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Language equations are mathematical statements that resemble numerical equations, but the variables assume values of formal languages rather than numbers
Language_equation
Mathematical formula expressing equality
equation and its cognates in other languages may have subtly different meanings; for example, in French an équation is defined as containing one or more
Equation
Description of a quantum-mechanical system
The Schrödinger equation is a partial differential equation that governs the wave function of a non-relativistic quantum-mechanical system. Its discovery
Schrödinger_equation
Differential equation containing derivatives with respect to only one variable
In mathematics, an ordinary differential equation (ODE) is a differential equation (DE) dependent on only a single independent variable. As with any other
Ordinary differential equation
Ordinary_differential_equation
Type of functional equation (mathematics)
In mathematics, a differential equation is an equation that relates one or more unknown functions and their derivatives. In applications, the functions
Differential_equation
Equations describing classical electromagnetism
Maxwell's equations are a set of coupled partial differential equations that describe how electric and magnetic fields are generated by electric charges
Maxwell's_equations
Partial differential equation
mechanics and information theory, the Fokker–Planck equation is a partial differential equation that describes the time evolution of the probability
Fokker–Planck_equation
Equation to derive time of sunset and sunrise
The sunrise equation or sunset equation can be used to derive the time of sunrise or sunset for any solar declination and latitude in terms of local solar
Sunrise_equation
certain form of language equations. A (formal) language is simply a set of strings. Such sets can be specified by means of some language equation, which in
Arden's_rule
Partial differential equation describing the evolution of temperature in a region
specifically thermodynamics), the heat equation is a parabolic partial differential equation. The theory of the heat equation was first developed by Joseph Fourier
Heat_equation
Elliptic partial differential equation
Poisson's equation is an elliptic partial differential equation of broad utility in theoretical physics. For example, the solution to Poisson's equation is the
Poisson's_equation
Computer Language for System Modeling
similar to statements or blocks in programming languages, their primary content is a set of equations. In contrast to a typical assignment statement,
Modelica
Set of quasilinear hyperbolic equations governing adiabatic and inviscid flow
In fluid dynamics, the Euler equations are a set of partial differential equations governing adiabatic and inviscid flow. They are named after Leonhard
Euler equations (fluid dynamics)
Euler_equations_(fluid_dynamics)
Action of a massive abelian gauge field
spacetime. The corresponding equation is a relativistic wave equation called the Proca equation. The Proca action and equation are named after Romanian physicist
Proca_action
Several equations of degree 1 to be solved simultaneously
In mathematics, a system of linear equations (or linear system) is a collection of two or more linear equations involving the same variables. For example
System_of_linear_equations
Polynomial equation of degree 4
mathematics, a quartic equation is one which can be expressed as a quartic function equaling zero. The general form of a quartic equation is a x 4 + b x 3 +
Quartic_equation
General-purpose programming language
different method than in most languages, adds consistency to Python. For instance, this rounding implies that the equation (a + b)//b == a//b + 1 is always
Python_(programming_language)
Relativistic wave equation in quantum mechanics
In particle physics, the Klein–Gordon equation is a relativistic wave equation for spinless particles. It was discovered 1926 as the relativistic generalization
Klein–Gordon_equation
Otherwise, Euler's equation may refer to a non-differential equation, as in these three cases: Euler–Lotka equation, a characteristic equation employed in mathematical
List of topics named after Leonhard Euler
List_of_topics_named_after_Leonhard_Euler
Polynomial equation of degree two
In mathematics, a quadratic equation (from Latin quadratus 'square') is an equation that can be rearranged in standard form as a x 2 + b x + c = 0 , {\displaystyle
Quadratic_equation
Relativistic quantum mechanical wave equation
In particle physics, the Dirac equation is a relativistic wave equation derived by British physicist Paul Dirac in 1928. In its free form, or including
Dirac_equation
Hydrodynamic formulation of the Schrödinger equations
the Madelung equations, or the equations of quantum hydrodynamics, are Erwin Madelung's alternative formulation of the Schrödinger equation for a spinless
Madelung_equations
Polynomial equation whose integer solutions are sought
Diophantine equation is a polynomial equation with integer coefficients, for which only integer solutions are of interest. A linear Diophantine equation equates
Diophantine_equation
Description of the time-evolution of plasma
In plasma physics, the Vlasov equation is a differential equation describing the time evolution of the distribution function of a collisionless plasma
Vlasov_equation
Relation between vapour pressure and temperature
specific values may be used instead of the molar ones. The Clausius–Clapeyron equation applies to vaporization of liquids where vapor follows ideal gas law using
Clausius–Clapeyron_relation
Type of Diophantine equation
Pell's equation, also called the Pell–Fermat equation, is any Diophantine equation of the form x 2 − n y 2 = 1 , {\displaystyle x^{2}-ny^{2}=1,} where
Pell's_equation
Methods used to find numerical solutions of ordinary differential equations
ordinary differential equations are methods used to find numerical approximations to the solutions of ordinary differential equations (ODEs). Their use is
Numerical methods for ordinary differential equations
Numerical_methods_for_ordinary_differential_equations
Estimate of extraterrestrial civilizations
The Drake equation is a probabilistic argument used to estimate the number of active, communicative extraterrestrial civilizations in the Milky Way Galaxy
Drake_equation
Form of causal modeling that fit networks of constructs to data
Structural equation modeling (SEM) is a diverse set of methods used by scientists for both observational and experimental research. SEM is used mostly
Structural_equation_modeling
Formula that provides the solutions to a quadratic equation
quadratic equation. Other ways of solving quadratic equations, such as completing the square, yield the same solutions. Given a general quadratic equation of
Quadratic_formula
Equations for calculations of the Darcy friction factor
formulae are equations that allow the calculation of the Darcy friction factor, a dimensionless quantity used in the Darcy–Weisbach equation, for the description
Darcy friction factor formulae
Darcy_friction_factor_formulae
Stochastic differential equation
In physics, a Langevin equation (named after Paul Langevin) is a stochastic differential equation describing how a system evolves when subjected to a combination
Langevin_equation
S-shaped curve
or logistic curve is a common S-shaped curve (sigmoid curve) with the equation f ( x ) = L 1 + e − k ( x − x 0 ) {\displaystyle f(x)={\frac {L}{1+e^{-k(x-x_{0})}}}}
Logistic_function
Differential equation that is linear with respect to the unknown function
In mathematics, a linear differential equation is a differential equation that is linear in the unknown function and its derivatives, so it can be written
Linear_differential_equation
Equations in physical cosmology
The Friedmann equations, also known as the Friedmann–Lemaître (FL) equations, are a set of equations in physical cosmology that govern cosmic expansion
Friedmann_equations
Functional programming language
Pure, successor to the equational language Q, is a dynamically typed, functional programming language based on term rewriting. It has facilities for user-defined
Pure_(programming_language)
Physical law in electrochemistry
In electrochemistry, the Nernst equation is a chemical thermodynamical relationship that permits the calculation of the reduction potential of a reaction
Nernst_equation
Computer language
time-dependent, nonlinear differential equations. Like SIMCOS and TUTSIM, ACSL is a dialect of the Continuous System Simulation Language (CSSL), originally designed
Advanced Continuous Simulation Language
Advanced_Continuous_Simulation_Language
Equation describing a state of matter under a given set of conditions
In physics and chemistry, an equation of state is a thermodynamic equation relating state variables, which describe the state of matter under a given
Equation_of_state
Partial differential equations whose solutions are instantons
the classical work of James Maxwell on Maxwell's equations, which had been phrased in the language of a U ( 1 ) {\displaystyle \operatorname {U} (1)}
Yang–Mills_equations
Equation of statistical mechanics
The Boltzmann equation or Boltzmann transport equation (BTE) describes the statistical behaviour of a thermodynamic system not in a state of equilibrium;
Boltzmann_equation
Equation whose side(s) describe a transcendental function
In applied mathematics, a transcendental equation is an equation over the real (or complex) numbers that is not algebraic, that is, if at least one of
Transcendental_equation
Thermodynamic equation
equation is a class of semi-empirical correlations describing the relation between vapor pressure and temperature for pure substances. The equation was
Antoine_equation
Differential equations involving stochastic processes
A stochastic differential equation (SDE) is a differential equation in which one or more of the terms is a stochastic process, resulting in a solution
Stochastic differential equation
Stochastic_differential_equation
Computer modeling of time-varying behavior of a dynamical system
described by ordinary differential equations or partial differential equations. A simulation run solves the state-equation system to find the behavior of
Dynamical_system_simulation
Dynamical system
In mathematics, the replicator equation is a type of dynamical system used in evolutionary game theory to model how the frequency of strategies in a population
Replicator_equation
Mathematical descriptions of transmission line voltage and current
The telegrapher's equations (or telegraph equations) are a set of two coupled, linear partial differential equations that model voltage and current along
Telegrapher's_equations
Topics referred to by the same term
occurring, soft, siliceous sedimentary rock mineral Differential equation, an equation which derivatives of a function appear as variables Differential
DE
Topics referred to by the same term
Kardar–Parisi–Zhang equation, a non-linear stochastic partial differential equation Kupsabiny language (ISO 639-3: kpz), a Kalenjin language of eastern Uganda
KPZ
Equations characterizing continuous-time Markov processes
distinct equations: the Kolmogorov forward equation for continuous processes, now understood to be identical to the Fokker–Planck equation, the Kolmogorov
Kolmogorov_equations
Equation of the state of a hypothetical ideal gas
The ideal gas law, also called the general gas equation, is the equation of state of a hypothetical ideal gas. It is a good approximation of the behavior
Ideal_gas_law
Formula for temperature dependence of rates of chemical reactions
physical chemistry, the Arrhenius equation is a formula for the temperature dependence of reaction rates. The equation was proposed by Svante Arrhenius
Arrhenius_equation
Model used to describe wear
Archard wear equation is a simple model used to describe sliding wear and is based on the theory of asperity contact. The Archard equation was developed
Archard_equation
Symbolic representation of a chemical reaction
A chemical equation is the symbolic representation (notation) of a chemical reaction in the form of symbols and chemical formulas. The reactant entities
Chemical_equation
Formula relating load-force and hold-force on a line wound around a cylinder
The capstan equation or belt friction equation, also known as the Euler-Eytelwein formula describes the tension required to cause slippage of a flexible
Capstan_equation
Characteristic property of holomorphic functions
Cauchy–Riemann equations are two partial differential equations that characterize differentiability of complex functions. The equations are and where u(x
Cauchy–Riemann_equations
Empirical model for microorganisms growth limited by a nutrient
The Monod equation is a mathematical model for the growth of microorganisms. It is named for Jacques Monod (1910–1976, a French biochemist, Nobel Prize
Monod_equation
Nonlinear form of the Schrödinger equation
(one-dimensional) nonlinear Schrödinger equation (NLSE) is a nonlinear variation of the Schrödinger equation. It is a classical field equation whose principal applications
Nonlinear Schrödinger equation
Nonlinear_Schrödinger_equation
Compact astronomical body
black hole physics. Only a few months after Einstein published the field equations describing general relativity, astrophysicist Karl Schwarzschild set out
Black_hole
the direction of the induction, and Franz Ernst Neumann wrote down the equation to calculate the induced force by change of magnetic flux. However, these
History of Maxwell's equations
History_of_Maxwell's_equations
Formulation of classical mechanics
In physics, the Hamilton–Jacobi equation, named after William Rowan Hamilton and Carl Gustav Jacob Jacobi, is an alternative formulation of classical mechanics
Hamilton–Jacobi_equation
Model of enzyme kinetics
Victor Henri's fundamental equation of enzyme kinetics, which was established in 1902. It takes the form of a differential equation describing the reaction
Michaelis–Menten_kinetics
Equations relating to massless particles in AdS space
implemented and the equations give a solution of certain formal deformation procedure, which is difficult to map to field theory language. The higher-spin
Vasiliev_equations
Processing of natural language by a computer
Natural language processing (NLP) is the processing of natural language information by a computer. NLP is a subfield of computer science and is closely
Natural_language_processing
German-born theoretical physicist (1879–1955)
arises from special relativity, has been called "the world's most famous equation". He received the 1921 Nobel Prize in Physics for "his services to theoretical
Albert_Einstein
Numerical method
lines (MOL, NMOL, NUMOL) is a technique for solving partial differential equations (PDEs) in which all but one dimension is discretized. By reducing a PDE
Method_of_lines
Programming language for statistics
R is a programming language for statistical computing and data visualization. It has been widely adopted in the fields of data mining, bioinformatics,
R_(programming_language)
Cyber attack group
The Equation Group, also known in China as APT-C-40, is a highly sophisticated threat actor known to be the Tailored Access Operations (TAO) unit of the
Equation_Group
Generalization of the Dirac equation
In mathematical physics, the Dirac equation in curved spacetime is a generalization of the Dirac equation from flat spacetime (Minkowski space) to curved
Dirac equation in curved spacetime
Dirac_equation_in_curved_spacetime
Population balance equation in statistical physics
In statistical physics, the Smoluchowski coagulation equation is a population balance equation introduced by Marian Smoluchowski in a seminal 1916 publication
Smoluchowski coagulation equation
Smoluchowski_coagulation_equation
Series of activities
population Diffusion process, a solution to a stochastic differential equation Empirical process, a stochastic process that describes the proportion of
Process
17th-century conjecture proved by Andrew Wiles in 1994
the most notable theorems in the history of mathematics. The Pythagorean equation, x 2 + y 2 = z 2 {\displaystyle x^{2}+y^{2}=z^{2}} , has an infinite number
Fermat's_Last_Theorem
Branch of numerical analysis
partial differential equations is the branch of numerical analysis that studies the numerical solution of partial differential equations (PDEs). In principle
Numerical methods for partial differential equations
Numerical_methods_for_partial_differential_equations
Mathematical solution
for different classes of equations. One of the most important is based on the notion of distributions. Avoiding the language of distributions, one starts
Weak_solution
markup languages such as MathML. With Microsoft's release of Microsoft Office 2007 and the Office Open XML file formats, they introduced a new equation editor
Mathematical_markup_language
Branch of mathematics
English language in the 16th century from Italian, Spanish, and medieval Latin. Initially, its meaning was restricted to the theory of equations, that is
Algebra
Speed of sound wave through elastic medium
386919. Del Grosso, V. A. (1974). "New equation for speed of sound in natural waters (with comparisons to other equations)". Journal of the Acoustical Society
Speed_of_sound
Equation in differential geometry
Liouville's equation in dynamical systems, see Liouville's theorem (Hamiltonian). For Liouville's equation in quantum mechanics, see Von Neumann equation. For
Liouville's_equation
differential equations, a Monge equation, named after Gaspard Monge, is a type of first-order partial differential equation. A Monge equation is a function
Monge_equation
Technique for solving hyperbolic partial differential equations
partial differential equations. The method is to reduce a partial differential equation (PDE) to a family of ordinary differential equations (ODEs) along which
Method_of_characteristics
The Kawahara equation is a partial differential equation that arises in various fields of mathematical physics, particularly in the study of wave phenomena
Kawahara_equation
Programming language
META II uses what Schorre called syntax equations. Its operation is simply explained as: Each syntax equation is translated into a recursive subroutine
META_II
Differential equations are prominent in many scientific areas. Nonlinear ones are of particular interest for their commonality in describing real-world
List of nonlinear ordinary differential equations
List_of_nonlinear_ordinary_differential_equations
Non-linear second order differential equation and its attractor
The Duffing equation (or Duffing oscillator), named after Georg Duffing (1861–1944), is a non-linear second-order differential equation used to model
Duffing_equation
Basic concepts of algebra
quantitative relationships in science and mathematics are expressed as algebraic equations. In mathematics, a basic algebraic operation is a mathematical operation
Elementary_algebra
Quasilinear first-order ordinary differential equation
classical mechanics, Euler's rotation equations are a vectorial quasilinear first-order ordinary differential equation describing the rotation of a rigid
Euler's equations (rigid body dynamics)
Euler's_equations_(rigid_body_dynamics)
Analysis of the dimensions of different physical quantities
gram is larger than an hour is meaningless. Any physically meaningful equation or inequality must have the same dimensions on its left and right sides
Dimensional_analysis
Model describing the departures from ideality in solutions of electrolytes and plasmas
mean activity coefficients for ions in dilute solution. The Debye–Hückel equation provides a starting point for modern treatments of non-ideality of electrolyte
Debye–Hückel_theory
Special function occurring in problems possessing elliptic symmetry
called angular Mathieu functions, are solutions of Mathieu's differential equation d 2 y d x 2 + ( a − 2 q cos ( 2 x ) ) y = 0 , {\displaystyle {\frac
Mathieu_function
Orbital mechanics term
In orbital mechanics, Kepler's equation relates various geometric properties of the orbit of a body subject to a central force. It was derived by Johannes
Kepler's_equation
Concept in physics
the equation of state and substituting the above expression for the change in enthalpies into the Hugoniot equation, one obtains an Hugoniot equation expressed
Rankine–Hugoniot_conditions
Viscosity equation
Vogel–Fulcher–Tammann equation, also known as Vogel–Fulcher–Tammann–Hesse equation or Vogel–Fulcher equation (abbreviated: VFT equation), is used to describe
Vogel–Fulcher–Tammann equation
Vogel–Fulcher–Tammann_equation
9th-century Arabic work on algebra
subtracted terms to the other side of an equation, i.e. the cancellation of like terms on opposite sides of the equation. The mathematics historian Victor J
Al-Jabr
Type of ordinary differential equation
In mathematical analysis, Clairaut's equation (or the Clairaut equation) is a differential equation of the form y ( x ) = x d y d x + f ( d y d x ) {\displaystyle
Clairaut's_equation
System of complete and orthogonal polynomials
definition is in terms of solutions to Legendre's differential equation: This differential equation has regular singular points at x = ±1 so if a solution is
Legendre_polynomials
mathematics, the Thomas–Fermi equation for the neutral atom is a second order non-linear ordinary differential equation, named after Llewellyn Thomas
Thomas–Fermi_equation
Mathematical descriptions of molecular diffusion
to derive his second law, which in turn is identical to the diffusion equation. Fick's first law: Movement of particles from high to low concentration
Fick's_laws_of_diffusion
Mathematical tool in quantum physics
Schrödinger equation describes how pure states evolve in time, the von Neumann equation (also known as the Liouville–von Neumann equation) describes how
Density_matrix
Concepts from linear algebra
certain equation that I will call the "characteristic equation", the degree of this equation being precisely the order of the differential equation that
Eigenvalues_and_eigenvectors
Equation in Brownian motion
in 1906 in their works on Brownian motion. The more general form of the equation in the classical case is D = μ k B T , {\displaystyle D=\mu \,k_{\text{B}}T
Einstein relation (kinetic theory)
Einstein_relation_(kinetic_theory)
LANGUAGE EQUATION
LANGUAGE EQUATION
Boy/Male
Arabic, Muslim
Tongue; Language
Boy/Male
Indian, Tamil
Sweet Language
Boy/Male
Bengali, Gujarati, Hindu, Indian, Kannada, Malayalam, Marathi
Language of God
Girl/Female
Bengali, Gujarati, Hindu, Indian
Language
Girl/Female
Assamese, Bengali, Gujarati, Hindu, Indian, Jain, Kannada, Malayalam, Marathi, Sanskrit, Tamil, Telugu
Language
Boy/Male
Tamil
Prangel | பà¯à®°à®¾à®‚ஜல
Language
Prangel | பà¯à®°à®¾à®‚ஜல
Boy/Male
Tamil
Girvan | கிரà¯à®µà®¾à®¨
Language of God
Girvan | கிரà¯à®µà®¾à®¨
Boy/Male
Tamil
Girven | கீரà¯à®µà¯‡à®¨Â
Language of God
Girven | கீரà¯à®µà¯‡à®¨Â
Girl/Female
Hindu, Indian
Child Language
Boy/Male
Hindu
Language
Girl/Female
British, Hindu, Indian, Norwegian, Sanskrit, Tamil
Language of Vedas
Girl/Female
Hindu, Indian, Marathi
Language of Bihar
Girl/Female
Tamil
Language
Girl/Female
Tamil
Tamilarasi | தாமீலாரஸீÂ
Queen of Tamil language
Tamilarasi | தாமீலாரஸீÂ
Boy/Male
Hindu
Language of God
Girl/Female
Hindu, Indian
Beautiful Language
Boy/Male
Muslim
Language of religion (Islam)
Surname or Lastname
English
English : habitational name from Langdale, Cumbria, named in Old Norse as ‘long valley’, from lang ‘long’ + dalr ‘valley’.Possibly an Americanized form of Norwegian Langdal, Langdalen, Langdahl, habitational names from any of numerous farmsteads named Langdal(en), having the same etymology as 1.
Girl/Female
Hindu, Indian, Tamil
Sweet Language
Boy/Male
Hindu
Language of God
LANGUAGE EQUATION
LANGUAGE EQUATION
Biblical
judging; praying
Female
Chinese
liberal good luck.
Male
Greek
(Ήφαιστος) Greek name said to be pre-Hellenic and of unknown origin, but possibly from the word hepta, HEPHAISTOS means "seven." In mythology, this is the name of the lame god of artisans, craftsmen, metallurgy and fire. His Roman name is Vulcan. It was from the forge of this god that Promêtheus stole fire to give to man. He is also known by the epithet "both feet crooked."
Boy/Male
Australian, Danish, French, German, Indian, Swedish, Swiss
God is My Judge
Boy/Male
Australian, Biblical, Christian, Dutch, French, German, Hebrew
Poor; Humble; Who is Like God
Girl/Female
Scandinavian American German
Womanly; strength. Feminine of Karl.
Boy/Male
Hindu
War
Boy/Male
Welsh
Legendary son of Caw.
Boy/Male
Irish
Wealthy.
Girl/Female
Arabic, Hebrew, Muslim, Russian
Gift of Allah
LANGUAGE EQUATION
LANGUAGE EQUATION
LANGUAGE EQUATION
LANGUAGE EQUATION
LANGUAGE EQUATION
n.
The Provencal language. See Langue d'oc.
n.
The vocabulary and phraseology belonging to an art or department of knowledge; as, medical language; the language of chemistry or theology.
n.
Any means of conveying or communicating ideas; specifically, human speech; the expression of ideas by the voice; sounds, expressive of thought, articulated by the organs of the throat and mouth.
n.
The language of the Czechs (often called Bohemian), the harshest and richest of the Slavic languages.
a.
Of or pertaining to language; relating to linguistics, or to the affinities of languages.
n.
The language of the ancient Germans; the Teutonic languages, collectively.
n.
The forms of speech, or the methods of expressing ideas, peculiar to a particular nation.
n.
The expression of ideas by writing, or any other instrumentality.
imp. & p. p.
of Language
n.
The characteristic mode of arranging words, peculiar to an individual speaker or writer; manner of expression; style.
a.
Having a language; skilled in language; -- chiefly used in composition.
n.
The inarticulate sounds by which animals inferior to man express their feelings or their wants.
n.
The language of the Hebrews; -- one of the Semitic family of languages.
n.
The suggestion, by objects, actions, or conditions, of ideas associated therewith; as, the language of flowers.
n.
The Tamil language, the most important of the Dravidian languages. See Dravidian, a.
v. t.
To communicate by language; to express in language.
p. pr. & vb. n.
of Language
n.
A race, as distinguished by its speech.
n.
A Northern Turanian group of languages; the language of the Finns.