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Compared to What? How Different Types of Comparison Affect Transfer in Mathematics. Bethany Rittle-Johnson Jon Star . What is Transfer?. Transfer “Ability to extend what has been learned in one context to new contexts” (Bransford, Brown & Cocking, 2000)
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Compared to What?How Different Types of Comparison Affect Transfer in Mathematics Bethany Rittle-Johnson Jon Star
What is Transfer? • Transfer • “Ability to extend what has been learned in one context to new contexts” (Bransford, Brown & Cocking, 2000) • In mathematics, transfer facilitated by flexible procedural knowledge and conceptual knowledge • Two types of knowledge needed in mathematics • Procedural knowledge: actions for solving problems • Knowledge of multiple procedures and when to apply them (Flexibility) • Extend procedures to a variety of problem types (Procedural transfer) • Conceptual knowledge: principles and concepts of a domain
How to Support Transfer:Comparison • Cognitive Science: A fundamental learning mechanism • Mathematics Education: A key component of expert teaching
Comparison in Cognitive Science • Identifying similarities and differences in multiple examples is a critical pathway to flexible, transferable knowledge • Analogy stories in adults (Gick & Holyoak, 1983; Catrambone & Holyoak, 1989) • Perceptual Learning in adults (Gibson & Gibson, 1955) • Negotiation Principles 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) • Spatial Categories in infants (Oakes & Ribar, 2005)
Comparison in Mathematics Education • “You can learn more from solving one problem in many different ways than you can from solving many different problems, each in only one way” • (Silver, Ghousseini, Gosen, Charalambous, & Strawhun, p. 288)
Comparison Solution Methods • Expert teachers do it (e.g. Lampert, 1990) • Reform curriculum advocate for it (e.g. NCTM, 2000; Fraivillig, Murphy & Fuson, 1999) • Teachers in higher performing countries help students do it (Richland, Zur & Holyoak, 2007)
Does comparison support transfer in mathematics? • Experimental studies of learning and transfer in academic domains and settings largely absent • Goal of present work • Investigate whether comparison can support transfer with student learning to solve equations • Explore what types of comparison are most effective • Experimental studies in real-life classrooms
Why Equation Solving? • Students’ first exposure to abstraction and symbolism of mathematics • Area of weakness for US students • (Blume & Heckman, 1997; Schmidt et al., 1999) • Multiple procedures are viable • Some are better than others • Students tend to learn only one method
Study 1 • Compare condition: Compare and contrast alternative solution methods vs. • Sequential condition: Study same solution methods sequentially Rittle-Johnson, B. & Star, J.R. (in press). Does comparing solution methods facilitate conceptual and procedural knowledge? An experimental study on learning to solve equations. Journal of Educational Psychology.
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Predicted Outcomes • Students in compare condition will make greater gains in: • Procedural knowledge, including • Success on novel problems • Flexibility of procedures (e.g. select non-standard procedures; evaluate when to use a procedure) • Conceptual knowledge (e.g. equivalence, like terms)
Study 1 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
Procedural Knowledge Assessments • Equation Solving • Intervention: 1/3(x + 1) = 15 • Posttest Familiar: -1/4 (x – 3) = 10 • Posttest Novel: 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.
Gains in Procedural Knowledge: Equation Solving F(1, 31) =4.88, p < .05
Gains in Procedural Flexibility • Greater use of non-standard solution methods to solve equations • 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
Gains in Conceptual Knowledge No Difference
Helps in Estimation Too! • Same findings for 5th graders learning computational estimation (e.g. About how much is 34 x 18?) • Greater procedural knowledge gain • Greater flexibility • Similar conceptual knowledge gain
Summary of Study 1 • Comparing alternative solution methods is more effective than sequential sharing of multiple methods • In mathematics, in classrooms
Study 2:Compared to What? Solution Methods Problem Types Surface Features
Compared to What? • Mathematics Education - Compare solution methods for the same problem • Cognitive Science - Compare surface features of different problems with the same solution • E.g. Dunker’s radiation problem: Providing a solution in 2 stories with different surface features, and prompting for comparison, greatly increased spontaneous transfer of the solution (Gick & Holyoak, 1980; 1983; Catrambone & Holyoak, 1989)
Study 2 Method • Participants: 161 7th & 8th grade students from 3 schools • Design: • Pretest - Intervention - Posttest - (Retention) • Replaced 3 lessons in textbook • Randomly assigned to • Compare Solution Methods • Compare Problem Types • Compare Surface Features • Intervention occurred in partner work • Assessment adapted from Study 1
Gains in Procedural Knowledge Gains depended on prior conceptual knowledge
Gains in Conceptual Knowledge Compare Solution Methods condition made greatest gains in conceptual knowledge
Gains in Procedural Flexibility: Use of Non-Standard Methods Greater use of non-standard solution methods in Compare Methods and Problem Type conditions
Gains on Independent Flexibility Measure No effect of condition
Summary • Comparing Solution Methods often supported the largest gains in conceptual and procedural knowledge • However, students with low prior knowledge may benefit from comparing surface features
Conclusion • Comparison is an important learning activity in mathematics • Careful attention should be paid to: • What is being compared • Who is doing the comparing - students’ prior knowledge matters
Acknowledgements • For slides, papers or more information, contact: b.rittle-johnson@vanderbilt.edu • Funded by a grant from the Institute for Education Sciences, US Department of Education • Thanks to research assistants at Vanderbilt: • Holly Harris, Jennifer Samson, Anna Krueger, Heena Ali, Sallie Baxter, Amy Goodman, Adam Porter, John Murphy, Rose Vick, Alexander Kmicikewycz, Jacquelyn Beckley and Jacquelyn Jones • And at Michigan State: • Kosze Lee, Kuo-Liang Chang, Howard Glasser, Andrea Francis, Tharanga Wijetunge, Beste Gucler, and Mustafa Demir