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Problem-solving technique in geometry
Mass point geometry, colloquially known as mass points, is a problem-solving technique in geometry which applies the physical principle of the center of
Mass_point_geometry
Fundamental object of geometry
In geometry, a point is an abstract idealization of an exact position, without size, in physical space, or its generalization to other kinds of mathematical
Point_(geometry)
Topics referred to by the same term
Mass point may refer to: Mass point geometry Point mass in physics The values of a probability mass function in probability and statistics This disambiguation
Mass_point
Unique point where the weighted relative position of the distributed mass sums to zero
the center of mass of a distribution of mass in space (sometimes referred to as the barycenter or balance point) is the unique point at any given time
Center_of_mass
Line intersecting both a vertex and opposite edge of a triangle
In geometry, a cevian is a line segment which joins a vertex of a triangle to a point on the opposite side of the triangle. Medians, symmedians, angle
Cevian
Branch of differential geometry
Riemannian geometry is the branch of differential geometry that studies Riemannian manifolds. An example of a Riemannian manifold is a surface, on which
Riemannian_geometry
geometry, a centre (Commonwealth English) or center (American English) (from Ancient Greek κέντρον (kéntron) 'pointy object') of an object is a point
Centre_(geometry)
Mean position of all the points in a shape
-dimensional Euclidean space. In geometry, one often assumes uniform mass density, in which case the barycenter or center of mass coincides with the centroid
Centroid
Center of mass of multiple bodies orbiting each other
Time Centers of gravity in non-uniform fields Center of mass Lagrange point Mass point geometry Roll center Weight distribution "barycentre". Oxford English
Barycenter_(astronomy)
Geometric relation between a triangle's side lengths and cevian length
in Europe[clarification needed] given by Lazare Carnot in 1803. Mass point geometry Stewart, Matthew (1746), Some General Theorems of Considerable Use
Stewart's_theorem
Coordinate system that is defined by points instead of vectors
In geometry, a barycentric coordinate system is a coordinate system in which the location of a point is specified by reference to a simplex (a triangle
Barycentric_coordinate_system
Branch of mathematics
Differential geometry is a mathematical discipline that studies the geometry of smooth shapes and smooth spaces, otherwise known as smooth manifolds.
Differential_geometry
Set of data points in three-dimensional space
density 3D point clouds Point Cloud Library (PCL) – comprehensive BSD open source library for n-D point clouds and 3D geometry processing Point Set Processing
Point_cloud
Mathematical theory of the geometry of space and time
frame. Objects move along geodesics—curved paths determined by the local geometry of spacetime—rather than being influenced directly by distant bodies. This
Curved_spacetime
Center of mass of a triangle's perimeter
In geometry, the Spieker center is a special point associated with a plane triangle. It is defined as the center of mass of the perimeter of the triangle
Spieker_center
Albert Einstein's hypothetical situations to argue scientific points
existence of antimatter). Einstein's relativistic center-of-mass theorem of 1906 is a case in point. In 1900, Henri Poincaré had noted a paradox in modern
Einstein's thought experiments
Einstein's_thought_experiments
Unique point and line of a conic section
In geometry, a pole and polar are respectively a point and a line that have a unique reciprocal relationship with respect to a given conic section. Polar
Pole_and_polar
Exact solution for the Einstein field equations
The Kerr metric or Kerr geometry describes the geometry of empty spacetime around a rotating uncharged axially symmetric black hole with a quasispherical
Kerr_metric
Index of articles associated with the same name
In geometry, Max Dehn introduced two examples of planes, a semi-Euclidean geometry and a non-Legendrian geometry, that have infinitely many lines parallel
Dehn_plane
Vector representing the position of a point with respect to a fixed origin
In geometry, a position or position vector, also known as location vector or radius vector, is a Euclidean vector that represents a point P in space. Its
Position_(geometry)
This is a glossary of some terms used in Riemannian geometry and metric geometry — it doesn't cover the terminology of differential topology. The following
Glossary of Riemannian and metric geometry
Glossary_of_Riemannian_and_metric_geometry
Research topic in computational geometry
Geometry processing is an area of research that uses concepts from applied mathematics, computer science and engineering to design efficient algorithms
Geometry_processing
Property of points all lying on a single line
Look up collinearity or collinear in Wiktionary, the free dictionary. In geometry, collinearity of a set of points is the property of their lying on a single
Collinearity
Compact astronomical body
gravitation as the curvature of spacetime, predicts that any sufficiently compact mass will form a black hole. The boundary of no escape is called the event horizon
Black_hole
Shape with three sides
polygon with three corners and three sides, one of the basic shapes in geometry. The corners, also called vertices, are zero-dimensional points while the
Triangle
Classical statement of gravity as force
in trajectories determined by the geometry of spacetime. This allowed a description of the motions of light and mass that was consistent with all available
Newton's law of universal gravitation
Newton's_law_of_universal_gravitation
Scalar measure of the rotational inertia with respect to a fixed axis of rotation
the moment of inertia of the pendulum depends on both the mass m of a body and its geometry, or shape, as defined by the distance r to the axis of rotation
Moment_of_inertia
Infinitely detailed mathematical structure
in the Menger sponge, the shape is called affine self-similar. Fractal geometry relates to the mathematical branch of measure theory by their Hausdorff
Fractal
Physical quantities taking values at each point in space and time
with mass M is associated with a gravitational field g which describes its influence on other bodies with mass. The gravitational field of M at a point r
Field_(physics)
Collection of key measurements that define a particular bike configuration
Bicycle and motorcycle geometry is the collection of key measurements (lengths and angles) that define a particular bike configuration. Primary among these
Bicycle and motorcycle geometry
Bicycle_and_motorcycle_geometry
Geometric formula for finding the ratio in which a line segment is divided by a point
In coordinate geometry, the Section formula is a formula used to find the ratio in which a line segment is divided by a point internally or externally
Section_formula
Point at infinity in hyperbolic geometry
geometry, an ideal point, omega point or point at infinity is a well-defined point outside the hyperbolic plane or space. Given a line l and a point P
Ideal_point
Set of points equidistant from a center
solid geometry, a sphere is the set of points that are all at the same distance r from a given point in three-dimensional space. That given point is the
Sphere
Chinese-American mathematician (born 1949)
differential equations, to the Calabi conjecture in algebraic geometry, to the positive mass conjecture of general relativity theory, and to real and complex
Shing-Tung_Yau
Open-source parametric aircraft geometry tool
OpenVSP (also Open Vehicle Sketch Pad) is an open-source parametric aircraft geometry tool originally developed by NASA. It can be used to create 3D models of
OpenVSP
Extended physical object in string theory
mirror symmetry and noncommutative geometry. The word "brane" originated in 1987 as a contraction of "membrane". A point particle is a 0-brane, of dimension
Brane
Geometric space with four dimensions
ordinary space is called Euclidean space because it corresponds to Euclid's geometry, which was originally abstracted from the spatial experiences of everyday
Four-dimensional_space
Usage of mass spectrometry to measure remaining isotopes
Isotope-ratio mass spectrometry (IRMS) is a specialization of mass spectrometry, in which mass spectrometric methods are used to measure the relative abundance
Isotope-ratio mass spectrometry
Isotope-ratio_mass_spectrometry
Theorem in topology
geometry. It appears in unlikely fields such as game theory. In economics, Brouwer's fixed-point theorem and its extension, the Kakutani fixed-point theorem
Brouwer_fixed-point_theorem
Theory of gravitation as curved spacetime
prediction of general relativity for the almost flat spacetime geometry around stationary mass distributions. Some predictions of general relativity, however
General_relativity
Set of mathematical concepts in quantum gravity
In quantum gravity, quantum geometry is the set of mathematical concepts that generalize geometry to describe physical phenomena at distance scales comparable
Quantum_geometry
Set of principles for modeling solid geometry
"understand" the true geometry comprising complex shapes, many attributes of/for a 3‑D solid, such as its center of gravity, volume, and mass, can be quickly
Solid_modeling
Obsolete American military rifle cartridge
Comparison of .30-01, .30-03, and .30-06 geometry
.30-03_Springfield
Geometric shape
In geometry, a cone is a three-dimensional figure that tapers smoothly from a flat base (typically a circle) to a point not contained in the base, called
Cone
Mathematical model combining space and time
of the 20th century, the assumption had been that the three-dimensional geometry of the universe (its description in terms of locations, shapes, distances
Spacetime
American mathematician (born 1950)
1950) is an American mathematician known for his work in differential geometry and geometric analysis. He is best known for the resolution of the Yamabe
Richard_Schoen
Vector relating the initial and the final positions of a moving point
In geometry and mechanics, a displacement is a vector whose length is the shortest distance from the initial to the final position of a point P undergoing
Displacement_(geometry)
This is a glossary of arithmetic and diophantine geometry in mathematics, areas growing out of the traditional study of Diophantine equations to encompass
Glossary of arithmetic and diophantine geometry
Glossary_of_arithmetic_and_diophantine_geometry
Physics concept expressed as E = mc²
In physics, mass–energy equivalence is the relationship between mass and energy in a system's rest frame. The two differ only by a multiplicative constant
Mass–energy_equivalence
Directions of north, south, east and west
directions Cultural synesthesia Direction (geometry) Elevation – the mapping information ignored by the cardinal point system Geocaching – an international
Cardinal_direction
Geometric point from which certain types of curves are constructed
In geometry, focuses or foci (/ˈfoʊsaɪ/ or /ˈfoʊkaɪ/; sing.: focus) are special points with reference to which any of a variety of curves is constructed
Focus_(geometry)
by its mass. Differentiable manifold Christoffel symbols Riemannian geometry Ricci calculus Differential geometry List of differential geometry topics
Introduction to the mathematics of general relativity
Introduction_to_the_mathematics_of_general_relativity
Mathematical set with some added structure
via primitive notions (such as "point", "between", "congruent") constrained by a number of axioms. Analytic geometry made great progress and succeeded
Space_(mathematics)
Theorem about triangles
geometry, Ceva's theorem is a theorem about triangles. Given a triangle △ABC, let the lines AO, BO, CO be drawn from the vertices to a common point O
Ceva's_theorem
Branch of physics which studies the behavior of materials modeled as continuous media
every point in it. Body forces are represented by a body force density b ( x , t ) {\displaystyle \mathbf {b} (\mathbf {x} ,t)} (per unit of mass), which
Continuum_mechanics
Equilibrium points near two orbiting bodies
Lagrangian points or libration points, are points of equilibrium for small-mass objects under the gravitational influence of two massive orbiting bodies
Lagrange_point
Curve from a cone intersecting a plane
geometry, and may at each point be either positive – elliptic geometry, zero – Euclidean geometry (flat, parabola), or negative – hyperbolic geometry;
Conic_section
Seven mathematical problems with a US$1 million prize for each solution
problems span a number of mathematical fields, namely algebraic geometry, arithmetic geometry, geometric topology, mathematical physics, number theory, partial
Millennium_Prize_Problems
Coordinate system used in projective geometry
system of coordinates used in projective geometry, just as Cartesian coordinates are used in Euclidean geometry. They have the advantage that the coordinates
Homogeneous_coordinates
Chemical compound
Molar mass 231.78 g·mol−1 Appearance violet solid Density 1.51 g/cm3 Melting point decomposes Solubility soluble in NH3 Structure Coordination geometry octahedral
Hexaamminenickel_chloride
Topics referred to by the same term
as the ratio of mass per unit volume. Density may also refer to: Area density or surface density, mass over an area Bulk density, mass of a particulate
Density_(disambiguation)
Chemical compound
HO[−B(BOH)2O3O−]nH The crystal structure is monoclinic. This form has a higher melting point (201 °C) and density (2.045 g/cm3) It is obtained by heating the trimeric
Metaboric_acid
Ionic compound made of a C2H5–O anion and a sodium cation
C2H5NaO Molar mass 68.051 g·mol−1 Appearance White hygroscopic powder Density 0.868 g/cm3 (of a 21 wt% solution in ethanol) Melting point 260 °C (500 °F;
Sodium_ethoxide
Type of center of a polygon
In geometry, the circumcenter of mass is a center associated with a polygon which shares many of the properties of the center of mass. More generally,
Circumcenter_of_mass
Point of reference against which some others are calculated
an object, such as a point, line, plane, hole, set of holes, or pair of surfaces. It serves as a reference in defining the geometry of the object and (often)
Datum_reference
coincides with the Geroch energy, a quasi-local mass defined purely in terms of the Riemannian geometry of the hypersurface. In this sense, the Geroch
Hawking_energy
Units defined only by physical constants
lengths of around 10−35 m (approximately the energy-equivalent of the Planck mass, the Planck time and the Planck length, respectively). At the Planck scale
Planck_units
Chemical compound
C8H6S2 Molar mass 166.26 g·mol−1 Appearance Colorless crystals Density 1.44 g/cm3 Melting point 31.1 °C (88.0 °F; 304.2 K) Boiling point 260 °C (500 °F;
2,2'-Bithiophene
Computer approximation for real numbers
such tests are unnecessary. For example, in computational geometry, exact tests of whether a point lies off or on a line or plane defined by other points
Floating-point_arithmetic
Angular momentum in special and general relativity
antisymmetric tensor. For rotating mass–energy distributions (such as gyroscopes, planets, stars, and black holes) instead of point-like particles, the angular
Relativistic_angular_momentum
Theory of gravity by Albert Einstein
a particular geometry of spacetime; for example, the Schwarzschild solution describes the geometry around a spherical, non-rotating mass such as a star
Introduction to general relativity
Introduction_to_general_relativity
Line segment joining a triangle's vertex to the midpoint of the opposite side
In geometry, a median of a triangle is a line segment joining a vertex to the midpoint of the opposite side, thus bisecting that side. Every triangle has
Median_(geometry)
Algebraic object with geometric applications
especially in differential geometry and physics, it is natural to consider a tensor with components that are functions of the point in a space. This was the
Tensor
Formulation of classical mechanics using momenta
phenomena. Hamiltonian mechanics has a close relationship with geometry (notably, symplectic geometry and Poisson structures) and serves as a link between classical
Hamiltonian_mechanics
Chemical compound
Chemical formula C8H5KO4 Molar mass 204.222 g·mol−1 Appearance White or colorless solid Density 1.636 g/cm3 Melting point ~295 °C (decomposes) Solubility
Potassium_hydrogen_phthalate
Topics referred to by the same term
may refer to: 10 gram, or 0.01 kilogram, a unit of mass, in SI referred to as a dag Decagram (geometry), geometric figure This disambiguation page lists
Decagram
Gravitational singularity of a rotating black hole
0-dimensional single point. This is not the case with a rotating black hole (a Kerr black hole). With a fluid rotating body, its distribution of mass is not spherical
Ring_singularity
Conserved physical quantity; rotational analogue of linear momentum
from the axis at which the entire mass m {\displaystyle m} may be considered as concentrated. Similarly, for a point mass m {\displaystyle m} the moment
Angular_momentum
Wellesley, Mass: A.K. Peters. ISBN 978-1-56881-220-5. OCLC 181862605. Conway, John; Smith, Derek A. (2003). On quaternions and octonions: their geometry, arithmetic
List of spherical symmetry groups
List_of_spherical_symmetry_groups
Measure of curvature in differential geometry
of Riemannian geometry, the scalar curvature (or the Ricci scalar) is a measure of the curvature of a Riemannian manifold. To each point on a Riemannian
Scalar_curvature
Point in vehicle dynamics
is "The point in the transverse vertical plane through any pair of wheel centers at which lateral forces may be applied to the sprung mass without producing
Roll_center
Manifold with Riemannian, complex and symplectic structure
In mathematics and especially differential geometry, a Kähler manifold is a manifold with three mutually compatible structures: a complex structure, a
Kähler_manifold
Chemical compound
Molar mass 232.40 g·mol−1 Appearance Colorless solid Density 2.19 ± 0.1 g/cm3 Melting point 246 to 247 °C (475 to 477 °F; 519 to 520 K) Boiling point decomposes
Trichloroisocyanuric_acid
Condition in which spacetime itself breaks down
disappearing event horizons can also be seen with the Reissner–Nordström geometry of a charged black hole if the charge ( Q {\displaystyle Q} ) is high enough
Gravitational_singularity
Framework of distances and directions
framework. In the 19th and 20th centuries mathematicians began to examine geometries that are non-Euclidean, in which space is conceived as curved, rather
Space
Mathematical construct in engineering
infinitesimal elements of mass, dm, in a three-dimensional space occupied by an object Q. The MOI, in this sense, is the analog of mass for rotational problems
Second_moment_of_area
Smallest amount of fissile material needed to sustain a nuclear reaction
Then, criticality occurs when ν·q = 1. The dependence of this upon geometry, mass, and density appears through the factor q. Given a total interaction
Critical_mass
Particular mapping that projects a sphere onto a plane
the stereographic plane is an alternative setting for spherical analytic geometry instead of spherical polar coordinates or three-dimensional cartesian coordinates
Stereographic_projection
Taiwanese mathematician
Conference on Differential Geometry". Zhejiang University. Retrieved 31 January 2015. Yau, Shing-Tung (2011). "Quasi-Local Mass in General Relativity" (PDF)
Mu-Tao_Wang
Solution of Einstein field equations
relativity that describes the spacetime geometry in the region surrounding an electrically charged, rotating mass embedded in an expanding universe. It
Kerr–Newman–de–Sitter_metric
Movement of an object which leaves at least one point unchanged
motion of the distant stars to the local inertial frame Orientation (geometry) Point reflection Rolling – motion of two objects in contact with each-other
Rotation
Moment of inertia of diff geometric shapes
analogue to mass (which determines an object's resistance to linear acceleration). The moments of inertia of a mass have units of dimension ML2 ([mass] × [length]2)
List_of_moments_of_inertia
Type of triangle center
In triangle geometry, the Steiner point is a particular point associated with a triangle. It is a triangle center and it is designated as the center X(99)
Steiner_point_(triangle)
Tensor in differential geometry
In differential geometry, the Ricci curvature tensor, named after Gregorio Ricci-Curbastro, measures how a curved space locally differs from flat space
Ricci_curvature
Voronoi tessellation where the generating point of each Voronoi cell is also its centroid
in a square In geometry, a centroidal Voronoi tessellation (CVT) is a special type of Voronoi tessellation in which the generating point of each Voronoi
Centroidal Voronoi tessellation
Centroidal_Voronoi_tessellation
Chemical compound
naphthalene moiety resides which can only be reoriented in the liquid phase. The geometry of the Laurdan molecule is as follows: the Dreiding energy, which is the
Laurdan
Facet of general relativity
and mass associated with the gravitational field. In an asymptotically flat spacetime, one may consider spacelike hypersurfaces whose induced geometry is
Mass_in_general_relativity
Topics referred to by the same term
alimentary canal of a ruminant animal The honeycomb conjecture, in geometry Honeycomb (geometry), a space-filling tessellation Honeycomb lattice, a two-dimensional
Honeycomb_(disambiguation)
Theorem in projective geometry
In projective geometry, Desargues's theorem, named after Girard Desargues, states: Two triangles are in perspective axially if and only if they are in
Desargues's_theorem
French mathematician, physicist and engineer (1854–1912)
introducing automorphic forms. He also made important contributions to algebraic geometry, number theory, complex analysis and Lie theory. He famously introduced
Henri_Poincaré
MASS POINT-GEOMETRY
MASS POINT-GEOMETRY
Male
English
 English surname transferred to forename use, derived from medieval Jewish Moss (2), MOSS means "drawn out." Compare with another form of Moss.
Surname or Lastname
English (of Norman origin)
English (of Norman origin) : from the medieval personal name Ponc(h)e, Pons (see Ponce).English (of Norman origin) : habitational name from Ponts in La Manche and Seine-Maritime, Normandy, from Latin pontes ‘bridges’ (see Pont).English (of Norman origin) : nickname for a fop or dandy, from points ‘laces for hose’ (see Pointer 1).
Male
Italian
Short form of Italian Tommaso, MASO means "twin."
Male
Hebrew
(מַשָׂ×) Hebrew name MASSA means "burden." In the bible, this is the name of a son of Ishmael.
Surname or Lastname
English
English : from a pet form of the medieval personal name Pascal, which was brought to England from France.German : topographic name from Pass ‘pass’, ‘passage’ (from Middle Low German pas ‘pace’, ‘passage way’, ‘water gauge’).Jewish (Ashkenazic) : metonymic occupational name or nickname from Yiddish and Polish pas ‘belt’, ‘girdle’.
Surname or Lastname
English
English : from the medieval female personal name Cass, a short form of Cassandra. This was the name (of uncertain, possibly non-Greek, origin) of an ill-fated Trojan prophetess of classical legend, condemned to foretell the future but never be believed; her story was well known and widely popular in medieval England.
Boy/Male
Arabic, Muslim, Pashtun
Gul - Flowers; Mast - Excitement
Female
English
English short form of Latin Cassandra, CASS means "she who entangles men."Â
Male
Swedish
Norwegian and Swedish form of Greek Mattathias, MATS means "gift of God."
Surname or Lastname
English
English : variant of Mace 1.French (Picardy) : metonymic occupational name from masse ‘mace’, ‘hammer’.French : habitational name from places called Masse (Allier and Cô-d’Or), or La Masse (Eure, Lot, Puy-de-Dôme, Saône-et-Loire).French (Massé) : habitational name from a place called Massé in Maine-et-Loire, so named from Gallo-Roman Macciacum (from the personal name Maccius + the locative suffix -acum).Dutch : from Middle Dutch masse ‘clog’; ‘cudgel’, perhaps a metonymic occupational name for someone who wielded a club.Dutch : possibly a variant of Maas 1, or a patronymic from Mas.
Surname or Lastname
English
English : variant of Marsh.French : habitational name from places so named in Ardèche, Ardennes, Gard, Loire, Nièvre, and Meurthe-et-Moselle, from the Latin personal name Marcius, used adjectivally.French : from the personal name Meard, Mard, Mart, vernacular forms of the saint’s name Médard. Morlet notes that there are a number of places called Saint-Mars, formerly recorded in Latin as Sanctus Medardus.French : from the name of the month, mars ‘ March’, denoting seed sown in March, and hence a metonymic name for an arable grower.French (De Mars) : habitational name from Mars in the Ardennes.Dutch : from a short form of the personal name Marsilius.
Surname or Lastname
English, Scottish, French, and Catalan
English, Scottish, French, and Catalan : topographic name for
someone who lived near a bridge, Middle English, Old French, Catalan
pont (Latin pons, genitive pontis).Catalan : habitational name from any of the numerous places named
with Pont.Dutch : variant of
Pond 2.A Pont from the Lorraine region of France is documented in Quebec City in
1640; Pont appears to be a secondary surname to
Female
Japanese
(1-æ£, 2-é›…, 3-昌, 4-真, 5-政, 6-å°†) Unisex short form of Japanese names beginning with Masa-, MASA means 1) "correct, just," 2) "elegant," 3) "flourishing, prosperous" 4) "genuine, true," 5) "governing, political," 6) "military." Compare with strictly masculine Masa.
Surname or Lastname
English
English : from Old French bas(se) ‘low’, ‘short’ (Latin bassus ‘thickset’; see Basso), either a descriptive nickname for a short person or a status name meaning ‘of humble origin’, not necessarily with derogatory connotations.English : in some instances, from Middle English bace ‘bass’ (the fish), hence a nickname for a person supposedly resembling this fish, or a metonymic occupational name for a fish seller or fisherman.Scottish : habitational name from a place in Aberdeenshire, of uncertain origin.Jewish (Ashkenazic) : metonymic occupational name for a maker or player of bass viols, from Polish, Ukrainian, and Yiddish bas ‘bass viol’.German : see Basse.
Male
Hebrew
 Medieval Jewish form of Hebrew Moshe, MOSS means "drawn out." Compare with another form of Moss.
Boy/Male
Shakespearean
King Henry IV, Part 1 and 2' Edward Poins, an irregular humorist.
Male
Hebrew
(מַשָׂ×) Variant spelling of Hebrew Massa, MASA means "burden." Compare with another form of Masa.
Surname or Lastname
English
English : status name denoting a serf, Middle English, Old French vass(e), from Late Latin vassus, of Celtic origin. Compare Welsh gwas ‘boy’, Gaelic foss ‘servant’.English : variant of Vause.Swedish : variant of Wass.South German : variant of Fass.Hungarian : from vas ‘iron’, hence a metonymic occupational name for a blacksmith, or a nickname for a resilient, tough man.
Surname or Lastname
English and French
English and French : probably an altered form of French Pons, a habitational name from places so named in Bourgogne and Franche-Comté.
Male
Japanese
(1-æ£, 2-é›…, 3-昌, 4-真, 5-政, 6-å°†) Unisex short form of Japanese names beginning with Masa-, MASA means 1) "correct, just," 2) "elegant, splendid" 3) "flourishing, prosperous" 4) "genuine, true," 5) "governing, political," 6) "military." Compare with another form of Masa.
MASS POINT-GEOMETRY
MASS POINT-GEOMETRY
Girl/Female
Indian
Time
Boy/Male
Gaelic Irish
An ancient given name adopted as an Irish clan name. Surname.
Boy/Male
Hindu
Killer of demon Madhu
Boy/Male
Tamil
Kamlakar | கமலாகர Â
Brightness
Girl/Female
American, Australian, British, Chinese, Christian, English, French, Greek, Latin
From Normandy; France; Lacy; Lace-like; Cheerful; Form of Larissa; Name of a City; Mythical Woman
Girl/Female
French, Gujarati, Indian, Kannada
Tranquil
Girl/Female
Indian
Sweet Beautiful
Girl/Female
Arabic, Muslim
Kind; Merciful
Girl/Female
Indian
Fragrant
Boy/Male
Arabic, Muslim
Brightest
MASS POINT-GEOMETRY
MASS POINT-GEOMETRY
MASS POINT-GEOMETRY
MASS POINT-GEOMETRY
MASS POINT-GEOMETRY
superl.
Compacted into, or consisting of, a mass; having bulk and weight ot substance; ponderous; bulky and heavy; weight; heavy; as, a massy shield; a massy rock.
n.
To give a point to; to sharpen; to cut, forge, grind, or file to an acute end; as, to point a dart, or a pencil. Used also figuratively; as, to point a moral.
n.
A mass; a heap.
a.
Alt. of Point-devise
n.
A movement executed with the saber or foil; as, tierce point.
adv.
Alt. of Point-devise
n.
A state of confusion or disorder; -- prob. variant of mess, but influenced by muss, a scramble.
pl.
of Bass
n.
A short piece of cordage used in reefing sails. See Reef point, under Reef.
n.
Species of Serranus, the sea bass and rock bass. See Sea bass.
v. t.
To furnish with a mast or masts; to put the masts of in position; as, to mast a ship.
v. i.
To celebrate Mass.
n.
One of the points of the compass (see Points of the compass, below); also, the difference between two points of the compass; as, to fall off a point.
n.
To mark (as Hebrew) with vowel points.
v. t.
To collect into a mass or heap; to gather a great quantity of; to accumulate; as, to amass a treasure or a fortune; to amass words or phrases.
n.
A medicinal substance made into a cohesive, homogeneous lump, of consistency suitable for making pills; as, blue mass.
n.
To supply with punctuation marks; to punctuate; as, to point a composition.
v. t.
To fail of hitting, reaching, getting, finding, seeing, hearing, etc.; as, to miss the mark one shoots at; to miss the train by being late; to miss opportunites of getting knowledge; to miss the point or meaning of something said.
n.
Mass; church service.
n.
Lace wrought the needle; as, point de Venise; Brussels point. See Point lace, below.