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2. Mathematics of paper folding - Wikipedia

   en.wikipedia.org/wiki/Mathematics_of_paper_folding

   In 1893, Indian civil servant T. Sundara Row published Geometric Exercises in Paper Folding which used paper folding to demonstrate proofs of geometrical constructions. This work was inspired by the use of origami in the kindergarten system. Row demonstrated an approximate trisection of angles and implied construction of a cube root was impossible.

3. Geometric Folding Algorithms - Wikipedia

   en.wikipedia.org/wiki/Geometric_Folding_Algorithms

   The book is organized into three sections, on linkages, origami, and polyhedra. [1] [2]Topics in the section on linkages include the Peaucellier–Lipkin linkage for converting rotary motion into linear motion, [4] Kempe's universality theorem that any algebraic curve can be traced out by a linkage, [1] [4] the existence of linkages for angle trisection, [1] and the carpenter's rule problem on ...

4. Geometric Exercises in Paper Folding - Wikipedia

   en.wikipedia.org/wiki/Geometric_Exercises_in...

   Geometric Exercises in Paper Folding is a book on the mathematics of paper folding. It was written by Indian mathematician T. Sundara Row, first published in India in 1893, and later republished in many other editions. Its topics include paper constructions for regular polygons, symmetry, and algebraic curves. According to the historian of ...

5. Napkin folding problem - Wikipedia

   en.wikipedia.org/wiki/Napkin_folding_problem

   The napkin folding problem is a problem in geometry and the mathematics of paper folding that explores whether folding a square or a rectangular napkin can increase its perimeter. The problem is known under several names, including the Margulis napkin problem , suggesting it is due to Grigory Margulis , and the Arnold's rouble problem referring ...

6. Regular paperfolding sequence - Wikipedia

   en.wikipedia.org/wiki/Regular_paperfolding_sequence

   Substituting x = 0.5 into the generating function gives a real number between 0 and 1 whose binary expansion is the paperfolding word (;) = = This number is known as the paperfolding constant [2] and has the value

7. Huzita–Hatori axioms - Wikipedia

   en.wikipedia.org/wiki/Huzita–Hatori_axioms

   Given two lines l 1 and l 2, there is a fold that places l 1 onto l 2. This is equivalent to finding a bisector of the angle between l 1 and l 2. Let p 1 and p 2 be any two points on l 1, and let q 1 and q 2 be any two points on l 2. Also, let u and v be the unit direction vectors of l 1 and l 2, respectively; that is:

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9. Fold-and-cut theorem - Wikipedia

   en.wikipedia.org/wiki/Fold-and-cut_theorem

   The fold-and-cut theorem states that any shape with straight sides can be cut from a single (idealized) sheet of paper by folding it flat and making a single straight complete cut. [1] Such shapes include polygons, which may be concave, shapes with holes, and collections of such shapes (i.e. the regions need not be connected).