求 Dido--Thank You 的譜..簡譜.五線都可

我是吹tenor sax~~的

大大幫忙一下巴~~ 感激不盡!

1 Answer

Rating
  • Anonymous
    8 years ago
    Favorite Answer

    交大游凱復的心得整理:

    Examples

    The cube can generate all the convex uniform polyhedra with octahedral symmetry. The first row generates the Archimedean solids and the second row the Catalan solids, the second row forms being duals of the first. Comparing each new polyhedron with the cube, each operation can be visually understood. (Two polyhedron forms don't have single operator names given by Conway.)

    Cube

    "seed" ambo

    (rectify) truncate bitruncate expand

    (cantellate) bevel

    (omnitruncate) snub

    Uniform polyhedron-43-t0.png

    C Uniform polyhedron-43-t1.png

    aC = djC Uniform polyhedron-43-t01.png

    tC = dkdC Uniform polyhedron-43-t12.png

    tdC = dkC Uniform polyhedron-43-t02.png

    eC = aaC = doC Uniform polyhedron-43-t012.png

    bC = taC = dmC = dkjC Uniform polyhedron-43-s012.png

    sC = dgC

    dual join kis

    (vertex-bisect) ortho

    (edge-bisect) meta

    (full-bisect) gyro

    Uniform polyhedron-43-t2.png

    dC Rhombicdodecahedron.jpg

    jC = daC Triakisoctahedron.jpg

    kdC = dtC Tetrakishexahedron.jpg

    kC = dtdC Deltoidalicositetrahedron.jpg

    oC = deC = daaC Disdyakisdodecahedron.jpg

    mC = dbC = kjC Pentagonalicositetrahedronccw.jpg

    gC = dsC

Still have questions? Get your answers by asking now.