Number talks#

References: QCAA Number talks fact sheet, Math for love

Boaler (2015) identifies this as the "best strategy" she knows for teaching number-sense and math-facts at the same time. Apparently perfect as a lesson starter or for parents at home.

Example problem given is \(18 \times 5\) which, in one application, resulted in six different ways to solve it. Blog post includes video of an individual student being asked \(36 + 9\) and using an interesting approach. An addendum talks about another method where students note that \(36\) is \(4 \times 9\) and so the answer is \(5 \times 9\).

Method#

Teacher poses a problem

Often a mental arithmetic problem, but can include other types (visuals etc.)
Students mentally solve the problem

Indicate they have an answer by holding a thumb - or additional fingers for additional methods - to their chest. To allow others to proceed without time pressure.
Students share their answers

Teacher records all solutions, no comment on correctness.
Students explain their thinking.

Students explain and teacher writes the steps on the board
Discussion and consensus

By the end have multiple methods and a consensus on the correct answer
Followup - if appropriate

Suggestions#

Draw upon and share visual methods. Aim being to open possibilities.

Number talk images 2. Scaffold the introduction of the approach 3. Low floor 4. Be explicit about the protocol

Impacts#

Changes - Students and teachers#

Following tables (adapted from Parker & Humphreys, 2018) summarises what changes for students and teachers during number talks

For students

From	Towards
Remembering	Reasoning
Focusing on the answer	Focusing on how they get their answers
Doing a problem “the teacher’s way”	Doing a problem in a way that makes sense to them
Expecting the teacher to tell them whether their answers are right or wrong	Expecting their teacher to ask them to verify the answers for themselves
Trying to avoid mistakes	Seeing mistakes as opportunities to learn
Seeing confusion as bad	Getting comfortable with cognitive dissonance
Reproducing their teacher’s method and asking the teacher when they get stuck	Listening to their classmates’ methods and asking them questions
Thinking there is one way to solve a problem	Knowing there are many ways to solve problems
Relying on the teacher to direct discourse	Jumping in to share responsibility for discourse

For teachers | FROM | Toward | | ---- | ---- | | Asking questions you already know the answers to | Asking questions you're genuinely curious about | | Focusing on answers | Focusing on reasoning | | Being the "primary explainer" | Letting kids do the thinking | | Listening for a particular response | Listening to students | | Demonstrating how to solve problems | Finding out how students solve problems | | Verifying correct answers | Expecting students to verify their own answers | | Knowing ahead of time where a lesson will go | Responding flexibly to where students' thinking leads | | Being in charge of classroom discourse | Sharing responsibility with students for classroom discourse|

References#

Boaler, J. (2015). Creating Mathematical Mindsets: The Importance of Flexibility with Numbers. In Mathematical Mindsets: Unleashing Students' Potential Through Creative Math, Inspiring Messages and Innovative Teaching (pp. 33--56). John Wiley & Sons, Incorporated.

Humphreys, C., & Parker, R. (2023). Making Number Talks Matter: Developing Mathematical Practices and Deepening Understanding, Grades 3-10 (1^st ed.). Routledge. https://doi.org/10.4324/9781032681573

Parker, R., & Humphreys, C. (2018). Digging Deeper: Making Number Talks Matter Even More, Grades 3-10. Taylor & Francis Group. http://ebookcentral.proquest.com/lib/griffith/detail.action?docID=5584097