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In an evaluation
of a mathematics program's consistency with the Curriculum Standards,
instruction and the environment in which it takes place should be
examined, with special attention to-
- mathematical content
and its treatment;
- relative emphases
assigned to various topics and processes and the relationships
among them;
- opportunities to
learn;
- instructional resources
and classroom climate;
- assessment methods
and instruments;
- the articulation
of instruction across grades.
Focus
How mathematics
is taught is just as important as what is taught. Students'
ability to reason, solve problems, and use mathematics to communicate
their ideas will develop only if they actively and frequently engage
in these processes. Whether students come to view mathematics as
an integrated whole instead of a fragmented collection of arbitrary
topics and whether they ultimately come to value mathematics will
depend largely on how the subject is taught. Thus, the evaluation
of a mathematics program must include an analysis of instruction
as well as content.
Discussion
An evaluation of how mathematics
is taught must consider how well the program is being implemented
and how instruction can be modified to better meet its goals and
objectives. Such an analysis requires the collection from a representative
sample of teachers of various types of information, including, but
not limited to, sustained classroom observations, interviews with
teachers, teachers' written self-reports, questionnaires, and summaries
of peer observations.
Each of the following sections
offers guidance for gathering information to evaluate instruction.
Both quantitative and qualitative information must be obtained.
How Content Is Treated.
An evaluation of instruction should look first at the accuracy of
the mathematics that is taught. In addition, an evaluation should
determine whether that mathematical content is treated in a manner
that is sensitive to the developmental level and mathematical maturity
of the students. Instruction that is sensitive to the students'
developmental level is set in realistic contexts, incorporates students'
experiences, uses language that is suited to the maturity of students,
allows sufficient time for students to construct meanings by exploring
and investigating mathematical ideas, and offers students opportunities
to discuss their ideas.
The Standards specifies
reasonable expectations for students and offers suggestions for
the treatment of topics at various grade levels. Students' needs
and characteristics were primary considerations as the Standards
was developed. Nonetheless, because the needs and characteristics
of students vary greatly even at a single grade level, it is important
to take these variables into account when examining instruction.
The Standards advocates
students' active involvement in learning, a stance that has important
implications for the way content is to be treated during instruction.
Rather than a routine presentation of mathematical ideas in a polished,
finished form for students to assimilate, instruction should provide
frequent opportunities for students to generate, discuss, test,
and apply mathematical ideas and verify their findings.
Such instructional approaches
also have implications for the role of the teacher during instruction.
When using a problem-solving approach in developing an idea, for
example, teachers must encourage students to guess courageously.
Teachers must be willing to entertain suggestions from students
and suspend judgment about their ideas. Teachers should help students
evaluate one another's suggestions and critically reflect on them
by anticipating objections and consequences. Clearly, these activities
require the teacher to assume a role very different from that of
a directive authority. Classroom observations for the purpose of
evaluating instruction should focus on the role of the teacher and
the appropriateness of that role to the content and activities.
Topic Emphases and
Relationships. The Standards proposes that instruction
should emphasize interrelationships among mathematical ideas. Classroom
observations should gather information about whether mathematics
is portrayed as an integrated body of logically related topics as
opposed to a collection of arbitrary rules that students must memorize.
For example, the K-4 standards suggest ways in which development
and extension of number concepts and operations can be integrated
into the treatment of other topics, such as measurement, geometry,
patterns, and graphs. The extent to which new ideas are presented
as natural or logical extensions of ideas the students have already
encountered should be a focal point of instructional evaluation.
The Standards calls
for an instructional emphasis on building strong conceptual frameworks
on which to base the development of skills. It also emphasizes the
importance of multiple representations of a mathematical idea and
the translation of an idea from one representational system to another.
A documentation of the extent to which these and other instructional
emphases in the Standards are implemented should be a major
part of any serious evaluation.
Classroom observations
should also document the extent to which instruction emphasizes
the relationships among the various branches of mathematics and
between mathematics and other areas of the school curriculum.
Opportunity to Learn.
If instruction is to result in the student outcomes specified in
the Standards, students need to have sufficient opportunities
to learn the specified content. Thus, program evaluations must consider
the amount of time actually devoted to mathematics instruction;
an hour of mathematics each day at all grade levels is a reasonable
expectation. The frequency of interruptions caused by school assemblies
and other school projects must be considered in the evaluation to
determine the actual time.
Further, evaluation should
focus on the attention given at each grade level to the various
branches of mathematics, such as geometry, measurement, statistics,
probability, algebra, discrete mathematics, and calculus in light
of the recommendations in the Standards.
Similarly, if students
are to become competent in problem solving, reasoning, and communicating
mathematically, instruction must allow them opportunities to engage
actively and frequently in these processes. Classroom observations
for evaluating instruction must pay special attention to the frequency
and quality of instructional activities that afford students such
opportunities.
Instructional Resources
and Classroom Climate. The evaluation of instruction should
determine the extent to which the classroom environment is conducive
to the attainment of program goals and student outcomes. One indicator
would be the availability and use of instructional resources, such
as computers, calculators, courseware, and manipulative materials.
In addition, evaluation should determine whether an intellectual
"climate" exists, in which students' curiosity, openness,
and spontaneity are encouraged.
Uses of Classroom
Assessment Methods. The methods, instruments, and tasks
used to assess students' learning should be consistent with the
content taught and the emphases placed on various topics and processes.
Evaluation Standards 1-10 present guidelines for assessing students'
outcomes as well as for judging the adequacy of the instruments
and tasks used in that assessment.
Articulation of Instruction.
An evaluation should examine the extent to which the implemented
program is articulated across grades. The degree of consistency
between the Standards and instruction should be determined
on the basis of data obtained from a number of classrooms in a given
school. It is insufficient to determine that one or two classrooms
exhibit this consistency. Within a given school, evaluation must
obtain information about the extent to which teachers have opportunities
to coordinate their instruction with the Standards across
grades.
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