PCMI 3 aspect – For your mathematics – For your teaching – For your community Reflecting on Practice Park City Mathematics Institute1.

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Presentation transcript:

PCMI 3 aspect – For your mathematics – For your teaching – For your community Reflecting on Practice Park City Mathematics Institute1

Session 1 What makes a worthwhile task? Reflecting on Practice: Worthwhile Tasks Reflecting on PracticePark City Mathematics Institute2

What do you predict will happen to the area if you “ slant ” the quadrilateral?

Bringing it all together A sixth grade class studying area of polygons in the fall As you watch the video, consider : What about the nature of the task promoted or inhibited discussion?

Exponents The teacher’s goal was that students should know and be able to apply the laws of exponents. The video of this task being implemented is from the TIMSS 1999 video study and takes place in an eighth grade algebra classroom in the US. The tasks in which students are engaged are on the worksheet. Reflecting on PracticePark City Mathematics Institute5

Exponents An eighth grade class beginning the study of the exponent rules As you watch the video, consider : What about the nature of the task promoted or inhibited discussion?

Reflecting on PracticePark City Mathematics Institute7

Exponents Reflecting on PracticePark City Mathematics Institute8

At your tables, go around the table round robin with each person offering a thought about difference in the nature of the two tasks with respect to how they promoted or inhibited discussion Without discussion, continue around the table round robin until no one has new ideas to offer. Then open the table to general thoughts. Choose one person at your table to record the ideas as you go. Reflecting on PracticePark City Mathematics Institute9

Tasks have to be justified in terms of the learning aims they serve and can work well only if opportunities for pupils to communicate their evolving understanding are built into the planning. (Black & Wiliam, 1998)

Mathematics Teaching Practices: Effective teachers 1.Establish mathematics goals to focus learning. 2.Implement tasks that promote reasoning and problem solving. 3.Use and connect mathematical representations. 4.Facilitate meaningful mathematical discourse. 5.Pose purposeful questions. 6.Build procedural fluency from conceptual understanding. 7.Support productive struggle in learning math. 8.Elicit and use evidence of student thinking. (NCTM, 2014)

What do we mean when we say a “meaningful mathematical discourse”? Lets stop a minute and reflect on why discussions are important. Reflecting on PracticePark City Mathematics Institute12

A Quadrilateral Move vertices R and S to create a quadrilateral whose diagonals are perpendicular to each other. Related to CCSS Grade 8 Geometry

Student work With your partner discuss what students might notice and wonder about when looking at these solutions. What mathematical ideas might emerge? Reflecting on PracticePark City Mathematics Institute14

A spaghetti container has a hexagonal base. Which shape will hold the same amount of spaghetti as the original container and be the most economical? MDE, 2004

Which shape will hold the same amount of spaghetti and be the most economical? Area of base Surface area Volume Ratio of surface area to volume Cylinder Rectangular prism Shape 3 MDE, 2004

In your table Another important consideration in a worthwhile task is the level of thinking and reasoning required of students, the cognitive demand. What is different about the nature of this task with respect to cognitive demand than the perpendicular diagonals task? Reflecting on PracticePark City Mathematics Institute18

How did the nature of the tasks we looked at today engage students in reasoning & sense making? Reflecting on PracticePark City Mathematics Institute19

Discussions are important because they surface student thinking, which should inform our next steps as teachers – not to “set them straight” but to work together to negotiate mathematical understanding. Reflecting on PracticePark City Mathematics Institute20

NCTM Research Brief on Productive Discussion Available online Reflecting on PracticePark City Mathematics Institute21

Reference Black, P. & Wiliam, D. (1998). “Inside the Black Box: Raising Standards Through Classroom Assessment”. Phi Delta Kappan. Oct. pp Bringing It All Together (2012). Video clip from T-Cubed Common Core State Standards Professional Development Workshop. Brennan, B., Olson J. & the Janus Group. Curriculum Research & Development Group. University of Hawaii at Manoa, Honolulu HI (2009). Cirillo, M. (2013). What Are Some Strategies for Facilitating Productive Classroom Discussions? NCTM Research Brief. S, DeLeeuw, Series Editor, Reston VA: National Council of Teachers of Mathematics. Reflecting on PracticePark City Mathematics Institute22

References National Council of Teachers of Mathematics. (2015). Principles to Action. Reston VA: The Council National Council of Teachers of Mathematics. (2015). Principles to Action. Reston VA: The Council Timss video series US2 Exponents United%20States Reflecting on PracticePark City Mathematics Institute23