus on addition.

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Mrs. Sam’s Quilting Project› She wants to design a new quilt square that has….

– three-tenths of the square red– fourteen-hundredths yellow– two-tenths blue

› Mrs. Sam’s wants the remaining two sections of quilt square to be orange and green.

› Use a hundredths grid to make a sketch of her quilt square.

› In your design, what portion of the quilt square will be orange? Green?

› Share your solution with your classmates. Why do some students’ quilt squares look different than others? Are they “correct” given the requirements? (Discuss as both fractions and decimals).

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“It’s natural to read decimals such as 2.7 and 0.34, for example, as ‘two point seven’ and ‘point thirty four.’ However, students should know that these decimals can also be read as ‘two and seven-tenths’ and ‘thirty-four-hundredths,’ and they should be able to relate decimal fractions to common fractions. Paying attention to this difference reinforces the fact that decimals are fractions written in a different form.”

Burns, M. 2007. About Teaching Mathematics a K-8 Resource (3rd ed). Sausalito, CA: Math Solutions. p 284.

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Dealing with Decimals: An AIMS activity› This activity can be purchased in PDF form from Aims

Education Foundation at the following web address.

› http://www.aimsedu.org/item/DA7818/Dealing-With-Decimals/1.html

› How can this activity be used as an informal assessment?

› Other ideas– Use the cards to play decimal war– Deal two tenths, hundredths, and thousandths cards to each

player. Players have 30 seconds to make the largest (or smallest) number possible. The player with the largest (or smallest) wins. Each player discards the cards they used and draws three more cards and play again.

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More Place Value Fun› Each player should draw the game board as shown.

____ ____ ____ ____ . ____ ____ ____

› Players take turns rolling the ten sided die (numbered 0 - 9) writing their number in one of the spaces on the game board. continue play until all blanks are full. The winner is the player with the largest number.

› Play again: this time the person who makes the smallest number wins

› How did your strategy change when you were trying to get a large number vs a small number?Adapted from Burns, M. 2007. About Teaching Mathematics a K-8 Resource (3rd ed). Sausalito, CA: Math Solutions. p 290.

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Grade 4 Sol Practice Item Made Available by the VDOE

How does instruction which focuses on place value help students interpret this question?

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What strategies do you currently teach students to help them compare and order fractions and/or decimals?

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Equivalence

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Equivalent fractions have the same value–They identify the same point on the number

line

Equivalent fractions have different representations

Equivalent fractions can be generated by multiplying the numerator and denominator by the same value

What do students need to know to understand equivalent fractions?

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Can parts of a set have different names?› Everyone should have 12 two-color counters.

› Turn your counters over so that only one counter is red.– What fraction of your counters is red?

› Turn over another counter so that now you have two counters that are red.– What fraction of your counters is red?

› Turn your counters over so they all are yellow.

› Divide your counters into six equal groups.

› What fraction of the counters are in each group?– Did you say 1/6? How about 2/12?

Adapted from Burns, M. 2007. About Teaching Mathematics a K-8 Resource (3rd ed). Sausalito, CA: Math Solutions. p 270.

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Can parts of a set have different names?› Put all your counters in a pile yellow side up.

› Divide your counters into four equal groups.

› Turn over the counters in one group so they are red.– What fraction of your counters are red?

› Did you say 3/12? Or ¼?

› Turn over the counters in another group so now two groups are red.– What fraction of your counters are red?

› Did you say 6/12? 2/4? Or ½?

– Even though 6/12 = 3/6 would 3/6 make sense for this situation?

Adapted from Burns, M. 2007. About Teaching Mathematics a K-8 Resource (3rd ed). Sausalito, CA: Math Solutions. p 270.

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The Fraction Kit› Make your own fraction kit. You will find the instructions in

– Burns, Marilyn. 2001. Lessons for Introducing Fractions Grades 4-5. Sausalito, CA:

Math Solutions.

› As you are making the kit pose questions like…

› Who can explain why it makes sense to label each part as I did? (Four parts and each part

is one of the 4)

› How many sections do you think this one will have when we unfold it?

› How should I label the parts on each of these parts?

› The top number in this fraction is called the numerator. Does anyone know what we call the bottom number?

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Cover Up

› Play the game Cover Up.

› The directions for the game can be found in

Burns, Marilyn. 2001. Lessons for Introducing Fractions Grades 4-5. Sausalito, CA: Math Solutions.

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Reflecting on Cover Up

› What are the benefits of Steps 3 and 4 in the Cover Up game?

› What information would the teacher circulating around the classroom be able to collect?

› What questions could the instructor pose to students as they are playing the game?

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Playing Uncover› Now play Uncover version 1

› How does this game compare to Cover Up?

› Now play Uncover version 2. How does the addition of the New Rule affect how you play the game and the mathematics you are using?

The directions for both versions of Uncover can be found in

Burns, Marilyn. 2001. Lessons for Introducing Fractions Grades 4-5. Sausalito, CA: Math Solutions.

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Another Cover Up

› Play Cover Up …the instructions for the game can be found in

– De Francisco, C., and Burns, M. 2002. Teaching Arithmetic: Lessons for Decimals and Percents, Grades 5 – 6. Suasalito, CA: Math Solutions Publications. p. 166.

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Pursuit of Zero

› Play Pursuit of Zero…the instructions for the game can be found in

› De Francisco, C., and Burns, M. 2002. Teaching Arithmetic: Lessons for Decimals and Percents, Grades 5 – 6. Suasalito, CA: Math Solutions Publications. p. 167.

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› How are the two versions of Cover Up similar and different?

› How are the games Uncover and Pursuit of Zero similar and different?

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Same Name Frame› This activity can be purchased in PDF form from Aims

Education Foundation at the following web address– http://www.aimsedu.org/item/DA3377/Same-Name-Frame/1.ht

ml

› Use the chart to explore patterns with equivalent fractions.

› How could this chart be used to help students to simplify fractions?

› Why does this chart work?

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Fraction and Decimal Equivalents

› Use your hundredths grids to help you find the fraction equivalents.

Fraction Equivalent Fraction with a denominator of

100

Decimal number

½

¾3/5

9/10

1/20

3/25

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Mixed number and Decimal equivalents

Word Fraction Money Drawing

Five-fourths 5/4 or 1 ¼ $1.25

Eleven-tenths

Six-fifths

How much money are five quarters worth?

How does using representations to explore these equivalents add to students’ conceptual understandings in a way that using the calculator to divide the numerator by the denominator does not?

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Base Ten Go Fish› Create a deck of cards for several decimal numbers

with the decimal representation of the number on one card, the base ten block representation on another card, and the corresponding money on another card.

› Deal each player several cards (depending on the size of your deck)

› Turn up the top card on the pile of left-over cards to start a discard pile.

› Play Go Fish taking turns asking for a particular number.

› The first player to get three matching representations wins the hand.

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Fraction and Decimal Equivalence Display

› Assign each pair of students a decimal.

› Provide time for each partner group to determine the fraction equivalent for their decimal.

› Students then create a poster that meets the following criteria– Include at least one other fraction and one other decimal

that are equivalent to your original pair.– Use words, pictures and/or numbers to provide an

explanation that proves your fractions and decimals are equivalent.

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Grade 5 Sol Practice Item Made Available by the VDOE

How does instruction which focuses on equivalence help students interpret this question?

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Grade 4 Sol Practice Item Made Available by the VDOE

How does instruction which focuses on representations when learning fraction and decimal equivalents help students interpret this question?

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Grade 4 Sol Practice Item Made Available by the VDOE

How does instruction which focuses on representations when learning fraction and decimal equivalents help students interpret this question?

Page 84: Rational Numbers and Representations

Benchmarks

Page 85: Rational Numbers and Representations

Thinking about Halves› Start with a 4 x 2 rectangle on grid paper

– Choose two different color markers– Shade half of the rectangle one color and half of the

rectangle the other color– Be creative! You want each grid to look unique!

› Start with another 4 x 2 rectangle on grid paper– Shade one fourth of the rectangle blue.– Again, be creative so we can see a variety of “one-

fourths.”

› Share the different ways that the students “saw” one-half and one-fourth. The SOL test questions often give the students questions where they have to find the fraction but the parts that are shaded are scattered and not side-by-side.

Page 86: Rational Numbers and Representations

Grade 3 Sol Practice Item Made Available by the VDOE

Page 87: Rational Numbers and Representations

Grade 4 Sol Practice Item Made Available by the VDOE

Page 88: Rational Numbers and Representations

Why is the benchmark of ½ the best strategy for comparing these fractions?

7

12

4

95

38

5

50

23

18

8

Page 89: Rational Numbers and Representations

Decide if each scenario is more or less than ½?

› James ate 6 out of 13 brownies.

› Elizabeth worked 5 hours of the 9 hour shift

› Taleke ran 8 miles of his 15 mile goal

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How can you tell when a fraction is ½?

› Find four fractions that are equivalent to ½.

› What do you notice about all fractions that are equivalent to ½?

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› Are the following sums larger or smaller than 1? Explain how you know.

› 3/8 + 4/9

› 1/2+ 1/3

More or Less than 1?

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Do you need less than or more than $1.00?

› If you want to buy an apple for $0.39 and raisins for $0.25, how much money do you need?– Estimate: What do you think more or less than $1.00?

Why?

› Use a representation to help you determine exactly how much money you will need.

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Using Benchmarks to compare or order› For each of the following fractions is it closest to 0, ½ or 1?

1/6 3/8 5/7

› How do benchmarks help you order these fractions?

› For each of the following decimals is it closest to 0, 0.5, or 1?

› 0.4 0.05 0.85

› How do benchmarks help you order these decimals?

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In Proper Order

› This activity can be purchased in PDF form from Aims Education Foundation at the following web address

› http://www.aimsedu.org/item/DA10146/In-Proper-Order/1.html

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Ordering Decimals

› 0.04 0.40 0.44

› For each decimal write how you would say it

› Shade a hundredths grid to represent it

› Build it with base ten blocks

› Use your representations to help you order the decimals greatest to least. Be prepared to explain to the class how you decided on your ordering.

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More or Less Cards

› Write a fraction and a decimal to compare on your first index card.

› On your second index card write a mixed number and a decimal to compare

› Swap your cards with another student.

› For each card decide which number is the greatest

› Use a representation to justify which is more and which is less.

› How does your representation help to determine how much more or how much less?

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Put In Order

› The directions for this activity can be found in

Burns, Marilyn. 2001. Lessons for Introducing Fractions Grades 4-5. Sausalito, CA: Math Solutions. pp. 105-115.

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Open number line assessment› Draw an open number line from 0 to 2 and place your fraction on the

number line. (use fractions equivalent to well known terminating decimals).

› Find the equivalent decimal and place it on the number line too.

› Place a fraction on your number line that is smaller than your original number.

› Place a decimal on your number line that is larger than your original number.

› What kind of information can we gather about the student’s ability to compare and order fractions and decimals from this formative assessment?

Page 99: Rational Numbers and Representations

Individual Put In Order: Another formative assessment

› Put the following numbers in order from smallest to largest and explain your reasoning in writing

1 15 14 1, ,0.10, ,1 ,0.508 16 10 2

Adapted from Burns, Marilyn. 2001. Lessons for Introducing Fractions Grades 4-5. Sausalito, CA: Math Solutions. pp. 135.

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Dueling decimals: An AIMS Activity› This activity can be purchased in PDF form from Aims

Education Foundation at the following web address› http://www.aimsedu.org/item/DA4714/Dueling-Decimals/1.html

› Before doing the activity use the wheels to do the following…….

› Represent 3/10. – How many hundredths are in 3/10?– How can you write 3/10 as a decimal?

› Represent 0.25– How many tenths and how many hundredths in 0.25?

› Represent 0.42– How many tenths and how many hundredths in 0.42?

› How could you use the circles to show 0.3 + 0.6 = 0.9?› How could you use the circles to show 0.9 – 0.4 = 0.5?

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The Greatest Wins› When we paid our bill Bob received three dollars

and thirty cents in change. I received three dollars and three cents in change. Who received more change?

$3.30 > $3.03

› Shante and James are trying out for the track team. Shante is able to sprint eight-tenths of a mile. James is able to sprint for sixty-nine hundredths of a mile. Who was able to sprint the furthest distance?

.8 > .69

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The Greatest Wins

› The instructions for the game can be found in

› De Francisco, C., and Burns, M. 2002. Teaching Arithmetic: Lessons for Decimals and Percents, Grades 5 – 6. Suasalito, CA: Math Solutions Publications. p. 183.

Page 103: Rational Numbers and Representations

Grade 3 Sol Practice Item Made Available by the VDOE

How does instruction which focuses on benchmarkshelp students interpret this question?

Page 104: Rational Numbers and Representations

Grade 4 Sol Practice Item Made Available by the VDOE

How does instruction which focuses on benchmarks help students interpret this question?

Page 105: Rational Numbers and Representations

Grade 5 Sol Practice Item Made Available by the VDOE

How does instruction which focuses on benchmarks help students interpret this question?

Page 106: Rational Numbers and Representations

Grade 4 Sol Practice Item Made Available by the VDOE

How does instruction which focuses on benchmarks help students interpret this question?

Page 107: Rational Numbers and Representations

Comparing fractions with unlike denominators

› Juan and Christina each had individual pizzas that were the same size. Juan sliced his pizza into eight slices and ate six of them. Christina sliced her pizza into six slices and ate four of them. Who ate more pizza?

› Use a drawing to represent this problem situation to help you solve this problem.

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Comparing fractions with unlike denominators

› Marsha and Karl each had pizzas that were the same size. Marsha cut her pizza into six slices and ate two of them. Karl sliced his pizza into three slices and ate one of them. Who ate more pizza?

› Use a drawing to represent this problem situation to help you solve this problem.

› Why is important to say in these problems that the pizzas were the same size?

› Could we say who ate more pizza if we didn’t know the size of their pizzas?

› Sort the drawings for these two problems into those who drew circles and those that drew rectangles. What are the challenges when using circle drawings to represent fractions?

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Strategies for comparing fractions› Fractions with a numerator of 1 (unit fractions):

The bigger the denominator the smaller the fraction. Why?

› Fractions with the same denominator: The fraction with the largest numerator is the largest. Why?

› Fractions with the same numerators (other than 1): Use a representation to help you write a rule for comparing fractions with the same numerators. Why does the rule work?

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Strategies for comparing fractions

› Fractions with different numerators and denominators

– Benchmarks– Equivalent Fractions– Parallel number lines

› Use each of these methods to decide which is closer to 1?

5/6 or 7/10

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Addition and Subtraction

Page 112: Rational Numbers and Representations

Use your fraction circles or another fraction manipulative to solve these problems

›What is

›What is

›What is

2

1

4

1

2

1

4

3

2

11

Page 113: Rational Numbers and Representations

Solve these problems too!

› What is

› What is

› What is

4

1

2

12

8

1

4

13

2

1

4

11

Page 114: Rational Numbers and Representations

More Addition

› What is ?

› Be prepared to explain your method for finding the sum.

8

52

2

1

4

11

Page 115: Rational Numbers and Representations

Egg Carton Fractions Addition

› ½ + 1/3

› ¾ + 1/6

› 7/12 + 5/6

› ¾ + 3/4

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Egg Carton Subtraction› ½ - 1/3

› 5/6 – 2/3

› 1/3 – 1/12

› 1 1/6 – ¾

› 1 1/3 – 3/4

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Egg Problems

› Juanita bought a dozen eggs at the store. She used three of them to make a breakfast cake, used ½ of them to make scrambled eggs, and used 1/6 of them to make waffles. How many eggs are left?

› Hannah bought three dozen eggs at the store. One-fourth of the eggs in the first carton broke on the way home, 1/3 of the eggs in the second carton were broken, and 1/12 of the eggs were broken in the third carton. How many unbroken eggs does Hannah have?

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Adding and Subtracting with Pattern Blocks› Devin bought a small cake to celebrate his birthday.

He ate 1/3 of his birthday cake with lunch and ate 1/6 of his birthday cake for dinner. How much birthday cake did Devin eat?

› Andre baked 4 pizzas for his super bowl party. He ate 1/6 of one pizza before the party started. At the party 2 ½ pizzas were eaten. How much pizza is left-over for Andre to take to work the next day?

› How does working with models help us make sense of the processes?

Adapted from pg 91 of Chapin, S. H. and Johnson, A. 2000. Math Matters Grades K-6 Understanding the Math You Teach. Sausalito, CA: Math Solutions Publications.

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What is the Sum?› Each pair of partners is given a card with an

addition problem, for example 1/6 + ¼ , or a decimal addition problem.

› Player 1 uses manipulatives to build the first number and put it in the sock.

› Player 2 then uses manipulatives to build the second number and also adds it to the sock.

› Both players guess the sum and then look in the sock to see if they found the sum correctly.

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What is the Difference?› Each pair of partners is given a card with a subtraction

problem on it, for example ¾ - 3/8, or a decimal subtraction problem.

› Player 1 builds the first fraction and places it in the sock.

› Player 2 then removes the pieces from the sock needed to find the difference. (Trades may be needed too).

› Both players find the difference and then look in the sock to see if they are correct.

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Fractions, decimals, and money

› I have eighteen coins in my pocket.

› One-sixth of the coins are quarters.

› One-third of the coins are dimes.

› One-ninth of the coins are nickels.

› The rest of the coins are pennies.

› How much money do I have in my pocket?

Adapted from pg 55 ofSchuster, L., and Anderson, N.C. 2005. Good Questions for Math Teaching . Sausalito, CA: Math Solutions.

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Race to $1.00

› Players take turns rolling the six-sided die.

› Players may take that number of quarters, dimes, nickels, or pennies. Keep track of the value of the money by recording the value as a decimal.

› After six rolls record how much money each player has.

› It’s OK to go over $1.00

› The winner is the player closest to $1.00

› How far is each player from $1.00?

Page 123: Rational Numbers and Representations

Pigs Will Be Pigs

› Read the book Pigs will be Pigs by Amy Axelrod

› Then answer the following questions…› How much money did the pigs collect when they

searched their house? Be prepared to share your method for calculating the total.

› How much do four specials cost?

› After purchasing the specials how much money did the pigs have left over?

Adapted from De Francisco, C., and Burns, M. 2002. Teaching Arithmetic: Lessons for Decimals and Percents, Grades 5 – 6. Sausalito, CA: Math Solutions Publications. p. 134.

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› Jill has 3/5 of a candy bar. If her mother gives her 1/3 of a candy bar, what portion of a candy bar will Jill have?

› (Join- result unknown)

› Andre jogged ½ mile before breakfast and then he jogged some more after dinner. If he jogged 1 ¼ miles that day, how far did he jog after dinner?

› (Join-change unknown)

Addition and Subtraction Concepts

Page 125: Rational Numbers and Representations

› Tony has 25 ¾ ft of copper wire. If he gives 12 ½ ft to Bill for a project, how much wire will Tony have left?

› (Separate – result unknown)

› Tony has 25 ¾ ft of copper wire. He gave some to Bill for a project. Now he has 13 ¼ feet of copper wire left. How much copper wire did Tony give to Bill?

› (Separate – change unknown)

› Tony has some copper wire. He gave 12 ½ ft of copper wire to Bill for a project. Now Tony has 13 ¼ feet of copper wire left. How much copper wire did Tony have to start with?

› (Separate – start unknown)

Addition and Subtraction Concepts

Page 126: Rational Numbers and Representations

› Susan has 3/8 of a 24 pack of soda. Tim has 4/6 of a 24 pack of soda. Who has more soda? How much more?

› (Compare)

› Jennifer has 3½ yards of fabric. 1 ¼ yards are red and the rest of the fabric is blue. How much blue fabric does Jennifer have?

(Part-part-whole Part unknown)

Addition and Subtraction Concepts

Page 127: Rational Numbers and Representations

Are these ½ + 1/3 or ½ - 1/3?

› Starting at her apartment, Sally runs ½ mile down the road. Then Sally turns around and runs 1/3 mile back towards her apartment. How far has Sally run since leaving her apartment?

› Starting at her apartment, Sally runs ½ mile down the road. Then Sally turns around and runs 1/3 mile back towards her apartment. How far down the road is Sally from her apartment?

Page 128: Rational Numbers and Representations

Multi-Step Problems

› Justin works part-time and earns $160.00 every two weeks. She has the following budget:– 1/5 of his paycheck is for snacks/meals– ¼ of his paycheck is for gas– 1/4 of his paycheck is for recreation– The rest is for college savings

› How much money does Justin save for college every two weeks?

Adapted from Lappan, G., Fey, J.T., Fitzgerald, W.M., Friel, S.N., Phillips, E.D. 2004. Bits and Pieces II Using Rational Numbers. Needham, Massachusetts: Pearson Prentice Hall. p.88.

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Can we add or subtract fractions regardless of the whole?

What would ½ - 3/8 be if the ½ is ½ of the smaller circle and the 3/8 is 3/8 of the larger circle?

Page 130: Rational Numbers and Representations

Grade 3 Sol Practice Item Made Available by the VDOE

How does instruction which focuses on the use of representations help students interpret this question?

Page 131: Rational Numbers and Representations

Grade 3 Sol Practice Item Made Available by the VDOE

Page 132: Rational Numbers and Representations

Grade 4 Sol Practice Item Made Available by the VDOE

Page 133: Rational Numbers and Representations

Grade 4 Sol Practice Item Made Available by the VDOE

Page 134: Rational Numbers and Representations

Grade 5 Sol Practice Item Made Available by the VDOE

Page 135: Rational Numbers and Representations

Decimals and Remainders

Page 136: Rational Numbers and Representations

The Doorbell Rang

› Read the story The Doorbell Rang by Pat Hutchins

› Pause for the children to determine how many cookies each person gets as the new guests arrive. – Have the children to draw a representation for each

problem

› How many cookies would each person get if there were 36 cookies to share among 8 people?

Page 137: Rational Numbers and Representations

Balloons and Brownies: Remainders vs Mixed Numbers

› The instructions for this activity can be found in

› Burns, Marilyn. 2003. Lessons for Extending Fractions Grade 5. Sausalito, CA: Math Solutions. pp. 27 - 38.

Page 138: Rational Numbers and Representations

Decimals and Remainders

› Divide nine apples between two people.

› How much does each person get?– Use a drawing to determine how much each person gets

and how much is leftover.› What does your solution mean?

– Use a drawing to determine how much each person gets as a fraction and as a mixed number.› What does the whole number mean in your mixed number? What

does the denominator of the fraction mean in your mixed number? What does the numerator mean in your mixed number?

› What does the denominator of the fraction mean in your fraction solution? What does the numerator mean in your fraction solution?

Page 139: Rational Numbers and Representations

Decimals and Remainders› Divide nine apples between two people. How much

does each person get?– Use base-ten blocks to determine how much each person

gets as a decimal.› What does the whole number in your solution mean? What does the

decimal portion of your solution mean?

– Use long division to determine how much each person gets.

› How does thinking of division in these ways add to our understanding of the connectedness whole number, fraction, and decimal computation?

Page 140: Rational Numbers and Representations

Decimals and Remainders› Graph your fraction, mixed number, and decimal

solutions on a number line. How is your thinking different as you graph each solution?

› Divide nine apples between two people. How much does each person get?

9 19 2 4 4.5 4 1

2 2R

Page 141: Rational Numbers and Representations

Decimals and Remainders: Another one› Share five brownies among four children. How

much does each child get?– Use a drawing to determine how much each person gets

and how much is leftover.› What does your solution mean?

– Use a drawing to determine how much each person gets as a fraction and as a mixed number.› What does the whole number mean in your mixed number? What

does the denominator of the fraction mean in your mixed number? What does the numerator mean in your mixed number?

› What does the denominator of the fraction mean in your fraction solution? What does the numerator mean in your fraction solution?

Page 142: Rational Numbers and Representations

Decimals and Remainders: Another one› Share five brownies among four children. How much

does each child get?

– Use base-ten blocks to determine how much each person gets as a decimal.› What does the whole number in your solution mean? What does the

decimal portion of your solution mean?

– Use long division to determine how much each person gets.

› Which of your solution methods most closely parallels the work you do when you are calculating using the standard algorithm?

Page 143: Rational Numbers and Representations

Decimals and Remainders› Share five brownies among four children. How

much does each child get?

› Graph your fraction, mixed number, and decimal solutions on a number line. How is your thinking different as you graph each solution?

5 15 4 1 1.25 1 1

4 4R

Page 144: Rational Numbers and Representations

Decimals and Remainders: Can you divide a smaller number by a larger number?

› Share four brownies among five children.

› How much does each child get?– Use a drawing to determine how much each person gets

and how much is leftover.› What does your solution mean?

– Use a drawing to determine how much each person gets as a fraction. › What does the denominator of the fraction mean in your fraction

solution? What does the numerator mean in your fraction solution?

› Is it possible to write how much each person gets as a mixed number? Explain.

Page 145: Rational Numbers and Representations

Decimals and Remainders: Can you divide a smaller number by a larger number?

› Share four brownies among five children. How much does each child get?

– Use base-ten blocks to determine how much each person gets as a decimal.› What does the whole number in your solution mean? What does the

decimal portion of your solution mean?

– Use long division to determine how much each person gets.

› How does thinking of division in different ways help the students to understand why the whole number portion of their decimal solution is a zero?

Page 146: Rational Numbers and Representations

Decimals and Remainders› Divide four brownies among five children. How

much does each child get?

› Graph your fraction, mixed number, and decimal solutions on a number line. How does graphing your solutions help students to “see” that the solution is less than 1 whole?

4 84 5 0.8 0 4

5 10R

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Multiplication

Page 148: Rational Numbers and Representations

Building Rectangles

› This activity can be purchased in PDF form from Aims Education Foundation at the following web address

› http://www.aimsedu.org/item/DA1924/Building-Rectangles/1.html

Page 149: Rational Numbers and Representations

Writing Rectangles

› Given the dimensions of a rectangle build the representation of the product using your base ten blocks and the array model.

› Examine the partial products algorithm and how it relates to the array model.

Page 150: Rational Numbers and Representations

Tens to Tenths Again

› The array model extends to the multiplication of decimal numbers.

› Build each of the products with your base ten blocks.

› Use the partial products algorithm to determine the product too!

Page 151: Rational Numbers and Representations

Where does the decimal go?

› Use the array model to represent the product 12 x 13

› Then use the array model to represent this product

– 1.2 x 1.3

› How are these representations similar? Different? Adapted from Van de Walle, J.A. and Lovin, L.H. 2006. Teaching Student-Centered Mathematics Grades 3-5. Boston, MA: Pearson Education, Inc. p. 199.

Page 152: Rational Numbers and Representations

Which answer makes sense?

1) Solve the problem on page 175 of

De Francisco, C., and Burns, M. 2002. Teaching Arithmetic: Lessons for Decimals and Percents, Grades 5 – 6. Sausalito, CA: Math Solutions Publications.

2) Examine the student work samples. What is Patrice’s misunderstanding? What rule is being incorrectly applied by Crystal?

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Calculators?

Page 154: Rational Numbers and Representations

How do you use calculators during fraction and decimal instruction?

Page 155: Rational Numbers and Representations

Multiplying and Dividing by Numbers Close to 1

› What can you tell me about these two products?

–0.8 x 20

–1.2 x 20

› How does an activity like this contribute to a student’s ability to be successful when estimating?

Page 156: Rational Numbers and Representations

Decimal Calculator games› Play each of the following calculator games

– Decimal Nim– Target– Race to Zero – Target II

› Be prepared to share any strategies you develop to win the games.

› How does using calculators in this way contribute to the students’ understandings of decimals and place value?

Instructions for the games can be found in De Francisco, C., and Burns, M. 2002. Teaching Arithmetic: Lessons for Decimals and Percents, Grades 5 – 6. Sausalito, CA: Math Solutions Publications. pp 184-187.

Page 157: Rational Numbers and Representations

More calculator fun!› On many calculators by pressing the equal sign over again

repeats the previous action.

› Enter 0.1 in your calculator and then press equal.

› Make a prediction about the next number you will see.

› Enter equals again. Continue this process until your calculator says 0.9. What do you think the next number will be? Make a prediction.

› Then press the equals again to check your prediction.

› When you add one-tenth to a number with a nine in the tenths place, why does the digit in the ones place increase by 1?

Page 158: Rational Numbers and Representations

More calculator fun!

› If you enter 0.001 in your calculator, how many times will you need to press the equal sign to get the calculator to reach 0.01?

› What number do we need to add to two and forty-seven hundredths so that the display shows 2.473?

Page 159: Rational Numbers and Representations

Knockout!

› Instructions for this activity can be found in

› De Francisco, C., and Burns, M. 2002. Teaching Arithmetic: Lessons for Decimals and Percents, Grades 5 – 6. Sausalito, CA: Math Solutions Publications. P. 164.

Page 160: Rational Numbers and Representations

Place logo or logotype here,

otherwisedelete this.

“Giving students rules to help them develop facility with fractions will not help them understand the concepts. The risk is that when students forget a rule, they’ll have no way to reason through a process.”

Burns, M. 2007. About Teaching Mathematics a K-8 Resource (3rd ed). Sausalito, CA: Math Solutions. p 268.

Page 161: Rational Numbers and Representations

Sources› All the practice items can be found on the VDOE

website at http://www.pen.k12.va.us/testing/sol/practice_items/index.shtml#math

› You will also need the following books:– Axelrod, A. 1994. Pigs Will Be Pigs. New York : Maxwell

Macmillan International.– Burns, Marilyn. 2003. Lessons for Extending Fractions

Grade 5. Sausalito, CA: Math Solutions.– Burns, Marilyn. 2001. Lessons for Introducing Fractions

Grades 4-5. Sausalito, CA: Math Solutions.– De Francisco, C., and Burns, M. 2002. Teaching

Arithmetic: Lessons for Decimals and Percents, Grades 5 – 6. Sausalito, CA: Math Solutions Publications.

– Hutchins, Pat. 1994. The Doorbell Rang. New York : Mulberry Books.