The principal of the school announced that -- despite the help of private tutors in Hollywood and Philadelphia -- Fabian is a 10-o'clock scholar in English and mathematics.

** Monopole ( mathematics ), a connection over a principal bundle G with a section ( the Higgs field ) of the associated adjoint bundle

The list also includes Rabbis Shlomo Teichman ( mathematics ) founder and dean of Bais Yaakov Academy, Shlomo Braunstein ( statistics ) rosh yeshiva and principal, Shlomo Ribner ( psychology ) psychologist and rosh yeshiva, Moshe Homnick ( psychology ), Ahron Soloveichik ( law ) rosh yeshiva, Zecharia Dor-Shav ( Dershowitz ) ( psychology ) educator, Aharon Lichtenstein ( literature ) rosh yeshiva, Dr Abraham J. Tannenbaum ( education ), Joseph Thurm ( information technology ), Naftoli Meir Langsam ( education ), Yedidyah Langsam ( chemistry & computer science ), Chaim Feuerman ( education ), Zvhil-Mezbuz Rebbe Grand Rabbi Yitzhak Aharon Korff ( law, international law and diplomacy ).

Ronald Lewis Graham ( born October 31, 1935 ) is a mathematician credited by the American Mathematical Society as being " one of the principal architects of the rapid development worldwide of discrete mathematics in recent years ".

* Frame bundle, in mathematics is a principal fiber bundle associated with any vector bundle

In mathematics, a principal bundle is a mathematical object which formalizes some of the essential features of the Cartesian product X × G of a space X with a group G. In the same way as with the Cartesian product, a principal bundle P is equipped with

In mathematics, a principal homogeneous space, or torsor, for a group G is a homogeneous space X for G such that the stabilizer subgroup of any point is trivial.

In mathematics, a characteristic class is a way of associating to each principal bundle on a topological space X a cohomology class of X.

In mathematics, a frame bundle is a principal fiber bundle F ( E ) associated to any vector bundle E. The fiber of F ( E ) over a point x is the set of all ordered bases, or frames, for E < sub > x </ sub >.

** Monopole ( mathematics ), a connection over a principal bundle G with a section ( the Higgs field ) of the associated adjoint bundle

In mathematics, the Cauchy principal value, named after Augustin Louis Cauchy, is a method for assigning values to certain improper integrals which would otherwise be undefined.

Phokianos was a professor of mathematics and physics and a college principal.

* Botchan goes to Matsuyama: Eight days after Botchan graduates from a college in Tokyo, his principal calls him to his office and tells Botchan that a middle school in Shikoku needs a mathematics teacher.

In 1938, Russian became a required subject of study in every Soviet school, including those in which a non-Russian language was the principal medium of instruction for other subjects ( e. g., mathematics, science, and social studies ).

He is also the principal investigator of the North Cascades and Olympic Science Partnership, a mathematics and science partnership grant from the National Science foundation.

These major disciplines use physics, chemistry, biology, chronology and mathematics to build a qualitative and quantitative understanding of the principal areas or spheres of the Earth system.

In mathematics, an element p of a partial order ( P, ≤) is a meet prime element when p is the principal element of a principal prime ideal.

Vittal who was a Vivekananda student later became a lecturer in the mathematics department, then head of the mathematics department, and then principal of the college.

In mathematics, the exterior covariant derivative, sometimes also covariant exterior derivative, is a very useful notion for calculus on manifolds, which makes it possible to simplify formulas which use a principal connection.

In mathematics, specifically in homotopy theory, a classifying space BG of a topological group G is the quotient of a weakly contractible space EG ( i. e. a topological space for which all its homotopy groups are trivial ) by a free action of G. It has the property that any G principal bundle over a paracompact manifold is isomorphic to a pullback of the principal bundle

In mathematics, a principal branch is a function which selects one branch, or " slice ", of a multi-valued function.

The use of the soroban is still taught in Japanese primary schools as part of mathematics, primarily as an aid to faster mental calculation.

These ideas are part of the basis of concept of a limit in mathematics, and this connection is explained more fully below.

This subject constitutes a major part of modern mathematics education.

His work in this part of analysis provided the basis for important contributions to the mathematics of physics in the next two decades, though from an unanticipated direction.

The fusion of the ideas coming from mathematics with those coming from chemistry is at the origin of a part of the standard terminology of graph theory.

Infinitesimal calculus is the part of mathematics concerned with finding slope of curves, areas under curves, minima and maxima, and other geometric and analytic problems.

If an isomorphism can be found from a relatively unknown part of mathematics into some well studied division of mathematics, where many theorems are already proved, and many methods are already available to find answers, then the function can be used to map whole problems out of unfamiliar territory over to " solid ground " where the problem is easier to understand and work with.

The lambda calculus was introduced by mathematician Alonzo Church in the 1930s as part of an investigation into the foundations of mathematics.

In system analysis ( a subfield of mathematics ), linear prediction can be viewed as a part of mathematical modelling or optimization.

Other branches of mathematics, however, such as logic, number theory, category theory or set theory are accepted as part of pure mathematics, though they find application in other sciences ( predominantly computer science and physics ).

He won a scholarship to study mathematics at St John's College, Cambridge in 1915, and in 1916 gained a first in part I of the Mathematical Tripos.

In general, mathematical models may include logical models, as far as logic is taken as a part of mathematics.

Many of these structures are drawn from functional analysis, a research area within pure mathematics that was influenced in part by the needs of quantum mechanics.

Numerology and numerological divination by systems such as isopsephy were popular among early mathematicians, such as Pythagoras, but are no longer considered part of mathematics and are regarded as pseudomathematics or pseudoscience by modern scientists.

have derived a strong impulsion from James, but have more interest than he had in logic and mathematics and the abstract part of philosophy.

Over the last two millennia, physics was a part of natural philosophy along with chemistry, certain branches of mathematics, and biology, but during the Scientific Revolution in the 17th century, the natural sciences emerged as unique research programs in their own right.

In the foundations of mathematics, this project is variously understood as logicism or as part of the formalist program of David Hilbert.

Developed at the end of the 19th century, set theory is now a ubiquitous part of mathematics, and can be used as a foundation from which nearly all of mathematics can be derived.

In mathematics education, elementary topics such as Venn diagrams are taught at a young age, while more advanced concepts are taught as part of a university degree.

In mathematics, a self-similar object is exactly or approximately similar to a part of itself ( i. e. the whole has the same shape as one or more of the parts ).

He regarded formal semiotic as logic per se and part of philosophy ; as also encompassing study of arguments ( hypothetical, deductive, and inductive ) and inquiry's methods including pragmatism ; and as allied to but distinct from logic's pure mathematics.

In addition, from at least the time of Hilbert's program at the turn of the twentieth century to the proof of Gödel's incompleteness theorems and the development of the Church-Turing thesis in the early part of that century, true statements in mathematics were generally assumed to be those statements which are provable in a formal axiomatic system.