Tag Archives: Grace Kelemanik

Embolden Your Inner Mathematician Week 2: Contemplate then Calculate (#CthenC)

For our second session of Embolden Your Inner Mathematician, we focus on Numeracy and Visual Learning: Elicit and use evidence of student thinking.

What is we use powerful tools to elicit student thinking? How might we learn about students to deeply understand them as mathematicians? And then, what actions do we take to ensure mathematical success for all?

This week’s session began with a gallery walk using Amy Lucenta and Grace Kelemanik’s first five Contemplate then Calculate (#CthenC) lessons found on at Fostering Math Practices.

From Ruth Parker and Cathy Humphreys in Making Number Talks Matter:

No matter what grade you teach, even high school, so-called “dot” cards (which may not have dots) are a great way to start your students on the path to mathematical reasoning. We say this because, from experience, we have realized that with dot cards, students only need to describe what they see— and people have many different ways of seeing! Arithmetic problems, on the other hand, tend to be emotionally loaded for many students. Both of us have found that doing several dot talks before we introduce Number Talks (with numbers) helps establish the following norms:

  • There are many ways to see, or do, any problem.

  • Everyone is responsible for communicating his or her thinking clearly so that others can understand.

  • Everyone is responsible for trying to understand other people’s thinking.

To embolden mathematicians and to prepare to elicit and use evidence of student thinking, teaching teams must practice to develop the habits put forth in 5 Practices for Orchestrating Productive Mathematics Discussions.

You can see our teacher-learner-leaders working to deepen their understanding of and commitment to the Making Number Talks Matter: norms, Smith and Stein’s 5 Practices for Orchestrating Productive Mathematics Discussions, and NCTM’s Principles to Actions: Ensuring Mathematical Success for All.

How might we continue to deepen our understanding of NCTM’s teaching practices? What if we team to learn and practice?

From Principles to Actions: Ensuring Mathematical Success for All

Elicit and use evidence of student thinking.
Effective teaching of mathematics uses evidence of student thinking to assess progress toward mathematical understanding and to adjust instruction continually in ways that support and extend learning.

And, from Taking Action: Implementing Effective Mathematics Teaching Practices in K-Grade 5

In ambitious teaching, the teacher engages students in challenging tasks and collaborative inquiry, and then observes and listens as students work so that she or he can provide an appropriate level of support to diverse learners.  The goal is to ensure that each and every student succeeds in doing meaningful, high-quality work, not simply executing procedures with speed and accuracy. (Smith, 4 pag.)

Worth repeating:

The goal is to ensure that each and every student succeeds in doing meaningful, high-quality work, not simply executing procedures with speed and accuracy.

We continue to foster creativity, visual and algebraic representation to strengthen our mathematical flexibility as we learn together.

When mathematics classrooms focus on numbers, status differences between students often emerge, to the detriment of classroom culture and learning, with some students stating that work is “easy” or “hard” or announcing they have “finished” after racing through a worksheet. But when the same content is taught visually, it is our experience that the status differences that so often beleaguer mathematics classrooms, disappear.  – Jo Boaler

#ChangeTheFuture

#EmbraceAmbitiousTeaching

#EmboldenYourInnerMathematician


Seeing as Understanding: The Importance of Visual Mathematics for Our Brain and Learning.” Journal of Applied & Computational Mathematics 05.05 (2016): n. pag. Youcubed. Standford University, 12 May. 2016. Web. 18 Mar. 2017.

Humphreys, Cathy; Parker, Ruth. Making Number Talks Matter (Kindle Locations 339-346). Stenhouse Publishers. Kindle Edition.

Kelemanik, Grace, and Amy Lucent. “Starting the Year with Contemplate Then Calculate.” Fostering Math Practices.

Leinwand, Steve. Principles to Actions: Ensuring Mathematical Success for All. Reston, VA.: National Council of Teachers of Mathematics, 2014. (p. 46) Print.

Smith, Margaret Schwan., et al. Taking Action: Implementing Effective Mathematics Teaching Practices in Grades K-5. The National Council of Teachers of Mathematics, 2017.

Embolden Your Inner Mathematician: Week 2 agenda

Elicit and use evidence of student thinking.

Effective teaching of mathematics uses evidence of student thinking to assess progress toward mathematical understanding and to adjust instruction continually in ways that support and extend learning.
  Principles to Actions: Ensuring Mathematical Success for All

Slide deck

7:15 Establishing Intent, Purpose, Norm Setting

8:00 Continuing Talking Points – Elizabeth Statmore (@chessemonkeysf)

8:15 Number SplatsSteve Wyborney (@SteveWyborney)
8:25 Fraction SplatsSteve Wyborney (@SteveWyborney)
8:45 Planning for Splats

9:00 Closure and Reflection

  • I learned to pay attention to…
  • I learned to ask myself…
  • A new mathematical connection is…
9:15 End of session

Homework:

  • Elicit and use evidence of student thinking using Splats. What will/did you learn?
  • Write to describe you quest for Closest to One using Open Middle worksheet with I can show my work so a reader understands without asking me questions.
  • Deeply Read pp. 207-211 from TAKING ACTION: Implementing Effective Mathematics Teaching Practices in K-Grade 5
    • What the Research says: Elicit and Use Evidence of Student Thinking
    • Promoting Equity by Eliciting and Using Evidence of Student Thinking
  • Read one of the following from TAKING ACTION: Implementing Effective Mathematics Teaching Practices in K-Grade 5
    • pp.183-188 Make a Ten
    • pp.189-195 The Odd and Even Task
    • pp. 198-207 The Pencil Task

 


Kelemanik, Grace, and Amy Lucent. “Starting the Year with Contemplate Then Calculate.” Fostering Math Practices.

Kaplinsky, Robert, and Peter Morris. “Closest to One.” Open Middle.

Leinwand, Steve. Principles to Actions: Ensuring Mathematical Success for All. Reston, VA.: National Council of Teachers of Mathematics, 2014. (p. 46) Print.

Smith, Margaret Schwan., et al. Taking Action: Implementing Effective Mathematics Teaching Practices in Grades K-5. The National Council of Teachers of Mathematics, 2017.

Statmore, Elizabeth. “Cheesemonkey Wonders.” #TMC14 GWWG: Talking Points Activity – Cultivating Exploratory Talk through a Growth Mindset Activity, 1 Jan. 1970.

Wyborney, Steve. “The Fraction Splat! Series.” Steve Wyborney’s Blog: I’m on a Learning Mission., 26 Mar. 2017.

#NCSM17 #Sketchnotes Tuesday Summary

I’m attending the  National Council of Supervisors of Mathematics  2017 conference in San Antonio.  Here are my notes from Tuesday along with the session descriptions from the presenters.

Tracking, Equity, and the Many Paradoxes of Algebra II
Jason Zimba

What is Algebra II good for? For whom is it good? Phil Daro raised these and other questions for the Carnegie-Institute for Advanced Study Commission. Fast forward to now, and the debate about ‘what mathematics and why’ has found its way into the pages of the popular press. Is there anything district leaders can learn from this conversation? How might a district leader who prizes equity think about the question of tracking in school mathematics?

Routines for Reasoning:
Ensuring All Students
Are Mathematical Thinkers
Amy Lucenta, Grace Kelemanik

Instructional routines embody research-based best practices for struggling learners, especially when they focus on the Standards for Mathematical Practice and include ‘baked in’ supports
for special populations. Participants will explore a universally designed instructional routine, Connecting Representations, and learn how to leverage it to develop teachers’ capacity to ensure development of ALL students’ mathematical practices.

Letting Go: Cultivating Agency and Authority Through Number Talks in the Secondary Mathematics Classroom
Cathy Humphreys

In this session I share my dissertation study of two high school teachers as they learned to enact Number Talks. I wanted to know what the teachers found most challenging and how coaching supported their learning. In examining the videos of classroom lessons, I noticed marked differences in how agency and authority emerged in the two classes. I hope what I learned while searching for “Why?” will be useful for teachers and coaches alike.

Winning the Game in Mathematics Leadership
Matt Owens

Mathematics leadership is multifaceted in nature as we strive to intentionally impact students and educators in classrooms nationwide. Leadership pathways can be different from leader to leader, but ultimately curriculum/ content, instruction, activism, and assessment (CIAA) are all areas of evaluation for “PRIME” leaders in mathematics education. Discover the top seven practical strategies for overcoming the struggles that may arise in your role as a mathematics leader within your school/university, district, state, and national professional learning communities, while building the capacity of teachers’ leadership among mathematics educators in these respective communities.

Approaching Ten Tough Mathematical Ideas
for High School Students
Salmon Usiskin

The main purpose of this talk is to provide insights into mathematical content that many mathematics teachers may not have seen. By covering a broad range of content, from aspects of manipulative algebra through proof in geometry and in general, discussing language, applications, and representations, my remarks are designed for leaders to help in decisions they make in the professional development of their teachers.