Sinitsky Change and Invariance

Preface.- Acknowledgements.- The Concept of Invariance and Change: Theoretical Background.- Understanding Phenomena from the Aspect of Invariance and Change.- The Concept of Invariance and Change in the Mathematical Knowledge of Students.- The Basic Interplay between Invariance and Change.- Some Introductory Activities in Invariance and Change.- References.- Invariant Quantities – What Is Invariant and What Changes?.- Introduction: Understanding the Invariance of Quantity as a Basis for Quantitative Thinking.- Activity 2.1: Dividing Dolls between Two Children.- Mathematic and Didactic Analysis of Activity 2.1: Partitioning a Set into Two Subsets: Posing Problems and Partition Methods.- Activity 2.2: How to Split a Fraction. Almost Like Ancient Egypt.- Mathematic and Didactic Analysis of Activity 2.2: Invariance of Quantity and Splitting of Unit Fractions.- Activity 2.3: They Are All Equal, But ….- Mathematic and Didactic Analysis of Activity 2.3: From Equal Addends to Consecutive Addends.- Activity 2.4: Expressing a Natural Number as Infinite Series.- Suggestions for Further Activities.- References.- The Influence of Change.- Introduction: Changes in Quantity and Comparing Amounts.- Activity 3.1: Less or More?.- Mathematical and Didactic Analysis of Activity 3.1: The influence That a Change in One Operand Has on the Value of an Arithmetical Expression.- Activity 3.2: Plus How Much or Times How Much?.- Mathematical and Didactic Analysis of Activity 3.2: Different Ways of Comparing.- Activity 3.3: Markups, Markdowns and the Order of Operations.- Mathematical and Didactic Analysis of Activity 3.3: Repeated Changes in Percentages.- Activity 3.4: Invariant or Not?.- Mathematical and Didactic Analysis of Activity 3.4: Products and Extremum Problems.- Activity 3.5: What Is the Connection between Mathematical Induction and Invariance and Change?.- Mathematical and Didactic Analysis of Activity 3.5: What Is the Connection between Mathematical Induction and Invariance and Change?.- Suggestions for Further Activities.- References.- Introducing Change for the Sake of Invariance.- Introduction: Algorithms – Introducing Change for the Sake of Invariance.- Activity 4.1: The “Compensation Rule”: What Is It?.- Mathematical and Didactic Analysis of Activity 4.1: Changes in the Components of Mathematical Operations That Ensure the Invariance of the Result.- Activity 4.2: Divisibility Tests.- Mathematical and Didactic Analysis of Activity 4.2: Invariance of Divisibility and Composing of Divisibility Tests.- Activity 4.3: Basket Configuration Problems.- Mathematical and Didactic Analysis of Activity 4.3: Diophantine Problems and Determining the Change and Invariance.- Activity 4.4: Product = Sum?.- Mathematical and Didactic Analysis for the Activities in 4.4: Invariance as a Constraint.- Suggestions for Further Activities.- References.- Discovering Hidden Invariance.- Introduction: Discovering Hidden Invariance as a Way of Understanding Various Phenomena.- Activity 5.1: How to Add Numerous Consecutive Numbers.- Mathematical and Didactic Analysis of Activity 5.1: The Arithmetic Series: Examples of Use of the Interplay between Change and Invariance in Calculations.- Activity 5.2: Solving Verbal Problems: Age, Speed, and Comparing the Concentrations of Chemical Solutions.- Mathematic and Didactic Analysis of Activity 5.2: Solving Verbal Problems by Discovering the Hidden Invariance.- Activity 5.3: Mathematical Magic – Guessing Numbers.- Mathematical and Didactic Analysis of Activity 5.3: Discovering the Invariant in Mathematical “Tricks”: “Guessing Numbers”.- Activity 5.4: “Why Can’t I Succeed?”.- Mathematical and Didactic Analysis of Activity 5.4: Discovering the Hidden Invariance in “Why Can’t I Succeed?”.- Suggestions for Further Activities.- References.- Change and Invariance in Geometric Shapes.- Introduction: Invariance and Change in the World of Geometry.- Activity 6.1: Halving in Geometry – Splitting Shapes.- Mathematical and Didactic Analysis of Activity 6.1: Invariance and Change When Dividing Polygons.- Activity 6.2: What Can One Assemble from Two Triangles?.- Mathematical and Didactic Analysis of Activity 6.2: Invariance and Change When Constructing Polygons from Triangles.- Activity 6.3: How Can a Parallelogram Change?.- Mathematical and Didactic Analysis of Activity 6.3: Invariance and Change of Dimensions in the Set of Parallelograms.- Activity 6.4: Identical Perimeters.- Mathematical and Didactic Analysis of Activity 6.4: Preserving the Perimeter.- Summary of the Roles of Invariance and Change in Geometrical Shapes.- Suggestions for Further Activities.- References.