WikiDer > Xoshedr

Oddiy to'plam n-gonal hosohedra
	Sferadagi olti burchakli hosohedronga misol
Turi	Muntazam ko'pburchak yoki sferik plitka
Yuzlar	n digons
Qirralar	n
Vertices	2
χ	2
Vertex konfiguratsiyasi	2n
Wythoff belgisi	n \| 2 2
Schläfli belgisi	{2,n}
Kokseter diagrammasi
Simmetriya guruhi	D.nh, [2, n], (* 22n), buyurtma 4n
Qaytish guruhi	D.n, [2, n]+, (22n), 2n buyurtma
Ikki tomonlama ko'pburchak	n-gonal dihedron

Hosohedron

Bu plyaj to'pi oltitali hosohedrni ko'rsatadi lune yuzlar, agar uchlaridagi oq doiralar olib tashlansa.

Yilda geometriya, an n-gonal hosohedron a tessellation ning Lunes sharsimon yuzada, shunday qilib har bir lune bir xil ikkiga bo'linadi qutbli qarama-qarshi tepaliklar.

Muntazam n-gonal ssoedrga ega Schläfli belgisi {2, n}, har biri bilan sferik lune ega bo'lish ichki burchak 2 $π$ /n radianlar (360/n daraja).^[1]^[2]

Hosohedra odatdagi polyhedra sifatida

Schläfli belgisi {bo'lgan muntazam ko'pburchak uchunm, n}, ko'p qirrali yuzlar soni:

{ displaystyle N_ {2} = { frac {4n} {2m + 2n-mn}}}

The Platonik qattiq moddalar antik davrga ma'lum bo'lgan yagona butun echimlar m ≥ 3 va n ≥ 3. Cheklov m ≥ 3 ko'pburchak yuzlar kamida uchta tomonga ega bo'lishi kerakligini tasdiqlaydi.

Polyhedrani a sifatida ko'rib chiqishda sferik plitka, chunki bu cheklov yumshatilishi mumkin, chunki digons (2-gons) sifatida ifodalanishi mumkin sferik plyonkalar, nolga teng bo'lmagan maydon. Ruxsat berish m = 2 hosohedra bo'lgan muntazam ko'p qirrali yangi cheksiz sinfni qabul qiladi. Sharsimon yuzada ko'p qirrali {2,n} sifatida ifodalanadi n ichki burchaklari bilan, baland soyalar 2 $π$ /n. Bu barcha lunes ikkita umumiy tepalikka ega.

Muntazam trigonal hosohedron, {2,3}, sharda 3 sferik oyning tessellasi sifatida ifodalanadi.	Muntazam to'rtburchak hosohedron, {2,4}, sharda to'rtta sferik oyning tessellasi sifatida ifodalanadi.

Oilasi muntazam (n-gonal) hosohedra (2 tepalik)
n	2	3	4	5	6	7	8	9	10	11	12...
n-gonal goshedrli tasvir
Schläfli belgisi {2,n}	{2,2}	{2,3}	{2,4}	{2,5}	{2,6}	{2,7}	{2,8}	{2,9}	{2,10}	{2,11}	{2,12}
Kokseter diagrammasi

Kaleydoskopik simmetriya

2n digonal (lune) 2 ning yuzlarin-hosohedron, {2,2n}, ning asosiy domenlarini ifodalaydi uch o'lchovli dihedral simmetriya: C_nv (tsiklik), [n], (*nn), 2-buyurtman. Ko'zgu domenlari oynali tasvirlar sifatida navbatma-navbat rangli lunalar bilan ko'rsatilishi mumkin. Har bir luneni ikkita sferik uchburchakka ajratish hosil qiladi bipiramidalarva belgilang dihedral simmetriya D._nh, buyurtma 4n.

Simmetriya (2-buyurtman)	C_nv, [n]	C_1v, [ ]	C_2v, [2]	C_3v, [3]	C_4v, [4]	C_5v, [5]	C_6v, [6]
2n-gonal ssoedr	Schläfli belgisi {2,2n}	{2,2}	{2,4}	{2,6}	{2,8}	{2,10}	{2,12}
Rasm	Shu bilan bir qatorda rangli asosiy domenlar

Steinmetz qattiq moddasi bilan aloqasi

Tetragonal hosohedron topologik jihatdan tenglikka teng bisilindr Steinmetz qattiq, ikkita tsilindrning to'g'ri burchak ostida kesishishi.^[3]

Hosil polyhedra

The ikkilamchi n gonal shosohedron {2,n} bo'ladi n-gonal dihedron, {n, 2}. {2,2} poliedrasi o'z-o'ziga xosdir, ham hosohedr, ham dihedron.

Xsoedrni boshqa poliedralar singari o'zgartirish mumkin, a ishlab chiqarish uchun kesilgan o'zgaruvchanlik. Qisqartirilgan n-gonal ssoedr n-gonaldir prizma.

Apeirogonal hosohedron

Chegarada hosohedron an bo'ladi apeirogonal hosohedr ikki o'lchovli tessellation sifatida:

Hosotoplar

Ko'p o'lchovli umuman o'xshashlari deyiladi hosotoplar. Bilan muntazam xosotop Schläfli belgisi {2,p,...,q} ikkita tepalikka ega, ularning har biri a tepalik shakli {p,...,q}.

The ikki o'lchovli hosotop, {2}, a digon.

Etimologiya

"Xsoedron" atamasi tomonidan yaratilgan H.S.M. Kokseter^{[shubhali – muhokama qilish]}, va ehtimol yunonchadan olinganxosos) "Shuncha ko'p", shunda g'oshedr "bo'lishi mumkin"qancha bo'lsa xohlagancha yuzlar ».^[4]

Shuningdek qarang

Adabiyotlar

^ Kokseter, Muntazam politoplar, p. 12
^ Xulosa Muntazam polytopes, p. 161
^ Vayshteyn, Erik V. "Steinmetz Solid". MathWorld.
^ Stiven Shvartsman (1994 yil 1-yanvar). Matematikaning so'zlari: Ingliz tilida ishlatiladigan matematik atamalarning etimologik lug'ati. MAA. pp.108–109. ISBN 978-0-88385-511-9.

MakMullen, Piter; Shulte, Egon (2002 yil dekabr), Abstrakt muntazam polipoplar (1-nashr), Kembrij universiteti matbuoti, ISBN 0-521-81496-0
Kokseter, H.S.M; Muntazam Polytopes (uchinchi nashr). Dover Publications Inc. ISBN 0-486-61480-8

Tashqi havolalar

Vayshteyn, Erik V. "Hoshedr". MathWorld.

[1] Kokseter, Muntazam politoplar, p. 12

[2] Xulosa Muntazam polytopes, p. 161

[3] Vayshteyn, Erik V. "Steinmetz Solid". MathWorld.

[Schwartzman1994-4] Stiven Shvartsman (1994 yil 1-yanvar). Matematikaning so'zlari: Ingliz tilida ishlatiladigan matematik atamalarning etimologik lug'ati. MAA. pp.108–109. ISBN 978-0-88385-511-9.

[1]

[2]

[3]

[4]

v t e Polyhedra
Yuzlar soni bo'yicha berilgan
1-10 yuz	Monoedron Dihedron Trihedron Tetraedr Pentahedr Geksaedr Geptaedr Oktaedr Enneahedron Dekaedr
11-20 yuz	Xendekaedr Dodekaedr Tridekaedr Tetradekaedr Pentadekaedr Hexadecahedron Geptadekaedr Oktadekaedr Enneadecahedron Ikosaedr
> 21 yuz	Ikozetetraedr (24) Triakontaedr (30) Ikozidodekaedr (32) Geksekontaedr (60) Enneakontaedr (90) Gektotriadioedr (132) Apeyrohedr (∞)

Navigation