Course Information for
Math 320
Mathematics for Elementary School Teachers
Fall 2000 (16220)
MWF 11:30am-12:20pm, CW 144
by Zongzhu Lin
(Office: CW 232, 2-0573)
Text: Mathematics for Elementary School Teachers, A Contemporary Approach, 4th Edition by Gary L. Musser and William F. Burger (available at K-State Union Book Store).
Class Attendance: Students are required to attend class and participate in classroom activities on a regular basis. Student participation in classroom activities is an important part of the learning process. Students' attendance will be checked in a random manner.
Course Objectives: First of all, this course is a content area course in teacher education. Students will have a course in the College of Education concentrating on methods of teaching mathematics. Thus this course will concentrate on teaching the teachers to understand mathematical materials although it will be emphasized throughout the semester how the material should be taught in elementary schools. Students are strongly encouraged to review the Kansas Teacher Licensure Standards (KTLS), NCATE Standards, and Kansas Mathematics Curricular Standards for K-12 (KMCS) and Kansas teacher certification standards for Late Childhood through Early Adolescent License Level (LCEALL) (See the attachments).
As indicated in the standards, it is important that future teachers not only understand the basic concepts of the content areas they are going to teach, but also be able to explain to their students, in different ways, the concepts and be able to relate concepts to students' experience to facilitate students' learning experience and to stimulate students' problem solving ability.
In this course I will make efforts to:
A. Classroom Participation. Since each of the concepts covered in the course have been seen by students earlier and students are preparing themselves to teach, students should practice their reading skills by reading each section of the textbook before class. While reading the textbook, students should keep in mind the follow questions and write a reading card to be turned in.
B. Homework. Working through problems will aid in further understanding of the concepts and materials. Homework will be assigned periodically. Each assignment will consist of two sets of problems. One set is homework, which students must do completely and turn in by the due date to be graded. Another set consists of practice problems, which all students should try to do, though it is not required they they be turned in and graded. However, exams will cover these practice problems.
C. Studying Group. Discussions. It is an important part of the teaching experience that teachers work in groups to prepare teachering materials and to discuss teaching strategies. Periodically, there will be discussion of topics assigned to discussion groups. Each member of the group should actively participate. Groups will be randomly asked to present their findings in class. A random member will be asked to represent the group's results. The group's grade will be determined by the presentation of the randomly chosen presenter. It is important that everyone in the group be able to present the group's findings.
D. Review Cards and Exams. Periodically reviewing and reorganizing learned material is just like harvesting the crops from the field after many months of hard work. Exams provide such an opportunity to review and master the materials. Students will be required to write their own review sheets of limited size, which should be turned in right before the exam. Students' review sheets will be graded based on how they organize the materials and choose major concepts.
E. Project and Report. Each student should try to find a child of at most seven year old to explain to the child a certain concept. They could plan to work with a daycare center or as a school helper, and then write a report outlining
| Intended Student Outcome | Relative Standards | Student Learning Experience (guided by the instructor) | Assessment Methods |
| Ch. 1, Introduction to Problem Solving: strategy
and approach
-----3 classes |
NCATE -2d
KMCS 1,2,3 KTLS P.2, 3, G4 LCEALL 6, 7,9 |
(1). Reading text, analyzing the materials
(2). Homework, (3). Practice problems, |
(1). Turn in homework to be graded
(2). Practice problems will appear in Exam. |
| Ch. 2, Sets, Whole Numbers, and Numeration
----3 classes (Instructional emphasis: Set operations, place values, numbers in other basis--base five) |
NCATE -2d
KMCS 1,2 KTLS P.2, 3, G4 LCEALL 6,9 |
(1). Students read on sections on number
systems and place values in the decimals.
(2). Find examples of sets and operations from the daily life. (3). Find examples of recording quantities other than numerals used now and practice with different numeral systems in other cultures. (4). Work on place values and base five number systems (5). Work to find relations and functions around daily life and indicate their properties. (6). Group project to workout model to that uses base eight system. |
(1). Turn in reading cards
(2). Turn in home work to be graded. (3). Turn in chapter review cards, (4). Write a short program to explain their experience work with base eight number and make a plan how to teach place value to students who know nothing about base ten system. |
| Ch. 3, Whole Numbers: Operations and
Properties
----3 classes (Instructional emphasis: order of operation, division algorithm and exponential) |
NCATE -2d
KMCS 1,2 KTLS P.2, 3, G4 LCEALL 6,9 |
(1). Read the text book and summarize
the the materials in particular in basic operations of whole numbers.
(2). Build models for addition, subtraction, multiplication, and division (3). Work out single digit addition and subtraction in base five and base eight systems and multiplication tables. (4). Work through real world problems to distinguish whether one of the four operations occur. (5). Work models to properties of the four operations and list all possible mis-conceptions and common mistakes students could make. (6). Drill on properties of order and exponents. |
(1). Turn in reading cards
(2). Turn homework to be graded, (3). Turn the chapter review cards. (4). Write paragraph using your own experience to explain why understanding the meaning of the operations are more important than just computing the number. |
| Ch. 4, Whole Number Computation: Mental,
Electronic, and Written
-----3 classes (Instructional focus: operational algorithm in base five to understand the algorithm in basis ten.) |
NCATE -2d
KMCS 1,2 KTLS P.2, 3, G4 LCEALL 6, 9 |
(1). Review the
written algorithms for addition, subtraction, multiplication and divisions.
(2). Explore other algorithms and understand why the result is just the expected one. (3). Group project workout algorithms for addition, subtraction, multiplication, and division algorithms in basis eight and compare them with the base ten system. |
(1). Turn in reading cards,
(2). Turn in homework to be graded, (3). Turn in chapter review cards. (4). Write a report using your experience working developing algorithms to anticipate what might be difficulty to elementary students in ten systems and indicate how important to understand place values in order to use the algorithms correctly. |
| Ch. 5, Number Theory----3 classes
¡¡ |
NCATE -2d
KMCS 1,2 KTLS P.2, 3, G4 LCEALL 6, 9 |
(1). Drill on factors and multiples,
divisibility, prime numbers.
(2). Test for prime numbers up to 400. (3). Drill on factor tree and prime factorizations. (4). Counting factors, greatest common factors and least common multiples. (5). Explore varieties of algorithms and understand why algorithms work. (6). Group project: play with game "magic 9" |
(1). Turn in homework,
(2). Individual report on the "game magic 9" what was the mathematical reason for one always to get 9 at the end? (3). Turn in chapter review cards. |
| Ch. 6, Fractions
---4 classes (Instructional Focus: understanding, simplifying, and application of fractions. Algorithms of fractions) |
NCATE -2d
KMCS 1,2 KTLS P.2, 3, G4 LCEALL 6, 9 |
(1). Develop
models for fractions and their equivalence
(2). Develop models for fraction operations addition and subtraction with unlike denominators. (3). Develop models for multiplication and division (take daily life examples such operations appear) (4). Drill on basic skills in fraction manipulation and discover common mistakes students make. (5). Grade other students chapter exams. |
(1). Turn in reading cards
(2). Turn in homework (2). Turn in Chapter review cards, (3). Chapter exams (4). Turn graded chapter exams of other students |
| Ch. 7. Decimals, Ratio and Proportion, and
Percent
--- 4 classes |
NCATE -2d
KMCS 1,2 KTLS P.2, 3, G4 LCEALL 6, 9 |
(1) .Understand the decimal system
and place values by working with an example of "decimal system" in base
eight.
(2). Practice fraction and decimal conversion algorithms, rational numbers and irrational numbers. Construct at least 100 different irrational number using decimal systems. (3). Decimal operations, adding and multiplying from left to right (for infinite decimals) (4) .Understand decimal multiplication and why one has to count of total decimal places in multiplication or move the decimal points in division (5). Ratio and proportion in real world and problem solving. work on problems (6). Percentage and interest rate. Group project: Investing 10,000 for college in 10 years, what is the best choice (with 20% tax on interest at the end of each year). |
(1) Turn in homework,
(2) Turn in group projects report. (3) Turn chapter review cards |
| Ch. 8, Integers--2-classes
¡¡ |
NCATE -2d
KMCS 1,2 KTLS P.2, 3, G4 LCEALL 6, 9 |
(1). Find models for negative numbers.
(2). Review properties of integers and operations of integers. (3). Find models for each operations (4). Exploring number lines and ordering integers. negative exponents (5). Project: try to teach a child the concept of negative numbers. |
(1). Turn in
homework
(2). Turn in chapter review card. (3). Project report. |
| Ch. 9, Rational Numbers and Real Numbers,
with introduction to algebra
-- 3 classes |
NCATE -2d
KMCS 1,2 KTLS P.2, 3, G4 LCEALL 6,9 |
(1). Summarize
number systems and basic properties
(2). Roots and and irrational numbers. (3). Understand infinite decimals |
(1) Turns reading cards,
(2). Turns homework (3). Turn in Chapter review cards. |
| Ch 12 Geometric Shapes
---5 classes (Instruction focus: Rigorous definitions. Angles, lines, planes, congruent shapes, parallel, orthogonality) |
NCATE -2d
KMCS 3 KTLS P.2, 3, G4 LCEALL 7 |
(1). Reading of the text books and list all concepts
of geometric figures
(2). Do a paper cutting project illustrating the proof of Pythagorean theorem (3). Project: find a at least 5 patterns of each geometric figure from daily life (other those appeared in the text book) (3) Homework practice |
(1). Turn in reading cards on definition of shapes.
(2). Turn in projects. (3). Turn in homework. |
| Ch 13 Measurements
---4 classes (instruction focus: Metric units. Derivations of the formulas for areas, lengths, volumes. Understanding pi.) |
NCATE -2d
KMCS 3 KTLS P.2, 3, G4 LCEALL 7 |
(1). Read and complete reading cards on units
(Metric and English), and their conversion formulae.
(2). Complete a table listing the formulae for lengths, areas, and volumes (3) .Group project. Package design contest. (4). Homework practice. |
(1). Turn in reading cards.
(2). Turn in the project and presentation group project. (3). Turn in the table of formulas. (4). Turn homework. |
| ¡¡37 class lecture time.
4 group project presentation times 4 class time used for review and exams in class. |
Exam review cards (to sustain the knowledge and making connections). Students will be allowed to bring a cheat sheet of specifically designed paper for the final exam. | mid-term Exams and Final exams. | |
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Course Grade Computation
Each portion of the contribution will be converted to percentage average before it is used for overall computation using the above mentioned weighting system.
To convert to letter grades for the course
from Overall Score:
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Math 320 Homework Assignments
Homework is due in the homework box
at 5:00pm on the due day
| HW No. | Sections | HW (Homework Problems) (B) | EX (Practice Problems) (A) | Due Date | Ch Rev. Due |
| #1 | 1.1
1.2 |
B: 2, 4, 7, 13
B: 4, 11, 14, 17 |
A: 2, 6, 7, 15
A: 1, 4, 6, 14 |
Wed. 8/30 | Wed. 9/8 |
| #2 | 2.1
2.2 2.3 2.4 |
B: 6, 9 , 11, 12, 29, 32
B: 1, 8, 12, 14 B: 2, 5, 6, 14 B: |
A: 6, 9, 14, 29, 33
A: 2, 4, 11 A: 2, 6, 10, 11 A: |
M. 9/11 | M. 9/18 |
| #3 | 3.1
3.2 3.3 |
B: 2,3,4,5,11,12
B: 1,2,3,7, 10, 13, 14, 22 B: 1, 2, 3, 5(c,d), 7(e,f), 11, 13 |
A: 2, 3,(c, e, h, j), 4, 11, 12
A: 1, 2, 3, 4, 9, 12, 14, 17 A: 1, 2, 3, 5(c, e), 7(e, f), 13 |
Wed. 9/20 | M. 9/25 |
| #4 | 4.1
4.2 4.3 |
B: 1 (c,d), 3(b,d), 4(a,c), 6(c), 25, 40
B: 3, 4, 5, 11(a), 14(b), 22, 30 B: 1, 3, 9(c), 10(b), 18 |
A: 1(a,b), 2(c,d), 3(a,c), 13, 15
A: 4, 5, 10,(c), 19, 22, 30 A: 1, 3, 5, 9 |
Fri. 9/29 | M. 10/2 |
| #5 | 5.1
5.2 |
B:1, 2(d), 3(f), 4(a,c,e,g,i), 5(b,d), 6, 8(b), 9,10, 11(c)
B: 1(c), 2, 3, 4(a), 6(f), 7(f), 11(c), 15, 16, |
A: 1, 2, 3, 4, 5, 6, 7(a), 8(b), 9, 10, 12(a), 13
A: 1, 2, 3, 4, 6, 7, 13 |
Wed. 10/4 | M. 10/9 |
| #6 | 6.1
6.2 6.3 |
B: 1,2,3,4,5,6,8(a),9(a),12,13,16
B: 1,2(c,d), 3(c), 4(b), 5(iv), 6(d), 7(c), 9(b), 15, 20 1(b), 2,3,4,5,6(a),7(d,f), 8(a),, 9(d), 10, 24, 26, 27 |
A: 2, 3, 4, 5, 6, 12, 13, 16, 18, 20
A: 1, 2(d,e), 4(b, d), 4(c), 5(e), 6(b), 11, 15 A: 1, 2, 3, 4, 5, 6, 7(c,d,i,j), 8(a,f), 10, 14, 19, 30 |
Wed. 10/11 | M. 10/16 |
| #7 | 7.1
7.2 7.3 7.4 |
B: 1a, 2c, 3b, 4b, 5ac, 6b, 11e, 12d, 17c, 22
B: 1, 2, 5b, 6bd, 7, 10, 11, 12bd, 20a, 34 B: B: |
A: 1c, 2c, 4b, 5bc, 6cd, 11e, 12d, 17d
A: 1, 2, 5b, 6, 7a, 19, 11, 12, 14, 22 A: A: |
Fri. Nov/3 | |
| #8 | 8.1
8.2 |
||||
| #9 | 9.1
9.2 9.3 |
||||
| #10 | 12.1
12.2 12.3 12.4 12.5 |
||||
| #11 | 13.1
13.2 13.3 13.4 |
Midterm Exam Wed. Oct 18. in Class
Group Project I: Due Monday, Oct. 27
Students should form groups of size from 2-4 to work together and each group should write a report include the following:Group Project II. Magic 9. Due on Monday Nov. 17(1). Write down the meaning of base eight numbers with an emphasis in place values and an instruction on how to convert numbers from base ten to base eight and vice verse.(2). Write down the addition table in base eight and write an instruction supported with examples show how to do addition using standard algorithm of multi-digit numbers as as one does in base ten. The instruction should be able to be understood by third graders.
(3). Use the additon table, write an instruction how to perform simple subtraction and multidigit number subtractions using the standard algorithm support with examples.
(4). Do the same as in (2) but for multiplication.
(5). Do the same as in (3) but for division.
(1). Design the game for your students to play.
(2). Write an argument using the divisibility test in Chapter 5 and
the expanded notitions of numbers to explain to your students why the answer
is always 9.
(3). In your report. you need to state how you are going to play this
game with your students and How do you plan to convince your students that
your argument in they understand.
Individula Project: Due on Friday Dec. 1
Try to work a child of age at most 8 to teach the child the concept
of negative numbers. Write a report of your project. Your report should
contain the following:
Kansas Teacher Licensure Standards
PROFESSIONAL EDUCATION OUTCOMES
......
OUTCOME #2 The educator demonstrates
the ability to integrate curriculum across and within
subject areas in such a way as to facilitate the students'
abilities to understand relationships
within the content fields.
Knowledge
1.The educator can relate disciplinary knowledge to other
subject areas and to student life
experiences.
Disposition
1.The educator demonstrates enthusiasm for each
discipline he or she teaches and actively promotes
connections between classroom
subject matter and everyday life.
2.The educator recognizes contributions of other
disciplines and assists students in seeing
relationships and connections
among disciplines.
3.The educator values planning as a collegial
activity.
4.The educator recognizes the value of students¡¯
prior learning and experiences.
Performance
1.The educator creates interdisciplinary learning
experiences that allow students to integrate
knowledge, skills, and methods
of inquiry from several subject areas.
2.The educator effectively uses multiple representations
and explanations to help students construct
new knowledge by building on
prior student understandings.
3.As an individual and a member of a team, the
educator selects and creates integrated learning
experiences that are appropriate
for curriculum goals, relevant to learners, and based upon
principles of effective instruction.
4.The educator participates in collegial activities
designed to integrate curricula across subject areas.
OUTCOME #3 The educator demonstrates
the central concepts, tools of inquiry, and structures
of each discipline he or she teaches and can create
opportunities, including integrated learning
experiences, that make these aspects of subject matter
meaningful for students.
Knowledge
(detailed standards for discipline-based knowledge are
included in the content endorsement
outcomes.)
1.The educator understands major concepts, assumptions,
debates, processes of inquiry, and ways of
knowing that are central to
the discipline she or he teaches.
2.The educator understands that students¡¯ conceptual
frameworks and their misconceptions for an
area of knowledge can influence
their learning.
Disposition
1.The educator realizes that subject matter knowledge
is not a fixed body of facts but is complex and
ever-evolving. The teacher seeks
to keep abreast of new ideas and understandings in professional
education and subject matter.
2.The educator appreciates that students learn
in different ways and guides students in constructing
their own knowledge.
3.The educator is committed to continual learning
and engages in professional discourse about
subject matter knowledge and
student¡¯s learning of the discipline.
Performance
1.The educator represents and uses differing viewpoints,
theories, ¡°ways of knowing,¡± and methods
of inquiry in his or her teaching
of subject matter concepts.
2.The educator evaluates teaching resources and
curriculum materials for their comprehensiveness,
accuracy, and usefulness for
representing particular ideas and concepts.
3.The educator engages students in constructing
knowledge and testing hypotheses according to the
methods of inquiry and standards
of evidence used in the discipline.
4.The educator develops or adapts and uses curricula
that encourage students to see, question, and
interpret ideas from diverse
perspectives.
NCATE Standard
(National Councel for Accreditation of Teacher Education)
....
2d. Mathematics--Candidates know, understand, and
use the major concepts, procedures, and reasoning processes of mathematics
that define number systems and number sense, geometry, measurement, statistics
and probability, and algebra in order to foster student understanding and
use of patterns, quantities, and spatial relationships that can represent
phenomena, solve problems, and manage data;
Supporting explanation
Candidates are able to teach elementary students to explore, conjecture, and reason logically using various methods of proof; to solve non-routine problems; to communicate about and through mathematics by writing and orally using everyday language and mathematical language, including symbols; to represent mathematical situations and relationships; and to connect ideas within mathematics and between mathematics and other intellectual activity. They help students understand and use measurement systems (including time, money,temperature, two and three dimensional objects using non-standard and standard customary and metric units); explore pre-numeration concepts, whole numbers, fractions, decimals, percents and their relationships; apply the four basic operations (addition, subtraction, multiplication, and division) with symbols and variables to solve problems and to model, explain, and develop computational algorithms; use geometric concepts and relationships to describe and model mathematical ideas and real-world constructs; as well as formulate questions, and collect, organize, represent, analyze, and interpret data by use of tables, graphs, and charts. They also help elementary students identify and apply number sequences and proportional reasoning, predict outcomes and conduct experiments to test predictions in real-world situations; compute fluently; make estimations and check the reasonableness of results; select and use appropriate problem-solving tools, including mental arithmetic, pencil-and-paper computation, a variety of manipulatives and visual materials, calculators, computers, electronic information resources, and a variety of other appropriate technologies to support the learning of mathematics. Candidates know and are able to help students understand the history of mathematics and contributions of diverse cultures to that history. They know what mathematical preconceptions, misconceptions, and error patterns to look for in elementary student work as a basis to improve understanding and construct appropriate learning experiences and assessments.
Source documents for mathematics
Professional Standards for Teaching Mathematics,
National Council of Teachers of Mathematics, 1991
Curriculum and Evaluation Standards for School Mathematics,
NCTM, 1989
Principles and Standards 2000 for School Mathematics,
NCTM, (forthcoming, April 2000)
Assessment Standards for School Mathematics, NCTM,
1995
NCATE Program Standards, "Programs for Initial Preparation
of Teachers of Mathematics, prepared by the National Council of Teachers
of Mathematics, approved by the National Council for Accreditation of Teacher
Education, 1998
Kansas Teacher Standards at Late Childhood and Early Adolescent License Level
OUTCOME #6 The teacher of late
childhood through early adolescent demonstrates the need for, uses of,
and
relationships in number systems
and number theory from both an abstract and concrete perspective and are
able to
identify real world applications.
Knowledge
The teacher understands:
1.number sense, including
a sense of magnitude, mental mathematics, estimation, place value, multiple
representations of
numbers, convergence,
infinity, and a sense of the reasonableness of results.
2.properties of numbers,
including place value, primes, factors, multiples, inverses, and the extension
of the these concepts
throughout mathematics.
3.the use of numbers to
quantify and describe phenomena such as time, temperature, money, and trends.
4.number systems, their
properties, operations, ordering, and relations, including the natural
numbers, whole numbers,
integers, rational
numbers, irrational numbers, real numbers, and complex numbers.
5.computational procedures,
including common and uncommon algorithms; mental strategies; use of manipulatives
and
other representations;
paper and pencil; and technology and the role of each.
6.the use of fractions,
decimals, ratio, proportion, and percent to represent and solve problem
situations within and outside
of mathematics.
Disposition
The teacher:
1.demonstrates a positive
attitude about number systems and number theory.
2.demonstrates confidence
in his/her ability to apply number concepts.
3.demonstrates enthusiasm
for the teaching of number concepts.
4.demonstrates an understanding
of the role of number systems as a part of the coherent structure of mathematics.
5.values number systems
and their applications.
6.promotes students' confidence,
flexibility, perseverance, curiosity, and inventiveness in using number
systems through
the selection
of appropriate tasks and by engaging students in mathematical discourse.
Performance
The teacher will:
1. investigate, formulate, and solve problems using different strategies, verify and interpret results, and generalize solutions.
2. explore mathematical questions
and conjectures, formulate counterexamples, construct and evaluate arguments
using
intuitive, informal exploration
and proof.
3. express mathematical ideas orally,
in writing, and visually using the power of mathematical language, notation,
and
symbolism.
4. demonstrate the interconnectedness
of the concepts and procedures of mathematics and makes connections among
other
disciplines and real world mathematics.
5. encourage students to explore,
select and use appropriate tools from technology and/or concrete materials
to model
mathematical ideas.
6. apply knowledge of the historical
bases of mathematics and the problems societies faced that gave rise to
mathematical
systems, acknowledging the contributions
made by individuals, of various cultures in ancient and modern mathematics.
OUTCOME #7 The teacher of late
childhood through early adolescent demonstrates the need for, uses of,
and
relationships in geometry, measurement,
and spatial sense from both an abstract and concrete perspective and are
able
to identify real world applications.
Knowledge
1. Shapes and the ways in which
they can be derived and described in terms of dimension, direction, orientation,
similarity,
congruence, perspective, and the
relationships among these properties.
2. Spatial sense, symmetry, and
the ways in which shapes can be visualized, combined, subdivided, and changed
to illustrate
concepts, properties, and relationships.
3. Use of both oral and written
communication to describe relationships among geometric concepts including
symmetry,
congruence, and similarity.
4. Spatial reasoning and the use of geometric models to represent, visualize, and solve real-world and mathematical problems.
5. Motion and the ways in which
rotation, reflection, and translation of shapes can illustrate concepts,
properties, and
relationships.
6. Analysis of two- and three- dimensional figures including tessellations, polygons, polyhedra, and curved shapes.
7. Attributes of shapes and objects
that can be measured, including length, area, volume, capacity, size of
angles, weight, and
mass.
8. The structure of systems of measurement,
including the development and use of measurement systems and the relationships
within and across different systems.
9. Estimation and/or measurement
of a quantity in metric or customary units including but not limited to
time, money, length,
angle, area, volume, mass, capacity,
and temperature using the appropriate measuring instrument.
10. Indirect measurement, and its
uses, including developing formulas and procedures for determining measures
to solve
problems.
11. Formal and informal argument,
including the processes of: making assumptions, formulating, testing, and
reformulating
conjectures; and justifying arguments
based on geometric figures.
Disposition
The teacher:
1.demonstrates a positive
attitude about geometry.
2.demonstrates confidence
in his/her ability in geometry.
3.demonstrates enthusiasm
for the teaching of geometry.
4.demonstrates an understanding
of the role of geometry as a part of the coherent structure of mathematics.
5.values geometry as a mathematical
tool and its application in other disciplines and in society.
6.promotes students' confidence,
flexibility, perseverance, curiosity, and inventiveness in doing geometry
through the use
of appropriate
tasks and by engaging students in mathematical discourse.
Performance
The teacher will:
1. investigate, formulate, and solve problems using different strategies, verify and interpret results, and generalize solutions.
2. explore mathematical questions
and conjectures, formulate counterexamples, construct and evaluate arguments
using
intuitive, and informal exploration.
3. express mathematical ideas orally,
in writing, and visually using the power of mathematical language, notation,
and
symbolism.
4. demonstrate the interconnectedness
of the concepts and procedures of mathematics and makes connections among
other
disciplines and real world mathematics.
5. encourage students to explore,
select and use appropriate tools from technology and/or concrete materials
to model
mathematical ideas.
6. apply knowledge of the historical
bases of mathematics and the problems societies faced that gave rise to
mathematical
systems, acknowledging the contributions
made by individuals, of various cultures in ancient and modern mathematics.
OUTCOME #8 The teacher of late childhood through early
adolescent demonstrates the need for, uses of, and
relationships in statistics and probability from both
an abstract and concrete perspective and are able to identify real
world applications. The use of appropriate technology
is essential.
Knowledge
The teacher understands:
1. Investigations using data; including formulating a
problem, devising a plan to collect data, and systematically collecting,
recording and organizing data.
2. Data representation to describe data distributions
and central tendency through appropriate use of graphs such as bar graphs,
line graphs, circle graphs, pictographs, histograms,
as well as line plots, stem and leaf plots, scatter plots, and box plots.
3. Data representation to describe data distributions
and central tendency through appropriate use of tables and summary
statistics such as mean, median, mode, variance, standard
deviation, and percentile rankings.
4. Analysis and interpretation of data, making both verbal
and written inferences and interpretations, using these in real world
problems to predict outcomes, making recommendations
or decisions, and creating or evaluating arguments and results.
5. Inference, and the role of randomness and sampling in statistical claims about populations.
6. Probability as a way to describe chance or risk in
simple and compound events such as in a description of a fair game, odds,
and coincidence.
7. Prediction of outcomes and decision making based on
exploration of probability through data collections, experiments, and
simulations using two sided counter, number cubes, spinners,
random numbers, and computer/calculator programs.
8. Prediction of outcomes based on theoretical probabilities,
and comparison of mathematical expectations with experimental
results.
9. Recognition of potential misuses of statistics and common misconceptions about probability.
10. Finding the line of best fit given a set of data.
Disposition
The teacher:
1.demonstrates a positive attitude about statistics
and probability.
2.demonstrates confidence in his/her ability in
statistics and probability.
3.demonstrates enthusiasm for the teaching of
statistics and probability.
4.demonstrates an understanding of the role of
statistics and probability as a part of the coherent structure of mathematics.
5.value statistics and probability as mathematical
tools and their applications in other disciplines and in society.
6.promote students' confidence, flexibility, perseverance,
curiosity, and inventiveness in using statistics and probability
through the use of appropriate tasks
and by engaging students in mathematical discourse.
Performance
The teacher will:
1. investigate, formulate, and solve problems using different strategies, verify and interpret results, and generalize solutions.
2. explore mathematical questions and conjectures, formulate
counterexamples, construct and evaluate arguments using
intuitive, and informal exploration.
3. express mathematical ideas orally, in writing, and
visually using the power of mathematical language, notation, and
symbolism.
4. demonstrate the interconnectedness of the concepts
and procedures of mathematics and makes connections among other
disciplines and real world mathematics.
5. encourage students to explore, select and use appropriate
tools from technology and/or concrete materials to model
mathematical ideas.
6. apply knowledge of the historical bases of mathematics
and the problems societies faced that gave rise to mathematical
systems, acknowledging the contributions made by individuals,
of various cultures in ancient and modern mathematics.
OUTCOME #9 The teacher of late childhood through early
adolescent demonstrates the need for, uses of, and
relationships in patterns, functions, and algebra
from both an abstract and concrete perspective and are able to
identify real world applications.
Knowledge
The teacher understands:
1. Patterns, including an ability to recognize, describe, analyze, extend, and create a wide variety of patterns.
2. Functions, continuous and discrete, and their use to describe relations and to model a variety of real world situations.
3. Representations of situations and solutions of problems
that involve variable quantities with expressions, equations, and
inequalities, including algebraic, geometric and combinatorial
relationships.
4. Multiple representations of relations by tables, graphs,
words, and symbols, the strengths and limitations of each
representation, and conversion from one representation
to another, using appropriate graphing technology.
5. Attributes of polynomial, rational, algebraic, and exponential functions.
6. Modeling to solve problems, to understand and describe
the behavior of a system or event, and to predict its behavior based
on past experiences.
Disposition
The teacher:
1.demonstrates a positive attitude about algebraic
concepts.
2.demonstrates confidence in his/her ability in
algebraic concepts.
3.demonstrates enthusiasm for the teaching of
algebraic concepts.
4.demonstrates an understanding of the role of
algebraic concepts as a part of the coherent structure of mathematics.
5.values algebraic concepts as mathematical tools
and their applications in other disciplines and in society.
6.promotes students' confidence, flexibility,
perseverance, curiosity, and inventiveness in using algebraic concepts
through
the use of appropriate tasks and by
engaging students in mathematical discourse.
Performance
The teacher will:
1. investigate, formulate, and solve problems using different strategies, verify and interpret results, and generalize solutions.
2. explore mathematical questions and conjectures, formulate
counterexamples, construct and evaluate arguments using
intuitive, and informal exploration.
3. express mathematical ideas orally, in writing, and
visually using the power of mathematical language, notation, and
symbolism.
4. demonstrate the interconnectedness of the concepts
and procedures of mathematics and makes connections among other
disciplines and real world mathematics.
5. encourage students to explore, select and use appropriate
tools from technology and/or concrete materials to model
mathematical ideas.
6. apply knowledge of the historical bases of mathematics
and the problems societies faced that gave rise to mathematical
systems, acknowledging the contributions made by individuals,
of various cultures in ancient and modern mathematics.
OUTCOME #10 The teacher of late childhood through early
adolescent demonstrates the need for, uses of, and
relationships in discrete processes from both an abstract
and concrete perspective and are able to identify real world
applications.
Knowledge
The teacher understands:
1. Counting techniques (including combinations and permutations)
and their use in collecting and organizing information, and
solving problems.
2. Representation and analysis of discrete mathematics
problems, including basic concepts of sequences, graph theory, arrays,
Venn diagrams, and networks.
3. Generation of patterns using iteration and recursion.
Disposition
The teacher:
1.demonstrates a positive attitude about discrete
mathematics.
2.demonstrates confidence in his/her ability in
discrete mathematics.
3.demonstrates enthusiasm for the teaching of
discrete mathematics.
4.demonstrates an understanding of the role of
discrete mathematics as a part of the coherent structure of mathematics.
5.values discrete mathematics as a mathematical
tool and its application in other disciplines and in society.
6.promotes students' confidence, flexibility,
perseverance, curiosity, and inventiveness in using discrete mathematics
through the use of appropriate tasks
and by engaging students in mathematical discourse.
Performance
The teacher will:
1. investigate, formulate, and solve problems using different strategies, verify and interpret results, and generalize solutions.
2. explore mathematical questions and conjectures, formulate
counterexamples, construct and evaluate arguments using
intuitive, and informal exploration.
3. express mathematical ideas orally, in writing, and
visually using the power of mathematical language, notation, and
symbolism
4. demonstrate the interconnectedness of the concepts
and procedures of mathematics and makes connections among other
disciplines and real world mathematics.
5. encourage students to explore, select and use appropriate
tools from technology and/or concrete materials to model
mathematical ideas.
6. apply knowledge of the historical bases of mathematics
and the problems societies faced that gave rise to mathematical
systems, acknowledging the contributions made by individuals,
of various cultures in ancient and modern mathematics.
OUTCOME #11 The teacher of late childhood through early
adolescent demonstrates the ability to use and teach the
science process skills necessary to do scientific
inquiry and problem solving.
Knowledge
The teacher understands:
1. how to plan and conduct authentic research using the process skills.
2. how to design science activities, using the science process skills, to teach developmentally appropriate science content.
Disposition
1. The teacher appreciates the importance of the process skills as a means of learning science concepts.
2. The teacher values the process skills as a means of solving problems.
3. The teacher believes that all students have the opportunity to attain a high level of scientific literacy.
4. The teacher values truth, objectivity, open mindedness,
creativity, intellectual curiosity, discovery and responsible reporting
when using the processes of science.
Performance
1. The teacher selects real life problems for students to investigate.
2. The teacher facilitates student planned and conducted investigations.
3. The teacher provides the opportunity for students' discovery and application of knowledge.
4. The teacher selects, uses, and maintains equipment
properly, stores and disposes of chemicals safely, and handles and cares
for animals in an appropriate manner.
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