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Topics referred to by the same term
Cayley surface may refer to: Cayley's nodal cubic surface Cayley's ruled cubic surface This disambiguation page lists mathematics articles associated with
Cayley_surface
English mathematician (1821–1895)
theory, Cayley tables, Cayley graphs, and Cayley's theorem are named in his honour, as well as Cayley's formula in combinatorics. Arthur Cayley was born
Arthur_Cayley
Cubic Nodal Surface
In algebraic geometry, the Cayley surface, named after Arthur Cayley, is a cubic nodal surface in 3-dimensional projective space with four conical points
Cayley's_nodal_cubic_surface
Algebraic surface
In differential geometry, Cayley's ruled cubic surface is the ruled cubic surface z = x y − x 3 / 3 . {\displaystyle z=xy-x^{3}/3\ .} In projective
Cayley's_ruled_cubic_surface
Algebraic surface defined by a cubic polynomial
\mathbf {P} ^{1}} .) More precisely, Arthur Cayley and George Salmon showed in 1849 that every smooth cubic surface over an algebraically closed field contains
Cubic_surface
Graph defined from a mathematical group
In mathematics, a Cayley graph, also known as a Cayley color graph, Cayley diagram, group diagram, or color group, is a graph that encodes the abstract
Cayley_graph
engineering Cayley graph Cayley numbers Cayley plane Cayley table Cayley transform Cayleyan Cayley–Bacharach theorem Cayley–Dickson construction Cayley–Hamilton
List of things named after Arthur Cayley
List_of_things_named_after_Arthur_Cayley
Asymmetry between the two acting surfaces of an airfoil
using a whirling arm device. Cayley observed that birds soared long distances by simply twisting their arched wing surfaces and deduced that fixed-wing
Camber_(aerodynamics)
Mathematical metric in geometry
In mathematics, a Cayley–Klein metric is a metric on the complement of a fixed quadric in a projective space which is defined using a cross-ratio. The
Cayley–Klein_metric
paraboloid (a ruled surface) Paraboloid Dini's surface Pseudosphere Cayley cubic Barth sextic Clebsch cubic Monkey saddle (saddle-like surface for 3 legs.) Torus
List_of_surfaces
Spheroid Cayley nodal cubic surface, a certain cubic surface with 4 nodes Cayley's ruled cubic surface Clebsch surface or Klein icosahedral surface Fermat
List of complex and algebraic surfaces
List_of_complex_and_algebraic_surfaces
Powered aircraft with wings
controlled heavier-than-air powered flight". They built on the works of George Cayley, dating from 1799, when he set forth the concept of the modern airplane
Airplane
Geometric model of the physical space
mathematics and its application to n-dimensional geometry was made by Arthur Cayley. In mathematics, analytic geometry (also called Cartesian geometry) describes
Three-dimensional_space
Mountains in British Columbia
Mount Cayley is an eroded but potentially active stratovolcano in the Pacific Ranges of southwestern British Columbia, Canada. Located 45 km (28 mi) north
Mount_Cayley
Branch of engineering
the late 19th to early 20th centuries, although the work of Sir George Cayley dates from the last decade of the 18th to the mid-19th century. One of the
Aerospace_engineering
The Cayley Formation is a discontinuous unit of plains-forming material on the Moon. It was first recognized in the central near side of the Moon in 1965
Cayley_Formation
Irreducible nodal surface with properties similar to that of a tetrahedron
a tetrahedroid (or tétraédroïde) is a special kind of Kummer surface studied by Cayley (1846), with the property that the intersections with the faces
Tetrahedroid
Remote volcanic zone in Canada
The Mount Cayley volcanic field (MCVF) is a remote volcanic zone on the South Coast of British Columbia, Canada, stretching 31 kilometres (19 miles) from
Mount_Cayley_volcanic_field
Science of air flight-capable machines
founders of modern aeronautics, Leonardo da Vinci in the Renaissance and Cayley in 1799, both began their investigations with studies of bird flight.[citation
Aeronautics
Number of "holes" of a surface
The genus of a group G is the minimum genus of a (connected, undirected) Cayley graph for G. The graph genus problem is NP-complete. There are two related
Genus_(mathematics)
Surface in 3D space defined by an implicit function of three variables
implicit surface is a surface in Euclidean space defined by an equation F ( x , y , z ) = 0. {\displaystyle F(x,y,z)=0.} An implicit surface is the set
Implicit_surface
Fifth crewed Moon landing
the crew. After the selection, mission planners made the Descartes and Cayley formations, two geologic units of the lunar highlands, the primary sampling
Apollo_16
Geometric space with four dimensions
... are due to Schläfli, who discovered them before 1853 — a time when Cayley, Grassman and Möbius were the only other people who had ever conceived the
Four-dimensional_space
Surface in algebraic geometry
cubic, the Cayley cubic surface, and the Clebsch diagonal surface. del Pezzo surfaces (Fano surfaces) Enneper surface Hirzebruch surfaces Σn P1×P1 The
Rational_surface
Statement about cubic curves in the projective plane
In mathematics, the Cayley–Bacharach theorem is a statement about cubic curves (plane curves of degree three) in the projective plane P2. The original
Cayley–Bacharach_theorem
Real-valued number of spatial dimensions
space very nearly like a surface. Similarly, a surface with fractal dimension of 2.1 fills space very much like an ordinary surface, but one with a fractal
Fractal_dimension
Type of smooth complex surface of kodaira dimension 0
(Aspinwall (1996)). Quartic surfaces in P 3 {\displaystyle \mathbf {P} ^{3}} were studied by Ernst Kummer, Arthur Cayley, Friedrich Schur and other 19th-century
K3_surface
Right conoid ruled surface
mathematician Hassler Whitney, and sometimes called a Cayley umbrella, is a specific self-intersecting ruled surface placed in three dimensions. It is the union
Whitney_umbrella
Area of discrete mathematics
of Cayley and the fundamental results published by Pólya between 1935 and 1937. These were generalized by Nicolaas Govert de Bruijn in 1959. Cayley linked
Graph_theory
Any of 4 regular star polyhedra
density (D) of the vertex figures (dv) and faces (df) was given by Arthur Cayley, and holds both for convex polyhedra (where the correction factors are all
Kepler–Poinsot_polyhedron
Aircraft developed before the modern aeroplane
early as 1799. Fairlie & Cayley 1965, p. 165. Wragg 1974, p. 64. Gibbs-Smith 2003, p. 35 Fairlie & Cayley 1965, p. 169. Cayley, George. "On Aerial Navigation"
Early_flying_machines
led to the development of modern aerodynamics; most notably by Sir George Cayley. Balloons, both free-flying and tethered, began to be used for military
History_of_aviation
Glacier in Antarctica
The Cayley Glacier (64°20′00″S 60°58′00″W / 64.33333°S 60.96667°W / -64.33333; -60.96667 (Cayley Glacier)) is a glacier flowing northwest into the
Cayley_Glacier
Generalized sphere of dimension n (mathematics)
in the region very close to its surface, so a point selected from that volume will also probably be close to the surface. This is one of the phenomena leading
N-sphere
Group of symmetries of the square
products of powers of a and b. This group of order 8 has the following Cayley table: For any two elements in the group, the table records what their composition
Dihedral_group_of_order_8
American astronaut and lunar explorer (born 1935)
was able to view the landing site in its entirety. Orion landed on the Cayley Plains, 270 m (886 ft) northwest of the planned landing site, at 02:23:35
Charles_Duke
Array of numbers
Arthur Cayley, vol. II, Cambridge University Press, 1889, pp. 475–496. Cayley, Arthur (1889), The collected mathematical papers of Arthur Cayley, vol. I
Matrix_(mathematics)
Property of a mathematical space
higher-dimensional geometry only began in the 19th century, via the work of Arthur Cayley, William Rowan Hamilton, Ludwig Schläfli and Bernhard Riemann. Riemann's
Dimension
Concept in algebra
first was discovered by Arthur Cayley in 1843 presented to the Cambridge Philosophical Society. It is in two parts and Cayley's first hyperdeterminant is covered
Hyperdeterminant
Movement of an object through air
Automata. Retrieved:May 6, 2012. "Sir George Cayley". Flyingmachines.org. Retrieved 27 August 2019. Sir George Cayley is one of the most important people in
Flight
Type of non-Euclidean geometry
introduced by Felix Klein in 1871. Klein followed an initiative of Arthur Cayley to use the transformations of projective geometry to produce isometries
Hyperbolic_geometry
Kepler-Poinsot polyhedron
stellated dodecahedron is a Kepler–Poinsot polyhedron, named by Arthur Cayley, and with Schläfli symbol {5⁄2, 5}. It is one of four nonconvex regular
Small_stellated_dodecahedron
Flat-sided three-dimensional shape
the Kepler–Poinsot polyhedra, and their usual names were given by Arthur Cayley. Meanwhile, the discovery of higher dimensions in the early 19th century
Polyhedron
Mathematical concept
{\displaystyle G} be a finitely generated group, and X {\displaystyle X} be its Cayley graph with respect to some finite set S {\displaystyle S} of generators
Hyperbolic_group
2D surface which extends indefinitely
them is the measure of the angle POQ, usually taken in radians. Arthur Cayley initiated the study of elliptic geometry when he wrote "On the definition
Plane_(mathematics)
Mathematical model of ferromagnetism in statistical mechanics
solution of the zero-field, time-independent Barth (1981) model for closed Cayley trees of arbitrary branching ratio, and thereby, arbitrarily large dimensionality
Ising_model
Maximal and minimal curvature at a point of a surface
geometry) Surface Curvature Struik, D. J. (1933). "Outline of a History of Differential Geometry: I". Isis. 19 (1): 92–120. ISSN 0021-1753. Arthur Cayley (1911)
Principal_curvature
quartic surface as a wave surface.", Proceedings of the London Mathematical Society, 8 (1): 375–382, doi:10.1112/plms/s2-8.1.375, ISSN 0024-6115 Cayley, Arthur
Wave_surface
Geographic coordinate specifying north-south position
= b sin β ; {\displaystyle p=a\cos \beta \,,\qquad z=b\sin \beta \,;} Cayley suggested the term parametric latitude because of the form of these equations
Latitude
special) tangent space of a variety, often a quartic surface. The term may have been introduced by Cayley (1869, p. 202), who defined it as "the reciprocal
Trope_(mathematics)
28 lines which touch a general quartic plane curve in two places
missing publisher (link). As cited by Cayley. Shioda, Tetsuji (1995), "Weierstrass transformations and cubic surfaces" (PDF), Commentarii Mathematici Universitatis
Bitangents_of_a_quartic
Branch of mathematics
Perelman geometrization with cubulation techniques. Group actions on their Cayley graphs are foundational examples of isometric group actions. Other major
Geometry
In algebraic geometry, a nodal surface is a surface in a (usually complex) projective space whose only singularities are nodes. A major problem about them
Nodal_surface
Manifold or algebraic variety of dimension n in a space of dimension n+1
hypersurface is a generalization of the concepts of hyperplane, plane curve, and surface. A hypersurface is a manifold or an algebraic variety of dimension n −
Hypersurface
Heavier-than-air aircraft with fixed wings generating aerodynamic lift
Sir George Cayley laid out the concept of the modern airplane as a fixed-wing machine with systems for lift, propulsion, and control. Cayley was building
Fixed-wing_aircraft
Mathematical space with two coordinates
Euclidean plane), or, more generally, surfaces. These include analogs to physical spaces, like flat planes, and curved surfaces like spheres, cylinders, and cones
Two-dimensional_space
Set of points at distance less than one from a given point
The unit circle is the Cayley absolute that determines a metric on the disk through use of cross-ratio in the style of the Cayley–Klein metric. In the language
Unit_disk
Point at infinity in hyperbolic geometry
points together form the Cayley absolute or boundary of a hyperbolic geometry. For instance, the unit circle forms the Cayley absolute of the Poincaré
Ideal_point
Natural number
Foundation. Cawagas, Raoul E. (2004). "On the Structure and Zero Divisors of the Cayley-Dickson Sedenion Algebra". Discussiones Mathematicae – General Algebra and
84_(number)
Planar maps require at most four colors
the same magazine in 1860. Another early published reference by Arthur Cayley (1879) in turn credits the conjecture to De Morgan. There were several early
Four_color_theorem
incompatibility (help) Cayley, Arthur (1852), "On the singularities of surfaces", The Cambridge and Dublin Mathematical Journal, 7: 166 Cayley, Arthur (1857)
Glossary of classical algebraic geometry
Glossary_of_classical_algebraic_geometry
Cubic graph with 10 vertices and 15 edges
symmetry, the Petersen graph is not a Cayley graph. It is the smallest vertex-transitive graph that is not a Cayley graph. The Petersen graph has a Hamiltonian
Petersen_graph
Natural number, composite number
S2CID 586512. Zbl 1026.17001. Moreno, Guillermo (1998), "The zero divisors of the Cayley–Dickson algebras over the real numbers", Bol. Soc. Mat. Mexicana, Series
14_(number)
Two geometries based on axioms closely related to those specifying Euclidean geometry
generic term non-Euclidean geometry to mean hyperbolic geometry. Arthur Cayley noted that distance between points inside a conic could be defined in terms
Non-Euclidean_geometry
Riemann–Roch theorem Amplitwist Antiderivative (complex analysis) Bôcher's theorem Cayley transform Harmonic conjugate Hilbert's inequality Method of steepest descent
List of complex analysis topics
List_of_complex_analysis_topics
Vehicle or machine that can fly by gaining support from the air
led to the development of modern aerodynamics; most notably by Sir George Cayley. Balloons, both free-flying and tethered, began to be used for military
Aircraft
Topological invariant in mathematics
is given below. The surfaces of nonconvex polyhedra can have various Euler characteristics: For regular polyhedra, Arthur Cayley derived a modified form
Euler_characteristic
24-vertex symmetric bipartite cubic graph
Desargues graph G ( 10 , 3 ) {\displaystyle G(10,3)} . The Nauru graph is a Cayley graph of S4, the symmetric group of permutations on four elements, generated
Nauru_graph
German mathematician and astronomer (1790–1868)
Before 1853 and Schläfli's discovery of the 4-polytopes, Möbius (with Cayley and Grassmann) was one of only three other people who had also conceived
August_Ferdinand_Möbius
Branch of mathematics
signifying a collection of permutations closed under composition. Arthur Cayley's 1854 paper On the theory of groups defined a group as a set with an associative
Abstract_algebra
Geometric inversion of a torus, cylinder or double cone
dimensions. Dupin cyclides were investigated not only by Dupin, but also by A. Cayley, J.C. Maxwell and Mabel M. Young. Dupin cyclides are used in computer-aided
Dupin_cyclide
Volcanic chain in southwestern British Columbia, Canada
first began in the Powder Mountain Icefield 4.0 million years ago. Mount Cayley began its formation during this period. Multiple eruptions from 2.2 million
Garibaldi_Volcanic_Belt
Mathematical model of the physical space
Rowan Hamilton developed the quaternions, and John T. Graves and Arthur Cayley the octonions. These are normed algebras which extend the complex numbers
Euclidean_geometry
List of algebraic surfaces Ruled surface Cubic surface Veronese surface Del Pezzo surface Rational surface Enriques surface K3 surface Hodge index theorem
List of algebraic geometry topics
List_of_algebraic_geometry_topics
Distance function defined between probability distributions
RI: American Mathematical Society. ISBN 0-8218-3312-X. OCLC 51477002. Cayley, Arthur (November 1882). "On Monge's "Mémoire sur la Théorie des Déblais
Wasserstein_metric
Mathematical descriptions of a rotation group
{so}}(3)} , and this is the exponential map in Lie theory; Cayley rational parameters, based on the Cayley transform, usable in all characteristics; Möbius transformations
Charts_on_SO(3)
Last letter of the Greek alphabet
omega and agemo subgroups of a p-group, Ω(G) and ℧(G). In group theory, Cayley's Ω process as a partial differential operator. In statistics, it is used
Omega
Hyperbolic paraboloid (a ruled surface) Paraboloid Sphericon Oloid Dini's surface Pseudosphere See the list of algebraic surfaces. Cayley cubic Barth sextic Clebsch
List_of_mathematical_shapes
general metric spaces than Cayley graphs, and which is invariant by quasi-isometry. Given a finitely generated group G with Cayley graph Γ(G) equipped with
Relatively_hyperbolic_group
Construction in algebraic geometry
map as a piecewise-linear map from a finite graph into a flat torus (or a Cayley graph associated with a finite abelian group), which is closely related
Abel–Jacobi_map
throughout the 19th century sought to achieve heavier-than-air flight. George Cayley developed the concept of the modern fixed-wing aircraft in 1799, and in
History_of_aerodynamics
Geometric axis of rotation and translation
)+\mathbf {d} _{\perp }=\mathbf {C} .} Solve this equation for C using Cayley's formula for a rotation matrix [ A ] = [ I − B ] − 1 [ I + B ] , {\displaystyle
Screw_axis
Most populous city in Canada
Launched". GameBids.com. Archived from the original on October 19, 2008. Cayley, Shawn (August 12, 2014). "Countdown is on to Pan American and Parapan American
Toronto
Analyzes the topology of a manifold by studying differentiable functions on that manifold
obtain substantial information about their homology. Before Morse, Arthur Cayley and James Clerk Maxwell had developed some of the ideas of Morse theory
Morse_theory
Angle between each wing or tail surface within a pair
dihedral angle were described in an influential 1810 article by Sir George Cayley. In analysis of aircraft stability, the dihedral effect is also a stability
Dihedral_(aeronautics)
Eight-dimensional Riemannian manifold
the Cayley form, which is a calibrating form for a special class of submanifolds called Cayley cycles. In fact, the Riemannian metric and the Cayley form
Spin(7)-manifold
French engineer
dihedral had been worked out by Sir George Cayley, although at the time Pénaud was not aware of Cayley's work. The principle of a difference in the angle
Alphonse_Pénaud
Crater on the Moon
diameter), the proposed Carroll crater is on the nearside of the lunar surface on the western edge and would be visible from Earth with powerful telescopes
Carroll_(crater)
Branch of dynamics concerned with studying the motion of air
for the flow around all but the simplest of shapes. In 1799, Sir George Cayley became the first person to identify the four aerodynamic forces of flight
Aerodynamics
One of two different regular graphs with 16 vertices
graph is a Cayley graph with an automorphism group of order 1920, isomorphic to the Coxeter group D 5 {\displaystyle D_{5}} . As a Cayley graph, its automorphism
Clebsch_graph
Closed-cycle regenerative heat engine
working hot air engine in 1699. Amontons was later followed by Sir George Cayley. This engine type was of those in which the fire is enclosed, and fed by
Stirling_engine
Group whose operation is composition of permutations
denoted by Sn, and may be called the symmetric group on n letters. By Cayley's theorem, every group is isomorphic to some permutation group. The way in
Permutation_group
Polygon associated with a compact Riemann surface
for every compact Riemann surface of genus greater than 0. It encodes not only information about the topology of the surface through its fundamental group
Fundamental_polygon
Product of a number by itself
doubling again to obtain quaternions. The doubling procedure is called the Cayley–Dickson construction, and has been generalized to form algebras of dimension
Square_(algebra)
System of vehicle propulsion
can be traced back as far as the 1830s. The British polymath Sir George Cayley patented a continuous track, which he called a "universal railway" in 1825
Continuous_track
Type of topological space
The universal cover is an infinite tree, which can be identified with the Cayley graph of the free group. (This is a special case of the presentation complex
Rose_(topology)
Term used to collectively refer to the atmosphere and outer space
construction of aircraft. Modern aerospace began with Engineer George Cayley in 1799. Cayley proposed an aircraft with a "fixed wing and a horizontal and vertical
Aerospace
Arthur Coble (1919, 1982). Coble surface Coble, Arthur B. (1919), "The Ten Nodes of the Rational Sextic and of the Cayley Symmetroid", American Journal of
Coble_curve
Möbius transformation generalized to rings other than the complex numbers
square matrices. An example of such linear fractional transformation is the Cayley transform, which was originally defined on the 3 × 3 real matrix ring. Linear
Linear fractional transformation
Linear_fractional_transformation
Non-Euclidean geometry
called Clifford parallels and Clifford surfaces. The versor points of elliptic space are mapped by the Cayley transform to R 3 {\displaystyle \mathbb
Elliptic_geometry
CAYLEY SURFACE
CAYLEY SURFACE
Boy/Male
Irish
Observant; alert; vigorous.
Girl/Female
American, Australian, Gaelic
Slender; From the Forest; Similar to Caley or Cailley
Surname or Lastname
English (of Norman origin)
English (of Norman origin) : habitational name, with fused Norman preposition d(e), for someone from any of the numerous places in northern France called Ouilly.
Surname or Lastname
English
English : variant spelling of Bailey.
Male
English
Contracted form of English Ackerley, ACKLEY means "oak meadow."
Female
English
Variant spelling of English Carlie, CARLEY means "man."
Surname or Lastname
English
English : variant spelling of Haley.
Surname or Lastname
English (of Norman origin)
English (of Norman origin) : habitational name from places in Eure and Seine-Maritime, France, called Cailly, from a Romano-Gallic personal name Callius + the locative suffix -acum.English : habitational name from a minor place called Caley in the parish of Winwick, Lancashire, named with Old English cÄ â€˜jackdaw’ + lÄ“ah ‘woodland clearing’.Irish : reduced and altered form of McCauley.Manx : variant of Callow.
Girl/Female
Gaelic
Slender. (French) 'from the forest.
Boy/Male
Norse Scottish
Relic.
Girl/Female
Arabic, Greek
Beloved; Slender; Variant of Caley or Cailley; From the Forest; Modern Variant of Katherine; Pure
Girl/Female
Australian, Christian, Gaelic
Slender; From the Forest; Similar to Caley or Cailley
Surname or Lastname
English
English : habitational name from either of two places called Cantley, in Norfolk and South Yorkshire, named with an unattested Old English personal name Canta + lēah ‘clearing’.
Girl/Female
English American
Hay field. From the hay meadow. Both a surname and place name. Famous Bearer: actress Hayley...
Female
English
Variant spelling of English Kayley, CAYLEY means "slender."
Female
English
Feminine variant spelling of English unisex Bailey, BAYLEE means "bailiff."
Male
English
English occupational surname transferred to unisex forename use, BAILEY means "bailiff."Â
Surname or Lastname
Reduced form of Irish McCarley.English
Reduced form of Irish McCarley.English : habitational name from the hamlet of Carley in Lifton, Devon, possibly named with Cornish ker ‘fort’ + Old English lēah ‘woodland clearing’.Perhaps an Americanized form of German Kehrli or Kerle (see Kerley).
Girl/Female
Australian, Gaelic
Slender; From the Forest; Similar to Caley or Cailley
Boy/Male
Australian, Irish
Woodland Clearing; Grower or Seller of Barley
CAYLEY SURFACE
CAYLEY SURFACE
Girl/Female
Muslim/Islamic
Fruit
Female
English
Variant spelling of Greek Doris, DORRIS means "bounty" and "unmixed, pure."
Boy/Male
Australian, Scottish
River
Boy/Male
Tamil
Jaichandran | ஜைசாநà¯à®¤à¯à®°à®£Â
Jaya- victory chandran- Moon thejus- brightness
Boy/Male
Muslim
Intelligent, Happy, Auspicious, Security, Wealthy
Boy/Male
Tamil
Summary, In brief
Girl/Female
Gujarati, Indian, Kannada
Soft in Nature
Boy/Male
Teutonic
People's guard.
Boy/Male
Muslim
Excellent. Noble.
Boy/Male
Arabic, Australian, Muslim, Sindhi
Content; Satisfied
CAYLEY SURFACE
CAYLEY SURFACE
CAYLEY SURFACE
CAYLEY SURFACE
CAYLEY SURFACE
n.
The depression formed by the meeting of two slopes on a flat roof.
n.
A rope of steel wire, or copper wire, usually covered with some protecting or insulating substance; as, the cable of a suspension bridge; a telegraphic cable.
v. t. & i.
To telegraph by a submarine cable
n.
A proof sheet taken from type while on a galley; a galley proof.
v. t.
To fasten with a cable.
a.
Cool; refreshing; fresh; as, a caller day; the caller air.
a.
Fastened with, or attached to, a cable or rope.
v. t.
To lie in wait for; to meet or encounter in the way; especially, to watch for the passing of, with a view to seize, rob, or slay; to beset in ambush.
adv.
Finely; splendidly; showily; as, ladies gayly dressed; a flower gayly blooming.
n.
The cookroom or kitchen and cooking apparatus of a vessel; -- sometimes on merchant vessels called the caboose.
a.
So named; called by such a name (but perhaps called thus with doubtful propriety).
n.
A molding, shaft of a column, or any other member of convex, rounded section, made to resemble the spiral twist of a rope; -- called also cable molding.
n.
The place of meeting of two slopes of a roof, which have their plates running in different directions, and form on the plan a reentrant angle.
n.
Liquor made from barley; strong ale.
n.
The space inclosed between ranges of hills or mountains; the strip of land at the bottom of the depressions intersecting a country, including usually the bed of a stream, with frequently broad alluvial plains on one or both sides of the stream. Also used figuratively.
n.
A prison or court of justice; -- used in certain proper names; as, the Old Bailey in London; the New Bailey in Manchester.
a.
Fresh; in good condition; as, caller berrings.
n.
A little cable less than ten inches in circumference.
imp. & p. p.
of Cable