| slovo | definícia |
geometry
(mass) | geometry
- geometria |
geometry
(encz) | geometry,geometrie n: |
Geometry
(gcide) | Geometry \Ge*om"e*try\, n.; pl. Geometries[F. g['e]om['e]trie,
L. geometria, fr. Gr. ?, fr. ? to measure land; ge`a, gh^,
the earth + ? to measure. So called because one of its
earliest and most important applications was to the
measurement of the earth's surface. See Geometer.]
1. That branch of mathematics which investigates the
relations, properties, and measurement of solids,
surfaces, lines, and angles; the science which treats of
the properties and relations of magnitudes; the science of
the relations of space.
[1913 Webster]
2. A treatise on this science.
[1913 Webster]
Analytical geometry, or Co["o]rdinate geometry, that
branch of mathematical analysis which has for its object
the analytical investigation of the relations and
properties of geometrical magnitudes.
Descriptive geometry, that part of geometry which treats of
the graphic solution of all problems involving three
dimensions.
Elementary geometry, that part of geometry which treats of
the simple properties of straight lines, circles, plane
surface, solids bounded by plane surfaces, the sphere, the
cylinder, and the right cone.
Higher geometry, that pert of geometry which treats of
those properties of straight lines, circles, etc., which
are less simple in their relations, and of curves and
surfaces of the second and higher degrees.
[1913 Webster] |
Geometry
(gcide) | Mathematics \Math`e*mat"ics\, n. [F. math['e]matiques, pl., L.
mathematica, sing., Gr. ? (sc. ?) science. See Mathematic,
and -ics.]
That science, or class of sciences, which treats of the exact
relations existing between quantities or magnitudes, and of
the methods by which, in accordance with these relations,
quantities sought are deducible from other quantities known
or supposed; the science of spatial and quantitative
relations.
[1913 Webster]
Note: Mathematics embraces three departments, namely: 1.
Arithmetic. 2. Geometry, including Trigonometry
and Conic Sections. 3. Analysis, in which letters
are used, including Algebra, Analytical Geometry,
and Calculus. Each of these divisions is divided into
pure or abstract, which considers magnitude or quantity
abstractly, without relation to matter; and mixed or
applied, which treats of magnitude as subsisting in
material bodies, and is consequently interwoven with
physical considerations.
[1913 Webster] |
geometry
(wn) | geometry
n 1: the pure mathematics of points and lines and curves and
surfaces |
| | podobné slovo | definícia |
geometry
(mass) | geometry
- geometria |
coordinate geometry
(encz) | coordinate geometry, n: |
descriptive geometry
(encz) | descriptive geometry, n: |
elementary geometry
(encz) | elementary geometry, n: |
elliptic geometry
(encz) | elliptic geometry, n: |
euclidean geometry
(encz) | Euclidean geometry, |
fractal geometry
(encz) | fractal geometry, n: |
geometry
(encz) | geometry,geometrie n: |
geometry teacher
(encz) | geometry teacher, n: |
hyperbolic geometry
(encz) | hyperbolic geometry, n: |
non-euclidean geometry
(encz) | non-Euclidean geometry, n: |
parabolic geometry
(encz) | parabolic geometry, n: |
plane geometry
(encz) | plane geometry,rovinná geometrie n: [mat.] Clock |
projective geometry
(encz) | projective geometry, n: |
solid geometry
(encz) | solid geometry, n: |
spherical geometry
(encz) | spherical geometry, n: |
Analytical geometry
(gcide) | Geometry \Ge*om"e*try\, n.; pl. Geometries[F. g['e]om['e]trie,
L. geometria, fr. Gr. ?, fr. ? to measure land; ge`a, gh^,
the earth + ? to measure. So called because one of its
earliest and most important applications was to the
measurement of the earth's surface. See Geometer.]
1. That branch of mathematics which investigates the
relations, properties, and measurement of solids,
surfaces, lines, and angles; the science which treats of
the properties and relations of magnitudes; the science of
the relations of space.
[1913 Webster]
2. A treatise on this science.
[1913 Webster]
Analytical geometry, or Co["o]rdinate geometry, that
branch of mathematical analysis which has for its object
the analytical investigation of the relations and
properties of geometrical magnitudes.
Descriptive geometry, that part of geometry which treats of
the graphic solution of all problems involving three
dimensions.
Elementary geometry, that part of geometry which treats of
the simple properties of straight lines, circles, plane
surface, solids bounded by plane surfaces, the sphere, the
cylinder, and the right cone.
Higher geometry, that pert of geometry which treats of
those properties of straight lines, circles, etc., which
are less simple in their relations, and of curves and
surfaces of the second and higher degrees.
[1913 Webster]Mathematics \Math`e*mat"ics\, n. [F. math['e]matiques, pl., L.
mathematica, sing., Gr. ? (sc. ?) science. See Mathematic,
and -ics.]
That science, or class of sciences, which treats of the exact
relations existing between quantities or magnitudes, and of
the methods by which, in accordance with these relations,
quantities sought are deducible from other quantities known
or supposed; the science of spatial and quantitative
relations.
[1913 Webster]
Note: Mathematics embraces three departments, namely: 1.
Arithmetic. 2. Geometry, including Trigonometry
and Conic Sections. 3. Analysis, in which letters
are used, including Algebra, Analytical Geometry,
and Calculus. Each of these divisions is divided into
pure or abstract, which considers magnitude or quantity
abstractly, without relation to matter; and mixed or
applied, which treats of magnitude as subsisting in
material bodies, and is consequently interwoven with
physical considerations.
[1913 Webster]analytical \analytical\ adj.
1. of or pertaining to analysis (definition 2).
[WordNet 1.5]
2. (Logic) of a proposition; necessarily true independent of
fact or experience, such as "all spinsters are unmarried".
Opposite of synthetic. Also See: a priori,
deductive, {logical.
[WordNet 1.5]
3. 1 exercising or involving careful analytical evaluations;
as, analytic reasoning; an analytical discussion.
Syn: appraising(prenominal), evaluative.
[WordNet 1.5]
4. capable of or given to analyzing; -- of people. an
analytical mind
[WordNet 1.5]
Analytical geometry or co["o]rdinate geometry. See under
Geometry.
Analytic language, a noninflectional language or one not
characterized by grammatical endings.
Analytical table (Nat. Hist.), a table in which the
characteristics of the species or other groups are
arranged so as to facilitate the determination of their
names.
[1913 Webster] |
Analytical Geometry
(gcide) | Geometry \Ge*om"e*try\, n.; pl. Geometries[F. g['e]om['e]trie,
L. geometria, fr. Gr. ?, fr. ? to measure land; ge`a, gh^,
the earth + ? to measure. So called because one of its
earliest and most important applications was to the
measurement of the earth's surface. See Geometer.]
1. That branch of mathematics which investigates the
relations, properties, and measurement of solids,
surfaces, lines, and angles; the science which treats of
the properties and relations of magnitudes; the science of
the relations of space.
[1913 Webster]
2. A treatise on this science.
[1913 Webster]
Analytical geometry, or Co["o]rdinate geometry, that
branch of mathematical analysis which has for its object
the analytical investigation of the relations and
properties of geometrical magnitudes.
Descriptive geometry, that part of geometry which treats of
the graphic solution of all problems involving three
dimensions.
Elementary geometry, that part of geometry which treats of
the simple properties of straight lines, circles, plane
surface, solids bounded by plane surfaces, the sphere, the
cylinder, and the right cone.
Higher geometry, that pert of geometry which treats of
those properties of straight lines, circles, etc., which
are less simple in their relations, and of curves and
surfaces of the second and higher degrees.
[1913 Webster]Mathematics \Math`e*mat"ics\, n. [F. math['e]matiques, pl., L.
mathematica, sing., Gr. ? (sc. ?) science. See Mathematic,
and -ics.]
That science, or class of sciences, which treats of the exact
relations existing between quantities or magnitudes, and of
the methods by which, in accordance with these relations,
quantities sought are deducible from other quantities known
or supposed; the science of spatial and quantitative
relations.
[1913 Webster]
Note: Mathematics embraces three departments, namely: 1.
Arithmetic. 2. Geometry, including Trigonometry
and Conic Sections. 3. Analysis, in which letters
are used, including Algebra, Analytical Geometry,
and Calculus. Each of these divisions is divided into
pure or abstract, which considers magnitude or quantity
abstractly, without relation to matter; and mixed or
applied, which treats of magnitude as subsisting in
material bodies, and is consequently interwoven with
physical considerations.
[1913 Webster]analytical \analytical\ adj.
1. of or pertaining to analysis (definition 2).
[WordNet 1.5]
2. (Logic) of a proposition; necessarily true independent of
fact or experience, such as "all spinsters are unmarried".
Opposite of synthetic. Also See: a priori,
deductive, {logical.
[WordNet 1.5]
3. 1 exercising or involving careful analytical evaluations;
as, analytic reasoning; an analytical discussion.
Syn: appraising(prenominal), evaluative.
[WordNet 1.5]
4. capable of or given to analyzing; -- of people. an
analytical mind
[WordNet 1.5]
Analytical geometry or co["o]rdinate geometry. See under
Geometry.
Analytic language, a noninflectional language or one not
characterized by grammatical endings.
Analytical table (Nat. Hist.), a table in which the
characteristics of the species or other groups are
arranged so as to facilitate the determination of their
names.
[1913 Webster] |
Analytical geometry
(gcide) | Geometry \Ge*om"e*try\, n.; pl. Geometries[F. g['e]om['e]trie,
L. geometria, fr. Gr. ?, fr. ? to measure land; ge`a, gh^,
the earth + ? to measure. So called because one of its
earliest and most important applications was to the
measurement of the earth's surface. See Geometer.]
1. That branch of mathematics which investigates the
relations, properties, and measurement of solids,
surfaces, lines, and angles; the science which treats of
the properties and relations of magnitudes; the science of
the relations of space.
[1913 Webster]
2. A treatise on this science.
[1913 Webster]
Analytical geometry, or Co["o]rdinate geometry, that
branch of mathematical analysis which has for its object
the analytical investigation of the relations and
properties of geometrical magnitudes.
Descriptive geometry, that part of geometry which treats of
the graphic solution of all problems involving three
dimensions.
Elementary geometry, that part of geometry which treats of
the simple properties of straight lines, circles, plane
surface, solids bounded by plane surfaces, the sphere, the
cylinder, and the right cone.
Higher geometry, that pert of geometry which treats of
those properties of straight lines, circles, etc., which
are less simple in their relations, and of curves and
surfaces of the second and higher degrees.
[1913 Webster]Mathematics \Math`e*mat"ics\, n. [F. math['e]matiques, pl., L.
mathematica, sing., Gr. ? (sc. ?) science. See Mathematic,
and -ics.]
That science, or class of sciences, which treats of the exact
relations existing between quantities or magnitudes, and of
the methods by which, in accordance with these relations,
quantities sought are deducible from other quantities known
or supposed; the science of spatial and quantitative
relations.
[1913 Webster]
Note: Mathematics embraces three departments, namely: 1.
Arithmetic. 2. Geometry, including Trigonometry
and Conic Sections. 3. Analysis, in which letters
are used, including Algebra, Analytical Geometry,
and Calculus. Each of these divisions is divided into
pure or abstract, which considers magnitude or quantity
abstractly, without relation to matter; and mixed or
applied, which treats of magnitude as subsisting in
material bodies, and is consequently interwoven with
physical considerations.
[1913 Webster]analytical \analytical\ adj.
1. of or pertaining to analysis (definition 2).
[WordNet 1.5]
2. (Logic) of a proposition; necessarily true independent of
fact or experience, such as "all spinsters are unmarried".
Opposite of synthetic. Also See: a priori,
deductive, {logical.
[WordNet 1.5]
3. 1 exercising or involving careful analytical evaluations;
as, analytic reasoning; an analytical discussion.
Syn: appraising(prenominal), evaluative.
[WordNet 1.5]
4. capable of or given to analyzing; -- of people. an
analytical mind
[WordNet 1.5]
Analytical geometry or co["o]rdinate geometry. See under
Geometry.
Analytic language, a noninflectional language or one not
characterized by grammatical endings.
Analytical table (Nat. Hist.), a table in which the
characteristics of the species or other groups are
arranged so as to facilitate the determination of their
names.
[1913 Webster] |
Coordinate geometry
(gcide) | Geometry \Ge*om"e*try\, n.; pl. Geometries[F. g['e]om['e]trie,
L. geometria, fr. Gr. ?, fr. ? to measure land; ge`a, gh^,
the earth + ? to measure. So called because one of its
earliest and most important applications was to the
measurement of the earth's surface. See Geometer.]
1. That branch of mathematics which investigates the
relations, properties, and measurement of solids,
surfaces, lines, and angles; the science which treats of
the properties and relations of magnitudes; the science of
the relations of space.
[1913 Webster]
2. A treatise on this science.
[1913 Webster]
Analytical geometry, or Co["o]rdinate geometry, that
branch of mathematical analysis which has for its object
the analytical investigation of the relations and
properties of geometrical magnitudes.
Descriptive geometry, that part of geometry which treats of
the graphic solution of all problems involving three
dimensions.
Elementary geometry, that part of geometry which treats of
the simple properties of straight lines, circles, plane
surface, solids bounded by plane surfaces, the sphere, the
cylinder, and the right cone.
Higher geometry, that pert of geometry which treats of
those properties of straight lines, circles, etc., which
are less simple in their relations, and of curves and
surfaces of the second and higher degrees.
[1913 Webster]analytical \analytical\ adj.
1. of or pertaining to analysis (definition 2).
[WordNet 1.5]
2. (Logic) of a proposition; necessarily true independent of
fact or experience, such as "all spinsters are unmarried".
Opposite of synthetic. Also See: a priori,
deductive, {logical.
[WordNet 1.5]
3. 1 exercising or involving careful analytical evaluations;
as, analytic reasoning; an analytical discussion.
Syn: appraising(prenominal), evaluative.
[WordNet 1.5]
4. capable of or given to analyzing; -- of people. an
analytical mind
[WordNet 1.5]
Analytical geometry or co["o]rdinate geometry. See under
Geometry.
Analytic language, a noninflectional language or one not
characterized by grammatical endings.
Analytical table (Nat. Hist.), a table in which the
characteristics of the species or other groups are
arranged so as to facilitate the determination of their
names.
[1913 Webster] |
coordinate geometry
(gcide) | Geometry \Ge*om"e*try\, n.; pl. Geometries[F. g['e]om['e]trie,
L. geometria, fr. Gr. ?, fr. ? to measure land; ge`a, gh^,
the earth + ? to measure. So called because one of its
earliest and most important applications was to the
measurement of the earth's surface. See Geometer.]
1. That branch of mathematics which investigates the
relations, properties, and measurement of solids,
surfaces, lines, and angles; the science which treats of
the properties and relations of magnitudes; the science of
the relations of space.
[1913 Webster]
2. A treatise on this science.
[1913 Webster]
Analytical geometry, or Co["o]rdinate geometry, that
branch of mathematical analysis which has for its object
the analytical investigation of the relations and
properties of geometrical magnitudes.
Descriptive geometry, that part of geometry which treats of
the graphic solution of all problems involving three
dimensions.
Elementary geometry, that part of geometry which treats of
the simple properties of straight lines, circles, plane
surface, solids bounded by plane surfaces, the sphere, the
cylinder, and the right cone.
Higher geometry, that pert of geometry which treats of
those properties of straight lines, circles, etc., which
are less simple in their relations, and of curves and
surfaces of the second and higher degrees.
[1913 Webster]analytical \analytical\ adj.
1. of or pertaining to analysis (definition 2).
[WordNet 1.5]
2. (Logic) of a proposition; necessarily true independent of
fact or experience, such as "all spinsters are unmarried".
Opposite of synthetic. Also See: a priori,
deductive, {logical.
[WordNet 1.5]
3. 1 exercising or involving careful analytical evaluations;
as, analytic reasoning; an analytical discussion.
Syn: appraising(prenominal), evaluative.
[WordNet 1.5]
4. capable of or given to analyzing; -- of people. an
analytical mind
[WordNet 1.5]
Analytical geometry or co["o]rdinate geometry. See under
Geometry.
Analytic language, a noninflectional language or one not
characterized by grammatical endings.
Analytical table (Nat. Hist.), a table in which the
characteristics of the species or other groups are
arranged so as to facilitate the determination of their
names.
[1913 Webster] |
Descriptive geometry
(gcide) | Geometry \Ge*om"e*try\, n.; pl. Geometries[F. g['e]om['e]trie,
L. geometria, fr. Gr. ?, fr. ? to measure land; ge`a, gh^,
the earth + ? to measure. So called because one of its
earliest and most important applications was to the
measurement of the earth's surface. See Geometer.]
1. That branch of mathematics which investigates the
relations, properties, and measurement of solids,
surfaces, lines, and angles; the science which treats of
the properties and relations of magnitudes; the science of
the relations of space.
[1913 Webster]
2. A treatise on this science.
[1913 Webster]
Analytical geometry, or Co["o]rdinate geometry, that
branch of mathematical analysis which has for its object
the analytical investigation of the relations and
properties of geometrical magnitudes.
Descriptive geometry, that part of geometry which treats of
the graphic solution of all problems involving three
dimensions.
Elementary geometry, that part of geometry which treats of
the simple properties of straight lines, circles, plane
surface, solids bounded by plane surfaces, the sphere, the
cylinder, and the right cone.
Higher geometry, that pert of geometry which treats of
those properties of straight lines, circles, etc., which
are less simple in their relations, and of curves and
surfaces of the second and higher degrees.
[1913 Webster]Descriptive \De*scrip"tive\, a. [L. descriptivus: cf. F.
descriptif.]
Tending to describe; having the quality of representing;
containing description; as, a descriptive figure; a
descriptive phrase; a descriptive narration; a story
descriptive of the age.
[1913 Webster]
Descriptive anatomy, that part of anatomy which treats of
the forms and relations of parts, but not of their
textures.
Descriptive geometry, that branch of geometry. which treats
of the graphic solution of problems involving three
dimensions, by means of projections upon auxiliary planes.
--Davies & Peck (Math. Dict. ) -- De*scrip"tive*ly, adv.
-- De*scrip"tive*ness, n.
[1913 Webster] |
Elementary geometry
(gcide) | Geometry \Ge*om"e*try\, n.; pl. Geometries[F. g['e]om['e]trie,
L. geometria, fr. Gr. ?, fr. ? to measure land; ge`a, gh^,
the earth + ? to measure. So called because one of its
earliest and most important applications was to the
measurement of the earth's surface. See Geometer.]
1. That branch of mathematics which investigates the
relations, properties, and measurement of solids,
surfaces, lines, and angles; the science which treats of
the properties and relations of magnitudes; the science of
the relations of space.
[1913 Webster]
2. A treatise on this science.
[1913 Webster]
Analytical geometry, or Co["o]rdinate geometry, that
branch of mathematical analysis which has for its object
the analytical investigation of the relations and
properties of geometrical magnitudes.
Descriptive geometry, that part of geometry which treats of
the graphic solution of all problems involving three
dimensions.
Elementary geometry, that part of geometry which treats of
the simple properties of straight lines, circles, plane
surface, solids bounded by plane surfaces, the sphere, the
cylinder, and the right cone.
Higher geometry, that pert of geometry which treats of
those properties of straight lines, circles, etc., which
are less simple in their relations, and of curves and
surfaces of the second and higher degrees.
[1913 Webster] |
Higher geometry
(gcide) | Geometry \Ge*om"e*try\, n.; pl. Geometries[F. g['e]om['e]trie,
L. geometria, fr. Gr. ?, fr. ? to measure land; ge`a, gh^,
the earth + ? to measure. So called because one of its
earliest and most important applications was to the
measurement of the earth's surface. See Geometer.]
1. That branch of mathematics which investigates the
relations, properties, and measurement of solids,
surfaces, lines, and angles; the science which treats of
the properties and relations of magnitudes; the science of
the relations of space.
[1913 Webster]
2. A treatise on this science.
[1913 Webster]
Analytical geometry, or Co["o]rdinate geometry, that
branch of mathematical analysis which has for its object
the analytical investigation of the relations and
properties of geometrical magnitudes.
Descriptive geometry, that part of geometry which treats of
the graphic solution of all problems involving three
dimensions.
Elementary geometry, that part of geometry which treats of
the simple properties of straight lines, circles, plane
surface, solids bounded by plane surfaces, the sphere, the
cylinder, and the right cone.
Higher geometry, that pert of geometry which treats of
those properties of straight lines, circles, etc., which
are less simple in their relations, and of curves and
surfaces of the second and higher degrees.
[1913 Webster] |
Plane geometry
(gcide) | Plane \Plane\, a. [L. planus: cf. F. plan. See Plan, a.]
Without elevations or depressions; even; level; flat; lying
in, or constituting, a plane; as, a plane surface.
[1913 Webster]
Note: In science, this word (instead of plain) is almost
exclusively used to designate a flat or level surface.
[1913 Webster]
Plane angle, the angle included between two straight lines
in a plane.
Plane chart, Plane curve. See under Chart and Curve.
Plane figure, a figure all points of which lie in the same
plane. If bounded by straight lines it is a rectilinear
plane figure, if by curved lines it is a curvilinear plane
figure.
Plane geometry, that part of geometry which treats of the
relations and properties of plane figures.
Plane problem, a problem which can be solved geometrically
by the aid of the right line and circle only.
Plane sailing (Naut.), the method of computing a ship's
place and course on the supposition that the earth's
surface is a plane.
Plane scale (Naut.), a scale for the use of navigators, on
which are graduated chords, sines, tangents, secants,
rhumbs, geographical miles, etc.
Plane surveying, surveying in which the curvature of the
earth is disregarded; ordinary field and topographical
surveying of tracts of moderate extent.
Plane table, an instrument used for plotting the lines of a
survey on paper in the field.
Plane trigonometry, the branch of trigonometry in which its
principles are applied to plane triangles.
[1913 Webster] |
Spherical geometry
(gcide) | Spherical \Spher"ic*al\, Spheric \Spher"ic\, a. [L. sphaericus,
Gr. ???: cf. F. sph['e]rique.]
1. Having the form of a sphere; like a sphere; globular;
orbicular; as, a spherical body.
[1913 Webster]
2. Of or pertaining to a sphere.
[1913 Webster]
3. Of or pertaining to the heavenly orbs, or to the sphere or
spheres in which, according to ancient astronomy and
astrology, they were set.
[1913 Webster]
Knaves, thieves, and treachers by spherical
predominance. --Shak.
[1913 Webster]
Though the stars were suns, and overburned
Their spheric limitations. --Mrs.
Browning.
[1913 Webster]
Spherical angle, Spherical coordinate, {Spherical
excess}, etc. See under Angle, Coordinate, etc.
Spherical geometry, that branch of geometry which treats of
spherical magnitudes; the doctrine of the sphere,
especially of the circles described on its surface.
Spherical harmonic analysis. See under Harmonic, a.
Spherical lune,portion of the surface of a sphere included
between two great semicircles having a common diameter.
Spherical opening, the magnitude of a solid angle. It is
measured by the portion within the solid angle of the
surface of any sphere whose center is the angular point.
Spherical polygon,portion of the surface of a sphere
bounded by the arcs of three or more great circles.
Spherical projection, the projection of the circles of the
sphere upon a plane. See Projection.
Spherical sector. See under Sector.
Spherical segment, the segment of a sphere. See under
Segment.
Spherical triangle,re on the surface of a sphere, bounded
by the arcs of three great circles which intersect each
other.
Spherical trigonometry. See Trigonometry.
[1913 Webster] -- Spher"ic*al*ly, adv. --
Spher"ic*al*ness, n.
[1913 Webster] |
Stigmatic geometry
(gcide) | Stigmatic \Stig*mat"ic\, Stigmatical \Stig*mat"ic*al\, a. [See
Stigma.]
1. Marked with a stigma, or with something reproachful to
character.
[1913 Webster]
2. Impressing with infamy or reproach. [R.]
[1913 Webster]
3. (Bot., Anat., etc) Of or pertaining to a stigma or
stigmata.
[1913 Webster]
Stigmatic geometry, or Stigmatics, that science in which
the correspondence of index and stigma (see Stigma, 7)
is made use of to establish geometrical proportions.
[1913 Webster] |
affine geometry
(wn) | affine geometry
n 1: the geometry of affine transformations |
analytic geometry
(wn) | analytic geometry
n 1: the use of algebra to study geometric properties; operates
on symbols defined in a coordinate system [syn: {analytic
geometry}, analytical geometry, coordinate geometry] |
analytical geometry
(wn) | analytical geometry
n 1: the use of algebra to study geometric properties; operates
on symbols defined in a coordinate system [syn: {analytic
geometry}, analytical geometry, coordinate geometry] |
coordinate geometry
(wn) | coordinate geometry
n 1: the use of algebra to study geometric properties; operates
on symbols defined in a coordinate system [syn: {analytic
geometry}, analytical geometry, coordinate geometry] |
descriptive geometry
(wn) | descriptive geometry
n 1: the geometry of properties that remain invariant under
projection [syn: projective geometry, {descriptive
geometry}] |
elementary geometry
(wn) | elementary geometry
n 1: (mathematics) geometry based on Euclid's axioms [syn:
elementary geometry, parabolic geometry, {Euclidean
geometry}] |
elliptic geometry
(wn) | elliptic geometry
n 1: (mathematics) a non-Euclidean geometry that regards space
as like a sphere and a line as like a great circle;
"Bernhard Riemann pioneered elliptic geometry" [syn:
elliptic geometry, Riemannian geometry] |
euclidean geometry
(wn) | Euclidean geometry
n 1: (mathematics) geometry based on Euclid's axioms [syn:
elementary geometry, parabolic geometry, {Euclidean
geometry}] |
fractal geometry
(wn) | fractal geometry
n 1: (mathematics) the geometry of fractals; "Benoit Mandelbrot
pioneered fractal geometry" |
geometry
(wn) | geometry
n 1: the pure mathematics of points and lines and curves and
surfaces |
geometry teacher
(wn) | geometry teacher
n 1: someone who teaches geometry |
hyperbolic geometry
(wn) | hyperbolic geometry
n 1: (mathematics) a non-Euclidean geometry in which the
parallel axiom is replaced by the assumption that through
any point in a plane there are two or more lines that do
not intersect a given line in the plane; "Karl Gauss
pioneered hyperbolic geometry" |
non-euclidean geometry
(wn) | non-Euclidean geometry
n 1: (mathematics) geometry based on axioms different from
Euclid's; "non-Euclidean geometries discard or replace one
or more of the Euclidean axioms" |
parabolic geometry
(wn) | parabolic geometry
n 1: (mathematics) geometry based on Euclid's axioms [syn:
elementary geometry, parabolic geometry, {Euclidean
geometry}] |
plane geometry
(wn) | plane geometry
n 1: the geometry of 2-dimensional figures |
projective geometry
(wn) | projective geometry
n 1: the geometry of properties that remain invariant under
projection [syn: projective geometry, {descriptive
geometry}] |
riemannian geometry
(wn) | Riemannian geometry
n 1: (mathematics) a non-Euclidean geometry that regards space
as like a sphere and a line as like a great circle;
"Bernhard Riemann pioneered elliptic geometry" [syn:
elliptic geometry, Riemannian geometry] |
solid geometry
(wn) | solid geometry
n 1: the geometry of 3-dimensional space |
spherical geometry
(wn) | spherical geometry
n 1: (mathematics) the geometry of figures on the surface of a
sphere |
computational geometry
(foldoc) | computational geometry
The study of algorithms for combinatorial,
topological, and metric problems concerning sets of points,
typically in Euclidean space. Representative areas of
research include geometric search, convexity, proximity,
intersection, and linear programming.
(1997-08-03)
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constructive solid geometry
(foldoc) | constructive solid geometry
CSG
(CSG) A method used in solid modeling to describe the
geometry of complex three-dimensional scenes by applying {set
operations} (union, difference, intersection) to primitive
shapes (cuboids, cylinders, prisms, pyramids, spheres and cones).
See also CSG-tree.
CSG in JavaScript (http://evanw.github.io/csg.js/).
(2014-09-22)
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