Illinois Administrative Code
Title 23 - EDUCATION AND CULTURAL RESOURCES
Part 21 - STANDARDS FOR ENDORSEMENTS IN THE MIDDLE GRADES
Subpart D - STANDARDS FOR MATHEMATICS TEACHERS
Section 21.150 - Mathematics Standards for Mathematics Teachers in the Middle Grades
Universal Citation: 23 IL Admin Code ยง 21.150
Current through Register Vol. 48, No. 38, September 20, 2024
In addition to the standards set forth in Subpart B of this Part, each mathematics teacher in the middle grades shall possess the knowledge and skills articulated in this Section.
a) Core Content Area Knowledge
1) Calculus
Effective middle grade mathematics teachers:
A) demonstrate knowledge of properties and
notation of real numbers, properties of exponents and radicals, factoring
techniques, solving polynomial equations and operations with rational
expressions;
B) on the Cartesian
Plane, graph polynomial, rational and radical functions and circles, and find
horizontal and vertical asymptotes, and points of intersection of
curves;
C) define function, domain,
range, inverse functions, operate on functions, and use functional
notation;
D) define one-sided,
general and at infinity limits, and evaluate them by using the properties of
limits;
E) define and apply the
properties of continuous functions and determine discontinuities;
F) define first-order and higher-order
derivatives and evaluate them using constant power, constant multiple, product,
quotient and chain rules and by implicit differentiation;
G) apply the rules of derivatives to find
tangent line, slope, rate of change, velocity and acceleration, marginal
analysis, increasing and decreasing functions, curve sketching with maxima and
minima and concavity, and solving optimization problems;
H) demonstrate knowledge of properties of
exponential and logarithmic functions and their derivatives;
I) demonstrate knowledge of basic
anti-derivatives, explore integration using the notion of "area under the
curve" to determine definite integrals and understand the "Fundamental Theorem
of Calculus" as a tool to evaluate definite integrals and relate integration
and differentiation; and
J) apply
the above knowledge and skills to applications from natural, physical and
social sciences.
2)
Statistics
Effective middle grade mathematics teachers:
A) construct, identify and interpret
frequency distributions, histograms, cumulative frequency tables, ogives and
box plots;
B) identify, calculate
and interpret measures of central tendency and dispersion;
C) identify, calculate and apply the methods
of counting;
D) identify, calculate
and interpret probabilities and expected value;
E) define random variables and analyze and
interpret the probability distributions they generate;
F) identify and describe the sampling
distribution of sample means and sample proportions;
G) create and interpret confidence intervals
for single population means and proportions;
H) identify, analyze and perform formal tests
of hypotheses concerning single population means and single population
proportions; and
I) identify,
calculate and interpret the correlation coefficient and regression
equations.
b) The Mathematics Curriculum
Effective middle grade mathematics teachers:
1) understand the Illinois Learning Standards
for Mathematics (see 23 Ill. Adm. Code 1.Appendix D), their organization,
progressions and the interconnections among the domains; and
2) know the developmental sequence of
mathematics skills, along with age-level or grade-level benchmarks of
development.
c) Foundational Knowledge
1) Standards for
Mathematical Practice
Effective middle grade mathematics teachers enable students to acquire the skills necessary for strong mathematical practice in that they are able to:
A) make sense of problems
and persevere in solving them;
B)
reason abstractly and quantitatively;
C) construct viable arguments and critique
the reasoning of others;
D) model
with mathematics;
E) use
appropriate tools strategically;
F)
attend to precision;
G) look for
and make use of structure; and
H)
look for and express regularity in repeated reasoning.
2) Ratio and Proportional Relationships
Effective middle grade mathematics teachers are prepared to develop student proficiency and address common misconceptions related to ratio and proportional relationships and:
A)
understand and apply fractions as numbers that can be modeled from a length
perspective (number line), an area perspective (pattern blocks, geoboards,
etc.), and a discrete perspective (set of dots or circles);
B) understand and apply the concept of unit
fractions, benchmark fractions and the whole (referent unit) as defined in the
Illinois Learning Standards for Mathematics;
C) extend the associated meanings of the
properties of operations from whole numbers to fractions;
D) understand and use equivalent fractions,
including those of whole numbers, to reveal new information and as a tool for
comparison or to perform operational procedures;
E) understand and apply the connection
between fractions and division, and how fractions, ratios and rates are
connected via unit rates, and solve problems and formulate equations for
proportional relationships;
F)
describe the relationship between fractions and terminating, periodic and
delayed-periodic decimals;
G)
reason about how quantities vary together in a proportional relationship, using
tables, double number lines and tape diagrams as supports;
H) distinguish proportional relationships
from other relationships, such as additive relationships and inversely
proportional relationships; and
I)
understand the connection between a proportional relationship and a linear
relationship.
3) The
Number System
Effective middle grade mathematics teachers are prepared to develop student proficiency and address common misconceptions related to the number system and:
A) understand how
the place value system relies on repeated groupings of any fixed natural number
quantity (including ten) and can show how to use objects, drawings, layered
place value cards and numerical expressions to help reveal place value
structure, and extend place value system knowledge to negative, rational,
irrational and real numbers;
B)
efficiently use place value computation methods for addition, subtraction,
multiplication and division with an understanding of composing and decomposing
numbers using the commutative, associative and distributive properties, and,
using multiple models, explain why rules for multiplying and dividing with
negative numbers make sense;
C)
derive various (multiple) algorithms and recognize these as summaries of
reasoning, rather than rules, and distinguish between and understand the
appropriate use of computation strategies and computation algorithms as defined
in the Illinois Learning Standards for Mathematics, recognizing the importance
of "mental math";
D) understand and
explain methods of calculating products and quotients of fraction, by using
area models, tape diagrams and double number lines, and by reading
relationships of quantities from equations;
E) understand the concepts of greatest common
factor, least common multiple, units, scale, origin, quantities, integer
exponents, rational exponents, irrational numbers, complex numbers and
radicals; and
F) understand the
connections between fractions and decimals, particularly with regard to decimal
computations.
4)
Expressions and Equations
Effective middle grade mathematics teachers are prepared to develop student proficiency and address common misconceptions related to expressions and equations and:
A)
understand operations and their associated inverses, and use properties of
operations to rewrite polynomial expressions to reveal new information and to
solve equations;
B) illustrate the
meaning of 0 and why division by 0 leads to an undefined answer;
C) explain each step in solving an equation
as following from the equality asserted at the previous step, while using the
equal sign appropriately;
D) create
and solve, using multiple representations, one-variable and two-variable
equations and inequalities with letters representing an unknown quantity,
defining constraints as necessary, and understand and illustrate what it means
to be a solution of one-variable and two-variable equations and
inequalities;
E) use the structure
of an expression to identify ways to rewrite it, and choose and produce an
equivalent form of an expression to reveal and explain properties of the
quantity represented by the expression;
F) strategically use algebraic tools, such as
tape diagrams, number lines, double number lines, graphing calculators and
computer algebra systems, to solve problems and connect the strategy for the
solution to standard algebraic techniques;
G) validate or dismiss the chains of
reasoning used to solve equations and systems of equations;
H) understand proportional relationships and
arithmetic sequences as special cases of linear relationships;
I) derive and justify multiple forms for the
equations of non-vertical lines; and
J) understand and apply properties of integer
exponents and radicals to generate equivalent numerical expressions and solve
problems.
5) Geometry
Effective middle grade mathematics teachers are prepared to develop student proficiency and address common misconceptions related to geometry and:
A) compose and decompose
shapes, classify shapes into categories and justify the relationships within
and between the categories, and summarize and illustrate the progression from
visual to descriptive to analytic to abstract characterizations of
shapes;
B) use multiple models to
informally explain and prove geometric theorems about angles, angle
relationships, parallel and perpendicular lines, circles, parallelograms and
triangles, including the Pythagorean theorem and its converse;
C) describe the connections (relationships)
between geometric properties and arithmetic and algebraic properties, including
proportional relationships, and adapt a problem in one domain to be solved in
the other domain;
D) use the
coordinate plane to reason about spatial locations, graph shapes and solve
problems;
E) derive area formulas,
such as the formulas for areas of triangles and parallelograms, considering the
different height and base cases, including oblique cases;
F) demonstrate an understanding of dilations,
translations, rotations and reflections, and combinations of these using
dynamic geometry software and constructions;
G) understand congruence in terms of
translations, rotations and reflections; understand similarity in terms of
translations, rotations, reflections and dilations; solve problems involving
congruence and similarity in multiple ways; and explain the criteria for
triangle congruence and apply the congruence properties to prove geometric
theorems and properties; and
H)
understand area and volume, and give rationales for area and volume formulas
that can be obtained by compositions and decompositions of unit squares or unit
cubes, and solve real-world problems involving area, volume and surface area of
any two-dimensional or three-dimensional shape.
6) Statistics and Probability
Effective middle grade mathematics teachers are prepared to develop student proficiency and address common misconceptions related to statistics and probability and:
A) use
data displays to ask and answer questions about data in real-life situations
and demonstrate an understanding of measures used to summarize data, including
but not limited to, shape, center, mean, median, interquartile range, mean
absolute deviation, spread and standard deviation;
B) examine the distinction between
categorical and numerical data, reason about data displays and recognize the
connection to statistical variability and distributions;
C) develop an understanding of statistical
variability and its sources, and the role of randomness in statistical
inference;
D) explore and explain
relationships between two variables by studying patterns in bivariate data and
two-way frequency tables;
E) use
technology, including calculators, spreadsheets and tables, to create scatter
plots, linear models, dot plots, histograms and box plots, as well as calculate
correlation coefficients of data; and
F) calculate theoretical and experimental
probabilities of simple and compound events, and understand why their values
may differ for a given event in a particular experimental situation.
7) Functions
Effective middle grade mathematics teachers are prepared to develop student proficiency and address common misconceptions related to functions and:
A) define and use
appropriately the concepts of function, input, output, domain, range, rate of
change, intercept, interval, end behavior, function notation, relative maximum
and minimum, symmetry, zeros, graphical transformation, recursive formula,
explicit formula, arithmetic and geometric sequence.
B) examine and reason about functional
relationships represented using tables, graphs, equations and descriptions of
functions in words, and translate between representations of graphs, tables,
real-life situations or equations; and
C) examine the patterns of change in
proportional, linear, inversely proportional, quadratic and exponential
functions, and the types of real-world relationships these functions can model,
and write expressions, equations and/or functions based on these
patterns.
d) Using High-Leverage Instructional Practices
Effective middle grade mathematics teachers:
1) choose and use mathematical tasks that
entail complex mathematical work, build basic skills and allow for multiple
answers or methods;
2) teach and
use the content-specific language of mathematics;
3) lead whole-class math discussions (e.g.,
math talks) that engage all learners;
4) respond productively to student "errors"
by probing the underlying thinking and providing targeted feedback;
5) appraise, choose and modify tasks and
texts for a specific learning goal;
6) use specific mathematically focused
positive reinforcement;
7) use
public recording (e.g., posters, whiteboard) to collect and probe mathematical
thinking (e.g., demonstrating multiple answers and methods; exploring when an
algorithm may be the best solution and when another approach may provide a more
efficient solution);
8) diagnose
common (and not so common) patterns of student thinking; and
9) assess students' mathematical proficiency
and teach responsively.
e) Using Materials, Tools and Technology
Effective middle grade mathematics teachers:
1) apply mathematical content and pedagogical
knowledge to select and use instructional tools, such as manipulatives and
physical models, drawings, virtual environments, spreadsheets, presentation
tools, websites and mathematics-specific technologies (e.g., graphing tools,
interactive geometry software), recognizing both the insight to be gained and
any limitations;
2) empower
students to make sound decisions about the appropriate use of mathematical
tools;
3) when making mathematical
models, recognize that technology can enable one to visualize the results of
varying assumptions, explore consequences, examine characteristics and compare
predictions with data;
4) select
mathematical examples that address the interests, backgrounds and learning
needs of each student; and
5)
evaluate curricular materials for appropriate level and depth of content, focus
on and relevance to required learning goals and incorporation of the standards
set forth in subsection (c)(1) of this Section.
f) Monitoring Student Learning through Assessment
Effective middle grade mathematics teachers:
1) engage in purposeful classroom assessment
aligned to appropriate learning expectations for every student and monitor
student progress in meeting developmental benchmarks in mathematics;
2) provide a variety of well-designed
one-step, two-step, and complex multi-step assessment items and performance
tasks that incorporate real-life situations, to allow students to demonstrate
their learning;
3) ensure that
assessments are responsive to, and respectful of, cultural and linguistic
diversity and exceptionalities, and are not influenced by factors unrelated to
the intended purposes of the assessment;
4) guide students in developing the skills
and strategies for them to assess their work and set appropriate goals for
their progress as mathematicians;
5) analyze student work to determine
misunderstandings, misconceptions, predispositions and newly developing
understandings, and use the results of this analysis to guide instruction and
provide meaningful feedback; and
6)
communicate the purposes, uses and results of assessments appropriately and
accurately to students, parents and colleagues.
g) Meeting the Needs of Diverse Learners
Effective middle grade mathematics teachers:
1) understand the impact of cultural,
linguistic, cognitive, academic, physical, social and emotional differences on
mathematics development and progression of knowledge;
2) plan and implement mathematics instruction
that capitalizes on strengths and is responsive to the needs of each
student;
3) use a variety of
approaches and classroom-based intervention strategies to respond to the needs
of each student, particularly those who are struggling or advanced;
4) seek appropriate assistance and support
for struggling and/or advanced learners;
5) collaborate and plan with other
professionals to deliver a consistent, sequenced and supportive instructional
program for each student;
6)
differentiate strategies, materials, pace and levels of cognitive complexity to
introduce concepts and skills to meet the learning needs of each student;
and
7) make content accessible in
appropriate ways to English language learners and students with
exceptionalities.
h) Constructing a Supportive Mathematics Environment
Effective middle grade mathematics teachers:
1) create an environment that empowers every
student to engage in the practices set forth in subsection (d) of this
Part;
2) motivate and engage
students by designing learning experiences that build self-direction,
perseverance and ownership of mathematics;
3) guide students to work productively and
collaboratively with each other to achieve mathematics learning goals by using
a strategic combination of individual, group and whole class instruction to
meet the learning needs of each student efficiently and effectively;
4) provide tools that are accessible and
developmentally appropriate;
5)
establish norms and routines for classroom discourse that allow for the
respectful analysis of mistakes and the use of mathematical reasoning for
mindful critique and argument; and
6) create opportunities and expectations that
all students, including English language learners and students with
exceptionalities, use appropriate written and oral mathematical
language.
i) Professionalism, Communication and Collaboration
Effective middle grade mathematics teachers:
1) continually engage in intensive, ongoing
professional growth opportunities that serve to increase mathematical knowledge
for teaching, such as lesson study or continuing coursework;
2) use self-reflection to analyze instruction
and make improvements and make use of strategies such as journal writing, video
self-analysis and peer observation;
3) communicate and collaborate with other
professionals, such as within a professional learning community, to plan
teaching, discuss student needs, secure special services for students and
manage school policies;
4)
communicate and collaborate with families to support student needs and discuss
student progress; and
5) maintain
professional connections to improve mathematics instruction at local, State,
regional and national levels.
Disclaimer: These regulations may not be the most recent version. Illinois may have more current or accurate information. We make no warranties or guarantees about the accuracy, completeness, or adequacy of the information contained on this site or the information linked to on the state site. Please check official sources.
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