Magnus J Wenninger
Spherical Models
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Magnus J Wenninger
Spherical Models
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Well-illustrated, practical approach to creating star-faced spherical forms that can serve as basic structures for geodesic domes. Complete instructions for making models from circular bands of paper with just a ruler and compass. 1979 edition.
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Well-illustrated, practical approach to creating star-faced spherical forms that can serve as basic structures for geodesic domes. Complete instructions for making models from circular bands of paper with just a ruler and compass. 1979 edition.
Produktdetails
- Produktdetails
- Verlag: Dover Publications
- Seitenzahl: 176
- Erscheinungstermin: 13. Juni 2012
- Englisch
- Abmessung: 277mm x 205mm x 11mm
- Gewicht: 454g
- ISBN-13: 9780486409214
- ISBN-10: 048640921X
- Artikelnr.: 21599008
- Verlag: Dover Publications
- Seitenzahl: 176
- Erscheinungstermin: 13. Juni 2012
- Englisch
- Abmessung: 277mm x 205mm x 11mm
- Gewicht: 454g
- ISBN-13: 9780486409214
- ISBN-10: 048640921X
- Artikelnr.: 21599008
Foreword by Arthur L. Loeb Preface Introduction: Basic properties of the
sphere I. The regular spherical models The spherical hexahedron or cube
General instructions for making models The spherical octahedron The
spherical tetrahedron The spherical icosahedron and dodecahedron The
polyhedral kaleidoscope Summary II. The semiregular spherical models The
spherical cuboctahedron The spherical icosidodecahedron Spherical triangles
as characteristic triangles The five truncated regular spherical models The
rhombic spherical models The rhombitruncated spherical models The snub
forms as a spherical models The spherical duals Summary III. Variations
Regular and semiregular variations Star-faced spherical models IV. Geodesic
domes The simplest geodesic domes Geodesic domes derived from the
icosahedron General instructions for making geodesic models An alternative
method of approaching geodesic segmentation Introduction to geodesic
symbolism and classification Geodesic models derived from the dodecahedron
An alternative for geodesic segmentation of the dodecahedron A second
alternative for geodesic segmentation of the icosahedron An alternative for
geodesic segmentation of the snub dodecahedron A third alternative for
geodesic segmentation of the icosahedron Final comments V. Miscellaneous
models "Honeycomb models, edge models, and nolids" An introduction to the
notion of polyhedral density Edge models of stellated forms Some final
comments about geodesic domes Epilogue Appendix References List of models
sphere I. The regular spherical models The spherical hexahedron or cube
General instructions for making models The spherical octahedron The
spherical tetrahedron The spherical icosahedron and dodecahedron The
polyhedral kaleidoscope Summary II. The semiregular spherical models The
spherical cuboctahedron The spherical icosidodecahedron Spherical triangles
as characteristic triangles The five truncated regular spherical models The
rhombic spherical models The rhombitruncated spherical models The snub
forms as a spherical models The spherical duals Summary III. Variations
Regular and semiregular variations Star-faced spherical models IV. Geodesic
domes The simplest geodesic domes Geodesic domes derived from the
icosahedron General instructions for making geodesic models An alternative
method of approaching geodesic segmentation Introduction to geodesic
symbolism and classification Geodesic models derived from the dodecahedron
An alternative for geodesic segmentation of the dodecahedron A second
alternative for geodesic segmentation of the icosahedron An alternative for
geodesic segmentation of the snub dodecahedron A third alternative for
geodesic segmentation of the icosahedron Final comments V. Miscellaneous
models "Honeycomb models, edge models, and nolids" An introduction to the
notion of polyhedral density Edge models of stellated forms Some final
comments about geodesic domes Epilogue Appendix References List of models
Foreword by Arthur L. Loeb Preface Introduction: Basic properties of the
sphere I. The regular spherical models The spherical hexahedron or cube
General instructions for making models The spherical octahedron The
spherical tetrahedron The spherical icosahedron and dodecahedron The
polyhedral kaleidoscope Summary II. The semiregular spherical models The
spherical cuboctahedron The spherical icosidodecahedron Spherical triangles
as characteristic triangles The five truncated regular spherical models The
rhombic spherical models The rhombitruncated spherical models The snub
forms as a spherical models The spherical duals Summary III. Variations
Regular and semiregular variations Star-faced spherical models IV. Geodesic
domes The simplest geodesic domes Geodesic domes derived from the
icosahedron General instructions for making geodesic models An alternative
method of approaching geodesic segmentation Introduction to geodesic
symbolism and classification Geodesic models derived from the dodecahedron
An alternative for geodesic segmentation of the dodecahedron A second
alternative for geodesic segmentation of the icosahedron An alternative for
geodesic segmentation of the snub dodecahedron A third alternative for
geodesic segmentation of the icosahedron Final comments V. Miscellaneous
models "Honeycomb models, edge models, and nolids" An introduction to the
notion of polyhedral density Edge models of stellated forms Some final
comments about geodesic domes Epilogue Appendix References List of models
sphere I. The regular spherical models The spherical hexahedron or cube
General instructions for making models The spherical octahedron The
spherical tetrahedron The spherical icosahedron and dodecahedron The
polyhedral kaleidoscope Summary II. The semiregular spherical models The
spherical cuboctahedron The spherical icosidodecahedron Spherical triangles
as characteristic triangles The five truncated regular spherical models The
rhombic spherical models The rhombitruncated spherical models The snub
forms as a spherical models The spherical duals Summary III. Variations
Regular and semiregular variations Star-faced spherical models IV. Geodesic
domes The simplest geodesic domes Geodesic domes derived from the
icosahedron General instructions for making geodesic models An alternative
method of approaching geodesic segmentation Introduction to geodesic
symbolism and classification Geodesic models derived from the dodecahedron
An alternative for geodesic segmentation of the dodecahedron A second
alternative for geodesic segmentation of the icosahedron An alternative for
geodesic segmentation of the snub dodecahedron A third alternative for
geodesic segmentation of the icosahedron Final comments V. Miscellaneous
models "Honeycomb models, edge models, and nolids" An introduction to the
notion of polyhedral density Edge models of stellated forms Some final
comments about geodesic domes Epilogue Appendix References List of models