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The implementation of the Student Reflection Process (SRP) in a mathematics class to improve students' learning habits and participation. The SRP involves students reflecting on their study habits, making oral presentations to peers and teachers, and sharing responsibilities with the instructor. The results indicate increased student engagement, improved test performance, and valuable suggestions for instructional improvement.
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Victor U. Odafe Bowling Green State University, Huron, OH 44839, USA. [email protected]
Abstract The aim of this paper is to share ideas on how to improve students’ mathematics learning through the use of Student Reflection Process (SRP). The process helps students improve their study habits and participation in mathematics classes. Guidelines for implementing SRP in any mathematics class are shared. Introduction Does it indicate understanding when students are able to answer conceptual questions correctly only by looking through their notes? Is it possible that students’ difficulties in mathematics may not be as connected with the subject matter as with lack of certain study habits? The above situation provided the motivation for this project. The American Mathematical Association of Two Year Colleges (AMATYC), the National Council of Teachers of Mathematics (NCTM) and other groups have advocated that the ways mathematics is taught and learned need to change. The vision for change is discussed in such documents as the Beyond Crossroads :Implementing Mathematics Standards in the First Two Years of College (AMATYC 2006) Principles and Standards for School Mathematics (NCTM 2000), and Professional Standards for Teaching Mathematics (NCTM 1991). Many studies have been emphasizing the need for the teachers to reflect on their teaching practices (for example, Newborn 1999). While this is good and necessary, it will not by itself alone lead to the realization of the new vision for mathematics teaching and learning. An area that has been neglected to some extent is an emphasis on student reflection. Literature has discussed student’s self-assessment, which is an aspect of student reflection as used in this paper. The new vision for the teaching and learning of mathematics can be more realistically and fully realized if students are encouraged (or possibly required) to reflect on their learning. There has been a proliferation of ideas on the topic of reflective thinking. As a result, there is little agreement on its content or in the nature of the contexts that promote it (Grimmett 1988). For the purpose of this discussion, student reflection is defined as the process of thinking about learning by a student. It involves thoughts that the student has before, during, and after a particular lesson or lessons. This process requires the student to do a self-assessment of his or her study habits, classroom involvements and interactions, as well as make an oral presentation to peers and teachers on what was covered in a previous lesson or lessons. The presentation requirement forces students to reflect in order to present effectively. And this will undoubtedly lead to improved learning. Hence, student reflection is a proactive way of supporting students’ mathematical development in ways that are compatible with reform recommendations. The presenter will share his experiences implementing student reflection in his mathematics class. Information that will aid other teachers to try this strategy in their classes will be shared. Finally, this practice can be implemented in every environment, and at all levels of mathematics learning. Framework The following constructs, are significant in the development of activities and experiences in the Student Reflection Process (SRP): metacognition , modeling , communication ( oral and written), and sharing of responsibilities..
Metacognition is a theory about how we think. This has several definitions, but one that seems to captures the essence of it is by Flavell, 1979. It describes metacognition as one’s ability to think about one’s thinking, and to monitor and regulate what one is doing and thinking as one has an experience (for example, solving a problem). Modeling by the instructor provides students with ideas of concepts, skills, and knowledge that they should acquire and share with peers as they make their own presentations. That is, modeling provides students with useful images. Communication according to NCTM (2000) “Communication is an essential part of mathematics and mathematics education. It is a way of sharing ideas and clarifying understanding”(p.60). Hence, in order to communicate (orally or in writing) effectively, students must reflect and clarify their ideas and thoughts from previous experiences. Sharing Responsibilities refers to the fact that both instructor and students should see themselves as learners and teachers. The instructor learns what the students know and are able to do and uses this in making instructional decisions. Students on the other hand assume the instructor’s role and try to share what they know and are able to do with both the instructor and classmates. This situation, while empowering the students, promotes the building of a learning community as envisaged by the reform vision for mathematics education. Activities in the Student Reflection Process (SRP) Student reflection can be implemented in any math class. For this project, the setting was a Calculus and Analytic Geometry I class (Math 131). There were twelve (12) students, some of whom were still in high school, but enrolled in a Post Secondary Education Option Program (PSEOP) at a branch campus of a large state university in the Midwest, USA. This was a one semester class that met for one hour a day, five days a week. The project itself lasted for six weeks. Students completed a Reflection Survey on Day 1 and on the next six Mondays of the project. The goal here was to compare the information gathered on Day 1 to that of the following next six Mondays. Students answered the open question: How do you study mathematics? on both Day 1 and the Last Day of the project. Their responses provided an insight into their study habits both before and after the reflection experience. Following the students’ responses to both the Reflection Survey and the open question, they received reflection guidelines and study hints. The reflection guidelines contained information on what they should be doing in the next six weeks of reflection while the study hints contained information on general and specific mathematics study habits. Daily Oral Presentation and Other Activities Student reflection included daily presentations (or oral reports) by students. The presenter’s name was randomly picked from a bag that contained both the students’ and the instructor’s names. The presenter was expected to briefly explain the major concepts, definitions, theorems and procedures that were discussed in the previous class without referring to his or her books. I usually interjected with some probing questions. When the presenter was unable to answer a question correctly, it was directed to other students in the class and they were not allowed the use of their books either. I took note and rated students’ performances numerically from 1 – 10 points. On each of the next six (6) Mondays, less than ten minutes of class times, were used by students to complete the Reflection Survey. In it, students were to describe briefly the main ideas, concepts, or procedures that they learned during the past one week. In addition, they were to describe their contributions to the course learning activities, as well as indicate their areas of difficulties. The survey included a provision for them to indicate if they needed help or not with the course. Students were further required to suggest what they thought would help improve learning in the course. In order to have an idea of the impact (if any) of student reflection on test
examples are being worked out. The multitude of student suggestions for improving learning in the course suggests that they have become very interested in the ideas that would make them more successful in mathematics. A study of student Study Habit categories indicate that the reflection experience provided the students with more ways to study and succeed in mathematics. On Day 1, doing homework and taking and reading notes were the most frequently used habits to study mathematics. An instructional implication here is that instructors need to pay more attention to the notes and homework that they give to students. The results of the Study Habit Survey on the last day of the reflection project seem to indicate that all students were doing what they should be doing to succeed in their learning of mathematics. Results of the average performance of the students on three tests---before, during, and after reflection do indicate that students on the average performed better during reflection than prior to reflection and after daily presentations were stopped. The mean (std. dev.) scores for the three tests were 65.67 % (16.39), 83.67 % (9.84), and 71.17 % (10.91) respectively. It is my belief that the reflection experience might have contributed to the better performance during the project. When the presentations were stopped, the average test scores dropped, but not to a level that was equal to or below what it was before the reflection experience. Continuing the daily presentations beyond six weeks might have made a difference. Use of Findings Daily Oral Presentations Identified misconceptions and areas of difficulties revealed students’ weaknesses and these were addressed immediately. The oral presentation served as an assessment tool that benefited both students and instructor. Study Habit Categories Information obtained from the Study Habit Survey motivated me to encourage the students to ask questions and help others in class, as well as ask for help for themselves. I equally paid more attention to my class notes and homework. Reflection Survey Some of the students’ suggestions for improving learning in the course guided my classroom instruction as the course progressed. For example, more group work was utilized and a wider variety of examples was used in class as well. Teacher Guidelines for Implementing Student Reflection The following guidelines will help any teacher of mathematics implement the use of student reflection in his or her mathematics class. General Guidelines: