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CaraboidCaraboid Car"a*boid, a. [Carabus + -oid.] (Zo["o]l.)
Like, or pertaining to the genus Carabus. 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. Farabout
Farabout Far"*a*bout`, n.
A going out of the way; a digression. [Obs.] --Fuller.
Marabou
Marabou Mar`a*bou", n.
A kind of thrown raw silk, nearly white naturally, but
capable of being dyed without scouring; also, a thin fabric
made from it, as for scarfs, which resembles the feathers of
the marabou in delicacy, -- whence the name.
MarabouMarabou Mar`a*bou", n. [F.]
1. (Zo["o]l.) A large stork of the genus Leptoptilos
(formerly Ciconia), esp. the African species (L.
crumenifer), which furnishes plumes worn as ornaments.
The Asiatic species (L. dubius, or L. argala) is the
adjutant. See Adjutant. [Written also marabu.]
2. One having five eighths negro blood; the offspring of a
mulatto and a griffe. [Louisiana] --Bartlett. MaraboutMarabout Marabout", n. [F., from Pg. marabuto, Ar. mor[=a]bit.
Cf. Maravedi.]
A Mohammedan saint; especially, one who claims to work cures
supernaturally. 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.
Paraboliform
Paraboliform Par`a*bol"i*form (-[i^]*f[^o]rm), a. [Parabola +
-form.]
Resembling a parabola in form.
Parabolist
Parabolist Pa*rab"o*list (-l[i^]st), n.
A narrator of parables.
Paraboloid
Paraboloid Pa*rab"o*loid (-loid), n. [Parabola + -oid: cf. F.
parabolo["i]de.] (Geom.)
The solid generated by the rotation of a parabola about its
axis; any surface of the second order whose sections by
planes parallel to a given line are parabolas.
Note: The term paraboloid has sometimes been applied also to
the parabolas of the higher orders. --Hutton.
paraboloidConoid Co"noid, n. [Gr. ? conical; ? cone + ? from: cf. F.
cono["i]de.]
1. Anything that has a form resembling that of a cone.
2. (Geom.)
(a) A solid formed by the revolution of a conic section
about its axis; as, a parabolic conoid, elliptic
conoid, etc.; -- more commonly called paraboloid,
ellipsoid, etc.
(b) A surface which may be generated by a straight line
moving in such a manner as always to meet a given
straight line and a given curve, and continue parallel
to a given plane. --Math. Dict. Paraboloidal
Paraboloidal Par`a*bo*loid"al, a.
Of, pertaining to, or resembling, a paraboloid.
ScaraboidScaraboid Scar"a*boid, a. [Scarab + -oid.] (Zo["o]l.)
Of or pertaining to the family Scarab[ae]id[ae], an
extensive group which includes the Egyptian scarab, the
tumbledung, and many similar lamellicorn beetles. Scaraboid
Scaraboid Scar"a*boid, n. (Zo["o]l.)
A scaraboid beetle.
Semicubical parabolaSemicubical Sem`i*cu"bic*al, a. (Math.)
Of or pertaining to the square root of the cube of a
quantity.
Semicubical parabola, a curve in which the ordinates are
proportional to the square roots of the cubes of the
abscissas. semicubical 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. Semiparabola
Semiparabola Sem`i*pa*rab"o*la, n. (Geom.)
One branch of a parabola, being terminated at the principal
vertex of the curve.
Meaning of Arabo from wikipedia
-
Jacob Arabo (born
Yakov Arabov; June 3, 1965) is an
American jewelry,
watch designer, who
founded Jacob &
Company in 1986 and grew it to
become an international...
-
Arabo or
Arapo (Armenian: Արաբօ, 1863–1895), born
Arakel Mkhitarian, was an
Armenian fedayi of the late 19th century. He was a
member of the Armenian...
- The
Arabo-Friesian (Dutch:
Arabo Friese Paard) is a
recent breed of horse,
selected over
several generations since the 1960s to
obtain the
morphology of...
-
jewelry and wris****ch
retailer founded in 1986 by
diamond designer Jacob Arabo. Its
flagship boutique and
corporate headquarters are
located in Manhattan...
- Mark Paul
Arabo (born
February 17, 1983) is a ****yrian-American businessman, San
Diego community leader, and
global humanitarian. He is a
human rights...
- The
Arabic script is the
writing system used for
Arabic (Arabic alphabet) and
several other languages of Asia and Africa. It is the second-most widely...
- This
article contains Persian text.
Without proper rendering support, you may see
question marks, boxes, or
other symbols. The
Persian alphabet (Persian:...
- Los
Arabos is a muni****lity and town in the
Matanzas Province of Cuba. It is
located in the
eastern part of the province,
bordering the
province of Villa...
- Vat. Ar.
abbreviates Vaticani arabi, a
collection within the
Vatican Library.
Notable works within this
collection include the following: Vat. Ar. 5, Psalter...
- The
Arabo Volunteer Detachment (Armenian: «Արաբո» կամավորական ջոկատ) or
Arabo Battalion was a
paramilitary Armenian volunteer unit
during the
First Nagorno-Karabakh...