「mathematics」の共起表現一覧(1語右で並び替え)
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| In | mathematics, a complex line is a one-dimensional affine |
| In | mathematics, a semigroup with no elements (the empty se |
| In | mathematics, a Hamiltonian system is a system of differ |
| In | mathematics, a binary relation R over a set X is transi |
| In | mathematics, a partial order ≤ on a set X is said to be |
| In | mathematics, a Q-indescribable cardinal is a certain ki |
| In | mathematics, a setoid (also called an E-set) is a set ( |
| In | mathematics, a dual wavelet is the dual to a wavelet. |
| In | mathematics, a half iterate (sometimes called a functio |
| In | mathematics, a multiplicative cascade is a fractal/mult |
| In | mathematics, a Legendrian knot often refers to a smooth |
| In graph-theoretic | mathematics, a star coloring of a graph G is a (proper) |
| In | mathematics, a holyhedron is a type of 3-dimensional ge |
| In | mathematics, a binary relation R over a set X is symmet |
| heory and combinatorics, both fields within | mathematics, a matching polynomial (sometimes called an |
| In | mathematics, a de Branges space (sometimes written De B |
| In | mathematics, a Lipschitz domain (or domain with Lipschi |
| In | mathematics, a dome is a closed geometrical surface whi |
| In graph theory, a branch of combinatorial | mathematics, a block graph is a type of undirected grap |
| In | mathematics, a unit square is a square whose sides have |
| In | mathematics, a unique sink orientation is an orientatio |
| , five years later as Lucasian Professor of | Mathematics, a chair he held until 1979, when he was su |
| In | mathematics, a remarkable cardinal is a certain kind of |
| In | mathematics, a measure-preserving dynamical system is a |
| In | mathematics, a generalized map is a topological model w |
| In | mathematics, a colored matroid is a matroid whose eleme |
| In physics and | mathematics, a sequence of n numbers can be understood |
| In | mathematics, a coreflexive relation is a binary relatio |
| In set theory, a branch of | mathematics, a Reinhardt cardinal is a large cardinal κ |
| In | mathematics, a norm form is a homogeneous form in n var |
| In recreational | mathematics, a polydrafter is a polyform with a triangl |
| In | mathematics, a cyclic order is a way to arrange a set o |
| Sketch ( | mathematics), a generalization of algebraic theory. |
| In | mathematics, a congruent number is a positive integer t |
| In | mathematics, a harmonious set is a subset of a locally |
| In recreational | mathematics, a polystick (or polyedge) is a polyform wi |
| In order theory, a branch of | mathematics, a linear extension of a partial order is a |
| In | mathematics, a P-multimagic cube is a magic cube that r |
| In | mathematics, a residuated Boolean algebra is a residuat |
| The Center for Women in | Mathematics, a part of the Smith College Department of |
| In | mathematics, a convex body in n-dimensional Euclidean s |
| In | mathematics, a singleton is a set with exactly one elem |
| In | mathematics, a toroid is a doughnut-shaped object, such |
| In | mathematics, a cardinal λ < Θ is a Suslin cardinal if t |
| In | mathematics, a tolerance relation is a relation that is |
| In | mathematics, a contraction mapping, or contraction, on |
| In | mathematics, a null set is a set that is negligible in |
| In | mathematics, a weighted Voronoi diagram in n dimensions |
| e but could not deal with the five hours of | mathematics a day, and after three years transferred to |
| unding an institute for graduate studies in | mathematics, a task which he carried out very successfu |
| In physics and | mathematics, a pseudotensor is usually a quantity that |
| This includes French, | mathematics, a foreign language, humanistic and scienti |
| In combinatorics and order-theoretic | mathematics, a multitree may describe either of two equ |
| In | mathematics, a fractal sequence is one that contains it |
| In | mathematics, a complex reflection group is a group acti |
| In | mathematics, a distance-regular graph is a regular grap |
| In | mathematics, a Benz plane is a type of 2-dimensional ge |
| In | mathematics, a spectral space is a topological space wh |
| In recreational | mathematics, a polyhex is a polyform with a regular hex |
| In | mathematics, a tetramagic square is a magic square that |
| In | mathematics, a semiperfect magic cube is a magic cube t |
| . Henrion "Helen Abbot Merrill" in Women of | Mathematics: A Bibliographic Sourcebook L. Grinstein, P |
| ppointed 'Vice-President of the Tribunal of | Mathematics', a very important and influential post in |
| In | mathematics, a universal graph is an infinite graph tha |
| In | mathematics, a rotation map is a function that represen |
| In | mathematics, a period doubling bifurcation in a discret |
| In | mathematics, a cyclic polytope, denoted C(n,d), is a co |
| In | mathematics, a preordered class is a class equipped wit |
| Extreme point in | mathematics, a point in a convex set which does not lie |
| In | mathematics, a transitive reduction of a binary relatio |
| Concrete | Mathematics: A Foundation For Computer Science by Ronal |
| In | mathematics, a Frink ideal, introduced by Orrin Frink, |
| In | mathematics, a binary relation R on a set X is Euclidea |
| In | mathematics, a vertex cycle cover (commonly called simp |
| In | mathematics, a binary relation R on a set X is antisymm |
| In geometric graph theory, a branch of | mathematics, a polyhedral graph is the undirected graph |
| In graph theory, a branch of | mathematics, a crown graph on 2n vertices is an undirec |
| In | mathematics, a Markov information source, or simply, a |
| In graph theory, a branch of | mathematics, a periodic graph with respect to an operat |
| In | mathematics, a Dirac spectrum, named after Paul Dirac, |
| In 1957 he was appointed Reader in Pure | Mathematics, a post which he held until 1969. |
| In | mathematics, a convex regular 4-polytope) is a 4-dimens |
| In | mathematics, a recurrent point for function f is a poin |
| In | mathematics, a P-multimagic square (also known as a sat |
| In | mathematics, a Perron number is an algebraic integer α |
| In bifurcation theory, a field within | mathematics, a transcritical bifurcation is a particula |
| In | mathematics, a dependence relation is a binary relation |
| In Morse theory, a branch of | mathematics, a Reeb graph of a scalar function describe |
| In | mathematics, a Smarandache-Wellin number is an integer |
| ted to become Professor in Pure and Applied | Mathematics, a post he held from 1918 to 1946. |
| In combinatorial | mathematics, a symmetric design is a block design with |
| In graph theory, a branch of | mathematics, a clique-sum is a way of combining two gra |
| In | mathematics, a Suslin tree is a tree of height ω1 such |
| 1767 and returned in 1773 as a Professor of | Mathematics, a position he held until his death in 1782 |
| In | mathematics, a uniform tree is a locally finite tree wh |
| In | mathematics, a quadric, or quadric surface, is any D-di |
| In | mathematics, a partially ordered set in order theory is |
| In | mathematics, a domino is a polyomino of order 2, that i |
| on in the world to have achieved grade A at | Mathematics A-level, scoring 100% & 99% in 2 of the 6 p |
| advice of his older colleague Professor of | Mathematics A.V. Vasiliev at Kazan University (father o |
| In | mathematics, Abel's inequality, named after Niels Henri |
| ential analysis - reasoning using language, | mathematics, abstraction and reasoning. |
| Science and | Mathematics Academy |
| ake's satiric treatment of the sciences and | mathematics; according to Obtuse Angle, "Voltaire under |
| illiam Jewell College, studying physics and | mathematics, achieving a B.A., summa cum laude, in 1982 |
| grams in rural areas periodically to spread | mathematics across all layers of society. |
| ord and Microsoft OneNote, called Microsoft | Mathematics Add-In for Word and OneNote, is also availa |
| were added to the examination system, with | mathematics added in 1104. |
| g, Ping (2008), An Introduction to Discrete | Mathematics, Addison-Wesley, ISBN 9780321166647 . |
| in a number of first languages, additional | mathematics, additional combined science and many other |
| taught at RCPS include Physics, Chemistry, | Mathematics, Additional Mathematics, Biology, Computer |
| derwent recent new textbook adoptions, with | Mathematics adopting new textbooks in the 2011-2012 sch |
| In | mathematics affine geometry is the study of geometric p |
| He became interested in | mathematics after reading Martin Gardner's mathematical |
| "Teaching | Mathematics Again" |
| geography, morality, criticism, philosophy, | mathematics, agriculture, architecture, chemistry, nove |
| In | mathematics al-Samarqandi is famous for a short work of |
| Fields Prize in | Mathematics: Alain Connes, William Thurston and Shing-T |
| An international conference "Discrete | Mathematics, Algebra, and their Applications", sponsore |
| The | mathematics allowing such a physical possibility has be |
| formation Technology, Business Management & | Mathematics, along with the technical knowledge. |
| x, and first class BSc honours in Logic and | Mathematics, also from the University of Sussex. |
| ebrew, and after settling in London took up | mathematics also. |
| rench, and 43rd in Engineering, and failing | mathematics altogether. |
| tion of America in 1993, and the Faculty of | Mathematics Alumni Achievement Medal by the University |
| He received a bachelor's degree in | mathematics, American history, and physics education fr |
| Note, that in | mathematics, an Alexandrov topology on a partial order |
| In | mathematics, an unfoldable cardinal is a certain kind o |
| In | mathematics, an element p of a partial order (P, ≤) is |
| In abstract algebra, a branch of | mathematics, an Archimedean group is an algebraic struc |
| 1996 and 2011, Proof in | Mathematics: An Introduction ISBN 978-1-8761-9200-6, or |
| In | mathematics, an ordered semigroup is a semigroup (S,•) |
| In | mathematics, an infinite-period bifurcation is a global |
| In set theory, a branch of | mathematics, an additively indecomposable ordinal α is |
| ical proof in physics, where Pereyra denied | mathematics an essential status. |
| under of the Institute for Pure and Applied | Mathematics, an NSF-funded institute at UCLA. |
| and H. A. Newman, as well as debates - 'Is | Mathematics an end in itself?' - and mathematical films |
| In | mathematics, an IP set is a set of natural numbers whic |
| In | mathematics, an identity element (or neutral element) i |
| In | mathematics, an annulus (the Latin word for "little rin |
| In | mathematics, an extreme point of a convex set S in a re |
| In | mathematics, an open sentence (usually an equation or e |
| In | mathematics, an edge cycle cover (sometimes called simp |
| In | mathematics, an associahedron or Stasheff polytope Kn i |
| cts that play a role in various branches of | mathematics analogous to the role that [0,1] plays in h |
| a compilation and commentary on astronomy, | mathematics, anatomy, psychology, philosophy, and Islam |
| ught mainly in form groups, with setting in | Mathematics and French. |
| He saw Niels Henrik's talent in | mathematics, and so encouraged him to study the subject |
| or successful researchers, (in the field of | mathematics and the natural sciences), and the "Nansen |
| rs a theoretical education, particularly in | mathematics and physics, which were making quick progre |
| tools of research and calculations based on | mathematics and physics. |
| o awarded the Max Planck Research Award for | Mathematics and Computer science in 2000. |
| Low test scores in both | mathematics and science captured the attention of educa |
| ience (approx 50 students) and the M.Sc. in | Mathematics and the Foundations of Computer Science (ap |
| 907 he became the head of the department of | mathematics and mechanics. |
| e graduated with both a Bachelor of Arts in | Mathematics and a Bachelor of Science in Computer Scien |
| s has added another building to accommodate | mathematics and the sciences. |
| She took leave to study | mathematics and atomic physics at the Swiss Technical U |
| the time, Clarke was well versed in higher | mathematics and aware of its importance to electrical e |
| His great skill in | mathematics and astrology earned him the credit of bein |
| Wos is a mathematician, a researcher in the | Mathematics and Computer Science Division of Argonne Na |
| ics, including immigration, China, history, | mathematics, and race. |
| MIT in economics in 1969 and both his M.A. ( | mathematics) and Ph.D. (economics) from the University |
| In | mathematics and theoretical physics, braid statistics i |
| rsity of Aberdeen, where the first prize in | mathematics and physical and moral sciences fell to him |
| NECCC does exceedingly well in the field of | Mathematics and Chemistry. |
| 16 using a methodology based on philosophy, | mathematics and psychology. |
| National test results in English, | mathematics, and science over recent years show that pu |
| lina ) was the first Hollisian Professor of | Mathematics and Natural Philosophy at Harvard College. |
| lanned following the awarding of Specialist | Mathematics and Computing College status in July 2010. |
| Also | mathematics and flibbing. |
| In 1798, he was appointed professor of | mathematics and astronomy at the University. |
| Though he introduced history, | mathematics and modern languages, he based his teaching |
| a to build data literacy skills in science, | mathematics and social studies. |
| nt subgroups failed to meet expectations in | mathematics, and two of the three failed to meet expect |
| lters Kluwer, who sold on its well-regarded | mathematics and statistics list to CRC Press. |
| After teaching | mathematics and physics in Ghana with the Peace Corps ( |
| velopment, Assessment Theory, and Effective | Mathematics and Reading Instruction. |
| He received a Bachelor of Arts in | mathematics and physics in 1939 and a M.A. in physics i |
| rsity in 1831, Smith was named professor of | mathematics and astronomy in Wesleyan, and in 1851, Smi |
| b, and obtained a dual Bachelor's Degree in | Mathematics and Computer Science. |
| ncy business offering one to one tuition in | mathematics and the sciences. |
| The first floor being the | mathematics and English blocks and the bottom being sci |
| s SECME (Science Engineering Communications | Mathematics and Education), and National Junior Honor S |
| It is commonly found in | mathematics and engineering education settings and in l |
| homas Alleyne School in Stevenage, teaching | mathematics and physics. |
| e GCSE passes at grade C or above including | mathematics and English, and a contextual value added ( |
| Mathematics and politics. | |
| n, Massachusetts, then at Hudson, Ohio as a | mathematics and philosophy professor at Western Reserve |
| He then taught | mathematics and science at another Jesuit institution, |
| e academic departments, History of Science, | Mathematics, and Statistics. |
| ating in 1812 and graduating first-class in | mathematics and second-class in classics four years lat |
| ated from Acadia University with a B.Sc. in | Mathematics and Computer Science in 1982, followed by a |
| ers in science, technology, engineering and | mathematics and to foster a greater understanding of sc |
| dents in these schools major in technology, | mathematics and science degree programs. |
| muthu holds a Bachelor of Science degree in | Mathematics, and is a qualified chartered engineer.he |
| in educational software including English, | Mathematics, and Chinese language games. |
| for Humanities, Arts, and Cultural Studies; | Mathematics and Physical Sciences; and Social Sciences. |
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