A Fuller Explanation: Index S through Z

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Amy C. Edmondson

A Fuller Explanation

Index

[ A through H ]

[ I through R ]

S through T

[ U through Z ]

(Bold print indicates page number which includes illustration of entry.)

S	-module, 167, 168, 216
S	aint Peter's Cathedral Dome, 243, 245
S	chlaefli's formula, 44
S	cience of spatial complexity, 9, 23, 267, 269
	order inherent in space, 23, 71, 84-86, 100, 106, 154, 157, 168, 175, 230, 267
	shape of space, 10-11, 36, 68, 92, 101-102, 107, 109, 114, 129, 130, 143, 144, 145, 146
	spatial constraints, 9, 10, 36, 41, 42, 68, 84, 101, 119, 132, 133, 176-177, 209, 239, 242, 257
S	emiregular polyhedra, 28, 49, 52
S	hell, or single-layer, systems, 117-119, 164, 227, 238, 239;
	see also Virus
S	ixness
	cosmic, 223
	six positive-negative linear directions, 93, 114, 267
S	lenderness ratio, 246
S	nelson, Kenneth, 251
S	odium chloride, 33
S	olar system as tensegrity, 247-248
S	olids
	geometric, 7, 17, 34, 154
	impossibility of, 7, 16, 27, 61, 124, 125, 171, 184, 245, 249, 250
	phase changes in chemistry, 163, 172-174
	solid-things thinking, 245, 250, 267
S	olway, Carl: Carl Solway Gallery, 171
S	outheast Asian basketry, 233
S	pace-filling
	all-space filling, 175, 183, 196, 200, 203-205
	complementarity, 170;
	see also Isotropic vector matrix, alternating octahedra and tetrahedra
	complex, 173, 196, 203, 229
	cubes, 175, 177, 181
	domain of sphere, 138
	filling space with closepacked spheres, 107-108, 109, 228
	formula for space filling, 180, 185-188, 203-205
	IVM and, 127, 132, 139, 140, 180, 189;
	see also Isotropic vector matrix
	octet symmetry, 121, 178, 199, 203
	rhombic dodecahedron, 181, 182
	rhombohedron, 135, 180, 185
	space fillers, 175, 179-181, 185, 188, 196, 200, 201, 203
	teams, 180-181, 185
	truncated octahedron, 184, 204;
	see also Tetrakaidecahedron
	see also Mite
S	paceship Earth, 5, 20, 61, 258, 260, 261
S	pace Structures, 10, 47
S	pecial case, 65, 66, 259
	special-case experience, 13, 28
	special-case system, 66, 81, 157
S	phere
	impossibility of, 15-18, 235, 237-238;
	see also Infinity
	omnisymmetrical form, 101, 114, 208, 228
	surface area of, 17, 223, 235, 262
S	pheric, see Rhombic dodecahedron
S	pherical polyhedra, 207, 208, 209, 210, 212-213, 215, 220, 223, 233, 263
S	pherical triangles, 29-30, 210, 214, 216, 223, 226
S	pherical trigonometry, 79, 242-243
S	tar tetrahedron, 46, 210, 224
S	tellation, 47
	definition of, 47-48
	degenerate stellation, 48, 50, 51, 52, 137, 139, 140, 181, 216
S	traight line
	chord, 17, 238, 263
	Euclidean, 207
	imaginary straight line, 7
	impossibility of, 4, 6, 8
	vector as replacement for, 8, 38, 68
S	tructural stability
	applied loads, 63-64
	necklace, 54-57
	prime structural systems, 60-63, 117, 236
	stability and jitterbug, 159-161
	stability formula, 60
	structure defined, 61
	triangulation, 59-60- 60-63, 97, 117, 119, 140, 141, 189, 226, 233, 235, 237, 242, 256
	see also Triangles, stability of
S	unset
	Fuller anecdotes about, 2, 4, 20
	sunclipse, 20
	sunsight, 20
S	ymmetry
	defined, 52-53, 101, 189
	mirror symmetry, 53, 101, 190
	octet symmetry, 121, 178, 199, 203
	omnisymmetry, 88, 89, 91, 93, 101, 114, 140, 141, 228;
	see also Isotropic vector matrix
	planar symmetry, 85-87
	polyhedra as symmetry patterns, 68, 168, 180
	rotational symmetry, 53, 101, 113, 165-166, 169, 176, 209, 210
	seven unique axes of symmetry, 209, 210, 211, 213, 230
	spatial symmetry, see omnisymmetry
	see also Closepacked spheres, Great circles, Interprecessing, Isotropic vector matrix, Sixness, Four planes of symmetry
S	ynergetics accounting, 130-131
	cosmic accounting, 193
S	ynergetics: The Geometry of Thinking, 4, 6, 13, 24, 28, 29, 33, 34, 44, 49, 70, 72, 74 and 74, 95, 102, 111,
	174, 183, 197, 207, 250
	"Contributions to Synergetics," 37, 148, 157, 167, 168, 180, 196-197
S	ynergetics 2: Further Explorations in the Geometry of Thinking, 167
S	ystem, definition of, 25-26, 38, 44

T	akeout angle, see Angular topology
T	ensegrity, 3, 244, 245, 247
	interplay of tension and compression in Universe, 244-245- 245-249, 250, 251, 255-256, 257
	models, 250-251- 251-255
	pneumatics, 255-256
	tensile strength, 34, 246, 252-253
	tension materials, 98, 246, 247, 253, 267
	use of tension in construction, 249, 250
T	essellations, 39-40- 40-42, 176, 177, 236
T	etrahedron
	basic unit in synergetics, 28, 38, 111, 147, 149, 150, 172-173, 212
	central angle of, 95, 121, 136, 137
	cheese, 147, 155
	four-dimensional, 71, 73, 93
	inside-out, 63, 162
	isotropic vector matrix and, 134-135- 135-141
	jitterbug and, 162
	minimum system of Universe, 26-27, 31-32, 73, 93, 97, 111, 131, 140, 146, 149, 158, 172, 189, 190, 202, 223
	net, 193-194
	pattern integrity, 59
	perpendicular symmetry of, 122-124, 154-155
	rigidity of, 63, 142
	sphere-cluster tetrahedra,
	see Closepacked spheres
	subdivision of tetrahedron, 150, 153, 155, 189, 190;
	see also A-module
	surface angles of, 57, 77
	tetrahedroning, 21-22, 187-188
	truncation of, 46-47, 135
	topology of, 43, 212
	unit of volume, 144-145, 148, 149, 150, 152, 158, 163, 201
T	etrakaidecahedron, 48, 135-136, 184-185
T	hree-way grid, 233, 242, 256;
	see also Structural stability, triangulation
T	itanium shell experiment, 239
T	hinking, Fuller's explanation of, 31-33
T	riangles
	equilateral triangles in vector equilibrium, 91, 117
	similar, 146-147, 148
	stability of, 26, 55-56, 61, 97, 161, 244, 262;
	see also Structural stability, triangulation
	triangling" instead of squaring, 21
	triangular numbers, 109, 110
	see also Closepacked spheres, Isotropic vector matrix
T	ropic of Cancer, see Lesser circles
T	runcation, 46, 184
	definition of, 46-47
	degenerate, 47, 51, 52, 90, 92, 155
	isotropic vector matrix and, 135, 136, 140, 184-188
T	russ,
	see Octet Truss
T	une-in-ability, 30-31
T	welve degrees of freedom, 93-97, 114, 227, 267
	degrees of freedom in space, 94-95, 96
	freedom of motion in sphere packing, 111
	planar analogy, 93-94
	tetrahedron and degrees of freedom, 95-97
	see also Bicycle wheel

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