"종이접기의 수학"의 두 판 사이의 차이

노트

위키데이터

• ID : Q3299105

말뭉치

1. Origami and paper folding can provide a particularly accessible, visual means of inspiring and exciting children and older students about mathematics.^[1]
2. Origami models of geometric 2D and 3D objects can provide a practical starting point for exploring mathematics.^[1]
3. For younger children (Reception, Years 1 and 2), it may be best to use a venue with plenty of space to spread out 2D paper folding activities, such as a hall or gym.^[1]
4. Origami is great for thinking about shapes and space.^[2]
5. A quick search online will lead you to lots of origami guides.^[2]
6. One uncut square of paper can, in the hands of an origami artist, be folded into a bird, a frog, a sailboat, or a Japanese samurai helmet beetle.^[3]
7. The art of origami has been going through a renaissance over the past 30 years, with new designs being created at ever-increasing levels of complexity.^[3]
8. Indeed, if you take an origami model, of a bird for example, and carefully unfold it, you’ll see the pattern of creases that act as a blueprint for the model.^[3]
9. Most traditional origami models fold flat, meaning you could press the model in a book without crumpling it.^[3]
10. The wonders of mathematical origami can be easily seen in its application.^[4]
11. “Using origami design principles to fold reprogrammable mechanical metamaterials,” Science, 345, 647-650.^[4]
12. It’s easy to get a feel for origami-mathematics for yourself.^[4]
13. One of the first books to explore the mathematics behind paper folding in the West is T. Sundara Row’s Geometrical Exercises in Paper Folding, published in Madras, India in 1893.^[4]
14. From the Brief History of the Ancient Art of Paperfolding I gather that Origami gained acceptance in the West in the early 1950s.^[5]
15. In the geometry of paper folding, a straight line becomes a crease or a fold.^[5]
16. As in the usual Geometry, the distinction is being made between experimentation with the physical paper and the abstract theory of "paper folding".^[5]
17. In the Paper Folding Geometry, a straight line - a fold - is clearly a primary object; a point is defined as the intersection of two folds.^[5]
18. Paper folding played an integral role in Chinese ceremonial purposes, especially funerals.^[6]
19. That’s great if you already have an origami figure.^[6]
20. Origami has changed the ways we’ve thought about art, math, and science.^[6]
21. How has origami impacted your life?^[6]
22. The art of origami or paper folding has received a considerable amount of mathematical study.^[7]
23. This work was inspired by the use of origami in the kindergarten system.^[7]
24. The construction of origami models is sometimes shown as crease patterns.^[7]
25. The classical problem of doubling the cube can be solved using origami.^[7]
26. A few questions immediately arise: Why did paper folding become a non-instrument?^[8]
27. In traditional origami, constructions are done using a single sheet of colored paper that is often, though not always, square.^[9]
28. In modular origami, a number of individual "units," each folded from a single sheet of paper, are combined to form a compound structure.^[9]
29. Origami is an extremely rich art form, and constructions for thousands of objects, from dragons to buildings to vegetables have been devised.^[9]
30. Many mathematical shapes can also be constructed, especially using modular origami.^[9]

소스

메타데이터

위키데이터

• ID : Q3299105

Spacy 패턴 목록

• [{'LOWER': 'mathematics'}, {'LOWER': 'of'}, {'LOWER': 'paper'}, {'LEMMA': 'folding'}]