Search for "Calculus" in article titles:

  1. Calculus: This page is about infinitesmal calculus. For other uses of the word in mathematics and other fields, click here Calculus usually refers to the elementary study of real-valued functions and their applications to the study of quantities. [100%] 2023-10-17
  2. Calculus: Calculus is the mathematical study of continuous change, in the same way that geometry is the study of shape, and algebra is the study of generalizations of arithmetic operations. Originally called infinitesimal calculus or "the calculus of infinitesimals", it has ... (Branch of mathematics) [100%] 2024-01-04 [Calculus]
  3. Calculus: Calculus uses methods originally based on the summation of infinitesimal differences. It includes the examination of changes in an expression by smaller and smaller differences. [100%] 2024-01-03 [{{PAGENAME}}] [Mathematics courses]...
  4. Calculus: A part of the name of some branches of mathematics dealing with rules for the computation of and operation with objects of a definite type; e.g. differential calculus, variational calculus. (Mathematics) [100%] 2023-10-17
  5. Calculus: Calculus (that is, the "infinitesimal calculus", see above) is the mathematical subject that studies rates of change of functions. There are two main branches of calculus—differential calculus, and integral calculus. [100%] 2023-03-14 [Calculus]
  6. Calculus (medicine): A calculus is a stone (a concretion of material, usually mineral salts) that forms in an organ or duct of the body. Stones cause a number of important medical conditions. (Medicine) [70%] 2023-10-07 [Disease]
  7. Calculus (medicine): Calculus (medicine) : In medicine, calculus is a stone formed in the body, for example gallstone or kidney stone. (Medicine) [70%] 2023-09-02
  8. Calculus II: Calculus II is the second course involving calculus, after Introduction to Calculus. Because of this, you are expected to know derivatives inside and out, and also know basic integrals. [70%] 2024-01-08 [Calculus] [Calculus II]...
  9. Calculus Ratiocinator: El Calculus ratiocinator es un concepto ideado por el filósofo y matemático alemán Gottfried Leibniz con el fin de establecer un marco teórico universal para el cálculo lógico. Normalmente aparece asociado con la más frecuentemente citada characteristica universalis ("característica universal ... [70%] 2023-06-01
  10. Hedonic Calculus: The Hedonic Calculus was formulated by the philosopher Jeremy Bentham. It is used by practitioners of the Benthamite school of Utilitarianism to measure how much pleasure/pain actions will create. [70%] 2023-12-09 [Morality]
  11. Infinitesimal Calculus: The infinitesimal calculus is the body of rules and processes by means of which continuously varying magnitudes are dealt with in mathematical analysis. The name “infinitesimal” has been applied to the calculus because most of the leading results were first ... [70%] 2022-09-02
  12. Calculus pre-test: To take this test, click here to put the test on your userpage. Click the link and save. [70%] 2023-12-10 [Calculus] [Pre-Calculus]...
  13. Electoral Calculus: Electoral Calculus is a political forecasting web site which attempts to predict future United Kingdom general election results. It considers national factors and local demographics. (British political forecasting web site) [70%] 2023-12-10 [Mathematical modeling]
  14. Calculus II WSG: Calculus II G G.B. Thomas,M.D. [57%] 2023-12-11 [Introductions] [Learning activities]...
  15. The Epsilon Calculus: The epsilon calculus is a logical formalism developed by David Hilbert in the service of his program in the foundations of mathematics. The epsilon operator is a term-forming operator which replaces quantifiers in ordinary predicate logic. (Philosophy) [57%] 2022-02-26
  16. Calculus of constructions: In mathematical logic and computer science, the calculus of constructions (CoC) is a type theory created by Thierry Coquand. It can serve as both a typed programming language and as constructive foundation for mathematics. (Type theory created by Thierry Coquand) [57%] 2024-01-19 [Dependently typed programming] [Lambda calculus]...
  17. Introduction to Calculus: Welcome to Introduction to Calculus This is the course Introduction to Calculus Overview Page which comes under the Calculus Topic Page. Before taking this the Introduction to Calculus Course it is recommended that you have a working knowledge of trigonometry ... [57%] 2023-07-04 [Calculus] [Introductions]...
  18. Calculus Of Variations: The calculus of variations arose from the attempts that were made by Origin mathematicians in the 17th century to solve problems of the of which the following are typical examples. is required to determine the form of a chain of ... [57%] 2022-09-02
  19. Calculus of concepts: The calculus of concepts is an abstract language and theory, which was developed to simplify the reasons behind effective messaging when delivered to a specific target or set of targets. The theory aims to maximize the likelihood of desired outcomes ... (Social) [57%] 2023-11-26 [Communication theory]
  20. Calculus of concepts: The calculus of concepts is an abstract language and theory, which was developed to simplify the reasons behind effective messaging when delivered to a specific target or set of targets. The theory aims to maximize the likelihood of desired outcomes ... (Abstract language and theory) [57%] 2023-12-12 [Communication theory] [Human communication]...
  21. Calculus of classes: The traditional name, going back to G. Boole, for the branch of mathematical logic studying the logic of classes. (Mathematics) [57%] 2023-10-17
  22. The Lambda Calculus: The \(\lambda\)-calculus is, at heart, a simple notation for functions and application. The main ideas are applying a function to an argument and forming functions by abstraction. (Philosophy) [57%] 2022-01-06
  23. Calculus of constructions: In mathematical logic and computer science, the calculus of constructions (CoC) is a type theory created by Thierry Coquand. It can serve as both a typed programming language and as constructive foundation for mathematics. (Type theory created by Thierry Coquand) [57%] 2023-12-13 [Dependently typed programming] [Lambda calculus]...
  24. Calculus of functors: In algebraic topology, a branch of mathematics, the calculus of functors or Goodwillie calculus is a technique for studying functors by approximating them by a sequence of simpler functors; it generalizes the sheafification of a presheaf. This sequence of approximations ... [57%] 2023-12-09 [Algebraic topology] [Functors]...
  25. The Calculus Affair: The Calculus Affair (French: L'Affaire Tournesol) is the eighteenth volume of The Adventures of Tintin, the comics series by the Belgian cartoonist Hergé. It was serialised weekly in Belgium's Tintin magazine from December 1954 to February 1956 before being ... (Comic album by Belgian cartoonist Hergé) [57%] 2023-12-12 [1956 graphic novels] [Comics set in a fictional country]...
  26. Differences, Calculus Of: Differences, Calculus Of (Theory of Finite Differences), that branch of mathematics which deals with the successive differences of the terms of a series. The most important of the cases to which mathematical methods can be applied are those in which ... [57%] 2022-09-02
  27. Calculus Made Easy: Calculus Made Easy is a book on infinitesimal calculus originally published in 1910 by Silvanus P. Thompson, considered a classic and elegant introduction to the subject. (1910 book on infinitesimal calculus by Silvanus P. Thompson) [57%] 2024-04-10 [1910 non-fiction books] [Works by Martin Gardner]...
  28. Calculus of variations: The calculus of variations (or variational calculus) is a field of mathematical analysis that uses variations, which are small changes in functions and functionals, to find maxima and minima of functionals: mappings from a set of functions to the real ... (Differential calculus on function spaces) [57%] 2024-06-16 [Calculus of variations] [Optimization in vector spaces]...
  29. The Calculus of Consent: The Calculus of Consent: Logical Foundations of Constitutional Democracy is a book published by economists James M. Buchanan and Gordon Tullock in 1962. (Finance) [50%] 2024-01-04 [Economics books]
  30. Calculus on Euclidean space: In mathematics, calculus on Euclidean space is a generalization of calculus of functions in one or several variables to calculus of functions on Euclidean space \displaystyle{ \mathbb{R}^n }[/math] as well as a finite-dimensional real vector space. This ... [50%] 2023-11-09 [Calculus]
  31. Sequent calculus: One of the formulations of the predicate calculus. Due to the convenient representation of derivations, the sequent calculus has wide applications in proof theory, in the foundations of mathematics and in the automatic search for a deduction. (Mathematics) [70%] 2023-12-11
  32. Quantity calculus: Quantity calculus is the formal method for describing the mathematical relations between abstract physical quantities. (Here the term calculus should be understood in its broader sense of "a system of computation", rather than in the sense of differential calculus and ... (Physics) [70%] 2023-12-10 [Physical quantities]
  33. Residue calculus: The residue calculus is a method of definite integration which relies heavily on Cauchy's residue theorem. The idea is to rewrite a definite integral on the real line as limit of integrals in the complex plane which are, in ... [70%] 2023-02-23 [Calculus] [Integration]...
  34. Join-calculus: The join-calculus is a process calculus developed at INRIA. The join-calculus was developed to provide a formal basis for the design of distributed programming languages, and therefore intentionally avoids communications constructs found in other process calculi, such as ... [70%] 2023-09-27 [Process calculi]
  35. Itô calculus: Itô calculus, named after Kiyosi Itô, extends the methods of calculus to stochastic processes such as Brownian motion (see Wiener process). It has important applications in mathematical finance and stochastic differential equations. (Calculus of stochastic differential equations) [70%] 2023-11-28 [Definitions of mathematical integration] [Stochastic calculus]...
  36. API-Calculus: API Calculus is a program that solves calculus problems using operating systems within a device that solves calculus problems. In 1989, the PI- Calculus was created by Robin Milner and was very successful throughout the years. [70%] 2023-12-11 [Process calculi] [Theoretical computer science]...
  37. Multivariable calculus: Multivariable calculus is a college-level topic of study that typically includes. [70%] 2023-02-22 [Vector Analysis] [Calculus]...
  38. Integral calculus: The branch of mathematics in which the notion of an integral, its properties and methods of calculation are studied. Integral calculus is intimately related to differential calculus, and together with it constitutes the foundation of mathematical analysis. (Mathematics) [70%] 2023-08-28
  39. Geometric calculus: In mathematics, geometric calculus extends the geometric algebra to include differentiation and integration. The formalism is powerful and can be shown to encompass other mathematical theories including vector calculus, differential geometry, and differential forms. (Infinitesimal calculus on functions defined on a geometric algebra) [70%] 2023-12-29 [Applied mathematics] [Calculus]...
  40. Situation calculus: The situation calculus is a logic formalism designed for representing and reasoning about dynamical domains. It was first introduced by John McCarthy in 1963. [70%] 2023-12-11 [Logic programming]
  41. Stochastic calculus: Stochastic calculus is a branch of mathematics that operates on stochastic processes. It allows a consistent theory of integration to be defined for integrals of stochastic processes with respect to stochastic processes. [70%] 2023-12-09 [Stochastic processes] [Mathematical finance]...
  42. Propositional calculus: Propositional calculus or Sentential calculus is a calculus that represents the logical structure of truth-functional connectives ("not," "and," "or," "if…, then...," and others); the connectives such that their meanings determine the truth-value of a given sentence in which ... [70%] 2023-02-03
  43. Malliavin calculus: In probability theory and related fields, Malliavin calculus is a set of mathematical techniques and ideas that extend the mathematical field of calculus of variations from deterministic functions to stochastic processes. In particular, it allows the computation of derivatives of ... (Mathematical techniques used in probability theory and related fields) [70%] 2023-12-12 [Stochastic calculus] [Integral calculus]...
  44. Π-calculus: In theoretical computer science, the π-calculus (or pi-calculus) is a process calculus. The π-calculus allows channel names to be communicated along the channels themselves, and in this way it is able to describe concurrent computations whose network configuration may ... (Process calculus) [70%] 2023-12-11 [Process calculi] [Theoretical computer science]...
  45. Mueller calculus: Mueller calculus is a matrix method for manipulating Stokes vectors, which represent the polarization of light. It was developed in 1943 by Hans Mueller. (System for describing optical polarization) [70%] 2023-04-04 [Polarization (waves)] [Matrices]...
  46. Ambient calculus: In computer science, the ambient calculus is a process calculus devised by Luca Cardelli and Andrew D. Gordon in 1998, and used to describe and theorise about concurrent systems that include mobility. [70%] 2023-03-13 [Process calculi] [Theoretical computer science]...
  47. Pi-Calculus: The PI calculus is a kind of "process algebra" or process calculus. It allows to model a process as the interaction from communicating parts (programs and/or humans). [70%] 2023-01-23 [workflow]
  48. Weyl calculus: Weyl–Hörmander calculus In Hamiltonian mechanics over a phase space $\mathbf{R} ^ { 2 n }$, the Poisson bracket $\{ f , g \}$ of two smooth observables $f : \mathbf{R} ^ { 2 n } \rightarrow \mathbf{R}$ and $g : \mathbf R ^ { 2 n } \rightarrow \mathbf R ... (Mathematics) [70%] 2023-10-23
  49. Advanced calculus: Advanced calculus is a general term for courses in calculus beyond the introductory college-level course or advanced high-school level course. This is required as part of some college engineering programs, and can also serve as an introduction to ... [70%] 2023-02-28 [Calculus]
  50. Lambda-calculus: lambda calculus. The lambda calculus was introduced in 1932–1933 by A. (Mathematics) [70%] 2023-08-11
  51. Ricci calculus: In mathematics, Ricci calculus constitutes the rules of index notation and manipulation for tensors and tensor fields on a differentiable manifold, with or without a metric tensor or connection. It is also the modern name for what used to be ... (Tensor index notation for tensor-based calculations) [70%] 2023-12-14 [Calculus] [Differential geometry]...
  52. Propositional calculus: A general name for a deductive system whose deducible objects can be interpreted as statements formed from simple (i.e. not analyzable in the framework of propositional calculus) statements using propositional connectives (such as "not" , "and" , "or" , "if …, then …" , etc ... (Mathematics) [70%] 2023-10-24
  53. Ethical calculus: An ethical calculus is the application of mathematics to calculate issues in ethics. Generally, ethical calculus refers to any method of determining a course of action in a circumstance that is not explicitly evaluated in one's ethical code. (Philosophy) [70%] 2023-12-05 [Ethical principles] [Utilitarianism]...
  54. Network calculus: Network calculus is "a set of mathematical results which give insights into man-made systems such as concurrent programs, digital circuits and communication networks." Network calculus gives a theoretical framework for analysing performance guarantees in computer networks. As traffic flows ... (Theoretical framework for analysing performance guarantees in computer networks) [70%] 2023-12-12 [Network performance] [Computer network analysis]...
  55. Operational calculus: Operational calculus, also known as operational analysis, is a technique by which problems in analysis, in particular differential equations, are transformed into algebraic problems, usually the problem of solving a polynomial equation. The idea of representing the processes of calculus ... (Technique to solve differential equations) [70%] 2023-10-24 [Linear operators] [Electrical engineering]...

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