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ComparableComparable Com"pa*ra*ble, a. [L. comparabilis: cf. F.
comparable.]
Capable of being compared; worthy of comparison.
There is no blessing of life comparable to the
enjoyment of a discreet and virtuous friend. --Addison.
-- Com"pa*ra*ble*ness, n. -- Com"pa*ra*bly, adv. ComparablenessComparable Com"pa*ra*ble, a. [L. comparabilis: cf. F.
comparable.]
Capable of being compared; worthy of comparison.
There is no blessing of life comparable to the
enjoyment of a discreet and virtuous friend. --Addison.
-- Com"pa*ra*ble*ness, n. -- Com"pa*ra*bly, adv. ComparablyComparable Com"pa*ra*ble, a. [L. comparabilis: cf. F.
comparable.]
Capable of being compared; worthy of comparison.
There is no blessing of life comparable to the
enjoyment of a discreet and virtuous friend. --Addison.
-- Com"pa*ra*ble*ness, n. -- Com"pa*ra*bly, adv. cubical parabolaParabola Pa*rab"o*la, n.; pl. Parabolas. [NL., fr. Gr. ?; --
so called because its axis is parallel to the side of the
cone. See Parable, and cf. Parabole.] (Geom.)
(a) A kind of curve; one of the conic sections formed by the
intersection of the surface of a cone with a plane
parallel to one of its sides. It is a curve, any point of
which is equally distant from a fixed point, called the
focus, and a fixed straight line, called the directrix.
See Focus.
(b) One of a group of curves defined by the equation y =
ax^n where n is a positive whole number or a positive
fraction. For the cubical parabola n = 3; for the
semicubical parabola n = 3/2. See under Cubical, and
Semicubical. The parabolas have infinite branches, but
no rectilineal asymptotes. Cubical parabolaCubic Cu"bic (k?"b?k), Cubical Cu"bic*al (-b?-kal), a. [L.
cubicus, Gr. ?????: cf. F. cubique. See Cube.]
1. Having the form or properties of a cube; contained, or
capable of being contained, in a cube.
2. (Crystallog.) Isometric or monometric; as, cubic cleavage.
See Crystallization.
Cubic equation, an equation in which the highest power of
the unknown quantity is a cube.
Cubic foot, a volume equivalent to a cubical solid which
measures a foot in each of its dimensions.
Cubic number, a number produced by multiplying a number
into itself, and that product again by the same number.
See Cube.
Cubical parabola (Geom.), two curves of the third degree,
one plane, and one on space of three dimensions. Equiparable
Equiparable E*quip"a*ra*blea. [L. aequiparabilis.]
Comparable. [Obs. or R.]
IncomparableIncomparable In*com"pa*ra*ble, a. [L. incomparabilis: cf. F.
incomparable. See In- not, and Comparable.]
Not comparable; admitting of no comparison with others;
unapproachably eminent; without a peer or equal; matchless;
peerless; transcendent.
A merchant of incomparable wealth. --Shak.
A new hypothesis . . . which hath the incomparable Sir
Isaac Newton for a patron. --Bp.
Warburton.
-- In*com"pa*ra*ble*ness, n. -- In*com"pa*ra*bly, adv.
Delights incomparably all those corporeal things. --Bp.
Wilkins. IncomparablenessIncomparable In*com"pa*ra*ble, a. [L. incomparabilis: cf. F.
incomparable. See In- not, and Comparable.]
Not comparable; admitting of no comparison with others;
unapproachably eminent; without a peer or equal; matchless;
peerless; transcendent.
A merchant of incomparable wealth. --Shak.
A new hypothesis . . . which hath the incomparable Sir
Isaac Newton for a patron. --Bp.
Warburton.
-- In*com"pa*ra*ble*ness, n. -- In*com"pa*ra*bly, adv.
Delights incomparably all those corporeal things. --Bp.
Wilkins. IncomparablyIncomparable In*com"pa*ra*ble, a. [L. incomparabilis: cf. F.
incomparable. See In- not, and Comparable.]
Not comparable; admitting of no comparison with others;
unapproachably eminent; without a peer or equal; matchless;
peerless; transcendent.
A merchant of incomparable wealth. --Shak.
A new hypothesis . . . which hath the incomparable Sir
Isaac Newton for a patron. --Bp.
Warburton.
-- In*com"pa*ra*ble*ness, n. -- In*com"pa*ra*bly, adv.
Delights incomparably all those corporeal things. --Bp.
Wilkins. Inseparableness
Inseparableness In*sep"a*ra*ble*ness, n.
The quality or state of being inseparable; inseparability.
--Bp. Burnet.
Inseparably
Inseparably In*sep"a*ra*bly, adv.
In an inseparable manner or condition; so as not to be
separable. --Bacon.
And cleaves through life inseparably close. --Cowper.
Irreparableness
Irreparableness Ir*rep"a*ra*ble*ness, n.
Quality of being irreparable.
Irreparably
Irreparably Ir*rep"a*ra*bly, adv.
In an irreparable manner.
Narcissus incomparabilisButter But"ter (b[u^]t"t[~e]r), n. [OE. botere, butter, AS.
butere, fr. L. butyrum, Gr. boy`tyron; either fr. boy`s ox,
cow + tyro`s cheese; or, perhaps, of Scythian origin. Cf.
Cow.]
1. An oily, unctuous substance obtained from cream or milk by
churning.
2. Any substance resembling butter in degree of consistence,
or other qualities, especially, in old chemistry, the
chlorides, as butter of antimony, sesquichloride of
antimony; also, certain concrete fat oils remaining nearly
solid at ordinary temperatures, as butter of cacao,
vegetable butter, shea butter.
Butter and eggs (Bot.), a name given to several plants
having flowers of two shades of yellow, as Narcissus
incomparabilis, and in the United States to the toadflax
(Linaria vulgaris).
Butter boat, a small vessel for holding melted butter at
table.
Butter flower, the buttercup, a yellow flower.
Butter print, a piece of carved wood used to mark pats of
butter; -- called also butter stamp. --Locke.
Butter tooth, either of the two middle incisors of the
upper jaw.
Butter tree (Bot.), a tree of the genus Bassia, the seeds
of which yield a substance closely resembling butter. The
butter tree of India is the B. butyracea; that of Africa
is the Shea tree (B. Parkii). See Shea tree.
Butter trier, a tool used in sampling butter.
Butter wife, a woman who makes or sells butter; -- called
also butter woman. [Obs. or Archaic] ParabanicParabanic Par`a*ban"ic, a. [Gr. ? to pass over.] (Chem.)
Pertaining to, or designating, a nitrogenous acid which is
obtained by the oxidation of uric acid, as a white
crystalline substance (C3N2H2O3); -- also called oxalyl
urea. ParablastParablast Par"a*blast, n. [Cf. Gr. ? to grow beside. See
Para-, and -blast.] (Biol.)
A portion of the mesoblast (of peripheral origin) of the
developing embryo, the cells of which are especially
concerned in forming the first blood and blood vessels. --C.
S. Minot. Parablastic
Parablastic Par`a*blas"tic, a. (Biol.)
Of or pertaining to the parablast; as, the parablastic cells.
Parable
Parable Par"a*ble, a. [L. parabilis, fr. parare to provide.]
Procurable. [Obs.] --Sir T. Browne.
ParableParable Par"a*ble, n. [F. parabole, L. parabola, fr. Gr. ? a
placing beside or together, a comparing, comparison, a
parable, fr. ? to throw beside, compare; ? beside + ? to
throw; cf. Skr. gal to drop. Cf. Emblem, Gland,
Palaver, Parabola, Parley, Parabole, Symbol.]
A comparison; a similitude; specifically, a short fictitious
narrative of something which might really occur in life or
nature, by means of which a moral is drawn; as, the parables
of Christ. --Chaucer.
Declare unto us the parable of the tares. --Matt. xiii.
36.
Syn: See Allegory, and Note under Apologue. Parable
Parable Par"a*ble, v. t.
To represent by parable. [R.]
Which by the ancient sages was thus parabled. --Milton.
ParabolaParabola Pa*rab"o*la, n.; pl. Parabolas. [NL., fr. Gr. ?; --
so called because its axis is parallel to the side of the
cone. See Parable, and cf. Parabole.] (Geom.)
(a) A kind of curve; one of the conic sections formed by the
intersection of the surface of a cone with a plane
parallel to one of its sides. It is a curve, any point of
which is equally distant from a fixed point, called the
focus, and a fixed straight line, called the directrix.
See Focus.
(b) One of a group of curves defined by the equation y =
ax^n where n is a positive whole number or a positive
fraction. For the cubical parabola n = 3; for the
semicubical parabola n = 3/2. See under Cubical, and
Semicubical. The parabolas have infinite branches, but
no rectilineal asymptotes. ParabolasParabola Pa*rab"o*la, n.; pl. Parabolas. [NL., fr. Gr. ?; --
so called because its axis is parallel to the side of the
cone. See Parable, and cf. Parabole.] (Geom.)
(a) A kind of curve; one of the conic sections formed by the
intersection of the surface of a cone with a plane
parallel to one of its sides. It is a curve, any point of
which is equally distant from a fixed point, called the
focus, and a fixed straight line, called the directrix.
See Focus.
(b) One of a group of curves defined by the equation y =
ax^n where n is a positive whole number or a positive
fraction. For the cubical parabola n = 3; for the
semicubical parabola n = 3/2. See under Cubical, and
Semicubical. The parabolas have infinite branches, but
no rectilineal asymptotes. ParaboleParabole Pa*rab"o*le, n. [L., fr. Gr. ?. See Parable.]
(Rhet.)
Similitude; comparison. ParabolicParabolic Par`a*bol"ic, Parabolical Par`a*bol"ic*al, a. [Gr.
paraboliko`s figurative: cf. F. parabolique. See Parable.]
1. Of the nature of a parable; expressed by a parable or
figure; allegorical; as, parabolical instruction.
2. [From Parabola.] (Geom.)
(a) Having the form or nature of a parabola; pertaining
to, or resembling, a parabola; as, a parabolic curve.
(b) Generated by the revolution of a parabola, or by a
line that moves on a parabola as a directing curve;
as, a parabolic conoid.
Parabolic conoid, a paraboloid; a conoid whose directing
curve is a parabola. See Conoid.
Parabolic mirror (Opt.), a mirror having a paraboloidal
surface which gives for parallel rays (as those from very
distant objects) images free from aberration. It is used
in reflecting telescopes.
Parabolic spindle, the solid generated by revolving the
portion of a parabola cut off by a line drawn at right
angles to the axis of the curve, about that line as an
axis.
Parabolic spiral, a spiral curve conceived to be formed by
the periphery of a semiparabola when its axis is wrapped
about a circle; also, any other spiral curve having an
analogy to the parabola. Parabolic conoidParabolic Par`a*bol"ic, Parabolical Par`a*bol"ic*al, a. [Gr.
paraboliko`s figurative: cf. F. parabolique. See Parable.]
1. Of the nature of a parable; expressed by a parable or
figure; allegorical; as, parabolical instruction.
2. [From Parabola.] (Geom.)
(a) Having the form or nature of a parabola; pertaining
to, or resembling, a parabola; as, a parabolic curve.
(b) Generated by the revolution of a parabola, or by a
line that moves on a parabola as a directing curve;
as, a parabolic conoid.
Parabolic conoid, a paraboloid; a conoid whose directing
curve is a parabola. See Conoid.
Parabolic mirror (Opt.), a mirror having a paraboloidal
surface which gives for parallel rays (as those from very
distant objects) images free from aberration. It is used
in reflecting telescopes.
Parabolic spindle, the solid generated by revolving the
portion of a parabola cut off by a line drawn at right
angles to the axis of the curve, about that line as an
axis.
Parabolic spiral, a spiral curve conceived to be formed by
the periphery of a semiparabola when its axis is wrapped
about a circle; also, any other spiral curve having an
analogy to the parabola. Parabolic mirrorParabolic Par`a*bol"ic, Parabolical Par`a*bol"ic*al, a. [Gr.
paraboliko`s figurative: cf. F. parabolique. See Parable.]
1. Of the nature of a parable; expressed by a parable or
figure; allegorical; as, parabolical instruction.
2. [From Parabola.] (Geom.)
(a) Having the form or nature of a parabola; pertaining
to, or resembling, a parabola; as, a parabolic curve.
(b) Generated by the revolution of a parabola, or by a
line that moves on a parabola as a directing curve;
as, a parabolic conoid.
Parabolic conoid, a paraboloid; a conoid whose directing
curve is a parabola. See Conoid.
Parabolic mirror (Opt.), a mirror having a paraboloidal
surface which gives for parallel rays (as those from very
distant objects) images free from aberration. It is used
in reflecting telescopes.
Parabolic spindle, the solid generated by revolving the
portion of a parabola cut off by a line drawn at right
angles to the axis of the curve, about that line as an
axis.
Parabolic spiral, a spiral curve conceived to be formed by
the periphery of a semiparabola when its axis is wrapped
about a circle; also, any other spiral curve having an
analogy to the parabola. Parabolic spindleParabolic Par`a*bol"ic, Parabolical Par`a*bol"ic*al, a. [Gr.
paraboliko`s figurative: cf. F. parabolique. See Parable.]
1. Of the nature of a parable; expressed by a parable or
figure; allegorical; as, parabolical instruction.
2. [From Parabola.] (Geom.)
(a) Having the form or nature of a parabola; pertaining
to, or resembling, a parabola; as, a parabolic curve.
(b) Generated by the revolution of a parabola, or by a
line that moves on a parabola as a directing curve;
as, a parabolic conoid.
Parabolic conoid, a paraboloid; a conoid whose directing
curve is a parabola. See Conoid.
Parabolic mirror (Opt.), a mirror having a paraboloidal
surface which gives for parallel rays (as those from very
distant objects) images free from aberration. It is used
in reflecting telescopes.
Parabolic spindle, the solid generated by revolving the
portion of a parabola cut off by a line drawn at right
angles to the axis of the curve, about that line as an
axis.
Parabolic spiral, a spiral curve conceived to be formed by
the periphery of a semiparabola when its axis is wrapped
about a circle; also, any other spiral curve having an
analogy to the parabola. Parabolic spiralParabolic Par`a*bol"ic, Parabolical Par`a*bol"ic*al, a. [Gr.
paraboliko`s figurative: cf. F. parabolique. See Parable.]
1. Of the nature of a parable; expressed by a parable or
figure; allegorical; as, parabolical instruction.
2. [From Parabola.] (Geom.)
(a) Having the form or nature of a parabola; pertaining
to, or resembling, a parabola; as, a parabolic curve.
(b) Generated by the revolution of a parabola, or by a
line that moves on a parabola as a directing curve;
as, a parabolic conoid.
Parabolic conoid, a paraboloid; a conoid whose directing
curve is a parabola. See Conoid.
Parabolic mirror (Opt.), a mirror having a paraboloidal
surface which gives for parallel rays (as those from very
distant objects) images free from aberration. It is used
in reflecting telescopes.
Parabolic spindle, the solid generated by revolving the
portion of a parabola cut off by a line drawn at right
angles to the axis of the curve, about that line as an
axis.
Parabolic spiral, a spiral curve conceived to be formed by
the periphery of a semiparabola when its axis is wrapped
about a circle; also, any other spiral curve having an
analogy to the parabola. ParabolicalParabolic Par`a*bol"ic, Parabolical Par`a*bol"ic*al, a. [Gr.
paraboliko`s figurative: cf. F. parabolique. See Parable.]
1. Of the nature of a parable; expressed by a parable or
figure; allegorical; as, parabolical instruction.
2. [From Parabola.] (Geom.)
(a) Having the form or nature of a parabola; pertaining
to, or resembling, a parabola; as, a parabolic curve.
(b) Generated by the revolution of a parabola, or by a
line that moves on a parabola as a directing curve;
as, a parabolic conoid.
Parabolic conoid, a paraboloid; a conoid whose directing
curve is a parabola. See Conoid.
Parabolic mirror (Opt.), a mirror having a paraboloidal
surface which gives for parallel rays (as those from very
distant objects) images free from aberration. It is used
in reflecting telescopes.
Parabolic spindle, the solid generated by revolving the
portion of a parabola cut off by a line drawn at right
angles to the axis of the curve, about that line as an
axis.
Parabolic spiral, a spiral curve conceived to be formed by
the periphery of a semiparabola when its axis is wrapped
about a circle; also, any other spiral curve having an
analogy to the parabola. Parabolically
Parabolically Par`a*bol"ic*al*ly
(p[a^]r`[.a]*b[o^]l"[i^]*kal*l[y^]), adv.
1. By way of parable; in a parabolic manner.
2. In the form of a parabola.
Meaning of Parab from wikipedia
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