6th Grade Math Unit 4 Bits and Pieces II and III

BY THE END OF THIS UNIT:

Bits & Pieces II

Unit Plans / Investigation / Suggested ACE Questions
Investigation 1 does not cover 6th grade common core, but is a good resources to support students’ conceptual understanding of fractions. Similarly, Investigation 2focuses on developing conceptual understanding of adding and subtracting fractions5.NF. / Estimating Fractions
1.1Getting Close
1.2Folding Fraction Strips
Adding and Subtracting Fractions
2.1 Land Sections
2.2 Visiting the Spice Shop
2.3 Just the Facts
2.4 Designing Algorithms for Addition and Subtraction / 1.1 ACE 1-15,19-22, 31-33,35
1.2 ACE 28-30, 37-40
2.1 ACE2,29
2.2 ACE 4, 6-12, 30-35
2.3 ACE14-18, 41-44
2.4 ACE19-25, 46, 47
Unit Plans / Investigation / Suggested ACE Questions
Standard 6.NS.1
Investigation 3
Multiplying with Fractions
Investigation 4
Dividing with Fractions / 3.1How much of the Pan Have we Sold?
3.2Finding a Part of a Part
3.3Modeling More Multiplication Situations
3.4Changing Forms
3.5Writing a Multiplication Algorithm
4.1 Equivalent Fractions and Equal Shares
4.2 Finding Equivalent Fractions
4.3 Comparing Fractions to Benchmarks
4.4 Writing a Division Algorithm / 3.1 ACE 1-3, 36, 37
3.2 ACE 6-8, 10, 38, 39
3.3 ACE 11-14, 40-45
3.4 ACE 18-20, 46, 47
3.5 ACE 21-33
4.1 ACE1,2,24-29
4.2 ACE 5-8, 30-34
4.3 ACE11-14
4.4 ACE 15-23

Bits & Pieces III

Unit Plans / Investigation / Suggested ACE Questions
Standards 6.NS.2; 6.NS.3
Investigation 1
Decimals – More or Less!
Investigation 2
Decimal Times
Investigation 3
The Decimal Divide
Standard 6.RP.3c
Investigation 4
Using Percents
Investigation 5
More About Percents / 1.1About How Much?
1.2Adding and Subtracting Decimals
1.3Using Fractions to Add and Subtract Decimals
1.4Decimal Sum and Difference Algorithms
2.1 Relating Fractions and Decimal Multiplication
2.2 Missing Factors
2.3 Finding Decimal Products
2.4 Factor- Product Relationships
3.1Deciphering Decimal Situations
3.2 The Great Equalizer
3.3 Exploring Dividing Decimals
3.4 Representing Fractions as Decimals
4.1 Determining Tax
4.2 Computing Tips
4.3 Finding Bargains
5.1 Clipping Coupons
5.2 How Much Can We Spend? / 1.1ACE 1-6, 37-38
1.2ACE 8-18
1.3 ACE19-21
1.4 ACE23-32, 45, 46
2.1 ACE 1-3, 34, 39
2.2 ACE 7-10, 12-16
2.3 ACE 17-19, 22-24, 40, 44
2.4ACE 25, 27-31, 33, 45
3.1 ACE 1-4, 28, 29
3.2ACE 5-14
3.3 ACE 15-19, 22-24
3.4 ACE 27
4.1 ACE1-3, 13
4.2 ACE 4-6, 31,32
4.3 ACE 8-12, 20-22, 35-39
5.1ACE 1-6, 16-18
5.2ACE 7, 19; 8-14

CORE CONTENT

Cluster Title: The Number System: Apply and extend previous understandings of multiplication and division to divide fractions by fractions.
Standard 6.NS.1:
Interpret and compute quotients of fractions, and solve word problems involving division of fractions by fractions, e.g., by using visual fraction models and equations to represent the problem. For example, create a story context for (2/3) ÷ (3/4) and use a visual fraction model to show the quotient; use the relationship between multiplication and division to explain that (2/3) ÷ (3/4) = 8/9 because 3/4 of 8/9 is 2/3. (In general, (a/b) ÷ (c/d) = ad/bc.) How much chocolate will each person get if 3 people share 1/2 lbs. of chocolate equally? How many 3/4-cup servings are in 2/3 of a cup of yogurt? How wide is a rectangular strip of land with length 3/4 mi. and area 1/2 square mi.?
Concepts and Skills to Master
  • Understand how to set up a problem based on the context of the problem.
  • Be able to interpret what the quotient represents.
  • Recognize that what is known or not known is based on the type of division needed (partitive—Total / # of groups = size of groups—or quotative or measurement—Total / size of group = # of groups) model.
  • Create a story context using division of fractions.
  • Understand that multiplication and division are inverse operations regardless of the class of numbers.

  • Compute the division of fractions.
  • Solve a story context using division of fractions.

  • Model division of fractions with manipulatives, diagrams (e.g., bar model, number line) and story contexts.
  • Write equations representing authentic problems involving fractions.

SUPPORTS FOR TEACHERS

Critical Background Knowledge
Know that multiplication and division are inverse operations.
Know that division is either fair sharing (partitive) or repeated subtraction (quotative).
Convert between improper fractions and mixed numbers.
Division by whole numbers.
Division of a whole number by a fraction.
Model division with manipulatives, diagrams and story contexts.
Academic Vocabulary
quotient, reciprocal, inverse operation
Suggested Instructional Strategies
Use this problem: How many servings of popcorn are in 4½ cups if each person receives 3/4 cup of popcorn
The teacher provides 4½ cups of popcorn. Students use a 3/4 cup measuring cup to solve the problem. Record solutions as a group.
1. Think-Pair-Draw-Share: Put students in pairs. Have one solve the problem using a picture/diagram and the other solve using the algorithm. Then they get together and compare.
2. Think-Pair-Share: Students solve the problem on their own, then get together and discuss how their solutions are the same and how they are different.
3. Four Corners: Give students a problem and the quotient. Give each corner in your room a label and have students go to the corner they think would be the correct label for the quotient. / Resources
  • Connected Mathematics Bits and Pieces II, Investigation 4
  • Math Forum - Teacher Tutorial –
  • Dividing Fractions - Teacher Tutorial -
  • Visual Fractions - “Divide Fractions” - Interactive Applets and Game -
  • UEN - “Modeling Multiplication and Division of Fractions” Lesson -
  • LearnAlberta - “Improper Fractions and Mixed Numbers” Video Lesson -

  • Illuminations “Feeding Frenzy” - Unit Rates; Multiply/Divide Fractions
  • UEN - “Sticky Note Math” Lesson -
  • UEN - “Dividing Fractions” Lesson -

Sample Formative Assessment Tasks
Skill-based task
Use representations to show that 1/4 divided by 1/2 is 1/2, that 2/3 divided by 2/5 is 5/3, that 2/3 divided by 3/4 is 8/9, and that 1½ divided by 6/4 is 1. / Problem Task
  • You have 5/8 pound of Skittles. You want to give your friends 1/4 lb. each. How many friends can you give Skittles to? Explain your answer.
  • You have a 3/4-acre lot. You want to divide it into 3/8-acre lots. How many lots will you have? Draw a diagram to justify your solution.
  • You have a 3/4-acre lot. You want to divide it into 2 sections. How many acres in each section will you have? Draw a diagram to justify your solution.
  • How wide is a rectangular strip of land with length 3/4 mi. and area 1/2 square mi.?

CORE CONTENT

Cluster Title: The Number System: Compute fluently with multi-digit numbers and find common factors and multiples.
Standard 6.NS.2 : Fluently divide multi-digit numbers using the standard algorithm.
Concepts and Skills to Master
  • Identify when it is appropriate to use the standard algorithm.

  • Use the standard algorithm to compute multi-digit division problems with procedural fluency.
Note: Procedural fluency is defined as skill in carrying out procedures flexibly, accurately, efficiently and appropriately (Adding It Up, National Research Council).
  • Divide multi-digit numbers using the standard algorithm.

SUPPORTS FOR TEACHERS

Critical Background Knowledge
  • Understand the meaning of division.
  • Understand place value of multi-digit numbers.
  • Know that division is the inverse of multiplication.
  • Illustrate and explain the relationship between calculations and models for multiplying and dividing multi-digit numbers.

  • Divide with single-digit numbers.
  • Use compatible numbers to make an estimation to determine reasonableness of answers.
  • Use the standard algorithm for division.
  • Read division notation.
  • Model division with manipulatives, diagrams, and story contexts

Academic Vocabulary
dividend, division notation ÷, /, divisor, quotient, remainder
Suggested Instructional Strategies
1. Think Aloud: Do the problem with a partner while explaining and telling what you are thinking and doing.
2. Have students identify in a problem set when they would use mental math and when they would use the standard algorithm.
3. Connect students’ existing strategies for division with the standard algorithm.
4. As a starter activity, use division problems that can reasonably be solved by using mental math (e.g., 105/25), estimation (e.g., 150 ÷ 12, 227 ÷ 30), and reasoning (e.g., when I think of 105 divided by 25, I think of 4 sets of 25 with 5 left over, the 5 left over is 5/25 which is 1/5, so the answer is 4 1/5). Model for the students your thinking as you work through the problem. (Note: This strategy would not apply to complex division problems for which the algorithm is most appropriate [e.g., 4567 ÷ 192]). / Resources
  • Textbook Correlation: Bits & Pieces II and III

Sample Formative Assessment Tasks
Skill-based task
248 divided by 18 / Problem Task
I spent $504 on 28 tickets for a rock concert. How much did I spend on each ticket?

CORE CONTENT

Cluster Title: The Number System: Compute fluently with multi-digit numbers and find common factors and multiples
Standard 6.NS.3: Fluently add, subtract, multiply, and divide multi-digit decimals using the standard algorithm for each operation
Concepts and Skills to Master
  • Understand the role of place value in the operations of addition, subtraction, multiplication and division
  • Identify when it is appropriate to use the standard algorithm
  • Add, subtract, multiply, and divide multi-digit decimals.
  • Model the operations of addition, subtraction, multiplication, and division with manipulatives, diagrams, and story contexts for multi-digit decimals.

SUPPORTS FOR TEACHERS

Critical Background Knowledge
  • Understand decimal place values
  • Know basic facts for addition, subtraction, multiplication and division
  • Add, subtract, multiply and divide single-digit decimals
  • Model the operations of addition, subtraction, multiplication, and division with manipulatives, diagrams and story contexts for single digit decimals.

Academic Vocabulary
addend, sum, difference, factor, product, divisor, dividend, quotient, remainder
Suggested Instructional Strategies
Connect students’ knowledge of various strategies to the standard algorithm.
Have students look at student work that contains a common misconception and look at errors and discuss how to correct the error. / Resources
  • Connected Mathematics Bits and Pieces III, Investigations 1-3
  • NLVM - Base Block Decimals -
  • NLVM - Circle 3 - Adding Decimals - Puzzle -

  • LearnAlberta - “Solving Problems with Decimals” Video Lesson -

  • LearnAlberta - “Addition and Subtraction of Decimals” Video Lesson -

  • Math Play - Jeopardy - Computation Game –

  • LearnAlberta - Multiplication and Division of Decimals - Video Tutorial -

Sample Formative Assessment Tasks
Skill-based task:
1. 242.134 + 308.02
2. 38.9 – 14.334
3. 11.82 x 2.81
4. 341.8 ÷ 1.2 / Problem Task
The school had a bake sale and raised $75.55. If each cookie cost $0.05, how many cookies were sold? Explain how you got your answer

Successive pages contain an unpacking of the standards contained in the unit. Standards are listed in alphabetical and numerical order

not suggested teaching order. Teachers must order the standards to form a reasonable unit for instructional purposes