Connecting Arithmetic to Algebra

Connecting Arithmetic to Algebra An On-line Course for Teachers Virginia Bastable Deborah Schifter TDG 2011 Susan Jo Russell

Foundations of Algebra project A collaboration of the Education Research Collaborative at TERC, the Education Development Center (EDC), and SummerMath for Teachers (Mt. Holyoke College), and 25 teachers Funded in part by the National Science Foundation 5-year project

Connecting Arithmetic and Algebra Today’s Session • Goals and structure of the on-line course • What do CAA participants do? • What do CAA course facilitators do? • What are we learning from this experience?

Integrating algebraic thinking into arithmetic instruction involves: • Investigating, describing, and justifying general claims about how an operation behaves • A shift in focus from solving individual problems to looking for regularities and patterns across problems • Representations of the operations as the basis for proof • The operations themselves become objects of study

What do teachers need to learn? • the mathematics content • how to recognize opportunities • instructional strategies • how a range of students can engage with this content

Key Structures of CAA • A year-long course in three 6-week parts • Every participant is part of a local team; each section includes approximately 20 participants • Assignments are posted on a course web board; participants respond to one another’s postings • Each 6-week part includes two 2-hour webinars to allow for “live” discussions and interactions • Each 6-week part includes 3 Student Thinking assignments; participants receive personal responses from facilitators on these.

Part One 1. Generalizing in arithmetic--noticing 2. Generalizing in arithmetic, getting started 3. Generalizing in Arithmetic with the range of learners 4. Articulating general claims Part Two 5. Developing Mathematical Arguments Part I 6. Focus on the Range of Learners 7. Learning Algebraic notation CAA Book Chapters and Course Sections Part Three 8. Developing Mathematical Arguments Part II 9. Looking ahead to middle grades 10. Building across the school year

What participants do: • Read and respond to each chapter of the course text • Respond to each other on the web board • Do math activities with their team • Carry out lessons with their class and write about them (“student thinking assignments”) • Participate in 6 2-hour webinars

Focus Questions Reading One • Identify passages that help you make connections to your own students. • Identify passages that illustrate a specific question or action of the teacher that interests you. What was the impact of this teacher move on the students’ thinking?

What facilitators do: • Read and take notes on web board responses • Adapt webinar plans to react to participants’ postings • Co-teach the webinars • Respond to participants’ student thinking assignments individually

Focus Questions Reading Two • What do you learn about the participants by reading their responses? • What ideas might you want to bring out at the next webinar as a result?

Is this number sentence true? 35 + 19 = 34 + 20 Explain how you know it is true or not without calculating

Is this number sentence true? 35 - 19 = 34 - 20

What general claim is suggested by this set of equations? 6 x 8 = 12 x 4 150 x 64 = 300 x 32 35 x 8 = 70 x 4 Develop at least two representations (story situations, diagrams, etc.) to illustrate this claim. Can you use your representations to talk about the claim without referring to specific numbers.

Analyzing Web board Math Responses • Read the two responses to this assignment • (Reading Three) • What do you learn about the math understandings • of the participants? • What else do you want them to learn? • .

Examples of student arguments to justify this claim 1. What does each argument show that the student understands about proving the general claim? 2. What more would the student need to do to move towards proving this claim?

Student argument #1 I figured out that 2 times 6 equals 4 times 3, and also 8 times 10 equals 4 times 20. So it works.

Argument #2. I did a story context. I have 2 stacks of books, and each one has 6 books. That’s 12 books. Then I have 4 stacks of books, and each one only has 3 books. That’s 12, too. So they’re the same. Argument #3. I have 2 stacks of books, and each one has 6 books. But the stacks were too heavy to carry, so I put each stack in half. Now there are 4 stacks and each has 3 books. So when I doubled the number of stacks, there was only half of the books in a stack than there was before. Student arguments #2 and #3

See this is a 2 by 6, and this is a 4 by 3, and they both have 12. I cut the 2 by 6 in half, and I put one piece underneath. It’s half across the top, but now it’s twice as long. It’s all the same stuff I started with, like if this was a carpet and I cut it and moved it around. Student arguments #4 and #5 Argument #4: Argument #5:

Representation-based proof • The meaning of the operation(s) involved in the claim is represented in diagrams, manipulatives, or story contexts. • The representation can accommodate a class of instances (for example, all whole numbers). • The conclusion of the claim follows from the structure of the representation; that is, the representation shows why the statement must be true.

Would any of these arguments hold if the numbers under consideration were not whole?

What participants do: • Read and respond to each chapter of the course text • Respond to each other on the web board • Do math activities with their team • Carry out lessons with their class and write about them (“student thinking assignments”) • Participate in 6 2-hour webinars

What facilitators do: • Read and take notes on web board responses • Adapt webinar plans to react to participants’ postings • Teach the webinars • Respond to participants’ student thinking assignments individually

Early algebra Notice a regularity about an operation Articulate the generalization Prove why the claim is true

What we are finding Elementary grade students are interested in examining generalizations about the behavior of the operations. Such discussions engage a range of students and support the development of computational fluency. Visual representations and story contexts provide a mechanism for proof accessible to elementary grade students.

Implications Elementary school: Studying the behavior of the operations supports the development of computational fluency. Middle school: “The kids who have the deepest trouble with middle school math are those without a clear and rich set of models for what multiplication is and how it is different from addition.”

Summary • On-line/off line • Asynchronous/synchronous interaction • Individual/team/webinar groupings • Responses from individuals/teams/facilitators • Alternate course work focused on their own math and implementation with students

What’s happened so far • Participants are actively engaged in the mathematics content (in teams, on web board) • Tape recording and analyzing class sessions is powerful (student thinking assignments) • A focus on general claims is being integrated into instruction • Students are engaged in significant mathematical thinking

Data we’re collecting: • Teacher assessments • Teacher evaluations • Student assessments

To receive information regarding CAA options for 2011-2012 school year: • email vbastabl@mtholyoke.edu • Include CAAFall11 in the subject line

Working on math in teams Adding 1 to a factor in a multiplication expression “I found that after writing the story and drawing the boxes of erasers, how helpful the story context could be for some of my students. The story context may make the statement easier to relate to for the children that struggle with relating to numbers.”

Working on math in teams Adding 1 to a factor in a multiplication expression “Each time we solve a problem or examine a statement as a group, I am amazed at the different ways we all think about the problem. I always solve the problem and think about it before meeting with our group and then I always walk away with a new way of thinking about solving or representing the problem. It reminds me how important it is to have my students share their different strategies with their peers.”

Working on math in teams Adding 1 to a factor in a multiplication expression General claim #1: If you add n to factor b in a multiplication expression a x b, you add a x n to the result. I have 3 baskets with 4 apples in each basket. If I add an apple to each basket I added 3 more apples, one for each basket. General claim #2: If you add n to factor a in a multiplication expression a x b, you add b x n to the result. I have 3 baskets with 4 apples in each basket. If I fill another basket with the same number of apples, I have added 4 more apples.

Working on math in teams Adding 1 to a factor in a multiplication expression “What was so interesting was that my partner changed the first factor in the expression and I changed the second factor in the expression. This is how we discovered that we needed to have two general claims that could explain both situations.”

Grade 1 Is this number sentence true? 3 + 7 = 7 + 3

Grade 1 Are these the same amount? 3 + 7 7 + 3

Grade 1 My class and I continue to become more and more comfortable with asking “why”, using models to represent ideas, and pushing for articulation. These are connected processes that are hard to look at separately. It is helpful to analyze transcripts of classroom conversation to practice understanding students’ ideas and how to respond to them. . . .

Grade 1 As we move forward with the version of this routine, “Are These the Same Amount?”, I will be interested in hearing more about what it sounds like for first graders to articulate generalizations and what it sounds like if and when teachers press them to leave the specific numbers behind. Perhaps we can also revisit “Is this Number Sentence True?” and check for development in students’ ideas about the meaning of the equal sign.

Grade 3 6 x 2 = 3 x 4

6 x 2 = 3 x 4 Thad: I have 6 apples and my mom gave me 2 more. My sister had 3 apples and my mom gave her 4 more. We have the same amount of apples. Teacher: So, Thad, I have 6 apples and I got 2 more, how many do I have? Thad: 8 Teacher: And if sister has 3 and gets 4 more how many does she have? Thad: 7. Oh I didn’t do it right. I was adding.

6 x 2 = 3 x 4 Teacher: And where is this story problem showing that doubling or halving that we really wanted to model? Thad: It doesn’t. Teacher: So let’s see if we can change your story to show both multiplication and the doubling and halving. We can start with the same 6 apples. But how can we show 6 x 2? Martin (Thad’s partner who is listening in): Each apple has two worms!

6 x 2 = 3 x 4 I have 6 apples with 2 worms in each apple. If my sister only has 3 apples and the worms crawl over to her apples, they will have to double up, so there will be 4 worms in each apple.

The teacher reflects: I walked away from this class session knowing so much about what my students were thinking. I saw a common mistake when writing story problems for multiplication as Thad wrote an addition problem. I think this could be a great story to return to later when I want to compare the behavior of addition and multiplication.

Grade 4 Write a word problem, draw a picture, or another kind of representation to convince or prove to another class of fourth graders that 237 + 195 = 232 + 200

Prove that 237 + 195 = 232 + 200 Two cookie jars 237 cookies 195 cookies

Prove that 237 + 195 = 232 + 200 move 5 cookies 237 cookies 195 cookies 232 200

Connecting Arithmetic to Algebra