Contrasting Examples in Mathematics Lessons Support Flexible and Transferable Knowledge Bethany Rittle-Johnson Vanderbilt University Jon Star Michigan State University
Comparison helps us notice distinctive features
Benefits of Contrasting Cases Perceptual Learning in adults (Gibson & Gibson, 1955) Analogical Transfer in adults (Gentner, Loewenstein & Thompson, 2003) Cognitive Principles in adults (Schwartz & Bransford, 1998) Category Learning and Language in preschoolers (Namy & Gentner, 2002) Spatial Mapping in preschoolers (Loewenstein & Gentner, 2001)
Extending to the Classroom How to adapt for use in K-12 classrooms? How to adapt for mathematics learning? Better understanding of why it helps
Current Study Compare condition: Compare and contrast alternative solution methods vs. Sequential condition: Study same solution methods sequentially
Target Domain: Early Algebra Star, in press
Predicted Outcomes Students in compare condition will make greater gains in: –Problem solving success (including transfer) –Flexibility of problem-solving knowledge (e.g. solve a problem in 2 ways; evaluate when to use a strategy)
Translation to the Classroom Students study and explain worked examples with a partner Based on core findings in cognitive science -- the advantages of: –Worked examples (e.g. Sweller, 1988) –Generating explanations (e.g. Chi et al, 1989; Siegler, 2001) –Peer collaboration (e.g. Fuchs & Fuchs, 2000)
Method Participants: 70 7th-grade students and their math teacher Design: –Pretest - Intervention - Posttest –Replaced 2 lessons in textbook –Intervention occurred in partner work during 2 1/2 math classes Randomly assigned to Compare or Sequential condition Studied worked examples with partner Solved practice problems on own
Intervention: Content of Explanations Compare: “It is OK to do either step if you know how to do it. Mary’s way is faster, but only easier if you know how to properly combine the terms. Jessica’s solution takes longer, but is also ok to do.” Sequential: “Yes [it’s a good way]. He distributed the right number and subtracted and multiplied the right number on both sides.”
Intervention: Flexible Strategy Use Practice Problems: Greater adoption of non-standard approach –Used on 47% vs. 25% of practice problem, F(1, 30) = 20.75, p <.001
Gains in Problem Solving F(1, 31) =4.88, p <.05
Gains in Flexibility Greater use of non-standard solution methods –Used on 23% vs. 13% of problems, t(5) = 3.14,p <.05.
Gains on Independent Flexibility Measure F(1,31) = 7.51, p <.05
Summary Comparing alternative solution methods is more effective than sequential sharing of multiple methods –In mathematics, in classrooms
Potential Mechanism Guide attention to important problem features –Reflection on: Joint consideration of multiple methods leading to the same answer Variability in efficiency of methods –Acceptance & use of multiple, non-standard solution methods –Better encoding of equation structures
Educational Implications Reform efforts need to go beyond simple sharing of alternative strategies
It pays to compare!
Assessment Problem Solving Knowledge –Learning: -1/4 (x – 3) = 10 –Transfer: 0.25(t + 3) = 0.5 Flexibility –Solve each equation in two different ways –Looking at the problem shown above, do you think that this way of starting to do this problem is a good idea? An ok step to make? Circle your answer below and explain your reasoning. (a) Very good way (b)Ok to do, but not a very good way (c) Not OK to do
Assessment Conceptual Knowledge
Explanations During Intervention Difference between groups ** p <.01; * p <.05