| Introduction | p. v |
| Until the Publication of the English Edition | p. vii |
| Acknowledgments | p. ix |
| Preface for the English Edition | p. xi |
| A Point Opens the Door to Origamics | p. 1 |
| Simple Questions About Origami | p. 1 |
| Constructing a Pythagorean Triangle | p. 2 |
| Dividing a Line Segment into Three Equal Parts Using no Tools | p. 5 |
| Extending Toward a Generalization | p. 8 |
| New Folds Bring Out New Theorems | p. 11 |
| Trisecting a Line Segment Using Haga's Second Theorem Fold | p. 11 |
| The Position of Point F is Interesting | p. 14 |
| Some Findings Related to Haga's Third Theorem Fold | p. 17 |
| Extension of the Haga's Theorems to Silver Ratio Rectangles | p. 21 |
| Mathematical Adventure by Folding a Copy Paper | p. 21 |
| Mysteries Revealed from Horizontal Folding of Copy Paper | p. 25 |
| Using Standard Copy Paper with Haga's Third Theorem | p. 30 |
| X-Lines with Lots of Surprises | p. 33 |
| We Begin with an Arbitrary Point | p. 33 |
| Revelations Concerning the Points of Intersection | p. 35 |
| The Center of the Circumcircle! | p. 37 |
| How Does the Vertical Position of the Point of Intersection Vary? | p. 38 |
| Wonders Still Continue | p. 41 |
| Solving the Riddle of "1/2" | p. 42 |
| Another Wonder | p. 43 |
| "Intrasquares" and "Extrasquares" | p. 45 |
| Do Not Fold Exactly into Halves | p. 46 |
| What Kind of Polygons Can You Get? | p. 46 |
| How do You Get a Triangle or a Quadrilateral? | p. 48 |
| Now to Making a Map | p. 49 |
| This is the "Scientific Method" | p. 53 |
| Completing the Map | p. 53 |
| We Must Also Make the Map of the Outer Subdivision | p. 55 |
| Let Us Calculate Areas | p. 57 |
| A Petal Pattern from Hexagons? | p. 59 |
| The Origamics Logo | p. 59 |
| Folding a Piece of Paper by Concentrating the Four Vertices at One Point | p. 60 |
| Remarks on Polygonal Figures of Type n | p. 63 |
| An Approach to the Problem Using Group Study | p. 64 |
| Reducing the Work of Paper Folding; One Eighth of the Square Will Do | p. 65 |
| Why Does the Petal Pattern Appear? | p. 66 |
| What Are the Areas of the Regions? | p. 70 |
| Heptagon Regions Exist? | p. 71 |
| Review of the Folding Procedure | p. 71 |
| A Heptagon Appears! | p. 73 |
| Experimenting with Rectangles with Different Ratios of Sides | p. 74 |
| Try a Rhombus | p. 76 |
| A Wonder of Eleven Stars | p. 77 |
| Experimenting with Paper Folding | p. 77 |
| Discovering | p. 80 |
| Proof | p. 82 |
| More Revelations Regarding the Intersections of the Extensions of the Creases | p. 85 |
| Proof of the Observation on the Intersection Points of Extended Edge-to-Line Creases | p. 89 |
| The Joy of Discovering and the Excitement of Further Searching | p. 91 |
| Where to Go and Whom to Meet | p. 93 |
| An Origamics Activity as a Game | p. 93 |
| A Scenario: A Princess and Three Knights? | p. 93 |
| The Rule: One Guest at a Time | p. 94 |
| Cases Where no Interview is Possible | p. 97 |
| Mapping the Neighborhood | p. 97 |
| A Flower Pattern or an Insect Pattern | p. 99 |
| A Different Rule: Group Meetings | p. 99 |
| Are There Areas Where a Particular Male can have Exclusive Meetings with the Female? | p. 101 |
| More Meetings through a "Hidden Door" | p. 103 |
| Inspiraration of Rectangular Paper | p. 107 |
| A Scenario: The Stern King of Origami Land | p. 107 |
| Begin with a Simpler Problem: How to Divide the Rectangle Horizontally and Vertically into 3 Equal Parts | p. 108 |
| A 5-parts Division Point; the Pendulum Idea Helps | p. 111 |
| A Method for Finding a 7-parts Division Point | p. 115 |
| The Investigation Continues: Try the Pendulum Idea on the 7-parts Division Method | p. 117 |
| The Search for 11-parts and 13-parts Division Points | p. 120 |
| Another Method for Finding 11-parts and 13-parts Division Points | p. 122 |
| Continue the Trend of Thought: 15-parts and 17-parts Division Points | p. 125 |
| Some Ideas related to the Ratios for Equal-parts Division based on Similar Triangles | p. 130 |
| Towards More Division Parts | p. 134 |
| Generalizing to all Rectangles | p. 134 |
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