1. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
1 minute
MATERIALS NEEDED: X
A Story of Units
Grade K – Module 4
NOTE THAT THIS SESSION IS DESIGNED TO BE 4 HOURS and 15 MINUTES IN LENGTH.
Turnkey Materials Provided in Addition to PowerPoint:
Grade K—Module 4 Selected Lessons Handout
GK-M4- Module Overview Handout
Additional Suggested Resources:
Operations and Algebraic Thinking Progression Document
A Story of Units: A Curriculum Overview for Grades P-5
How to Implement A Story of Units
Welcome! In this module focus session, we will examine Grade K – Module 4.

2. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
1 minute
MATERIALS NEEDED: X
Session Objectives
Examine the development of mathematical understanding across the module by focusing on several lessons in Module 4.
Lesson demonstration
Opportunity for you to teach a lesson to your peers
Observe and score an assessment
Introduce mathematical models and instructional strategies to support curriculum implementation.
Our objectives for this session are to:
Examine the development of mathematical understanding across the module using a focus on the lessons.
Introduce mathematical models and instructional strategies to support implementation of A Story of Units.

3. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
1 minutes
MATERIALS NEEDED: X
Agenda
Introduction to the Module Lesson Study Administration of Assessments Module Review
We will begin by briefly exploring the module overview to understand the purpose of this module. Then we will dig in to the math of the module, with the bulk of our time spent on lesson study. We’ll lead you through the teaching sequence, one concept at a time. You will have the opportunity to take part in live demonstrations and possibly even facilitate a lesson. Finally, we’ll take a look back at the module, reflecting on all the parts as one cohesive whole through the lens of assessment.
Let’s get started with the module overview.
*Idea- ask for a volunteer who feels comfortable with our assessment process. Have that volunteer administer the assessment to one of the facilitators and have group use rubric to score (in afternoon).

4. Curriculum Overview of A Story of Units
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
3 minutes
MATERIALS NEEDED: X
Curriculum Overview of A Story of Units
The fourth module in Kindergarten is Number Pairs, Addition and Subtraction to 10. The module includes 41 lessons and is allotted 47 instructional days.
How many of you have had experience teaching/observing M1? M2? M3? Based on that experience, what knowledge and experiences do your students already have that prepare them for addition and subtraction?
Number core: number name sequence, 1:1 correspondence, cardinality, numeral recognition
Tracking a counting path
Models: Rekenrek, counting the Math Way, number towers, 5-groups, number path
Hidden partners (decomposition/composition)
Exposure to expressions and equations
Comparing numbers
This module builds on understandings of number and operations established in Modules1-3, formalizing their understanding of number pairs using addition and subtraction operations. This module prepares students for success as they move into Level 2 and 3 methods for solving single-digit addition and subtraction problems.

5. Introduction to the Module
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
5 minutes
MATERIALS NEEDED:
GK-M4 Module Overview
Introduction to the Module
Read the narrative in the Module Overview.
Look at the objective chart.
Video/demonstration focuses on L1
You will have an opportunity to try key lessons and share concepts from each topic
To become familiar with Module 4, read the narrative in the module overview. We will not spend much time going through the other components of the module overview or topic openers to leave as much time as possible to exploring and practicing key mathematical concepts within the lessons.
Read the narrative in the Module Overview
Look at the objective chart. Video/demonstration lesson will be on L1
You will have an opportunity to try key lessons and share concepts from each topic
4. The Operations and Algebraic Thinking Progressions Document together with the progressions document for Number and Operations in Base Ten will provide keen insight into the relationship between standards between grades K-2. Throughout the session, we will connect portions of these progressions documents to our learning.
Module Overview

6. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
1 minute
MATERIALS NEEDED: X
Agenda
Introduction to the Module Lesson Study Administration of Assessments Module Review
Now that you know the main objectives for this module, let’s dig into the lessons.

7. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
12 minutes
MATERIALS NEEDED:
GK-M4 Selected Lessons Handout
3 hula hoops
Masking tape
Demonstration Lesson
Lesson 1 objective: Model composition and decomposition of numbers to 5 using actions, objects, and drawings.
Demonstration of Lesson 1 Concept Development by facilitator.
While facilitating the CD, click to show image of birds on the next slide.
Lesson 1, Concept Development

8. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
1 minute
MATERIALS NEEDED:
GK-M4 Selected Lessons Handout
Demonstration Lesson
Use this image as part of the Lesson 1 Concept Development demonstration. Participants should decompose 5 birds into two groups: 2 chickens and 3 geese.
Lesson 1, Concept Development

9. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
12 minutes
MATERIALS NEEDED:
GK-M4 Selected Lessons Handout
3 hula hoops
Masking tape
Number Bond Model
Actions
Objects
Drawings
Numbers
In Topic A, students learn a critical new model- the number bond. They saw a preview of the number bond in Module 1 when they worked with hidden partners in Lesson 9, but this topic formalizes the model in students minds. The number bond is a pictorial representation of the part-part-whole relationship.
As you would expect, number bond work progresses from concrete to abstract.
(Click to advance.) Students initially learn about the model by acting out a story, as we just saw in Lesson 1.
(Click to advance.) Students then practice with manipulatives using a number bond template.
(Click to advance.) They then begin to use pictorial representations of objects in the number bonds.
(Click to advance.) Finally, they begin to use numerals in place of objects and pictures.
Note that the number bond can be presented in any orientation. Throughout Topic A, students see the number bond in all of its orientations so that they do not develop a rigid understanding of the model or how it is used.
Why do we spend so much time with the relationships between numbers 1-5?
K.OA.5 Fluently add and subtract within 5. Students need to understand the relationships among these numbers deeply through extended practice to become fluency with addition and subtraction within 5.
“Students work with small numbers first, though many kindergarteners will enter school having learned parts of the Kindergarten standards at home or at a preschool program. Focusing attention on small groups in adding and subtracting situations can help students move from perceptual subitizing to conceptual subitizing in which they see and say the addends and the total, e.g., ‘Two and one make three.’” – OA Progression, page 8. Spending time on 1-5 establishes the part-part-whole relationship. It also allows an understanding of composing and decomposing within a manageable quantity.
Module 4 – Topic A

10. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
3 minutes
MATERIALS NEEDED:
Personal White Boards
GK-M4 Selected Lessons Handout
Number Bond Flash
Instruct participants to take out their personal white boards. Facilitate the following fluency activity from Lesson 7. It should take only 2 minutes with adults.
Number Bond Flash (5 minutes)
Materials: (T) Magnetic shapes or dry erase markers (S) Personal white boards
Note: This is a maintenance activity to support fluent understanding of the relationships between numbers to 5 through number bonds.
T: (Show 3 red squares and 1 yellow square.) How many squares do I have?
S: 4 squares.
T: How many are yellow?
S: 1.
T: How many are red?
S: 3.
T: 1 and 3 are the parts. 4 is the whole. Draw a number bond to tell about my squares. Lift up your board when you are done.
S: (Write number bonds using drawings or numerals. Lift board to signal completion.)
T: Nice job.
Repeat with (CLICK TO ADVANCE) 2 + 2,
(CLICK TO ADVANCE) 4 + 1,
(CLICK TO ADVANCE) As students show mastery, stop naming the parts and whole before they draw.
How is this activity designed so that students can self-differentiate? (The student chooses whether to use drawings or numerals in the number bond. Student chooses orientation of bond.)
How can you adjust the materials to provide additional differentiation? (Slide number bond mat into personal white board, give students cubes to create concrete number bonds, allow advanced students to create number bonds for higher sums if they show mastery within 5.
Lesson 7, Fluency

11. Participant Demonstrations
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
12 minutes
MATERIALS NEEDED:
GK-M4 Selected Lessons Handout
Materials for each lesson/topic, organized by topic
Participant Demonstrations
TB, Lesson 10: AP, CD TC, Lesson 13: CD, SD TD, Lessons 19, 20, 22: Demonstrate subtraction strategies: break off, hide, and cross off a part TE, Lesson 27: CD, SD TF, Lessons 29-31: Describe the progression of addition word problems in this topic. TG, Lessons 33-36: Describe the progression of subtraction word problems in this topic. TH, Lesson 37: CD and SD
Assign each Topic to a table to demonstrate. (In cases where they are presenting a CD, 1 participant “teacher” will teach to the rest of their table.)
TB, Lesson 10: Concept Development
TC, Lesson 13: Concept Development and Debrief (questions that do not relate to PS)
TD, Lessons 22-24: Demonstrate subtraction strategies: break off, hide, and cross of a part (Provide support for this group early to make sure that they understand their task. They are to provide examples of how students will use each of the three strategies to subtract.)
TE, Lesson 27: Concept Development and Debrief
TF, Lessons 29-31: Describe the progression of addition word problems in this topic. (Teachers will read the four lessons and describe how the problems differ as the complexity increases, giving examples from the text.)
TG, Lessons 33-36: Describe the progression of subtraction word problems in this topic. (Teachers will read the four lessons and describe how the problems differ as the complexity increases, giving examples from the text.)
TH, Lesson 37:
Each table will have 10 minutes to prepare their demonstration. If you are presenting a CD, one person should plan to be the teacher while other participants are students. If you are presenting on a series of problems from a topic, the group may decide how to split up the presentation responsibilities.
Ideally, 1-2 participants from each group will skim the other lessons in the topic to better understand the context.
As the demo lesson is being presented, the rest of the room gathers around the demo teacher and table of “students”.
Note to facilitator: Depending on how many participants you have, you might split the lessons between pairs of “teachers” to teach to the whole room (if you have a small group) or you can split the components of each lesson (if you have a large group).
Module 4

12. Participant Demonstration Lesson
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
10 minutes
MATERIALS NEEDED:
GK-M4 Selected Lessons Handout
Linking cube 6-sticks (5 of one color, one of another color)
Personal white boards
Participant Demonstration Lesson
Lesson 10 objective: Model decompositions of 6-8 using linking cube sticks to see patterns. (Application Problem and Concept Development)
How will decomposing numbers less than or equal to 10 in more than one way help students with Level 2 and 3 problem solving? (K.OA.3)
Demonstration and Debrief of LESSON 10
How will decomposing numbers less than or equal to 10 in more than one way help students with Level 2 and 3 problem solving? (K.OA.3)
(Show In order to engage in Level 2 counting on strategies, students must understand that an addend is embedded in the total (perceive addend simultaneously as an addend and as part of the total). They are therefore able to omit the counting of one addend, 8 (show 8 fingers), and count on by the other addend, 9, 10, 11, 12. For level 3 strategies, they make use of this knowledge to convert to an easier problem. Level 3 example: 8 + 4= 8 +(2 + 2)= = 12)
The quotes that follow each lesson are excerpts taken from the Operations and Algebraic Thinking progressions document. These portions of the progressions document pertain to the mathematical concepts each lesson is written from.
“Put Together/Take Apart situations with Both Addends Unknown play an important role in Kindergarten because they allow students to explore various compositions that make each number. (K.OA.3) This will help student to build the Level 2 embedded number representations used to solve more advance problem subtypes. As students decompose a given number to find all of the partners that compose the number, the teacher can record each decomposition with an equation such as 5 = 4 +1, showing the total on the left and the two addends on the right. Students can find patterns in all of the decompositions of a given number and eventually summarize these patterns for several numbers.” (p. 10, Operations and Algebraic Thinking progressions)
Module 4, Lesson 10

13. Participant Demonstration Lesson
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
10 minutes
MATERIALS NEEDED:
GK-M4 Selected Lessons Handout
Linking cube 6-sticks (5 of one color, one of another color)
Personal white boards
Participant Demonstration Lesson
Lesson 13 objective: Represent decomposition and composition addition stories to 6 with drawing and equations with no unknown. (Concept Development and Debrief)
How do math drawings and number bonds support the use of number sentences (equations) in this lesson?
Demonstration and Debrief of LESSON 13
How do math drawings and number bonds support the use of number sentences (equations) in this lesson?
(They help the students mathematize the situation and provide pictorial references for writing equations. Drawings and number bonds help students identify the referents within the number sentence (MP.2), helping them to better understand the part-part-whole relationship in equation form.)
The quotes that follow each lesson are excerpts taken from the Operations and Algebraic Thinking and Number and Operations in Base Ten progressions documents. These portions of the progressions document pertain to the mathematical concepts each lesson is written from.
“Students act out adding and subtracting situations by representing quantities in the situation with objects, their fingers, and math drawings (MP.5, K.OA.1). To do this, students must mathematize a real-world situation (MP.4), focusing on the quantities and their relationships rather than non-mathematical aspects of the situation. Situations can be acted out and/or presented with pictures or words. Math drawings facilitate reflection and discussion because they remain after the problem is solved. These concrete methods that show all of the objects are called Level 1 methods.” (p. 8, Operations and Algebraic Thinking progressions)
“Numerical expressions and recordings of computations, whether with strategies or standard algorithms, afford opportunities for students to contextualize, probing into the referent for the symbols involved (MP.2). Representations such as bundled objects or math drawings…and diagrams…afford the mathematical practice of explaining correspondences among different representations (MP.1).” (p. 4, Number and Operations in Base Ten)
NOTE: In Topic C, Lesson 16, students learn to use a mystery box to represent the unknown in an equation. In GK, the unknown is often the total. Using this strategy helps prepare students for missing addend problems in G1.
Module 4, Lesson 13

14. Participant Demonstration Lesson
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
10 minutes
MATERIALS NEEDED:
GK-M4 Selected Lessons Handout
Linking cube 6-sticks (5 of one color, one of another color)
Personal white boards
Participant Demonstration Lesson
Lessons 19, 20, 22: Demonstrate subtraction methods: break off, hide, and cross off a part
How do these concrete methods help Kindergarteners understand the concept of subtraction?
Demonstration and Debrief of Topic D
How do these concrete methods help Kindergarteners understand the concept of subtraction?
(They help the students visualize and mathematize the situation and provide pictorial references for writing equations. Drawings and number bonds help students identify the referents within the number sentence, helping them to better understand the part-part-whole relationship in equation form. There is less flexibility in how subtraction sentences are written, so identifying the referents and applying them to the equations may be more difficult.)
The quotes that follow each lesson are excerpts taken from the Operations and Algebraic Thinking progressions document. These portions of the progressions document pertain to the mathematical concepts each lesson is written from.
“Students act out adding and subtracting situations by representing quantities in the situation with objects, their fingers, and math drawings (MP.5, K.OA.1). To do this, students must mathematize a real-world situation (MP.4), focusing on the quantities and their relationships rather than non-mathematical aspects of the situation. Situations can be acted out and/or presented with pictures or words. Math drawings facilitate reflection and discussion because they remain after the problem is solved. These concrete methods that show all of the objects are called Level 1 methods.” (p. 8, Operations and Algebraic Thinking progressions)
Module 4, Topic D

15. Participant Demonstration Lesson
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
10 minutes
MATERIALS NEEDED:
GK-M4 Selected Lessons Handout
Linking cube 6-sticks (5 of one color, one of another color)
Personal white boards
Participant Demonstration Lesson
Lesson 27: Model decompositions of 10 using a story situation, objects, and number bonds.
Why do Kindergarteners need to be able to find the number that makes 10 with any number from 1 to 9? (K.OA.4)
Demonstration and Debrief of Topic D
Why do Kindergarteners need to be able to find the number that makes 10 with any number from 1 to 9? (K.OA.4)
(This prepares students to compose and decompose 10, and later any base ten unit. This is critical for use of standard algorithms beginning in G2. Kindergarten teachers are setting an early basis for conceptual understanding of addition and subtraction strategies and algorithms. It also supports the Level 3 strategy of making a ten.)
The quotes that follow each lesson are excerpts taken from the Number and Operations in Base Ten progressions document. These portions of the progressions document pertain to the mathematical concepts each lesson is written from.
“Standard algorithms for base-ten computations with the four operations rely on decomposing numbers written in base-ten notation into base-ten units. The properties of operations then allow any multi-digit computation to be reduced to a collection of single-digit computations. These single-digit computations sometime require the composition or decomposition of a base-ten unit.” (p. 8, Operations and Algebraic Thinking progressions)
Module 4, Lesson 27

16. Core Fluency Practice Sets
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
Core Fluency Practice Sets
Daily practice for review and mastery of the sums and differences with totals through 5
5 sets (easy  hard)
96 seconds (6/problem)
Students move at own pace through series
We introduce core fluency practice sets and sprints in Topic F. These provide daily practice for review and master of the GK core fluency, sums and differences with totals to 5.
The fluency practice sets come in a series that progresses from easy to hard. The first time you administer the sets, all of your students will start on Sheet A. Students continue to work on Sheet A until they are able to complete all problems correctly in 96 seconds. Once a student has mastered Sheet A, she moves on to Sheet B, and so on. In this way, your students will continue to practice at their own level until they have achieved mastery.
Encourage students who did not finish to take the sheet home and continue to practice.
Module 4, Topics F, G & H

17. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
Core Fluency Sprints
Cover sums and differences with totals through 5
4 sets (easy  hard)
Select one sprint for entire class
The sprints come in four sets that progress from easy to hard. With the sprint, you will need to choose one set of problems for all of your students in order to continue the sprint correction pattern you’ve already established for the class. Choose the set that best meets the needs of most of your class, and remember that sprints are differentiated so that every child in your class should be able to complete at least the first few problems.
Module 4, Topics F, G & H

18. Participant Demonstration Lesson
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
10 minutes
MATERIALS NEEDED:
GK-M4 Selected Lessons Handout
Linking cube 6-sticks (5 of one color, one of another color)
Personal white boards
Participant Demonstration Lesson
Lessons 29-31: Describe the progression of addition word problems in this topic.
How does the progression of word problems adhere to the OA Progressions Table 2: Addition and subtraction situations by grade level? (K.OA.2)
Demonstration and Debrief of Topic F
How does the progression of word problems adhere to the OA Progressions Table 2: Addition and subtraction situation by grade level? (K.OA.2)
(The progression of problems first helps students mathematize the situation by providing the parts and the total. Once the referents are established, students are ready to try three types of addition word problems: Add To/Result Unknown, Put Together/Total Unknown, and Both Addends Unknown)
Module 4, Topic F

19. Addition Situations by Grade Level
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
Addition Situations by Grade Level
Operations and Algebraic Thinking Progressions Document, p. 9
The quotes that follow each lesson are excerpts taken from the Operations and Algebraic Thinking progressions document. These portions of the progressions document pertain to the mathematical concepts each lesson is written from.
“Add To/Take From situations are action-oriented; they show changes from an initial state to a final state. These situations are readily modeled by equations because each aspect of the situation has a representation as a number, operation (+ or -), or equal sign (here with the meaning of “becomes,” rather than the more general “equals”).” (p. 8-9, Operations and Algebraic Thinking progressions)
“In Put Together/Take Apart situations, two quantities jointly compose a third quantity (the total), or a quantity can be decomposed into two quantities (the addends). This composition/decomposition may be physical or conceptual. These situations are acted out with objects initially and later children begin to move to conceptual mental actions of shifting between seeing the addends and seeing the total (e.g., seeing children or seeing boys and girls, or seeing red and green apples or all the apples.)” (p. 10, Operations and Algebraic Thinking progressions)
“Put Together/Take Apart situations with Both Addends Unknown play an important role in Kindergarten because they allow students to explore various compositions that make each number. (K.OA.3) This will help students to build the level 2 embedded number representations used to solve more advanced problem subtypes. As students decompose a given number to find all of the partners that compose the number, the teacher can record each decomposition with an equation…” (p. 10, Operations and Algebraic Thinking progressions)
Module 4, Topic F

20. Participant Demonstration Lesson
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
10 minutes
MATERIALS NEEDED:
GK-M4 Selected Lessons Handout
Linking cube 6-sticks (5 of one color, one of another color)
Personal white boards
Participant Demonstration Lesson
Lessons 33-36: Describe the progression of subtraction word problems in this topic.
How does the progression of word problems adhere to the OA Progressions Table 2: Addition and subtraction situations by grade level? (K.OA.2)
Demonstration and Debrief of Topic G
How does the progression of word problems adhere to the OA Progressions Table 2: Addition and subtraction situation by grade level? (K.OA.2)
(The progression of problems first helps students mathematize the situation by providing the parts and the total. Once the referents are established, students are ready to try two types of subtraction word problems: Take From/Result Unknown and Take Apart/Total Unknown)
Module 4, Topic G

21. Subtraction Situations by Grade Level
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
Subtraction Situations by Grade Level
Operations and Algebraic Thinking Progressions Document, p. 9
The quotes that follow each lesson are excerpts taken from the Operations and Algebraic Thinking progressions document. These portions of the progressions document pertain to the mathematical concepts each lesson is written from.
“Add To/Take From situations are action-oriented; they show changes from an initial state to a final state. These situations are readily modeled by equations because each aspect of the situation has a representation as a number, operation (+ or -), or equal sign (here with the meaning of “becomes,” rather than the more general “equals”).” (p. 8-9, Operations and Algebraic Thinking progressions)
“In Put Together/Take Apart situations, two quantities jointly compose a third quantity (the total), or a quantity can be decomposed into two quantities (the addends). This composition/decomposition may be physical or conceptual. These situations are acted out with objects initially and later children begin to move to conceptual mental actions of shifting between seeing the addends and seeing the total (e.g., seeing children or seeing boys and girls, or seeing red and green apples or all the apples.)” (p. 10, Operations and Algebraic Thinking progressions)
Module 4, Topic G

22. Participant Demonstration Lesson
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
10 minutes
MATERIALS NEEDED:
GK-M4 Selected Lessons Handout
Linking cube 6-sticks (5 of one color, one of another color)
Personal white boards
Participant Demonstration Lesson
Lesson 37: Add or subtract 0 to get the same number and relate to word problems wherein the same quantity that joins a set, separates.
How does working with the number path aid students’ understanding of the additive identity?
How does the number path assist students in understanding that addition and subtraction are inverse operations?
Demonstration and Debrief of Topic H
How does working with the number path aid students’ understanding of the additive identity? (Acting out situations of adding or subtracting 0 on the number path shows students in a concrete way how 0 acts as an additive identity. Adding 0 to any number does not change the original number!)
How does the number path assist students in understanding that addition and subtraction are inverse operations? (They experience in a physical demonstration that moving the same number of spaces forward and backward on the number path will leave them where they began; addition and subtraction are opposites.)
The quotes that follow each lesson are excerpts taken from the Operations and Algebraic Thinking progressions document. These portions of the progressions document pertain to the mathematical concepts each lesson is written from.
“The relationship between addition and subtraction in the Add To/Take From and the Put Together/Take Apart action situations is that of reversibility of actions: an Add To situation undoes a Take From situation and vice versa and a composition (Put Together) undoes a decomposition (Take Apart) and vice versa.” (p. 8, Operations and Algebraic Thinking progressions)
Module 4, Lesson 37

23. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
1 minutes
MATERIALS NEEDED: X
Agenda
Introduction to the Module Lesson Study Administration of Assessments Module Review
So far, we have examined the mathematical concepts, curriculum organization, and mathematical models critical to Module 4. Now let’s examine how we assess student learning.

24. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
8 minutes
MATERIALS NEEDED:
Video Clip: Common Core Video Series: Grade K Module 2 Mathematics – Assessment Example
Module 2 Assessment
Module Assessments
Now that you know the focus of the module, let’s examine how students will be assessed on their mastery of these skills and concepts. In previous sessions, we talked about the value of 1:1 assessments and strategized for their implementation. Today, we are going to evaluate a Kindergartener as he goes through the Module 4 Mid-Module Assessment.
Turn to Topic A in the assessment. How will these questions assess true mathematical understanding?
As you watch the video, fill in the assessment sheet. When the video is over, we will take some time to score the assessment using the rubric.
NOTE TO FACILITATOR: Play video.

25. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
6 minutes
MATERIALS NEEDED:
Module 2 Assessment
Module Assessments
What are your first impressions seeing this video?
How do the questions here assess students’ mathematical understanding?
Allow participants 2 minutes to turn and talk about their observations of the content and implementation of the assessment. Then have participants share their notes on Topic A using the questions below. This is will give you and the participants a common starting point for using the rubric.
Let’s start with the first question: (Questions to be determined on review of the video clip)

26. Module Assessments: Rubrics
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
3 minutes
MATERIALS NEEDED:
Module 2 Assessment
Module Assessments: Rubrics
Read the rubric for Module 4 Topic A.
Where does this student fall on the progression toward mastery?
Now that we have gathered our data, we are ready to score using the rubric. But first, what is the purpose of a rubric?
Possible answers:
To assess the student understanding of the standards
To provide context and language to discuss student work
To plan next steps for future instruction
To grade (This is not the intention of the writers.)
Take the next 2 minutes to score Topic A using the rubric.
NOTE TO FACILITATOR: Allow 2 minutes for participants to work independently.

27. Module Assessments: Reflection
Grade K – Module 4
Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
7 minutes
MATERIALS NEEDED:
Module 2 Assessment
Module Assessments: Reflection
What skills or understanding has the student mastered?
Where do the student’s misunderstandings lie?
What can you do to support this student towards reaching mastery of this concept/standard?
Turn and talk with others at your table about your observations.
Turn and talk with others at your table. Share your scores and ask them to do the same. However, don’t get overly focused on the numeric score. Instead, think about the following questions:
What skills or understanding has the student mastered?
Where do the student’s misunderstandings lie?
What can you do to support this student towards reaching mastery of this concept/standard?
NOTE TO FACILITATOR: Allow 4 minutes for participants to turn and talk about the rubric and the student’s work. Then facilitate a discussion in the remaining 3 minutes.
If participants don’t agree that the student earned a 4, please touch briefly on the following talking points (again, try to help them focus on the student’s mathematical understanding rather than the numerical score):
Question #1 She was able to correctly identify a matching shape and describe why they matched.
Question #2 She was able to choose the 3 triangles despite a difficult distractor.
Question #3 She talked about attributes of the two shapes, number of sides and corners, angle size (pointy), and type of sides. Didn’t discuss closed figures.

28. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
0 minutes
MATERIALS NEEDED: X
Agenda
Introduction to the Module Concept Development Administration of Assessments Module Review

29. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
3 minutes
MATERIALS NEEDED: X
Biggest Takeaway
Turn and Talk:
What questions were answered for you?
What new questions have surfaced?
Take two minutes to turn and talk with others at your table. During this session, what information was particularly helpful and/or insightful? What new questions do you have?
Allow 2 minutes for participants to turn and talk. Bring the group to order and advance to the next slide.

30. Grade K – Module 4 Module Focus Session
February 2014
Network Team Institute
TIME ALLOTTED FOR THIS SLIDE:
2 minutes
MATERIALS NEEDED: X
Key Points
Numbers can be decomposed from wholes into parts in a variety of ways. These decompositions can be represented with concrete, pictorial, or numerical number bonds.
Using number bonds and drawings, story situations can be mathematized and subsequently represented as addition or subtraction equations.
In the context of number bonds, addition and subtraction sentences, students formalize their understanding of part/whole relationships and begin to see the inverse relationship between addition and subtraction.
Let’s review some key points of this session.
Numbers can be decomposed from wholes into parts in a variety of ways. These decompositions can be represented with concrete, pictorial, or numerical number bonds.
Using number bonds and drawings, story situations can be mathematized and subsequently represented as addition or subtraction equations.
In the context of number bonds, addition and subtraction sentences, students formalize their understanding of part/whole relationships and begin to see the inverse relationship between addition and subtraction.