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MA.912.GR.1.1:  Prove relationships and theorems about lines and angles. Solve mathematical and realworld problems involving postulates, relationships and theorems of lines and angles.Clarifications: Clarification 1: Postulates, relationships and theorems include vertical angles are congruent; when a transversal crosses parallel lines, the consecutive angles are supplementary and alternate (interior and exterior) angles and corresponding angles are congruent; points on a perpendicular bisector of a line segment are exactly those equidistant from the segment’s endpoints.Clarification 2: Instruction includes constructing twocolumn proofs, pictorial proofs, paragraph and narrative proofs, flow chart proofs or informal proofs. Clarification 3: Instruction focuses on helping a student choose a method they can use reliably.
 

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MA.912.GR.1.AP.1:  Use the relationships and theorems about lines and angles to solve mathematical or realworld problems involving postulates, relationships and theorems of lines and angles. 

MA.912.GR.1.2:  Prove triangle congruence or similarity using SideSideSide, SideAngleSide, AngleSideAngle, AngleAngleSide, AngleAngle and HypotenuseLeg.Clarifications: Clarification 1: Instruction includes constructing twocolumn proofs, pictorial proofs, paragraph and narrative proofs, flow chart proofs or informal proofs.Clarification 2: Instruction focuses on helping a student choose a method they can use reliably.
 

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MA.912.GR.1.AP.2:  Identify the triangle congruence or similarity criteria; SideSideSide, SideAngleSide, AngleSideAngle, AngleAngleSide, AngleAngle and HypotenuseLeg. 

MA.912.GR.1.3:  Prove relationships and theorems about triangles. Solve mathematical and realworld problems involving postulates, relationships and theorems of triangles.Clarifications: Clarification 1: Postulates, relationships and theorems include measures of interior angles of a triangle sum to 180°; measures of a set of exterior angles of a triangle sum to 360°; triangle inequality theorem; base angles of isosceles triangles are congruent; the segment joining midpoints of two sides of a triangle is parallel to the third side and half the length; the medians of a triangle meet at a point.
Clarification 2: Instruction includes constructing twocolumn proofs, pictorial proofs, paragraph and narrative proofs, flow chart proofs or informal proofs. Clarification 3: Instruction focuses on helping a student choose a method they can use reliably.
 

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MA.912.GR.1.AP.3:  Use the relationships and theorems about triangles. Solve mathematical and/or realworld problems involving postulates, relationships and theorems of triangles. 

MA.912.GR.1.4:  Prove relationships and theorems about parallelograms. Solve mathematical and realworld problems involving postulates, relationships and theorems of parallelograms.Clarifications: Clarification 1: Postulates, relationships and theorems include opposite sides are congruent, consecutive angles are supplementary, opposite angles are congruent, the diagonals of a parallelogram bisect each other, and rectangles are parallelograms with congruent diagonals.Clarification 2: Instruction includes constructing twocolumn proofs, pictorial proofs, paragraph and narrative proofs, flow chart proofs or informal proofs. Clarification 3: Instruction focuses on helping a student choose a method they can use reliably.
 

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MA.912.GR.1.AP.4:  Use the relationships and theorems about parallelograms. Solve mathematical and/or realworld problems involving postulates, relationships and theorems of parallelograms. 

MA.912.GR.1.5:  Prove relationships and theorems about trapezoids. Solve mathematical and realworld problems involving postulates, relationships and theorems of trapezoids.Clarifications: Clarification 1: Postulates, relationships and theorems include the Trapezoid Midsegment Theorem and for isosceles trapezoids: base angles are congruent, opposite angles are supplementary and diagonals are congruent.Clarification 2: Instruction includes constructing twocolumn proofs, pictorial proofs, paragraph and narrative proofs, flow chart proofs or informal proofs. Clarification 3: Instruction focuses on helping a student choose a method they can use reliably.
 

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MA.912.GR.1.AP.5:  Use the relationships and theorems about trapezoids. Solve mathematical and/or realworld problems involving postulates, relationships and theorems of trapezoids. 

MA.912.GR.1.6:  Solve mathematical and realworld problems involving congruence or similarity in twodimensional figures.Clarifications: Clarification 1: Instruction includes demonstrating that twodimensional figures are congruent or similar based on given information.  

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MA.912.GR.1.AP.6:  Use the definitions of congruent or similar figures to solve mathematical and/or realworld problems involving twodimensional figures. 

MA.912.GR.2.1:  Given a preimage and image, describe the transformation and represent the transformation algebraically using coordinates.Clarifications: Clarification 1: Instruction includes the connection of transformations to functions that take points in the plane as inputs and give other points in the plane as outputs.Clarification 2: Transformations include translations, dilations, rotations and reflections described using words or using coordinates. Clarification 3: Within the Geometry course, rotations are limited to 90°, 180° and 270° counterclockwise or clockwise about the center of rotation, and the centers of rotations and dilations are limited to the origin or a point on the figure.

Examples: Example: Given a triangle whose vertices have the coordinates (3,4), (2,1.7) and (0.4,3). If this triangle is reflected across the yaxis the transformation can be described using coordinates as (x,y)→(x,y) resulting in the image whose vertices have the coordinates (3,4), (2,1.7) and (0.4,3).  

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MA.912.GR.2.2:  Identify transformations that do or do not preserve distance.Clarifications: Clarification 1: Transformations include translations, dilations, rotations and reflections described using words or using coordinates.Clarification 2: Instruction includes recognizing that these transformations preserve angle measure.
 

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MA.912.GR.2.3:  Identify a sequence of transformations that will map a given figure onto itself or onto another congruent or similar figure.Clarifications: Clarification 1: Transformations include translations, dilations, rotations and reflections described using words or using coordinates.Clarification 2: Within the Geometry course, figures are limited to triangles and quadrilaterals and rotations are limited to 90°, 180° and 270° counterclockwise or clockwise about the center of rotation. Clarification 3: Instruction includes the understanding that when a figure is mapped onto itself using a reflection, it occurs over a line of symmetry.
 

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MA.912.GR.2.AP.3:  Identify a given sequence of transformations, that includes translations or reflections, that will map a given figure onto itself or onto another congruent figure. 

MA.912.GR.2.5:  Given a geometric figure and a sequence of transformations, draw the transformed figure on a coordinate plane.Clarifications: Clarification 1: Transformations include translations, dilations, rotations and reflections described using words or using coordinates.Clarification 2: Instruction includes two or more transformations.
 

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MA.912.GR.2.AP.5:  Given a geometric figure and a sequence of transformations, select the transformed figure on a coordinate plane. 

MA.912.GR.2.6:  Apply rigid transformations to map one figure onto another to justify that the two figures are congruent.Clarifications: Clarification 1: Instruction includes showing that the corresponding sides and the corresponding angles are congruent.  

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MA.912.GR.2.AP.6:  Use rigid transformations that includes translations or reflections to map one figure onto another to show that the two figures are congruent. 

MA.912.GR.2.8:  Apply an appropriate transformation to map one figure onto another to justify that the two figures are similar.Clarifications: Clarification 1: Instruction includes showing that the corresponding sides are proportional, and the corresponding angles are congruent.  

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MA.912.GR.2.AP.8:  Identify an appropriate transformation to map one figure onto another to show that the two figures are similar. 

MA.912.GR.3.1:  Determine the weighted average of two or more points on a line.Clarifications: Clarification 1: Instruction includes using a number line and determining how changing the weights moves the weighted average of points on the number line.  

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MA.912.GR.3.AP.1:  Select the weighted average of two or more points on a line. 

MA.912.GR.3.2:  Given a mathematical context, use coordinate geometry to classify or justify definitions, properties and theorems involving circles, triangles or quadrilaterals.Clarifications: Clarification 1: Instruction includes using the distance or midpoint formulas and knowledge of slope to classify or justify definitions, properties and theorems. 
Examples: Example: Given Triangle ABC has vertices located at (2,2), (3,3) and (1,3), respectively, classify the type of triangle ABC is.Example: If a square has a diagonal with vertices (1,1) and (4,3), find the coordinate values of the vertices of the other diagonal and show that the two diagonals are perpendicular.
 

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MA.912.GR.3.AP.2:  Use coordinate geometry to classify definitions, properties and theorems involving circles, triangles, or quadrilaterals. 

MA.912.GR.3.3:  Use coordinate geometry to solve mathematical and realworld geometric problems involving lines, circles, triangles and quadrilaterals.Clarifications: Clarification 1: Problems involving lines include the coordinates of a point on a line segment including the midpoint.Clarification 2: Problems involving circles include determining points on a given circle and finding tangent lines. Clarification 3: Problems involving triangles include median and centroid. Clarification 4: Problems involving quadrilaterals include using parallel and perpendicular slope criteria.

Examples: Example: The line x+2y=10 is tangent to a circle whose center is located at (2,1). Find the tangent point and a second tangent point of a line with the same slope as the given line.Example: Given M(4,7) and N(12,1),find the coordinates of point P on so that P partitions in the ratio 2:3.
 

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MA.912.GR.3.AP.3:  Use coordinate geometry to solve mathematical geometric problems involving lines, triangles and quadrilaterals. 

MA.912.GR.3.4:  Use coordinate geometry to solve mathematical and realworld problems on the coordinate plane involving perimeter or area of polygons.
Examples: Example: A new community garden has four corners. Starting at the first corner and working counterclockwise, the second corner is 200 feet east, the third corner is 150 feet north of the second corner and the fourth corner is 100 feet west of the third corner. Represent the garden in the coordinate plane, and determine how much fence is needed for the perimeter of the garden and determine the total area of the garden.  

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MA.912.GR.3.AP.4:  Solve mathematical and/or realworld problems on the coordinate plane involving perimeter or area of a three or foursided polygon. 

MA.912.GR.4.1:  Identify the shapes of twodimensional crosssections of threedimensional figures.Clarifications: Clarification 1: Instruction includes the use of manipulatives and models to visualize crosssections.Clarification 2: Instruction focuses on crosssections of right cylinders, right prisms, right pyramids and right cones that are parallel or perpendicular to the base.
 

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MA.912.GR.4.AP.1:  Identify the shape of a twodimensional cross section of a threedimensional figure. 

MA.912.GR.4.2:  Identify threedimensional objects generated by rotations of twodimensional figures.Clarifications: Clarification 1: The axis of rotation must be within the same plane but outside of the given twodimensional figure.  

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MA.912.GR.4.AP.2:  Identify a threedimensional object generated by the rotation of a twodimensional figure. 

MA.912.GR.4.3:  Extend previous understanding of scale drawings and scale factors to determine how dilations affect the area of twodimensional figures and the surface area or volume of threedimensional figures.
Examples: Example: Mike is having a graduation party and wants to make sure he has enough pizza. Which option would provide more pizza for his guests: one 12inch pizza or three 6inch pizzas?  

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MA.912.GR.4.AP.3:  Select the effect of a dilation on the area of twodimensional figures and/or surface area or volume of threedimensional figures. 

MA.912.GR.4.4:  Solve mathematical and realworld problems involving the area of twodimensional figures.Clarifications: Clarification 1: Instruction includes concepts of population density based on area. 
Examples: Example: A town has 23 city blocks, each of which has dimensions of 1 quarter mile by 1 quarter mile, and there are 4500 people in the town. What is the population density of the town?  

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MA.912.GR.4.AP.4:  Solve mathematical and/or realworld problems involving the area of triangles, squares, circles or rectangles. 

MA.912.GR.4.5:  Solve mathematical and realworld problems involving the volume of threedimensional figures limited to cylinders, pyramids, prisms, cones and spheres.Clarifications: Clarification 1: Instruction includes concepts of density based on volume.
Clarification 2: Instruction includes using Cavalieri’s Principle to give informal arguments about the formulas for the volumes of right and nonright cylinders, pyramids, prisms and cones.

Examples: Example: A cylindrical swimming pool is filled with water and has a diameter of 10 feet and height of 4 feet. If water weighs 62.4 pounds per cubic foot, what is the total weight of the water in a full tank to the nearest pound?  

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MA.912.GR.4.AP.5:  Solve mathematical or realworld problems involving the volume of threedimensional figures limited to cylinders, pyramids, prisms, or cones. 

MA.912.GR.4.6:  Solve mathematical and realworld problems involving the surface area of threedimensional figures limited to cylinders, pyramids, prisms, cones and spheres. 

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MA.912.GR.4.AP.6:  Solve mathematical or realworld problems involving the surface area of threedimensional figures limited to cylinders, pyramids, prisms, and cones. 

MA.912.GR.5.1:  Construct a copy of a segment or an angle.Clarifications: Clarification 1: Instruction includes using compass and straightedge, string, reflective devices, paper folding or dynamic geometric software.  

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MA.912.GR.5.2:  Construct the bisector of a segment or an angle, including the perpendicular bisector of a line segment.Clarifications: Clarification 1: Instruction includes using compass and straightedge, string, reflective devices, paper folding or dynamic geometric software.  

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MA.912.GR.5.AP.2:  Construct the bisector of a segment, including the perpendicular bisector of a line segment. 

MA.912.GR.5.3:  Construct the inscribed and circumscribed circles of a triangle.Clarifications: Clarification 1: Instruction includes using compass and straightedge, string, reflective devices, paper folding or dynamic geometric software.  

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MA.912.GR.5.AP.3:  Select the inscribed and circumscribed circles of a triangle. 

MA.912.GR.6.1:  Solve mathematical and realworld problems involving the length of a secant, tangent, segment or chord in a given circle.Clarifications: Clarification 1: Problems include relationships between two chords; two secants; a secant and a tangent; and the length of the tangent from a point to a circle.  

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MA.912.GR.6.AP.1:  Identify and describe the relationship involving the length of a secant, tangent, segment or chord in a given circle. 

MA.912.GR.6.2:  Solve mathematical and realworld problems involving the measures of arcs and related angles.Clarifications: Clarification 1: Within the Geometry course, problems are limited to relationships between inscribed angles; central angles; and angles formed by the following intersections: a tangent and a secant through the center, two tangents, and a chord and its perpendicular bisector.  

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MA.912.GR.6.AP.2:  Identify the relationship involving the measures of arcs and related angles, limited to central, inscribed and intersections 

MA.912.GR.6.3:  Solve mathematical problems involving triangles and quadrilaterals inscribed in a circle.Clarifications: Clarification 1: Instruction includes cases in which a triangle inscribed in a circle has a side that is the diameter.  

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MA.912.GR.6.AP.3:  Identify and describe the relationship involving triangles and quadrilaterals inscribed in a circle. 

MA.912.GR.6.4:  Solve mathematical and realworld problems involving the arc length and area of a sector in a given circle.Clarifications: Clarification 1: Instruction focuses on the conceptual understanding that for a given angle measure the length of the intercepted arc is proportional to the radius, and for a given radius the length of the intercepted arc is proportional is the angle measure.  

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MA.912.GR.6.AP.4:  Identify and describe the relationship involving the arc length and area of a sector in a given circle. 

MA.912.GR.7.2:  Given a mathematical or realworld context, derive and create the equation of a circle using key features.Clarifications: Clarification 1: Instruction includes using the Pythagorean Theorem and completing the square.
Clarification 2: Within the Geometry course, key features are limited to the radius, diameter and the center.
 

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MA.912.GR.7.AP.2:  Create the equation of a circle when given the center and radius. 

MA.912.GR.7.3:  Graph and solve mathematical and realworld problems that are modeled with an equation of a circle. Determine and interpret key features in terms of the context.Clarifications: Clarification 1: Key features are limited to domain, range, eccentricity, center and radius.Clarification 2: Instruction includes representing the domain and range with inequality notation, interval notation or setbuilder notation. Clarification 3: Within the Geometry course, notations for domain and range are limited to inequality and setbuilder.
 

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MA.912.GR.7.AP.3:  Given an equation of a circle, identify center and radius, and graph the circle. 

MA.912.LT.4.3:  Identify and accurately interpret “if…then,” “if and only if,” “all” and “not” statements. Find the converse, inverse and contrapositive of a statement.Clarifications: Clarification 1: Instruction focuses on recognizing the relationships between an “if…then” statement and the converse, inverse and contrapositive of that statement.
Clarification 2: Within the Geometry course, instruction focuses on the connection to proofs within the course.
 

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MA.912.LT.4.AP.3:  Identify and accurately interpret “if…then,” “if and only if,” “all” and “not” statements. 

MA.912.LT.4.10:  Judge the validity of arguments and give counterexamples to disprove statements.Clarifications: Clarification 1: Within the Geometry course, instruction focuses on the connection to proofs within the course.  

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MA.912.LT.4.AP.10:  Select the validity of an argument or give counterexamples to disprove statements. 

MA.912.T.1.1:  Define trigonometric ratios for acute angles in right triangles.Clarifications:
Clarification 1: Instruction includes using the Pythagorean Theorem and using similar triangles to demonstrate that trigonometric ratios stay the same for similar right triangles.Clarification 2: Within the Geometry course, instruction includes using the coordinate plane to make connections to the unit circle. Clarification 3: Within the Geometry course, trigonometric ratios are limited to sine, cosine and tangent.
 

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MA.912.T.1.AP.1:  Select a trigonometric ratio for acute angles in right triangles limited to sine or cosine. 

MA.912.T.1.2:  Solve mathematical and realworld problems involving right triangles using trigonometric ratios and the Pythagorean Theorem.Clarifications: Clarification 1: Instruction includes procedural fluency with the relationships of side lengths in special right triangles having angle measures of 30°60°90° and 45°45°90°.  

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MA.912.T.1.AP.2:  Given a mathematical and/or realworld problem involving right triangles, solve using trigonometric ratio or the Pythagorean Theorem. 

MA.K12.MTR.1.1:  Actively participate in effortful learning both individually and collectively. Mathematicians who participate in effortful learning both individually and with others:
 Analyze the problem in a way that makes sense given the task.
 Ask questions that will help with solving the task.
 Build perseverance by modifying methods as needed while solving a challenging task.
 Stay engaged and maintain a positive mindset when working to solve tasks.
 Help and support each other when attempting a new method or approach.
Clarifications: Teachers who encourage students to participate actively in effortful learning both individually and with others:
 Cultivate a community of growth mindset learners.
 Foster perseverance in students by choosing tasks that are challenging.
 Develop students’ ability to analyze and problem solve.
 Recognize students’ effort when solving challenging problems.
 
MA.K12.MTR.2.1:  Demonstrate understanding by representing problems in multiple ways. Mathematicians who demonstrate understanding by representing problems in multiple ways:  Build understanding through modeling and using manipulatives.
 Represent solutions to problems in multiple ways using objects, drawings, tables, graphs and equations.
 Progress from modeling problems with objects and drawings to using algorithms and equations.
 Express connections between concepts and representations.
 Choose a representation based on the given context or purpose.
Clarifications: Teachers who encourage students to demonstrate understanding by representing problems in multiple ways:  Help students make connections between concepts and representations.
 Provide opportunities for students to use manipulatives when investigating concepts.
 Guide students from concrete to pictorial to abstract representations as understanding progresses.
 Show students that various representations can have different purposes and can be useful in different situations.
 
MA.K12.MTR.3.1:  Complete tasks with mathematical fluency. Mathematicians who complete tasks with mathematical fluency:  Select efficient and appropriate methods for solving problems within the given context.
 Maintain flexibility and accuracy while performing procedures and mental calculations.
 Complete tasks accurately and with confidence.
 Adapt procedures to apply them to a new context.
 Use feedback to improve efficiency when performing calculations.
Clarifications: Teachers who encourage students to complete tasks with mathematical fluency: Provide students with the flexibility to solve problems by selecting a procedure that allows them to solve efficiently and accurately.
 Offer multiple opportunities for students to practice efficient and generalizable methods.
 Provide opportunities for students to reflect on the method they used and determine if a more efficient method could have been used.
 
MA.K12.MTR.4.1:  Engage in discussions that reflect on the mathematical thinking of self and others. Mathematicians who engage in discussions that reflect on the mathematical thinking of self and others:  Communicate mathematical ideas, vocabulary and methods effectively.
 Analyze the mathematical thinking of others.
 Compare the efficiency of a method to those expressed by others.
 Recognize errors and suggest how to correctly solve the task.
 Justify results by explaining methods and processes.
 Construct possible arguments based on evidence.
Clarifications: Teachers who encourage students to engage in discussions that reflect on the mathematical thinking of self and others: Establish a culture in which students ask questions of the teacher and their peers, and error is an opportunity for learning.
 Create opportunities for students to discuss their thinking with peers.
 Select, sequence and present student work to advance and deepen understanding of correct and increasingly efficient methods.
 Develop students’ ability to justify methods and compare their responses to the responses of their peers.
 
MA.K12.MTR.5.1:  Use patterns and structure to help understand and connect mathematical concepts. Mathematicians who use patterns and structure to help understand and connect mathematical concepts:  Focus on relevant details within a problem.
 Create plans and procedures to logically order events, steps or ideas to solve problems.
 Decompose a complex problem into manageable parts.
 Relate previously learned concepts to new concepts.
 Look for similarities among problems.
 Connect solutions of problems to more complicated largescale situations.
Clarifications: Teachers who encourage students to use patterns and structure to help understand and connect mathematical concepts: Help students recognize the patterns in the world around them and connect these patterns to mathematical concepts.
 Support students to develop generalizations based on the similarities found among problems.
 Provide opportunities for students to create plans and procedures to solve problems.
 Develop students’ ability to construct relationships between their current understanding and more sophisticated ways of thinking.
 
MA.K12.MTR.6.1:  Assess the reasonableness of solutions. Mathematicians who assess the reasonableness of solutions:  Estimate to discover possible solutions.
 Use benchmark quantities to determine if a solution makes sense.
 Check calculations when solving problems.
 Verify possible solutions by explaining the methods used.
 Evaluate results based on the given context.
Clarifications: Teachers who encourage students to assess the reasonableness of solutions: Have students estimate or predict solutions prior to solving.
 Prompt students to continually ask, “Does this solution make sense? How do you know?”
 Reinforce that students check their work as they progress within and after a task.
 Strengthen students’ ability to verify solutions through justifications.
 
MA.K12.MTR.7.1:  Apply mathematics to realworld contexts. Mathematicians who apply mathematics to realworld contexts:  Connect mathematical concepts to everyday experiences.
 Use models and methods to understand, represent and solve problems.
 Perform investigations to gather data or determine if a method is appropriate.
• Redesign models and methods to improve accuracy or efficiency.
Clarifications: Teachers who encourage students to apply mathematics to realworld contexts: Provide opportunities for students to create models, both concrete and abstract, and perform investigations.
 Challenge students to question the accuracy of their models and methods.
 Support students as they validate conclusions by comparing them to the given situation.
 Indicate how various concepts can be applied to other disciplines.
 
ELA.K12.EE.1.1:  Cite evidence to explain and justify reasoning.Clarifications: K1 Students include textual evidence in their oral communication with guidance and support from adults. The evidence can consist of details from the text without naming the text. During 1st grade, students learn how to incorporate the evidence in their writing.23 Students include relevant textual evidence in their written and oral communication. Students should name the text when they refer to it. In 3rd grade, students should use a combination of direct and indirect citations. 45 Students continue with previous skills and reference comments made by speakers and peers. Students cite texts that they’ve directly quoted, paraphrased, or used for information. When writing, students will use the form of citation dictated by the instructor or the style guide referenced by the instructor. 68 Students continue with previous skills and use a style guide to create a proper citation. 912 Students continue with previous skills and should be aware of existing style guides and the ways in which they differ.
 
ELA.K12.EE.2.1:  Read and comprehend gradelevel complex texts proficiently.Clarifications: See Text Complexity for gradelevel complexity bands and a text complexity rubric.  
ELA.K12.EE.3.1:  Make inferences to support comprehension.Clarifications: Students will make inferences before the words infer or inference are introduced. Kindergarten students will answer questions like “Why is the girl smiling?” or make predictions about what will happen based on the title page.
Students will use the terms and apply them in 2nd grade and beyond.  
ELA.K12.EE.4.1:  Use appropriate collaborative techniques and active listening skills when engaging in discussions in a variety of situations.Clarifications: In kindergarten, students learn to listen to one another respectfully.In grades 12, students build upon these skills by justifying what they are thinking. For example: “I think ________ because _______.” The collaborative conversations are becoming academic conversations. In grades 312, students engage in academic conversations discussing claims and justifying their reasoning, refining and applying skills. Students build on ideas, propel the conversation, and support claims and counterclaims with evidence.
 
ELA.K12.EE.5.1:  Use the accepted rules governing a specific format to create quality work.Clarifications: Students will incorporate skills learned into work products to produce quality work. For students to incorporate these skills appropriately, they must receive instruction. A 3rd grade student creating a poster board display must have instruction in how to effectively present information to do quality work.  
ELA.K12.EE.6.1:  Use appropriate voice and tone when speaking or writing.Clarifications: In kindergarten and 1st grade, students learn the difference between formal and informal language. For example, the way we talk to our friends differs from the way we speak to adults. In 2nd grade and beyond, students practice appropriate social and academic language to discuss texts.  
ELD.K12.ELL.MA.1:  English language learners communicate information, ideas and concepts necessary for academic success in the content area of Mathematics. 
ELD.K12.ELL.SI.1:  English language learners communicate for social and instructional purposes within the school setting. 