「Geometry」の共起表現一覧(2語左で並び替え)
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e OH groups, and one Cl atom in a tetrahedral | geometry [Zn(OH)3Cl]. |
Versions of a tropical | geometry, of an absolute geometry over a field with on |
a coordination number of 4 with a tetrahedral | geometry. |
Whitehead's theory is said to feature a prior | geometry. |
ai Lobachevsky first presents a non-Euclidean | geometry. |
lled pi* orbital, back bonding prefers a bent | geometry for the heme-NO complex. |
A supersonic airfoil is a cross-section | geometry designed to generate lift efficiently at supe |
ground state proceeds through a pyramidalized | geometry. |
edicted by VSEPR theory, it adopts a T-shaped | geometry about the central iodine atom. |
he ability of iodine(III) to adopt a T-shaped | geometry without multiple bonds. |
protein are determined by solving a distance | geometry problem. |
onding in the protein has in fact a distorted | geometry that is neither planar nor tetrahedral, with |
orm a six-dimensional space with a particular | geometry too small to be observable. |
s the slave capable of learning a complicated | geometry problem. |
em to help with emissions and also a variable | geometry turbocharger system to help with the performa |
Most existing arrays use a planar | geometry instead, and Labeyrie's hypertelescope will u |
For this reason, the metric of a warped | geometry is often called a warped product metric. |
It is also the title of a journal | Geometry & Topology that covers these topics. |
A track | geometry car work car at Jay Street - Borough Hall. |
E(r) - both a local | geometry parameter, and the energy per unit mass of th |
In addition, a disc | geometry would account for the varying thickness of th |
In a finite | geometry of higher dimension, X could be the set of po |
ity - a transformation that exchanges a large | geometry of one theory with the strong coupling of ano |
or surveyor to survey or capture a building's | geometry in real time or while on site by translating |
A Complicated | Geometry |
It utilizes a variable | geometry turbocharger and intercooler, producing 325 h |
discovery of the Fano plane, a non-Euclidean | geometry in which the diagonal points of a complete qu |
air of coordinate systems for a Schwarzschild | geometry which are adapted to radial null geodesics (i |
Dehn gave an example of a non-Legendrian | geometry where the and sum of a triangle is greater th |
This article is about cutting | geometry. |
tomation comprise information about topology, | geometry, kinematics and logic, where logic comprises |
ng in vacuum, we do not get to know about the | geometry of the surface of the body. |
sh, Art, Music, Speech, Advanced Mathematics, | Geometry, Bible, History, Government, Economics, Biolo |
ent can include transformations to affect the | geometry inside the subroutine. |
allenging elementary results from algebra and | geometry that are useful in competitions at the high s |
The mathematics classes focus on algebra and | geometry. |
credits of mathematics (including algebra and | geometry), three credits of science, three credits of |
ing and research in the fields of algebra and | geometry. |
st to propose the idea of uniting algebra and | geometry into a single subject and invented an algebra |
mathematics, specifically linear algebra and | geometry, relative dimension is the dual notion to cod |
, Concepts of Problem Solving, Algebra I-III, | Geometry, Calculus, Trigonometry, Biology, Physical Sc |
is was ground-breaking given that algebra and | geometry were considered completely separate branches |
ms are administered in Algebra I, Algebra II, | Geometry, and Biology. |
Algebra / | Geometry |
Algebra and | Geometry provide high school credit. |
n the needs of commutative algebra, algebraic | geometry, and singularity theory. |
h students can take Pre-Algebra, Algebra, and | Geometry. |
ddle school include pre-algebra, algebra, and | geometry. |
] of one who, having already practiced all of | geometry most diligently [...] and having studied Ptol |
Furthermore, electron lenses allows the | geometry of the diffraction experiment to be varied. |
r the theoretical neuromorphology, along with | geometry for metrical parameters, are the set theory, |
hich axle (front/rear) is lifted and also the | geometry (i.e. |
Also, the | geometry of these rolls is determined by specific tole |
alls were massively thick, and although their | geometry was complicated, with some picking about, a c |
The compound has an octahedral | geometry with C4v symmetry. |
An important | geometry related to that of the sphere is that of the |
W(CO)6 adopts an octahedral | geometry consisting of six rod-like CO ligands radiati |
ium is octa-coordinated, which is an uncommon | geometry for this metal. |
the application of the Algebraic Analysis to | Geometry (1831) |
ynamical systems, numerical analysis, fractal | geometry, chaos theory, computer graphics, image proce |
re areas of Algebra, Analysis, Noncommutative | geometry, Ergodic theory, Mathematical logic, Number t |
at the interface between analysis, topology, | geometry, and physics. |
es (1994, about Benoit Mandelbrod and Fractal | Geometry), Les Prairies de la Mer (1995, about Jacques |
thematics, such as trigonometry and spherical | geometry. |
of Mechanisms and Motion (1949) and Kinematic | Geometry of Mechanisms (1978). |
rain size of the metal being stressed and the | geometry of the material, with flatter specimens showi |
face of analytic number theory and arithmetic | geometry concerning the number and distribution of rat |
ace of analytic number theory and Diophantine | geometry. |
for his work on number theory and diophantine | geometry. |
He studies mainly number theory and algebraic | geometry with an arithmetic flavor. |
ese calculators have backlit displays and the | Geometry (in user mem) and ECON2 apps preinstalled. |
work at the chair of Analytic and Projective | Geometry. |
f equiconsistency of hyperbolic and Euclidean | geometry for any dimension. |
wanting to learn how ray tracing and related | geometry and graphics algorithms work. |
ng contributions to analysis and differential | geometry, some of them enabling the later development |
In graph theory and computational | geometry, a Steiner point is an extra vertex that is n |
of polyhedral combinatorics and computational | geometry. |
partial differential equations and Riemannian | geometry, in particular contributions to the theory of |
of research involve moduli spaces and complex | geometry. |
He worked in number theory and on | geometry, particularly polyhedra, where Miller's monst |
geometrics, terrain, micrometeorology and the | geometry of area structures. |
h is independent of the applied loads and the | geometry of the body. |
heory of operator algebras and noncommutative | geometry. |
rtial differential equations and differential | geometry. |
using the theory of finite fields and finite | geometry to solve problems in design. |
Fano worked on projective and algebraic | geometry; the Fano plane, Fano fibration, Fano surface |
ultiple feature classes per file and multiple | geometry properties per feature class. |
d course in commutative algebra and algebraic | geometry. |
Data Structure, Algorithms and Computational | geometry. |
f specialisation are algebraic and symplectic | geometry. |
i theory, intersection theory and enumerative | geometry. |
He was working in differential and algebraic | geometry. |
options include Pre-Algebra, Algebra 1 and 2, | Geometry, Pre-Calculus, Calculus and College Algebra. |
stood, into Schubert calculus and enumerative | geometry, the former is well-founded on the basis of t |
such as randomness and entropy, and teaching | geometry to children. |
r divided by specific application and special | geometry. |
on algorithms for integer programming and the | geometry of numbers, random walks in n-space, randomiz |
not only deeply versed in ancient and modern | geometry, but also had a full knowledge of the analyti |
race, densely packed fields of cars, and the | geometry of the track, vehicles tend to crash out very |
metries: Euclidean, elliptical and hyperbolic | geometry. |
in II, French II, Spanish IV, and Descriptive | Geometry. |
cation at Tiverton, Rhode Island, and studied | geometry and applied mathematics on his own. |
ds of proof are quite different and algebraic | geometry includes also geometry in finite characterist |
our signal from the off-air recording and the | geometry from the film recording, were included as a b |
d of Algorithmica, Discrete and Computational | Geometry, as well as Computational Geometry: Theory an |
tionably the inventors of plane and spherical | geometry, which did not, strictly speaking, exist amon |
In statistics and computational | geometry, the notion of centerpoint is a generalizatio |
of number theory, combinatorics and discrete | geometry, including graph theory. |
ntary texts such as Trigonometry and Analytic | Geometry. |
e arithmetic of elliptic curves and algebraic | geometry. |
the weak derivatives of the function and the | geometry of the domain, and can be used to show that c |
disciplines, including optics and projective | geometry. |
esign, rail cross section and wear, and track | geometry all had a role in the derailment. |
problems in commutative algebra and algebraic | geometry. |
to the development of algebra and analytical | geometry (died 1703). |
are much smaller than a cutting tool, and the | geometry and orientation of individual grains are not |
Practical Algebra (1908, 1910) and Analytical | Geometry and Curve Tracing (1907; revised edition, 191 |
Handbook of Discrete and Computational | Geometry, with Jacob E. Goodman (2004) ISBN 9781584883 |
ction using bounds on its derivatives and the | geometry of its domain of definition. |
Algebraic and Complex | geometry |
In the study of ellipses and related | geometry, various parameters in the distortion of a ci |
served) characteristics of the pair and their | geometry with respect to Earth (as Earth is looking al |
incidence matrix in combinatorics and finite | geometry has ones to indicate incidence between points |
Department courses include Algebra I and II, | Geometry, Trigonometry, Calculus, and Basic Math. |
are called symplectic topology and symplectic | geometry. |
ds of advanced complex analysis and algebraic | geometry and it is 72 pages long. |
h is primarily in number theory and algebraic | geometry, but he has occasionally published in other s |
alizes in representation theory and algebraic | geometry. |
te a calculus textbook, Calculus and Analytic | Geometry with Applications (Prindle, Weber & Schmidt, |
s History, Biology, Chemistry and/or Physics, | Geometry, Algebra II and Trigonometry, and also meet v |
When one line crosses another in | geometry, it is said to cut that line. |
Applications of | geometry processing algorithms already cover a wide ra |
e was a champion of the classical approach to | geometry, in a period when the tendency was to approac |
to the areas of diophantine approximation and | geometry of numbers. |
opology as homotopy theory, but some areas of | geometry and topology (such as surgery theory, particu |
, Containing the Principles of Arithmetic and | Geometry Demonstrated in a Short and Easie Method ... |
nclude number theory and arithmetic algebraic | geometry, particularly zeta functions over finite fiel |
Greek and sciences, including arithmetic and | geometry. |
an computational techniques in arithmetic and | geometry, including the Moscow Papyrus, the most impor |
ian who specialises in arithmetical algebraic | geometry. |
geometria (Book of Algebra in Arithmetics and | Geometry), (1567). |
ontrolled by a number of factors, such as the | geometry of the ligand chelate ring, ring metal Jahn-T |
ith local and visiting artists such as Sacred | Geometry. |
School in Niesky, Germany, most probably as a | geometry lesson or project. |
us areas of mathematical analysis such as the | geometry of Banach spaces, harmonic analysis, analytic |
sification of the Artes Mechanicae as applied | geometry was introduced to Western Europe by Gundissal |
-intensive and error-prone assembly; flexible | geometry, both for the GEM and the readout pads; and s |
Such a background is associated with | geometry that solves Einstein's equations (with higher |
uneiform characters of astonishingly rigorous | geometry. |
or the foundation of a chair of astronomy and | geometry. |
The Lowndean chair of Astronomy and | Geometry is one of the two major Professorships in Ast |
r than both, of the subjects of astronomy and | geometry. |
He was Lowndean Professor of Astronomy and | Geometry from 1990 to 1999. |
veys into the level of skill in astronomy and | geometry existed in neolithic Britain. |
in Algebra, Arithmetic, Astronomy, Calculus, | Geometry, Infinite Series and Linguistics. |
Evolver was written at The | Geometry Center, sponsored by the National Science Fou |
idal field and enforces an axisymmetric field | geometry. |
For barycenters in | geometry, see centroid. |
cam acquired Salt Lake City based Engineering | Geometry Systems. |
as well as design of novel materials based on | geometry principles. |
ildren, teaching lessons on basic arithmetic, | geometry, and drawing through a series of interactive |
of Rho is marked by a balance between strict | geometry, similar to the "cold" abstractism of Russian |
This relationship between local | geometry and coupling constant is of great value throu |
s, ANSA maintains the association between CAD | geometry and the FE mesh. |
l structure, see Trigonal bipyramid molecular | geometry. |
oranes adopt a trigonal bipyramidal molecular | geometry with the two apical bonds longer than the thr |
compound has a trigonal bipyramidal molecular | geometry and, in solution, exists as a mixture of two |
Bistatic range | geometry |
sed distance to describe falling bodies using | geometry, which had been used and trusted since Euclid |
Janos Bolyai, non-Euclidean | Geometry and the Nature of Space |
mming language and coauthored the book Turtle | Geometry about Logo. |
She is co-author of the book Submanifold | Geometry and Critical Point Theory and an editor of th |
The first book discussed | geometry in brief, and gnomonics at great length. |
ei Li and Yves Le Jan he wrote the books "The | Geometry of Filtering" and "On the Geometry of Diffusi |
eplacement requires specification of both the | geometry (location of the dipoles) and the dipole pola |
ed during the third century BC as a branch of | geometry used extensively for astronomical studies. |
The bridge's challenging | geometry was executed by T. L. Eyre, a Philadelphia co |
More broadly, in | geometry or design, the term can be assigned in an abs |
not been isolated experimentally yet, but the | geometry and electronic configuration of its molecule |
les possible, and the complicated but elegant | geometry of the DNA double helix that permits the `enc |
ructures such as towers where the hyperboloid | geometry's structural strength is used to support an o |
the γ-ray interaction than is possible by the | geometry of the segments. |
ticles move in trajectories determined by the | geometry of spacetime. |
Influenced by Euclidean | geometry, his larger works are created from aluminum o |
and cis,cis-muconic acid which differ by the | geometry around the double bonds. |
rystal structure is 0.541 nm, calculated from | geometry and ionic radii of 0.074 nm (zinc) and 0.184 |
owing great skill as a calculator, publishing | Geometry Improved and logarithmic tables. |
ifferential and Integral Calculus, Analytical | Geometry and Trigonometry, Spherical Trigonometry, Ana |
m Field Theory, Stochastic Calculus, Spectral | Geometry, Algebraic Number Theory, Biostatistics and A |
aces, or complex manifolds, is called complex | geometry. |
CASTEP permits | geometry optimisation and finite temperature molecular |
ncurrency theory, interaction categories, and | geometry of interaction. |
ons Foundation to found the Simons Center for | Geometry and Physics at Stony Brook, the largest gift |
He held the Savilian Chair of | Geometry at the University of Oxford from 1797 to 1809 |
He held the Savilian Chair of | Geometry at the University of Oxford from 1970 to 1995 |
om 1995 to 1996 he held the Savilian Chair of | Geometry at Oxford University and Fellow of New Colleg |
mathematician: he held the Savilian Chair of | Geometry at the University of Oxford in 1765. |
He held the Savilian Chair of | Geometry at the University of Oxford from 1631 to 1649 |
from 1794 to 1810, held the Savilian Chair of | Geometry at the University of Oxford from 1810 to 1827 |
mathematician: He held the Savilian Chair of | Geometry at the University of Oxford from 1766 to 1797 |
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