Giant Triangles

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https://hdl.handle.net/10587/1239
Publications by Eva Knoll pertaining to Giant Triangles.

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Browsing Giant Triangles by Subject "Mathematics"

Now showing 1 - 3 of 3
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    Barn-Raising an Endo-Pentakis-Icosi-Dodecahedron
    (Bridges: Mathematical Connections in Art, Music, and Science, 1999) Knoll, Eva; Morgan, Simon
    The workshop is planned as the raising of an endo-pentakis-icosi-dodecahedron with a 1 meter edge length. This collective experience will give the participants new insights about polyhedra in general, and deltahedra in particular. The specific method of construction applied here, using kite technology and the snowflake layout allows for a perspective entirely different from that found in the construction of hand-held models or the observation of computer animations. In the present case, the participants will be able to pace the area of the flat shape and physically enter the space defined by the polyhedron.
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    Circular Origami: a Survey of Recent Results
    (A.K Peters, 2001) Knoll, Eva
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    Decomposing Deltahedra
    (International Society of the Arts, Mathematics, and Architecture, 2000) Knoll, Eva
    Deltahedra are polyhedra with all equilateral triangular faces of the same size. We consider a class of we will call ‘regular’ deltahedra which possess the icosahedral rotational symmetry group and have either six or five triangles meeting at each vertex. Some, but not all of this class can be generated using operations of subdivision, stellation and truncation on the platonic solids. We develop a method of generating and classifying all deltahedra in this class using the idea of a generating vector on a triangular grid that is made into the net of the deltahedron. We observed and proved a geometric property of the length of these generating vectors and the surface area of the corresponding deltahedra. A consequence of this is that all deltahedra in our class have an integer multiple of 20 faces, starting with the icosahedron which has the minimum of 20 faces.