understanding diversity of knowing and learning mathematics – mathematics for all students
DESCRIPTION
- Exploring Representations of Addition and Subtraction – Concepts, Algorithms, and Mental Math (Integers, Fractions/Rational Numbers) - Exploring Algebraic Reasoning through Arithmetic, Geometry, and Data Management using manipulatives and graphing calculators - PowerPoint PPT PresentationTRANSCRIPT
Understanding Diversity of Knowing and Learning
Mathematics – Mathematics for All Students
- Exploring Representations of Addition and Subtraction – Concepts, Algorithms, and Mental Math (Integers, Fractions/Rational Numbers)- Exploring Algebraic Reasoning through Arithmetic, Geometry, and Data Management using manipulatives and graphing calculators - Making Sense of Student’s Differentiated Responses to Solving Problems within Inclusive Settings- Collection of Data for Teacher-Based Teacher Inquiry (solving the lesson problem and analysing the design of the lesson)Understanding and implementing Ministry of Education curriculum expectations and Ministry of Education and district school board policies and guidelines related to the adolescent Understanding how to use, accommodate and modify expectations, strategies and assessment practices based on the developmental or special needs of the adolescent
ABQ Intermediate Mathematics Fall 2009SESSION 8 – Nov 4, 2009
Preparation for Wednesday Nov 4, 2009
Treats – Donovan and BrendaReminder - Gathering math topic articles for teacher inquiry
Read and Record for Nov 4 (Point form / chart or table)See sample next pagea. Describe 2 characteristics of each theory: behaviourism,
constructivism, and complexity theory. b. Infer how these theories can be used to analyze a
mathematics teaching/learning experience. Behaviourism and Constructivism:- Funderstandings. Behaviourism, Constructivism (Piaget, Vygotsky)- Clements, D. & Battista, M. (1990). Constructivist learning and teaching.
Arithmetic Teacher, 38(1), 34-35 Complexity Theory- Davis, B. (2005). Teacher as “consciousness of the collective’. Complicity: An
International Journal of Complexity and Education, 2, pp. 85-88. - Davis, B. (2003). Understanding learning systems: Mathematics education and
complexity science. Journal for Research in Mathematics Education (34)2, pp. 137-167
AssignmentsOct 28 - Technology
Webquest Nov 4 - Math Task 2Nov 7 - Annotated
BibliographyNov 18 - Learning
Theories paper
Teacher Inquiry - Annotated Bibliography
• 6 articles (one person), 8 articles (two people or more)
• 1st paragraph - describe key math idea
• 2nd paragraph explains how you are using the key idea to to design your lesson
Due Sat Nov 7, 2009
Analytic journalsTI planMath Task 1Math Task 2Learning Theories paper Annotated Bibliography
TI Oral/Visual• One bansho plan for one of the 2 lessons (only 2 lessons, not 3)• Two lesson – 2 different lesson problems• Display bansho of original student work on the whiteboard (if in groups, put in
grade level order to see development) – take digital pictures of blackboard and student work for ppt, but bring originals (put before, during, after on chart paper)
• Organization of the solutions is mathematical (to see how the idea you are teaching develops) NOTE difference (NOT across grades – that was only for math task 1 and 2 to get you see development)
• Focus for 35 minute OV Presentation - Rationale (what did you want to find out); description the 3 part lesson; have us do the problem and discuss solutions; analyze student solutions through your whiteboard bansho (math task type – lesson problem), description of math that student learned (practise solutions – evidence of learning from lesson); conclusions
• Paper is due either Dec 2 or (last class) or Dec 5 (delivered to MLK’s 45B Benlamond Ave #3 Toronto ON M4E 1Y8) – SUMMATIVE ASSESSMENT
Teacher Inquiry Topics1. Sarjeet – Gr7 – Addition and Subtraction of fractions2. Christina – Gr7 – Area of trapezoid3. Joe – Gr7 – Patterning and using a table to represent a sequence 4. Donovan – Gr7 – Dividing Fractions5. Brian – Gr8 – Geometry ??6. Maria – Gr9Applied – Collecting and organizing data using charts,
tables, and graphs7. Elina and Marijana – Gr9 Basic – Area and perimeter8. Spencer – Gr9 – Area composite shapes9. Yudhbir – Gr7 – Area of composite shapes10. Jim – Gr9 Applied – Adding and Subtracting Integers11. Brenda – Gr 8 – Using Algebraic Expressions to describe pattern12. Michelle – Gr 8 – Multiplying and Dividing fractions
RED Oct 21GREEN Oct 28BLUE Nov 4
Topic Discussions - Schedule & Readings
Oct 14 - Adolescent Learning, (BLUE)Oct 28 - Maslow’s Hierarchy of Needs
and Communities of Practice, Behaviourism and Constructivism, Vygotsky and Piaget (Green)
Nov 4 - Complexity theory (Yellow)Nov 7 – Comparisons of learning
theories
Adolescent Learning• Jensen, E. (1998). How Julie’s Brain Learns. Educational
Leadership, 56(3), pp. 1-4. • Knowles, T., and Brown, D. (2000). What every middle school
teacher should know. Portsmouth, NH: Heinemann.• Reinhart. S. (2000). Never say anything a kid can say.
Mathematics Teaching in the Middle School. Pp 478-483. • Stahl, R. (1994). Using think-time and wait-time skilfully in the
Classroom. ERIC Clearinghouse of Social Studies/Social science Education, Bloomington, IN.
Behaviourism,Communities of Practice - Funderstandings, WengerMaslow’s Hierarchy of Needs – FunderstandingsVygotsky and PiagetConstructivism• Clements, D. & Battista, M. (1990). Constructivist learning
and teaching. Arithmetic Teacher, 38(1), 34-35
Complexity Theory• Davis, B. (2005). Emergent Insights Into Mathematical
Intelligence from Cognitive Science. Delta-K, 42(2), pp. 10-19. • Davis, B. (2005). Teacher as “consciousness of the
collective’. Complicity: An International Journal of Complexity and Education, 2, pp. 85-88.
• Davis, B. (2003). Understanding learning systems: Mathematics education and complexity science. Journal for Research in Mathematics Education (34)2, pp. 137-167.
Topic Discussion Process•30 minutes (usually start here)•1 facilitator per 3 or 4 colleagues (one from each of the other groups)•Preparation (by all) - do the readings, viewing of webcast, website search •Facilitator - develops some thought provoking questions or a task to stimulate discussion of the topic, making reference to preparation•Colleagues - participate in task to be prepared to share learning with group members in record learning in journal
Complexity Theory – discussion 1
Compare your solutions. How are they similar? How are they different?
There are 36 children on school bus.There are 8 more boys than girls.How many boys? How many girls?
a) Solve this problem in 2 different ways. b) Show your work. Use a number line, square grid, picture,
graphic representation, table of values, algebraic expression
c) Explain your solutions. 1st numeric; 2nd algebraic
Bus Problem
Math Task 2 - Bus Problem 1 Design an Before (activation) task for your TI grade level (Before
problem) - activate students’ knowledge and experience related to the task and show 2 different responses
2. Develop curriculum expectations knowledge package –overall, and specific for grades 6 to 10
3. 4 solutions (grade 7, 8, 9, and 10) to the problem (precise and clear in your mathematical communication)
4. Bansho plan (labels at the bottom, categories of solutions, mathematical annotations, and mathematical relationships between solutions) with your anticipated solutions to the problem
5. Design an After (Practice) problem for students (grade level of TI) to practise their learning and provide 2 different responses
Sample Bansho Plan
11” 11”
8-1/2”
8-1/2”
AFTERHighlights/Summary-3 or sokey ideas from theDiscussionFor TI grade
AFTERPractice-Problem-2 solutions- focused on TI grade
KnowledgePackageGr 7 to 10-codes anddescription-lessonlearninggoals in recthighlighted
MathVocabularylist
BEFOREActivation-Task orProblem-2 solutionsRelevant to TI grade
DURING-Lesson (bus) Problem-What informationwill WE useto solvethe problem? List info
AFTER Consolidation
Gr7 Gr8 Gr9 Gr10
4 different solutions exemplifyingmathematics from specific grades
labels for each solution that capture the mathematical approach
-Math annotations on and aroundthe solutions (words, mathematical details to make explicit the mathematics in the solutions-Mathematical relationship betweenthe solutions
Lesson Analysis Using Learning Theories1. Intro statement identifying the focus of the
paper2. Description of the lesson flow in your MAIN
lesson3. Lesson Analysis (At least 4 examples)a) Aspect of lesson that does align with a learning
theory principle (summary statement)b) Detail of the lesson aspects explained in relation to
learning theory principles (APA referenced)c) Aspect of lesson that does not align with a learning
theory principle (summary statement)d) Detail lesson aspects explained not aligned to
learning theory in relation learning theory principles (APA referenced)
a) Suggestions for Improving Lesson - using learning theory principle (APA referenced)
5. Conclusion
• Adolescent Learning theory
• Behaviourism • Communities of
Practice• Complexity
Theory• Constructivism• Maslow’s
Hierarchy of Needs
What Can We Learn From TIMSS?Problem-Solving Lesson Design
BEFORE • Activating prior knowledge; discussing previous days’
methods to solve a current day problemDURING • Presenting and understanding the lesson problem • Students working individually or in groups to solve a
problem• Students discussing solution methodsAFTER • Teacher coordinating discussion of the methods (accuracy,
efficiency, generalizability)• teacher highlighting and summarizing key points• Individual student practice (Stigler & Hiebert, 1999)
Criteria for a Problem Solving Lesson• Content Elaboration- developed concepts through teacher and student
discussion • Nature of Math Content - rationale and reasoning used to derive
understanding• Who does the work• Kind of mathematical work by students - equal time practising procedures
and inventing new methods • Content Coherence - mathematical relationships within lesson• Making Connections - weaving together ideas and activities in the
relationships between the learning goal and the lesson task made explicit by teachers
• Nature of Mathematics Learning - seeing new relationships between math ideas
• Nature of Learning first struggling to solve math problems− then participating in discussions about how to solve them hearing pros and cons,
constructing connections between methods and problems− so they use their time to explore, invent, make mistakes, reflect, and receive needed
information just in time-
Teacher Inquiry LessonAnalysisUsing Problem Solving
Bring your ONE TI Lesson Plan - 9 copies for June 3 class to get analysis feedback
Pool Border Problem- What Should the revised lesson look like?
Lesson Description- What the students do to learn<what the teacher does to teach>-Include math details-Framed within a 3-part problem solving lesson
Preparation for Saturday Nov 7, 2009Treats – Joe and Maria Due – Annotated bibliography for teacher inquiry
Read all learning theories papers and bring along Behaviourism and Constructivism:- Funderstandings. Behaviourism, Constructivism (Piaget, Vygotsky)- Clements, D. & Battista, M. (1990). Constructivist learning and teaching.
Arithmetic Teacher, 38(1), 34-35 Complexity Theory- Davis, B. (2005). Teacher as “consciousness of the collective’. Complicity: An
International Journal of Complexity and Education, 2, pp. 85-88. - Davis, B. (2003). Understanding learning systems: Mathematics education and
complexity science. Journal for Research in Mathematics Education (34)2, pp. 137-167
AssignmentsOct 28 - Technology
Webquest Nov 4 - Math Task 2Nov 7 - Annotated
BibliographyNov 18 - Learning
Theories paper