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Concept in geometry
geometry, the order-7 triangular tiling is a regular tiling of the hyperbolic plane with a Schläfli symbol of {3,7}. The symmetry group of the tiling is the
Order-7_triangular_tiling
Semiregular tiling of the hyperbolic plane
In geometry, the order-7 truncated triangular tiling, sometimes called the hyperbolic soccerball, is a semiregular tiling of the hyperbolic plane. There
Truncated order-7 triangular tiling
Truncated_order-7_triangular_tiling
Regular tiling of the plane
geometry, the triangular tiling or triangular tessellation is one of the three regular tilings of the Euclidean plane, and is the only such tiling where the
Triangular_tiling
regular honeycombs with order-7 triangular tiling cells: {3,7,p}. It is a part of a sequence of regular honeycombs with heptagonal tiling vertex figures: {p
Order-7-3 triangular honeycomb
Order-7-3_triangular_honeycomb
Tiling of the hyperbolic plane
In geometry, the heptagonal tiling is a regular tiling of the hyperbolic plane. It is represented by Schläfli symbol of {7,3}, having three regular heptagons
Heptagonal_tiling
Tiling of the hyperbolic plane
geometry, the order-7 heptagrammic tiling is a tiling of the hyperbolic plane by overlapping heptagrams. This tiling is a regular star-tiling, and has Schläfli
Order-7_heptagrammic_tiling
Concept in geometry
In geometry, the order-8 triangular tiling is a regular tiling of the hyperbolic plane. It is represented by Schläfli symbol of {3,8}, having eight regular
Order-8_triangular_tiling
truncated infinite-order triangular tiling is a uniform tiling of the hyperbolic plane with a Schläfli symbol of t{3,∞}. The dual of this tiling represents the
Truncated infinite-order triangular tiling
Truncated_infinite-order_triangular_tiling
Automorphism group of the Klein quartic
Dually, it can be tiled with 56 equilateral triangles, with 24 vertices, each of degree 7, as a quotient of the order-7 triangular tiling. Klein's quartic
PSL(2,7)
Symmetric subdivision in hyperbolic geometry
hyperbolic geometry, a uniform hyperbolic tiling (or regular, quasiregular or semiregular hyperbolic tiling) is an edge-to-edge filling of the hyperbolic
Uniform tilings in hyperbolic plane
Uniform_tilings_in_hyperbolic_plane
hyperbolic honeycombs with order-7 triangular tiling vertex figures, {p,3,7}. It is a part of a sequence of hyperbolic honeycombs, {3,p,7}. In the geometry of
Order-7_tetrahedral_honeycomb
Geometric tiling
an expanded heptagonal tiling or expanded order-7 triangular tiling. The dual tiling is called a deltoidal triheptagonal tiling, and consists of congruent
Rhombitriheptagonal_tiling
Semiregular tiling of the hyperbolic plane
In geometry, the truncated order-8 triangular tiling is a semiregular tiling of the hyperbolic plane. There are two hexagons and one octagon on each vertex
Truncated order-8 triangular tiling
Truncated_order-8_triangular_tiling
not only the triangular tiling, but also the coloring, and hence are a proper subgroup of the full isometry group. The corresponding tiling of the hyperbolic
Small_cubicuboctahedron
arrangement as the regular order-7 triangular tiling, {3,7}. The full set of edges coincide with the edges of a heptakis heptagonal tiling. It is related to a
Heptagrammic-order heptagonal tiling
Heptagrammic-order_heptagonal_tiling
Semiregular tiling of the hyperbolic plane
The tiling has a vertex configuration of 3.14.14. The dual tiling is called an order-7 triakis triangular tiling, seen as an order-7 triangular tiling with
Truncated_heptagonal_tiling
the ideal boundary) with seven hexagonal tilings existing around each edge and with an order-7 triangular tiling vertex figure. It a part of a sequence
Order-3-7_hexagonal_honeycomb
Uniform tiling of the Euclidean plane
forms, 7 which are topologically distinct. (The truncated triangular tiling is topologically identical to the hexagonal tiling.) This tiling can be considered
Truncated_trihexagonal_tiling
Regular space-filling tessellation with Schläfli symbol (7,3,7)
ideal boundary) with seven heptagonal tilings existing around each edge and with an order-7 triangular tiling vertex figure. It a part of a sequence
Order-3-7 heptagonal honeycomb
Order-3-7_heptagonal_honeycomb
Regular tiling of a two-dimensional space
one of three regular tilings of the plane. The other two are the triangular tiling and the square tiling. The hexagonal tiling has a structure consisting
Hexagonal_tiling
Euclidean 3-space) 1 p + 1 q = 1 2 : Euclidean plane tiling 1 p + 1 q < 1 2 : Hyperbolic plane tiling {\displaystyle {\begin{aligned}&{\frac {1}{p}}+{\frac
List_of_regular_polytopes
Semiregular tiling of a plane
forms, 7 which are topologically distinct. (The truncated triangular tiling is topologically identical to the hexagonal tiling.) This tiling is topologically
Truncated_hexagonal_tiling
Polyhedron with two kinds of faces
the triheptagonal tiling, vertex figure (3.7)2 - a quasiregular tiling based on the order-7 triangular tiling and heptagonal tiling. Coxeter, H.S.M. et
Quasiregular_polyhedron
Tiling of a plane by regular hexagons and equilateral triangles
trihexagonal tiling can be geometrically distorted into topologically equivalent tilings of lower symmetry. In these variants of the tiling, the edges do
Trihexagonal_tiling
infinitely many dodecahedra existing around each vertex in an order-7 triangular tiling vertex arrangement. It a part of a sequence of regular polytopes
Order-7 dodecahedral honeycomb
Order-7_dodecahedral_honeycomb
Independent video game
as a truncated order-7 triangular tiling by default (with a few exceptions). The player can also choose to play on some other tilings and honeycombs in
HyperRogue
Semiregular tiling of the Euclidean plane
degenerate into edges, a triangular tiling results, constructed as a snub triangular tiling, . There is one related 2-uniform tiling, having hexagons dissected
Rhombitrihexagonal_tiling
Theorem in algebraic geometry
would also include a reflection. The polygons in the tiling are not fundamental domains – the tiling by (2,3,7) triangles refines both of these and is not
Hurwitz's automorphisms theorem
Hurwitz's_automorphisms_theorem
Tessellation Uniform tiling Convex uniform honeycombs List of k-uniform tilings List of Euclidean uniform tilings Uniform tilings in hyperbolic plane Weisstein
List_of_tessellations
Periodic tiling of the hyperbolic disk
In geometry, the order-3 apeirogonal tiling is a regular tiling of the hyperbolic plane. It is represented by the Schläfli symbol {∞,3}, having three regular
Order-3_apeirogonal_tiling
Compact Riemann surface of genus 3
cases. 24 × 7 = 168 56 × 3 = 168 The covering tilings on the hyperbolic plane are the order-3 heptagonal tiling and the order-7 triangular tiling. The automorphism
Klein_quartic
Operation in Euclidean geometry
any regular self-dual polyhedron or tiling will result in another regular polyhedron or tiling with a tiling order of 4, for example the tetrahedron {3
Rectification_(geometry)
Type of non-Euclidean geometry
dubbed the "hyperbolic soccerball" (more precisely, a truncated order-7 triangular tiling). Instructions on how to make a hyperbolic quilt, designed by
Hyperbolic_geometry
Square tiling Triangular tiling Hexagonal tiling Apeirogon Dihedron Lobachevski plane Hyperbolic tiling Order-7 heptagrammic tiling Heptagrammic-order heptagonal
List_of_mathematical_shapes
Semiregular tiling of the Euclidean plane
densest packing from the triangular tiling. This semiregular tiling is a member of a sequence of snubbed polyhedra and tilings with vertex figure (3.3
Snub_trihexagonal_tiling
Semiregular tiling of the plane
In geometry, the snub square tiling is a semiregular tiling of the Euclidean plane. There are three triangles and two squares on each vertex. Its Schläfli
Snub_square_tiling
order 84(3 − 1) = 168 = 23·3·7, which is a simple group; (or order 336 if one allows orientation-reversing isometries). The next possible genus is 7,
Hurwitz_surface
Spherical polyhedron composed of lunes
must have at least three sides. When considering polyhedra as a spherical tiling, this restriction may be relaxed, since digons (2-gons) can be represented
Hosohedron
Type of tessallation
We define the order of a sphinx frame on a triangular lattice by the number of triangles at the "tail" end. An order-2 frame can be tiled by four sphinxes
Sphinx_tiling
Skew polygon derived from a polytope
also exist as Petrie polygons of the regular hyperbolic tilings, like the order-7 triangular tiling, {3,7}: The Petrie polygon for the regular polychora
Petrie_polygon
Polyhedron with eight triangular faces
have six vertices, eight triangular faces, and twelve edges that correspond one-for-one with the features of it: Triangular antiprisms: Two faces are
Octahedron
Polyhedron resembling a soccerball
each edge creates 12 pentagonal faces and transforms the original 20 triangular faces into regular hexagons. Therefore, the resulting polyhedron has 32
Truncated_icosahedron
Regular tiling of the Euclidean plane
In geometry, the square tiling, square tessellation or square grid is a regular tiling of the Euclidean plane consisting of four squares around every vertex
Square_tiling
Covering by shapes without overlaps or gaps
wallpaper groups. A tiling that lacks a repeating pattern is called "non-periodic". An aperiodic tiling uses a small set of tile shapes that cannot form
Tessellation
Triangle in hyperbolic geometry
An order-7 triangular tiling has equilateral triangles with 2π/7 radian internal angles.
Hyperbolic_triangle
Polyform whose base form is an equilateral triangle
rules. Triangular tiling Rhombille tiling Sphinx tiling Weisstein, Eric W. "Polyiamond". MathWorld. Polyiamonds at The Poly Pages. Polyiamond tilings. VERHEXT
Polyiamond
Method of describing higher-order polyhedra
Euclidean tilings can also be used as seeds: Q = Quadrille = Square tiling H = Hextille = Hexagonal tiling = dΔ Δ = Deltille = Triangular tiling = dH These
Conway_polyhedron_notation
Subdivision of the plane into polygons that are all regular
vertices with 2 different vertex types, so this tiling would be classed as a "3-uniform (2-vertex types)" tiling. Broken down, 36; 36 (both of different transitivity
Euclidean tilings by convex regular polygons
Euclidean_tilings_by_convex_regular_polygons
Shape with six sides
Euclidean space Hexagonal crystal system Hexagonal number Hexagonal tiling: a regular tiling of hexagons in a plane Hexagram: six-sided star within a regular
Hexagon
Semiregular tiling of the hyperbolic plane
has media related to Uniform dual tiling V 4-6-14. In geometry, the 3-7 kisrhombille tiling is a semiregular dual tiling of the hyperbolic plane. It is constructed
3-7_kisrhombille
Prism with a 3-sided base
A triangular prism or trigonal prism is a prism with two triangular bases in geometry. If the edges pair with each triangle's vertex and if they are perpendicular
Triangular_prism
Geometric operation applied to a polyhedron
honeycomb is the snub hexagonal tiling honeycomb, as s{3,6,3} and , which can also be constructed as an alternated hexagonal tiling honeycomb, h{6,3,3}, . It
Snub_(geometry)
Solid with twenty equal triangular faces
regular faces again. Replacing bases of a pentagonal antiprism with ten triangular pyramids, the regular icosahedron is classified as a composite polyhedron
Regular_icosahedron
Semiregular tiling of the hyperbolic plane
In geometry, the order-3 snub heptagonal tiling is a semiregular tiling of the hyperbolic plane. There are four triangles and one heptagon on each vertex
Snub_triheptagonal_tiling
and thus the formation is in a non-equilibrium state. Truncated order-7 triangular tiling Rode, A.V.; Hyde, S.T.; Gamaly, E.G.; Elliman, R.G.; McKenzie
Carbon_nanofoam
Board game consisting of triangular tiles
dominoes using triangular tiles published in 1965. A popular version of this game is marketed as Tri-Ominos by the Pressman Toy Corp. A triomino tile is in the
Triominoes
the tiles). A tiling is considered periodic if there exist translations in two independent directions which map the tiling onto itself. Such a tiling is
List of aperiodic sets of tiles
List_of_aperiodic_sets_of_tiles
Geometric operation which truncates the edges of polyhedra
an example of Goldberg polyhedron GPIII(2,0) or {3+,3}2,0, containing triangular and hexagonal faces. Its dual is the alternate-triakis tetratetrahedron
Chamfer_(geometry)
Vertex-transitive tiling of the plane by regular polygons
regular triangular tiling). A tiling can also be self-dual. The square tiling, with Schläfli symbol {4,4}, is self-dual; shown here are two square tilings (red
Uniform_tiling
Group realized geometrically by reflections across the sides of a triangle
centrally symmetric. Hence each of them determines a tiling of the real projective plane, an elliptic tiling. Its symmetry group is the quotient of the spherical
Triangle_group
Kepler–Poinsot polyhedron with 20 faces
5⁄2} and Coxeter-Dynkin diagram of . It is composed of 20 intersecting triangular faces, having five triangles meeting at each vertex in a pentagrammic
Great_icosahedron
Complex structures in matter physics
be reduced to that of plane tilings with equilateral triangles. A well known solution is provided by the triangular tiling with a total compatibility between
Geometrical_frustration
Two joined triangular cupolae
geometry, the triangular orthobicupola is the 27th Johnson solid. As the name suggests, it can be constructed by attaching two triangular cupolae along
Triangular_orthobicupola
Polyhedron; 2 hexagonal pyramids joined base-to-base
each other, perpendicular to the horizontal plane. It can be drawn as a tiling on a sphere which also represents the fundamental domains of [3,2], *322
Hexagonal_bipyramid
Isogonal polytope with regular facets
honeycomb, ↔ Alternated order-5 hexagonal tiling honeycomb, ↔ Alternated order-6 hexagonal tiling honeycomb, ↔ Alternated square tiling honeycomb, ↔ (Also
Semiregular_polytope
infinitely many icosahedra existing around each vertex in an infinite-order triangular tiling vertex arrangement. It has a second construction as a uniform honeycomb
Order-4_icosahedral_honeycomb
uniform tilings Uniform tilings in hyperbolic plane Archimedean tiling Square tiling Triangular tiling Hexagonal tiling Truncated square tiling Snub square
List of polygons, polyhedra and polytopes
List_of_polygons,_polyhedra_and_polytopes
Semiregular tiling of the hyperbolic plane
geometry, the triheptagonal tiling is a semiregular tiling of the hyperbolic plane, representing a rectified Order-3 heptagonal tiling. There are two triangles
Triheptagonal_tiling
Classification of a two-dimensional repetitive pattern
Examples of group p3m1 Triangular tiling (ignoring colors: p6m) Hexagonal tiling (ignoring colors: p6m) Truncated hexagonal tiling (ignoring colors: p6m)
Wallpaper_group
Quasiregular space-filling tesselation
that there are no gaps. It is an example of the more general mathematical tiling or tessellation in any number of dimensions. Honeycombs are usually constructed
Tetrahedral-octahedral honeycomb
Tetrahedral-octahedral_honeycomb
Uniform tiling of the hyperbolic plane
tiling, r{6,4}, as well as an expanded order-4 hexagonal tiling or expanded order-6 square tiling. There are two uniform constructions of this tiling
Rhombitetrahexagonal_tiling
Notation for a polyhedron's vertex figure
3.5 (60) Semiregular tilings: Snub hexagonal tiling: 3.3.3.3.6 (chiral) Elongated triangular tiling: 3.3.3.4.4 Snub square tiling: 3.3.4.3.4 (note that
Vertex_configuration
1959 woodcut by M. C. Escher
where four fish meet at their fins, form the vertices of an order-8 triangular tiling, while the points where three fish fins meet and the points where
Circle_Limit_III
Geometric figure
different aperiodic tilings with 5-fold symmetry can be obtained by projecting two-dimensional slices of the honeycomb: the Penrose tiling composed of rhombi
5-cell_honeycomb
Polyhedron with four faces
tetrahedra or tetrahedrons), also known as a triangular pyramid, is a polyhedron composed of four triangular faces, six straight edges, and four vertices
Tetrahedron
Semiregular tiling of the hyperbolic plane
truncated triheptagonal tiling. (Naming the colors by indices around a vertex: 123.) Each triangle in this dual tiling, order 3-7 kisrhombille, represent
Truncated triheptagonal tiling
Truncated_triheptagonal_tiling
Spatial tiling of convex uniform polyhedra
unique honeycombs from the square tiling, but all 6 tiling truncations are listed below for completeness, and tiling images are shown by colors corresponding
Convex_uniform_honeycomb
Tiling of euclidean or hyperbolic space of three or more dimensions
that there are no gaps. It is an example of the more general mathematical tiling or tessellation in any number of dimensions. Its dimension can be clarified
Honeycomb_(geometry)
order-3-6 octagonal honeycomb is {8,3,6}, with six octagonal tilings meeting at each edge. The vertex figure of this honeycomb is a triangular tiling
Order-3-6 heptagonal honeycomb
Order-3-6_heptagonal_honeycomb
visualized by the associated tilings, as depicted at right: the (2,3,7) tiling on the Poincaré disc is a quotient of the modular tiling on the upper half-plane
(2,3,7)_triangle_group
Natural number
tiling. This tiling is one of eight Archimedean tilings that are semi-regular, or made of more than one type of regular polygon, and the only tiling that
8
Subdivision of the plane by lines
the square tiling of the plane, and for three families of lines at 120-degree angles from each other (themselves forming a trihexagonal tiling) this produces
Arrangement_of_lines
Property of objects which appear unchanged after a partial rotation
for this symmetry); it is e.g. the rotation group of the regular triangular tiling with the equilateral triangles alternatingly colored. p4 (442): 2×4-fold
Rotational_symmetry
Semiregular tiling of the hyperbolic plane
In geometry, the truncated tetrahexagonal tiling is a semiregular tiling of the hyperbolic plane. There are one square, one octagon, and one dodecagon
Truncated tetrahexagonal tiling
Truncated_tetrahexagonal_tiling
Tiling of hyperbolic 3-space by uniform polyhedra
rhombicuboctahedra , infinite order-8 triangular tilings , and infinite order-8 square tilings . The order-8 square tilings already intersect the sphere
Uniform honeycombs in hyperbolic space
Uniform_honeycombs_in_hyperbolic_space
Prism with an 8-sided base
joining two regular octagon caps. The octagonal prism can also be seen as a tiling on a sphere: In optics, octagonal prisms are used to generate flicker-free
Octagonal_prism
Semi regularly Tiling
In geometry, the truncated hexaoctagonal tiling is a semiregular tiling of the hyperbolic plane. There are one square, one dodecagon, and one hexakaidecagon
Truncated hexaoctagonal tiling
Truncated_hexaoctagonal_tiling
Isogonal polyhedron with regular faces
Semiregular polyhedron Polyhedron model Pseudo-uniform polyhedron Uniform tiling Uniform tilings in hyperbolic plane Diudea (2018), p. 40. Coxeter, Longuet-Higgins
Uniform_polyhedron
Shape with three equal sides
tiles the Euclidean plane with six triangles meeting at a vertex; the dual of this tessellation is the hexagonal tiling. Truncated hexagonal tiling,
Equilateral_triangle
Solid with 2 parallel n-gonal bases connected by n parallelograms
zero. The topological polyhedral net can be cut from two rows of a square tiling (with vertex configuration 4.4.4.4): a band of n squares, each attached
Prism_(geometry)
itself in the process. The number of times the tiling winds round the sphere is the density of the tiling, and is denoted μ. Jonathan Bowers' short names
List of uniform polyhedra by Schwarz triangle
List_of_uniform_polyhedra_by_Schwarz_triangle
Polyhedron formed by joining two prisms
the gyrobifastigium is a polyhedron that is constructed by attaching a triangular prism to the square face of another one. It is an example of a Johnson
Gyrobifastigium
Shape subdivided into copies of itself
shape necessarily forms the prototile for a tiling of the plane, in many cases a nonperiodic tiling. A rep-tile dissection using different sizes of the original
Rep-tile
Kepler–Poinsot polyhedron
face of a regular icosahedron with a right triangular pyramid of height 7 + 3 5 6 {\displaystyle {\sqrt {\frac {7+3{\sqrt {5}}}{6}}}} times the icosahedron's
Great_stellated_dodecahedron
Four-dimensional analogue of the tetrahedron
verification] The 10 triangle faces can be seen in a 2D net within a triangular tiling, with 6 triangles around every vertex, although folding into 4-dimensions
5-cell
Regular non-convex polygon
Geoffrey C. Shephard, Tilings by Regular Polygons, Mathematics Magazine #50 (1977), pp. 227–247, and #51 (1978), pp. 205–206 Tiling with Regular Star Polygons
Star_polygon
Three-dimensional geometric shape
are equilateral triangles, it can be constructed from a stretched triangular tiling net with four triangles in one direction and an even number in the
Kaleidocycle
11th-century bilingual tablet in Croatia
commonly be found on karstic territory and employed by peasants for e.g. tiling the ground. According to Fučić it originally served as the marker of a shallowly
Valun_tablet
Natural number
preceding 7. It is a composite number and the smallest perfect number. A six-sided polygon is a hexagon, one of the three regular polygons capable of tiling the
6
Triangle with at least two sides congruent
Adventitious Angles puzzle, and the 30-30-120 triangle of the triakis triangular tiling. Five Catalan solids, the triakis tetrahedron, triakis octahedron
Isosceles_triangle
ORDER 7-TRIANGULAR-TILING
ORDER 7-TRIANGULAR-TILING
Girl/Female
Indian, Traditional
Order
Girl/Female
Australian, French, German, Greek, Italian
Order
Boy/Male
Greek
Order.
Male
Swedish
Old Swedish form of Old Norse Oddr, ODDER means "point of a weapon."
Boy/Male
Hindu, Indian, Punjabi, Sikh
Order
Boy/Male
Gujarati, Hindu, Indian, Kannada, Malayalam, Marathi, Telugu
Conqueror of 7 Elements
Boy/Male
Gujarati, Hindu, Indian, Kannada, Malayalam, Marathi, Telugu
7 Stars Representing 7 Great Saints
Girl/Female
Indian, Telugu
Order
Girl/Female
Indian, Marathi, Sindhi
Order
Boy/Male
Arabic, Australian, Muslim
Order
Boy/Male
Greek
Order.
Girl/Female
Greek
Order.
Boy/Male
Indian
7 Horses; 7 Colours of the Sun
Boy/Male
Tamil
Pradarsh | பà¯à®°à®¤à®°à¯à®·
Appearance, Order
Pradarsh | பà¯à®°à®¤à®°à¯à®·
Boy/Male
Australian, French, German, Greek
Order
Boy/Male
Greek
Order.
Boy/Male
English
From the triangular field.
Surname or Lastname
English
English : variant of Cordier.Catalan : occupational name for a maker of cord or string, from an agent derivative of Catalan corda ‘string’, ‘cord’.
Surname or Lastname
English
English : topographic name for someone who lived at the edge of a village or by some other boundary, Middle English border, from Old French bordure ‘edge’.
Girl/Female
German, Greek
Order
ORDER 7-TRIANGULAR-TILING
ORDER 7-TRIANGULAR-TILING
Girl/Female
Muslim/Islamic
Name of a pious woman
Girl/Female
Australian, German, Swedish
God is Gracious; God has Shown Favor
Boy/Male
Tamil
Pragadeesh | பà¯à®°à®•திஷ
Lord Shiva
Male
Greek
(ΒαÏαββᾶς) Greek form of Aramaic bar-Abba, BARABBAS means "son of the father." In the New Testament bible, this is the name of a captive robber whom the Jews begged Pilate to release instead of Christ.
Male
Spanish
Spanish form of Latin Emygdius, EMYGDIO means "half-god, demigod."
Girl/Female
Arabic, Australian, Hebrew
Sweet; Pleasant
Boy/Male
Biblical
Who overthrows or destroys a multitude.
Girl/Female
Muslim
Piece of Moon, Pleasant
Male
English
Anglicized form of Hebrew Yithrow, JETHRO means "his abundance" or "overhanging." In the bible, this is the name of the father-in-law of Moses. He is also known by the name Jether.
Girl/Female
Hindu
Lover of jewels
ORDER 7-TRIANGULAR-TILING
ORDER 7-TRIANGULAR-TILING
ORDER 7-TRIANGULAR-TILING
ORDER 7-TRIANGULAR-TILING
ORDER 7-TRIANGULAR-TILING
n.
To put in order; to reduce to a methodical arrangement; to arrange in a series, or with reference to an end. Hence, to regulate; to dispose; to direct; to rule.
n.
An assemblage of genera having certain important characters in common; as, the Carnivora and Insectivora are orders of Mammalia.
v. t.
To make triangular, or three-cornered.
n.
To give an order for; to secure by an order; as, to order a carriage; to order groceries.
n.
See Offset, 7.
n.
To give an order to; to command; as, to order troops to advance.
n.
Conformity with law or decorum; freedom from disturbance; general tranquillity; public quiet; as, to preserve order in a community or an assembly.
n.
That which prescribes a method of procedure; a rule or regulation made by competent authority; as, the rules and orders of the senate.
n.
Right arrangement; a normal, correct, or fit condition; as, the house is in order; the machinery is out of order.
adv.
In a triangular manner; in the form of a triangle.
n.
A number of things or persons arranged in a fixed or suitable place, or relative position; a rank; a row; a grade; especially, a rank or class in society; a group or division of men in the same social or other position; also, a distinct character, kind, or sort; as, the higher or lower orders of society; talent of a high order.
v. i.
To give orders; to issue commands.
n.
A body of persons having some common honorary distinction or rule of obligation; esp., a body of religious persons or aggregate of convents living under a common rule; as, the Order of the Bath; the Franciscan order.
n.
An ecclesiastical grade or rank, as of deacon, priest, or bishop; the office of the Christian ministry; -- often used in the plural; as, to take orders, or to take holy orders, that is, to enter some grade of the ministry.
a.
Oblong or elongated, and having three lateral angles; as, a triangular seed, leaf, or stem.
n.
To admit to holy orders; to ordain; to receive into the ranks of the ministry.
n. pl.
The triangular, or maioid, crabs. See Illust. under Maioid, and Illust. of Spider crab, under Spider.
n.
Rank; degree; thus, the order of a curve or surface is the same as the degree of its equation.
v. t.
To make a border for; to furnish with a border, as for ornament; as, to border a garment or a garden.