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International Electronic Journal of
Mathematics Education
Volume 4, Number 1, February 2009
Editor
Ziya ARGUN, TURKEY
Editorial Board
Mahmoud AL-HAMZA, RUSSIAN Jeremy KILPATRICK, USA
FEDERATION Siew-Eng LEE, MALAYSIA
Mara ALAGIC, USA Frederick K.S. LEUNG, CHINA
Ahmet ARIKAN, TURKEY Shiqi LI, CHINA
Nicolas BALACHEFF, FRANCE Romulo LINS, BRAZIL
Carmen BATANERO, SPAIN Denise S. MEWBORN, USA
Catherine A. BROWN, USA
John MONAGHAN, UNITED KINGDOM
Leone BURTON, UNITED KINGDOM Judy MOUSLEY, AUSTRALIA
Olive CHAPMAN, CANADA Richard NOSS, UNITED KINGDOM
Kwok-cheung CHEUNG, CHINA Ildar S. SAFUANOV, RUSSIAN FEDERATION
Megan CLARK, NEW ZEALAND Mamokgethi SETATI, SOUTH AFRICA
Willibald D RFLER, AUSTRIA Anna SFARD, ISRAEL
Paul DRIJVERS, NETHERLANDS Kaye STACEY, AUSTRALIA
Lyn ENGLISH, AUSTRALIA Khoon Yoong WONG, SINGAPORE
Peter GATES, UNITED KINGDOM Oleksiy YEVDOKIMOV, UKRAINE
Juan D. GODINO, SPAIN
Sharifah Norul Akmar bt Syed ZAMRI,
Marjorie HENNINGSEN, LEBANON MALAYSIA
Noraini IDRIS, MALAYSIA Nurit ZEHAVI, ISRAEL
Cyril JULIE, SOUTH AFRICA Ismail Ozgur ZEMBAT, TURKEY
i
International Electronic Journal of
Mathematics Education
Volume 4, Number 1, February 2009
Welcome to the International Electronic Journal
CONTENTS
of Mathematics Education (IEJME). We are
happy to launch another issue with the
1. Addressing the Principles for School
contribution of individuals from all around the
Mathematics: A Case Study of Elementary
world both as authors and reviewers. Both
Teachers Pedagogy and Practices in an Urban
research and position papers, not excluding other
High-Poverty School
forms of scholarly communication, are accepted
Berry, R. Q., Bol, L., McKinney, S. E. 1
for review. The long term mission of the IEJME is
to continue to offer quality knowledge and
2. Active Learning Techniques (ALT) in a
research base to the education community and
Mathematics Workshop; Nigerian Primary
increased global availability of the articles
School Teachers Assessment
published each issue. The editors and review
Salman, M. F. 23
board hope that you find the published articles
academically and professionally valuable.
3. Enhancing Students Understanding in
Calculus Trough Writing
Online - It is our intention to make the journal
available over the internet. All submissions, Idris, N. 36
reviewing, editing, and publishing are done via e-
mail and the Web, allowing for quality of the end
product and increased speed and availability to all
readers.
Publication Frequency - IEJME is published
three times a year in February, July and October
for every year. Published by:
GOKKUSAGI LTD. STI.
TURKEY
Gokkusagi all rights reversed. Apart from
individual use, no part of this publication may be
reproduced or stored in any form or by any means
without prior written permission from publisher.
ISSN1306-3030 www.iejme.com
ii
International Electronic Journal of
Mathematics Education
Volume 4, Number 1, February 2009 www.iejme.com
ADDRESSING THE PRINCIPLES FOR SCHOOL MATHEMATICS: A CASE STUDY
OF ELEMENTARY TEACHERS PEDAGOGY AND PRACTICES IN AN URBAN
HIGH-POVERTY SCHOOL
Robert Q. Berry
Linda Bol
Sueanne E. McKinney
ABSTRACT. The extent to which four novice teachers assigned to an urban high-poverty school
implemented the Principles of School Mathematics during their mathematics instruction program was
investigated using a case study design. The research team conducted 36 unannounced observations of the
participating teachers and utilized a developed assessment to guide their observations. Results indicated that
only one teacher was judged proficient for all the Principles. The remaining three teachers fell short in the
implementation and direction of the Principles. Detailed descriptions of the pedagogical practices of the
teachers are provided.
KEYWORDS. Mathematics, Urban Schools, Pedagogy.
INTRODUCTION
Imagine a classroom, a school, or a school district where all students have access to
high-quality, engaging mathematics instruction. There are ambitious expectations for all,
with accommodations for those who need it. Knowledgeable teachers have adequate
resources to support their work, and are continually growing as professional. . .
(National Council of Teachers of Mathematics, 2000, p. 3).
The above statement highlights the new vision of a high-quality mathematics learning
environment for students in grades pre-kindergarten through twelve set forth by the National
Council of Teachers of Mathematics (NCTM), a professional organization committed to
Copyright 2009 by GOKKUSAGI
ISSN: 1306-3030
International Electronic Journal of Mathematics Education / Vol.4 No.1, February 2009
2
excellence in the teaching and learning of mathematics. Their milestone document, Principles
and Standards for School Mathematics (PSSM) (2000) offers a framework for providing a
rigorous mathematics education program in order to improve the mathematics literacy and
success of diverse student populations. This document outlines six principles (Equity,
Curriculum, Teaching, Learning, Assessment and Technology) that describe specific and crucial
elements that influence mathematics educational programs. According to the NCTM:
. . . the power of these Principles as guides and tools for decision making derives
from their interaction in the thinking of educators. The Principles will come fully
alive as they are used together to develop a high-quality school mathematics
program (NCTM, 2000, p. 12).
Although PSSM (NCTM, 2000) outline explicit targets for the teaching and learning of
mathematics, many elementary classrooms continue to fall short in actualizing these goals (Berry,
2003; Palacios, 2005). Of particular concern for educators and the mathematics community is the
underperformance of urban students and the disparities among the subgroups. Recognizing that
major factors such as high teacher attrition levels, the difficulty in attracting highly-qualified
mathematics educators, and the perils of living in high-poverty and depressed areas play a
significant role in achievement levels, the National Assessment of Educational Progress (NAEP)
data implies that urban students are not meeting academic success because they are not
experiencing instructional practices consistent with the recommendations suggested by the
NCTM (Berry, 2003; Lubienski, 2001). When teachers of mathematics methodology and
instructional practices are consistent with each of the NCTM Principles, students are more apt to
develop a rich and conceptual understanding of the different mathematical ideas and processes, as
well as skill and procedural fluency (Hiebert, 2003; Merlino & Wolff; NCTM, 2000; Spillane &
Zeuli, 1999; Turner, 1999). For example, a recent investigation by McKinney, Bol, and Berube
(2008) investigated the mathematics instructional practices of Star Teachers, or those teachers
that have proven effective with urban populations. A term endeared by Haberman (2006, 1995),
star teachers. . . are outstandingly successful: their students score higher on standardized tests;
parents and children think they are great; principals rate them highly; other teachers regard them
as outstanding; cooperative universities regard them as superior; and they evaluate themselves as
outstanding teacher (Haberman, 1995, p. 1). The research team concluded that star teachers
demonstrated those instructional practices that are aligned with NCTM s Principles (2008).
McKinney, Berry, and Robinson (2008) also investigated the mathematics instructional practices
of star teachers and compared them to the practices of teachers not so identified. They reported
Berry, McKinney and Jackson 3
that star teachers demonstrated instructional practices supported by the NCTM Principles more
frequently than non-stars. According to Sillane and Zeuli (1999), when teachers instructional
practices are aligned with NCTM s standards, students tend to meet greater success on
mathematics assessments. Therefore, it is plausible to assume that if teachers embrace the NCTM
Principles with finesse and incorporate them within their instructional program and practices,
student s mathematical achievement would increase. The research question that guided this study
was:
1. To what extent are the Principles of School Mathematics addressed through the
mathematics instructional practices and pedagogy of four selected urban high-poverty
school elementary teachers?
Findings from this investigation will contribute to the knowledge base as to what
mathematics teachers actually do to impact student learning and understanding of important
mathematical ideas and concepts (U.S. Department of Education, 2008). Additionally, data from
this study may also assist teachers in executing NCTM s Principles in their mathematics
classroom.
Conceptual Framework
The literature review concentrates on those areas related to mathematics education in
urban high-poverty schools: (a) The Plight of Urban Students Mathematics Experiences and (b)
Elementary Teacher Preparation and Instructional Pedagogy.
The Plight of Urban Students Mathematics Experiences
The only ongoing assessment of mathematics achievement in the United States is the
National Assessment of Educational Progress (NAEP) which gauges student mathematics
achievement in grades 4, 8 and 12 (Rampey, Lutkus & Dion, 2006). This assessment instrument
provides information on what students know, understand and can do mathematically. The Trial
Urban District Assessment (TUDA), a distinctive project of NAEP, began assessing the
mathematical performance of 4th, 8th a nd 12th grade students from eleven large urban metropolitan
school districts (Atlanta, Austin, Boston, Charlotte, Chicago, Cleveland, Houston, Los Angeles,
New York, San Diego and Washington, DC) both in 2003 and 2005. This data has been used to
show that several factors such as socioeconomic status, school policies, and allocation of human
and material resources, and instructional practices may account for performance disparities
(Oakes,1990; Secada, 1992; Strutchens & Silver, 2000; Tate, 1997).
International Electronic Journal of Mathematics Education / Vol.4 No.1, February 2009
4
Students achievement on the NAEP mathematics assessment is reported as Below Basic,
Basic, Proficient and Advanced. For example, fourth-graders performing at the Basic level should
be able to estimate and use basic facts to perform simple computations with whole numbers and
show some understanding of fractions and decimals (Rampey, Lutkus, & Dion, 2006). Those at
the Proficient level should be able to use whole numbers to estimate, compute and determine if
specific results are reasonable. Students from this grade band should also have a conceptual
understanding of fractions and decimals and should be able to solve real-world problems. Fourth-
graders performing at the Advanced level should be able to solve complex and non-routine real-
world problems. These students are expected to draw logical conclusions and justify answers and
solution processes (Rampey, Lutkus & Dion, 2006). With the exception of Austin and Charlotte,
average scores for the participating districts were lower than the national average in 2005.
Charlotte was the only participating urban district to report higher scores in 2003; all others were
below the national average. The mathematics achievement of fourth grade students from the
eleven participating urban school districts for 2003 and 2005 are presented in Table 1.
Table 1. Percentage of Students by Mathematics Achievement Level for Grade 4 in Urban Districts for
2003 and 2005
Mathematics Achievement Levels
Below Basic At or above At or above At Advanced
Basic Proficient
Districts 200*-****-**** 200*-****-**** 2003 2005
Nation 24* 21 76* 79 31 35 4* 5
Atlanta 50* 43 50* 57 13 17 2 3
Austin 15 85 40 7
Boston 41* 28 59* 72 12* 22 1 2
Charlotte **-**-**-**-**-** 6* 9
Chicago **-**-**-**-**-** 1 1
Cleveland 49* 40 51* 60 10 13 0 0
DC 64* 55 36* 45 7* 10 1 1
Houston 30* 23 70* 77 18* 26 1 3
Los Angeles 48* 42 52* 58 13* 18 1 2
New York 33* 27 67* 73 21* 26 2 3
San Diego 34* 26 66* 74 20* 29 2* 4
* Significantly different from 2005
Not available. The district did not participate in 2003 Table.
While the urban school districts are showing positive increases in mathematics
achievement, researchers, school administrators and mathematics education faculties are
becoming increasingly apprehensive about the mathematics achievement levels of urban students
and the disparities that exist among different subgroups of students. As stated earlier, these
concerns may be indicative of the instruction that these students receive (Lubienski, 2001).
Berry, McKinney and Jackson 5
The literature makes clear that teachers pedagogical decisions and activities make a
difference in students mathematics achievement and that students understanding of mathematics
is shaped by the teaching they encounter in school (Berry, 2003; Darling-Hammond, 2000;
Merlino & Wolff, 2001; NCTM, 2000; Spillane & Zeuli, 1999; Turner, 1999). For example,
Wenglinsky (2002) examined how mathematics achievement levels of more than 7,000 students
on the 1996 NAEP mathematics assessment were related to measures of teaching quality. He
found that student mathematics achievement was influenced by both teacher content background
and teacher education or professional development coursework, particularly in how to work with
diverse student populations. Wenglinsky (2002) further stated, Regardless of the level of
preparation students bring into the classroom, decisions that teachers make about classroom
practices can either greatly facilitate student learning or serve as an obstacle to it (p. 7). Sanders
and Rivers (1996) also investigated teacher quality and mathematics achievement. They found
that significant gains in mathematics achievement levels were made by students when placed with
an effective teacher over a three year span. Therefore, in order to impact the mathematics
achievement of urban populations, teachers must have a thorough understanding of the best
practices for reaching diverse populations as articulated by the NCTM (2000).
Elementary Teacher Preparation and Pedagogy
The mathematics education of elementary school students has received increased
attention because many elementary students lack preparation for rigorous mathematics in the
upper grades. Elementary school teachers receive training in all the core subjects (mathematics,
science, reading, and social studies). Consequently, they may lack the necessary depth and
understanding in mathematics content and pedagogy to prepare elementary students for rigorous
mathematics in middle and high school. Shifts in the elementary mathematics curriculum have led
to a substantial increase in the content knowledge needed to teach elementary mathematics (Hill,
Rowan, & Ball, 2005). Elementary teachers need not only to be able to teach arithmetic, but they
must also be able to teach geometry, algebraic concepts, measurement, and data analysis and
probability. In addition, they must be able to teach problem solving skills, represent mathematical
concepts in multiple ways, connect mathematical concepts within mathematics and to other
subject areas, and be able to analyze students thinking about mathematics (Hill, Rowan, & Ball,
2005). Reys and Fennell (2003) found that many pre-service elementary teachers were
uncomfortable with thinking of themselves as mathematics teachers even though they would be
the primary persons who would organize and deliver mathematics instruction for elementary
International Electronic Journal of Mathematics Education / Vol.4 No.1, February 2009
6
school students. One could readily assume that these pre-service teachers may be uncomfortable
because they do not understand the mathematics content well, do not know how students learn
mathematics, or are unable to use appropriate instruction and assessment strategies to help
students learn mathematics with understanding (Hill, Rowan, & Ball, 2005; Hill, Schillings, &
Ball, 2004). Likewise, researchers are concerned about in-service elementary teachers
mathematics content knowledge (Kilpatrick, Swafford, & Findell, 2001) and their use of
mathematics pedagogical content knowledge to provide effective learning opportunities for
students (Hill, Schillings, & Ball, 2004).
The concerns surrounding pedagogy has led researchers to look at different forms of
teaching methodology as related to mathematics instruction. The two dominate methodologies
include traditional practices and alternative practices. A traditional methodology focuses on
teaching mathematical procedures with little, if any, emphasis on conceptual understandings
(Fitzgerald & Bouck, 1993; Hiebert, 2003; Lubienski, 2001; Strutchens & Silver, 2000; Tharp &
Gallimore, 1988). Typical mathematics classrooms are oriented around abstract algorithms where
students work a multiple of problems to demonstrate procedural knowledge (Bransford, Brown &
Cocking, 1999; NCTM, 2000; Watson, 2006). Drill and practice is key. Although new directions
for mathematics instruction are advocated by the NCTM (2000) traditional mathematics
pedagogy continues to dominate classrooms across the United States, even though they aren t
supportive of the NCTM s six principles (Hiebert, 2003; NCTM, 2000; Van De Walle, 2006).
Although not explicit to mathematics teaching, Haberman (2005, 1995, 1991) used the descriptor
pedagogy of poverty to define traditional, ritualistic routines which are often practiced in urban
classrooms and can be readily seen in the traditional mathematics classroom. For example, when
mathematics teachers simply give out information, assign problems, monitor seatwork, and/or
assign homework, they are supporting the pedagogy of poverty as defined by Haberman (2005,
1991). Stinson (2006) and Strutchens (2000) contended that the pedagogy of poverty is
typically faced by urban high-poverty students throughout their mathematics education, and are
significant factors contributing to their poor mathematics achievement.
In contrast to traditional mathematics pedagogy, alternative approaches emphasize
participatory and inquiry driven practices that highlight reasoning and problem solving skills and
student discourse. Alternative approaches are more hands-on and student centered, allowing the
teacher to facilitate students mathematical learning. There is documented evidence that suggests
that alternative approaches allow students to develop a conceptual understanding of the different
mathematical ideas (Hiebert, 1986; Hiebert & Carpenter, 1992; NCTM, 1989, 1991, 1995, 2000;
Berry, McKinney and Jackson 7
Owens, 1993; Wenglinsky, 2002). Further, students tend to perform better on mathematics
achievement tests when teachers provide inquiry driven and hands-on learning opportunities
(Wenglinsky, 2002).
Alternative approaches to teaching mathematics are also in concert with the NCTM
Principles and with what Haberman (2005, 1991) defines as good teaching for urban high-
poverty students. For example, when students are actively involved and encouraged to see major
concepts and big ideas, they are being presented with teaching practices proven to be effective
and especially successful for working with urban populations. Table 2 provides a cross
comparison between each of the NCTM s six Principles and Haberman s Acts of Good Teaching.
Table 2. A Cross Comparison of the NCTM s Six Principles and Haberman s Acts of Good Teaching
NCTM s Principles for School Mathematics * Haberman s Acts of Good Teaching
EQUITY: Excellence in mathematics education Students are involved with issues they regard as vital
requires equity high expectations and strong concerns.
support for all students. Students are involved with applying ideals such as
fairness, equity, or justice to their world.
CURRICULUM: A curriculum is more than a Students are being helped to see major concepts, big
collection of activities: it must be coherent, ideas, and general principles and are not merely engaged
focused on important mathematics, and well in the pursuit of isolated facts.
articulated across the grades.
TEACHING: Effective mathematics teaching Students are asked to think about an idea in a way that
requires understanding what students know and questions common sense or a widely accepted assumption
need to learn and then challenging and supporting that relates new ideas to ones learned previously, or that
them to learn it well. applies an idea to the problems of living.
Students are actively involved.
Students are directly involved in a real-life experience.
Students are actively involved in heterogeneous groups.
Students are being helped to see major concepts, big
ideas, and general principles and are not merely engaged
in the pursuit of isolated facts.
LEARNING: Students must learn mathematics Students are being helped to see major concepts, big ideas,
with understanding, actively building new and general principles and are not merely engaged in the
knowledge from experience and prior knowledge. pursuit of isolated facts.
Students are involved in planning what they will be
doing.
Students are involved in redoing, polishing, or perfecting
their work.
Students are involved in planning what they will be
doing.
ASSESSMENT: Assessment should support the Students are involved in reflecting on their own lives and
learning of important mathematics and furnish how they have come to believe and feel as they do.
useful information to both teachers and students. Students are involved with explanations of human
differences.
TECHNOLOGY: Technology is essential in Teachers involve students with the technology of
teaching and learning mathematics; it influences information access.
the mathematics that is taught and enhances
students learning.
* (NCTM, 2000, p. 11).
International Electronic Journal of Mathematics Education / Vol.4 No.1, February 2009
8
Methodology
This investigation was conducted in one low-performing school within a large
southeastern metropolitan city. The district contains approximately 130,000 students, with over
60,000 elementary school students (kindergarten through fifth grades).
A case study methodology was utilized because the fundamental case in question
involved four elementary teachers who teach in one of the district s high poverty schools which
had not met the state s benchmark score on the standardized mathematics assessment. The student
demographics for Monarch Elementary School (pseudonym) include 0.7% Native Americans,
3.8%, Multi-Racial students, 1.7% Asians, 62.1% African Americans, 26.4% Hispanics, and 5.2%
White. Nearly 68% of the students at Monarch Elementary School qualified for free or reduced-
price school lunches. Olson and Jerald (1998) define a high-poverty school in which at least 50%
of the students qualified for free or reduced-price lunches; this definition was utilized for the
purpose of this study.
Criterion selection was employed for this study. That is, teachers with the majority of
their students not meeting the state s benchmark score in mathematics were selected as
participants for this study. The four female teachers Angela, Betty, Carol, and Diane
(pseudonyms) were between the ages of 26-32 years (mean = 29) with each only having one
year of teaching experience in a high-poverty school. In regards to race, Angela, Betty and Carol
are Caucasian, and Diane is African American. They graduated from the same state university
after completing a traditional teacher preparation program. Additionally, all are endorsed in
elementary education and have state appropriate certification.
Teacher Performance Assessment and Procedures
An observation instrument was developed based on the Principles from PSSM (2000),
and the participating school division s Teacher Performance Assessment instrument. The Teacher
Performance Assessment instrument consisted of research based descriptors of essential qualities
of effective pedagogy and methodology for teaching. Specifically, the research team categorized
40 descriptors from the Teacher Performance Assessment instrument into the six Principles
outlined in the NCTM s PSSM (see Table 5). Although the Teacher Performance Assessment
contained a total number of 64 items, some of these items did not align with any of the Principles,
and were not included in the observation instrument. Because the researchers relied on the
assessment instrument already employed in the division, there were more items for some scales
Berry, McKinney and Jackson 9
compared to others. The blueprint provides an overview of the Principles or scales and the
number of items by scale (see Table 3).
Table 3. Blueprint of Observation Instrument
Principle/ Scale Description of Principle # Items Sample Item
Teachers are responsive to various
learning preferences and allocate their
Asks higher level questions to
time and resources equitably to help
Equity 8
all learners.
students attain and perhaps exceed the
mathematics goals for their grade level.
Teachers understand the big ideas of
mathematics and are able to see how Demonstrates knowledge of
Curriculum 3
these ideas connect across the grade state mandated standards.
bands.
Teachers recognize that there is no one
Draws on extensive repertoire
right way to teach and that using
Teaching 12
of instructional skills.
various pedagogical styles are
necessary to engage students
mathematically.
Teachers help students learn
mathematics not as isolated facts and Connects new learning to real
Learning 10
world experiences.
procedures but how mathematics
concepts are interconnected and
connected to other subject areas.
Teachers utilize multiple forms of Uses multiple assessment
Assessment 5
assessments and ask students to reflect strategies.
on their thinking.
Teachers incorporate technology and Appropriate use of
Technology 2
mathematics instruction as to impact technology.
student achievement.
Eight indicators were categorized under the Equity Principle. These eight indicators
primarily focus on meeting the variety of instructional needs of students in the mathematics
classroom. Three indicators were categorized under the Curriculum Principle; these indicators
focus on knowledge and use of standards, curriculum, and content. Twelve indicators categorized
under the Teaching Principle focus primarily on teachers use of instructional materials and
instructional strategies. Ten indicators categorized under the Learning Principle focuses primarily
on how students experience their learning. The five indicators under the Assessment Principle
focus on how assessments are used to guide the instruction. The two indicators under Technology
Principle focus on the selection and use of technology.
Steps were taken to enhance the reliability and validity of the observation measure.
Validation of the instrument was addressed in peer-debriefing sessions as a regular part of the
International Electronic Journal of Mathematics Education / Vol.4 No.1, February 2009
10
research process (Creswell, 1998; Lincoln & Guba, 1985). After independently reviewing the
teacher assessment measure, the research team along with another university faculty member
worked collaboratively to further review the categories and items on the evaluation observation
protocol. The research team consisted of an assistant principal, a lead mathematics teacher, and a
university mathematics methods faculty. In addition, further expert review served to validate the
instrument. The categorized evaluation observation protocol was examined by two university
mathematics education faculty members (not on the research team), as well as the school district s
mathematics Instructional Coordinator. The participating parties agreed that the teacher essential
indicators outlined in the proposed evaluation tool were representative of the NCTM s Principles.
Inter-observer reliability was established by having the research team observe 19 classrooms
within the participating school, with teachers who were non-participants in this study and with
different grade levels. To address the consistency across observers the percentage of agreement
for each item was calculated. A conservative estimate of consistency was employed because
agreement was designated only when all three observers concurred that the instruction reflected
the descriptor or item. For example, the research team agreed 14 of the 19 times on whether
instruction demonstrated high teacher expectation of student achievement as indicative of the
Equity Principle. Across all items and scales (Principles), the percentage of agreement was .76,
indicating good inter-observer reliability. By scale, the averages were .71 for Equity, .86 for
Curriculum, .71 for Teaching, .67 for Learning, .72 for Assessment, and .87 for Technology.
After addressing the reliability and validity of the observation instrument, the research
team conducted the classroom observations over a period of seven months. The four teachers
were observed nine times, with each researcher observing each teacher three times during their
mathematics instruction. Typically, the mathematics time block was 55 minutes in duration. All
observations were conducted by individual researchers and were unannounced. The researchers
adopted the role of non-participant observers who strived to remain detached from the teacher and
any classroom interactions (Gall, Borg & Gall, 1996), and recorded whether or not the teachers
demonstrated a particular behavior that comprised the items or descriptors on the observation
instrument.
Data Analysis and Findings
Summary data for each teacher by Principle is provided in Table 4. This table shows how
many of the indicators for each Principle the teachers met, and whether they were judged to be
Berry, McKinney and Jackson 11
proficient on each Principle assessed. In order to be deemed proficient for an indicator or item
under each Principle, the research team agreed that the teacher must demonstrate the behavior in
two out of three observations conducted by individual observers, and also two out of the three
observers must have deemed the teacher proficient. For example, Betty was deemed proficient for
support critical discourse among learners because Observers 1 and 2 both observed this in at
least two out of three of their individual observations. Overall, the researchers predetermined that
a teacher would be judged as proficient on a Principle when proficiency was demonstrated on the
majority of the descriptors or items categorized under the Principle. More specifically, this meant
that teachers needed to be proficient on 6 of the 8 items for Equity, 2 of 3 for Curriculum, 10 of
12 for Teaching, 8 of 10 for Learning, 4 of 5 for Assessment, and 2 of 2 for technology.
Table 4. Proficiency for Each Principle Demonstrated by Individual Teachers
Teachers Equity Curriculum Teaching Learning Assessment Technology
Angela 5 of 8 2 of 3* 5 of 12 4 of 10 3 of 5 0 of 2
Betty 6 of 8* 3 of 3* 5 of 12 3 of 10 3 of 5 2 of 2*
Carol 5 of 8 3 of 3* 8 of 12 6 of 10 1 of 5 0 of 2
Diane 7 of 8* 3 of 3* 10 of 12* 10 of 10* 4 of 5* 2 of 2*
* indicates proficiency
The overall results presented in Table 4 revealed a good deal of variation in results by
individual teacher. Looking at each of the Principles as a whole, all teachers were judged to be
proficient for the Curriculum Principle. However, teacher proficiency for each of the remaining
six principles varied. Two teachers, Betty and Diane did meet proficiency for the Equity
Principle, while the other two teachers, Angela and Carol, did not. Only one teacher, Diane, was
judged proficient for the Teaching, Learning and Assessment Principles. Finally, two teachers,
Betty and Diane met proficiency for the Technology Principle.
Although the summary data provided valuable information across teachers, examining the
results by individual teacher illuminates the specific teaching practices that exemplify the
presence or absence of indicators associated with the Principles. Table 5 shows the proficiency
designations for individual teachers on each of the items categorized under a Principle. In order to
provide detailed descriptions for individual teachers pedagogy and teaching behaviours in a
concise manner, the data is organized according to each of the seven Principles.
International Electronic Journal of Mathematics Education / Vol.4 No.1, February 2009
12
Table 5. Summary of Teacher s Proficiency using the Observation Protocol
Teacher Practice/Indicator Teacher A Teacher B Teacher C Teacher D
Angela Betty Carol Diane
Equity
1. Demonstrates TESA (teacher expectations student achievement) X X X X
Behaviors.
2. Invites learner questions/comments. X X X X
3. Asks higher level questions to all learners. X X X
4. Provides adequate think time. X X X X
5. Differentiates instruction; Provides individual/small group instruction X
when needed.
6. Utilizes resources during instruction to address ability levels. X X
7. Utilizes effective reinforcement techniques. X X X X
8. Supports critical discourse among learners. X
X X X X
Curriculum
1. Demonstrates knowledge of state mandated standards.
2. Follows mandated state curriculum, and adds personal creativity. X X X
3. Demonstrates content knowledge. X X X X
Teaching
1. Projects enthusiasm for the material. X X X X
2. Appropriate selection and use of materials. X X X
3. Content is well structured, sequenced, and presented in a coherent manner. X X X X
4. Learning activities selected are diverse and enhance student understanding X X X
of content material.
5. Instructional groups are utilized and are productive. X
6. Draws on an extensive repertoire of instructional skills. X
7. Problem-based learning and reasoning is emphasized. X X
8. Instruction is modality based. X X
9. Connects lesson with other disciplines. X X X
10. Activities require student thinking. X X X
11. Utilizes manipulatives. X
12. Incorporates the Process Standards during instruction. X X
Learning
1. Checks for student understanding throughout lesson. X X X X
2. Learning with understanding is emphasized. X X
3. Connects new learning to prior learning. X
4. Connects new learning to real world experiences. X X X X
5. Adjustments are made to encourage student engagement, and to assist X X
students in overcoming common error patterns.
6. Students actively participate in the learning process. X X X
7. All students are on task. X X
8. Emphasizes retention and transfer of new learning. X
9. Activities and/or assignments enhance student learning. X X X
10. Opportunities for student reflection are provided. X
Assessment
1. Informal assessments are utilized (e.g. observations, conferences, and X X X
interviews) to make adjustments with instructional practices and student
learning.
2. Formal assessments are utilized to make adjustments with instructional X
practices and student learning.
3. Uses multiple assessment strategies. X X X
4. Provides useful feedback to assist learners in understanding content X X X X
knowledge.
5. Provides opportunities for student self-assessment.
Technology
1. Appropriate selection of technology. X X
2. Appropriate use of technology. X X
Berry, McKinney and Jackson 13
The Equity Principle
In an equitable mathematics classroom, teachers must have a deep understanding of
diversity, mathematical content knowledge, and diagnostic skills to assist students. Further,
teachers must also demonstrate those behaviors that promote high-expectations. Two teachers,
Betty and Diane did meet proficiency for the Equity Principle and two teachers, Angela and
Carol, did not. Betty and Diane each created such a supportive mathematics learning environment
that their students appeared to be comfortable interacting with the teacher and with one another.
These teachers encouraged student-teacher and student-student communication and positively
reinforced students for sharing their thinking and thought processes. This appeared to build a
sense of self-worth for the students in these classrooms. Both Betty and Diane demonstrated
effective questioning strategies but in different ways. Betty s questioning was posed primarily
during whole class instruction whereas Diane posed questions to individuals, small groups, and
the whole class. Diane asked questions requiring high levels thinking, and she delved and probed
when a student could not answer. For example, Diane asked questions such as Why can we do
this? What happens when we do this? Can you think of a different way to do this? These
types of questions along with the use of small group and whole class instruction were indicators
that Diane appeared to value higher-level thinking, thinking strategies, and differentiated
instruction. Furthermore, Diane sparked the students interest and enthusiasm for learning
because she demonstrated those behaviors that communicate high expectations.
Angela and Carol did not demonstrate the descriptors that support the Equity Principle.
Neither teacher demonstrated those behaviors and pedagogical practices that communicate high
expectations, nor was there evidence of supporting critical discourse among the students. One
teacher, Angela, attempted to differentiate instruction although it appeared that little planning and
thought went into the process. For example, her instruction appeared to be disorganized; she tried
to address the different readiness levels among her students, but was unable to differentiate
appropriately. Such disorganization led to confusion and misunderstandings during her
instruction. Students who did not easily understand the concept were left alone for an extended
period of time, while she tended to the students who were able to grasp the material. When the
teacher was able to attend to those students who did not understand the material under study, the
other students finished their assignments and began to disrupt the class with talking and other
classroom management issues. In addition, Angela tended to ask questions that were shallow and
required little elaboration or thinking. Such questioning practices did not allow for much
discourse among the students. Sample questions included, What is the answer to problem three?
International Electronic Journal of Mathematics Education / Vol.4 No.1, February 2009
14
and Who knows how to do this problem? Carol s lessons appeared to be very teacher directed
with little input or acknowledgement of her students needs. Carol primarily used a one size fits
all model of whole class instruction.
The Curriculum Principle
Although the participating district utilizes a state mandated curriculum and pacing guide
that complemented the mathematics textbook, it is up to the teacher to develop a creative and
interesting way to integrate mathematical ideas with real world experiences. All of the teachers
demonstrated proficiency of the Curriculum Principle. The teachers followed the state mandated
curriculum and used appropriate materials. There was evidence in their lesson plans and overall
teaching that they were working towards the intended state standards. All of the teachers appeared
to use the pacing guide appropriately. While all the teachers demonstrated proficiency for the
Curriculum Principle, Angela and Carol did not infuse creativity within their lesson. That is, these
teachers worked towards meeting the standards and objectives of their lesson, but demonstrated
little effort towards making the lesson authentic and interconnected. This is evidenced by the
teachers demonstrating facts and procedures and not helping students make connections among
them. Essentially, the mathematics lessons were taught as isolated facts independent of real world
experiences.
The Teaching Principle
The Teaching Principle requires teachers to have a sophisticated understanding of how
children learn mathematics and best practices for teaching mathematics, while maintaining an
active, challenging, and nurturing environment (NCTM, 2000). Here, teachers need to address the
Process Standards as identified by NCTM (2000) by incorporating problem solving, mathematical
reasoning, communicating understandings, connecting mathematical concepts to one another and
to the real world, and representing mathematics in multiple ways. The flexible pedagogical style
of Diane supported the Teaching Principle. Diane s teaching methodology included high levels of
teacher-student and student-student interactions. Students were asked to explain their thinking to
one another in pairs and share their thinking in whole class situations. Diane demonstrated
multiple representations of mathematics by using hands-on and virtual manipulatives. The
manipulatives allowed students to demonstrate their thinking through hands-on manipulation as
well as through paper and pencil. This was evidenced by the ways Diane allowed students to use
Berry, McKinney and Jackson 15
drawings and symbols to support their thinking. For example, students had to determine which
fraction was greater, or . Students were able to use pattern blocks and drawings to
demonstrate and explain their thinking. Such teaching permitted for multiple representations of
mathematics, use of different learning modalities, allowed students to see connections beyond a
traditional algorithm, and expand students problem solving repertoire.
Angela, Betty, and Carol had trouble in addressing the Teaching Principle throughout
their instruction. Interestingly, none of these teachers were observed using hands-on
manipulatives to support their instruction. It appeared that classroom management issues
influenced these teachers instruction. For example, Carol had difficulty managing talkative
students in her classroom, and as a result, she had to repeat instructions and procedures. This led
to her re-working several problems on an overhead projector and using worksheets to manage
behaviors. These pedagogical tactics appeared to be ineffective because many students expressed
difficulty in understanding the intended content for several lessons. Students were not encouraged
to engage in mathematical discourse, nor were conceptual understandings encouraged.
Mathematical representations of the content knowledge were not provided by the teacher. Rote
memorization of the procedure was the primary pedagogical strategy Angela utilized.
Unfortunately, this style did not meet the needs of most of her students. Angela and Betty also
demonstrated similar practices.
The Learning Principle
Learning mathematics with understanding is directly related to the type of experiences
students have with mathematics. There is a close connection between the Teaching Principle and
the Learning Principle. The types of experiences that teachers provide for students affect their
learning of mathematics. Diane demonstrated proficiency with the Learning Principle. She
checked students understanding through questioning, circumventing erroneous conceptions
through use of manipulatives and other representations, and encouraged student participation
through discussions and sharing. Diane s use of manipulatives provided focal points for
discussions and demonstrations of understandings. Angela, Betty, and Carol did not meet the
target for proficiency for the Learning Principle. Unfortunately, because these teachers did not
make connections to prior learning and/or experiences, it appeared that students were memorizing
concepts, rules, and procedures. However, it appeared that Carol was approaching proficiency for
the Teaching and Learning Principles because she only fell short by two indicators for each.
International Electronic Journal of Mathematics Education / Vol.4 No.1, February 2009
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The Assessment Principle
The Assessment Principle suggests that teachers use multiple means of assessment and
involve students in the assessment process. Varied assessments, such as interviews, journals, and
authentic products can provide teachers with important evidence as to the depth of mathematics
understanding of students (NCTM, 2000; Sutton & Krueger, 2002). Diane used feedback from
students to alter her instruction and as a means to improve their understanding of the concept
presented. In addition, Diane used effective questioning techniques, traditional written
assessments, and journals to monitor students mathematics understanding. Angela, Betty, and
Carol fell short of the target for proficiency of the Assessment Principle. Although Angela and
Betty did not meet the acceptable benchmark, they evaluated students work to inform their
teaching and gauge their student s understanding. Carol only answered student questions as a
means to provide them with feedback, but did not use these questions and responses to adjust her
instructional practices. Carol also did not use assessment to monitor student s progress, make
instructional decisions, or actively involve them in the assessment process. None of the teachers
met proficiency for the descriptor provides opportunities for student self-assessment. This is a
concern because self-assessment helps students build metacognition.
The Technology Principle
Instructional technology can benefit students in a variety of ways: increased accuracy,
speed, interactive modeling of abstract concepts, and data collection and interpretation to name a
few (Sutton & Krueger, 2002). Only two out of the four teachers utilized technology in any of
their lessons during these observations. Although the school housed a technology rich library, it
appeared that the teachers did not take full advantage of the resources available. Betty and Diane
utilized technology differently. Betty allowed students to use calculators to check their work.
Diane also utilized calculators, but she encouraged her students to explore different mathematical
concepts via the National Library of Virtual Manipulatives. For example, students used virtual
manipulatives to explore fraction concepts such as adding and subtracting fractions, comparing
fractions, and ordering fractions. Diane used virtual manipulatives to deepen students
understanding and to complement the concrete manipulatives. The researchers observed students
using virtual manipulative to move beyond the intended objectives of the lesson to explore other
relationships.
Berry, McKinney and Jackson 17
Discussion and Conclusions
This study focused on how four novice teachers with limited work experience in high
poverty schools infused the NCTM Principles within their mathematics pedagogy.
The results suggest that when the NCTM Principles are addressed through the pedagogy
and methodology of teachers, students are provided with a more mathematics rich learning
environment that allow opportunities for them to examine their mathematical thinking processes,
engage in various types of discourse and participate in hands on and authentic activities. The
results also highlight the close correspondence between teachers implementation of Haberman s
Acts of Good Teaching (2005, 1991) and the NCTM Principles. However, when teachers don t
attend to the NCTM Principles, it appears they support a pedagogy of poverty as identified by
Haberman (2005, 1991).
Although the teachers under study varied in the degree to which each of the Principles
were addressed in their mathematics instruction, all were judged proficient for the Curriculum
Principle. A plausible explanation is that the participating school district provides an intense
teacher professional development prior to the beginning of school that focuses on understanding
and following the curriculum, the pacing guide, and the depth to which a standard must be taught
and mastered by the students. Consequently, if a teacher simply follows expectations, they are
aligned with the Curriculum Principle. However, as noted, there were differences in the creativity
that characterized the lessons. This suggests that an improved observation instrument may be
more sensitive to these variations.
The degree to which each of the teaching indicators categorized according to the
remaining five Principles (Equity, Teaching, Learning, Assessment and Technology) were met as
well as personal teaching methodologies illuminate specific strengths and weaknesses of the
participating teachers. For example, one teacher, Diane, appeared to provide her students with a
more enriched mathematics experience than the other teachers by implementing and infusing the
Principles. Diane sought ways to maximize her students mathematical opportunities. She
appeared to be pedagogically responsive toward her students and demonstrated many of the best
practices advocated by the professional literature and NCTM (2000) such as differentiating
instruction, providing real-world problems, and authentic learning opportunities and incorporating
multiple representations, problem solving, cooperative group work and manipulatives into her
instruction. These strategies are but a few of the instructional practices that are effective in
fostering mathematics success among students in urban schools (Boaler, 2006; Balfanz, Mac Iver,
& Byrnes 2006; NCTM, 1999; Smith & Geller 2004). Additionally, these practices substantiates
International Electronic Journal of Mathematics Education / Vol.4 No.1, February 2009
18
Haberman s model of Good Teaching (2005, 1991). In contrast, the other three teachers
(Angela, Betty, Carol) were judged to be less proficient in demonstrating these principles in their
classrooms. Gimbert, Bol and Wallace (2007) report similar findings, suggesting minimal use of
NCTM standards among novice teachers in urban schools. Moreover, current findings appear to
indicate that these teachers pedagogical style can be characterized as pedagogy of poverty
(Haberman, 2005, 1991). That is, the mathematics experiences provided to the students in these
three classroom do little to prepare students for rigorous mathematics that require them to be
problem-posers, problem-solvers, and doers of mathematics. Their pedagogical styles were
primarily whole class instruction that focused on acquiring facts and procedures; little emphasis
was put on conceptual understanding of ideas. However, it appeared that classroom management
was a key issue and dictated the mathematics instruction provided. It is plausible to consider that
these teachers were so concerned about classroom management that they did not consider using
hands-on manipulatives. However, the effective use of hands-on manipulatives can promote
positive classroom behaviors.
The findings have immediate implications f
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