1 / 46

Lessons Learned from a Lesson Study Approach to High School Mathematics

Lessons Learned from a Lesson Study Approach to High School Mathematics. Signature Pedagogies Unpack/Repack Process Deep Pedagogical Content Knowledge. Presentation Outline. Overview of lesson study project Introduction, with examples, of: Signature pedagogies Unpack/Repack process

hector
Download Presentation

Lessons Learned from a Lesson Study Approach to High School Mathematics

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Lessons Learned from aLesson Study Approach toHigh School Mathematics Signature Pedagogies Unpack/Repack Process Deep Pedagogical Content Knowledge

  2. Presentation Outline • Overview of lesson study project • Introduction, with examples, of: • Signature pedagogies • Unpack/Repack process • Deep Pedagogical Content Knowledge

  3. ImportantMathematicsandPowerfulPedagogy

  4. IMAPP ProjectImportant Mathematicsand Powerful Pedagogy • Iowa high school mathematics lesson study project • Math Science Partnership Program Grant • Iowa Board of Regents and Iowa Department of Education • University of Iowa, Maharishi University of Management, Great Prairie AEA, Local School Districts

  5. Project Vision …

  6. Project Overview • “Important Mathematics” June Professional Development Institute • “Powerful Pedagogy” July Professional Development Institute • Teaching and Learning Mathematics in the Classroom – Lesson Study Approach Academic Year

  7. IMAPP Lesson Study Model • Plan – Unpack/Repack • Teach – Signature Pedagogies • Observe – Intentional yet Flexible • Debrief – Math, Teaching, Learning • Revise – Refocus on Deep Understanding of Important Mathematics

  8. Planning the Lesson • Unpack/Repack (see later) • For topic taught, consider: • What is it?(deep conceptual knowledge) • How do you do it, operate with it/on it?(deep procedural knowledge) • What’s it good for?(apply) • What’s it connected to?(connected and coherent)

  9. Planning the Lesson (cont.) • Focus Question • Misconceptions, trouble spots • Pivotal points • Questions that probe and deepen student understanding • Opportunites for critical reflection • Summarize

  10. Teaching the Lesson • Signature Pedagogies (see later) • Formative Assessment – re: Dylan Wiliam: “formative instruction”

  11. Observation Guidelines • Intentional (not random, not transcript) • Math, teaching, learning (separately or all together) • What I saw; What I heard • Time stamps (partly so you can reference the video later) • Could do assigned observing: • Questioning • What’s happening on problem x • Technology use • Group work • Teaching strategies • Stationary or roving • Follow one student, one group • Take a few minutes to reflect on your observation notes, decide what you observed that was most relevant, important, salient • Take notes flexibly, as most helpful to you • Goal: Get observation data to help deepen knowledge of math, teaching, learning; and create a more effective lesson

  12. Debrief the Lesson:Math, Teaching, Learning • Observer notes • Discussion • Commentary • Based on what I saw, what I heard

  13. Some Revision Guidelines • Sharpen the focus on targeted, student-learning-appropriate, important mathematics • Design instruction to ensure students engage in critical reflection • Revise based on student understanding/learning – examine data from observation and debrief (see checklist) • Good questions, good questions, good questions • Design and maintain connected and coherent richness • Design and maintain high level of cognitive demand

  14. IMAPP Lesson Study Model •  Plan – Unpack/Repack •  Teach – Signature Pedagogies •  Observe – Intentional yet Flexible •  Debrief – Math, Teaching, Learning •  Revise – Refocus on Deep Understanding of Important Mathematics

  15. Academic Year Activities and Data • Checklist …

  16. SignaturePedagogies

  17. Signature Pedagogies • Potent teaching approaches that warrant common application • Global to local • Phrase borrowed and idea adapted from Shulman (2005)

  18. Shulman – Signature Pedagogies • In the professions of law, medicine, engineering, the clergy, with implications for teacher education • NRC workshop, Feb 2005 (MSP resource) • A characteristic: Habitual, Routine • Rules of engagement always the same • Compare to: Must have variety in teaching • Not boring, novelty comes from applying to different subject matter, not from changing the pedagogy

  19. Signature Pedagogies:Global Examples • Investigative approach (e.g., Baroody 2003) • Teaching through problem solving(e.g., Schoen 2003, Kilpatrick 2001, Grouws 2000) • Teaching focused on reasoning and sense making (e.g., NCTM 2009, Focus in High School Math: Reasoning and Sense Making)

  20. Signature Pedagogies:More Global Examples • Questioning(e.g., Redfield and Rousseau 1981) • Multiple, connected representations(e.g., NCTM 2000) • Connected and coherent(e.g., NCTM 2000) • In context (e.g., RME, Freudenthal Institute)

  21. Signature Pedagogies:Strand Examples • Algebra • Functions approach to teaching algebra • Geometry • Conjecturing approach to teaching geometry(re: Polya: “First believe it, then prove it.”) • Statistics and Probability • Focus on the big idea of variability • Simulation • Real data

  22. Signature Pedagogies:Topic Examples • Functions • Include a recursive view of functions • Recursion • Include use of pedagogically powerful informal notation, like NEXT and NOW • Vertex-Edge Graphs • Discrete mathematical modeling

  23. Signature Pedagogies • Potent teaching approaches that warrant common application • Global to local

  24. Unpack/RepackProcess

  25. Planning the Lesson • Unpack the Math What is the connected and coherent web of mathematical knowledge that comprises and surrounds this topic? • Unpack Teaching and Learning What theory and practice related to teaching and learning are germane to this topic? • Repack into an Effective Lesson How will you take everything you have unpacked, and repack into a lesson that will help students achieve deep understanding of important mathematics? See: Unpack/Repack Diagram, Unpack/Repack Organizer …

  26. Unpack/Repack Organizer See attached …

  27. Example – unpack • Fractions lesson • IMAPP teacher team, last week … • For more, go to their ICTM presentation

  28. Deep PedagogicalContent Knowledge

  29. Some current related work … • PCK – Shulman (again) 1986 • Framework for content knowledge and pedagogical content knowledge – Ball, Thames, and Phelps 2008 • Measuring Teachers’ Mathematical Knowledge – Heritage and Vendlinski 2006 • Effects of Teachers’ Mathematical Content Knowledge for Teaching on Student Achievement – Hill, Rowan, Ball 2005 • Mathematics for Teaching – Stylianides and Stylianides 2010 • High school level, Counting – Gilbert and Coomes 2010 • re: conceptual and procedural knowledge (e.g., Lesh 1990?) and deep (e.g., Star 2006)

  30. Some Components of Deep Pedagogical Content Knowledge Understand, with strategies for addressing: • Misconceptions • Student Content Difficulties • Learning Progressions • Task Choice and Design • High School Mathematics from an Advanced Perspective • Questioning • Pedagogical Mathematical Language

  31. Misconceptions • Anticipate • Identify • Resolve Example: • Modeling circular motion with trig – doubling the angle will double the height?

  32. Student Content Difficulties • Anticipate • Identify • Resolve Example: • Counting – The issue of “order” implicit in the Multiplication Principle of Counting (sequence of tasks) versus the issue of order in permutations (choosing from a collection: AB counted as a different possibility than BA) (also see: Gilbert and Coomes 2010)

  33. Task Choice and Design • Focus and depth (targeted important mathematics) • Sequence • Questioning • Scaffolding (“goldilocks”, ZPD) • Pivotal Points (identify, facilitate) Examples: • Recursion lesson begins with “pay it forward” (exp, hom) or “handshake problem” (quad, non-hom)? • Slope of perpendicular lines – pattern in data and/or nature of a 90° rotation

  34. Learning Progressions • Develop • Analyze • Implement Examples: • Trigonometry, K-12 (large grain), 6-12 (with details) • (Note NCTM discrete mathematics K-12 learning progressions for Counting, Recursion, Vertex-Edge Graphs)

  35. School Mathematics from an Advanced Perspective • Direct connections • Inform HS curriculum and instruction (perhaps indirectly) Examples: • Linear – HS algebra vs. linear algebra (e.g., KAT, MSU 2003, used in IMAPP) • Factoring – Factor Theorem, Fund. Thm. of Alg., prime versus irreducible • Independence in probability – trials, outcomes, events, random variables

  36. Questioning • General questions and taxonomies of questions are helpful • Content-specific questions are crucial (e.g., Zweng 1980, Hart 1990, Ball 2009) • Provide effective instruction, formative assessment, differentiation Example: • HS teacher: “This table [showing y = 2x] shows constant rate of change.” Questions: What is the constant? [2] How is the change constant? [It goes up by 2 at each step.] How does it go up, by what operation? [multiply by 2] How is “rate of change” defined? [change in y over change in x] And how is the “change in y” computed, what operation? [oh, subtraction, right, so I guess it isn’t constant rate of change] How about this table for y = 2x. The y’s are going up by 2. Is this constant rate of change? [yeah, it goes up by adding 2 each time] So subtraction? [yeah] How does this relate to the features of arithmetic and geometric sequences? … [constant difference versus constant ratio]

  37. Pedagogical Mathematical Language • Mathematically accurate • Pedagogically powerful (e.g., bridging, meaning-laden) • Benefits and limitations Example: NEXT/NOW for recursion • Captures essence of recursion used to describe processes of sequential change • Helps make idea accessible to all students • Promotes “semantic learning” as opposed to just “syntactic learning” (a danger when going too fast to subscript notation) • Limitations – very useful for linear and exponential, less for quadratic (hom versus non-hom)

  38. Some Components of Deep Pedagogical Content Knowledge Understand, with strategies for addressing: • Misconceptions • Student Content Difficulties • Learning Progressions • Task Choice and Design • High School Mathematics from an Advanced Perspective • Questioning • Pedagogical Mathematical Language

  39. Lessons Learned from aLesson Study Approach toHigh School Mathematics Signature Pedagogies Unpack/Repack Process Deep Pedagogical Content Knowledge

  40. Sharpen the focus on central mathematical ideas • Make it explicit for teacher and student (mathematical residue) • Make this the focus for the launch, explore, summarize, homework, and assessment • Focus question(s)

  41. Critical Reflection • Key to learning, where learning really happens • Can be developed as a student skill, habit, practice • Japanese PS model • Understand the problem • Solve the problem (engage in solving) • Critical reflection • Summarize • Critical reflection woven throughout PS, launch, explore, summarize

  42. Maintain connected & coherent • Locally (in individual lessons) and globally (in sets of lessons, units, courses, curricula) • How? Levels of implementation: • Mention connections, prior and future (within strand, across strands, across disciplines, to world outside the classroom, etc.) • Include tasks, problems, questions in the lesson that focus on connecting • Organizational strategy for unit, course, curriculum

  43. Maintain cognitive complexity • Stein, et al., QUASAR, 2000 • Problem-Based Instructional Tasks (ESC) • Authentic Intellectual Work • Rigor and Relevance • Bloom

More Related