Worked example principle
- 1 Brief statement of principle
- 2 Description of principle
- 3 Experimental support
- 4 Theoretical rationale
- 5 Conditions of application
- 6 Caveats, limitations, open issues, or dissenting views
- 7 Variations (descendants)
- 8 Generalizations (ascendants)
- 9 References
Brief statement of principle
In contrast to the traditional approach of giving a list homework (or seatwork) problems for students to solve, students learn more efficiently and more robustly when more frequent study of worked examples is interleaved with problem solving practice.
Description of principle
"In courses that are teaching new tasks, learning time can be saved by replacing some practice problems with worked examples" (Clark & Mayer, 2004, p. 177). In addition, most studies comparing interleaved worked examples and problems with all problmes have also shown improved learning outcomes, including robust learning outcomes.
"It would be an unusual (not to mention incompetent) teacher who did not use worked examples. Similarly, textbooks universally use worked examples to illustrate new concepts. The suggestion being made here goes beyond this limited use of worked examples. Rather than using them merely to demonstrate how to use amathematical or scientific rule, the proposal is that they should be used inlarge numbers as a form of practice. In other words, instead of practicing by solving many problems (an activity engaged in by most conscientious students), it is proposed that many of these problems could profitably be replaced by worked examples." Sweller, J. (1999) p73
Imagine instead of giving students a typical homework or seatwork assignment involving 8 problems, you give them an assignment where every other problem comes with a complete worked out solution. The even numbered items would be usual problems, like the following algebra problem:
Solve 12 + 2x = 15 for x
The odd numbered problems, come with solutions, like this:
Below an example solution to the problem:
“Solve 12 + 2x = 15 for x”
Study each step in this solution, so that you can better solve the next problem on your own:
12+2x = 15
2x = 15-12
2x = 3
x = 3/2
x = 1.5
Which approach, asking for solutions to all 8 problems or interleaving 4 examples with 4 problems, will be lead to better student learning? You might think that the 8 problems require more work or that students might ignore the examples and thus, the 8 problems would lead to more learning. But, much research has shown that students typically learn more deeply and more easily from the second approach, when examples are interleaved between problems.
Teachers often think so many examples “give it away” or that students will not pay attention to the example. But, by having problems in between students are motivated to pay more attention to the example so as to prepare for the next problem or to resolve a question from the past problem. The problems break a students’ “illusion of knowing” (see the meta-cognition recommendation) that might otherwise lead them to skim the example and believe it is obvious.
It is important that students spend time actively engaged in learning and in genuine problem solving and reasoning. However, an emphasis on “learn by doing” is sometimes taken too far and students end up with homework problems or projects that are beyond their means. In such cases, they may spend much unproductive study time struggling without success. This time is often not only wasted but may increase a students’ frustration with the subject-matter and lead to unjustified feelings of not being good at math or science particularly. In contrast, during example study, students can focus their attention on understanding the principles underlying the examples instead of simply on finishing the problem. In early learning, the thought that goes simply into trying to solve the problem seems to distract students from trying to understand the principles underlying the solution.
Notice that in the example above, explanations for each step are not provided. It is best when students provide these explanations themselves and, while more research is needed, providing explanations can sometimes distract students doing so themselves and in other cases seems to provide no additional enhancement in student learning.
In whole classroom situation a teacher might implement this recommendation by going back and forth between a classroom or small group discussion around an example solution followed by small groups or individuals solving a problem (just one!) on their own. Then back to example study, for instance, by having students present their solutions and having others attempt to explain the steps (see the self-explanation recommendation). Now back to a second problem.
By giving the students frequent opportunities to study examples in between problem solving, students can more easily and more deeply acquire the big ideas, key concepts, or key principles that we want them to learn. With greater understanding, students will do better on harder problems in the future that require them to transfer these key concepts beyond the problems just like those they have seen before.
"There is a lot of evidence for the effectiveness of learning from worked examples. As an example, in one study twelve geoametry problems were used. In the conventional group the learners solved all twelve peoblems as practice. In the worked examples group, the learners received eight problems already worked out to study and then four problems to solve as practice. Students in the worked examples group spent significantly less time studying and scored higher on a test than did those in the conventional group. Furthermore, the worked examples group scored higher not only on test problems similar to those used during practice but also on different types of problems requiring application of the principles taught (Paas, 1992). The investigators conclude that "training with partly or completely worked-out problems leads to less effort-demanding and better transfer performance and is more time efficient" (p. 433). In fact, in one study, the use of worked examples allowed learners to complete a three-year mathematics course in two years (Zhu and Simon, 1987). Positive effects of worked examples have been reported in a variety of cources teaching well-defined problems, including algebra, geometry, statistics, and programming". Clark & Mayer, 2003(pp 179)
Laboratory experiment support
In vivo experiment support
(These entries should link to one or more learning processes.)
"Working memory has a limited capacity that becomes inefficient when having to retain even a few items. If the only way to build job-relevant skills is to perform many practice exercises, working memory can become overloaded by the mental work required to complete these exercises. However, if limited working memory resources could be used to study worked examples and build new knowledge from them, some of this labor- intensive effort could be bypassed. Worked examples are more efficient for learning new tasks because they reduce the load in working memory, thereby allowing the learner to learn the steps in problem solving.
Sweller and his colleagues distinguished between the intrinsic load of instructional materials that result from the inherent complexity of the content itself and the extraneous load imposed by the instructional design (Sweller, 1999; Sweller, Van Merrienboer and Paas, 1998). Learners who are studying complex topics will have to deal with high intrinsic mental load, especially if it's new information. However, good e-learning can help learners manage that lead by using effective instructional methods. Replacing some assigned problems with worked examples reduces the extraneous load, freeing working memory to allocate resources to the learning process. This recommendation applies primarily to courses for novice learners who are most susceptable to cognitive overload". Clark & Mayer, 2003 (pp178-179)
Another line of rationale suggests that worked examples make students engage in more self-explanation than they do during problem solving.
One (of perhaps many) open questions is what motivates students to process examples more deeply, that is, to engage in "generative processing" (Mayer) or "germane load" (Van Merrienboer and Paas?). The importance of interleaving examples and problems may be primarily about motivating students to deeply process the examples. Such an explanation is different from the "knowledge compilation" explanation for interleaving articulated by Trafton & Reiser (1993).
Conditions of application
1. Interleave examples and problems. Trafton & Reiser (1993) showed that examples and problems should be given in an alternating or interleaved order (Example, Problem, Example, Problem, ...) and not blocked (Example, Example, ..., Problem, Problem, ...).
2. Switch to problems later in leanring. The "expertise-reversal effect" suggests that it is earlier in skill development when the Worked Example Principle will be applicable, whereas later in development have students just solve problems without interleaved examples may be better (Kalyuga, Chandler, Tuovinen, & Sweller, 2001).
3. Including explanations in examples may not help. See the discussion of not providing explanations in the example above in the Examples section. Renkl and colleagues have explored this issue contrasting whether explanations are present or not (ADD REFS to Renkl).
4. Indicate subgoals in the example. In constrast to null or negative effects of adding explanations to examples (i.e., statements that justify a step), indicating how the steps fit into a hierarchy of goals and subgoals (e.g., by labeling some steps as key subgoals) does appear to aid learning. (ADD REFS to Catrambone).
5. Separate example study from problem solving. Having the example present during problem solving may encourage shallow processing (i.e., copying and small edits without understanding) of the example and may yield not benefit. While there is clear theoretical support for this condition of application, there does not seem to be more solid experimental evidence for it. Preliminary results from Anthony's PSLC study are consistent with the idea that the worked example effect is not found when examples are provided to students while they are asked to solve an analogous problem.
6. Tell students to study the example to prepare for upcoming problem solving. According to John Sweller (personal communication with Ken Koedinger), in his experiments, students were instructed at the beginning to study each example in preparation for upcoming problem solving. The prompting is recommended as critical to give students motivation to attend to and study the example. It is not clear whether there is any experimental support for this condition of application (i.e., comparing learning with this instruction vs. without). [Need to add references, this may be described in Sweller's book, Sweller, 1999]
Caveats, limitations, open issues, or dissenting views
Clark, R. C., & Mayer, R. E. (2003). e-Learning and the Science of Instruction : Proven Guidelines for Consumers and Designers of Multimedia Learning. San Francisco: Jossey-Bass.
Kalyuga, S., Chandler, P., Tuovinen, J., & Sweller, J. (2001). When problem solving is superior to studying worked examples. Journal of Educational Psychology, 93(3), 579–588.
Paas, F. (1992). Training strategies for attaining transfer of problem solving skill in statistics: A cognitive load approach. Journal of Educational Psychology, 84, 429–434.
Sweller, J., & Cooper, G. A. (1985). The use of worked examples as a substitute for problem solving in learning algebra. Cognition and Instruction, 2, 59–89.
Sweller, J. (1999). Instructional design in technical areas. Camberwell, Australia: ACER Press
Sweller, J., van Merrienboer, J.J.G., & Paas, F. (1998). Cognitive architectureand instructional design. Educational Psychology Review, 10, 251-296
Trafton, J. G., & Reiser, B. J. (1993). The contribution of studying examples and solving problems to skill acquisition. Proceedings of the 15th Annual Conference of the Cognitive Science Society (pp. 1017–1022). Hillsdale: Lawrence Erlbaum Associates, Inc.
Zhu, X., & Simon, H. A. (1987). Learning mathematics from examples and by doing. Cognition and Instruction, 4(3), 137-166.