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Click on any standard to search for aligned resources. This data may be subject to copyright. You may download a CSV of the Oklahoma Academic Standards for Mathematics if your intention constitutes fair use.

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Represent and solve mathematical and real-world problems using linear equations, absolute value equations, and systems of equations; interpret solutions in the original context.

Use knowledge of solving equations with rational values to represent and solve mathematical and real-world problems (e.g., angle measures, geometric formulas, science, or statistics) and interpret the solutions in the original context.

Solve absolute value equations and interpret the solutions in the original context.

Analyze and solve real-world and mathematical problems involving systems of linear equations with a maximum of two variables by graphing (may include graphing calculator or other appropriate technology), substitution, and elimination. Interpret the solutions in the original context.

Represent and solve real-world and mathematical problems using linear inequalities, compound inequalities and systems of linear inequalities; interpret solutions in the original context.

Represent relationships in various contexts with linear inequalities; solve the resulting inequalities, graph on a coordinate plane, and interpret the solutions.

Represent relationships in various contexts with compound and absolute value inequalities and solve the resulting inequalities by graphing and interpreting the solutions on a number line.

Solve systems of linear inequalities with a maximum of two variables; graph and interpret the solutions on a coordinate plane.

Generate equivalent algebraic expressions and use algebraic properties to evaluate expressions and arithmetic and geometric sequences.

Solve equations involving several variables for one variable in terms of the others.

Simplify polynomial expressions by adding, subtracting, or multiplying.

Factor common monomial factors from polynomial expressions and factor quadratic expressions with a leading coefficient of 1.

Evaluate linear, absolute value, rational, and radical expressions. Include applying a nonstandard operation such as ! ! = 2! + !.

Recognize that arithmetic sequences are linear using equations, tables, graphs, and verbal descriptions. Use the pattern, find the next term.

Recognize that geometric sequences are exponential using equations, tables, graphs and verbal descriptions. Given the formula ! ! = !(!)!, find the next term and define the meaning of ! and ! within the context of the problem.

Analyze mathematical change involving linear equations in real-world and mathematical problems.

Calculate and interpret slope and the x- and y-intercepts of a line using a graph, an equation, two points, or a set of data points to solve realworld and mathematical problems.

Solve mathematical and real-world problems involving lines that are parallel, perpendicular, horizontal, or vertical.

Express linear equations in slope-intercept, point-slope, and standard forms and convert between these forms. Given sufficient information (slope and y-intercept, slope and one-point on the line, two points on the line, x- and y-intercept, or a set of data points), write the equation of a line.

Translate between a graph and a situation described qualitatively

Display, describe, and compare data. For linear relationships, make predictions and assess the reliability of those predictions.

Describe a data set using data displays, describe and compare data sets using summary statistics, including measures of central tendency, location, and spread. Know how to use calculators, spreadsheets, or other appropriate technology to display data and calculate summary statistics.

Collect data and use scatterplots to analyze patterns and describe linear relationships between two variables. Using graphing technology, determine regression lines and correlation coefficients; use regression lines to make predictions and correlation coefficients to assess the reliability of those predictions.

Select and apply counting procedures, such as the multiplication and addition principles and tree diagrams, to determine the size of a sample space (the number of possible outcomes) and to calculate probabilities.

Describe the concepts of intersections, unions, and complements using Venn diagrams to evaluate probabilities. Understand the relationships between these concepts and the words AND, OR, and NOT.

Calculate experimental probabilities by performing simulations or experiments involving a probability model and using relative frequencies of outcomes.

Apply probability concepts to real-world situations to make informed decisions.

Understand functions as descriptions of covariation (how related quantities vary together) in real-world and mathematical problems.

Identify the dependent and independent variables as well as the domain and range given a function, equation, or graph. Identify restrictions on the domain and range in real-world contexts.

Write linear functions, using function notation, to model real-world and mathematical situations.

Given a graph modeling a real-world situation, read and interpret the linear piecewise function (excluding step functions).

Recognize functions and understand that families of functions are characterized by their rate of change.

Distinguish between linear and nonlinear (including exponential) functions arising from real-world and mathematical situations that are represented in tables, graphs, and equations. Understand that linear functions grow by equal intervals and that exponential functions grow by equal factors over equal intervals.

Recognize the graph of the functions ! ! = ! and ! ! = |!| and predict the effects of transformations [ !(! + !) and !(!) + !, where ! is a positive or negative constant] algebraically and graphically using various methods and tools that may include graphing calculators.

Represent functions in multiple ways and use the representation to interpret real-world and mathematical problems.

Identify and generate equivalent representations of linear equations, graphs, tables, and real-world situations.

Use function notation; evaluate a function, including nonlinear, at a given point in its domain algebraically and graphically. Interpret the results in terms of real-world and mathematical problems.

Extend the understanding of number and operations to include square roots and cube roots.

Write square roots and cube roots of monomial algebraic expressions in simplest radical form.

Add, subtract, multiply, and simplify square roots of monomial algebraic expressions and divide square roots of whole numbers, rationalizing the denominator when necessary.

Represent and solve mathematical and real-world problems using nonlinear equations and systems of linear equations; interpret the solutions in the original context.

Represent real-world or mathematical problems using quadratic equations and solve using various methods (including graphing calculator or other appropriate technology), factoring, completing the square, and the quadratic formula. Find non-real roots when they exist.

Represent real-world or mathematical problems using exponential equations, such as compound interest, depreciation, and population growth, and solve these equations graphically (including graphing calculator or other appropriate technology) or algebraically.

Solve one-variable rational equations and check for extraneous solutions.

Solve polynomial equations with real roots using various methods and tools that may include factoring, polynomial division, synthetic division, graphing calculators or other appropriate technology.

Solve square root equations with one variable and check for extraneous solutions.

Solve common and natural logarithmic equations using the properties of logarithms.

Solve real-world and mathematical problems that can be modeled using arithmetic or finite geometric sequences or series given the ! th terms and sum formulas. Graphing calculators or other appropriate technology may be used.

Represent real-world or mathematical problems using systems of linear equations with a maximum of three variables and solve using various methods that may include substitution, elimination, and graphing (may include graphing calculators or other appropriate technology).

Solve systems of equations containing one linear equation and one quadratic equation using tools that may include graphing calculators or other appropriate technology

Represent and analyze mathematical situations and structures using algebraic symbols using various strategies to write equivalent forms of expressions.

Factor polynomial expressions including but not limited to trinomials, differences of squares, sum and difference of cubes, and factoring by grouping using a variety of tools and strategies.

Add, subtract, multiply, divide, and simplify polynomial and rational expressions.

Recognize that a quadratic function has different equivalent representations [! ! = !!2 + !' + !, ! ! = !(! )2 + !, and ! ! = (! )(! !)]. Identify and use the representation that is most appropriate to solve real-world and mathematical problems.

Rewrite expressions involving radicals and rational exponents using the properties of exponents.

Display, describe, and compare data. For linear and nonlinear relationships, make predictions and assess the reliability of those predictions.

Use the mean and standard deviation of a data set to fit it to a normal distribution (bell-shaped curve).

Collect data and use scatterplots to analyze patterns and describe linear, exponential or quadratic relationships between two variables. Using graphing calculators or other appropriate technology, determine regression equation and correlation coefficients; use regression equations to make predictions and correlation coefficients to assess the reliability of those predictions.

Based upon a real-world context, recognize whether a discrete or continuous graphical representation is appropriate and then create the graph.

Analyze statistical thinking to draw inferences, make predictions, and justify conclusions.

Evaluate reports based on data published in the media by identifying the source of the data, the design of the study, and the way the data are analyzed and displayed. Given spreadsheets, tables, or graphs, recognize and analyze distortions in data displays. Show how graphs and data can be distorted to support different points of view.

Identify and explain misleading uses of data. Recognize when arguments based on data confuse correlation and causation.

Understand functions as descriptions of covariation (how related quantities vary together).

Use algebraic, interval, and set notations to specify the domain and range of functions of various types and evaluate a function at a given point in its domain.

Recognize the graphs of exponential, radical (square root and cube root only), quadratic, and logarithmic functions. Predict the effects of transformations [!(! + !), !(!) + !, !(!'), and !'(!), where ! is a positive or negative real-valued constant] algebraically and graphically, using various methods and tools that may include graphing calculators or other appropriate technology.

Graph a quadratic function. Identify the x- and y-intercepts, maximum or minimum value, axis of symmetry, and vertex using various methods and tools that may include a graphing calculator or appropriate technology.

Graph exponential and logarithmic functions. Identify asymptotes and x- and y-intercepts using various methods and tools that may include graphing calculators or other appropriate technology. Recognize exponential decay and growth graphically and algebraically.

Analyze the graph of a polynomial function by identifying the domain, range, intercepts, zeros, relative maxima, relative minima, and intervals of increase and decrease.

Graph a rational function and identify the x- and y-intercepts, vertical and horizontal asymptotes, using various methods and tools that may include a graphing calculator or other appropriate technology. (Excluding slant or oblique asymptotes and holes.)

Graph a radical function (square root and cube root only) and identify the x- and y-intercepts using various methods and tools that may include a graphing calculator or other appropriate technology.

Graph piecewise functions with no more than three branches (including linear, quadratic, or exponential branches) and analyze the function by identifying the domain, range, intercepts, and intervals for which it is increasing, decreasing, and constant.

Analyze functions through algebraic combinations, compositions, and inverses, if they exist.

Add, subtract, multiply, and divide functions using function notation and recognize domain restrictions.

Combine functions by composition and recognize that ! ! = !!!(!), the inverse function of !(!), if and only if ! ! ! = ! ! ! = !.

Find and graph the inverse of a function, if it exists, in real-world and mathematical situations. Know that the domain of a function ! is the range of the inverse function !!!, and the range of the function ! is the domain of the inverse function !!!.

Apply the inverse relationship between exponential and logarithmic functions to convert from one form to another.

Extend the understanding of number and operations to include complex numbers, matrices, radical expressions, and expressions written with rational exponents.

Use matrices to organize and represent data. Identify the order (dimension) of a matrix, add and subtract matrices of appropriate dimensions, and multiply a matrix by a scalar to create a new matrix to solve problems.

Understand and apply the relationship of rational exponents to integer exponents and radicals to solve problems

Discover, evaluate and analyze the relationships between lines, angles, and polygons to solve real-world and mathematical problems; express proofs in a form that clearly justifies the reasoning, such as two-column proofs, paragraph proofs, flow charts, or illustrations.

Apply the properties of parallel and perpendicular lines, including properties of angles formed by a transversal, to solve real-world and mathematical problems and determine if two lines are parallel, using algebraic reasoning and proofs.

Apply the properties of angles, including corresponding, exterior, interior, vertical, complementary, and supplementary angles to solve realworld and mathematical problems using algebraic reasoning and proofs.

Apply theorems involving the interior and exterior angle sums of polygons and use them to solve real-world and mathematical problems using algebraic reasoning and proofs.

Apply the properties of special quadrilaterals (square, rectangle, trapezoid, isosceles trapezoid, rhombus, kite, parallelogram) and use them to solve real-world and mathematical problems involving angle measures and segment lengths using algebraic reasoning and proofs.

Use coordinate geometry to represent and analyze line segments and polygons, including determining lengths, midpoints, and slopes of line segments.

Apply the properties of polygons to solve real-world and mathematical problems involving perimeter and area (e.g., triangles, special quadrilaterals, regular polygons up to 12 sides, composite figures).

Apply the properties of congruent or similar polygons to solve real-world and mathematical problems using algebraic and logical reasoning. .

Construct logical arguments to prove triangle congruence (SSS, SAS, ASA, AAS and HL) and triangle similarity (AA, SSS, SAS).

Use numeric, graphic and algebraic representations of transformations in two dimensions, such as reflections, translations, dilations, and rotations about the origin by multiples of 90 , to solve problems involving figures on a coordinate plane and identify types of symmetry

Solve real-world and mathematical problems involving three dimensional figures.

Solve real-world and mathematical problems using the surface area and volume of prisms, cylinders, pyramids, cones, spheres, and composites of these figures. Use nets, measuring devices, or formulas as appropriate.

Use ratios derived from similar three-dimensional figures to make conjectures, generalize, and to solve for unknown values such as angles, side lengths, perimeter or circumference of a face, area of a face, and volume.

Solve real-world and mathematical problems using the properties of circles.

Apply the properties of circles to solve problems involving circumference and area, approximate values and in terms of !, using algebraic and logical reasoning.

Apply the properties of circles and relationships among angles; arcs; and distances in a circle among radii, chords, secants and tangents to solve problems using algebraic and logical reasoning.

Recognize and write the radius !, center (, !), and standard form of the equation of a circle (! )2 + (! !)2 = !2 with and without graphs.

Apply the distance and midpoint formula, where appropriate, to develop the equation of a circle in standard form.

Use appropriate tools and logic to evaluate mathematical arguments.

Understand the use of undefined terms, definitions, postulates, and theorems in logical arguments/proofs.

Analyze and draw conclusions based on a set of conditions using inductive and deductive reasoning. Recognize the logical relationships between a conditional statement and its inverse, converse, and contrapositive.

Assess the validity of a logical argument and give counterexamples to disprove a statement.

Develop and verify mathematical relationships of right triangles and trigonometric ratios to solve real-world and mathematical problems.

Apply the distance formula and the Pythagorean Theorem and its converse to solve real-world and mathematical problems, as approximate and exact values, using algebraic and logical reasoning (include Pythagorean Triples).

Verify and apply properties of right triangles, including properties of 45-45-90 and 30-60-90 triangles, to solve problems using algebraic and logical reasoning.

Use the definition of the trigonometric functions to determine the sine, cosine, and tangent ratio of an acute angle in a right triangle. Apply the inverse trigonometric functions to find the measure of an acute angle in right triangles.

Apply the trigonometric functions as ratios (sine, cosine, and tangent) to find side lengths in right triangles in real-world and mathematical problems.

Understand the concept of function in real-world and mathematical situations, and distinguish between linear and nonlinear functions.

Recognize that a function is a relationship between an independent variable and a dependent variable in which the value of the independent variable determines the value of the dependent variable.

Use linear functions to represent and explain real-world and mathematical situations.

Identify a function as linear if it can be expressed in the form ! = !' + ! or if its graph is a straight line.

Recognize linear functions in real-world and mathematical situations; represent linear functions and other functions with tables, verbal descriptions, symbols, and graphs; solve problems involving linear functions and interpret results in the original context.

Represent linear functions with tables, verbal descriptions, symbols, and graphs; translate from one representation to another.

Identify, describe, and analyze linear relationships between two variables.

Identify graphical properties of linear functions including slope and intercepts. Know that the slope equals the rate of change, and that the yintercept is zero when the function represents a proportional relationship.

Predict the effect on the graph of a linear function when the slope or y-intercept changes. Use appropriate tools to examine these effects.

Solve problems involving linear functions and interpret results in the original context.

Generate equivalent numerical and algebraic expressions and use algebraic properties to evaluate expressions.

Use substitution to simplify and evaluate algebraic expressions.

Justify steps in generating equivalent expressions by identifying the properties used, including the properties of operations (associative, commutative, and distributive laws) and the order of operations, including grouping symbols.

Represent real-world and mathematical problems using equations and inequalities involving linear expressions. Solve and graph equations and inequalities symbolically and graphically. Interpret solutions in the original context.

Illustrate, write, and solve mathematical and real-world problems using linear equations with one variable with one solution, infinitely many solutions, or no solutions. Interpret solutions in the original context.

Represent, write, solve, and graph problems leading to linear inequalities with one variable in the form !' + ! > ! and !' + ! < !, where !, !, and ! are rational numbers.

Represent real-world situations using equations and inequalities involving one variable.

Display and interpret data in a variety of ways, including using scatterplots and approximate lines of best fit. Use line of best fit and average rate of change to make predictions and draw conclusions about data.

Describe the impact that inserting or deleting a data point has on the mean and the median of a data set. Know how to create data displays using a spreadsheet and use a calculator to examine this impact.

Collect, display and interpret data using scatterplots. Use the shape of the scatterplot to informally estimate a line of best fit, make statements about average rate of change, and make predictions about values not in the original data set. Use appropriate titles, labels and units.

Calculate experimental probabilities and reason about probabilities to solve real-world and mathematical problems.

Calculate experimental probabilities and represent them as percents, fractions and decimals between 0 and 1 inclusive. Use experimental probabilities to make predictions when actual probabilities are unknown.

Determine how samples are chosen (random, limited, biased) to draw and support conclusions about generalizing a sample to a population.

Solve problems involving right triangles using the Pythagorean Theorem.

Informally justify the Pythagorean Theorem using measurements, diagrams, or dynamic software and use the Pythagorean Theorem to solve problems in two and three dimensions involving right triangles.

Use the Pythagorean Theorem to find the distance between any two points in a coordinate plane.

Calculate the surface area of a rectangular prism using decomposition or nets. Use appropriate measurements such as cm2 .

Calculate the surface area of a cylinder, in terms of ! and using approximations for !, using decomposition or nets. Use appropriate measurements such as cm2 .

Develop and use the formulas ! = !' and ! = ! to determine the volume of rectangular prisms. Justify why base area (B) and height (h) are multiplied to find the volume of a rectangular prism. Use appropriate measurements such as cm3 .

Develop and use the formulas ! = !'! and ! = ! to determine the volume of right cylinders, in terms of ! and using approximations for !. Justify why base area (B) and height (h) are multiplied to find the volume of a right cylinder. Use appropriate measurements such as cm3 .

Read, write, compare, classify, and represent real numbers and use them to solve problems in various contexts.

Develop and apply the properties of integer exponents, including !! = 1 (with ! 0), to generate equivalent numerical and algebraic expressions.

Express and compare approximations of very large and very small numbers using scientific notation.

Multiply and divide numbers expressed in scientific notation, express the answer in scientific notation.

Classify real numbers as rational or irrational. Explain why the rational number system is closed under addition and multiplication and why the irrational system is not. Explain why the sum of a rational number and an irrational number is irrational; and the product of a non-zero rational number and an irrational number is irrational.

Compare real numbers; locate real numbers on a number line. Identify the square root of a perfect square to 400 or, if it is not a perfect square root, locate it as an irrational number between two consecutive positive integers.

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