slovo | definícia |
ordinate (mass) | ordinate
- odvesna |
ordinate (encz) | ordinate,odvěsna n: [mat.] |
Ordinate (gcide) | Ordinate \Or"di*nate\, a. [L. ordinatus, p. p. of ordinare. See
Ordain.]
Well-ordered; orderly; regular; methodical. "A life blissful
and ordinate." --Chaucer.
[1913 Webster]
Ordinate figure (Math.), a figure whose sides and angles
are equal; a regular figure.
[1913 Webster] |
Ordinate (gcide) | Ordinate \Or"di*nate\, n. (Geom.)
The distance of any point in a curve or a straight line,
measured on a line called the axis of ordinates or on a line
parallel to it, from another line called the axis of
abscissas, on which the corresponding abscissa of the point
is measured.
[1913 Webster]
Note: The ordinate and abscissa, taken together, are called
coordinates, and define the position of the point with
reference to the two axes named, the intersection of
which is called the origin of coordinates. In a typical
two-dimensional plot, viewed on a plane graph in its
normal orientation with perpendicular axes, the
ordinate is the vertical axis; when the axes are
labeled as x and y, it is the y-axis. See Coordinate.
[1913 Webster +PJC] |
Ordinate (gcide) | Ordinate \Or"di*nate\, v. t.
To appoint, to regulate; to harmonize. --Bp. Hall.
[1913 Webster] |
ordinate (wn) | ordinate
n 1: the value of a coordinate on the vertical axis
v 1: appoint to a clerical posts; "he was ordained in the
Church" [syn: ordain, consecrate, ordinate, order]
2: bring (components or parts) into proper or desirable
coordination correlation; "align the wheels of my car";
"ordinate similar parts" [syn: align, ordinate,
coordinate] |
ordinate (foldoc) | ordinate
The y-coordinate on an (x,y) graph; the output
of a function plotted against its input.
x is the "abscissa".
See Cartesian coordinates.
(1997-07-08)
|
| podobné slovo | definícia |
coordinate (mass) | coordinate
- súradnica, súradnicaco-ordinate
- koordinovať |
coordinated (mass) | co-ordinated
- koordinovaný |
subordinate (mass) | subordinate
- nadradený, nadraďujúci |
cartesian coordinate (encz) | cartesian coordinate, n: |
cartesian coordinate system (encz) | cartesian coordinate system, n: |
co-ordinate (encz) | co-ordinate,koordinovat v: uvést v soulad J. Polachco-ordinate,souřadnice n: Zdeněk Brož |
co-ordinated (encz) | co-ordinated,koordinovaný adj: Jaroslav Šedivý |
color-coordinated (encz) | color-coordinated, |
coordinate (encz) | coordinate,souřadnice n: [mat.] |
coordinate axis (encz) | coordinate axis, n: |
coordinate bond (encz) | coordinate bond, n: |
coordinate clause (encz) | coordinate clause, n: |
coordinate geometry (encz) | coordinate geometry, n: |
coordinate system (encz) | coordinate system, n: |
coordinated (encz) | coordinated,koordinovaný adj: Zdeněk Brož |
coordinated universal time (encz) | coordinated universal time, n: |
coordinately (encz) | coordinately, |
coordinates (encz) | coordinates,koordinuje v: Zdeněk Brožcoordinates,souřadnice n: Zdeněk Brož |
imf task force on coordinated portfolio investment survey (encz) | IMF Task Force on Coordinated Portfolio Investment Survey, |
inordinate (encz) | inordinate,nadměrný adj: Zdeněk Brož |
inordinately (encz) | inordinately,mimořádně adv: Zdeněk Brož |
inordinateness (encz) | inordinateness, n: |
insubordinate (encz) | insubordinate,neukázněný adj: Zdeněk Brožinsubordinate,vzpurný adj: Zdeněk Brož |
polar coordinate (encz) | polar coordinate, n: |
subordinate (encz) | subordinate,poddaný adj: Zdeněk Brožsubordinate,podřídit v: Zdeněk Brožsubordinate,podřízený adj: Zdeněk Brož |
subordinate clause (encz) | subordinate clause, |
subordinate conjunction (encz) | subordinate conjunction, n: |
subordinate word (encz) | subordinate word, n: |
subordinated (encz) | subordinated,podřízený adj: Zdeněk Brož |
subordinated debt (encz) | subordinated debt, |
subordinated loan (encz) | subordinated loan, |
subordinateness (encz) | subordinateness, n: |
superordinate (encz) | superordinate,nadřazený adj: Zdeněk Brož |
superordinate word (encz) | superordinate word, n: |
uncoordinated (encz) | uncoordinated,nekoordinovaný adj: Zdeněk Brož |
x coordinate (encz) | x coordinate,souřadnice x n: [mat.] odvozeně i osa x mamm |
Applicate ordinate (gcide) | Applicate \Ap"pli*cate\, a. [L. applicatus, p. p. of applicare.
See Apply.]
Applied or put to some use.
[1913 Webster]
Those applicate sciences which extend the power of man
over the elements. --I. Taylor.
[1913 Webster]
Applicate number (Math.), one which applied to some
concrete case.
Applicate ordinate, right line applied at right angles to
the axis of any conic section, and bounded by the curve.
[1913 Webster] |
Axes of coordinates in a plane (gcide) | Axis \Ax"is\, n.; pl. Axes. [L. axis axis, axle. See Axle.]
A straight line, real or imaginary, passing through a body,
on which it revolves, or may be supposed to revolve; a line
passing through a body or system around which the parts are
symmetrically arranged.
[1913 Webster]
2. (Math.) A straight line with respect to which the
different parts of a magnitude are symmetrically arranged;
as, the axis of a cylinder, i. e., the axis of a cone,
that is, the straight line joining the vertex and the
center of the base; the axis of a circle, any straight
line passing through the center.
[1913 Webster]
3. (Bot.) The stem; the central part, or longitudinal
support, on which organs or parts are arranged; the
central line of any body. --Gray.
[1913 Webster]
4. (Anat.)
(a) The second vertebra of the neck, or {vertebra
dentata}.
(b) Also used of the body only of the vertebra, which is
prolonged anteriorly within the foramen of the first
vertebra or atlas, so as to form the odontoid process
or peg which serves as a pivot for the atlas and head
to turn upon.
[1913 Webster]
5. (Crystallog.) One of several imaginary lines, assumed in
describing the position of the planes by which a crystal
is bounded.
[1913 Webster]
6. (Fine Arts) The primary or secondary central line of any
design.
[1913 Webster]
Anticlinal axis (Geol.), a line or ridge from which the
strata slope downward on the two opposite sides.
Synclinal axis, a line from which the strata slope upward
in opposite directions, so as to form a valley.
Axis cylinder (Anat.), the neuraxis or essential, central
substance of a nerve fiber; -- called also axis band,
axial fiber, and cylinder axis.
Axis in peritrochio, the wheel and axle, one of the
mechanical powers.
Axis of a curve (Geom.), a straight line which bisects a
system of parallel chords of a curve; called a {principal
axis}, when cutting them at right angles, in which case it
divides the curve into two symmetrical portions, as in the
parabola, which has one such axis, the ellipse, which has
two, or the circle, which has an infinite number. The two
axes of the ellipse are the major axis and the {minor
axis}, and the two axes of the hyperbola are the
transverse axis and the conjugate axis.
Axis of a lens, the straight line passing through its
center and perpendicular to its surfaces.
Axis of a microscope or Axis of a telescope, the straight
line with which coincide the axes of the several lenses
which compose it.
Axes of co["o]rdinates in a plane, two straight lines
intersecting each other, to which points are referred for
the purpose of determining their relative position: they
are either rectangular or oblique.
Axes of co["o]rdinates in space, the three straight lines
in which the co["o]rdinate planes intersect each other.
Axis of a balance, that line about which it turns.
Axis of oscillation, of a pendulum, a right line passing
through the center about which it vibrates, and
perpendicular to the plane of vibration.
Axis of polarization, the central line around which the
prismatic rings or curves are arranged. --Brewster.
Axis of revolution (Descriptive Geom.), a straight line
about which some line or plane is revolved, so that the
several points of the line or plane shall describe circles
with their centers in the fixed line, and their planes
perpendicular to it, the line describing a surface of
revolution, and the plane a solid of revolution.
Axis of symmetry (Geom.), any line in a plane figure which
divides the figure into two such parts that one part, when
folded over along the axis, shall coincide with the other
part.
Axis of the equator, ecliptic, horizon (or other circle
considered with reference to the sphere on which it lies),
the diameter of the sphere which is perpendicular to the
plane of the circle. --Hutton.
Axis of the Ionic capital (Arch.), a line passing
perpendicularly through the middle of the eye of the
volute.
Neutral axis (Mech.), the line of demarcation between the
horizontal elastic forces of tension and compression,
exerted by the fibers in any cross section of a girder.
Optic axis of a crystal, the direction in which a ray of
transmitted light suffers no double refraction. All
crystals, not of the isometric system, are either uniaxial
or biaxial.
Optic axis, Visual axis (Opt.), the straight line passing
through the center of the pupil, and perpendicular to the
surface of the eye.
Radical axis of two circles (Geom.), the straight line
perpendicular to the line joining their centers and such
that the tangents from any point of it to the two circles
shall be equal to each other.
Spiral axis (Arch.), the axis of a twisted column drawn
spirally in order to trace the circumvolutions without.
Axis of abscissas and Axis of ordinates. See Abscissa.
[1913 Webster] |
Axes of coordinates in space (gcide) | Axis \Ax"is\, n.; pl. Axes. [L. axis axis, axle. See Axle.]
A straight line, real or imaginary, passing through a body,
on which it revolves, or may be supposed to revolve; a line
passing through a body or system around which the parts are
symmetrically arranged.
[1913 Webster]
2. (Math.) A straight line with respect to which the
different parts of a magnitude are symmetrically arranged;
as, the axis of a cylinder, i. e., the axis of a cone,
that is, the straight line joining the vertex and the
center of the base; the axis of a circle, any straight
line passing through the center.
[1913 Webster]
3. (Bot.) The stem; the central part, or longitudinal
support, on which organs or parts are arranged; the
central line of any body. --Gray.
[1913 Webster]
4. (Anat.)
(a) The second vertebra of the neck, or {vertebra
dentata}.
(b) Also used of the body only of the vertebra, which is
prolonged anteriorly within the foramen of the first
vertebra or atlas, so as to form the odontoid process
or peg which serves as a pivot for the atlas and head
to turn upon.
[1913 Webster]
5. (Crystallog.) One of several imaginary lines, assumed in
describing the position of the planes by which a crystal
is bounded.
[1913 Webster]
6. (Fine Arts) The primary or secondary central line of any
design.
[1913 Webster]
Anticlinal axis (Geol.), a line or ridge from which the
strata slope downward on the two opposite sides.
Synclinal axis, a line from which the strata slope upward
in opposite directions, so as to form a valley.
Axis cylinder (Anat.), the neuraxis or essential, central
substance of a nerve fiber; -- called also axis band,
axial fiber, and cylinder axis.
Axis in peritrochio, the wheel and axle, one of the
mechanical powers.
Axis of a curve (Geom.), a straight line which bisects a
system of parallel chords of a curve; called a {principal
axis}, when cutting them at right angles, in which case it
divides the curve into two symmetrical portions, as in the
parabola, which has one such axis, the ellipse, which has
two, or the circle, which has an infinite number. The two
axes of the ellipse are the major axis and the {minor
axis}, and the two axes of the hyperbola are the
transverse axis and the conjugate axis.
Axis of a lens, the straight line passing through its
center and perpendicular to its surfaces.
Axis of a microscope or Axis of a telescope, the straight
line with which coincide the axes of the several lenses
which compose it.
Axes of co["o]rdinates in a plane, two straight lines
intersecting each other, to which points are referred for
the purpose of determining their relative position: they
are either rectangular or oblique.
Axes of co["o]rdinates in space, the three straight lines
in which the co["o]rdinate planes intersect each other.
Axis of a balance, that line about which it turns.
Axis of oscillation, of a pendulum, a right line passing
through the center about which it vibrates, and
perpendicular to the plane of vibration.
Axis of polarization, the central line around which the
prismatic rings or curves are arranged. --Brewster.
Axis of revolution (Descriptive Geom.), a straight line
about which some line or plane is revolved, so that the
several points of the line or plane shall describe circles
with their centers in the fixed line, and their planes
perpendicular to it, the line describing a surface of
revolution, and the plane a solid of revolution.
Axis of symmetry (Geom.), any line in a plane figure which
divides the figure into two such parts that one part, when
folded over along the axis, shall coincide with the other
part.
Axis of the equator, ecliptic, horizon (or other circle
considered with reference to the sphere on which it lies),
the diameter of the sphere which is perpendicular to the
plane of the circle. --Hutton.
Axis of the Ionic capital (Arch.), a line passing
perpendicularly through the middle of the eye of the
volute.
Neutral axis (Mech.), the line of demarcation between the
horizontal elastic forces of tension and compression,
exerted by the fibers in any cross section of a girder.
Optic axis of a crystal, the direction in which a ray of
transmitted light suffers no double refraction. All
crystals, not of the isometric system, are either uniaxial
or biaxial.
Optic axis, Visual axis (Opt.), the straight line passing
through the center of the pupil, and perpendicular to the
surface of the eye.
Radical axis of two circles (Geom.), the straight line
perpendicular to the line joining their centers and such
that the tangents from any point of it to the two circles
shall be equal to each other.
Spiral axis (Arch.), the axis of a twisted column drawn
spirally in order to trace the circumvolutions without.
Axis of abscissas and Axis of ordinates. See Abscissa.
[1913 Webster] |
Axis of ordinates (gcide) | Axis \Ax"is\, n.; pl. Axes. [L. axis axis, axle. See Axle.]
A straight line, real or imaginary, passing through a body,
on which it revolves, or may be supposed to revolve; a line
passing through a body or system around which the parts are
symmetrically arranged.
[1913 Webster]
2. (Math.) A straight line with respect to which the
different parts of a magnitude are symmetrically arranged;
as, the axis of a cylinder, i. e., the axis of a cone,
that is, the straight line joining the vertex and the
center of the base; the axis of a circle, any straight
line passing through the center.
[1913 Webster]
3. (Bot.) The stem; the central part, or longitudinal
support, on which organs or parts are arranged; the
central line of any body. --Gray.
[1913 Webster]
4. (Anat.)
(a) The second vertebra of the neck, or {vertebra
dentata}.
(b) Also used of the body only of the vertebra, which is
prolonged anteriorly within the foramen of the first
vertebra or atlas, so as to form the odontoid process
or peg which serves as a pivot for the atlas and head
to turn upon.
[1913 Webster]
5. (Crystallog.) One of several imaginary lines, assumed in
describing the position of the planes by which a crystal
is bounded.
[1913 Webster]
6. (Fine Arts) The primary or secondary central line of any
design.
[1913 Webster]
Anticlinal axis (Geol.), a line or ridge from which the
strata slope downward on the two opposite sides.
Synclinal axis, a line from which the strata slope upward
in opposite directions, so as to form a valley.
Axis cylinder (Anat.), the neuraxis or essential, central
substance of a nerve fiber; -- called also axis band,
axial fiber, and cylinder axis.
Axis in peritrochio, the wheel and axle, one of the
mechanical powers.
Axis of a curve (Geom.), a straight line which bisects a
system of parallel chords of a curve; called a {principal
axis}, when cutting them at right angles, in which case it
divides the curve into two symmetrical portions, as in the
parabola, which has one such axis, the ellipse, which has
two, or the circle, which has an infinite number. The two
axes of the ellipse are the major axis and the {minor
axis}, and the two axes of the hyperbola are the
transverse axis and the conjugate axis.
Axis of a lens, the straight line passing through its
center and perpendicular to its surfaces.
Axis of a microscope or Axis of a telescope, the straight
line with which coincide the axes of the several lenses
which compose it.
Axes of co["o]rdinates in a plane, two straight lines
intersecting each other, to which points are referred for
the purpose of determining their relative position: they
are either rectangular or oblique.
Axes of co["o]rdinates in space, the three straight lines
in which the co["o]rdinate planes intersect each other.
Axis of a balance, that line about which it turns.
Axis of oscillation, of a pendulum, a right line passing
through the center about which it vibrates, and
perpendicular to the plane of vibration.
Axis of polarization, the central line around which the
prismatic rings or curves are arranged. --Brewster.
Axis of revolution (Descriptive Geom.), a straight line
about which some line or plane is revolved, so that the
several points of the line or plane shall describe circles
with their centers in the fixed line, and their planes
perpendicular to it, the line describing a surface of
revolution, and the plane a solid of revolution.
Axis of symmetry (Geom.), any line in a plane figure which
divides the figure into two such parts that one part, when
folded over along the axis, shall coincide with the other
part.
Axis of the equator, ecliptic, horizon (or other circle
considered with reference to the sphere on which it lies),
the diameter of the sphere which is perpendicular to the
plane of the circle. --Hutton.
Axis of the Ionic capital (Arch.), a line passing
perpendicularly through the middle of the eye of the
volute.
Neutral axis (Mech.), the line of demarcation between the
horizontal elastic forces of tension and compression,
exerted by the fibers in any cross section of a girder.
Optic axis of a crystal, the direction in which a ray of
transmitted light suffers no double refraction. All
crystals, not of the isometric system, are either uniaxial
or biaxial.
Optic axis, Visual axis (Opt.), the straight line passing
through the center of the pupil, and perpendicular to the
surface of the eye.
Radical axis of two circles (Geom.), the straight line
perpendicular to the line joining their centers and such
that the tangents from any point of it to the two circles
shall be equal to each other.
Spiral axis (Arch.), the axis of a twisted column drawn
spirally in order to trace the circumvolutions without.
Axis of abscissas and Axis of ordinates. See Abscissa.
[1913 Webster] |
Cartesian coordinates (gcide) | Coordinate \Co*["o]r"di*nate\, n.
1. A thing of the same rank with another thing; one two or
more persons or things of equal rank, authority, or
importance.
[1913 Webster]
It has neither coordinate nor analogon; it is
absolutely one. --Coleridge.
[1913 Webster]
2. pl. (Math.) Lines, or other elements of reference, by
means of which the position of any point, as of a curve,
is defined with respect to certain fixed lines, or planes,
called coordinate axes and coordinate planes. See
Abscissa.
Note: Coordinates are of several kinds, consisting in some of
the different cases, of the following elements, namely:
(a) (Geom. of Two Dimensions) The abscissa and ordinate of
any point, taken together; as the abscissa PY and
ordinate PX of the point P (Fig. 2, referred to the
coordinate axes AY and AX.
(b) Any radius vector PA (Fig. 1), together with its angle
of inclination to a fixed line, APX, by which any
point A in the same plane is referred to that fixed
line, and a fixed point in it, called the pole, P.
(c) (Geom. of Three Dimensions) Any three lines, or
distances, PB, PC, PD (Fig. 3), taken parallel to
three coordinate axes, AX, AY, AZ, and measured from
the corresponding coordinate fixed planes, YAZ, XAZ,
XAY, to any point in space, P, whose position is
thereby determined with respect to these planes and
axes.
(d) A radius vector, the angle which it makes with a fixed
plane, and the angle which its projection on the plane
makes with a fixed line line in the plane, by which
means any point in space at the free extremity of the
radius vector is referred to that fixed plane and
fixed line, and a fixed point in that line, the pole
of the radius vector.
[1913 Webster]
Cartesian coordinates. See under Cartesian.
Geographical coordinates, the latitude and longitude of a
place, by which its relative situation on the globe is
known. The height of the above the sea level constitutes a
third coordinate.
Polar coordinates, coordinates made up of a radius vector
and its angle of inclination to another line, or a line
and plane; as those defined in
(b) and
(d) above.
Rectangular coordinates, coordinates the axes of which
intersect at right angles.
Rectilinear coordinates, coordinates made up of right
lines. Those defined in
(a) and
(c) above are called also Cartesian coordinates.
Trigonometrical coordinates or Spherical coordinates,
elements of reference, by means of which the position of a
point on the surface of a sphere may be determined with
respect to two great circles of the sphere.
Trilinear coordinates, coordinates of a point in a plane,
consisting of the three ratios which the three distances
of the point from three fixed lines have one to another.
[1913 Webster]Cartesian \Car*te"sian\, a. [From Renatus Cartesius, Latinized
from of Ren['e] Descartes: cf. F. cart['e]sien.]
Of or pertaining to the French philosopher Ren['e] Descartes,
or his philosophy.
[1913 Webster]
The Cartesion argument for reality of matter. --Sir W.
Hamilton.
[1913 Webster]
Cartesian coordinates (Geom), distance of a point from
lines or planes; -- used in a system of representing
geometric quantities, invented by Descartes.
Cartesian devil, a small hollow glass figure, used in
connection with a jar of water having an elastic top, to
illustrate the effect of the compression or expansion of
air in changing the specific gravity of bodies.
Cartesion oval (Geom.), a curve such that, for any point of
the curve mr + m'r' = c, where r and r' are the distances
of the point from the two foci and m, m' and c are
constant; -- used by Descartes.
[1913 Webster] |
Coordinate (gcide) | Coordinate \Co*["o]r"di*nate\, n.
1. A thing of the same rank with another thing; one two or
more persons or things of equal rank, authority, or
importance.
[1913 Webster]
It has neither coordinate nor analogon; it is
absolutely one. --Coleridge.
[1913 Webster]
2. pl. (Math.) Lines, or other elements of reference, by
means of which the position of any point, as of a curve,
is defined with respect to certain fixed lines, or planes,
called coordinate axes and coordinate planes. See
Abscissa.
Note: Coordinates are of several kinds, consisting in some of
the different cases, of the following elements, namely:
(a) (Geom. of Two Dimensions) The abscissa and ordinate of
any point, taken together; as the abscissa PY and
ordinate PX of the point P (Fig. 2, referred to the
coordinate axes AY and AX.
(b) Any radius vector PA (Fig. 1), together with its angle
of inclination to a fixed line, APX, by which any
point A in the same plane is referred to that fixed
line, and a fixed point in it, called the pole, P.
(c) (Geom. of Three Dimensions) Any three lines, or
distances, PB, PC, PD (Fig. 3), taken parallel to
three coordinate axes, AX, AY, AZ, and measured from
the corresponding coordinate fixed planes, YAZ, XAZ,
XAY, to any point in space, P, whose position is
thereby determined with respect to these planes and
axes.
(d) A radius vector, the angle which it makes with a fixed
plane, and the angle which its projection on the plane
makes with a fixed line line in the plane, by which
means any point in space at the free extremity of the
radius vector is referred to that fixed plane and
fixed line, and a fixed point in that line, the pole
of the radius vector.
[1913 Webster]
Cartesian coordinates. See under Cartesian.
Geographical coordinates, the latitude and longitude of a
place, by which its relative situation on the globe is
known. The height of the above the sea level constitutes a
third coordinate.
Polar coordinates, coordinates made up of a radius vector
and its angle of inclination to another line, or a line
and plane; as those defined in
(b) and
(d) above.
Rectangular coordinates, coordinates the axes of which
intersect at right angles.
Rectilinear coordinates, coordinates made up of right
lines. Those defined in
(a) and
(c) above are called also Cartesian coordinates.
Trigonometrical coordinates or Spherical coordinates,
elements of reference, by means of which the position of a
point on the surface of a sphere may be determined with
respect to two great circles of the sphere.
Trilinear coordinates, coordinates of a point in a plane,
consisting of the three ratios which the three distances
of the point from three fixed lines have one to another.
[1913 Webster]Coordinate \Co*["o]r"di*nate\, a. [Pref. co- + L. ordinatus, p.
p. of ordinare to regulate. See Ordain.]
Equal in rank or order; not subordinate.
[1913 Webster]
Whether there was one Supreme Governor of the world, or
many coordinate powers presiding over each country.
--Law.
[1913 Webster]
Conjunctions joint sentences and coordinate terms.
--Rev. R.
Morris.
[1913 Webster]
Coordinate adjectives, adjectives disconnected as regards
one another, but referring equally to the same subject.
Coordinate conjunctions, conjunctions joining independent
propositions. --Rev. R. Morris.
[1913 Webster] co-ordinateco-ordinate \co-ordinate\, coordinate
\co*["o]r"di*nate\(-n[=a]t), v. t. [imp. & p. p. Coordinated;
p. pr. & vb. n. Coordinating.]
1. To make coordinate; to put in the same order or rank; as,
to coordinate ideas in classification.
[1913 Webster]
2. To give a common action, movement, or condition to; to
regulate and combine so as to produce harmonious action;
to adjust; to harmonize; as, to coordinate muscular
movements.
[1913 Webster]
3. to be co-ordinated; as, These activities co-ordinate well.
Syn: coordinate.
[WordNet 1.5] |
co-ordinate (gcide) | Coordinate \Co*["o]r"di*nate\, n.
1. A thing of the same rank with another thing; one two or
more persons or things of equal rank, authority, or
importance.
[1913 Webster]
It has neither coordinate nor analogon; it is
absolutely one. --Coleridge.
[1913 Webster]
2. pl. (Math.) Lines, or other elements of reference, by
means of which the position of any point, as of a curve,
is defined with respect to certain fixed lines, or planes,
called coordinate axes and coordinate planes. See
Abscissa.
Note: Coordinates are of several kinds, consisting in some of
the different cases, of the following elements, namely:
(a) (Geom. of Two Dimensions) The abscissa and ordinate of
any point, taken together; as the abscissa PY and
ordinate PX of the point P (Fig. 2, referred to the
coordinate axes AY and AX.
(b) Any radius vector PA (Fig. 1), together with its angle
of inclination to a fixed line, APX, by which any
point A in the same plane is referred to that fixed
line, and a fixed point in it, called the pole, P.
(c) (Geom. of Three Dimensions) Any three lines, or
distances, PB, PC, PD (Fig. 3), taken parallel to
three coordinate axes, AX, AY, AZ, and measured from
the corresponding coordinate fixed planes, YAZ, XAZ,
XAY, to any point in space, P, whose position is
thereby determined with respect to these planes and
axes.
(d) A radius vector, the angle which it makes with a fixed
plane, and the angle which its projection on the plane
makes with a fixed line line in the plane, by which
means any point in space at the free extremity of the
radius vector is referred to that fixed plane and
fixed line, and a fixed point in that line, the pole
of the radius vector.
[1913 Webster]
Cartesian coordinates. See under Cartesian.
Geographical coordinates, the latitude and longitude of a
place, by which its relative situation on the globe is
known. The height of the above the sea level constitutes a
third coordinate.
Polar coordinates, coordinates made up of a radius vector
and its angle of inclination to another line, or a line
and plane; as those defined in
(b) and
(d) above.
Rectangular coordinates, coordinates the axes of which
intersect at right angles.
Rectilinear coordinates, coordinates made up of right
lines. Those defined in
(a) and
(c) above are called also Cartesian coordinates.
Trigonometrical coordinates or Spherical coordinates,
elements of reference, by means of which the position of a
point on the surface of a sphere may be determined with
respect to two great circles of the sphere.
Trilinear coordinates, coordinates of a point in a plane,
consisting of the three ratios which the three distances
of the point from three fixed lines have one to another.
[1913 Webster]Coordinate \Co*["o]r"di*nate\, a. [Pref. co- + L. ordinatus, p.
p. of ordinare to regulate. See Ordain.]
Equal in rank or order; not subordinate.
[1913 Webster]
Whether there was one Supreme Governor of the world, or
many coordinate powers presiding over each country.
--Law.
[1913 Webster]
Conjunctions joint sentences and coordinate terms.
--Rev. R.
Morris.
[1913 Webster]
Coordinate adjectives, adjectives disconnected as regards
one another, but referring equally to the same subject.
Coordinate conjunctions, conjunctions joining independent
propositions. --Rev. R. Morris.
[1913 Webster] co-ordinateco-ordinate \co-ordinate\, coordinate
\co*["o]r"di*nate\(-n[=a]t), v. t. [imp. & p. p. Coordinated;
p. pr. & vb. n. Coordinating.]
1. To make coordinate; to put in the same order or rank; as,
to coordinate ideas in classification.
[1913 Webster]
2. To give a common action, movement, or condition to; to
regulate and combine so as to produce harmonious action;
to adjust; to harmonize; as, to coordinate muscular
movements.
[1913 Webster]
3. to be co-ordinated; as, These activities co-ordinate well.
Syn: coordinate.
[WordNet 1.5] |
coordinate (gcide) | Coordinate \Co*["o]r"di*nate\, n.
1. A thing of the same rank with another thing; one two or
more persons or things of equal rank, authority, or
importance.
[1913 Webster]
It has neither coordinate nor analogon; it is
absolutely one. --Coleridge.
[1913 Webster]
2. pl. (Math.) Lines, or other elements of reference, by
means of which the position of any point, as of a curve,
is defined with respect to certain fixed lines, or planes,
called coordinate axes and coordinate planes. See
Abscissa.
Note: Coordinates are of several kinds, consisting in some of
the different cases, of the following elements, namely:
(a) (Geom. of Two Dimensions) The abscissa and ordinate of
any point, taken together; as the abscissa PY and
ordinate PX of the point P (Fig. 2, referred to the
coordinate axes AY and AX.
(b) Any radius vector PA (Fig. 1), together with its angle
of inclination to a fixed line, APX, by which any
point A in the same plane is referred to that fixed
line, and a fixed point in it, called the pole, P.
(c) (Geom. of Three Dimensions) Any three lines, or
distances, PB, PC, PD (Fig. 3), taken parallel to
three coordinate axes, AX, AY, AZ, and measured from
the corresponding coordinate fixed planes, YAZ, XAZ,
XAY, to any point in space, P, whose position is
thereby determined with respect to these planes and
axes.
(d) A radius vector, the angle which it makes with a fixed
plane, and the angle which its projection on the plane
makes with a fixed line line in the plane, by which
means any point in space at the free extremity of the
radius vector is referred to that fixed plane and
fixed line, and a fixed point in that line, the pole
of the radius vector.
[1913 Webster]
Cartesian coordinates. See under Cartesian.
Geographical coordinates, the latitude and longitude of a
place, by which its relative situation on the globe is
known. The height of the above the sea level constitutes a
third coordinate.
Polar coordinates, coordinates made up of a radius vector
and its angle of inclination to another line, or a line
and plane; as those defined in
(b) and
(d) above.
Rectangular coordinates, coordinates the axes of which
intersect at right angles.
Rectilinear coordinates, coordinates made up of right
lines. Those defined in
(a) and
(c) above are called also Cartesian coordinates.
Trigonometrical coordinates or Spherical coordinates,
elements of reference, by means of which the position of a
point on the surface of a sphere may be determined with
respect to two great circles of the sphere.
Trilinear coordinates, coordinates of a point in a plane,
consisting of the three ratios which the three distances
of the point from three fixed lines have one to another.
[1913 Webster]Coordinate \Co*["o]r"di*nate\, a. [Pref. co- + L. ordinatus, p.
p. of ordinare to regulate. See Ordain.]
Equal in rank or order; not subordinate.
[1913 Webster]
Whether there was one Supreme Governor of the world, or
many coordinate powers presiding over each country.
--Law.
[1913 Webster]
Conjunctions joint sentences and coordinate terms.
--Rev. R.
Morris.
[1913 Webster]
Coordinate adjectives, adjectives disconnected as regards
one another, but referring equally to the same subject.
Coordinate conjunctions, conjunctions joining independent
propositions. --Rev. R. Morris.
[1913 Webster] co-ordinateco-ordinate \co-ordinate\, coordinate
\co*["o]r"di*nate\(-n[=a]t), v. t. [imp. & p. p. Coordinated;
p. pr. & vb. n. Coordinating.]
1. To make coordinate; to put in the same order or rank; as,
to coordinate ideas in classification.
[1913 Webster]
2. To give a common action, movement, or condition to; to
regulate and combine so as to produce harmonious action;
to adjust; to harmonize; as, to coordinate muscular
movements.
[1913 Webster]
3. to be co-ordinated; as, These activities co-ordinate well.
Syn: coordinate.
[WordNet 1.5] |
Coordinate adjectives (gcide) | Coordinate \Co*["o]r"di*nate\, a. [Pref. co- + L. ordinatus, p.
p. of ordinare to regulate. See Ordain.]
Equal in rank or order; not subordinate.
[1913 Webster]
Whether there was one Supreme Governor of the world, or
many coordinate powers presiding over each country.
--Law.
[1913 Webster]
Conjunctions joint sentences and coordinate terms.
--Rev. R.
Morris.
[1913 Webster]
Coordinate adjectives, adjectives disconnected as regards
one another, but referring equally to the same subject.
Coordinate conjunctions, conjunctions joining independent
propositions. --Rev. R. Morris.
[1913 Webster] co-ordinate |
Coordinate conjunctions (gcide) | Coordinate \Co*["o]r"di*nate\, a. [Pref. co- + L. ordinatus, p.
p. of ordinare to regulate. See Ordain.]
Equal in rank or order; not subordinate.
[1913 Webster]
Whether there was one Supreme Governor of the world, or
many coordinate powers presiding over each country.
--Law.
[1913 Webster]
Conjunctions joint sentences and coordinate terms.
--Rev. R.
Morris.
[1913 Webster]
Coordinate adjectives, adjectives disconnected as regards
one another, but referring equally to the same subject.
Coordinate conjunctions, conjunctions joining independent
propositions. --Rev. R. Morris.
[1913 Webster] co-ordinate |
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] |
coordinated (gcide) | integrated \integrated\ adj.
1. Formed or united into a whole.
Syn: incorporate, incorporated, merged, unified.
[WordNet 1.5]
2. Formed into a whole or introduced into another entity; as,
an integrated Europe. Opposite of nonintegrated.
[Narrower terms: coordinated, interconnected,
unified; embedded; incorporated; tight-knit,
tightly knit]
a more closely integrated economic and political
system --Dwight D.
Eisenhower
[WordNet 1.5]
3. Having different groups treated together as equals in one
group; as, racially integrated schools. [Narrower terms:
co-ed, coeducational; {desegrated, nonsegregated,
unsegregated}; interracial; mainstreamed] Also See:
integrative, joint, united. Antonym: segregated.
[WordNet 1.5 +PJC]
4. Resembling a living organism in organization or
development. [Narrower terms: organic (vs. inorganic)]
Syn: structured.
[WordNet 1.5]
5. combined. Opposite of uncombined.
[WordNet 1.5 +PJC]
6. having constituent parts mixed to form a single unit.
Opposite of unmixed. [Narrower terms: blended[2]]
Syn: amalgamated, intermingled, mixed.
[WordNet 1.5 +PJC]co-ordinate \co-ordinate\, coordinate
\co*["o]r"di*nate\(-n[=a]t), v. t. [imp. & p. p. Coordinated;
p. pr. & vb. n. Coordinating.]
1. To make coordinate; to put in the same order or rank; as,
to coordinate ideas in classification.
[1913 Webster]
2. To give a common action, movement, or condition to; to
regulate and combine so as to produce harmonious action;
to adjust; to harmonize; as, to coordinate muscular
movements.
[1913 Webster]
3. to be co-ordinated; as, These activities co-ordinate well.
Syn: coordinate.
[WordNet 1.5]coordinated \coordinated\ adj.
1. dexterous in the use of more than one set of muscle
movements.
[WordNet 1.5]
She was usually good with her hands and well
coordinated. --Mary
McCarthy
2. matched in color and pattern so as to be pleasing to the
esthetic sense; as, The curtains and walls were color
coordinated.
Syn: matching.
[WordNet 1.5]
3. operating as a unit; as, a coordinated development plan.
Syn: coordinated, concerted, interconnected, unified.
[WordNet 1.5 +PJC] coordinating |
Coordinated (gcide) | integrated \integrated\ adj.
1. Formed or united into a whole.
Syn: incorporate, incorporated, merged, unified.
[WordNet 1.5]
2. Formed into a whole or introduced into another entity; as,
an integrated Europe. Opposite of nonintegrated.
[Narrower terms: coordinated, interconnected,
unified; embedded; incorporated; tight-knit,
tightly knit]
a more closely integrated economic and political
system --Dwight D.
Eisenhower
[WordNet 1.5]
3. Having different groups treated together as equals in one
group; as, racially integrated schools. [Narrower terms:
co-ed, coeducational; {desegrated, nonsegregated,
unsegregated}; interracial; mainstreamed] Also See:
integrative, joint, united. Antonym: segregated.
[WordNet 1.5 +PJC]
4. Resembling a living organism in organization or
development. [Narrower terms: organic (vs. inorganic)]
Syn: structured.
[WordNet 1.5]
5. combined. Opposite of uncombined.
[WordNet 1.5 +PJC]
6. having constituent parts mixed to form a single unit.
Opposite of unmixed. [Narrower terms: blended[2]]
Syn: amalgamated, intermingled, mixed.
[WordNet 1.5 +PJC]co-ordinate \co-ordinate\, coordinate
\co*["o]r"di*nate\(-n[=a]t), v. t. [imp. & p. p. Coordinated;
p. pr. & vb. n. Coordinating.]
1. To make coordinate; to put in the same order or rank; as,
to coordinate ideas in classification.
[1913 Webster]
2. To give a common action, movement, or condition to; to
regulate and combine so as to produce harmonious action;
to adjust; to harmonize; as, to coordinate muscular
movements.
[1913 Webster]
3. to be co-ordinated; as, These activities co-ordinate well.
Syn: coordinate.
[WordNet 1.5]coordinated \coordinated\ adj.
1. dexterous in the use of more than one set of muscle
movements.
[WordNet 1.5]
She was usually good with her hands and well
coordinated. --Mary
McCarthy
2. matched in color and pattern so as to be pleasing to the
esthetic sense; as, The curtains and walls were color
coordinated.
Syn: matching.
[WordNet 1.5]
3. operating as a unit; as, a coordinated development plan.
Syn: coordinated, concerted, interconnected, unified.
[WordNet 1.5 +PJC] coordinating |
coordinated (gcide) | integrated \integrated\ adj.
1. Formed or united into a whole.
Syn: incorporate, incorporated, merged, unified.
[WordNet 1.5]
2. Formed into a whole or introduced into another entity; as,
an integrated Europe. Opposite of nonintegrated.
[Narrower terms: coordinated, interconnected,
unified; embedded; incorporated; tight-knit,
tightly knit]
a more closely integrated economic and political
system --Dwight D.
Eisenhower
[WordNet 1.5]
3. Having different groups treated together as equals in one
group; as, racially integrated schools. [Narrower terms:
co-ed, coeducational; {desegrated, nonsegregated,
unsegregated}; interracial; mainstreamed] Also See:
integrative, joint, united. Antonym: segregated.
[WordNet 1.5 +PJC]
4. Resembling a living organism in organization or
development. [Narrower terms: organic (vs. inorganic)]
Syn: structured.
[WordNet 1.5]
5. combined. Opposite of uncombined.
[WordNet 1.5 +PJC]
6. having constituent parts mixed to form a single unit.
Opposite of unmixed. [Narrower terms: blended[2]]
Syn: amalgamated, intermingled, mixed.
[WordNet 1.5 +PJC]co-ordinate \co-ordinate\, coordinate
\co*["o]r"di*nate\(-n[=a]t), v. t. [imp. & p. p. Coordinated;
p. pr. & vb. n. Coordinating.]
1. To make coordinate; to put in the same order or rank; as,
to coordinate ideas in classification.
[1913 Webster]
2. To give a common action, movement, or condition to; to
regulate and combine so as to produce harmonious action;
to adjust; to harmonize; as, to coordinate muscular
movements.
[1913 Webster]
3. to be co-ordinated; as, These activities co-ordinate well.
Syn: coordinate.
[WordNet 1.5]coordinated \coordinated\ adj.
1. dexterous in the use of more than one set of muscle
movements.
[WordNet 1.5]
She was usually good with her hands and well
coordinated. --Mary
McCarthy
2. matched in color and pattern so as to be pleasing to the
esthetic sense; as, The curtains and walls were color
coordinated.
Syn: matching.
[WordNet 1.5]
3. operating as a unit; as, a coordinated development plan.
Syn: coordinated, concerted, interconnected, unified.
[WordNet 1.5 +PJC] coordinating |
Coordinately (gcide) | Coordinately \Co*["o]r"di*nate*ly\, adv.
In a coordinate manner.
[1913 Webster] |
Coordinateness (gcide) | Coordinateness \Co*["o]r"di*nate*ness\, n.
The state of being coordinate; equality of rank or authority.
[1913 Webster] |
Disordinate (gcide) | Disordinate \Dis*or"di*nate\, a.
Inordinate; disorderly. [Obs.] "With disordinate gestures."
--Prynne.
[1913 Webster] |
Disordinately (gcide) | Disordinately \Dis*or"di*nate*ly\, adv.
Inordinately. [Obs.] --E. Hall.
[1913 Webster] |
Foreordinate (gcide) | Foreordinate \Fore*or"di*nate\, v. t.
To foreordain.
[1913 Webster] |
Geographical coordinates (gcide) | Coordinate \Co*["o]r"di*nate\, n.
1. A thing of the same rank with another thing; one two or
more persons or things of equal rank, authority, or
importance.
[1913 Webster]
It has neither coordinate nor analogon; it is
absolutely one. --Coleridge.
[1913 Webster]
2. pl. (Math.) Lines, or other elements of reference, by
means of which the position of any point, as of a curve,
is defined with respect to certain fixed lines, or planes,
called coordinate axes and coordinate planes. See
Abscissa.
Note: Coordinates are of several kinds, consisting in some of
the different cases, of the following elements, namely:
(a) (Geom. of Two Dimensions) The abscissa and ordinate of
any point, taken together; as the abscissa PY and
ordinate PX of the point P (Fig. 2, referred to the
coordinate axes AY and AX.
(b) Any radius vector PA (Fig. 1), together with its angle
of inclination to a fixed line, APX, by which any
point A in the same plane is referred to that fixed
line, and a fixed point in it, called the pole, P.
(c) (Geom. of Three Dimensions) Any three lines, or
distances, PB, PC, PD (Fig. 3), taken parallel to
three coordinate axes, AX, AY, AZ, and measured from
the corresponding coordinate fixed planes, YAZ, XAZ,
XAY, to any point in space, P, whose position is
thereby determined with respect to these planes and
axes.
(d) A radius vector, the angle which it makes with a fixed
plane, and the angle which its projection on the plane
makes with a fixed line line in the plane, by which
means any point in space at the free extremity of the
radius vector is referred to that fixed plane and
fixed line, and a fixed point in that line, the pole
of the radius vector.
[1913 Webster]
Cartesian coordinates. See under Cartesian.
Geographical coordinates, the latitude and longitude of a
place, by which its relative situation on the globe is
known. The height of the above the sea level constitutes a
third coordinate.
Polar coordinates, coordinates made up of a radius vector
and its angle of inclination to another line, or a line
and plane; as those defined in
(b) and
(d) above.
Rectangular coordinates, coordinates the axes of which
intersect at right angles.
Rectilinear coordinates, coordinates made up of right
lines. Those defined in
(a) and
(c) above are called also Cartesian coordinates.
Trigonometrical coordinates or Spherical coordinates,
elements of reference, by means of which the position of a
point on the surface of a sphere may be determined with
respect to two great circles of the sphere.
Trilinear coordinates, coordinates of a point in a plane,
consisting of the three ratios which the three distances
of the point from three fixed lines have one to another.
[1913 Webster] |
Incoordinate (gcide) | Incoordinate \In`co*["o]r"di*nate\, a.
Not co["o]rdinate.
[1913 Webster] |
Inordinate (gcide) | Inordinate \In*or"di*nate\, a. [L. inordinatus disordered. See
In- not, and Ordinate.]
Not limited to rules prescribed, or to usual bounds;
irregular; excessive; immoderate; as, an inordinate love of
the world. "Inordinate desires." --Milton. "Inordinate
vanity." --Burke. -- In*or"di*nate*ly, adv. --
In*or"di*nate*ness, n.
[1913 Webster] |
Inordinately (gcide) | Inordinate \In*or"di*nate\, a. [L. inordinatus disordered. See
In- not, and Ordinate.]
Not limited to rules prescribed, or to usual bounds;
irregular; excessive; immoderate; as, an inordinate love of
the world. "Inordinate desires." --Milton. "Inordinate
vanity." --Burke. -- In*or"di*nate*ly, adv. --
In*or"di*nate*ness, n.
[1913 Webster] |
|