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Getting to "Got It!"
Helping Mathematics Students Reach Deep Understanding
by Abner Oakes, Senior Program Associate, The Center for Comprehensive
School Reform and Improvement at Learning Point Associates, and Jon R.
Star, Ph.D., Assistant Professor, Harvard Graduate School of Education
It comes as no surprise that what teachers do in the classroom impacts
students' learning of mathematics. During a single class period, a
teacher makes countless decisions about how to present material,
structure tasks, and guide student learning. Some decisions seem large,
such as how to grade students and how to introduce new concepts. Other
teacher decisions may seem less significant, such as the choice of how
to position students' seats, which problems to assign for homework, or
whether or not to ask students to raise hands before answering
questions. In essence, effective teaching is
effective decision-making, as the collection of big and small decisions
made by mathematics teachers makes a tremendous difference in students'
learning. How do teachers decide what to do when they teach? These
decisions may be based on their training or professional development
experiences, what they experienced as students, or what they have
learned from colleagues. A recent practice guide titled Organizing Instruction and Study to Improve Student Learning
aims to supplement and inform teachers' instincts and experiences by
identifying research-based instructional strategies that teachers of
all content areas can use to improve student learning.
The practice guide identifies the following seven recommendations (Pashler et al., 2007, p. 2):
- "Space learning over time. Arrange to review key elements of course content after a delay of several weeks to several months after initial presentation."
- "Interleave worked example solutions with problem-solving exercises. Have students alternate reading already worked solutions and trying to solve problems on their own."
- "Combine graphics with verbal descriptions. Combine graphical presentations (e.g., graphs, figures) that illustrate key processes and procedures with verbal descriptions."
- "Connect and integrate abstract and concrete representations of concepts. Connect and integrate abstract representations of a concept with concrete representations of the same concept."
- "Use quizzing to promote learning. Use quizzing with
active retrieval of information at all phases of the learning process
to exploit the ability of retrieval directly to facilitate long-lasting
memory traces."
5a. "Use pre-questions to introduce a new topic."
5b. "Use quizzes to re-expose students to key content."
- "Help students allocate study time efficiently. Assist
students in identifying what material they know well, and what needs
further study, by teaching children how to judge what they have
learned."
6a. "Teach students how to use delayed judgments of learning to identify content that needs further study."
6b. "Use tests and quizzes to identify content that needs to be learned."
- "Ask deep explanatory questions. Use instructional prompts
that encourage students to pose and answer deep-level questions on
course material. These questions enable students to respond with
explanations and support ... deep understanding of taught material."
All of the recommendations from the practice guide suggest rigorously
researched instructional strategies that have been shown to positively
impact student learning. Because of space limitations, this newsletter
will focus on only the last two of these recommendations.
Recommendation 6 targets what researchers call metacognition-literally
thinking about thinking. As teachers are well aware, many students find
it difficult to assess accurately what they do and do not understand.
As the time for a unit test approaches, teachers often hear that
students do not know how to study for mathematics tests and do not know
which problems they can and cannot solve. Students' difficulties in
accurately assessing what they do and do not know can make it extremely
challenging for them to prepare properly for assessments.
There is much that a teacher can do to encourage students to become
better at evaluating and monitoring their own learning. Pashler et al.
(2007) suggest the use of what researchers call the cue-only judgment of learning
approach, which can be particularly effective as an in-class or at-home
review activity (p. 23). At the end of a chapter or lesson, the teacher
asks students to complete a series of problems and to rate each problem
according to how well they understood it. After completing all of the
problems, the students are asked to return to the problems they rated
with low scores (the poorly understood problems). This activity can be
repeated until the number of problems with low ratings is reduced for
each student.
Teachers who find this strategy to be obvious or intuitive would be
surprised to learn that many students do not know this strategy for
monitoring their own understanding and find it, at least initially,
challenging to implement. But over time, and with continued practice,
this approach and others like it have been shown to be quite effective
at building students' metacognitive abilities, enabling them to
accurately gauge what they do and do not understand.
Once students begin to gauge better what they know and do not know,
they may be ready to reap the benefits from the practice guide's
seventh and final recommendation-that teachers "encourage students to
pose and answer 'deep-level' questions" (Pashler et al., 2007, p. 2).
Deep-level questions-such as those that begin "why"-can prompt students
to probe and explain their thinking. In fact, the ability to answer
deep-level questions is usually what we mean when we say that a student
understands.
In mathematics class, a commonly used type of deep-level question
asks students to justify how they solved a problem. Justifying a
solution means looking beyond the right answer and explaining and
defending how the approach was chosen, why it is a good approach, and
how one knows that the answer is in fact correct. An incorrect answer
has equal potential to be a learning opportunity for students when
paired with deep-level questions; a student can be asked to explain how
he or she knows that the answer is incorrect, to compare and contrast
different approaches that may have led to different answers, and to
identify and correct the error.
These two strategies-encouraging students to become more
metacognitive and asking deep-level questions-go hand in hand. The
ultimate goal is for students to learn to ask themselves and their
peers deep-level questions in order to assess and build their own deep
understanding of mathematics. These strategies and the five practice
guide recommendations not discussed here provide concrete and useful
suggestions to help mathematics teachers foster "not only initial
learning and understanding, but-equally importantly-the long-term
retention of information and skills" (Pashler et al., 2007, p. 33).
After reading this newsletter, please watch the archived version of The Center's webcast, "Making Algebra Work: Instructional Strategies That Deepen Student Understanding."
The website also offers access to some of Dr. Star's research and video
from the Montgomery County (MD) Public Schools' program, "The Math
Dude." Additional scenes are also available from the classrooms
featured in the webcast.
Reference
Pashler, H., Bain, P. M., Bottge, B. A., Graesser, A., Koedinger, K., McDaniel, M., et al. (2007). Organizing instruction and study to improve student learning. IES practice guide
(NCER 2007-2004). Washington, DC: National Center for Education
Research. Retrieved February 28, 2008, from
http://ies.ed.gov/ncee/wwc/pdf/practiceguides/20072004.pdf
The Center for Comprehensive School Reform and
Improvement is administered by Learning Point Associates under contract
with the Office of Elementary and Secondary Education of the U.S.
Department of Education.
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