Produktbild: Geometric Structures: An Inquiry-Based Approach for Prospective Elementary and Middle School Teachers
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Geometric Structures: An Inquiry-Based Approach for Prospective Elementary and Middle School Teachers

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Beschreibung

Produktdetails

Einband

Taschenbuch

Erscheinungsdatum

10.10.2024

Verlag

Pearson Studium

Seitenzahl

688

Maße (L/B/H)

27,6/21,6/3,7 cm

Gewicht

1361 g

Auflage

1

Sprache

Englisch

ISBN

978-0-13-148392-7

Beschreibung

Produktdetails

Einband

Taschenbuch

Erscheinungsdatum

10.10.2024

Verlag

Pearson Studium

Seitenzahl

688

Maße (L/B/H)

27,6/21,6/3,7 cm

Gewicht

1361 g

Auflage

1

Sprache

Englisch

ISBN

978-0-13-148392-7

Herstelleradresse

Pearson
St.-Martin-Straße 82
81541 München
DE

Email: salesde@pearson.com

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  • Produktbild: Geometric Structures: An Inquiry-Based Approach for Prospective Elementary and Middle School Teachers
  • Part I: Paper Folding


    Chapter 0 - Warm Up Activities


    0.0 Introduction


    0.1 Folding Polygons from a Circle


    0.2 Making Squares


    0.3 Two Congruent Halves


    0.4 Dissecting Figures


    Chapter 1 - Polygons and the Angle Relationships


    1.0 Introduction


    1.1 Parallel Line Grid - Triangle Angle Sum


    1.2 Envelope Fold - Triangle Angle Sum


    1.3 Triangle and Quadrilateral Angle Sums by Tearing


    1.4 Polygon Angle Sums: How many Triangles?


    1.5 The Angles of a Polygon


    1.6 When Does Erika's Idea Work?


    1.7 The Greedy Triangle


    1.8 Problems: Angle Sums and Angle Relationships


    1.9 Four Kinds of Related Angles


    1.10 Figuring Angles and Checking by Measurement


    1.11 Parallel Lines: How to Recognize Them


    1.12 Measuring Sides and Angles of Triangles


    1.14 Convex: Different Ways to Make Sense of It


    1.14a Angle Problems - Version A


    1.14b Angle Problems - Version B


    1.15 Angle Probems - More


    1.16 How Do I Know if I Understand?


    1.17 Conjecturing ABout Quadrilaterals


    1.18 Possible or Not?


    1.19 True or False (with Example)


    1.20 Under What Conditions?


     


    Chapter 2 - Quadrilaterals and Their Definitions


    2.0 Introduction


    2.1 Checking Properties of Quadrilaterals


    2.2 Properties of Quadrilaterals


    2.3 Marking Quadrilateral Properties


    2.4 Properties of Diagonals of Quadrilaterals


    2.5 Checking Quadrilaterals by Folding


    2.6 Read Carefully: Every Word Counts!


    2.7 Checking Examples Visually or Physically


    2.8 Exploring Medial Quadrilaterals


    2.9a Problems: Properties of Quadrilaterals, Version A


    2.9b Problems: Properties of Quadrilaterals, Version B


    2.10 More Problems: Properties of Quadrilaterals


    2.11 A Deeper Understanding of Definitions


    2.12 Special Cases of Quadrilaterals


    2.13 Definitions: Inclusive or Exclusive


    2.14 Problems: Inclusive and Exclusive Definitions


    2.15 What Is a Kite? Equivalent Definitions


    2.16a Problems: Definitions of Quadrilaterals, Version A


    2.16b Problems: Definitions of Quadrilaterals, Version B


    2.17 More Problems: Definitions of Quadrilaterals


    2.18 How Do I Know if I Understand?


     


    Prologue:


    Four Contexts for Geometric Constructions


    Prologue to Chapters 3, 10, 12, and 14


     


    Chapter 3 - Constructions by Paper Folding


    3.0 Introduction


    3.1 Introducing CDs: Two Basic Constructions


    3.2 CD Problem: A Parallel Line


    3.3 CD Problem: The Median


    3.4 CD Problem: An Equilateral Triangle


    3.5 CD Problem: A Square


    3.6 Circumscribing Circle


    3.7 Inscribed Circle


    3.8 Balance Point of a Triangle


    3.9 Additional CD Problems Using Basic Construction Steps


    3.10 Group Problem: Inscribed Circles


    3.11 Folding a Six-Pointed Star or a "Snowflake"


    3.12 Problems Involving Paper Folding


    3.13 How Do I Know if I Understand?


     


    Chapter 4 - Explorations in Three-dimensional Geometry


    4.0 Introduction


    4.1 Polyhedra (Solids) from an Envelope


    4.2 Roll-and-Fold Prism and Pyramid Activities


    4.3 Net Project A: Prisms


    4.4 Prisms


    4.5 Makiing Sense of Volume: A Basic Relationship


    4.6 Net Project B: Pyramids


    4.7 Pyramids


    4.8 Edges, Faces, and Vertices of Polyhedra


    4.9 Special Kinds of Polyhedra


    4.10 Riddles with Solids


    4.11 Volumes Prisms, Pyramids, and Spheres


    4.12 Volume of a Pyramid


    4.13 What Does Volume Really Mean?


    4.14 Volume of Solids: First Try


    4.15a Solid-Geometry Problems, Version A


    4.15b Solid-Geometry Problems, Version B


    4.16 More Solid-Geometry Problems


     


    Addendum:


    Unit Origami: An Introduction


    4.17 Instructions for the Basic Parallelogram Unit


    4.18 Project for the Whole Class: Monster Stellated Icosahedron


    4.19 Unit Origami Projects


    4.20 Some Geometry of Unit Origami


    4.21 Convex Deltahedra: How Many Are There?


    4.22 Problems: Unit Origami


    4.23 How Do I Know if I Understand?


     


    Part2 GeoBoards and Dot Paper


     


    Chapter 5 - Area


    5.0 Introduction


    5.1 How Much Space in a Triangle?


    5.2 Areas on a Geoboard


    5.3 Two Ways: Cut-up and Take-away


    5.4 Areas: Parallelograms and Trapezoids


    5.5 Area by Julie's Way


    5.6 Which Ways Work for These Figures?


    5.7 Areas: How Many Ways?


    5.8 Area Problems: First Try


    5.9 A Sampling of Area Problems


    5.10 Making Sense of Common Units for Length and Area


    5.11a Area Problems, Version A


    5.11b Area Problems, Version B


    5.12 More Area Problems


    5.13 How Do I Know if I Understand?


     


    Chapter 6 - Explorations with Geoboard Areas


    6.0 Introduction


    6.1 Areas of Skew Quadrilaterals


    6.2 Solid Tile Shapes


    6.3 Problems: Tile Shapes


    6.4 Areas of Tile Shapes


    6.5 Areas by Counting Pets


    6.6 How Many Tile Shapes with Five Squares?


    6.7 Counting Areas: Pick's Formula


    6.8 Skew Figures


    6.9 Discovering, Describing, and Using Relationships


    6.10 Sean's Idea: Area = Inside Pegs


    6.11a Problems: Geoboard Areas,  Version A


    6.11b Problems: Geoboard Areas,  Version B


    6.12 More Problems: Geoboard Areas


    6.13 How Do I Know if I Understand?


     


    Chapter 7 - Similarity and Slope


    7.0 Introduction


    7.1 Slope or Steepness


    7.2 Slope: Parallel and Perpendicular


    7.3 Slope Problems, Part 1


    7.4 Slope Problems, Part 2


    7.5 Linear Equations, Tables of Values, and Slopes


    7.6 Similar Figures and Their Properties


    7.7 Similar Figures and Proportionality


    7.8 Measuring Proportionality


    7.9 Reasoning withSimilar Triangles


    7.10 Similarity and Scale Factors (Length Factors)


    7.11 Scaling, Areas, and Area Factors


    7.12 Scaling Problems, First Try


    7.13 Scaling Problems


    7.14 Scaling and Volume of Solids


    7.15a Problems: Slope, Similarity, and Scaling, Version A


    7.15b Problems: Slope, Similarity, and Scaling, Version B


    7.16 More Problems onSlope, Similarity, and Scaling


    7.17 How Do I Know if I Understand?


     


    Chapter 8 - Pythagorean Theorem and Perimeter


    8.0 Introduction


    8.1 RightTriangles of Squares


    8.2 Pythagorean Puzzles


    8.3 Estimating Perimeters on a Geoboard


    8.4 Slant Lengths on a Geoboard


    8.5 Geoboard Perimeters


    8.6 Three Special Triangles


    8.7 Pythagorean Problems, First Try


    8.8a Perimeter and Right-Triangle Problems, Version A


    8.8b Perimeter and Right-Triangle Problems, Version B


    8.9 More Perimeter and Right-Triangle Problems


    8.10 How Do I Know if I Understand?


     


    Chapter 9 - Geometry of Circles


    9.0 Introduction


    9.1 Perimeter (Circumference) of a Circle


    9.2 Area of a Circle


    9.3 Area and Perimeter of Circles and Sectors


    9.4 Area Problems with Circles, First Try


    9.5 Problems: Area and Perimeter of Circles


    9.6 Inscribed Angles of Arcs of Circles


    9.7 The Law of Thales


    9.8 Circumscribed or Cyclic Polygons


    9.9 Circumscribing Circle for a Cyclic Quadrilateral


    9.10 Problems: Inscribed Angles and Circumscribed Polygons


    9.11a Problems: Geometry of Circles Version A


    9.11b Problems: Geometry of Circles, Version B


    9.12 Revisiting Volumes: Cones and Cylinders


    9.13 Surface Area of an Orange


    9.14 More Problems: Geometry of Circles


    9.15 How Do I Know if I Understand?


     


    Part 3 - Straightedge and Compass


     


    Chapter 10 - Straightedge and Compass Constructions


    10.0 Introduction


    10.1 Basic Straightedge and Compass Constructions


    10.2 Straightedge and Compass: Construct a Parallel Line


    10.3 Examples: Reasoning in Construction Problems


    10.4 Reasoning in Construction Problems


    10.5 Making Triangles, I:Side-Side-Side


    10.6 Making Triangles, II: Side-Angle-Side


    10.7 Making Triangles, III: Angle-Side-Angle


    10.8 Making Triangles, IV: Side-Side-Angle (Ambiguous Case)


    10.9 Congruence Conditions for Triangles


    10.10 How Do I Know I Understand?


     


    Chapter 11 - Congruence Conditions and Reasoning from Definitions to Properties


    11.0 Introduction


    11.1 Congruence Conditions for Triangles and CPCT


    11.2 Problems:Congruence Conditions and CPCT


    11.3 Justifications by Congruence Conditions


    11.4a Problems: Congruence Conditions, Version A


    11.4b Problems: Congruence Conditions, Version B


    11.5 More Problems: Congruence Conditions


    11.6 FromDefinitions to Properties: Five-Step Reasoning


    11.7 Example: Five-Step Reasoning, Problem A


    11.8 Five Step reasoning, First Try


    11.9 More Problems Using Five-Step Reasoning


    11.10 How Do I Know if I Understand?


     


    Part 4 - Computer Constructions and Explorations


     


    Chapter 12 - Computer Constructions


    12.0 Introduction


    12.1 Getting Started with Computer Construction Software


    12.2 Constructing Objects: Midpoints


    12.3 Constructing Objects: Bisectors


    12.4 Constructing Objects: Altitudes and Medians


    12.5 The Euler Line of a Triangle


    12.6 The Nine-point Circle of a Triangle


    12.7 The Medial Quadrilateral of Quadrilateral


    12.8 Problems: Investigating Relationships by Using Geometric Properties


    12.9 How Do I Know if I Understand?


     


    Chapter 13 - Computer Explorations


    13.0 Introduction


    13.1 Triangle Inequalities


    13.2 Angle Bisectors: Why the Incenter Works


    13.3 Perpendicular Bisectors: Why the Circumcenter Works


    13.4 Medians and the Centroid of a Triangle


    13.5 Altitudes: The Orthic Triangle


    13.6 Angle Bisectors, Medians, and Altitudes: Some Relationships


    13.7 Revisiting the Medial Triangle: Perimeter and Area


    13.8 Revisiting the Medial Quadrilateral: Area


    13.9 Quadrilaterals and Circles


    13.10 Circles: Central Angles and Inscribed Angles


    13.11 Circles: More on Inscribed Angles and Arcs


    13.12 Problems: Investigating Relationships by Using Number Ideas


    13.13 How Do I Know if I Understand?


     


    Part 5 - Mira (Reflecta) and Tracing Paper


     


    Chapter 14 - Mira Contructions


    14.0 Introduction


    14.1 The Mira: What Does it Mean?


    14.2 Reflection Lines and Point-Image Segments


    14.3 Constructions with a Mira (CDs)


    14.4 Altitudes of a Triangle


    14.5 Altitudes, Orthocenters, and Trapezoids


    14.6 Altitude Constructions with a Mira


    14.7 Measuring a Triangle's Three Altitudes


    14.8 Where is the Circumcenter?


    14.9 How Do I Know if I Understand?


     


    Chapter 15 - Symmetry


    15.0 Introduction


    15.1 Miniproject: Fold-andCut Paper Figures


    15.2 Fold-and-Cut (Symmetric) Shapes


    15.3 Orientation: One or Two Sides?


    15.4a Problems: Symmetry, Version A


    15.4b Problems: Symmetry, Version B


    15.5 Fold and Cut: Three Symmetry Lines


    15.6 Fold and Cut: Fivefold Symmetry


    15.7 Problems: More on Symmetry


    15.8 How Do I Know if I Understand?


     


    Chapter 16 - The Four Symmetries


    16.0 Introduction


    16.1 Four Actions: Slide, Flip, Turn, and Glide-Flip


    16.2 Four Symmetries


    16.3 Translations and Coordinates


    16.4 Problems: Four Actions or Symmetries


    16.5 Combinatons of Reflections


    16.6 Actions: Which of the Four Types?


    16.7 Rotations and Glide-Reflections: Point-Image Segments


    16.8 How Do You Get from One to the Other?


    16.9 CD Problem: Find the Center of Rotation


    16.10 CD Problem: Find the Glide-Reflection Line


    16.11 An Experiment with the Four-Kinds Principle


    16.12 Marking Symmetries on Wallpaper Designs


    16.13a Problems: Four Types of Symmetry, Version A


    16.13b Problems:Four Types of Symmetry, Version B


    16.14 More Problems Involving the Four Types of Symmetry


    16.15 How Do I Know if I Understand?


     


    Prologue: Symmetries of Decorative Art


    Prologue to Chaptes 17, 18, and 19


     


    Chapter 17 - Symmetries of Mandalas


    17.0 Introduction


    17.1 Symmetries of Mandalas


    17.2 Classifying Mandalas, First Try


    17.3 Classifying Mandalas


    17.4 Mandalas: One or Two Sides?


    17.5 Template Design Mandalas


    17.6 Template Design Problems


    17.7 Express Yourself with a Mandala


    17.8 The Symmetry Classification of Mandalas


    17.9 Problems: Mandalas


    17.10a Problems: Mandalas, Version A


    17.10b Problems: Mandalas, Version B


    17.11 How Do I Know if I Understand?


     


    Chapter 18 - Symmetries of Borders


    18.0 Introduction


    18.1 Glide-Reflectional and Half-turn Symmetry


    18.2 Classifying Borders, First Try


    18.3 Borders: What Is Their Symmetry Type?


    18.4 Generating Borders


    18.5 Borders: Make Your Own Display


    18.6 The Symmetry Classificaton of Borders


    18.7 Problems Classifying Borders


    18.8a Problems: Borders, Version A


    18.8b Problems: Borders, Version B


    18.9 How Do I Know if I Understand?


     


    Chapter 19 - Escher-Style Tessellations


    19.0 Introduction


    19.1 Escher Tessellations, Type TTTT


    19.2 How to Make a Type TTTT Tessellation


    19.3 Cut and Tape: Make Your Own Tessellating Shape


    19.4 Miniproject: Recognizability


    19.5 Four Moves for Tessellating Squares


    19.6 What Are the Possible Heesch Types?


    19.7 What is the Heesch Type?


    19.8 Project: Making Escher-Style Tessellations


    19.9 Checking Understanding of Heesch Types


    19.10 Marking Symmetries on Escher Tessellations


    19.11 Do These Tessellations Work?


    19.12 How Do I Know if I Understand?


     


    Appendices


    A.1 A Guide for You, the Student: Making Sense of Geometry in an Inquiry-based Class


    A.2 GeoSET Website: Internet Resources for Students


    A.3 Construct/Describe Problems


    A3.1 Hints for Doing CD Problems


    A3.2 Shorthand Comments for CD Problems


    A3.3 Catalogue of CD Problems


    A.4 Dot Paper Template for Copying


     


    Bibliography


     


    Index