「Geometry」の共起表現一覧(1語右で並び替え)
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In eight-dimensional | geometry, a truncated 8-demicube is a uniform 8-polyto |
In | geometry, a snub dodecahedral prism is a convex unifor |
In six-dimensional | geometry, a pentellated 6-orthoplex is a convex unifor |
In eight-dimensional | geometry, a rectified 8-orthoplex is a convex uniform |
In | geometry, a kisrhombille is a uniform tiling of rhombi |
In | geometry, a demienneract or 9-demicube is a uniform 9- |
In six-dimensional | geometry, a rectified 6-orthoplex is a convex uniform |
In six-dimensional | geometry, a truncated 6-simplex is a convex uniform 6- |
In five-dimensional | geometry, a stericated 5-cube is a convex uniform 5-po |
In | geometry, a uniform star polyhedron is a self-intersec |
In | geometry, a uniform coloring is a property of a unifor |
In graph theory and computational | geometry, a Steiner point is an extra vertex that is n |
In | geometry, a decagon is any polygon with ten sides and |
In abstract | geometry, a hemi-cube is an abstract regular polyhedro |
In six-dimensional | geometry, a truncated 6-demicube is a uniform 6-polyto |
In | geometry, a director circle is a circle consisting of |
In | geometry, a 6-orthoplex, or 6-cross polytope, is a reg |
In | geometry, a face of a polyhedron is any of the polygon |
In | geometry, a 9-simplex is a self-dual regular 9-polytop |
In six-dimensional | geometry, a truncated 5-orthoplex is a convex uniform |
In eight-dimensional | geometry, a hepetellated 8-simplex is a convex uniform |
In | geometry, a heptagon (or septagon) is a polygon with s |
In | geometry, a demiocteract or 8-demicube is a uniform 8- |
In | geometry, a pentagonal icositetrahedron is a Catalan s |
In | geometry, a polytope (a polyhedron or a polychoron for |
In | geometry, a pyramid is a polyhedron formed by connecti |
In | geometry, a square antiprismatic prism is a convex uni |
In seven-dimensional | geometry, a truncated 7-cube is a convex uniform 7-pol |
In | geometry, a complex polygon is a polygon in the comple |
In | geometry, a set of points in space is coplanar if all |
In | geometry, a right conoid is a ruled surface generated |
In Euclidean | geometry a digon is always degenerate. |
In | geometry, a tetrakis hexahedron is a Catalan solid. |
In six-dimensional | geometry, a truncated 6-cube is a convex uniform 6-pol |
Using | geometry, a slant intersection with this shell model c |
In | geometry, a compound of three tetrahedra can be constr |
In | geometry, a disdyakis dodecahedron, or hexakis octahed |
In | geometry, a Schlegel diagram is a projection of a poly |
In noncommutative | geometry, a Fredholm module is a mathematical structur |
In | geometry, a surface of constant width is a convex form |
In seven-dimensional | geometry, a cantellated 7-simplex is a convex uniform |
In | geometry a kite, or deltoid, is a quadrilateral with t |
However, in spherical | geometry a nondegenerate digon (with a nonzero interio |
In six-dimensional | geometry, a cantellated 6-demicube is a convex uniform |
In spherical | geometry, a lune is an area on a sphere bounded by two |
Traditionally, in two-dimensional | geometry, a rhomboid is a parallelogram in which adjac |
In | geometry, a hypercell is a descriptive term for an ele |
In | geometry, a square pyramid is a pyramid having a squar |
In | geometry, a deltoidal icositetrahedron (also a trapezo |
In ten-dimensional | geometry, a rectified 10-orthoplex is an 10-polytope, |
In | geometry, a dihedral or torsion angle is the angle bet |
In seven-dimensional | geometry, a rectified 7-cube is a convex uniform 7-pol |
In | geometry, a flexible polyhedron is a polyhedral surfac |
In | geometry, a 10-cube is a ten-dimensional hypercube. |
In nine-dimensional | geometry, a rectified 9-simplex is a convex uniform 9- |
In six-dimensional | geometry, a runcinated 6-simplex is a convex uniform 6 |
In | geometry, a 10-simplex is a self-dual regular 10-polyt |
In | geometry, a focaloid is a shell bounded by two concent |
In | geometry, a decahedron is a polyhedron with 10 faces. |
In | geometry, a 6-simplex is a self-dual regular 6-polytop |
In eight-dimensional | geometry, a rectified 8-cube is a convex uniform 8-pol |
In | geometry, a median of a triangle is a line segment joi |
In eight-dimensional | geometry, a truncated 8-orthoplex is a convex uniform |
In nine-dimensional | geometry, a rectified 9-cube is a convex uniform 9-pol |
, with Joe Harris, of Principles of Algebraic | Geometry, a well-regarded textbook on complex algebrai |
In five-dimensional | geometry, a rectified 5-orthoplex is a convex uniform |
In six-dimensional | geometry, a stericated 6-simplex is a convex uniform 6 |
In | geometry, a demidekeract or 10-demicube is a uniform 1 |
In give-dimensional | geometry, a rectified 5-cube is a convex uniform 5-pol |
In | geometry, a ridge is an (n − 2)-dimensional element of |
In seven-dimensional | geometry, a rectified 7-simplex is a convex uniform 7- |
In | geometry, a deltoidal hexecontahedron (also sometimes |
In | geometry, a 6-demicube or demihexteract is a uniform 6 |
In | geometry, a pentahedron (plural: pentahedra) is a poly |
In | geometry, a vertex (plural vertices) is a special kind |
In | geometry, a rectified 120-cell is a uniform polychoron |
In five-dimensional | geometry, a truncated 5-simplex is a convex uniform 5- |
In | geometry, a dodecahedral prism is a convex uniform pol |
In | geometry, a decagonal bipyramid is one of the infinite |
In nine-dimensional | geometry, a polyyotton (or 9-polytope) is a polytope c |
In | geometry, a rhombicuboctahedral prism is a convex unif |
In seven-dimensional | geometry, a truncated 7-simplex is a convex uniform 7- |
In | geometry, a 10-orthoplex or 10-cross polytope, is a re |
In | geometry, a uniform tessellation is a vertex-transitiv |
In | geometry, a rod is a three-dimensional, solid (filled) |
In five-dimensional | geometry, a bicantellated 5-cube is a uniform 5-polyto |
In | geometry, a pentadecagon (or pentakaidecagon) is any 1 |
In seven-dimensional | geometry, a hexicated 7-simplex is a convex uniform 7- |
In | geometry, a triangular prism is a three-sided prism; i |
In | geometry, a truncated tetrahedral prism is a convex un |
In classical | geometry, a radius of a circle or sphere is any line s |
In 4-dimensional | geometry, a polyhedral pyramid is a 4-polytope constru |
In | geometry, a lens is a convex shape comprising two circ |
In | geometry, a truncated cuboctahedral prism is a convex |
In eight-dimensional | geometry, a runcinated 8-simplex is a convex uniform 8 |
In 4-dimensional | geometry, a truncated octahedral prism is a convex uni |
In five-dimensional | geometry, a 5-orthoplex, or 5-cross polytope, is a fiv |
In | geometry, a truncated icosahedral prism is a convex un |
In six-dimensional | geometry, a runcinated 6-orthplex is a convex uniform |
In six-dimensional | geometry, a cantellated 6-orthoplex is a convex unifor |
In | geometry, a tridecagon (or triskaidecagon) is a polygo |
In six-dimensional | geometry, a cantellated 5-cube is a convex uniform 5-p |
In six-dimensional | geometry, a rectified 6-simplex is a convex uniform 6- |
In 7-dimensional | geometry, a 7-simplex is a self-dual regular 7-polytop |
In six-dimensional | geometry, a cantellated 5-demicube is a convex uniform |
ding to the linear molecule, to influence its | geometry, a metal "template" can accelerate either the |
In eight-dimensional | geometry, a rectified 8-simplex is a convex uniform 8- |
In | geometry, a cuboctahedral prism is a convex uniform po |
In mathematics and | geometry, a space group is a symmetry group, usually f |
In six-dimensional | geometry, a 'cantellated 5-orthoplex is a convex unifo |
In | geometry, a Steiner point is any of several interestin |
In mathematics, specifically projective | geometry, a complete quadrangle is a system of geometr |
In six-dimensional | geometry, a runcinated 6-cube is a convex uniform 6-po |
In six-dimensional | geometry, a 6-polytope is a polytope, bounded by 5-pol |
In | geometry, a truncated dodecahedral prism is a convex u |
In | geometry, a peak is an (n-3)-face of an n-dimensional |
In | geometry a henagon (or monogon) is a polygon with one |
In solid | geometry, a wedge is a polyhedron defined by two trian |
In five dimensional | geometry, a demipenteract or 5-demicube is a semiregul |
In | geometry, a pentagonal pyramid is a pyramid with a pen |
In | geometry, a spidron is a continuous flat geometric fig |
In | geometry, a cuboctahedron is a polyhedron with eight t |
In | geometry, a demihepteract or 7-demicube is a uniform 7 |
In | geometry, a scalenohedron is a polyhedron containing t |
In | geometry, a truncated cubic prism is a convex uniform |
In | geometry, a tetradecagon (or tetrakaidecagon) is a pol |
In | geometry, a cleaver of a triangle is a line segment th |
mming language and coauthored the book Turtle | Geometry about Logo. |
edicted by VSEPR theory, it adopts a T-shaped | geometry about the central iodine atom. |
nerolidol, cis and trans, which differ in the | geometry about the central double bond. |
ion, interrelation between quantum fields and | geometry, Aharonov-Bohm and Casimir effects, q-deforma |
logy; Chemistry; Physics; Integrated Algebra; | Geometry; Algebra 2/Trigonometry; and Pre-Calc. |
History, World History (2 years), Government, | Geometry, Algebra II, Pre-Calculus, Calculus, Biology, |
s History, Biology, Chemistry and/or Physics, | Geometry, Algebra II and Trigonometry, and also meet v |
The Mathematics Department offers courses in | geometry, algebra, trigonometry, precalculus and calcu |
ts span the areas of gauge theory, symplectic | geometry, algebraic topology, and low-dimensional topo |
m Field Theory, Stochastic Calculus, Spectral | Geometry, Algebraic Number Theory, Biostatistics and A |
has also published two books on computational | geometry: Algorithms in Combinatorial Geometry (Spring |
Geometry algorithms based on Java Topology Suite | |
For planar ordered | geometry, all points are in one plane. |
esign, rail cross section and wear, and track | geometry all had a role in the derailment. |
Many problems in computational | geometry allow for algorithms with better computationa |
The bow's | geometry allowed it to be made relatively small so it |
Note that the | geometry almost decomposes into a Cartesian product of |
The | geometry also created unfavorably severe crash angles. |
Taxicab | geometry, also known as City block distance or Manhatt |
In | geometry, an icosidodecahedral prism is a convex unifo |
In | geometry, an 8-cube is an eight-dimensional hypercube |
In | geometry, an edge is a one-dimensional line segment jo |
In | geometry, an apeirogonal prism or infinite prism is th |
In | geometry, an E6 honeycomb (or 222 honeycomb) is a tess |
In | geometry, an 8-orthoplex, or 8-cross polytope is a reg |
In | geometry, an omnitruncated polyhedron is a truncated q |
In | geometry, an 8-simplex is a self-dual regular 8-polyto |
In | geometry, an enneagram is a nine-pointed geometric fig |
In | geometry, an octagram is an eight-sided star polygon. |
In | geometry, an axis-aligned object (axis-parallel, axis- |
In | geometry, an enneadecagon is a polygon with 19 sides a |
authored over 200 papers, mostly in discrete | geometry, an area in which he is particularly well kno |
In | geometry, an orthocentric system is a set of four poin |
In | geometry, an equilateral polygon is a polygon which ha |
In | geometry, an anthropomorphic polygon is a simple polyg |
In | geometry, an equichordal point is a point defined rela |
In | geometry, an apex is the vertex which is in some sense |
In | geometry an Archimedean solid is a highly symmetric, s |
than that which is directly incident upon its | geometry, analogous to a radio antenna's ability to ab |
Geometry analysis - check for improbable bond lengths, | |
parts such as wheel size, spoke count, frame | geometry, and even weight and material of components. |
Bucharest, where he was appointed Head of the | Geometry and Topology department in 1948. |
Ward co-wrote Twistor | geometry and field theory with Raymond O. Wells Jr |
n the needs of commutative algebra, algebraic | geometry, and singularity theory. |
sistency of the melt process in terms of pool | geometry, and melt rate is pivotal in ensuring the bes |
ightness in a simple expanding universe (flat | geometry and uniform expansion over the range of redsh |
to treat problems related both with algebraic | geometry and integrable systems. |
wanting to learn how ray tracing and related | geometry and graphics algorithms work. |
In computational | geometry and robot motion planning, a visibility graph |
esults in combination with considerations for | geometry and Monte Carlo estimations led researchers t |
He worked initially in the area of birational | geometry and Mori theory. |
who made important contributions to algebraic | geometry and invariant theory. |
Continuum), edited by John Emery Murdoch in ' | Geometry and the Continuum in the Fourteenth Century: |
nd branch, he or she would be taught writing, | geometry, and rhetoric. |
auliche Geometrie, translated into English as | Geometry and the Imagination. |
learned, in particular in the "new" algebraic | geometry and Artin/Noether approach to abstract algebr |
India, where it stimulated the development of | geometry and mathematics. |
ch interests included projective differential | geometry and topology. |
The single curved | geometry and pressure differential causes a longitudin |
The intimate relation between | geometry and physics may be highlighted here, as the v |
instruments to make measurements of the track | geometry and other features such as overhead line heig |
each year, one in astronomy, and the other in | geometry, and spend at least six weeks making astronom |
Souvaine's research is in computational | geometry and its applications, including robust non-pa |
A Practical Handbook of | Geometry and Design (1952) |
School courses taken in algebra, | geometry and shop are helpful. |
Janos Bolyai, non-Euclidean | Geometry and the Nature of Space |
mbieri's research in number theory, algebraic | geometry, and mathematical analysis have earned him ma |
insights already, but work in Noncommutative | geometry and other fields also holds promise for our u |
Kleiman is known for his work in algebraic | geometry and commutative algebra. |
not been isolated experimentally yet, but the | geometry and electronic configuration of its molecule |
ral carbon atoms have an inverted tetrahedral | geometry, and the length of the central bond is 160 pm |
He is inspired by the horizon, | geometry and the tension between light and darkness - |
CASIO has released two official add-ins, | GEOMETRY and PHYSIUM. |
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